MEYER ROUTE SURVEYING ENGIN. LIB. TA 445 MGZ 1962 A 1,051,851 Hatgi 36612 ROUTE SURVEYING A CON www AN {2}?«T«b«T«L«H??^ui virindang patutenganottuna ateteres oratetoljetnje po temnantaloneta sanatorisanten woman jaunetinamalainen ingevensanaannutapatata utang, NY INẬM ARTES SCIENTIA VERITAS S Libraries Michigan University of 1817 775 9.2 INTERNATIONAL TEXTBOOKS IN CIVIL ENGINEERING Consulting Editor RUSSELL C. BRINKER Professor of Civil Engineering New Mexico State University ROUTE SURVEYING ROUTE SURVEYING CARL F. MEYER Professor of Civil Engineering Worcester Polytechnic Institute THIRD EDITION INTERNATIONAL TEXTBOOK COMPANY Scranton, Pennsylvania Engin. Library TA 7 625 Ben ist hat d Copyright, 1962, 1956, 1946, by International Textbook Company. All rights reserved. Printed in the United States of America by The Haddon Craftsmen, Inc., at Scranton, Pennsylvania. Library of Congress Catalog Card Number: 62-12773. PREFACE TO THE THIRD EDITION The primary objective in the third edition of this book was to modernize every chapter while retaining the basic approach that made earlier editions so popular. Another goal was to improve the book's teachability by a clear rewriting of many of the more difficult subjects and especially by the inclusion of almost three times as many problems-all of them new. The most important addition is the new chapter “Automa- tion in Location and Design." This chapter brings into focus the electronic applications that have revolutionized many aspects of field and office work. The treatment clarifies terms such as data procurement, data reduction, and data processing for practicing engineers and students alike. The applications of wave mechanics and electronics to distance measurement; the fundamentals of modern computers; and the new auto- mated methods of data recording, data transmission, and data plotting are explained. Special emphasis is given to the automatic integration of photogrammetry and electronic computer in mapping and route location. The chapter "Aerial Photography in Route Surveying" has been up-dated by the inclusion of new material on analytic aerotriangulation and on orthophotography and its product- the photo contour map. Recent cost data on photogrammetric mapping for highway location have been added and cost trends analyzed. Significant additions have been made in the chapters on curves. These include the theory and practice of staking parallel offset curves and spirals, and the solution of special curve problems by analytic geometry. The new problems have been carefully chosen to serve in fixing the principles of curves and earthwork. Answers are given to many of the problems; but the development of students' self-reliance is promoted by omitting some answers so as to encourage checking the work by an independent method. vii viii PREFACE As a prelude to the problems, new material on proper methods of computation and use of significant figures are given in Articles 2-16 and 2-17. This material fills a need rarely satisfied in a surveying textbook. Students are urged to weigh the accompanying suggestions before doing problems and to refer to these articles frequently until the procedures become habitual. Worcester, Massachusetts April, 1962 C.F.M. PART I: BASIC PRINCIPLES 1. Route Location.. 2. Simple Curves. 3. Compound and Reverse Curves. 4. Parabolic Curves.. 5. Spirals.. 6. Earthwork………. CONTENTS List of Tables... • • PART II: PRACTICAL APPLICATIONS 7. Special Curve Problems. 8. Curve Problems in Highway Design.. 9. Railroad Surveys. 10. Highway Surveys 11. Surveys for Other Routes. 12. Aerial Photography in Route Surveying. 13. Automation in Location and Design. • · · • APPENDIX: Partial Theory of the Spiral. INDEX. ix PART III: TABLES · • • • • • • 1 12 50 65 83 115 159 185 262 297 313 321 343 367 659 663 ROUTE SURVEYING PART I BASIC PRINCIPLES CHAPTER 1 ROUTE LOCATION 1-1. Introduction. This chapter comprises an outline of the basic considerations affecting the general problem of route- location. The material is non-mathematical, but it is neces- sary for a clear understanding of the purposes served by the technical matters in the remaining chapters of Part I. Specific. practical applications of these basic considerations to the loca- tion of highways, railroads, and other routes of transportation and communication are given in Part II. 1-2. Definition of Route Surveying.-Route surveying includes all field work and requisite calculations (together with maps, profiles, and other drawings) involved in the planning and construction of any route of transportation. If the word transportation be taken to refer not only to the transportation of persons but also to the movement of liquids and gases and to the transmission of power and messages, then route survey- ing is a very broad subject. Among the important engineer- ing structures thus included are: highways and railroads; aqueducts, canals, and flumes; pipe lines for water, sewage, oil, and gas; cableways and belt conveyors; and power, tele- phone, and telegraph transmission lines. Though this definition of route surveying serves to distin- guish the subject from other branches of surveying, it is customary to assume that projects designated as route surveys have considerable magnitude. The setting of a few telephone poles along a highway or the staking out of several blocks of city street scarcely fits the definition. There must be definite termini a considerable distance apart. In such a situation, route surveys are for two purposes: (1) determining the best general route between the termini; (2) fixing the alignment, grades, and other details of the selected route. Sound engi- neering principles require that the route be chosen in such a way that the project may be constructed and operated with the greatest economy and utility. 1 2 ROUTE LOCATION 1-3. Relation of Project to Economics.-Every route-sur- veying project involves economic problems both large and small. By far the most important question is whether or not to construct the project. Essentially, this decision is based on a comparison of the cost of the enterprise with the probable financial returns or social advantages to be expected. In some cases the question can be answered after a careful preliminary study without field work; in others, extensive surveys and cost estimates must first be made. However simple or complex the project may be, it is rarely possible for the engineer alone to answer this basic economic question. To his studies must be added those of the persons responsible for the financial and managerial policies of the organization. In the case of a public project the broad social and political objectives also carry weight. The engineer responsible for conducting route surveys is not solely a technician. In addition to his indispensable aid in solving the larger economic problems, he is continually con- fronted with smaller ones in the field and office. For example, the relatively simple matter of deciding which of several methods is to be used in developing a topographic map of a strip of territory is, basically, an economic problem that in- volves the purpose of the survey, the terrain, and the equip- ment and personnel available. 1-4. Relation of Project to Design.-Design problems in route location are closely related to route surveying. Some matters of design must precede the field work; others are de- pendent on it. For example, in order that the field work for a proposed new highway may be done efficiently, the designers must have chosen-at least tentatively-not only the termini and possible intermediate connections but also such design de- tails as the number of traffic lanes, width of right-of-way, maxi- mum grade, minimum radius of curve, and minimum sight distance. On the other hand, considerable field work must be done before the designers can fix the exact alignment, grade elevations, shoulder widths, and culvert locations to fit the selected standards safely and with the greatest over-all economy. The interrelationship between modern highway surveying and design is outlined in Art. 10-2. ROUTE LOCATION 3 1-5. Basic Factors of Alignment and Grades.-In route location it is usually found that the termini and possible inter- mediate controlling points are at different elevations. More- over, the topography and existing physical features rarely permit a straight location between the points. These circum- stances invariably require the introduction of vertical and horizontal changes in direction; therefore, grades, vertical curves, and horizontal curves are important features of route surveying and design. Curvature is not inherently objectionable. Though a straight line is the shortest distance between two points, it is also the most monotonous-a consideration of some aesthetic importance in the location of scenic highways. The device of curvature gives the designer limitless opportunities to fit a location to the natural swing of the topography in such a way as to be both pleasing and economical. Excessive or poorly designed curvature, however, may introduce serious operating hazards, or may add greatly to the costs of constructing, main- taining, or operating over the route. Steep grades are likely to have the same effects on safety and costs as excessive curvature. It should be emphasized, nevertheless, that problems of curves and grades are ordinarily interrelated. Thus, on highway and railroad location it is often the practice to increase the distance between two fixed points in order to reduce the grade. This process, known as "development," necessarily adds to the total curvature. It is not always a feasible solution, for the added curvature may be more objectionable than the original steep grade. The aim of good location should be the attainment of con- sistent conditions with a proper balance between curvature and grade. This is especially true in highway location, owing to the fact that each vehicle is individually operated and the driver often is unfamiliar with the particular highway. Many highway accidents occur at a point where there is a sudden and misleading variation from the condition of curvature, grade, or sight distance found on an adjacent section of the same high- way. To produce a harmonious balance between curvature and grade, and to do it economically, requires that the engi- neer possess broad experience, mature judgment, and a thorough knowledge of the objectives of the project. 4 ROUTE LOCATION 1-6. Influence of Type of Project.-The type of route to be built between given termini has a decided influence on its location. As an example, the best location for a railroad would not necessarily be the most suitable one for a power- transmission line. A railroad requires a location having fairly flat grades and curves. Moreover, there are usually intermediate controlling points such as major stream and highway crossings, mountain passes, and revenue-producing markets. In contrast, power is transmitted as readily up a vertical cable as along a horizontal one. Grades, therefore, have no significance, and river and highway crossings present no unusual problems. Where changes in direction are needed, they are made at angle towers. Consequently, the alignment is as straight as possible from generating station to sub-station. 1-7. Influence of Terrain. The character of the terrain between termini or major controlling points is apt to impress a characteristic pattern upon a route location, particularly in the case of a highway or a railroad. Terrain may be generally classified as level, rolling, or mountainous. 1 In comparatively level regions the line may be straight for long distances, minor deviations being introduced merely to skirt watercourses, to avoid poor foundations, or possibly to reduce land damages. On an important project, however, the artificial control imposed by following section lines or other political subdivisions should not be permitted to govern. In rolling country the location pattern depends on the orientation of the ridges and valleys with respect to the general direction of the route. Parallel orientation may result in a valley line having flat grades, much curvature, frequent culverts and bridges, and fill in excess of cut; or it may permit a ridge line (from which the word highway originated) on which the alignment and drainage problems are simpler. To connect two such situations, and also in case the ridges are oblique to the general direction of the route, there may be a side-hill line. This has the characteristics of uniformly rising grades, curva- ture fitted to the hillsides, and relatively light, balanced grad- ing. Where the ridges and valleys are approximately at right angles to the general direction of the route, the typical pattern * ROUTE LOCATION 5 which results may be called a cross-drainage line. Here the location of passes through the ridges and the location of cross- ings over the major streams constitute important controlling points between which the line may be of the side-hill type. Generally, a cross-drainage line involves steep grades, heavy grading with alternate cuts and fills, expensive bridges, and curvature considerably less than that on a valley line. Mountainous terrain imposes the severest burden upon the ingenuity of the locating engineer. No simple pattern or set of rules fits all situations. Short sections of each of the types of lines previously described must be inserted as conditions require. "Development," even to the extent of switchbacks and loops, may be the only alternative to expensive tunnel construction. 1-8. Sequence of Field and Office Work. The definition of route surveying stated in Art. 1-2 referred to field work and calculations concerning both planning and construction. Though these operations vary with different organizations, and particularly with the nature and scope of the project, the following is a typical outline of the sequence of field and office work: For Planning (a) The conception of the project, and preliminary office studies regarding its desirability and feasibility. (b) Field reconnaissance of the terrain between the termini, followed by further office studies and recommendation report. (c) Preliminary surveys over one or more locations along the general route recommended in the reconnaissance report. (d) Office studies consisting of preparation of a map from preliminary survey data; projection of a tentative align- ment and profile; and preliminary estimate of quantities and cost. (e) Location survey involving staking of projected location, complete with curves; minor adjustment of alignment and grades; cross-sectioning for more accurate earth- work estimate; ties to property lines and existing im- 6 ROUTE LOCATION provements; and field measurements for design of mis- cellaneous structures. For Construction (f) Office work including preparation of specifications and drawings covering all details of the project; negotiations for acquiring right-of-way or easement; and advertising for bids. (g) Construction surveys including reestablishment of final location; setting reference stakes, grade stakes, and slope stakes for controlling the construction; making periodic measurements and estimates of work done, to serve as a basis for partial payments to the contractor; taking final cross-sections and other measurements of the completed project, to serve as a basis both for final payment and for preparation of "record" plans; and setting right-of-way monuments in accordance with pre- pared legal descriptions. 1-9. Importance of the Reconnaissance.-Second in im- portance to the primary question whether or not to build the project-is the selection of the general route between the termini. This is usually determined by the reconnaissance. The statement by Wellington,* "The reconnaissance must not be of a line, but of an area," is a most apt one. The extent of the area depends, of course, on the type of project and the nature of the terrain, but the area must be broad enough to cover all practicable routes joining the termini. Of particular importance is the need for guarding against the natural tendency to favor an obviously feasible location. It is possible that country which is covered with tangled under- growth, or is otherwise rough for foot travel on reconnaissance, may hide a much better location than is available in more settled or open territory. With regard to the importance of the "art of reconnaissance" and the attitude of the engineer toward it, nowhere will more effective comments be found than in Wellington's classic treatise.* Though written by that author in 1887 for the *Reprinted by permission from Economic Theory of the Location of Rail- ways by A. M. Wellington, published by John Wiley & Sons, Inc., 1915 ROUTE LOCATION 7 instruction of engineers on railroad location, the following statements are timeless in their application to all types of route location: "" there is nothing against which a locating engineer will find it necessary to be more constantly on his guard than the drawing of hasty and unfounded conclusions, especially of an unfavorable character, from apparent evidence wrongly interpreted. If his conclusions on reconnaissance are unduly favorable, there is no great harm done- nothing more at the worst will ensue than an unnecessary amount of surveying; but a hasty conclusion that some line is not feasible, or that further improvements in it cannot be made, or even sometimes—often very absurdly that no other line of any kind exists than the one which has chanced to be discovered these are errors which may have dis- astrous consequences. • • • "On this account, if for no other, the locating engineer should culti- vate what may be called an optimistic habit of mind. He should not allow himself to enter upon his work with the feeling that any country is seriously difficult, but rather that the problem before him is simply to find the line, which undoubtedly exists, and that he can only fail to do so from some blindness or oversight of his own, which it will be his business to guard against. • "For the reason that there is so much danger of radical error in the selection of the lines to be surveyed (or, rather, of the lines not to be examined), it results that THE WORST ERRORS OF LOCATION GENERALLY ORIGINATE IN THE RECONNAISSANCE. This truth once grasped, the greatest of all dangers, over-confidence in one's own infallibility, is removed." If, as often happens, the reconnaissance is entrusted to one engineer, he should have mature experience in the pro- motional, financial, and engineering aspects of similar projects. It is not enough that he be an experienced locating engineer, for such a man is likely to concentrate upon the purely physical possibilities of a route and to overlook the related commercial or social values. Furthermore, he should be able to sense the significance of present trends and their probable effect upon the future utility of the project, or to realize when to seek a specialist's advice in such matters. 1-10. Purposes of Preliminary Surveys.-A preliminary survey follows the general route recommended in the recon- naissance report. The most important purpose of such a survey is to obtain the data for plotting an accurate map of a strip of territory along one or more promising routes. This 8 ROUTE LOCATION map serves as the basis for projecting the final alignment and profile, at least tentatively. Enough data are also obtained from which to make an estimate of earthwork quantities, of the sizes of drainage structures, and needed right-of-way. Taken together, these data permit the compilation of a fairly close cost estimate. Preliminary surveys differ greatly in method and precision. Invariably, however, there is at least one traverse (compass, stadia, or transit-and-tape) which serves as a framework for the topographical details. Elevations along the traverse line and tie measurements to existing physical features are essen- tial. Accurate contours may or may not be needed, the re- quirement depending on the type of the project. Detailed methods of running preliminary surveys adapted to particular types of routes will be found in Chapters 9, 10, and 11. 1-11. Proper Use of Topography.--On new locations of routes over which grades are particularly important, an accurate contour map is indispensable. A relocation of an existing route, such as a highway, may sometimes be made by revising the preliminary survey directly on the ground. This method, termed “field location" or "direct location,” is not recommended for a new line. It is true that some engi- neers seem to have uncanny ability for locating a satisfactory line-though not necessarily the best one-by direct field methods. This natural gift is not to be belittled, but it should be subordinated in difficult terrain to careful office studies aided by a contour map. The primary purpose of the contour map is to serve as a basis for making a "paper location" of the final center line. On such a map the locating engineer is able to scan a large area at once. By graphical methods he can study various locations in a small fraction of the time required for a field party to survey the lines on the ground. Furthermore, he is not subject to the natural optical illusions which often mislead even the most experienced engineer in the field. An added advantage of the contour map, provided it is extensive enough, is to supply visible evidence that no better line has been over- looked. ROUTE LOCATION 9 It is possible, however, to put too much reliance upon map topography. Particularly to be avoided is the temptation to control the work from the office by making such a meticulous paper location, even to the extent of complete notes for stak- ing all curves, that the field work of final location becomes a mere routine of carrying out "instructions from headquarters." No contour map, no matter how accurate it may be, can im- press upon the mind more forcibly than field examination such details as the true significance of length and depth of cuts and fills; the nature of the materials and foundations; susceptibility to slides, snow drifting, and other maintenance difficulties; or the aesthetic values of the projected location. At best, the map facilitates making what might be termed a "semi-final location," which is to be further revised in minor details dur- ing the location survey. 1-12. Function of Location Survey. The purpose of the location survey is to transfer the paper location, complete with curves, to the ground. It is too much to expect that this line on the ground will conform to the paper location in every detail. It is almost certain that there will be minor deviations, resulting usually from errors in the preliminary traverse or in the taking or plotting of the topography. An exact agree- ment does not assure the excellence of the location; it merely proves the geometric accuracy of the field and office work. Consequently, regardless of the "fit" with the paper location, the engineer should be constantly on watch for opportunities to make those minor adjustments in alignment or grades which only close observation of the field conditions will reveal. When staked, the final location is usually cross-sectioned for closer determination of earthwork quantities. In addition, tie measurements to property lines are made to serve for pre- paring right-of-way descriptions, and all necessary field data are obtained to permit the detailed design of miscellaneous structures. 1-13. Relation of Surveying to Engineering. Before we leave these basic considerations to study the technical aspects of route surveying, it should be pointed out that surveying and mapping, as ordinarily practiced, are not engineering; they are merely methods of obtaining and portraying data needed as 10 ROUTE LOCATION a prelude to the design and construction of engineering works. During the study of the chapters which follow, it will be natural for the student to concentrate on the geometrical and instrumental techniques. However, the course in Route Sur- veying will not reach its potential value unless it is more than drill in field and office practice. The student, stimulated by the instructor's examples and illustrations, should attempt to look beyond the technical details and gain some insight into the factors which lead to the conception of a particular project. Knowledge of those factors will give him a better appreciation of the engineering surveys-their planning, the controlling specifications, and the usefulness of the data to the designers. To be of the greatest usefulness, without being unduly costly, the surveys, maps, and computations should be only as complete and accurate as needed for the ultimate purpose. For some purposes the utmost in accuracy is required. For others, extreme niceties are too costly and time-consuming; they may be replaced by approximate methods and short cuts. As an example, much time is often wasted in "exact" calcula- tion of yardage estimates prior to construction, only to find that shrinkage, compaction, overbreak, or stripping allowances change the estimated values by large amounts. This is not to imply that grading calculations may always be done by approximate methods. Accuracy is always required, for example, in determination of yardage for payment to con- tractors. One trait of a good engineer is his judgment of the degree of precision required in obtaining data and computing values for use. Surveying and mapping are essential prerequisites to engi- neering design for mass transportation. Despite the growing file of good maps, the rapid modernization of our transporta- tion systems is creating expanding demands for surveying and mapping services. In the field of highway engineering alone, the total distance covered by surveys and resurveys for a re- cent year was estimated to reach 26,000 miles. In designing a large transportation project, extensive surveying operations are involved in the early reconnaissance, in the detailed pre- liminary and location surveys, and in all the work leading to the preparation of topographic maps, profiles, cross sections, ROUTE LOCATION 11 and other working drawings. If to these there are added the construction layout and "as-built" record surveys, it is apparent that a large portion of the total engineering costs is absorbed by surveying and mapping. In contrast to the leisurely pace of highway construction in the early part of this century, wherein the ordinary piece- meal survey served the purpose, we now have vast and costly projects. Noteworthy among these are the heavily-traveled California Freeways and the toll highways in Massachusetts, Connecticut, New York, New Jersey, Pennsylvania, Ohio, Indiana, Illinois, Kansas, and Oklahoma. Even these are dwarfed by the Interstate Highway System now under con- struction. Already conceived is the proposed Mississippi River Parkway, for which map reconnaissance of 50,000 square miles has yielded over 8,000 miles of alternate routes. Survey and mapping methods must be designed to keep pace with the advanced design and construction techniques used on such vast projects. Applications of photogrammetry (Chapter 12) and auto- mation (Chapter 13) represent important advances in route surveying and design. In addition to reducing costs, photo- grammetry and automation save time-a factor that can substantially reduce interest charges during the construction of a major project. In fitting surveying and mapping into the plans for a trans- portation project, saving in time by use of short-cut methods should not be achieved at the expense of reduction in the ultimate required accuracy. Time saved by short cuts in control surveys, for example, may be lost many times over in transferring the paper location to the ground or in monument- ing the right of way. During construction, one field change caused by poor original surveys may delay the work longer than the time saved earlier by the short-cut survey methods. By keeping in mind the ultimate accuracies required for the various phases of a project and adopting well-planned, skill- fully executed methods of surveying and mapping, even at the expense of some extra time, the whole project will have a firmer base around which the design and construction operations can be planned. This kind of surveying and mapping is true engineering. SIMPLE CURVES 2-1. Foreword.-Every route has a calculable geometric alignment. The form may be a simple series of straight lines and angles, as in the case of a power transmission line, or it may be an intricate combination of straight lines and curves. The primary purpose of any curve is to provide the required change in direction in the form best suited to the operating characteristics. Secondary considerations are reasonable economy in construction cost and ease of staking the curve in the field. Direction of (T.C.) A Back Tangent survey (P.I.) V CHAPTER 2 T R K 90° CM Kźl I E L.C. T 12 90° Ź 1 → /R O Fig. 2-1. Simple-curve layout B(C.T.) Forward Tangent Horizontal curves are usually arcs of circles or of spirals. Generally, the circular arc makes up the greater portion of a curve. The arcs of varying radii, or spirals, provide a gradual transition between the circular arc and the tangents. SIMPLE CURVES 13 Vertical curves joining straight sections of grade line are invariably parabolic arcs. When vertical and horizontal curves overlap, their study is simplified by considering them separately. A 2-2. Definitions and Notation.-A simple curve consists of a circular arc tangent to two straight sections of a route. Though spiral transitions are commonly used at the ends of circular arcs on modern highways and railroads, a thorough knowledge of the simple curve-its basic geometry, calcula- tion, and method of staking-is necessary for an understand- ing of more complex curve problems. T R ~I~ Fig. 2-1(a) E OK 10 There is no universally accepted notation. That shown in Fig. 2-1, however, is commonly used in recent practice. (In this diagram, parts of the curve layout frequently surveyed in the field are drawn as solid lines, whereas geometric con- struction lines and curve parts infrequently surveyed are shown dotted.) The intersection of the tangents at V is called the vertex, or point of intersection, abbreviated P.I. 14 SIMPLE CURVES The deflection angle between the tangents is denoted by I; it is equal to the central angle of the curve. For a survey progressing in the direction indicated, the tangent up to the P.I. is called the initial tangent, or back tangent; that beyond the P.I. is the forward tangent. The beginning of the circular arc at A is known as the T.C. (tangent to curve); the end at B, as the C.T. (curve to tangent). In a simple curve the T.C. and the C.T. are equidistant from the P.I. The T.C. is sometimes designated as the P.C. (point of curve) or B.C. (beginning of curve). Corresponding terms for the C.T. are P.T. (point of tangent) and E.C. (end of curve). Certain lines on the curve layout are very useful in calcula- tions or for field work. Those shown in Fig. 2-1 are: the dis- tance from the P.I. to the T.C. (or C.T.), known as the tangent distance, T; the distance from the P.I. to the mid-point K of the curve, called the external distance, E; and the radius of the circular arc, designated by R. Also shown, though of lesser importance, are the long chord, L.C., which is the distance be- tween the T.C. and the C.T.; and the middle ordinate, M, or the distance from the mid-point C of the long chord to the mid-point K of the curve. 2-3. General Formulas. Two trigonometric functions, used rarely in plane surveying, are especially convenient in route surveying formulas. These are the versed sine (vers) and the external secant (exsec). By definition, for any angle A, vers A = 1−cosA and exsec A =sec A-1. (The student should study the graphical signifi- cance of these relations shown on page 637). From Fig. 2-1 the following basic formulas may be written practically by inspection: T-R tan I E=R exsec I L.C. 2 R sin I M=R vers I (2−1) (2-2) (2–3) (2-4) Some other useful expressions may be derived by combining the basic formulas and using trigonometric conversions. SIMPLE CURVES 15 However, their derivation directly from sketches will illustrate further interesting properties of the simple curve. A portion of Fig. 2-1 is reproduced in Fig. 2-1(a). If arc VA' is drawn with radius OV(A' being on OA produced), the triangle A'OV will be isosceles and angle A' must equal 90° - I. Therefore the angle at V in the right triangle A'AV must equal I, from which E = T tan I (2-5) In Fig. 2-1 the circle inscribed within triangle ABV must have its radius equal to M and its center located at point K. From this fact it follows that and Other useful relations are - Full sta. 100 ft 100 Do R\ Dc 90 M = E cos I E=R tan I tan I M=R(1-cos I) * / Full sta. Full sta. 100 ft C KDax 1/ ४ (a) (b) Fig. 2-2. Definitions of degree of curve /R (2-6) (2-7) (2-8) Full sta. 2-4. Degree of Curve.-The curvature of a circular arc is perfectly defined by its radius. However, where the radius is long, as on modern highway and railroad alignment, the 16 SIMPLE CURVES center of the curve is inaccessible or remote. In this case the radius is valueless for surveying operations, though it is still needed in certain computations; it must be replaced by a different characteristic of the curve which is directly useful in the field. The characteristic commonly used is known as the degree of curve, D. Though several definitions of degree of curve may be found, all are based upon the fact that a circle is a curve having a constant angular change in direction per unit of distance. The two most widely used are the chord definition and the arc definition of D. According to the chord definition the degree of curve is the central angle subtended by a 100-foot chord. It is denoted by De, as indicated in Fig. 2–2(a). According to the arc definition the degree of curve is the central angle subtended by a 100-foot arc. It is denoted by Da, as indicated in Fig. 2-2(b). By inspection of Fig. 2–2(a), it is seen that In Fig. 2-2(b), from which sin Dc Da:100=360°:2 π R Da= - = 50 R Ꭰ (2-10) It is rarely necessary to use equation 2-9 or equation 2-10. When D is given, the value of R or log R should be taken from Table I. For approximate calculations using either defini- tion of D, (2-11) Approx. Neither definition of D is perfectly adapted to all phases of calculation and field work. Both involve slight approxima- tions when doing field work the usual way, though high precision is obtainable by introducing certain small corrections. The chord definition has been used almost invariably by the railroads. It is sometimes called the "railroad definition” of D. On the other hand, highway practice has tended toward greater use of the arc definition. However, modern standards of alignment for high-speed operation over both railroads and 5,729.58 R (2-9) 5,730 Ꭱ SIMPLE CURVES 17 highways have practically reduced to an academic matter all controversy over the merits of a particular definition. A 2° curve computed and staked according to either defini- tion is substantially the same curve on the ground. Never- theless, it will usually be necessary for the engineer to conform to the definition of D used by the organization with which he is associated. Moreover, he may frequently be required to use the other definition of D, as in performing calculations for fitting a relocation to existing alignment. For these reasons the theoretical treatment in this book covers both definitions. The tables in Part III are exceptionally complete, as they are designed to simplify curve calculations based upon either definition of D. I Sta. 16+00 d D iy // لا Sta. 16+50 Fig. 2-3. Subchords Sta. 16+80 Sta. 17+00 2-5. Measurements on Curves.-Regardless of whether the chord definition or the arc definition of D is used, measure- ments along a curve must be made by taping a series of chords. An isolated curve may be staked conveniently by dividing the central angle into an equal number of parts. The resulting chords with their directions determined by any appropriate method then form an inscribed polygon of equal sides. How- ever, on most route surveys the curves are parts of the con- 18 SIMPLE CURVES tinuous alignment over which it is convenient to carry the regular survey stationing without a break. In consequence, a curve rarely begins or ends at a whole station; accordingly, chords less than 100 feet long, called subchords, will adjoin the T.C. and the C.T. The methods of treating these sub- chords are responsible for the slight approximations or correc- tions mentioned in Art. 2-4. Fig. 2–3 represents a portion of a circular arc having certain stakes located thereon. For the chord definition of D, sta- tions 16 and 17 will be exactly 100 feet apart as measured along the chord joining those stations. For the arc definition, however, the stations will be slightly closer together since, by definition, they are separated by exactly 100 feet as measured around the arc. It is frequently necessary to set stakes on a curve at closer intervals than at whole stations, as at sta. 16+50, for example. The only logical position for this stake is exactly midway be- tween stations 16 and 17, regardless of the definition of D. Thus, sta. 16+50 would be separated from the adjacent whole stations by chords which are of equal length but are not 50 feet long. They would be slightly greater or slightly less than 50 feet, the actual length depending on the definition of D. Such chords are loosely referred to as “50-foot subchords.” On precise work, however, it is advisable to use a more definite terminology. All uncertainty is eliminated by calling the actual length of a chord its true length, and designating as the nominal length the value found by taking the difference between the stationing at the ends of the chord. The nominal length may be further illustrated by imagining the arc in Fig. 2-3 between stations 16 and 17 to be divided into exactly 100 equal parts. Theoretically, sta. 16+80 is at the 80th division, and it is joined to sta. 16 by an 80-foot nominal sub- chord; but it is located in the field by taping a true subchord of 80 feet from sta. 16. A summary on lengths of subchords follows: For chord definition of D-True subchords are longer than nominal subchords. For arc definition of D-True subchords are shorter than nominal subchords; nominal subchords are equal to true lengths of arc. SIMPLE CURVES 19 If d, Fig. 2-3, is the central angle subtended by any nominal subchord cn, then d: D=cn: 100, or The true subchord is or d= I). CnD 100 ct=2 R sin d (2-13) Note the analogy of formula 2-13 to formula 2-3. True subchords are given in Table II. 2-6. Length of Curve. The length of curve, L, is the nominal distance around the curve. It equals the difference between the stationing of the C.T. and the T.C. For either definition of D, L:100=I:D L (2-12) 1001 D (2-14) For the arc definition of D, formula 2-14 obviously gives the true length of the total circular arc; whereas, for the chord definition, it gives the total length of the 100-foot chords and nominal subchords between the T.C. and C.T. In the latter case the true length of arc is slightly greater than L. If needed, it may be obtained theoretically from the relation L= but a more practical method is to use Table II 57.2958' or Table VI. Example.—Given: I=34°14′; D.=9°; R=637.275 (Table 34°=0.593412 rad. (Table VI) 14'=0.004072 rad. (Table VI) Sum=0.597484 rad. =380.76 For check of above by Table II see example on page 20. 2–7. Use of Tables.-The formulas developed thus far may be solved with the aid of tables of logarithmic or natural trigonometric functions. However, certain calculations are expedited, or even eliminated, by using special curve tables. The example on page 20, given in outline form, illustrates the use of some of the tables given in Part III. True length of arc =0.597484X637.275 20 SIMPLE CURVES Example.-Given: I=34°14′; D=9°. For chord definition of D T=1764.5÷÷9 = 196.06 + 0.19 T=196.25 E=265.5÷9 = 29.50 + 0.03 E=29.53 L.C.=2R sin I Result, using Tables I and XX (or XXII): L.C.=375.12 M = R vers 1 Result, using Tables I and XX (or XXIII): M=28.23 (Table VIII) (Table IX) 1007 100X34.2333 L= D 9 or, to avoid decimals of de- grees, convert I and D to minutes, giving L: 205,400 540 100 50 82.48 (Table VIII) (Table X) True For true length of arc (if needed) use arc for 1 sta. =100.103 (Table II). Then, excess arc in L stations 0.103×3.80=0.39. 100 50.04 82.51 Therefore, true arc length- 380.37+0.39 = 380.76 Examples of true subchords Nom- inal 380.37 = (Table II) (Table III) For arc definition of D T=1764.5÷9 (Table VIII) = 196.06 E=265.5÷9 = 29.50 L.C.=2R sin I Result, using Tables I and XX (or XXII): L.C.=374.74 M=R vers I Result, using Tables I and XX (or XXIII): M=28.20 (Table VIII) L= ********** 1001 Ꭰ Compute L as shown in ad- jacent column, giving L=380.37 100 50 82.48 From definition of Da, the true length of arc equals L as computed above. Examples of true subchords Nom- inal True 99.90 49.99 82.42 (Table II) (Table II) (Table IV) SIMPLE CURVES 21 The example on page 20 not only shows the utility of certain tables but also gives an idea of the effect of using different definitions of D. Whether the differences between the com- puted values of corresponding parts of the curve are in- significant or important depends on the circumstances. If the curve is one staked on semi-final location prior to grading, they are probably unimportant; if the curve is staked on final location, for setting track centers or forms for concrete pav- ing, the differences are large enough to warrant close adherence to a particular definition of D in all calculations. On modern high-speed alignment where D is 3° or less, the two definitions of D give practically the same results. 2-8. Locating the T.C. and C.T.-In locating a curve on a projected alignment, the tangents are run to an intersection at the P.I., the angle I is measured, and the stationing is carried forward along the back tangent as far as the P.I. (see Art. 7-3 for a description of the process when the P.I. is inaccessible). The degree of curve will usually have been selected from the paper-location study. If it has not been, a suitable value may be determined by measuring the approxi- mate E (or T′) needed to give a good fit with the topography. The tabulated E (or T) for a 1° curve (Table VIII) divided by the approximate E (or T) gives a value of D which will fit the field conditions. Usually this D is rounded off to a figure convenient for calculation, and of course it must be within the limiting specifications for the project. The values of T and L are next computed, and from them the stationing of the T.C. and C.T. are determined as follows: Sta. P.I.-T=Sta. T.C. Sta. T.C.+L (nominal) = Sta. C.T. For staking and checking the curve it is necessary to set hubs at the T.C. and the C.T. This is done by taping the calculated T backward and forward from the P.I. Sometimes it is more convenient to set the T.C. by taping from a tacked hub (P.O.T.) on the back tangent. In case the curve is long or the terrain is difficult for taping, it is also advisable to set a check hub at the mid-point of the curve by taping the exact value of E from the P.I. along the bisector of the angle. 22 SIMPLE CURVES 2-9. Deflection-Angle Method. The convenient deflec- tion-angle method of locating points on a simple curve is based on a proposition in geometry: an angle formed by a tangent and a chord is measured by one-half the intercepted arc. In Fig. 2-4, a, b, and c represent 100-ft stations on a portion of a simple curve, a being less than one station beyond the T.C. By definition, each central angle between full stations is equal to D; the angle subtended by the first subchord is d₁. The angles VAa, VAb, and VAC are known as the deflection angles, or total deflections, to the stations on the curve. From the foregoing proposition they are equal to one-half the corre- sponding central angles. Thus, the deflection angle to locate c from a set-up at the T.C. is }(d₁+2D). The subdeflection for the fractional station is d₁. Once this first subdeflection has been computed, the total deflections to succeeding points are found by adding the inscribed angles aAb, bAc, ... . Since an inscribed angle equals one-half its central angle, the total deflections to full stations are found by adding successive increments of D. A second subchord c2 falls between the C.T. and the preceding full station. Its subdeflection d½ should be added to the total deflection for the last full station on the curve. If the sum equals 1, the arithmetic is checked. In practice, subdeflections are usually small and are best computed in minutes from either of the following formulas: d (in minutes)=0.3 cn D° (2-15) d (in minutes) = cn X defl. per ft* (2-16) The distances taped in connection with the deflection angles are not the rays from the T.C. to the various points on the curve. Theoretically they are the successive true chords from point to point, starting at the T.C. Therefore, once the deflec- tion angles have been figured, there is practically no added computation. However, the non-coincidence of tape and line of sight may be slightly confusing in the field work. *In formula 2-16, defl. per ft means "deflection in minutes per foot of nominal chord" (or per foot of station). Thus, if D=9°=540', }D=270′ and defl. per ft=2.7'. Values of defl. per ft are listed in Table I. SIMPLE CURVES 23 Example. Given: Sta. P.I.=24+63.8; I=34°14'. Stakes to be set for semi-final highway location; curve to pass approxi- mately 30 ft inside vertex; stakes needed at full stations and half-stations; distances to tenths and deflections to nearest minute adequate. Use arc definition of D. 265.5 Approx. Da= =8.85° (Table VIII). Round off to 9° 30 curve with defl. per ft=2.7'. The problem now becomes that in Art. 2-7, from which T=196.1, L=380.4, and E=29.5. A (T.C.) To V (PI) | kd₁ D | т Sta. P.I.=24+63.8 -T= 1+96.1 Sta.T.C.=22+67.7 Sta.C.T.=26+48.1 ---|-· * D 上 ​Fig. 2–4. Deflection-angle method b C₁ = 32.3 +L= 3+80.4 23 to 26=300.0 ź (d₁+2D) d₁=2.7×32.3= 1°27′ DX 3 =13°30′ C₂ = 48.1 d₂=2.7×48.1= 2°10' Sum=380.4 = L (check) Sum=17°07' = 10 (check) There follows a typical form for setting up the notes on the left-hand page of the field book. Notes run upward in order to simplify orienting sketches on the right-hand page, where the center line is used to represent the survey line. 24 SIMPLE CURVES 27 26 25 24 23 22 Sta. +50 +50 Point +50 Form of notes for simple curve Total Defl. Calc. Bearing +50 Da=9° rt. +48.1 OC.T. 17°07′ N50°41′E N50°E P.I.=24+63.8 14°57' T=196.1 12°42' L=380.4 E = 29.5 10°27' 8°12' Defl. per ft 5°57' = 2.7' 3°42' 1°27' +67.7 OT.C. 0°00′ N16°27′E | N161°E +50 Mag. Bearing Set-up at sta. 23+50 Curve Data 2-10. Transit Set-ups on Curve.-In the preceding descrip- tion the implication is that the entire curve is staked from a set-up at the T.C. This is often true. However, there are T.C. 23 23+50 I=34°14' 24 To P.I. Tangent 342 0°00" -5°57′ Fig. 2-5. Moving up on curve circumstances (see Art. 2-11) which make this procedure im- practicable or even impossible. Should such be the case, deflections are computed as though for a set-up at the T.C. By SIMPLE CURVES 25 proper manipulation of the transit it can be set up at any staked point on the curve, and the staking can then continue from that set-up without altering the previously computed deflections. Fig. 2-5 shows the first portion of the curve calculated in Art. 2-9. It is assumed that the curve has been staked as far as sta. 23+50 from a set-up at the T.C., and that condi- tions make it difficult to sight beyond from that set-up. If, with the transit moved to sta. 23+50, the vernier is set to 0º and the telescope is inverted and then backsighted to the T.C. and plunged, the condition will be as represented by the dotted line from the T.C. through sta. 23+50. If now the upper- motion is loosened and the telescope is turned clockwise, the line of sight will be on the local tangent when the vernier reads 3°42′ and will be in the correct direction for locating sta. 24 when the vernier reads 5°57'. These facts follow directly from the geometric principle noted at the beginning of Art. 2-9. An extension of Fig. 2-5 would show that, for a set-up at sta. 25 with the transit to be oriented by a backsight to the previous set-up at sta. 23+50, the vernier should first be set at 3°42′ on the correct side of 0°. Backsighting with the telescope reversed and then plunging would permit sighting the remaining points on the curve by using the total deflections opposite those stations in the transit notes. No added calcu- lations are required if this method is followed; the only record of the set-ups is the symbol O in the Point column of the notes on page 24. The preceding description may be summarized in a rule-of- thumb: To move up on curve and retain original notes, occupy any station and backsight to any other station with the vernier set to the total deflection of the station-sighted. Occasionally it may be desired to have the vernier read 0° when the line of sight is on the local tangent to the curve at a new set-up, as at the C.C. of a compound curve (see Art. 3-12). To do this the vernier must be set at the difference between the tabulated deflections for station sighted and station 26 SIMPLE CURVES occupied.* As in applying the rule-of-thumb, the surveyor must be careful to set the vernier reading for the backṣight on the correct side of 0°. 2-11. Comments on Field Work.-Transit set-ups for staking the curve must be started at the T.C. or C.T. For short curves which are entirely visible from one set-up, it is preferable to occupy the C.T. and to tape the chords toward it from the T.C. By so doing, the longer sights are taken before possible settlement of the transit occurs. Moreover, one set- up is eliminated, for the transit is then in position for lining in the stakes along the forward tangent. For a set-up at the C.T., the transit is oriented by backsighting to the T.C. with the vernier reading 0° or to the P.I. with the vernier set at 1. In either case it is wise to check the angle to the other point, in order to verify the equality of the tangent distances. In case the field conditions require one or more set-ups on the curve, it is good practice to occupy the T.C. first and to tape in a forward direction, moving up the transit according to the rule-of-thumb stated in Art. 2-10. The final portion of the curve is best located by setting up at the C.T. and tap- ing backward to the previous set-up. This practice insures good tangencies at the T.C. and C.T., and throws any slight error into the curve where it is more easily adjusted. • A long curve, or one having a large central angle, may justify intermediate set-ups even though the entire curve is visible from either end. The consideration here is the required degree of accuracy in setting the points on the curve. When the tape and the line of sight intersect at a large angle, it is possible for the chainman to swing one end of the tape through a certain distance without detection by the transitman, thus throwing off the position of the point and introducing an accumulative taping error. The amount of this swing-and its relative importance on the particular work-is best deter- *When this book is used as a textbook for a course in Route Surveying, it is recommended that students be given the opportunity to compute and stake at least one simple curve at this point in their study. Doing so will help to fix the principles more firmly in mind and contribute toward a better appreciation of the practical suggestions which follow. SIMPLE CURVES 27 mined by trial in the field. As a general guide, the deflection angle from the transit to the taping point should be kept under 25° or 30°. Field checks should be made at every convenient oppor- tunity. In locating the T.C. and the C.T., it is good insur- ance to double-chain the tangent distances, at least until the chainmen have demonstrated the reliability of their first measurements. Less time will be lost if the check chaining is done while curve deflections are being computed. Setting a check point at the middle of the curve may also be advisable (see Art. 2–8). sight b རིམ་དུ་གྱུར་པས་ཚོགས་པ་ཡོད། sight C sight m Fig. 2-6. Check of stake positions d Before definitely setting each stake on the curve, the head chainman should sight to the second stake back and verify the middle ordinate m to the intervening stake. (See Fig. 2–6.) A sudden change in middle ordinate (for equidistant points on the curve) will reveal a mistake in setting off the deflection angle. Otherwise, such an error might go undetected at the time or even fail to show up in the final closing check if the curve is flat. The final check occurs at the extremity of the last chord taped. This may be at the T.C., at the C.T., or at any inter- mediate stake previously set. The best method is to mark an independent point by measuring the required distance and deflection from the final set-up. The distance between this point and its theoretical equivalent at the stake previously set is a direct measure of the error of closure in the traverse around the tangent distances and curve chords. This error should be consistent with the survey methods, the difficulty of the terrain, and the requirements of the project. Chord lengths used in running curves depend principally on the degree of curve and on the purpose of the survey. On 28 SIMPLE CURVES flat curves in easy terrain, full stations suffice for the field work and for most construction purposes. Thus, for De true chords between full stations are exactly 100 feet long, and the end subchords may be considered equal to their nominal lengths (see Tables II and III). For Da the end subchords may also be taken equal to their nominal (arc) lengths, but the chord for each of a long series of full stations may require a slight correction in order to reduce the systematic error in taping (see Tables II and IV). Stake... ---Flag -sight- Pin Fig. 2-7. Setting station stakes On sharp curves, or in difficult terrain requiring frequent cross-sections, additional points between full stations are needed. Whether it is necessary to use true subchords instead of nominal subchords depends on the accuracy required. Table II shows at a glance the effect of the sharpness of the curve on the true lengths of nominal full chords and sub- chords. When Table II is used in conjunction with Tables III and IV, any degree of accuracy is readily obtainable. Study of Table II shows in general that chord corrections are unneces- sary on curves flatter than about 5°. On sharper chord-defini- tion curves, corrections may be eliminated by using 100-ft chords; whereas, on sharper arc-definition curves, shorter nominal subchords serve the same purpose. Stakes are set on curves where needed for subsequent field work or for controlling construction. A tacked hub, with a guard stake designating the point and stationing, is set at each transit station. Important points, such as the P.I., T.C., and C.T., are carefully referenced. Points not occupied by the SIMPLE CURVES 29 transit are identified by station stakes, which are driven and marked as in profile leveling. Station stakes used for cross-sectioning prior to construc- tion need not be individually centered by the transit. Doing this is of no practical value, and it wastes time if the stakes are hidden by grass or brush. A rapid method is shown in Fig. 2-7. The head chainman first obtains line from the transitman and then sets a range pole (flag) off line about the width of a stake and a few tenths of a foot beyond the station. He next verifies the middle ordinate (see Fig. 2-6). Then he stretches the tape tangent to the range pole and sets a chain- ing pin at the exact distance. Finally, he uses the point of the range pole to make a hole beside and slightly behind the point where the pin enters the ground, and proceeds to the next station with the pole and tape. The stakeman imme- diately drives a marked station stake into the hole at the pin, at the same time keeping the moving tape to one side with his foot. The pin should not be disturbed in the process; it remains in place until pulled by the rear chainman after the next forward pin is set. By following the foregoing method on tangents and flat curves, station stakes will always be close enough in both line and distance. On sharp curves where the angle between tape and line of sight is large, it may be slightly better to set the range pole practically on the line of sight. In setting points on curves the head chainman can expedite the work by placing himself quickly on line at the point to be set. One method of doing this, especially suited to open country, is for the head chainman to range forward the proper chord distance along a line through the last two stakes, plac- ing himself in position as at d' in Fig. 2-6. By then pacing inward the known chord-offset distance (Art. 2-14), he will be in approximately the correct position for setting the re- quired point at d. With experience the head chainman will invariably be in the field of view by the time the transitman sets off the deflection angle and sights. Many variations are possible in the technique described. The range pole may be dispensed with for short sights in open country. Another device used where frequent plus 30 SIMPLE CURVES points are required is to set those station stakes directly at the proper division on the tape and to move the tape forward at each full station. The important factors to consider are speed, accuracy consistent with the needs, and avoidance of taping errors. In all cases, carrying the taping forward by chaining from pin to pin is advisable. After grading, all points on curves which are set to control construction details must be more carefully centered than in the methods just described. On pavements or in other locations where stakes cannot be driven, the points are chiseled or marked with keel, or a nail may be driven flush through a small square of red cloth. Guard stakes marked with the stationing are set at a convenient off- set distance to one side. and Minor obstacles to setting calculated points on curves are often met in running location prior to clearing or grading. These should not be permitted to delay the field work. T.C. To P.I. 23 +50 +90 24 (Omit) +20 -Tree Fig. 2-8. Passing minor obstacle Fig. 2-8 shows another sketch of the first portion of the curve calculated in Art. 2-9. If the line of sight to sta. 24 were to hit a large tree, for example, it could be backed off to the left of the tree for setting a stake at any convenient plus point. Thus, if sta. 23+90 were in the clear, its deflection would be 40×2.7' greater than that just used to set sta. 23+50. The calculations-40X2.7' 108'1°48' and 3°42′+1°48′= 5°30′-may be made mentally in a few seconds. After the station stake at 23+90 is set, another new plus point to the right of the tree (such as 24+20) could be staked by following a similar process; or else the taping could proceed from sta. 23+90 directly to the next calculated point at sta. 24+50. SIMPLE CURVES 31 A minor obstacle on the curve itself (such as a large boulder at sta. 24) could be by-passed by the same method. Major obstacles are treated in Chapter 7. This reduces to 2-12. Even-Radius Curves.-Some organizations, includ- ing a few highway departments, do not use the degree of curve designation either in calculations or in field work. Instead, a curve is chosen on the basis of its radius, which usually is a round number. Deflections are calculated theoretically from the following proportion: deflection: arc length=360°:2 π R defl. (in minutes) 1,718.873 R = Xarc length (2-17) This method has the advantage that radii may be selected which are convenient for calculating curve parts. The radius would also mean more to the average person than the degree, should it become the practice to post warning values of R at the approaches to highway curves. The calculation of deflections, however, is much less simple than with a rounded value of D, and their fractional values are inconvenient in the field. The process of calculating and staking these “even-radius curves" is expedited by use of Tables V and VI. The latter table is used to compute L when I and R are given. Other curve parts are found from the usual formulas (see Art. 2-3). Table V gives directly most of the data concerning deflections and chord lengths needed in the field. Subchord deflections are readily computed from the tabulated deflections per foot. 2-13. Metric Curves.-In countries having the metric system, distances are usually measured with a 20-meter tape, and a "station" is nominally a distance of 10 meters. On route surveys either the radius in meters or the degree of curve may be used in selecting and staking curves. However, the customary metric "degree of curve" Dm differs from those already defined not only in unit of measurement but in angle. and length of chord (or arc) as well. Specifically, Dm is the 32 SIMPLE CURVES deflection angle for a chord (or arc) of 20 meters. Thus, by analogy from equations 2-9 and 2-10, sin Dm (chord def.) and Dm (arc def.) 572.958 Rm Also, by analogy from equation 2-14, Im (2-20) It is not necessary to use special metric-system tables to compute and stake metric curves. The foregoing simple rela- tions used in connection with the tables in Part III of this book will enable an engineer to handle any metric-curve prob- lem. If Table VIII is used, for example, the tangents and externals for a 1° metric curve are one-tenth the tabulated values (for the same central angle). This fact follows from equations 2-10 and 2–19. For a quick comparison between metric and foot curves, it is well to remember that for curves of the same radius the ratio between D and Dm is about 3 to 1 (actually 3.048 to 1). In other words, a curve of given Dm is about 3 times as sharp as one having the same numerical value of D. = 107 Dm ********** 10 Rm (a) Chord offsets (b) Middle ordinates (c) Tangent offsets (d) Ordinates from a long chord (2-18) (2-19) 2-14. Staking by Offsets.-There is no good substitute for the deflection-angle method when points must be set quickly and accurately on long-radius curves. It is mathematically possible, however, to devise several other methods based either upon angles from the P.I. or upon offsets. The former basis is rarely practicable, but there are occasions where an offset method is very useful. The offset methods* are known as: *Following the derivation of some needed mathematical relations, only the chord-offset method is described in detail. Abbreviated descriptions of the remaining methods are enough to serve as a basis for applying them. SIMPLE CURVES 33 The chord offset, tangent offset, and middle ordinate for a full station are designated by C.O., T.O., and M.O.; cor- responding terms for any other distance are c.o., t, and m. The true chord for a full station is 100 feet or C, the length de- pending on the definition of D. Tangent and C or 100'- KD |ŹD 1 C or 100' D Also, by similar triangles, Hence, M.O. LR 3- Fig. 2-9. Offsets for full station From Fig. 2-9 the following exact relations may be written practically by inspection: C=2 R sin Da C.O. (chord def.) = 200 sin De C.O. (arc def.) = 2 C sin Da T.O. = C.O. M.O.= R vers D C.O.:100 (or C) = 100 (or C): R. 1002 R C.O. (chord def.): ______ C.O. (arc def.) = = C2 R C.O. Four useful approximate relations are: M.O. = C.O. C.O.=13 D T.O. (2-21) (2-22) (2-23) (2–24) (2-25) (2–26) (2–27) (2-28) Approx. (2–29) Approx. 34 SIMPLE CURVES 7 t = s² D (s is chord in stations) m (in inches for a 62-ft chord) =D (2-30) Approx. (2-31) Approx. The approximate 8:4:1 ratio of the chord offset, tangent offset, and middle ordinate is worth memorizing (mnemonic: "eight for one"). Offsets for any subchord (or subarc) may be found by first determining the values for a full station and then applying the principle that c.o., t, and m are proportional to the squares of the subchords (or subarcs). They may also be found from the exact relations: $1 A C.O. = C2 t R C2 2R m = R vers d (2-33) (2-34) Table I contains values of certain of the full-station offsets. The explanatory notes preceding that table show its useful- ness in obtaining any offsets accurately. Chord offsets, sometimes called "deflection distances," provide a means of setting station stakes rapidly when a transit is not available. If the tapeman sights past his plumb- bob cord, surprising accuracy is possible. It is invariably adequate for surveys made prior to clearing and grading. C1 T.C. C₂ 2 た ​Bi im --- (2-32) 1 Fig. 2-10. Staking by offsets To P.I C.O. SIMPLE CURVES 35 In Fig. 2-10 (curvature greatly exaggerated) the P.I. and the tangent points are assumed to have been set by the usual methods. If the transitman and some of the field party now proceed along the forward tangent for purposes of setting stakes or measuring the angle I for the next curve, three men (or even two) can set the station stakes on the curve left behind. The procedure follows: Knowing the stationing of the T.C., calculate the subchords c₁ and c₂ to the adjacent full stations at A and B (sta. A is on the curve produced backward). Then calculate t₁ and t2, which are the tangent offsets for the sub- chords. The field work may now be started after range poles have been set at convenient points on the tangent. Establish a temporary point at A by the "swing offset" method. Locate the station stake at B similarly. Range the line AB ahead a full-station chord to C', and locate the next station stake at C by the C.O. Continue around the curve by full-chord offsets (obviously, half-stations or quarter-stations could be used instead) until the full station preceding the C.T. has been set. Make the final check by measuring the last subchord and the swing offset to the forward tangent; check them against their theoretical values. In an exceptional situation, a curve may be selected to fit the topography and may be completely staked without use of the transit or tables of any kind; it is assumed that the prin- ciples are understood and that the approximate relations 2–29 and 2-30 have been memorized. For example, suppose that the back tangent has been partially cleared, but the P.I. has not been established and D has not been chosen. To run the curve, set the T.C. at a point fitting the topography, tape toward the P.I. a certain distance (possibly 200 feet), take a right angle by eye, and measure t to a suitable random point on the tentative curve. For all practical purposes the chord dis- tance c from this point to the T.C. may be taken equal to the distance along the tangent unless t is greater than 20 per cent of the tangent measurement. Now compute D from the relation 2-30, and round off the result to a convenient value. Obtain the C.O. from 2-29, compute the values of t₁ and të for the subchords at the T.C., and stake the complete curve by chord offsets as previously described. No check can be made 36 SIMPLE CURVES at the C.T. unless I (and consequently L and the stationing of the C.T.) can be determined by some means. Middle ordinates are also useful in staking a curve by tape alone. Their most valuable use, however, is in checking and realigning existing curves on railroads. (See Art. 9-17.) In staking problems, first locate full stations either side of the T.C. by swing tangent offsets, as in the chord-offset method just described. Then set the next full station by sighting from the rear station along a line m feet inside the forward station, and measure the full chord distance from the forward station (see Fig. 2-10). Continue this process to the stake before the C.T., and make the final check as in the chord-offset method. (Fractional stations could be used instead of full stations.) It should be noted that, when stakes are set at full stations, the distance m is the middle ordinate for two stations; con- sequently, m=T.O. = 1 C.O. Topographical conditions sometimes make this method preferable to chord offsets. It is probably better on sharp curves, regardless of topography, because the offsets are only half as long. Tangent offsets provide a handy means of setting station stakes by tape alone. The method is essentially one of rec- tangular coordinates, the T.C. being used as the origin and the tangent being used as an axis. The deflection d to the first regular station is first com- puted. The tangent distance to this station is c cos d, and its offset is c sin d. Coordinates of remaining full stations are obtained by adding increments of C cos (d+1D) and C' sin (d+1D), C cos (d+3D) and C sin (d+3D), etc., where C is the chord for a full station. Since in most cases C=100 feet, the computation is very simply performed by using natural sines and cosines. As a check on the computations, the co- ordinates of the C.T. should equal R sin I and R vers I. If tangent distances fall beyond the P.I., it is probably better to calculate the second half of the curve with reference to the C.T. and the forward tangent. In the field, set temporary stakes at the calculated tangent distances. Then locate the station stakes at the intersections of the tangent offsets and the chords from the preceding stations. SIMPLE CURVES 37 Ordinates from a long chord are also based upon rectangular coordinates. As in the tangent-offset method, the origin is at the T.C., but the axis is along a convenient long chord. If the chord is the L.C. of the curve, simple relations for the coordinates of the station stakes may be expressed (these will not be derived). However, it is difficult to imagine many practical situations in which one of the foregoing methods would not be better than this. C B 01 02 03 A_%Dq=g Fig. 2-11. Ordinates from a long chord 0% • · الا Perhaps the most useful application of this method is in setting stakes at odd plus points between a series of minor obstacles on a curve. Fig. 2-11 illustrates such a situation. Station E is set by turning a deflection angle with the transit at A and taping the chord AE, which is 2 R sin AOE.“ Stakes set sufficiently close for cross-sectioning are then located by taping the offsets 01, 02, at convenient points along AE. If the segments of AE at any ordinate are designated by si and 82 (units are stations),then the length of the ordinate in feet is found from the relation E 0 3 S1 S2 D 8 Note the resemblance between formulas 2-30 and 2–35. (2-35) Approx. 2-15. Parallel Curves. It is often necessary to determine the length of a curve parallel to a curved center line. This problem occurs in connection with finding lengths of curb, guardrail, or right-of-way along curved alignment. More- over, stakes are often set along a parallel "offset" line in order to avoid traffic or construction operations. Fig. 2-12 shows offset curves outside and inside a center-line curve of length L. I°R 57.2958' Since the true length of a circular arc equals 38 SIMPLE CURVES Lo 1° (R+p.) 57.2958 and and Li P。 I° (R— pi) 57.2958 INC Pi Lo=L+; (2-37) Though an offset curve may be staked without reference to the stationing along the center line, it is more practical to set stakes at points radially opposite the center-line stakes. This is done either by the deflection-angle method or by one of the offset methods described in Art. 2-14. In either case the 'true chords to be taped must be found. L。 I°po 57.2958 Li=L- from which I°pi 57.2958 L L; 1º R I Fig. 2-12. Parallel curves (2-36) C.IT. True chord lengths can always be found by means of formula 2-13; they can also be taken from Table II with sufficient precision for most purposes. As an illustration, refer to the example on page 20 and assume that it is required to stake one offset curve 60 feet SIMPLE CURVES 39 Stakes on outside and another 25 feet inside the given curve. the offset curves are to be set radially opposite the full and half stations along the center line. The length of curve L equals 380.370 ft along the center line. From formulas 2-36 and 2-37 (Table VI is useful), L, equals 416.219 ft and Li equals 365.434 ft. The lengths of the true chords depend on whether the 9° curve conforms to the chord definition or arc definition of D. Using formula 2-13 with d equal to 2°15′, the true half-station chords are as follows: True Chords for Half-Station Along Center Line Chord Def. of D Arc Def. of D 54.750 54.699 50.039 49.987 48.076 48.024 Outside curve Center-line curve Inside curve 2-16. Methods of Computation.-Proper methods of com- putation and use of significant figures are so important that this and the following article are inserted here so that the suggestions can be weighed and then used, wherever appli- cable, in problems throughout the book. Route surveying computations require relatively simple mathematics—arithmetic, geometry, and trigonometry. The solution of a problem is often tedious in that it involves many repetitions of the same mathematical operations. As a result, students (particularly) find the manipulation of surveying instruments much more interesting. They are likely to con- clude that surveying field work is of primary importance, whereas computations are a chore to be done with as quickly as possible. This is a serious mistake. Field work and computations are equally important. Surveying field work alone is of little value; it is always put to use in some practical form that involves computations. Unless the computations are made correctly, they negate the field work and may cause serious errors when used as a basis for the design or construction of engineering works. The student can take as much pride in obtaining the answer to a tedious surveying problem—the correct answer, with the proper number of significant figures and with the decimal 40 SIMPLE CURVES point in the right place—as he does in his ability to "run a transit" rapidly and accurately. There is no better place to develop the habits of computation which insure this result than in a course in surveying. Surveying computations are made algebraically, graphically, and mechanically, or by a combination of these methods. Useful tables reduce much of the drudgery (see Part III for examples of tables). A surveying problem can usually be solved by more than one exact method. This should always be done on important work. Moreover, all computations should be checked, pre- ferably by a different computer. If an exact algebraic solu- tion cannot be found, the unknowns may be scaled from an accurate drawing on which the measured data have been carefully plotted. This method is reliable to three significant figures if the scale of the drawing is fairly large. Among the mechanical aids are the slide rule, planimeter, calculating machine, and electronic computer. The slide rule is an excellent device for checking the first three significant figures. The planimeter will measure irregular areas (see Art. 6-6) to an accuracy within 1 per cent. Important surveying computations require accuracy to at least five significant figures. This degree of refinement may be obtained with the aid of logarithms (Tables XXI and XXII) or by calculating machine and natural trigonometric functions (Table XX). Logarithms are especially useful when surveying computations must be made "on the spot" in the field. But desk calculating machines are preferred in sur- veying offices because of their greater speed. The electronic computer (Art. 13-4) is used by large organ- izations where the number of repetitive operations is great enough to justify the high cost of computer purchase or rental. Such a machine is not a "brain." It does no thinking, but only follows coded commands fed into it. Instead of making the individual obsolete as a computer, the electronic com- puter requires the surveyor to be even more expert in order that he may "program" the computer to operate with the highest efficiency. Some practical suggestions for making surveying computa- tions are: SIMPLE CURVES 41 1. Do all computations on "squared paper" to simplify the making of sketches and the arranging of work in columns. 2. After transferring data from field book to computation sheet, check the copying. Mistakes made at this point are common and are not usually disclosed by the computing operations. 3. Draw a small sketch, approximately to scale, showing the known data and the unknowns sought. Aided by the sketch, make an estimate of the answers to the problem and record them. 4. Show the formula at the head of the block of computa- tions to which it applies. 5. Adopt a clear and logical arrangement of computations; a tabular form fits many problems (see examples in Art. 4-4). Avoid an arrangement that requires numbers to be added or subtracted horizontally. Line up digits and decimal points in a column of numbers. 6. Wherever possible, perform computations in a systematic order, e.g., addition, subtraction, multiplication, and division. Do no work on "scratch paper." Incidental computations may be written in a margin on the computation sheet. 7. Use a straight edge in order to avoid taking a value from the wrong line of a table. Check additions, subtractions, extractions of tabular values, etc. as they are made and indicate by a check mark. 8. Follow good practice in the use of significant figures and rounding off. In general, carry one extra significant figure in intermediate calculations. (See Art. 2-17 for detailed sug- gestions.) 9. Take advantage of all automatic checks on the accuracy of calculations (see example on page 23 for illustrations). Make a slide-rule check at convenient points; this will verify the arithmetic to three significant figures though it will not disclose errors resulting from the use of the wrong formula. Any such blunder, or a great error in arithmetic, will usually be caught by applying a graphical check. 10. Label the final answers and all intermediate results clearly. Compare the answers with the estimated values obtained from the sketch and do not accept the work unless the agreement is reasonable. 42 SIMPLE CURVES 2-17. Significant Figures.-Both exact numbers and round numbers are used in computations. Exact numbers come from tallies and theoretical considerations; round numbers come from measurements. For example, the number 2 in the formula for L.C. (equation 2-3) is an exact number that comes from geometric theory. On the contrary, the measured length of a line is a round number; it can never be exact, for it would have to be correct to an infinite number of digits. In computations it is often desirable to change a round number to an equivalent one having fewer digits. This process is called "rounding off." Common practice in rounding off is as follows: When dropping one or more digits, round off to the nearer of the two round numbers between which the given round number lies. If the digit to be dropped is 5, use the nearest even number for the preceding digit. (Consider zero to be an even number.) According to this practice, the round number 18.1827 is rounded off to 18.183, 18.18, or 18.2, the result depending on the number of digits desired. Also, the round numbers 85.155 and 85.165 are rounded off to 85.16; the numbers 85.095 and 85.105 are rounded off to 85.10. When properly rounded off, a measured quantity contains the number of significant figures consistent with the data. The significant figures in any round number are those digits (including zeros) which have real meaning. The maximum number of such figures includes those digits which are certain, plus one that is estimated. In making measurements the number of significant figures sought is governed by economic considerations; whereas the number obtained is limited by the precision with which the measurements are made. Confusion as to which digits are significant is avoided by observing the following principles (in each example there are five significant figures and all significant digits and zeros are printed in italics): 1. The digits 1 through 9 are always significant. SIMPLE CURVES 43 2. Zeros which lie between any two digits are significant, regardless of the position of the decimal point. Examples are 21006 and 21.006. 3. Zeros which lie to the left of the leftmost digit are not significant, regardless of the position of the decimal point. Examples are 0.71700 and 0.00071700. 4. Zeros which lie to the right of any digit and also to the right of the decimal point are significant. An example is 717.00. 5. Zeros which lie to the right of any digit and also to the left of the decimal point may or may not be significant. For example, in 71700. the zeros are significant if they were actually measured. If they were not measured, doubt as to the number of figures which are significant is resolved by writing the number as 717 ≈ 102. 6. The number of significant figures in any round number is independent of the units in which it is expressed. An example is 586.08 ft 0.11100 miles. = It is a waste of time, as well as misleading, to carry com- puted results beyond the precision inherent in the measure- ments on which the computations are based. A few examples will clarify this statement. Example of Addition or Subtraction.-Add the round numbers: 9.47, 241.3, 7.6625, and 0.891. Solution and comments: Given Number No. of Sig. Figs. 9.47 241.3 7.6625 0.891 3 4 5 3 Wrong Method 9.47 Rounded answer = 241 7.66 0.891 Sum=259.021 =259 Common Preferred Method Method 9.47 9.5 241.3 7.7 0.9 259.4 259.4 241.3 7.66 0.89 259.32 259.3 The “wrong method" comes from a mistaken interpretation of the adage that a chain is no stronger than its weakest link. The fault lies in assuming that each number, before adding, must be rounded off to the least number of significant figures 44 SIMPLE CURVES possessed by any of the numbers (3 significant figures in this example), and also that the sum must be similarly rounded off. In the "common method" the numbers are first rounded off to the limit of accuracy of the least accurate number (tenths in this example). Their sum is accepted without further rounding. In the "preferred method" the numbers are first rounded off to one decimal place beyond that of the least accurate number. Their sum is then rounded off to the nearest digit in the preceding decimal place (nearest tenth in this example). This method recognizes the fact that the principal sources of error lie in the numbers that are not rounded off. In this example, the final 6 and the final 9 in the last two numbers are certain. Consequently, the final 2 in the sum may not be far in error, and the rounded answer 259.3 has a somewhat higher proba- bility than the answer 259.4. Example of Multiplication. Multiply the round numbers 362.56 and 2.13. Solution and comments: When two or more round numbers are to be multiplied, the common method is to round off each number to the same number of significant figures as appears in the least accurate number. Then multiply, and round off each intermediate product and the final answer to this same number of significant figures. As applied to this example, the common method is 363 X2.13=773.19, after which 773 is used as the intermediate product or the final answer. A preferred method is to round off each number to one more significant figure than appears in the least accurate number. Then multiply, and round off each intermediate product to this number of significant figures. Finally round off the answer to the number of significant figures in the least accurate number. As applied to this example, the preferred method is 362.6×2.13=772.3 as the intermediate product or 772 as the final answer. Example of Division.-Divide the round number 675.41 by the round number 87.5. Solution and comments: As in multiplication, the common method is 675÷87.5=7.71 as the final answer. A preferred SIMPLE CURVES 45 method is to round off the divisor to the same number of significant figures as appears in the dividend, or round off the dividend to one more significant figure than appears in the divisor (whichever case applies). Then divide, and round off the final answer to the number of significant figures in the rounded divisor. One more significant figure is temporarily carried in the answer if the quotient is to be used in subsequent computation involving other round numbers. As applied to this example, the preferred method is 675.4÷87.5=7.719 as the intermediate quotient or 7.72 as the final answer. The difference between the results of the common and preferred methods will never be large. Both methods recog- nize that final computed results can be no more accurate than the least accurate factor used to obtain them. The preferred method also incorporates the practice, favored by experienced computers, of carrying one extra significant figure in inter- mediate calculations so as to avoid the build-up of errors due solely to rounding off. PROBLEMS NOTE. Certain of the practical problems in Chapter 7 may also be assigned, particularly numbers 7-1 and 7-9. 2-1. Given the following values of I and Dc. After taking Rc (or log Rc) from Table I, compute T, E, L.C., M, and L from basic formulas. Find true arc length by Table VI. Verify answers for T, E, and true arc length by Tables VIII, IX, X, and II. Pa= (a) I=16°22′; De=1°40′. Answers: T=494.38; E=35.365; L.C.=978.70; M =35.005; true length=982.04. (b) I=32°44'; D=3°20′. (c) I=29°18′42″; D.=4°00′00″. (d) I=91°24'; Dc=16°. 2-2. Given the following values of I and Da. After taking Ra (or log Ra) from Table I, compute T, E, L.C., M, and L from basic formulas. Verify answers for T, E, and L by Tables VIII and VI. (a) I=20°34′; Da=2°05′. Answers: T'=498.97; E=44.897; L.C.=981.91; M =44.176; L=987.20. 46 SIMPLE CURVES (b) I=41°08′; Da=4°10′. (c) I=25°44′18″; Da=3°00′00″. (d) I=89°38'; Da=15°. 2-3. Prepare a set of field notes for staking each of the following curves of Prob. 2-1 by the deflection-angle method: (a) Curve 2-1(a). Sta. P.I.=47+62.6. Set full stations. Carry distances to tenths and deflections to nearest minute. Partial answers: sta. T.C. =42+68.2; first deflection =0°16′; sta. C.T.=52+50.2; true chord for full station = 100.0 ft. (b) Curve 2-1(b). Sta. P.I.=83+12.7. Set full stations. Carry distances to tenths and deflections to nearest minute. (c) Curve 2-1 (c). Sta. P.I. =121+05.81. Set full and half stations. Carry distances to hundredths and deflections to nearest 10 seconds. (d) Curve 2-1(d). Sta. P.I.=89+21.79. Set full, half, and quarter stations. Carry distances to hundredths and deflections to nearest minute. 2-4. Prepare a set of field notes for staking each of the following curves of Prob. 2-2 by the deflection-angle method: (a) Curve 2-2(a). Sta. P.I.=23+72.2. Set full stations. Carry distances to tenths and deflections to nearest minute. Partial answers: Sta. T.C.=18+73.2; first deflection =0°17′; sta. C.T.=28+59.4; true chord for full station = 100.0 ft. (b) Curve 2-2(b). Sta. P.I.=19+87.1. Set full stations. Carry distances to tenths and deflections to nearest minute. (c) Curve 2-2(c). Sta. P.I.=79+58.71. Set full and half stations. Carry distances to hundredths and deflections to nearest 10 seconds. (d) Curve 2-2(d). Sta. P.I.=52+62.96. Set full, half, and quarter stations. Carry distances to hundredths and deflections to nearest minute. 2-5. Refer to the field notes for Prob. 2-3(a): (a) By the simplest method (page 30), compute the total deflection to sta. 47 +70. Answer: 3°36′+70×0.5′ =4°11′. (b) With transit at sta. 48 on the curve, what vernier reading must be set before backsighting to sta. 44 in order for the SIMPLE CURVES 47 vernier to read 6°56' when the telescope is plunged and sighted at sta. 51? Answer: 1°06'. (c) With transit at sta. 48, what vernier reading must be set before backsighting to sta. 44 in order for the vernier to read 0°00' when the line of sight is turned along the local tangent? Answer: 3°20'. (d) With transit at the C.T., what vernier reading must be set before backsighting to sta. 48 in order for the vernier to read 0°00' when the line of sight is turned to the P.I.? Answer: 3°45'. 2-6. Refer to the field notes for Prob. 2-4(a). (a) Compute the total deflection to sta. 23 +40. (b) With transit at sta. 25 on the curve, what vernier reading must be set before backsighting to sta. 21 in order for the vernier to read I when the telescope is plunged and sighted at the C.T.? (c) With transit at sta. 25, what vernier reading must be set before backsighting to sta. 21 in order for the vernier to read 0°00' when the line of sight is turned along the local tangent? (d) With transit at the C.T., what vernier reading must be set before backsighting to sta. 23 in order for the vernier to read 0°00' when the line of sight is turned to the P.I.? 2-7. Find D for each of the following curves, given I and the approximate E or T. (a) I=36°25′; E = ±65 ft. (b) I=17°52′; T=±320 ft. =2°45'. (c) I=55°48′; E = ±120 ft. (d) I=13°10'; 7±185 ft. Answer: Da to nearest 1°=44°. Answer: De to nearest 15′ Required: De to nearest 10'. Required: Da to nearest 5'. 2-8. Compute T and L, given the following values of I and R: (a) I=33°42′; R=2,000 ft. Answers: T=605.74; L (Table VI) = 1,176.35. (b) I=41°27'; R=3,000 ft. 48 SIMPLE CURVES (c) I=68°18'; R=800 ft. (d) I=52°57′20″; R=500 ft. 2-9. Prepare a set of field notes for staking each of the following curves of Prob. 2-8 by the deflection-angle method: (a) Curve 2--8(a). Sta. P.I.=30+57.9. Set full stations. Carry distances to tenths and deflections to nearest minute. Partial answers: Sta. T.C.=24+52.2; first deflection =0°41′; sta. C.T.=36+28.5; true chord for full station = 100.0 ft. Sta. P.I.=142+63.6. Set full stations. Carry distances to tenths and deflections to nearest minute. (c) Curve 2-8(c). Sta. P.I.=46+66.66. Set full and half stations. Carry distances to hundredths and deflections to nearest 10 seconds. (b) Curve 2-8(b). (d) Curve 2-8(d). Sta. P.I.=69+83.52. Set full, half, and quarter stations. Carry distances to hundredths and deflections to nearest minute. 2-10. Compute the tangent offset t to sta. 23 for the curve on page 24. Use 4 different methods: (1) formula 2-29 for C.O., then t=}(C.O.)(0.323)²; (2) formula 2–30; (3) formula 2-33; (4) t=c sin 1°27′. 2-11. Find the indicated offsets to hundredths for the fol- lowing curves by the most efficient method (refer to page 2 of Tables): (a) D.=4°. Find T.O., M.O., and t for a 50-ft subchord. (b) Da=4°. Find T.O., M.O., and m for a 50-ft subchord. (c) D.=20°. Find T.O., M.O., and t for a 20-ft subchord. (d) Da=20°. Find T.O., M.O., and m for a 20-ft subchord. 2-12. Compute a set of offsets for staking full stations on each of the following curves by the tangent-offset method. Carry offsets to hundredths. Set up the calculations in systematic tabular form and make an independent check of the coordinates of the C.T. (a) Curve of Prob. 2-3(c). (b) Curve of Prob. 2-4(c). 2-13. Find D to the nearest 10' for a curve which will pass closest to a point 20 feet inside the initial tangent and 250 feet beyond the T.C. Check the result by an independent method. SIMPLE CURVES 49 2-14. Find D to the nearest 10' for a curve which will pass closest to a point 40 feet inside the initial tangent and 500 feet beyond the T.C. Check the result by an independent method. 2-15. Compute L, L., Li, and the true full-station chords needed for staking: (a) Curves 100 feet outside and 50 feet inside the curve of Prob. 2-1(b). (b) Curves 60 feet outside and 120 feet inside the curve of Prob. 2-2(b). 2-16. Derive: (a) formula 2-30, (b) formula 2-31, and (c) formula 2-35. CHAPTER 3 COMPOUND AND REVERSE CURVES 3-1. Definitions.-Stated generally, a compound curve consists of two or more consecutive curves that are tangential. In the terminology of route surveying, however, a compound curve is a two-arc simple curve having its centers on the same side of the common tangent at the junction; whereas a reverse curve is one having its centers on opposite sides. A multi- compound curve has three or more centers on the same side of the curve. COMPOUND CURVES 3-2. Use.-Owing to the inequality of their tangent dis- tances, compound curves permit the fitting of a location to the topography with much greater refinement than do simple curves. Conditions often occur in railroad and highway loca- tion where the changes in direction between established tan- gents can only be accomplished economically by compound curves. This is true in mountainous terrain or along a large river winding close to a rock bluff. The flexibility of compound curves may tempt the locating engineer to use them merely to reduce grading quantities or to expedite the field work (as in Art. 3–14). This is not good practice, as it complicates design details related to super- elevation and introduces certain permanent operating dis- advantages. A compound curve should not be used where a simple curve is practicable. A 3-3. Requirements for a Rigid Solution.-Fig. 3-1 shows a compound curve, the notation for which is self-explanatory. The layout has seven important parts: Ts, TL, RS, RL, IS, IL, and I. However, since I = Is+IL, there are only six inde- pendent variables, namely, the four lengths and any two angles. Trial with compass and ruler will show that: ; For a rigid solution four parts must be known, including at least one angle and at least two lengths. 50 COMPOUND CURVES 51 Of the many possible combinations of four known parts giving a rigid solution, some are more readily solved than others. In practice the more difficult problems may often be converted to simpler cases by measuring one more angle or distance. Certain combinations rarely occur in the field. (T.C.) A The treatment which follows is not exhaustive; yet it is complete enough to serve as a basis for solving any com- pound-curve problem. R57 کاره Os ·Ts= AV Vs Is * (C.C.) C " V (P.I.) R₂ ·T₁ = VB Fig. 3-1. Compound-curve layout VL B(C.T.) 20 3-4. Solution Through Vertex Triangle.-The most obvious method of solving a compound-curve problem is by means of the triangle VVSV L, Fig. 3-1, formed by lines joining the P.I. and the vertices of the two simple curves. (The base of the triangle is the common tangent at the C.C.) If this vertex triangle can be solved, all unknown parts of the layout are easily determined. For example, if Is, IL, Rs, and RL are known, solve first for the tangent distances of the individual simple curves. Their sum equals the base of the vertex tri- angle. Solve that triangle for the other sides by two applica- 52 COMPOUND CURVES tions of the sine law. Then find the missing compound-curve tangents, Ts and TL, by adding those sides to the proper individual tangent distances. Of course, I=Is+Il. It should be emphasized that the vertex-triangle method of solution is possible only if at least two of the known com- pound-curve parts are angles (fixing its shape), and then only if one side of the triangle can be found (fixing its size). The method is not applicable if, along with any two angles, the parts T's and TL, RS and TL, or RL and Ts are known. A F T V R₂ | Ok= Et 14ㅅ ​YOU Ğţ .L iOS. $ B` Tangent at C Fig. 3-2. Solution by construction 3-5. Solution by Special Construction.-One of the most useful cases occurs when I has been measured, and topo- graphical conditions fix the T.C. and the C.T. within narrow limits at unequal distances from the P.I. If one more variable is assumed, the layout is fixed, but the problem may not be solved easily. Should the assumed variable be the degree of the sharper curve (a practical situation, since D is often limited by specifications), then Rs is the fourth known part, and solu- tion through the vertex triangle is impossible. The problem is solved by means of Fig. 3-2. From the construction, chords AC and DOS are parallel, and point G must lie on chord AC. Therefore triangles DEOS and AFG are congruent. COMPOUND CURVES 53 tan DOSE= Since angle DOSE=I L, tan IL or or = from which (RL-Rs) Or else JB-GH DE FG EOS AF AV+VJ−BH Also, Is=I-IL The missing unknown R may be obtained either by the vertex-triangle method of Art. 3-4 or directly from Fig. 3-2. Thus, T's sin I-Rs vers I TL+TS cos I - Rs sin I EOS=AF=AV+VJ¬BH (RL-RS) sin IL=TL+Ts cos I – Rs sin I TL+TS COS I - Rs sin I sin IL from which = DE=FG=JB-GH (R1-Rs) vers IL=Ts sin I-Rs vers I Ts sin I-Rs vers I vers IL (3-1) = (RL-RS) (3-3) L When I is small, relation 3-3 is preferable to 3-2. For moderate angles either formula is satisfactory. Though the formulas look complicated, actual computation is simple because the numerators of formulas 3-2 and 3-3 appear in formula 3-1. (3-2) Fig. 3-2 applies to any rigid case in which both T's and Rs are known. At least two of the three general relations, 3–1, 3–2, and 3-3, are needed; the particular unknowns determine the choice of relations, as well as their form and order of use. If both TL and RL are known, the diagram for direct solu- tion results from drawing the construction lines in a reverse way. However, the correct formulas may also be obtained by merely changing the subscripts in formulas 3-1, 3-2, and 3-3. 3-6. Solution by Traverse.-The general relations de- veloped in Art. 3-5 are used too infrequently to justify memorizing them. Moreover, if the textbook is not available, it may be difficult to derive them when needed, owing to the complicated geometric construction. Fortunately, the same 54 COMPOUND AND REVERSE CURVES formulas may be derived by a method which requires no con- struction lines and involves only the elementary truth that the algebraic sum of the latitudes and the algebraic sum of the departures of a closed traverse must each equal zero. А T₂ Side OLA AV VB BOS OSOL RL or Fig. 3-3. OS Length Azimuth RL 0° TL 90° T's 90°+I Rs 180°+I RL-RS 180°+IL kas, Then, from Σ latitudes, Fig. 3-3 is the same as Fig. 3-2 except that construction lines have been omitted. Proceed clockwise around the selected closed traverse, assuming 0° azimuth in the direction OLA. Consider that I<90°; recall that latitude-length cosine of azimuth and departure=length sine of azimuth. AX Departure 0 TL T's cos I Solution by traverse ду Latitude -Rs RL 0 Stat Ts sin I -Rs cos I -(RL-RS) cos IL -Ts B 0° - Rs sin I —(Rī— Rs) sin IL RL-Ts sin I-Rs cos I-(RL-RS) cos IL=0 cos IL= RL-Ts sin I-Rs cos I RL-RS (3-4) 17 COMPOUND CURVES 55 The term RL in the numerator may be eliminated and the relation may be converted to formula 3-3 by subtracting both sides from 1, canceling RL, and converting cosines to ver- sines. The result is vers IL or From Z departures, TL+T'S COS I-Rs sin I-(RL-Rs) sin IL=0 sin IL 0° vers A But tan A (for proof see page 637). sin A Therefore, if formula 3-3 is divided by 3-2, the result is tan IL OL A Rs S Ts sin I-Rs vers I RL-RS OS TL+TS COS I - Rs sin I RL-RS = In applying the traverse method for solving any problem, it should be obvious that the traverse must be drawn so as to include all six independent variables (four lengths and any two angles). Moreover, any direction may be taken as 0° azimuth; Ts T's sin I-Rs vers I TL+TS COS I - Rs sin I R₁ Fig. 3-3R (3-3) V (3-2) (3-1) 56 COMPOUND AND REVERSE CURVES but, in order to obtain workable relations directly, the axes must be assumed parallel and perpendicular to an unknown length. Summarizing,. the general rules of procedure are: 1. Draw traverse to include all independent variables. 2. Take 0° azimuth parallel or perpendicular to an unknown length and proceed clockwise around traverse. 3. Set Z latitudes and Σ departures equal to zero, obtaining two equations. Side Os A AV VB or To illustrate the directness and simplicity of the traverse method, Fig. 3–3R shows another compound curve in which the layout starts (for variety) with the shorter-radius arc. Another set of general equations will be developed by taking 0° azimuth in the direction OsA. BOL OLOS or + 4. Solve the equation containing one unknown. If both equa- tions have two unknowns, divide one by the other in such a way as to eliminate an unknown. Length Rs Ts TL RL RL-RS But Then, from Σ latitudes, Azimuth 0° 90° 90°+I 180°+I Is cos Is= vers A sin A (3-4R) The term Rs in the numerator may be eliminated by sub- tracting both sides from 1, canceling Rs, and converting cosines to versines. The result is From departures, RS-TL sin I-RL cos I+(RL-Rs) cos Is=0 TL sin I+RL COS I - Rs RL-RS vers Is= Latitude Rs 0 - TL sin I - RL COS I (RL-RS) cos Is sin Is = Departure 0 Ts TL COS I RL sin I (RL-RS) sin Is RL vers I-T sin I RL-RS TS+TL cos I - RL sin I+(RL—Rs) sin Is=0 RL sin I-TL cos I-Ts RL-RS tan A (for proof see page 637). (3–3R) (3-2R) COMPOUND CURVES 57 Thus, if formula 3-3R is divided by 3-2R, the result is tan Is RL vers I-TL sin I RL sin I-TL cos I-Ts (3-1R) Inspection of the four formulas just derived shows that they are the reversed forms of 3-1 through 3-4; that is, they may be derived by changing the subscripts in the first set of formulas. Thus the statement made at the end of Art. 3-5 is verified. and the ways The traverse method is valuable not only in the "standard" compound-curve problems just described but also in any special-curve problem which must otherwise be solved by means of complicated geometric construction. (Chapter 7 contains some practical examples.) 3–7. Summary of Compound Curves.—In a practical prob- lem in which only one of the four known independent variables is an angle, it will be the angle I. If any two angles are known, the first step will always be to compute the dependent angle from I=Is+IL. After this the method of solution will depend on the particular combination of unknowns. Case No. The following tabulation shows how to determine the fifth independent variable for the ten practical cases in which I is known, either directly or from given values of Is and IL. 123 TH LOCO 7 ∞ 4 5 6 8 9 10 Given 2 angles, Ts, Rs 2 angles, TL, RL 2 angles, RL, Rs 2 angles, Ts, RL 2 angles, TL, Rs 2 angles, TL, Ts I, TL, Ts, Rs I, TL, TS, RL I, Ts, RL, Rs I, TL, RL, RS Recommended Solution Vertex-triangle, or 3-3 for RL Vertex-triangle, or 3–3R for Rs Vertex-triangle, or 3–3R for TL 3-3 or 3-4 for Rs 3-3R or 3-4R for RL 3-1 for Rs, or 3-1R for RL 3-1 for IL 3-1R for Is L 3-3 or 3-4 for Il 3-3R or 3-4R for Is 58 COMPOUND AND REVERSE CURVES After only one independent variable remains unknown, the solution can be performed either by the vertex-triangle method or by use of one of the eight general equations developed in Arts. 3-5 and 3-6. 3-8. Example of Calculation.-Given: I-75°21'; Ts= 1,175.42; Tz=2,000 (±50 ft); Ds=6°. Determine a con- venient value for DL which fits the conditions, and determine the exact values of IL, Is, and TL for the selected DL. NOTE. This problem illustrates the practical case noted in Art.. 3-5. It also shows the utility of Table XX, which lists all needed natural func- tions in one table. Find I by formula 3-1, which is tan IL T's sin I=1,175.42×0.967489 = 1,137.21 Rs vers I= 955.366×0.747086 = 713.74 tan L= TL T's cos I = 1,175.42×0.252914= -Rs sin I= 955.366×0.967489-924.31 RL-RS: From 3-3, N D T's sin I-Rs vers I TL+TS COS I - Rs sin I = Diff. = 0.308434 RL-RS: Now apply formula 3-3, which is Alg. sum= 1,372.97 = Denominator, D IL-17°08'30" = N 0.173738 Tentative IL=34°17' vers IL: = 423.47 = Numerator, N €2,000.00 297.28 =2,437.41 Rs 955.37 Sum=RL=3,392.78 and Dь=1° 41′+ Round off DL to 1°40' for convenience in staking. Exact RL=3,437.87 ― Ts sin I-Rs vers I vers IL = Rs 955.37 RL-RS-2,482.50 N 2,482.50 =0.170582 COMPOUND CURVES 59 and By formula 3-2, TL=(RL-Rs) sin IL+Rs sin I-T's cos I (RL-Rs) sin Iь=2,482.50×0.558590= 1,386.70 924.31 -T's cos I - -297.28 TL=alg. sum = 2,013.73 A IL=33°57′30″ I =75°21′00″ Is=41°23'30" form. 3-9. Multi-Compound Curves.-In especially difficult ter- rain, a compound curve may be made to fit the situation better by using more than two circular arcs. Such a multi-compound curve is located most simply by trial (see Art. 3-14). The layout is rarely symmetrical; practical examples are given in Art. 7-14. ů Rs sin I= www.c P.I. A' Fig. 3-4. Reverse curve B REVERSE CURVES B' 1 Symmetrical multi-compound curves have many uses out- side of route surveying, especially in architecture. The "three-centered" oval, or "basket-handle" arch, is a common 3–10. Limitations and Uses.-When conditions do not per- mit a simple curve AB inside the P.I. of established tangents (see Fig. 3—4), the change in direction may be accomplished by locating a reverse curve A'CB' in the area beyond the P.I. Points A' and B' may lie on either side of the P.I. and point B, the positions depending on the radii. 60 COMPOUND AND REVERSE CURVES On routes where speeds are high, reverse curves are in- admissible. This is particularly true on highways and rail- roads because opposite superelevation at the point of reversal cannot be provided. If the area beyond the P.I. must be used for the location, the two arcs of the reverse curve should be separated by a tangent long enough to permit proper operat- ing conditions. Reverse curves may be used to advantage on closed conduits such as aqueducts and pipe lines; on flumes and canals where erosion is no problem; and on local roads, in railroad yards, or in any similar location where speeds are low. P Į R and A 1 E -- 1 + / VOL Fig. 3-5. Parallel tangents Osi ka 10 F B Rs 3-11. Case of Parallel Tangents.-The simplest case of a reverse curve occurs when the tangents are parallel (see Fig. 3-5). With the aid of the perpendicular dropped from C to the radii, it is clear that p=AE÷FB and AD=EC+CF, or p=(RL+Rs) vers I (3-5) AD=(RL+Rs) sin I (3-6) Usually, p is known and two more variables must be assumed. More commonly, RL = Rs, which reduces the number of variables to four, of which two must be known or assumed. REVERSE CURVES 61 3-12. Case of Non-Parallel Tangents.-In essential theory, the general case of a reverse curve between non-parallel tangents is no different from a compound curve. The same seven parts are present, and the identical requirement for a rigid solution must be met (see Art. 3-3). The problem may be treated as two separate simple curves, provided sufficient data are available. More complicated cases may be solved by the construction method of Art. 3-5 or by the simpler traverse method described in Art. 3-6; the final relations resemble formulas 3-1, 3–2, and 3–3 closely. (See Art. 7–15.) COMMENTS ON NOTES AND FIELD WORK 3-13. Notes.-Notes for staking compound and reverse curves by deflection angles are computed by treating the branches as separate simple curves, though they are set up in continuous stationing according to the form given in Art. 2-9. Owing to the change in curvature at the C.C. (or at the point of reversal in curvature, or C.R.C., on a reverse curve), that point must be occupied in moving up the transit from the T.C. The deflection angle would not be correct for a sight spanning the C.C. (or C.R.C.). Consequently, the safest form of notes is that in which the deflection at the C.C. (or C.R.C.) is 0° for starting the second arc. Some other method may be used, but it is likely to confuse the transitman. 3-14. Field Work.-Set-ups and field checks follow the general scheme outlined in Art. 2-11. If a set-up is made at the C.C. (or C.R.C.) and the deflections are recorded as just described, the transit is oriented so that the vernier will read 0° when the line of sight is along the common tangent. Gen- erally, set-ups are best made at the T.C. and C.T., with the final check occurring at the C.C. (or C.R.C.). Location by trial in the field often expedites fitting com- pound curves to particular situations. An example of an obstacle on the tangent is given in Art. 7-6. Another use of the trial method is in running semi-final location in mountainous or otherwise difficult terrain not accurately mapped. Fig. 3-6 represents a situation in which 62 COMPOUND AND REVERSE CURVES the direction of the back tangent and the location of the T.C. at A have been fixed by the topography. The direction of the forward tangent is indefinite, though it should pass near a distant prominent point. The back tangent plunges into inaccessible territory toward the P.I inaccessible To P.I. шишишни A с B To distant point Ed B' Tangent at B' \s+d+ | Jo Fig. 3-6. Location by trial The procedure is as follows: From the relation t=} s²D, select the degree of an initial curve fitting the conditions, as described on page 35. Continue this curve until it requires compounding (as at C) to fit the topography. Select the degree of the second arc by the same method, and repeat. Do this as many times as necessary. When the distant point is visible from a set-up on the last arc (as at B'), measure the angle d. To find the stationing of the C.T. at B, consider that the directions to the distant point from B and B' are parallel. 100 d where Ds is the degree of the Ds Then, sta. B-sta. B'. final arc. Check the field work, if desired, by locating B and closing back to A by a convenient random traverse. COMMENTS ON NOTES AND FIELD WORK, 63 PROBLEMS —— NOTE. Certain of the practical problems in Chapter 7 may also be assigned, particularly numbers 7-2 and 7-6. 3-1. Given four parts of each of the following compound curves, compute the remaining three parts. (a) I=74°55'; Is=50°12'; Ts=576.24; Ds (chord def.) = 8°10′. Answers: I1=24°43′; DL (chord def.)=5°11′*; T½= 696.61. (b) Is=51°06′; IL=26°17′; TL=938.64; Dı (chord def.) 3°30'. (d) I=81°08'; T'z=907.18; Ts=579.21; Ds (arc def.) 10°34'. = (c) I=78°55′; Ts=802.37; DL (chord def.)=3°05′; Ds (chord def.)=6°40′. = (e) I=80°15′40″; T'L=1,037.46; 7's=731.89; Dī (arc def.) = 3°. (ƒ) I=81°22′15″; T=1,442.07; R1=2,000; Rs=1,000. == 3-2. Prepare a set of deflection angles for staking each of the following compound curves of Prob. 3-1 by the deflection- angle method. Carry distances to hundredths and deflections to nearest minute. (a) Curve 3-1(a). Sta. P.I.=33+38.52. Curve begins with Ds. Set full stations. (b) Curve 3-1(d). Sta. P.I.=54+11.73. Curve begins with Ds. Set full and half stations. (c) Curve 3-1(f). Sta. P.I.=91+13.51. Curve begins with DL. Set full and half stations. 3-3. Compute angle I and distance AD (Fig. 3-5) for a common-radius 20° (chord def.) reverse curve between parallel tangents exactly 50 feet apart. Answers: I=24°03′07″; AD= 234.71 ft. 3-4. Find the flattest common-radius reverse curve (to the nearest 10, arc def.) that can be inserted between parallel tangents exactly 100 feet apart without the distance AD (Fig. 3-5) exceeding 800 feet. 3-5. Reverse curve (refer to Fig. 7-13). Given: IL=16°42′; 64 COMPOUND AND REVERSE CURVES Is=75°26'; D=1°35'; Ds=4°25′ (both arc def.). Find: T₁(AV) and Ts(BV). See Prob. 7-6(a) for an extension of this problem. Answers: TL=2,268.52; Ts=487.40. 3-6. Reverse curve beginning with DL. Given: I1=93°32′; Is=31°54'; D=4°30′; Ds=7°30′ (both arc def.). (a) Find distances T.C. to P.I. (A'V) and P.I. to C.T. (VB'). (b) Assume the reverse curve is replaced by a 3º (arc def.) simple curve joining the same tangents. Find the distances AA' and BB' between the T.C.'s and C.T.'s of the two layouts. CHAPTER 4 PARABOLIC CURVES 4-1. Uses.-Parabolic, instead of circular, arcs may be used for horizontal curves. Where the curves are flat, there is no discernible difference between the two types. However, a parabola cannot be staked out readily by the deflection- angle method. Moreover, the determination of the radius of curvature at any point requires higher mathematics, thus complicating superelevation and related calculations. Also, parabolic alignment does not permit making simple right-of- way descriptions. For these reasons parabolic arcs on hori- zontal curves are restricted to such locations as park drives and walks, where they may be easily located by tape alone. For curves in a vertical plane the situation is the reverse. Here, parabolic arcs are almost always used because elevations can be computed much more easily than on circular arcs. The vertical curve used is a portion of a vertical-axis parabola, the particular parabola and portion being chosen with regard to certain practical considerations. 4-2. Equal-Tangent Vertical Curve. From analytic geom- etry the equation of a vertical parabola with respect to rectangular coordinate axes is y = ax²+bx+c (Fig. 4-1). The magnitude of a controls the sharpness of the parabola; its sign controls the orientation. When a is positive, the parabola is turned upward; when negative, downward. In a practical situation the gradients (tangents) at the ends of the portion of a parabola used are known. Selection of a then fixes the sharpness of the parabola and the distance between tangent points. A useful property of a vertical parabola is the fact that tangents drawn from any two points on the curve always intersect midway between the points of tangency. Moreover, there is a constant change in gradient (direction) between all pairs of tangents to the same parabola, provided that the portions of the parabola between tangent points are the same length, measured horizontally. (See the two shaded angles in 65 66 PARABOLIC CURVES Fig. 4-1.) These properties lend great flexibility to the selection of an “equal-tangent" vertical curve for route alignment. For purposes of computation, the length L of a vertical curve is not the distance along the curve; it is the difference in stationing (foot units) between the ends of the curve, regardless of the signs or numerical values of the tangent gradients. Thus, in Fig. 4-2 the length L is 600 feet. It is convenient to use the beginning of a vertical curve (point A) as the origin of coordinates. Term c then dis- appears and the equation of the curve becomes y=ax²+bx. dy The slope of any tangent is 2 ax+b. But at the origin, dx x=0; consequently, the slope equals b. However, the slope at the origin is also expressed by the tangent gradient G₁. The practical formula for an equal-tangent vertical curve is therefore y=aX²+G₁X (4-1). where y is in feet, X is in stations, G₁ is in per cent, and a is in units of per cent per station. The usual algebraic signs apply to the coordinates. Grades rising in the direction of stationing are positive; falling grades are negative. 12/2/L X- L- 1/2/2 L Axis of Parabola Y 1/1/1 1 + 1 = 1/1 12 L - الله -L - Origin of Coordinates Fig. 4-1. Vertical parabola -X PARABOLIC CURVES 67 The terms in formula 4-1 have the graphical significance shown in Fig. 4-2. The rule of offsets (coming from the term aX2) is particularly important: Vertical offsets from a tangent to a parabola are pro- portional to the squares of the distances from the point of tangency. For the 600-foot curve in Fig. 4-2, the offsets from AB' are obviously a, 4a, 9a, 16a, 25a, and 36a; those from BV (extended) are the same. Moreover, the offsets from a tangent at M (not shown) are a, 4a, and 9a. In Fig. 4-2, VC=1B'B (from similar triangles). From the rule of offsets, VM=B'B. Consequently, VM = MC. Thus, a parabola has the important characteristic that the external distance and the middle ordinate are equal. (This is not quite true for a circular arc. See Fig. 2-1.) The term G2-G₁ is the rate, in per cent, at which the tangent grades diverge. It is analogous to the angle I of a simple Some formulas are simplified by replacing G₂-G₁ by the term A, defined as the algebraic difference in grades. In Fig. 4-2, B'B equals the amount the grades diverge in the curve. X distance L, or B'B= - (†) (156¹), L being in foot units. 100 차 ​4a ax 2. aX 2 ΤΙ HG, X 3 ic Axis M 9a L- stations 4 169 G1 5 1 Fig. 4-2. Equal-tangent vertical curve G₂ 25a Ex I B 36a B' 68 PARABOLIC CURVES Since VMB'B, the external distance, designated as E, is L (850) (G₂-G₁) = (4-2) E = The term a is useful in computations. In general, the second derivative of y = ax2+bx+c equals the constant 2a. This means that a tangent to a vertical-axis parabola changes direction a constant amount for equal increments of horizontal distance. (By analogy, a tangent to a circular arc changes direction a constant amount for equal increments of distance along the arc.) Therefore, the rate of change of grade on an equal-tangent vertical curve is constant, and equals 2a per cent per station. On a vertical curve the total change in direction between the profile grades is G2-G1 (or A) per cent. If this change. is accomplished on a curve L feet long, the constant rate of change must be 100(G₂-G₁) L 2a: AL 800 K = (4-3) It is convenient to think of 2a as a measure of the sharpness of a vertical curve. In this respect it is analogous to D for a circular curve. Another measure of curvature that is used in sight-distance calculations (see Chapter 8) is the term K, which equals L÷A. This is the horizontal distance in feet required to effect a 1% change in gradient on a vertical curve. Therefore L 50 a 100A L (4-4) 4-3. Methods of Calculation of Vertical Curves. The object of vertical-curve calculations is to determine the eleva- tions at specified stations on the designed grade line. These elevations are needed for cross-sectioning prior to grading and for setting construction grade stakes. Before starting the calculations, a simple sketch should be drawn which shows G₁ and G₂ in their correct relations with regard to sign and magnitude. This will show to which of the six possible types the vertical curve conforms, and will help in making a common-sense check of the results. PARABOLIC CURVES 69 The calculation is simpler than for horizontal circular curves; no trigonometric formulas or special curve tables are needed. Either chord gradients or tangent offsets may be used. The method of chord gradients (or "chord offsets") is based upon the rate-of-change principle; it is a "self-checking" method. The tangent-offset method utilizes the rule of off- sets. 4-4. Chord-Gradient Method.-Chords between full sta- tions on a curve such as that in Fig. 4-2 must have the succes- sive gradients G₁+a, G₁+3a, G₁+5a..., differing (algebra- ically) by 2a. Since the offsets to the curve from BV are the same as those from AV, the calculated chord gradients are correct if the last chord gradient plus a equals G2.. For the 600-foot curve in Fig. 4-2, for example, G₁+12a should equal G2; it does when L=600 in formula 4-3. If the calcula- tions are started with the known elevation of A, the successive addition of chord gradients gives the elevations of the full stations on the curve. All elevations are checked if the elevation at B equals its value as computed around the tan- gent grades AVB. This method has two pronounced advan- tages: simple theory and automatic checks. On railroads, grades are so slight that it is common practice to place the vertex at a full station and use an even number of stations in the curve. (On high-speed main tracks, the A.R.E.A.* recommends that 2a should not exceed 0.05 in sags nor 0.10 on summits.) Consequently, the calculation is simple and requires no elaborate form; it may even be done mentally. See example on page 70. Elevations at plus points on vertical curves are frequently needed for controlling cross-sections or for locating culverts and other construction details. Moreover, an even-length curve with the vertex at a full station does not always conform well with the topography, particularly in hilly country where grades are steep. In consequence, vertical curves must often have odd lengths with vertices at plus points, especially in highway work. (See Chapter 8 for considerations affecting lengths of vertical curves on highways.) The tangent-offset method has usually been used in such situations. However, *American Railway Engineering Association. 70 PARABOLIC CURVES Example. Special case-railroad type Given: Sta. V=18+00; Elev. V=624.25; G₁= -0.15%; G₂ = +0.09%; L=600 feet. Station On tang. (A) 15 16 17 18 19 20 (B) 21 On tang. Chord Gradient G₁ a G₁+a 2a G₁+3a 2a G₁+5a 2a G₁+7a 2a G₁+9a G₁+1la a = -0.15 +0.02 -0.13 G₁+12a = == +0.04 +0.03 2a = +0.04 +0.07 +0.02 +0.09 www +0.04 -0.09 = +0.04 -0.05 +0.04 -0.01 = Curve Elev. 624.70 -0.13 624.57 -0.09 624.48 -0.05 624.43 -0.01 624.42 +0.03 624.45 +0.07 624.52 G2 (check) = B (check) 2a Preliminary Calculations = 0.09-(-0.15) 6 = +0.04% per sta. 2aL 100 = G₁+12a G₂=G1+ Elev. A=624.25 +3×0.15=624.70 Elev. B 624.25 +3×0.09624.52 PARABOLIC CURVES 71 the chord-gradient method can also be made to apply by calculating the gradients of the end subchords according to the following principles: 1. The change in gradient between a tangent and a chord equals "a" times the station length of the chord. 2. The change in gradient between two adjacent chords equals “a” times the sum of their station lengths. An application of these principles is given on page.72. The foregoing relations may be easily remembered by noting the analogy to a horizontal circular curve. The change in direction per station (D) corresponds to the change in grade per station (2a). On a circular arc the first subdeflection equals D times the nominal subchord length, and the deflec- tion from any backsight chord to a foresight chord equals D times the sum of their nominal lengths (in stations). The curve elevation at any plus point may also be found by the chord-gradient method. The procedure is to find the gradient of the subchord to the plus point (by principle 2), and then to calculate the elevation to the required plus point. As an illustration, the calculations to find the curve elevation at sta. 74+30 in the foregoing example are as follows: = +2.92% Chord gradient sta. 73 to 74 Change in gradient at 74-1.30a Subchord gradient 74 to 74+30 = -0.52 = +2.40% 252.79 Elevation at sta. 74 Change in elevation = +2.40X0.30+ 0.72 Required elevation at sta. 74+30 253.51 It is not essential to compute the complete vertical curve in order to find the elevation at any plus point. Principle 1 can be used in this same example as follows: Gradient at 70+65=G₁ =+5.20% Change in gradient 70+65 to 74+30=3.65a= −1.46 Chord gradient 70+65 to 74+30 = +3.74% Elevation at 70+65 Change in elevation = +3.74×3.65 Elevation at 74+30 ******* = 239.86 =+13.65 = 253.51 1 72 PARABOLIC CURVES Example.-General case-highway type Given: Sta. V=73+40; Elev. V=254.16; G₁=+5.2%; G2=+0.8%; L=550 feet. Station On tang. (A) 70+65 71 72 73 74 75 76 (B) 76+15 On tang. Chord Gradient G1 +5.20 0.35a = -0.14 G₁+0.35α 1.35a G₁+1.7a 2a G₁+3.7a 2a G₁+5.7a 2a G₁+7.7a 2a G₁+9.7a 1.15a G₁+10.85a = = = +4.52 -0.80 +3.72 = -0.80 = = = = = Me+ +5.06 -0.54 G === p +2.92 -0.80 +2.12 0.80 +1.32 -0.46 +0.86 0.15a -0.06 G₁+lla prada Chord in Stations = 0.35 1 1 1 1 1 0.15 +0.80 G2 (check) Curve Elev. 239.86 +1.77 241.63 +4.52 246.15 +3.72 249.87 +2.92 252.79 +2.12 254.91 +1.32 256.23 2α trav P Preliminary Calculations G 6 0.8-5.2 5.5 -0.8% per sta. 2aL 100 = G₁+11a G₂ = G₁+: Elev. A=254.16 -2.75×5.2=239.86 +0.13 256.36 B (check) Elev. B=254.16 +2.75X0.8=256.36 PARABOLIC CURVES 73 А 4-5. Tangent-Offset Method. The tangent-offset method is based upon the rule of offsets. For a special case, such as that in Fig. 4-2 VM is first computed from the external formula 4-2. Then the elevations at full stations along the tangent grades AV and VB are computed, and the symmetrical offsets-simple multiples of a-are applied to those elevations to give the curve elevations. To show the application of this method to a general case, the problem worked on page 72 is set up as on page 74. Though the foregoing method is perfectly general, it is not inherently self-checking, as is the chord-gradient method. This defect may be remedied partially by testing the second differences between elevations at equidistant points along the curve. Theoretically the second differences must be con- stant; they equal 2a for points 100 feet apart. L L₂ V₁ G1 G₂ £2 V2 Fig. 4-3, Unequal-tangent vertical curve 4-6. Unequal-Tangent Vertical Curve.-A vertical parab- ola having tangent grades of unequal station lengths is analogous to a compound curve (Chapter 3). It consists of two (or more) equal-tangent vertical curves having a common tangent where they join; and it is used where a single equal- tangent vertical curve cannot be made to fit imposed condi- tions so well. Fig. 4-3 shows an unequal-tangent vertical curve. It approximates a parabola having an inclined axis. However, for ease in calculating elevations, it is best treated as two con- secutive equal-tangent vertical curves AM and MB. Since 18 74 PARABOLIC CURVES Station (A) 70+65 (5.2x0.35) 71 72 73 74 75 76 (5.2×0.15) (B) 76+15 · 11 II Tangent Elev. =G₁X 239.86 +1.82 241.68 +5.20 246.88 +5.20 252.08 +5.20 257.28 +5.20 262.48 +5.20 267.68 +0.78 268.46 Offsets from Av=aX² Curve Elev. -0.4X4.352=-7.57 239.86 -0.4×0.352=-0.05 241.63 -0.4X1.35²=-0.73 -0.4X2.352=-2.21 -0.4X3.352=-4.49 246.15 249.87 252.79 254.91 -0.4×5.352=-11.45 256.23 -0.4×5.50²=-12.10 256.36 Check 1st Diff. -4.52 -3.72 - 2.92 -2.12 - 1.32 B (check) 2nd Diff. -0.8 -0.8 -0.8 −0.8 a Preliminary Calculations 100 (G2-G1) 2L α a = -0.4 From page 59 Elev. A=239.86 Elev. B 256.36 PARABOLIC CURVES 75 • the vertices V₁ and V₂ of the separate parabolas are at the mid- 1 2 points of AV and VB, it follows that VM = MC. The gradients of AB and of the parallel tangent V₁V₂ are G₁L₁+G₂L2 both equal to Consequently, V₁M and V₁V L₁+ L2 diverge at the rate of G₁L₁+G2L2 L₁+ L2 in the distance L₁, equals duces to equals (G L₁ (G₁L₁+G2L2 G₁; and VM, the divergence G₁), which 200 L₁+L2 E= Xt= LILA 200L (4-5) In the preceding formula the lengths are in feet, gradients always being in per cent. re- Either chord gradients or tangent offsets may be used to calculate elevations. The curve must be treated as two separate parabolas having different values of 2a. Tangent offsets, if used, are calculated from AV for the first parabola and from BV for the second; they are not symmetrical as in an equal-tangent vertical curve. 4-7. Lowest or Highest Point on Vertical Curve. The lowest or highest point on a vertical curve is sometimes needed. (This point is sometimes called the turning point on the curve.) For installing a culvert at the low point, the approximate stationing may be determined quickly by interpolating be- tween calculated elevations. The stationing of a high point or low point may be computed more accurately either by applying the chord-gradient principle or from specific formulas. t From the definition of K, the distance X, in feet from the beginning of a vertical curve to the turning point (where the gradient is zero) must be - KG₁. This may be derived mathe- dy matically by setting equal to zero in the expression dX y=aX²+G₁X. Thus, 2aX+G₁=0 at the turning point. The result of solving this equation and expressing X in foot -100G₁ units is X+= which reduces to 2a LG1 G₁-G₂ -KG₁ (4-6) 76 PARABOLIC CURVES After Xt has been computed, the elevation of the turning point may be found from the fact that the gradients from the ends of the curve to the turning point are exactly one-half the gradients on the tangents. This comes from Principle 1, which requires the gradient from A to the turning point to be G₁+ aXt (algebraically). This is equivalent to 100 100 (G₂-G1) 2L G₂+ [10 and which reduces to G₁. From the turning point to B the gradient is G2. LG 100(G1-G2) On an unequal-tangent vertical curve the turning point may occur on either of the two parabolas, its position depend- ing on the tangent grades. The final relations are: X₁ 21) ITC X2 - (LG₁₂) (1) 2 LG 2 = =( ·(10%) (1) G2 (4-7) (4-8) where X1 and X2 are the distances (in feet) to the right and left from A and B; they cannot exceed L₁ and L2, respectively. 4-8. Vertical Curve to Pass Through Fixed Point.-In the office work of grade-line design it is often necessary to find the length of a vertical curve that will join given tangents and will pass through a fixed point. The fixed point P (Fig. 4–4) may be a road intersection or the minimum clearance over a culvert or rock outcrop. Given values will usually be the gradients G₁ and G2, the elevation and stationing of the fixed point P, and the elevation and stationing either of the begin- ning of the vertical curve or of the vertex. For any given set of conditions, the unknown length of curve may always be found by substituting known values in formula 4-1. Careful attention must be paid to algebraic signs. Example.-Given: G₁=-4.2%; G₂ = +1.6%; Sta. P= 17+00; Elev. P=614.00. Case A-Beginning of curve known: Sta. = 13+00; Elev. 624.53. PARABOLIC CURVES 77 y=aX²+G₁X, where y=614.00–624.53 and a= (4) ² — (4.2) (4) Substituting, - 10.53 = = from which and -4.2L 200 6.27L=4,640 L=740 feet Case B-Vertex of curve known: Sta. = 16+70; Elev.= -G₁L 608.99. In this case y: = +(614.00–608:99). Or 200 2 M +5.01 = (530) (256+0.3) - (4.2) (2016 +0.3) 2L G 1/1/14 L 2 IN 2L which reduces to L²-744.83L+3,600=0 A rapid slide-rule solution for L is performed by first con- verting the quadratic to the form L(L-744.83) = −3,600. Then, by trial, L=740. (This is the same curve as in Case A.) // L X h P те. у 7 100 (G₂-G₁) 2L G2 V Fig. 4-4. Parabola through point P B The need for solving a quadratic equation may be eliminated by using the following alternate solution.* From the rule of offsets and the construction shown in *From suggestion by Max Kurtz, P.E., Brooklyn, N.Y. 78 PARABOLIC CURVES DP (L+h)² Fig. 4-4, EPL — h)²' But DP V- ***** V G₁h 100 1 V. for L gives G₂h and EP-V- Each term in these 100 expressions is known. To simplify, therefore, replace In this example, C @= which reduces to G₁h 100 by the constant C. Substituting and solving G₂h 100 L 5.01 2h(C+1) C-1 5.01 (−4.2)(30) 100 (1.6) (30) 100 √ D DP L+2h EP L-2h crest vertical curves, C is found from C= = = 1.1765 1 2X30X2.1765 Therefore L: =740 feet as before. 0.1765 In formula 4-9, h is positive when the station of P exceeds the station of V and negative when the reverse is true. For G₁h 100 G₂h® √ + 100 (4-9) √+: Case C-Fixed point is highest or lowest point: In this practical case the elevation of the turning point (such as the clearance over the invert of a culvert) and the vertex of the curve are known. Although the stationing of the turning point can be scaled approximately from the profile, it is assumed to be unknown and is not used in finding the required curve. If the position of the vertex is the same as in Case B and the turning point is at elevation 613.28, then the value of LG₁ X in stations is (from 4-6). By substitution, 100 (G1-G2) PARABOLIC CURVES 79 -4.2L 200 which reduces to and +4.29= A G₁ 580 −4.2L\ 2 ') - ·) — — (4.2) ( 2L - 580 0.0058 L=4.29 L=740 feet 4-9. Reversed Vertical Curve.-In highway location where the terrain is rolling, and also on interchange ramps, it is often necessary to insert reversed vertical curves. Fig. 4-5 shows a simple example of this problem. V20 G3 → C G₂ B 4.2L V₁ Fig. 4-5. Reversed vertical curve - 580 A large number of cases are possible, the conditions de- pending on the particular combination of given values. Some cases have little practical value. However, all of them may be solved by proper use of formula 4-3. In one practical situa- tion the given values will be the gradient G₁ and the elevation and stationing of points A, B, and C. A numerical example of this case is given in Prob. 4–8. 4-10. Laying Out Parabola by Taping.-Though it is incon- venient to stake a horizontal parabola by the deflection-angle method, laying out such a curve by tape alone is very simple. Fig. 4-6 shows two taping methods applied to the general case of an unequal-tangent parabola. The "middle-ordinate” method (shown by solid lines) is the simpler in field work and arithmetic; it requires only division by 2. The "tangent- offset” method (shown dotted) is based upon the rule of offsets. One variation of the middle-ordinate method follows: Set stakes at the desired controlling points A, V, and B. Measure AV and VB; divide by 2 and set the mid-points V₁ and V2. Measure V₁V2; divide by 2 and set the point M on the axis of the parabola (VM may be measured, but it is not essential). Then measure AM and MB; divide by 2 and set 80 PARABOLIC CURVES A My سلم & Axi 587.32 18+60 426.18 M Cz Fig. 4-6. Horizontal parabola by taping d G1 -2.7% +1.5% 1 2 1 the mid-points C1 and C2. Set two more points, M1 and M2, on the parabola at the mid-points of C₁V₁ and C₂V₂ (C₁V₁ and C2V2 both equal MV). If more points are required to define the curve, measure the chords AM₁, M₁M, MM2, and M₂B; divide by 2 and set four more points by middle ordinates as before. When conditions make the long chord AB inacces- sible, the middle-ordinate method is particularly suitable. V/2 In the tangent-offset method the long chord AB is divided into an even number of equal parts. The tangents AV and VB are also divided into equal parts, their number being the same as on the long chord. Then CV is measured and bi- sected, and the point M on the axis of the parabola is thus located. Offsets to the parabola from the points on the tan- gents are measured in the direction of the corresponding points on the long chord; the distances are simple fractions of VM, computed according to the rule of offsets (see Art. 4-2). In approximate work, points on the long chord may be dis- pensed with, except for C; the offsets from the tangents are computed as before, but are aligned by eye. PROBLEMS 4-1. Compute grade elevations to the nearest hundredth at all full stations on the following equal-tangent vertical curves. Include all checks. (Note: In some cases it may be necessary to carry chord gradients to 3 or 4 decimal places.) Case Sta. V Elev. V L (a) 24+25 (b) M₂ Gr +4.3% -2.5% 700 ft 500 ft B PARABOLIC CURVES 81 Case (c) (d) (e) (ƒ) Sta. Y 32+00 67 +82 129 +50 212+65 (a) (b) 24+50 18+50 (c) 32+65 (d). 67+40 130+75 213+18.6 I (e) (f) Elev. V 352.57 853.64 664.91 247.86 G₁ -0.27% +4.54% +0.16% -0.17% 4-2. Compute the values of K for each of the vertical curves in Prob. 4-1. Assuming that all cases except (c) occur on highway alignment, determine the approximate highway- design speeds for which the five highway curves give proper sight distances (see Figs. 8-27 and 8-30). G2 -0.15% +1.00% +4.83% -4.50% 4-3. Compute and check independently the curve elevation at a specified plus point on the following curves in Prob. 4-1: Case Plus Point Answer 593.68 423.73 · L 400 ft 850 ft 450 ft 650 ft 4-4. Compute the station and elevation of (a) the lowest point on curve of Prob. 4-1(a), and (b) the highest point on curve of Prob. 4–1(b). 4-5. Unequal-tangent vertical curve. Given: sta. V= 63+50; elev. V=572.46; G₁ = −3%; G₂ = +5%; L₁ =300 ft; L2=500 ft. Find: the external VM, and the station and elevation of the lowest point on the curve. (Also compute elevations at all full stations if specified by instructor.) Answers: VM=7.5 ft; sta. of lowest point=62+30, elev. = 578.76. 4-6. Unequal-tangent vertical curve. Given: sta. V= 46+75; elev. V=872.13; G₁ = +4%; G₂ = -3%; L₁ =800 ft; L2=500 ft. Find: the external VM, and the station and elevation of the highest point on the curve. (Also compute elevations at all full stations if specified by the instructor.) 82 PARABOLIC CURVES 4-7. Given the following data for six vertical curves: Sta. A Elev. A Sta. V Elev. V G1 G₂ (a) -2.0% +3.1% 28+00 (b) -3.8% -0.54% 56+50 (c) -2.7% +4.3% (d) +1.5% -2.5% (e) -2.2% +4.6% (f) +2.5% -1.2% Find L (to the nearest foot) for curves which will also pass through these fixed points: (a) Sta. P=33+00; elev. P=447.82. Answer: 822 ft. (b) Sta. P=60+00; elev. P=708.50. (c) Sta. P=25+00; elev. P=594.76. Answer: 752 ft. (d) Sta. P=17+50; elev. P=423.64. (e) Turning point Pt, elev. 332.68. Answer: 695 ft. (f) Turning point Pt, elev. 207.66. I I I Sta, and Elev. of A 53+00 265.40 4-8. Given the following data for two reversed vertical curves: 0+00 621.41 Sta, and Elev. of B 450.06 719.86 61 +00 269.40 ► 24+25 587.32 18+60 426.18 75+00 327.51 45+25 212.47 Sta. and Elev. of C 65+00 275.40 (a) (b) +1.0% = In curve (a) find: G2, G3, and the separate values of 2a. Answers: G2 +2.0%; G3 = +1.0%; 2a = +0.375 and -0.25% per station. In curve (b) the reversed curves must be of equal length and the crest curve must be twice as sharp as the sag curve, as measured by 2a. Find: G2, G3, 2a, and the sta. and elev. of B. Gi 17+00 612.06 -1.0% CHAPTER 5 SPIRALS 5-1. Foreword.-In high-speed operation over alignment on which the curves are circular arcs, an abrupt change from a straight path to a circular path is required at the T.C. of the curve. It is obviously impossible to make this change in- stantaneously. Smooth, safe operation around railroad and highway curves requires a gradual transition between the uni- form operating conditions on tangents and the different (but also uniform) operating conditions on circular curves. Any curve inserted to provide such a transition is called an "ease- ment" curve. Fig. 5-1 shows a simple curve A'E'B'. The only way in which easement curves can be inserted at the tangents, while still preserving the radius R, is to shift the curve inward to a position represented by the parallel curve KEK'. It is im- possible, however, to use a circular arc having the same length as the original circular arc. The portions KC and C'K' must be deducted in order to provide room for the easement curves AC and C'B. The easement curve AC is tangent to the initial tangent at A, at which point its radius of curvature is infinite. (The tangent may also be thought of as a curve of infinite radius.) At successive points along AC, the radius of curvature de- creases until it becomes equal to R at point C, where the ease- ment AC and the circular arc CC' have a common center at 0. Thus, instead of abrupt changes in direction at A' and B' on the original simple curve, there are now gradual transitions between the tangents and the simple curve CC' by means of the easement curves AC and C'B. In Fig. 5-1 the curved layout starts at the T.S. (tangent to spiral) and ends at the S.T. (spiral to tangent). The approach spiral AC joins the circular arc at the S.C. (spiral to curve), and the circular arc joins the leaving spiral C'B at the C.S. (curve to spiral). It should be observed that the total central angle I is unchanged. However, the central 83 84 SPIRALS angle of the circular arc is less than that of the original simple curve A'B' by the amount used up by the two spirals. Thus, the central angle Ic of the arc CC' equals I-2A. From theory to be developed, the spiraled curve AB will be shown to be exactly one spiral length longer than curve A'B'. V(P.I.) A(T.S.) A'(T.C.) D 1 1 1 1 1 1 Κ KIT- 11 Radius R Infinite Radius -A (S.C.) 1-24 Ei MARINE "E" (C.S.) K' B'(C.T.) {B(S.T.) Fig. 5-1. Simple curve with spirals The effect of an easement curve is to introduce centrifugal force gradually, thus reducing shock to track and equipment on railroads and making high-speed "streamliner" operation attractive to passengers. Moreover, the easement curve tends to "build safety into the highways" by following the natural path of the vehicle between tangent and circular arc, in that way reducing the tendency to veer from the traffic lane. An easement curve serves several incidental purposes, the most important of which is to provide a logical place for accomplishing the gradual change from zero to full super- elevation. It also simplifies, on highway curves, the addition of the extra pavement width found to be needed on curves for mechanical and psychological reasons.. Finding a suitable easement curve is not difficult. On SPIRALS 85 the contrary, the problem confronting engineers has been to decide which of several available forms should be selected. Many forms have been used. Some, including the cubic parabola, the lemniscate, and the clothoid, have definite mathematical equations; others, such as the Searles spiral (a multi-compound curve) and the A.R.E.A. ten-ehord spiral (see Art. 5-14), are empirical. Within the limits used in practice, all these easements give substantially the same curve on the ground. However, consideration of their relative merits from three important viewpoints-mathematical simplicity, adaptability to a variety of conditions, and ease of staking out in the field-has led most American engineers to favor the clothoid, or the spiral first investigated by the Swiss mathematician, Leonard Euler. The clothoid (called the Euler spiral, the American spiral, or the transition spiral) is adopted in this book. For simplicity it will be referred to hereafter as "the spiral." All spiral tables (Tables XI through XVI-C) are based upon this spiral; some are set up with small corrections which enable rapid con- version from the arc definition to the chord definition of D on the circular arc, thus changing the spiral practically to the A.R.E.A. ten-chord form used in the past on many railroads. Therefore, the tables are adaptable to wide usage. 5–2. Basic Geometry of the Spiral.—The spiral obeys a simple, exact law: The radius of the spiral at any point is inversely · proportional to its length. Although the spiral is a mathematically rich curve with applications in other fields of pure and applied science, its use in route surveying involves spiral parts which have clear graphical significance, simple formulas, and easily remembered analogies to the parts of a simple curve. Only a few relations require use of calculus in their derivations. Tabulations of spiral functions are given so completely in Part III that the actual calculation and staking of a spiral-curve layout requires only slightly more trigonometry and very little more field work than are needed for a simple curve. On the other hand, it is possible to compute a satisfactory transition spiral without referring to special tables of any kind (see Art. 5–13).· 86 SPIRALS All the relations needed for computing and staking a spiraled curve stem from Fig. 5-1 and the law of the spiral. In contrast to a circular arc, the spiral is a curve of variable radius, or variable degree of curve. At any point on the spiral, however, the inverse relationship between R and D is still correctly represented by equation 2-10. Since the radius of the spiral is infinite at the T.S., its degree of curve at that point must be zero. But the law of the spiral shows an inverse relationship between the radius at any point and the distance to that point from the T.S. The following statement is therefore true: The degree of curve of the spiral increases at a uni- form rate from zero at the T.S. to the degree D of the circular arc at the S.C. The constant rate of increase in degree of curve per station along a spiral is represented by k. The basic formula for k is derived from its definition by dividing the total change in degree of curve, D, by the length of the spiral in stations. Since this length is Ls 100' 100D Ls k = (5-1) The constant k is useful in a variety of problems. As an illustration, suppose a spiral is required in making the transi- tion between arcs of a compound curve on which D=3° and Ds=9°. In such a case a limitation would be placed on the sharpness of the transition by specifying, for example, that the value of k should not exceed 2° per station. This condi- tion would be met by a 300-ft spiral (k=2°) or by a 400-ft spiral (k=11°). These lengths are the latter portions of complete spirals that are 450 ft and 600 ft long. An extremely important element of a spiral is its central angle, or spiral angle, A. For a curve of constant radius (a circular arc), equation 2-14 shows that the central angle equals the length of curve in stations times the degree of curve, LD or I = Since the spiral is a curve of uniformly changing 100 degree of curve, it follows that its central angle equals the length of spiral in stations times the average degree of curve, or SPIRALS 87 K (5-2) The foregoing central angle is exactly half that of a simple curve of the same length and degree (see formula 2–14). The S.C. and the C.S. are comparable to the C.C. of a com- pound curve; at least one of them must be occupied by the transit in staking the layout by deflection angles. In con- sequence, the coordinates of the S.C. are two of the most important spiral parts. Their values, which are X = AD and Y = DC, have been computed from exact relations derived in Appendix A and tabulated in the spiral tables of Part III; it is never necessary for the surveyor to compute them from their theoretical formulas. J B ~|~ Δ Fig. 5-2 is a sketch of the first part of Fig. 5-1. The original simple curve has been omitted, however, and certain construction lines have been added to aid in deriving necessary formulas. A L&D 200 R T Fig. 5-2 F V G Tangent at C The point K (the theoretical point where a tangent to the circular curve produced backward becomes parallel to the tangent AV) is known as the offset T.C. It is sometimes needed in the field; but is used more often in computations. If a perpendicular is dropped from C to OK, the coordinates of the offset T.C., which are X。= AJ and o=JK, may be written by inspection. Thus, 88 SPIRALS (5-3) (5-4) The distance o is often called the "throw" (in Great Britain, the "shift"). It is the distance through which the circular curve must be moved inward in order to provide clearance for inserting the spiral. The shift E'E at the middle of the curve (Fig. 5–1) is also called the throw. Obviously, E'E = o sec ≥1. In any problem the particular distance referred to as the throw will be clear from the context. A (T.S.) snipbu aluyut k Consequently, and By integration, Xo=X-R sin ▲ No-Y-R vers ▲ 0 = L δ dot of Fig. 5-3 ds | However, from the law of the spiral, r: R=L,:l 1 dl R Ls dd= Fig. 5-3 represents a spiral on which P is any point located by the spiral angle 8, the radius r, and the length 1. Dif- ferentials being used, ፩ = dl r 72 2 R L A=TH Δ Pdx dl 2 R in which the angles are in radians. R To P.I. dy S.C. (5-5) (5-6) SPIRALS 89 When 5-5 is divided by 5-6 and the resulting equation is solved for 8, it is found that Therefore, -(₁₂)'s Δ sin d= d= which expresses the following important property: Spiral angles are directly proportional to the squares of the lengths from the T.S. (On a simple curve, central angles are directly proportional to the first powers of the lengths from the T.C.) Also, from Fig. 5–3, dy=8 (approximately) dl dy = 3 dl - (RL)dl 2 Y a By integration, This relation shows that: Tangent offsets are closely proportional to the cubes of the lengths from the T.S. If the deflection angle to any point P be designated by a, sin a==a (approximately) When the value in 5-8 is substituted for y, 12 6R L 73 Ꮾ Ꭱ Ꮮ. Hence, A, the deflection angle to the S.C., is Ls 6 R (5-7) A α (5-10) Approx. If relation 5-9 is divided by 5-10 and the resulting equation is solved for a, (5-11) Approx. = 2 a-(+)'4 (5-8) Approx. (5-9) Approx. This equation expresses another important property: Deflection angles are closely proportional to the squares of the lengths from the T.S. 90 SPIRALS (On a simple curve, deflection angles are exactly proportional to the first powers of the lengths from the T.C.) It follows from the foregoing that a = 3/31 8 (5-12) Approx. A = A (5-13) Approx. Relations 5-12 and 5-13 are correct for most practical pur- poses. Theoretically, the relations produce values which are slightly too large. Should exact deflection angles be needed (as on a very long, sharp spiral), they are given in Table XV for any ten-chord spiral, and may be obtained quickly from Tables XVI and XVI-C for a spiral staked with any number of chords up to twenty. The derivation of the small correction which, if subtracted, would make equations 5-12 and 5–13 exact, is given in Appendix A. and The triangle ABC in Fig. 5-2 is analogous to that formed by the vertex and tangent points of a simple curve. The simple curve has equal tangents and equal angles at the long chord; the spiral, on the contrary, cannot have equal local tangents or equal angles. From formula 5-13, the angle BCA must be almost exactly equal to 3 A. The three lengths AC, AB, and BC are occasionally useful in field work; they are called the long chord (L.C.), long tangent (L T.), and short tangent (S.T.) of the spiral. When needed, their values are taken from tables, though they may readily be computed when X, Y, and ▲ are known. For the flat spirals used on modern alignment, the L.T. and the S.T. are approximately in a 2:1 ratio. 5-3. Simple Curve with Spirals.-Theoretical relations for laying out any spiral, once the T.S. has been located, were given in Art. 5-2. The T.S. is usually staked, as in a simple curve, by measuring the calculated tangent distance T, from the P.I. The tangent distances will be equal in the usual case of equal spirals at the tangents. There is rarely any justifica- tion for using unequal spirals, except in realigning existing railroad track. If equal spirals are assumed in Fig. 5-2 and a line is drawn parallel to AV from K to G, T, is made up of the three seg- SPIRALS 91 ments AJ, KG, and FV, which are Xo, R tan I, and o tan I. Therefore, or (5-14) Ts=(R+0) tan 11+X。 Ts=T+X。+o tan 11 (5-15) By the same construction, the external distance E, (VE) may be divided into the two segments EG and GV, which are R exsec I and o sec I. Therefore, Es=E+o sec I (5-16) By means of a trigonometric conversion, this equation may be written in the form (5-17) E₁ = (R+0) exsec 11+0 For the rare case of unequal spirals, 781=T+X01+ and 02-01 COS I sin I (5-15a) T32T+X02+ (5-15b) In these formulas the subscripts 1 and 2 refer to the initial and the final spirals and the resulting unequal values of T.. The last term in each formula may be positive or negative, depending on the magnitudes of 01, 02, and I. (See the end of Art. 5-9 for general versions of these formulas as applied to a completely-spiraled compound curve.) 01 02 cos I sin I Calculations and field work for a spiral follow the general pattern described in Chapter 2 for a simple curve; the varia- tions are in details only. In the usual case, sta. P.I., I, and D are known. Briefly, the sequence of the remaining work is as follows: (a) Select Ls to fit the imposed conditions (Art. 5–17 con- tains reference to the choice of L.). (b) Calculate A from formula 5–2. (c) Take X and Y from tables, and calculate X。 and o from formulas 5-3 and 5-4. (This is theoretical; in practice, Xo and o also may be taken from tables.) (d) Calculate T, from formula 5-14 or formula 5–15. 8 (e) Calculate the stationing of the T.S., which is sta. 92 SPIRALS P.I.-T.; the stationing of the S.C., which is sta. T.S.+Ls; the stationing of the C.S., which is sta. S.C.+100 (1-2 A), and the stationing of the S.T., which is sta. C.S.+Ls. D (f) Calculate deflection angles at selected points on the approach spiral, using formulas 5-13 and 5-11. (This is theoretical; for regularly spaced points on the spiral, tables or abbreviated relations may be used.) (g) Set hubs at the T.S. and the S.T. by measuring Ts from the P.I. (h) Occupy the T.S. and stake the approach spiral to the S.C. by deflection angles. (L, ordinarily equals the sum of the chords used to lay it out; corrections to chords are necessary only for fairly long chords near the end of long, sharp spirals.) (i) Occupy the S.C. and backsight to the T.S. with (A—A) set off on the proper side of 0°; A—A is almost exactly equal to 2 A. Then, plunge the telescope and stake the simple curve to the chosen check point by the usual methods. (The check point may be the C.S. or any point on the simple curve.) (j) Occupy the S.T. and run in the leaving spiral to the C.S. (For regularly spaced points, the deflections are the same as those on the approach spiral.) (k) Make the final check at the selected check point, which should preferably be near the middle of the simple curve. A set-up at the C.S. is required if this is done, but on final loca- tion the resulting smooth junction at the C.S. justifies this method. Conditions frequently warrant varying the foregoing pro- cedure. For example, instead of following steps (h) and (j), the S.C. and the C.S. may be located (or checked) by any one of three other methods: (1) by measuring the X and Y co- ordinates; (2) by measuring the long tangent (L.T.), the angle ▲, and the short tangent (S.T.) of the spiral; (3) by measuring A and the long chord (L.C.). Tables may be used to expedite some of the operations just described. Table XI: See explanation on page 410. SPIRALS 93 Table XII: See explanation on page 410. Table XIII: This table is explained in Art. 5–11. Table XIV: This table is explained in Art. 5–12. Table XV: This table gives exact deflection angles for any spiral up to = 45° staked with ten equal chords. A If a table such as Table XV is not available, it is not neces- sary to use formulas 5-13 and 5-11 when points are spaced regularly. The following method is quicker: Let a₁=the deflection angle (in minutes) to the first regular point. Then (5-18) a₁ (in min.) = 20 A(in degrees) n² where n = the number of equal chords on the spiral. Calculate a₁ for given values of ▲ and n. Then, to find the remaining deflection angles, simply multiply a₁ by the squares of the chord-point numbers. Thus, if A were 6° and n were 10, a₁=1.2 min. The remaining deflections are 4 α1, 9 α1, 16 α1, 25 ai, etc. (The student should check these against Table XV.) Table XVI: This table is an extension of the principle just described (see the examples on pages 438 and 439). The "corrections" mentioned are the result of the slight approxima- tion in the relation a= d; their source is explained in Appen- dix A. The theory underlying deflections for a set-up on the spiral is outlined in Art. 5-7. 5-4. Locating Any Intermediate Point on Spiral.-Though the spiral is usually laid out with equal chords, the number commonly being ten, such a process does not serve all purposes. For example, on location prior to grading, earthwork esti- mates are made more rapidly if cross-sections are taken at regular full stations and possibly half-stations. Furthermore, important "breaks" requiring cross-sectioning may fall be- tween regularly spaced points. During construction it may be necessary to set points on a spiral at trestle bents or on bridge piers. For these reasons it is convenient to have a simple formula for determining the deflection angle to any point at a distance l feet beyond the beginning of a spiral. The 94 SPIRALS following relation serves this purpose: k l2 1,000 (5-19) The constant k may be computed from formula 5-1. It is recommended that an integral value of k be chosen in order to simplify the computation. Sta. a (in min.): 5-5. Field Notes.-Notes for staking a spiraled curve are set up in continuous stationing according to a modification of the form in Art. 2-9. Deflection angles for the spirals should start with 0° at the T.S. and S.T. The comments in Art. 3-13 are pertinent. Form of Notes for Spiraled Curve Total Point Defl. 44+00 43+50 43+00 42+-50 = 46+55.8 47+15.8 OS.T. 0°00′ | At S.T., orient by 0°04' sighting to P.I. 0°14' with 0°00′ on 45+95.8 45+35.8 0°32' vernier. Make 44+75.8 0°58' 44+15.8 C.S. 1°30' 42+43.6 S.C. 1°30' 41+83.6 0°58' 41+23.6 0°32' 40+63.6 0°14' 40+03.6 0°04' 39+43.6 OT.S. 0°00' Field Procedure 44+15.8 C.S. 2°35' At S.C., orient by 2°21' sighting to T.S. 1°36' with 3°00' on 0°51' proper side of vernier. 0°06' 42+43.6 OS.C. 0°00' final check at C.S. At T.S., orient by sighting to P.I. with 0°00' on vernier. Curve Data I=14° 10' D=3° P.I.=43+31.1 T₁=387.5 Ls=300 SPIRALS 95 In the accompanying form, the columns for calculated and magnetic bearings have been omitted in order to insert explanatory notes. Otherwise the form is a typical example of the left-hand page of a field book. Distances are here com- puted to tenths of a foot, and deflection angles are taken to the nearest minute. In final location a higher degree of precision would be required. In the foregoing example both spirals were run as five- chord spirals. The deflection angles could be computed by finding a₁ from formula 5-18 and multiplying by the squares of the chord-point numbers; or they could be taken directly from Table XV for every other chord point of the ten-chord spiral. To illustrate how easily spiral deflections may be computed to fit any desired conditions, the following alternate notes are given for staking the approach spiral. Alternate Notes for Approach Spiral Case A: 4-chord spiral. L'se formula 5-18 and Table XVI. Sta. Point S.C. 42+43.6 41+68.6 40+93.6 40+18.6 39+43.6 T.S. Total Defl. 1°30' 0°51' 0°22' 0°06' 0°00' Case B: stakes at regular full stations. Use formula 5-19. Sta. Point S.C. 42+43.6 42+00 41+00 40+00 39+43.6 T.S. Total Defl. 1°30' 1°06' 0°24' 0°03' 0°00' 5-6. Principle of the Osculating Circle.-In Fig. 5–4, P. is any point on a spiral just as in Fig. 5-3. The circular arc drawn tangent to the spiral at point P has a radius r equal to the radius of curvature of the spiral at the point of tangency. Any such tangential arc is called an osculating circle. From the law of the spiral, the osculating circle at any point must lie inside the spiral toward the T.S. and outside the spiral toward the S.C. At the T.S. a spiral has an infinitely long radius of curvature and a degree of curve equal to zero. Therefore, the osculating 96 SPIRALS circle at the T.S. is a straight line coinciding with the main tangent. But any circle is a curve of constant degree, whereas a spiral is a curve of uniformly changing degree. It follows, as an important principle, that: A spiral departs in both directions from any osculating circle at the same rate as from the tangent at the T.S. In order to conform to the osculating-circle principle, any complete spiral is bisected by its throw o, and vice versa. That is, line JK and spiral AC (Fig. 5-2) bisect each other. Since tangent offsets are closely proportional to the cubes of the spiral lengths, this means that Y 4 Another useful relation is found by substituting Y (from formula 5-8), giving 1 1 1 1 T 0 L (5-21) Approx. 24 R The mutual bisection of spiral and throw is also true for any portion of a spiral. In Fig. 5-4, for example, assume that P A(T.S.) 1 0 = 2 Osculating Circle at A To P.I. P (5–20) Approx. 2 L' 6R 3- for Fig. 5-4. Osculating-circle principle Osculating Circle at P SPIRALS 97 is the second of several regularly-spaced chord points on a spiral. The offsets to chord point 1 from the osculating circles at A and P must be equal, and each is equal to the offset at chord point 3. An interesting consequence of the foregoing principles is that the three shaded portions of Fig. 5-4 are equal in area. This property has practical value in computing areas of high- way pavement on spiraled curves. See Art. 8-21. 5-7. Transit Set-ups on Spiral.-Field conditions sometimes require a transit set-up on a spiral. The osculating-circle principle supplies the basis for locating any other point on a spiral from such a set-up. In Fig. 5-5 assume that the spiral has been staked as far as point t from a set-up at the T.S., and that obstructions to the line of sight prevent further staking from that set-up. A(T.S.) To P.I. b "Osc. Local Tangent /t Osc.o Fig. 5-5. Transit set-up on spiral Qs The problem is how to orient the transit at point t and stake the rest of the spiral from the new set-up. Point b is any point on the spiral (including the T.S.) to which a backsight is taken in order to orient the transit. Point f is any point on the spiral beyond point t (including the S.C.) which is to be located by means of a foresight from t. The angle o is the orientation angle turned between the backsight to b and the 98 SPIRALS local tangent, and of is the deflection angle to the foresight point f. Spiral lengths from the T.S. to these points are denoted by l, lt, and lƒ. Angle & equals the deflection angle for a circular arc having a length of (ll) and a degree of curve equal to that of the osculating circle minus the angular departure between the osculating circle and the spiral in the distance tb. Since D is the degree of curve of the spiral at the S.C., the degree of the osculating circle at t equals (1) b= 1/1t-lv 1/lt ( 5b)(4)-(4-6)²s. (Refer to formulas 2-12, 2\ 100 Ls Ls 200A 5-7, and 5-12.) When D is replaced by its equivalent, Lis this expression may be simplified to $b=(2lt+lb) (lt-lb) Δ. D. In general, (5–22) Approx. 3L2 3 Angle of equals the deflection angle to the same osculating circle for a length of (-l) plus the angular departure between the osculating circle and the spiral in the distance tf. 1/ls - li Ls 2 That is, 4, (1) (12) + (1 - 4) s, )A, which may 2 100 simplified to Δ $ƒ=(ls+2 le) (ls—le) 3L2 (in min.) = (2n₁+nь) (nı− Nь) may be (5-23) Approx. The total deflection angle from backsight to foresight equals ø¿+$ƒ. When formulas 5–22 and 5–23 are added, the simplified result is (5-24) Approx. $=(lo+le+ls) (ls—lo) 312 Where stakes on a spiral are spaced regularly and a set-up is required on a regular chord point, the foregoing formulas may be expressed in terms of chord point numbers. Since L, equals n equal chords and the length l of any portion of Ls times the chord point number, the spiral sighted over equals n it follows that 20A(in deg.) (5–25) Approx. n? SPIRALS 99 Also øƒ(in min.) = (nƒ+2nı) (ns−ni) and (in min.) = (no+ni+ns) (ns−no) Preliminary computations: LSD 900X10 Δ 200 200 Sight at Coefficient Point 1 2 3 20▲ (in deg.) n2 The second terms in the six foregoing formulas represent the spiral lengths sighted over in performing the indicated oper- ations. In the last three formulas the final term is the deflec- tion angle in minutes to the first regular chord point (see formula 5-18); the products of the first two terms yield the coefficients given in Table XVI. These formulas give accu- rate results except for long sights over long sharp spirals, where the effect of the slight approximation in formula 5–12 may become noticeable. Exact results may be obtained by applying the corrections found in Table XVI-C. 45 Example.-Given: Da=10°; Ls=900 ft. Spiral to be staked using fifteen 60-ft chords. Assume that obstructions require set-ups at chord points 5 and 12 in addition to the T.S. 204(in deg.) (5–27) Approx. n2 45° a1 Computation of Deflections Deflection (Table XVI) X a₁ = to Spiral Δ - 1 4' 4 4' 9 4' 16 4' (64')1°04' 25 4' (100')1°40′ 2 · (5/5)² > 0°04' 0°16' 0°36' (5–26) Approx. 204 20X45 n² 152 } Transit at T.S. (Orient by sighting along tangent with 0°00′ on vernier.) 4' X45°=5° Comments These same deflections obtainable from Table XV at every other chord point by entering Table with 100 SPIRALS Sight at Coefficient Point (Table XVI)X a₁ = to Spiral Deflection 0 (T.S.) 50 6 7 8 9 10 11 12 Transit at Point 5 (Orient by backsight to T.S. with 3°20′ on vernier.) 4' 16 4' 34 4' 54 4' 76 4' 100 4' 126 4' 154 4′ 5 203 13 37 14 76 15 (S.C.) 117 4' 4' 4' 4' Comments (200') 3°20′ (64') 1°04′ (136') 2°16′ (216') 3°36' (304') 5°04' (400') 6°40′ (504) 8°24′ (616′)10°16′ Orientation angle Transit at Point 12 (Orient by backsight to point 5 with 13°32′ on vernier.) (812')13°32' (148') 2°28′ (304') 5°04' (468′) 7°48′ equals twice the deflection from the T.S. Plunge tele- scope after backsight and set deflections for points 6 to 12 on the other side of 0°00'. Plunge telescope after backsight and set deflections for points 13 to 15 on the other side of 0°00'. If this spiral were staked entirely from one set-up at the T.S., the deflections to the distant chord points would have to be decreased by slight corrections. Table XVI-C shows that these corrections exceed minute when the ratio of spiral length sighted over to length Ls is 0.7 or greater. In this example the correction for chord point 12 would be -1.25 minutes; for the 900-ft-long sight to the S.C., it would be -4.77 minutes. Obviously, one beneficial effect of setting up at points 5 and 12 is the elimination of such corrections, for the longest sight (between points 5 and 12) has an l¸: Ls ratio of less than 0.5 and a negligible correction. Regardless of the location of transit set-ups used in staking a spiral, the actual chords taped should (theoretically) be slightly shorter than their nominal arc lengths. For most practical purposes, L, equals the sum of the nominal chords used to stake the spiral. Chord corrections can ordinarily be SPIRALS 101 neglected; they are necessary only for fairly long chords near the end of a long sharp spiral. In the preceding example the position of the S.C. would overrun its theoretical position by only 0.04 ft if the spiral were staked entirely from the T.S. with fifteen 60-ft chords. If necessary to allow for this small discrepancy, each of the last four chords could be taped as· 59.99 feet long. Chord corrections may be found with the aid of Tables II and IV. 5-8. Spiral Between Arcs of Compound Curve.-If either arc´of a compound curve is sharp enough to require insertion of a spiral at the main tangent, a spiral between the two arcs may also be justified. In Fig. 5-6 arc KC is moved inward to provide room for inserting spiral AC (the main tangents are omitted to simplify the sketch). The radius of the spiral at A equals RL, instead of infinity as in Fig. 5-1; that at C equals Rs. In other words, AC is a portion of a spiral cut to fit between curves of degree D1 and Ds. An additional value-usually the length AC but sometimes the offset JK-must be assumed. The problem is then determinate; only one spiral will satisfy the given con- ditions. J А = Local A Tangent I R2 | 1 K Ost Local & Tangent XRS | Fig. 5-6. Spiral between arcs of compound curve From the principle of the osculating circle, the offset or "throw" JK is the value of o for a spiral of length AC and 102 SPIRALS terminal degree Ds-DL. It also follows that, for all practical purposes, JK and AC bisect each other. Accordingly, the problem of calculating deflections for running in the spiral AC is identical with that of calculating the deflections for staking the remainder of a spiral from a set-up at any point, as explained in Art. 5–7. If the length of the spiral AC be designated by ls, its true central angle equals the sum of the central angles for the simple curves produced, that is, for the arcs AJ and KC. From formula 2-14, true ▲= which reduces to true ▲= ᎠᏞ (b) (D6) + (1) (1Ds) 100 100 (200) (DL+Ds) which reduces to For computing the spiral deflections from the local tangent at A or C, the nominal value of A is used. This is defined as the difference between the true central angle of the con- necting spiral and that of the osculating circle at either end. ls DL Since the osculating circle at A has a central angle of 100 in the distance ls, ls D L 100 (Ds-DL) nominal A = true A Is 200 nominal A • (5-28) (5–29) (The nominal A may be taken from Table XI if the table is entered with l, as L, and with Ds-DL as D.) Example.—Given: Dı=2°; Ds=7°; AC=l,=300 ft. Here Ds-Dɩ=5°; consequently, o=3.27 (Table XI). From formula 5-1 the value of k for this spiral is 100 (7° -2°) 300 = 13° per station, which means that l, is the last 7° 300 ft of a complete spiral that is X100=420 ft long. k From formula 5-28, true A=13°30′. From formula 5-29 (or Table XI), nominal ▲=7°30′. To compute spiral deflections, use the nominal A in for- mula 5-18. Thus, if the spiral AC were to be divided into four equal parts, SPIRALS 103 20×7.5° -9.375' 42 and the deflections to the spiral from the osculating circle at A are a1, 4 a1, 9 a₁, and 16 a₁. These are added to the deflec- tions from the tangent to the corresponding points on the osculating circle, namely, 0°45', 1°30′, 2°15′, and 3°00′. The final deflections are: 0°54', 2°08′, 3°39', and 5°30'. For running in the spiral from the sharper arc (set-up at C), the required deflections from the tangent would be 2°28′, 4°38′, 6°28', and 8°00'. Note: This spiral is one of three used in Prob. 5-5(a). T.S. a1= 5-9. Completely Spiraled Compound Curve.-Fig. 5-7 shows the geometric relations between the nonspiraled com- pound curve ACB and the same curve provided with three XOL AA =tL 0° 1 1 5.1 R₁ OS I C.15.2 KH. S.20.2 S R b J C.25.3 Os FIL Jo OL B B S.T B OL Fig. 5-7. Completely-spiraled compound curve S Xos 104 SPIRALS transition spirals. The spirals themselves are omitted.from the sketch, and the offsets needed to accomodate them are exaggerated for the purpose of clarity. For this case, in which the layout begins with the flatter arc, point a is the offset T.C. for the first spiral. Its throw A'a is denoted by oi. The corresponding throw for the third spiral is B'b, denoted by os. The throw oc for the combining spiral between the two arcs is JK (see also Fig. 5-6). Assume the given values to be sta. V, I, IL, RL, Rs, and the lengths (or the k-values) of the spirals. The problem is to find the stationing of all curve points (T.S., S.1C.1, C.1S.2, etc.) so that the layout may be computed and staked. The best solution directly from the given data is to find VB' and A'V by the traverse method. Use the traverse OLA'VB'OsOĩ, and follow the procedure developed in Art. 3-6. (Note the simi- larity between the following tabulation and that on page 54.) Length Azimuth RL+OL 0° A'V 90° VB' 90°+I -VB' sin I — (Rs+os) cos I Rs+os 180° +1. RL-RS-oc 180°+IL -(RL-Rs-oc) cos IL From Σ latitudes, VB': Latitude RL+OL 0 C Departure 0 A'V VB' cos I G − (Rs+os) sin I (RL-RS—oc) sin IL (RL+0L)-(Rs+os) cos I−(R-Rs-oc) cos Iĩ sin I (5-30) Then from Σ departures, A'V= (Rs+os) sin I+(RL-Rs-oc) sin IL-VB' cos I (5-31) The tangent distances T. and Tss are X。z+A'V and VB'+X。s. Stations of the curve points are then found in the usual way by subtracting TÎ from sta. V to obtain sta. T.S. and adding successive spiral and arc lengths to sta. T.S. It is necessary to use the principles brought out in Art. 5-8 in computing the true central angles of the circular arcs. If the layout begins with the sharper arc, formulas 5-30 and 5-31 remain the same. The only difference is that sta. T.S. SPIRALS 105 equals sta. V minuș Tâs, and, of course, the stationing increases in the direction opposite to that in Fig. 5–7. This problem may be solved by another method that is particularly convenient in case the given values pertain to a nonspiraled compound curve already computed. In such a case the tangent distances (TLAV and Ts=VB) are known from appropriate formulas derived in Art. 3-6. If it is now required to modify the curve so as to insert three spirals, XoL and Xos are found readily from Tables XI or XII. The additional corrections needed to convert TL and Ts to TsL and Ts are the distances AA' and BB', denoted by tɩ and ts. The arcs AC and CB of the nonspiraled curve are shifted to their locations aJ and Kb on the spiraled curves as the result of movements of translation involving the throws oL, oc, and The combined effects of these translations yield the distances tɩ and ts, which may be written by means of the enlarged sketch in Fig. 5-7 as Os. tL os-oL cos I—oc cos Is sin I OL-OS COS I+oc cos IL sin I and (5-32) ts: (5-33) Both tz and ts will normally be positive quantities. If either is negative, points A and A'(or B and B') are inter- changed in Fig. 5-7, and the t-correction must be subtracted. One advantage of this method is that the terms in formulas 5-32 and 5-33 are so small that the t-corrections may be found by slide-rule calculation. If the combining spiral is omitted, oc equals zero and the formulas yield the t-corrections either for a compound curve with spirals at the main tangents only or for a simple curve with unequal spirals. (Compare the resulting t-correction formulas with the final terms in formulas 5-15a and 5-15b.) Furthermore, for a simple curve with equal spirals, o1= os=0, and tr=ts. In this case the t-correction becomes -cos I (0) (1 - 00s 1) which equals o tan I (see formula 5–15). sin I 5-10. Fitting Spiraled Curve to Specified Es or Ts.—As in the case of a simple curve, it may be necessary to fit a spiraled curve to definite field conditions such as a specified E, or T.. 106 SPIRALS 8 There are voluminous tables* giving convenient combinations of D and L, which approximate a specified value for E, or Ts; the exact values of E, and T, for a selected combination are obtained by interpolation. The tables in this book may also be used to select a spiral- curve layout fitting given conditions. Example.—Given: I=27°00′; E,=approximately 34 ft. Determine suitable values of D and L. (slide-rule calculation). First use Table VIII to obtain a fairly close value of D. Thus, D 163 34 = 4.8° (roughly) Ls D shows two unknowns. 200 Consequently, there are any number of combinations of A and Ls which will fit the conditions. A glance at Table XI might suggest a suitable combination. Suppose that Ls is assumed to be 250 ft. Then 250 Δ ×4.8°=6.0° (tentatively) 200 Consideration of the relation A - From Table XII, o=0.00872×250=2.2 (approx.). A close value of R+o is then found from formula 5–17. 34-2.2 Thus, R+o = 1,119 0.02842 == Therefore, R=1,117 and D=5°08′ (by Table I). If D were chosen to be 5°, the 250-ft spiral is one listed in "selected spirals" of Table XI. For this combination, Es would differ slightly from 34 ft, but a rigid requirement per- mitting no deviation from a fixed E, is rarely met (it would require an odd value of either D or L、). If the approximate value of Ts were fixed, the first trial calculation may also be made by using Table VIII. This will give a rough value of D, but will allow selection of a suitable value for Ls. Since o is very small in comparison with R, formula 5-14 can be expressed approximately as T's=T+1Ls, which can be solved for T. Suppose that T', is fixed at approximately 400 ft in this example. From Table VIII, SPIRALS 107 1,376 400 D= =3.4° (roughly) Trying L, as 250 ft, T=T¸—½L¸-400-125-275 ft (approx.); and (by Table VIII) D=1,376 275 - -5° as before. 5-11. Spiraled-Curve Formulas with Radius as Parameter. In connection with the use of even-radius curves (Art. 2-12) it is convenient to express formulas for needed spiraled-curve parts in terms of the radius of the circular arc. In Fig. 5-2, certain of the distances may be related to R by means of coefficients N, P, M, and S, which have the following significance: NR=the distance AD=X PR=the distance DC=Y M_R=the distance OJ=R+0 SR the distance AJ = X。 Values of these coefficients for R=1 have been computed for various values of ▲ (see Table XIII). When these values are substituted in the following relations, parts needed for computing and staking the layout result: X=RN Y=RP T= R(M tan I+S) E.= R(M sec I−1) = R[M exsec I+(M-1)] (5–37) 8 (5-34) (5-35) (5–36) A=[2(2 5] p 2(2—p). L₁ =2 R ▲ (radians) (5-6) In applying this procedure to practical problems in the highway field, the "proportion rule" has been suggested* for choosing Ls. The "proportion of transition" p is the ratio of the length of the two spirals to the total length of the spiraled curve. It may be proved that (5-38) *Leeming, J.J., "The General Principles of Highway Transition Curve Design," Transactions, ASCE, Vol. 113, 1948, pp. 877 ff. 108 SPIRALS It is not possible (except by coincidence) to have integral values of R, Ls, and ▲ (in degrees); one, at least, must be an odd value. When it is desired to use Table XIII without interpolation, the odd variable is L、. As an illustration the example of Art. 5-10 is solved by this method. For a trial, assume that p=about 0.6 (evidence shows that the natural value of p ranges between 0.4 and 0.7 for high-speed operation on highways). Then ^=[26 0.6 ¸2(2−0.6). 6)] X27°=5.8° Round off to 6° for convenience in using Table XIII. From formula 5-37, R=1,130 (approx.). Use R=1,100, which is listed in Table V. Finally, 2 A=12°=0.20944 radians (Table VI) and L¸= 0.20944×1,100=230.4 ft. If Ls were rounded to a convenient value (say 250 ft), then A would be the odd value, but the circular arc could still be staked readily by means of the deflections listed in Table V. When the chord definition of D is used, ▲ is obtained from 5-38; Rc, from 5-37; De, from Table I; and L,, from 5-2. The coefficients in formulas 5-34 through 5-37 apply whether or not a central circular arc is present; that is, they also can be used for the double-spiral curve described in the next article. 5-12. Double-Spiral Curve. Some engineers advocate making curves transitional throughout by using a double spiral, which consists of two equal spirals placed end to end with the curvature changing from increasing to decreasing at the middle of the layout. This simplifies the selection of a curve that will have a specified value of E, or Ts; since ▲=11, it follows that Ts=X+Y tan I and E. = Y sec 11. Es 8 Table XIV gives values of T's and E, for L,=1. Multiply- ing the proper tabulated values by the actual length L, gives Ts and E¸ for a double-spiral curve having the given value of I. Obviously, a double-spiral curve of given I is longer than a spiraled simple curve having the same D; hence there is a much greater length over which operating conditions-cen- trifugal force and superelevation, in particular-are variable. For this reason, the all-transitional curve should be used only in exceptional cases, at least on highway work. SPIRALS 109 5-13. Calculating Spiral Without Special Tables. It is possible to compute a spiral without reference to special tables (if the engineer will do this occasionally, he will understand the spiral better). The method suggested is based upon cer- tain approximations the significance of which may be seen by examining Fig. 5-2 in connection with Table XI. All calcu- lations may be made by slide rule. Procedure Recommended for Flat Spirals (up to A=5°) (a) Compute Y from Y=L, sin 34 Y2 2 Ls (b) Compute X from X=L,- Y (c) Compute o from o= (d) Compute Xo from Xo * X (e) Compute deflections by applying the principle that deflections are proportional to the squares of the distances. If the foregoing method is applied to a 200-ft spiral joining a 3° curve, the computed values are: Y=3.49, X=199.97, 0=0.87, and Xo=99.98. For all practical purposes these are the same as the values listed in Table XI. As A increases beyond 5°, more significant differences arise between the exact and approximate values of these four spiral parts. The greatest difference will be found in the value of X. However, X is not often needed in the field. The values of o and X。 are of more practical use, for they are needed in obtain- ing T. by formula 5-15. The following table shows that a relatively small error in T, would result from using the approxi- mate method even when A is as large as 15°. 0 Given Ls=300 D=10° (A=15°) Y= X= 0 = X。= Values by Approx. Method 26.1 298.86 6.52 149.43 Exact Values from Table XI Da=10° Dc=10° 26.05 297.95 6.53 149.66 26.05 297.95 6.51 149.47 5-14. The A.R.E.A. Ten-Chord Spiral.-The ten-chord spiral of the American Railway Engineering Association has been used by many American railroads since about 1912. This spiral is an approximation of equation 5-8 in which L、 110 SPIRALS is measured by ten equal chords instead of around the spiral itself. It is commonly used in connection with the chord definition of D. The spiral in this book may be converted practically to the A.R.E.A. spiral by applying the corrections marked with an asterisk, as explained in Part III on page 44. (See Appen- dix A for the source of those corrections.) Consequently, there is no need to master the details of the A.R.E.A. spiral or to use tables prepared for it alone, as demonstrated by the following comparison in the case of an exceptionally sharp railroad curve: X Y Xo 0 A Dc Ls 10° 300 297.95 26.05 149.47 6.51 4°59.8′ 10° 300 297.96 26.05 149.48 6.51 4°59.8' 5-15. Laying Out Spiral by Taping.-A spiral may be staked by using tangent offsets, chord offsets, or middle ordinates. The operations in the field are similar to those described in Art. 2-14. However, the calculations differ slightly from those for a simple curve owing to the variable curvature on a spiral. Spiral in this book A.R.E.A. spiral Tangent offsets for selected points on the spiral are com- puted from the cube law (Art. 5-2). It is sufficiently accurate for the flat spirals used on modern highway and railroad align- ment to assume that the spiral and the throw o bisect each Y other, and that o= (equation 5-20). The throw is com- 4 2 puted from the relation (equation 5-21) or is taken from 24 R tables, after which the offsets from the tangent to the mid- point of the spiral (at equidistant points) are found from the principle that offsets are proportional to the cubes of the distances. The same offsets are then used to locate the second half of the spiral by measuring them radially from the circular arc (osculating circle) produced backward from the S.C. For example, the five offsets required to locate a ten-chord spiral are found by multiplying the throw by 0.004, 0.032, 0.108, 0.256, and 0.500. The advantage of this method, in compari- son with measuring all offsets from the tangent, is that the measurements usually come well within the limits of the graded roadbed. SPIRALS 111 Chord offsets and middle ordinates are approximately proportional to the lengths from the T.S. Needed values D₁+ D₂ for D in the various may be obtained by substituting 2 simple-curve offset formulas, D1 and D2 being the degrees of curve of a spiral at the ends of a particular chord. The values of C.O. and M.O. in Table I facilitate the computation. 5-16. Parallel Spirals. For the same reasons given in Art. 2-15 it is often necessary to stake an offset curve parallel to a spiral along the center line. This matter is more complex than on circular curve alignment. It is also closely related to the subjects of edge lengths and widening of highway pavements. For these reasons parallel spirals are discussed in detail in Art. 8-20 as a special curve problem in highway design. 5-17. Length of Spirals.-A spiral need not have a par- ticular length, but it should be at least long enough for the transition to be made safely and comfortably. Design speed and the rate of attaining superelevation are controlling factors in this respect. On railroads, practice has been fairly well standardized for a number of years, though the operation of high-speed streamliners is adding new problems. Chapter 9 contains examples and recommendations. Practice on highways is not so definite as is that on railroads. Lack of standardization is due to the later adoption of spirals, the more diverse operating conditions, and the greater number of administrative units involved. Recent practice is outlined in Chapter 8. PROBLEMS 5-1. For each of the following spirals, compute values of X, Y, X。, 0, L.T., S.T., and L.C. by use of Table XII. Use Table XI to verify answers to (a) and (d) exactly and, by interpolation, to verify the remaining answers approximately. (a) Da=3°00′; L¸=200 (b) Da=1°45'; L,=160 (c) Da=7°12'; L,=250 (d) Dc=8°00′; L,=300 (e) D.=3°20'; L=240 (f) Dc=5°15'; L₁ = 160 112 SPIRALS 5-2. Assume simple curves with equal spirals corresponding to those in Prob. 5-1. For each layout, compute values of Ts and Es to hundredths using formulas 5-14 and 5-17. Check the results to tenths using formulas 5-15 and 5-16. Given values of I are: (a) I=18°42' (b) I=27°13' minute. (á) 18+57.12 (b) 26+34.37 (c) I=54°10′20″ (d) I=62°44' 5-3. Prepare sets of field notes for staking the spiraled curves in Prob. 5-2 with set-ups at the T.S., S.C., and S.T. Compute approach spirals as 5-chord spirals. Between the S.C. and C.S. compute deflections for full stations on flat curves (less than D=4°) and for full and half stations on sharp curves. On all leaving spirals compute deflections for full and half stations. All deflections should be carried to the nearest Stations of T.S. are: (c) 35+61.41 (d) 57+72.28 (e) I=31°53' (f) I=40°05'30" 5-4. Prepare alternate notes for staking certain of the approach spirals of Prob. 5–3 from set-ups other than at the T.S. Carry deflections to the nearest minute. Supply explanatory comments as in the example on page 95. (e) 71+17.59 (ƒ) 84+81.28 Spiral in (a): 5-chord spiral run backward from set-up at C.S. Spiral in (c): 10-chord spiral; set-ups at S.C. and point 6. Spiral in (d): 20-chord spiral; set-ups at S.C. and points 8 and 14. Spiral in (e): 16-chord spiral; set-ups at S.C. and points 5 and 12. First Arc 5-5. Completely-spiraled compound curves. Find station- ing of all curve points. I Second Arc I Sta. V Each Spiral D D k=13° (a) 42+24.08 2°(Da) 23°48′ 7°(Da) 48°02′ (b)* 56+34.87 13°(D) 33°57′ 6°(Dc) 41°23′ 150-ftlong *This is the same compound curve used in Art. 3-8 (with sta. V added). Solve with the aid of formulas 5-32 and 5-33 using the exact values of TL and Ts given in Art. 3-8. SPIRALS 113 (c) 63+18.51 9°(Da) 63°14′ 3°(Da) 21°33′ k=2° (d) 75+91.24 12° (De) 52°30' 6°(Dc) 34°18' 200-ftlong Answers to (a): T.S.=27+95.49; S.1C.1=29+15.49; C.1S.2= 38+95.49; S.2C.2=41+95.49; C.2S.3=45+21.68; S.T.=49+ 41.68. 5-6. Compute the deflections to the nearest minute for staking the combining (middle) spirals of Prob. 5–5. Spiral in (a): use a 10-chord spiral. Spiral in (b): use a 5-chord spiral. Spiral in (c): use a 6-chord spiral. Spiral in (d): use a 4-chord spiral. 5-7. For each of the following simple curves with equal spirals list all values of Da and L, found in Table XI that conform to the stated conditions, without using spirals shorter than 200 ft or longer than 400 ft: (a) I=40°; Ts=700±25 ft. Answers: Da=3°30' with L.=200 or 250 ft; Da=4° with L、=350 or 400 ft. (b) I=40°; E¸=180±10 ft. (c) I=32°15′; T's=800±15 ft. (d) I=54°27′; E,=85±5 ft. 5-8. Use the method of Art. 5-11 to find a simple curve with equal spirals for each of the following conditions: (a) I=18°42′; E,=exactly 27 ft. Find: the exact value of Ls which, with an integral value of R listed in Table V, will make p equal approximately 1. Answer: L=198.97 ft with R=1,900 ft. (b) I=62°44'; T, = exactly 600 ft. Find: the exact value of L, which, with an integral value of R in Table V, will make p equal approximately 0.55. (c) For the curve in Prob. 2-8(a), choose an integral value of L, so that p will equal approximately 1. (d) For the curve in Prob. 2-8(c), choose an integral value of L, so that p will equal approximately 0.4. 5-9. For each of the following simple curves with equal spirals determine the added length resulting from substituting 114 SPIRALS a double-spiral curve having the same radius at the mid-point: (a) I=18°42′; Da=3°; Ls=200. Answer: 423.34. Answer: 485.44. (b) I=62°44′; Dc=8°; Ls=300. (c) I=54°10'20"; Da=7°12'; L=250. (d) I=40°05'30"; D.=5°15′; Ls=160. 5-10. Using a slide rule and the approximate formulas in Art. 5-13, compute Y, X, o, and X, for any of the spirals in Prob. 5-1. Compare the results with those found in Prob. 5–1. 5-11. Derive: (a) Formula 5-18 from the basic relations in Art. 5–2. (b) Formula 5-19 from the basic relations in Art. 5–2. (c) Formulas 5-36 and 5-37. (d) Formula 5–38. (e) The approximate formulas in Art. 5-13, using a sketch to show the nature of the approximations made. CHAPTER 6 EARTHWORK 6-1. Foreword.-Payment for grading is usually based on a bid price per cubic yard for excavation measured in place as computed from survey notes. The unit price ordinarily includes: hauling excavated material (cut) from within the limits of the roadway or moving in other material (borrow) from outside areas; building the embankments (fill) to specified form; dis- posing of surplus material (waste); and performing such opera- tions as forming earth shoulders, trimming slopes, and prepar- ing the subgrade for ballast or pavement. Separate unit prices for different types of material excavated may be used. There are advantages, however, in reducing the number of classifications to two-"rock excavation" and "common excavation" or even to a single type called "unclassified excavation" (see Art. 6–5). Fill quantities are important in grade-line design, though they are not paid for directly in the usual contract. However, on projects consisting wholly of embankment-such as levees— the payment is based on a unit price for fill as computed from survey notes. Operations included under the general heading of earthwork are (see relation to Art. 1-8): (a) Office work of making preliminary estimate of grading quantities by scaling depths of cut and fill at regular intervals along one or more paper locations. (b) Field work of taking cross-sections along located line prior to construction. (c) Office work of calculating volumes more accurately than in (a) from data obtained in (b) and, possibly, of making a distribution analysis (economical grading schedule) based upon a mass diagram. (d) Field work of setting stakes for controlling the construc- tion and of making measurements needed for computing partial and final payments. (e) Office work of calculating all final quantities. The same principles apply to computing volumes of mate- rials other than earthwork, such as riprap and concrete built into structures, material stock piles, and reservoir volumes. 115 116 EARTHWORK 6-2. Types of Cross-Sections. The exact determination of earthwork quantities is usually based upon field cross-sections taken in a specified manner before and after grading. On highway and railroad work, cross-sections are vertical and at right angles to the survey center-line. Every section is an area formed by the subgrade (or base), the side slopes, A بال lly B 1111 1!% V 71 ܼܵܿ ✔ وال ,,, ۱۱۷, N, !!! \!!! (۱۱, 11/ VI 11/1. 16 MI !!!! V !! MI C ill ، ܐܢ Si ill!! !!!!! !!!! .۱۱، J J ܕ !!!!! !!!. $2 $3 Fig. 6-1. Types of cross-sections ショ ​""" ܨ NA G 30 31 ปู, ۱۱۰۰ 17. Ill. We 11/14 (۷/ "1 No illle ۱۱۷, 1. ۱۱۱, ۱۱٫. all 11111 H I = I tlie اال \V, Y illia ۱۱۰. EARTHWORK 117 and the original ground surface. Except as noted in Art. 6–5, the base is flat and level, and the side slopes at a section are uniform from the edge of the base to the ground surface. The base is usually wider in cuts than on fills, to provide room for side ditches. Fig. 6-1 shows a portion of a graded roadbed passing from fill to cut (side ditches are omitted for simplicity). The sketch illustrates several cross-sections, the types depending on their shape and the number of rod readings used to deter- mine them. At any cross-section a rod reading is always taken at the center-line stake. Two additional readings are usually taken at the intersections of the side slopes and the ground surface; if stakes are driven at these points they are called slope stakes. Additional rod readings are taken where conditions require them. The section at H is a regular three-level section in cut, so named because three rod readings are used to fix it-one at the center stake and the others at the slope-stake locations. This type (in cut or fill) occurs more often than any other. The sections at D and G are special cases of a three-level section, each having a grade point (point D or G) at one corner. The section at B is a five-level section in fill. This is a modification of a three-level section in which two additional readings are taken directly below (or above) the edges of the base. The section at A is an irregular section in fill. A large number of rod readings are required to fix it—in the case shown, there are four readings at points r in addition to the three at the slope stakes and center stake. The section at E is a side-hill section, having cut on one side and fill on the other side of a grade point at E. In the case illustrated the grade point is on the center line, but in general it may fall anywhere between the edges of the base. The section at I is a level section, so designated because the ground is level transversely and only one rod reading at the center line is sufficient. 6-3. Location of Cross-Sections.-For convenience in calculations and field work, cross-sections are usually taken at each full-station (or half-station) stake on the survey center- 118 EARTHWORK line. They are also taken at curve points and at additional plus-points where important "breaks" in the topography occur. Where grading is very heavy or where unit costs are high, as in rock excavation, cross-sections are taken at closer intervals. D hi T dr- OTI TI f1 bib- 2 +dr I IOT Fig. 6-2 S fr 1 Stations in Fig. 6-1 -I ·I· ↓ hr -H- क -G- -E -B EARTHWORK 119 If the transition between cut and fill occurs on a side hill, as many as five cross-sections may be needed. In Fig. 6-1 these sections are located at C, D, E, F, and G. Theoretically, complete cross-sections are not necessary at C and F, but their stationing is needed to locate the apexes of the pyramids hav- ing triangular end bases at E. Thus, the cross-sections at the transition are reduced to three: (1) at the fill-base grade point D, (2) at the center-line grade point E, and (3) at the cut-base grade point G. The points C and F are often so close to D and G that they are omitted from the notes and the apexes of the transition pyramids are assumed to fall at D and G. Where the three sections at the transition are very close together, the grade contour DEG is assumed to be at right angles to the center line; there are then wedged-shaped solids on either side of the grade contour. See page 130. 6-4. Formulas for End Areas.-Fig. 6-2 shows the areas at certain cross-sections in Fig. 6-1. The common notation is spread among the several sketches. The distance c is always the vertical distance (cut or fill) between ground and grade at the center line, and hɩ (or h,) is the vertical distance between ground and grade at the slope stake. Distances between ground and grade at other points are denoted by ci and c, in cut, and by fi and fr in fill (as at section B). The inclination s of the side slopes is expressed by the ratio of horizontal dis- tance to vertical distance (as unity). The horizontal distance from the survey center-line to any slope stake is (6-1) or dı (or d,) = b+s hɩ (or s h,) The area of a level section (as at I) is A₂ = c(b + D) AL (6-2) 2 AL=c (b+cs) (6-3) The area of a regular three-level section (as at H) is found by adding the areas of the two cross-hatched triangles to the areas of the two triangles having the common base c. Thus, Asc (di+dr) + 1 b (h₂+h,) 120 EARTHWORK Substitution of H for hi+h, and D for di+d, reduces the relation to c D. b H -+ (6-4) 2 4 Another convenient formula for the area of a regular three- level section is found by extending the side slopes to an inter- section at the center line so as to form a triangle, called the grade triangle, below (or above) the base. The dimensions of the grade triangle are constant until the base or slope b2 Consequently, the "grade-tri- A3: changes; its fixed area is angle formula" is = 4 s' 4₁ = 1 (0+ 2015) - 10 A3= s 4 s (6–5) Formula 6-5 is slightly more convenient than 6-4 for com- puting a long series of regular three-level sections in cut or fill, b owing to the constant terms and 2 s b2 4 s The special three-level section having a grade point at the ground surface (as at D or G, Fig. 6-1) is also determined by formula 6-4. One of the four triangles disappears; there- fore, D=dı (or d,)+1b, and H=hɩ or hr. The grade-triangle formula also applies if properly modified, but its use is not recommended at the transition between cut and fill. At a side-hill section (as at E) the end areas for cut and fill are kept separate. Obviously, both are triangles. In the general case, with the grade point not at the center line, each area is Ar=wh (6-6) where w is the actual base width of the triangle. At section E b in Fig. 6–2, w=2- The area of a five-level section (as at B) is found by combin- ing the indicated triangles having common bases. The final relation is A5= (cb+fidi+fr dr) (6-7) If the section is in cut, c, and c, are substituted for fɩ and fr. The area of an irregular section (as at A, Fig. 6-1) is best found by a coordinate method. Thus, the coordinates of the corners of the area-the origin being taken at the center of the base and the order of the coordinates being determined by EARTHWORK 121 progressing clockwise from A and repeating those at A-are arranged as in the first form on page 122. It will be recalled from plane surveying that the area of a closed figure whose coordinates are set up in the preceding form is equal to one-half the difference between the algebraic sums of the products indicated by the full diagonal lines and those indicated by the dotted diagonal lines. A method of making the foregoing calculations in such a way as to reduce chances of errors in signs is to set up the coordinates as in the second form on page 122. The coordinates start at the center of the base as origin, and then proceed clockwise around the left portion of the section and counter-clockwise around the right portion in the form of a figure 8 on its side. Algebraic signs are omitted. All products indicated by the solid diagonal lines have the same sign; all those indicated by the dotted diagonal lines have the opposite sign. As before, the end area is one-half the difference be- tween the sums of the two sets of products. Machine calculation of areas is done best with coordinates set up in the second form. In using the machine, multiply the figures connected by the solid diagonal lines, accumulating the products on the proper dial. Then reverse-multiply the figures connected by the dotted diagonal lines, thus subtract- ing those products. The final result remaining on the dial is the double area. For cut areas, the sum of the products indicated by dotted diagonal lines is larger than the sum of the products indicated by full diagonal lines; for fill areas, the reverse is true. When using the calculating machine the products making up the larger sum are set up first. Some computers prefer to use machine calculation for all areas, even the standard types represented by formulas 6–2 through 6-7. This is done by a generalization of the method just described. In all cases omit algebraic signs. For areas lying entirely to the left of the survey center-line, use the coordinates in clockwise order; for areas to the right, use counter-clockwise order of the coordinates. It makes no dif- ference which coordinate is used first, so long as it is repeated at the end, i.e., so long as the traverse is closed. For areas cut by the survey center-line, use the figure-8 construction described for section A, starting at a point on the center line. 122 EARTHWORK Ordinate -hi Abscissa -dr $%-t —h, --f4 +記 ​+d, +ds X ※ XXXXXX -c -f3 +ds! Double Area by Coordinates-First Form -f2 -fi -d2 -d fa da ds fi hi xxxxxxxxxxxx dr dı b 2 Double Area by Coordinates-Second Form 2 -hi -d EARTHWORK 123 After a little practice it will be found unnecessary actually to write down the coordinates. Their values may be trans- ferred directly from field notes to machine in proper sequence. Original earth surface JEME MEME ME EXE ROCK Rock surface ハミ ​Fig. 6-3. Compound section VEIFIEIF/F TER Earth FA EE 6-5. Compound and Other Irregular Sections.-In locations where rock lies between ground and grade, a compound section occurs, as in Fig. 6-3. If there are different unit prices for rock and earth ("common") excavation, it is necessary to determine the quantities of each material. This is done by first cross-sectioning the original surface, and then doing the same to the rock surface after stripping. In modern highway construction the trend is toward denoting all excavation as "unclassified." There is only one unit price, regardless of whether the material excavated is ledge rock, loose rock, earth of any type, or a combination of such materials with boulders and (as on much reconstruction) old pavement, building foundations, railroad ties, or mis- cellaneous scrap deposited in dumps. Even in a clear-cut situation such as in Fig. 6-3, the contractor may prefer to expedite the work by drilling through the earth cover and blasting the underlying rock without having to clean the rock surface for separate cross-sectioning. Obviously, the unclas- sified specification speeds the work and eliminates arguments between, contractor and engineer as to the pay classification of material excavated. Railroad roadbeds on curves are not usually crowned or banked; the superelevation is adjusted in the rock ballast. 124 EARTHWORK Earthwork quantities in the drainage ditches are usually com- puted as a separate item. On highway roadbeds the subgrade may be crowned on tangents and is usually banked parallel to the surface on curves. Moreover, the drainage ditches and earth shoulders are usually considered part of the cross-sectional area. (See Fig. 6-4.) The resulting irregular areas may be found by the coordinate method (possibly employing a calculating machine or an electronic computer) or by graphical methods. 6-6. End Areas by Graphical Methods.-End areas, no matter how irregular, are easily found by plotting them to scale and running a planimeter around the boundaries. This method is widely used in highway work, especially if ditches and shoulders are part of the cross-section proper. It is particularly adapted to projects on which a permanent graphical record of the cross-sections is desired, as in tunnel construction through rock. Another distinct advantage of plotted sections is their value in studying the effects of minor changes in alignment or grade elevation. (See Chapter 10.) In order to obtain precision consistent with the field work, areas are plotted to a fairly large scale, usually 1 inch = 10 feet or larger; consequently, the file of cross-section sheets is voluminous. Another graphical method, which is especially useful for shallow areas plotted accurately to scale, is to mark off on the edge of a paper strip the continuous summation of verticals at 1-foot intervals across the area. Each vertical is the area of a trapezoidal strip 1 foot wide; the total length, applied against the scale of the cross-section, is the desired end area. A special scale (Avol rule) can replace the paper strip. 6-7. Methods of Cross-Sectioning.-The term cross-sec- tioning is loosely used to include any vertical and horizontal measurements made on a transverse section. On routes such as railroads, highways, and canals, two methods of cross- sectioning are in use: (1) cross-section leveling, and (2) slope staking. Cross-section leveling is used when end areas are to be determined graphically, as by planimeter. It is also the method which must be used to obtain whatever cross-profiles EARTHWORK 125 are needed in the office work of grade-line design. The field process is essentially that of profile leveling, the difference being that intermediate foresights are taken at breaks in the transverse profile in addition to breaks along the survey center-line. The left-hand page of the notes is similar to a page in differential leveling, but the notes run up the page. On the right-hand page the cross-section notes are entered in the form of fractions, the numerator of each fraction indicating the rod reading (intermediate foresight) and the denominator indicating the transverse distance to the rod from the survey center-line. Portion of left-hand page The hand level is a useful supplement to the engineer's level, especially on steep transverse slopes. Rod readings on ground higher than the H.I. are recorded as negative; Form of Notes for Cross-Section Leveling Station (T.C.) 71+76.2 H.I. 71+00 472.58 473.4 468.3 469.6 Right-hand page 2470.5 466.9468.4 466.4 467.9A | 467.3 465.8 0 12 465.6467.2 Rel H.I.=472.6 -0.8 3.0 4.2 4.7 5.3 5.4 7.5 8.1 464.1465.1 462.8 2464.5 2.1 4.3 5.7 6.2 6.8 7.0 8.5 9.8 40 20 12 0 12 24 they must be added to the H.I. elevation (see the extreme left reading at sta. 71+76.2 in the notes. The form of notes represents a portion of the left-hand page and complete notes for two cross-sections on the right- hand page. The sections are plotted and used in office studies as explained further in Art. 10–6. - 126 EARTHWORK KY/// • Original surface • Fig. 6-4. Side-hill section on curve Slope staking* is a special form of leveling used only after the grade line and the form of cross-section have been decided upon. The cross-sections are not usually plotted; either areas or volumes are computed directly from the field notes. This method may be used solely for the purpose of obtaining data for calculating volumes without actually setting slope- stakes. It is also used preceding construction where grading is heavy and slope stakes are needed to control the work. The process of slope staking at any cross-section consists of finding and recording the positions where the designed side slopes will intersect the ground surface and of recording breaks in the transverse ground profile between slope stakes. The work may be done in connection with profile leveling over the located line or as a separate process after profile leveling. The latter is the simpler and speedier method. When profile levels have already been run, the slope- staking party is provided with the ground and subgrade eleva- tions at each station stake. Leveling is done with an engi- neer's level, a hand level, a level board, or a combination of these instruments. The form of notes resembles that used in cross-section leveling. But the numerator of the fraction, instead of being the rod reading, is the difference between the ground-surface elevation and the center-line grade elevation at the particular station. Cuts are designated C or +; fills, For No record is kept of the actual rod readings used in the process. Also, the extreme left-hand and right-hand entries in the notes are for the slope-stake locations. The form on page 127 is a record of slope-staking notes for sections along the 2-lane road shown in Fig. 6-1. * See traverse method of slope staking in Art. 10-7. EARTHWORK 127 In the example illustrated, elevations will have been sup- plied for the full stations only, since the exact locations of the grade points are not known in advance. Grade points are Slope-Staking Notes-First Example Sta. Bases: 40 ft in cut; 30 ft in fill. Side slopes: 14:1; Gradient: +1.2%. ¢ Surface Grade Elev. Elev. (I)-63+00 570.3 562.84 (H) 62+00 568.4 561.64 (G) 61+48 565.1 561.02 (E) 61+36 560.9 560.87 (D) 61+25 557.1 560.74 (B) 61+00 554.6 560.44 L C7.6 31.4 C7.6 C7.0 30.5 C4.8 27.2 C2.6 23.9 0 15 F5.4 F6.9 23.1 15.0 F7.2 F8.8 F7.0 25.8 20.0 14.7 C6.8 C4.1 F3.6 F5.8 F8.0 R C7.6 31.4 C6.4 29.6 0 20 F2.0 18.0 F5.8 23.7 F8.2 27.3 F8.1 F9.3 F9.4 18.0 24.0 29.1 F6.7 15.0 (A) 60+00 551.2 559.24 found by trial in the field, their grade elevations are computed, and their surface elevations are obtained by leveling from any convenient known point. It will be noted that the stations at C and F were omitted. These points are assumed to fall at D and G, as explained in Art. 6–3. In the field the process of finding the slope-stake locations is a matter of trial and error. It is one of those procedures in which a detailed numerical illustration of the method appears more complicated than it actually is. Briefly, the process follows: (1) Record the cut or fill at the center, found by taking the difference between the given elevations. (2) Observe whether the ground slopes up or down trans- 128 EARTHWORK versely, estimate the cut or fill h at the probable slope-stake location, and calculate the corresponding distance d from the center line by the relation d=b+s h. (3) Take a rod reading at the computed distance and find the actual h (4) If the actual and estimated values of h differ by more than 0.1 foot, make a new estimate, being guided by the first result; then repeat the process until d and h satisfy formula 6–1. Distances and depths are determined to the nearest tenth. Slope staking is done rapidly by the foregoing method. With a little experience many of the points are located close enough for the purpose on the first trial. More than two trials are seldom needed. Slope stakes, if set, are driven aslant. The cut or fill is marked on the side facing the center line, and the stationing is marked on the back. If profile levels have not been run or if it is desired to verify them in slope staking, the engineer's level is used to carry continuous elevations along the line by usual leveling methods. In this case it is convenient to use a device known as the grade rod (see Fig. 6-5), which is the imaginary reading on a rod held on the finished subgrade. If the line of sight is below Ground Rod 1 Cut hi H.I. #1 AV Grade Rod (+) Grade Elev. 또 ​Fig. 6-5 Ground Rod Cut C Fill hr / Grade Rod (-) Ground Rod H. I. #2 Д 12% EARTHWORK 129 subgrade elevation, the rod is assumed to be read downward and the grade rod is given a negative sign. Various com- binations are possible, the sign of the result depending on the type of section (cut or fill) and the relative elevations of instrument and subgrade. The following rules always give correct results if algebraic signs are strictly observed: (1) H.I. minus grade elevation equals grade roa. (2) Grade rod minus ground rod equals cut or fill at the ground rod (the sign + signifies cut; the sign indi- cates fill). If desired, grade-rod readings may be entered in a separate column in the leveling notes on the left-hand page of the field book, with slope-staking notes on the right-hand page. Once the center cut or fill has been determined, the slope-staking process is the same as that previously described. In brush or on steep slopes the field work may be expedited by using a hand level or a level board to supplement the engineer's level. The second example of slope-staking notes along a single- track railroad shows irregular ground with more-complex transitions between excavation and embankment. Included also is an example of the grade contour at right angles to the center line. 6-8. Volume by Average End Areas.*-Except where the solid between cross-sections is a pyramid (as between E and F in Fig. 6-1), it is usually considered a prism whose right cross- sectional area is the average of the end areas. For sections having areas of A1 and A2 square feet and L feet apart, the average-end-area formula for volume in cubic yards is L / A₁+ A ₂ ( +4₂2) Ve= 27 (6-8) This formula is exact only when the end areas are equal. For other cases it usually gives volumes slightly larger than their true values. If it were to be applied to a pyramid, for example, the error would be the maximum and would be equal to 50 per cent of the correct volume. In practice, how- ever, the total error in a long line is rarely more than 2 per * See "contour grading” in Art. 10–7. 130 EARTHWORK cent. Also, calculation of the errors or corrections (see Art. 6–11) is much more complicated than determining the average- end-area volumes themselves. In consequence, the average- end-area method is almost always used; it is invariably ruled to apply in the absence of specifications to the contrary. Slope-Staking Notes-Second Example Bases: 20 ft in cut; 16 ft in fill. Side slopes: 11:1; Gradient: -0.75%. Sta. 20+15 Surface Grade Elev. Elev. 662.4 19+81 675.9 675.9 19+65 681.9 676.0 675.6 19+00 688.3 676,5 18+47 677.8 676.9 17+83 18+37 677.0 677.0 18+28 676.2 677.0 16+48 17+98 677.3 677.3 678.0 677.4 17+05 678.0 678.0 677.6 678.4 L F11.4 25.1 00 108 C12.4 28.6 C13.0 29.5 C2.8 14.2 C1.4 12.1 C1.4 0 12.1 6 C1.8 12.7 C2.4 13.6 C1.8 12.7 0100 8 CO & F13.2 0 C10.0 C11.8 C0.9 F0.8 C0.6 F0.8 R F12.4 26.6 00 8 10 C9.8 24.7 C8.6 22.9 0 10 F0.6 8.9 F1.4 10.1 F1.0 9.5 0 10 F1.2 9.8 F3.0 12.5 EARTHWORK 131 In applying the average-end-area formula the simplest method is to add the end areas (determined by calculation or by planimeter) and multiply their sum by Table XIX 54* facilitates the process. L 6-9. Example of Earthwork Calculation. The tabulation on page 132 gives the results of earthwork calculations for the notes on page 127. Areas were computed from formulas given in Art. 6-4; and volumes from the average-end-area formula (except for the two pyramids). The number of significant figures used in computing the areas and volumes is inconsistent with the principles set forth in Arts. 2-16 and 2-17. Both the rod readings and measured distances are round numbers; consequently, the computed volumes are reliable to only two significant figures. Yet it is conventional practice to consider the recorded measurements as exact numbers and to compute volumes to the nearest cubic yard (or to the nearest cu yd as in this example). 6-10. Earthwork Tables.-Table XIX is especially adapted to highway work or other projects on which cross-sectional areas are obtained graphically. Two other tables in Part III are useful in earthwork computations: Table XVII gives cubic yards per 100 feet for level sections having various base widths and side-slope ratios. It is very useful in making preliminary estimates of grading quantities by scaling center cuts and fills from a projected paper location. (See Art. 9-11.) Table XVIII gives cubic yards per 50 feet for triangular prisms having various widths and heights. It is the most useful earthwork table for general purposes, since practically all solids met in route surveying may be broken up into con- stituent triangular prisms. If w is the width (base) of any triangle and h is the height (altitude), the volume in cubic yards for a triangular prism 50 feet long is (6-9) √50' 50 54 wh 132 EARTHWORK Comparison with the average-end-area formula shows that the volume between two end sections with areas A1 and A2 and spaced 100 feet apart is equal to the sum of the volumes of two 50-ft prisms having the given right cross-sectional areas. Even more generally, if the area of any type of section is converted into the form A=1×(the product of two quanti- Sta. 63+00 62+00 61+48 61+36 61+25 61+00 End Areas Formula I I I I I 6-4 6-7 60+00 coordinates Sq Ft 390.64 * 338.34 144.76 C 26.00 F 15.00 113.16 258.15 338.16 Volumes, Cu Yd Cut 1,350.0 465.2 37.9 3.5 Totals=1,856.6 Fill 2.2 26.11 171.9 1,104.3 1,304,5 ties), the volume in cubic yards between sections 100 feet apart may be found simply by adding two values taken from Table XVIII, each one found by entering the table with the proper given quantities. If the distance between the stations is less than 100 feet, the sum of the tabulated quantities is multiplied by the ratio of the actual spacing to 100. By means of this principle, volumes may be computed directly from slope-staking notes without separate computation of areas. The following computations show the use of Table XVIII in determining three of the volumes previously found (Art. 6-9) by the average-end-area method. EARTHWORK 133 Sta. Formula Converted to Form wh 63+00 (2 c) (b+c s) 62+00 c D+1(2)(H) 61+48 1 c D+1(2)(hi) 61+36w hɩ w=2c=15.2 h=b+cs=51.4 Table XVIII Entries w=c=6.8 h=D=60.1 b w=2 =20 h=H=13.4 w=c=4.1 h=D=47.2 พ b 2 h=hr=4.8 W 20 b =2/2=200 h=hr=2.6 Cu Yd per 50 Ft 723.4 626.6 268.1 48.1 Take out under 5 (X10) 703.7 14.1 Take out under 1 Take out under 4 (×0.1) 5.6 Sum=cu yd per 50 ft=723.4 Cu Yd Cut Between Stations 1,350.0 465.2 In entering Table XVIII either of the given quantities may be taken as the height. By proper shifting of the decimal point all the separate values making up a given product may be taken from the same line in the table. For example, at sta. 63 the given quantities are 15.2 and 51.4. Enter left-hand column with 15.2 37.9 At sta. 62, instead of entering the table with 20.0 and taking out the three values under 1(X10), 3, and 4(×0.1), it is quicker to enter with 13.4 and take out the result in one operation under 2(X10). Any slight error caused by multi- plying a tabular value by 10 can be eliminated, if desired, by adding proper values. For example, a result found under 134 EARTHWORK 2(X10) is obtained more accurately by adding the tabular values under 6, 7, and 7. 6-11. Prismoidal Volumes and Corrections.-As noted in Art. 6-8, the average-end-area formula usually gives volumes slightly larger than their true values. When a precise value is necessary-and the field measurements are refined enough to warrant it-the solid between cross-sections is considered to be a prismord rather than an average-end-area prism. The prismoidal formula for volume in cubic yards is L/A₁+4 Am+A 2` (1₁+ Am+₁₂) Vp 27 (6-10) where Am is the area of a section midway between A1 and A2 and the other terms have the same meanings as in formula 6-8. In route surveying the prismoidal formula applies to any solid generated by a straight line passing around the sides of plane parallel end-bases. Accordingly, it fits warped-surface solids as well as plane-surface solids, provided that the warp is continuous between the ends. The formula also applies to a wide variety of solids seldom found in earthwork calcula- tions, such as the frustums of prisms, cylinders, and cones. Owing to the need for computing the area of the mid-section A m, direct determination of volumes from the basic prismoidal formula is inconvenient. It is easier to apply a prismoidal correction Cp to the average-end-area volume. By definition, (6–11) Cp=Ve-Vp When the values given by formulas 6-8 and 6-10 are sub- stituted in formula 6-11 and the resulting formula is reduced, the general prismoidal-correction formula is Cp= (A1-2 Am+A₂) CT= L 3X27 (6-12) More convenient working formulas for solids commonly met in practice are found by calculating Am in terms of the given dimensions of A1 and A2 and substituting in formula 6-12. (Note: Am is not the mean of A1 and A2, but its dimensions are the means of corresponding dimensions at the end sections.) For a solid having triangular end areas the result is (W1—W2) (h1—h2) L 12×27 (6–13) EARTHWORK 135 Formula 6-13 can be made to fit any type of end area by dividing the area into triangles. However, the prevalence of three-level sections makes the following formula valuable: (D1-D2) (C1-C2) (6–14) Although formula 6-14 is derived from the dimensions of three-level sections, it also fits a solid having level-section end areas and a solid having a triangular section at one end. The prismoidal correction is applied with the sign indicated in formula 6–11; that is, it is normally subtracted from the average-end-area volume. In case the sign of Cr or C3 should happen to be negative (rare, but possible), the prismoidal cor- rection is added. T The corrections to the three volumes computed in Art. 6–10, in cubic yards, are: Sta. 62+00 to 63+00: C3= C3 L 12×27 - Sta. 61+48 to 62+00:С'3= 100 12×27 52 12×27 12 12X27 (62.8-60.1) (7.6-6.8)=0.7 (60.1-47.2) (6.8-4.1)=5.6 Sta. 61+36 to 61+48:C3= (47.2-23.9) (4.1—0.0)=3.5 Prismoidal corrections may also be determined by means of Table XVIII. The tabulated values come from formula 6–9, which may be written in the following general form: 50 V50' = X(product of two quantities) 54 When L=100 the prismoidal-correction formulas 6–13 and 6-14 may also be written as follows: Cp= (3) (4) (product of two quantities) Consequently, the prismoidal correction for sections 100 feet apart is one-third the value found by entering Table XVIII with (w₁—w₂) and (h₁-h2), or (D₁— D2) and (cı—c2), as the given height and width. The three corrections previously computed are verified by Table XVIII to be: X2.00 =0.7 X0.52 X32.25=5.6 X0.12X88.5 =3.5 136 EARTHWORK The foregoing corrections are 0.05 per cent, 1.2 per cent, and 9.2 per cent of the respective average-end-area volumes. It is evident that prismoidal corrections are insignificant, except at transitions between cut and fill. Since, normally, these locations account for only a small percentage of the total yardage, it is obvious that volumes determined by the average- end-area method are adequate for all but rare situations. 6-12. Correction for Curvature. Where conditions warrant calculation of prismoidal corrections, they may also justify correcting the prismoidal volumes on curves for the slight error involved in assuming the center line to be straight. On curves, cross-sections are taken radially. The true volume between two such sections is a curved solid with plane, non- parallel ends, as portrayed by Fig. 6-6(a). But when curva- ture is ignored, the computed volume is that represented by Fig. 6-6(b). The curvature correction is the difference between these volumes, i.e., Cc=VComputed - VTrue Add.com (6-15) Fig. 6-6(c) represents a typical cross-section at a station on a curve. The center of gravity of the total end area is at point G, located at a distance e from the survey center line. The volume generated by revolving the end area is the product of the area and the length of path described by its center of gravity (theorem of Pappus). Obviously, if the end area were Ź (a) 20 R S I B' ¢ (b) Fig. 6-6 - dr dr→ dr- (c) 2 335 & dit dr 2 B EARTHWORK 137 π 180 shaped so that G fell on the survey center line, the curvature correction would be zero. Let A denote the total end area of the section in Fig. 6-6(c). The curvature correction per station is AX1 sta. -A (R − e) π D°. Since RD° equals 1 station, the curvature cor- π 180 180 rection is AeD° per station. When A is in square feet and e is in feet, this reduces to AeD° Cc= cu yd per sta. (6-16) 1,550 Three-level sections occur so often that it is convenient to have a special version of formula 6-16 in which A and e are replaced by the notation used in three-level sections. Fig. 6-6(c) is a three-level section in cut with the slope stake S on the inside of the curve. If B' is drawn on the inner side slope at the same elevation as slope stake B, the non-shaded portion of the end area is symmetrical about the survey center line and there is no curvature correction for that portion. The remaining shaded area SB'C has its center of gravity at g, which is two-thirds the distance from C to the mid-point of SB'. The curvature correction per station is Area SB'CX1 sta. —Area SB'C [R—}(dı+d,)] T 180 Since RD° equals 1 station, the curvature correction is D° π 180 π Area SB'C (dı+d,) D° per station. But Area SB'C equals 1 (bsc) (hi-h,) sq ft. Therefore, 180 D° C. = (3b+xo) (hi−ha) (di+dr) (1,000) cu yd per sta. (6-17) For irregular sections, C. may be found by plotting the sections to scale, drawing for each an equivalent three-level section by estimation, and scaling the values needed in formula 6-17. If this method is not considered accurate enough (as it may not be for highly-eccentric sections in rock), the following procedure may be applied: An irregular section may be divided into triangles; each triangular area may be multiplied by the distance from its center of gravity to a vertical axis at the 138 EARTHWORK survey center-line; and the algebraic sum of the products may be divided by the total area of the irregular section. The result is the eccentricity e of the total cross-section, or the dis- tance from the survey center-line to the center of gravity G (see Fig. 6-6). This is the familiar method of moments. The curvature correction is applied as indicated in formula 6-15. The sign of Ce, however, may be positive or negative. Where the end area is unsymmetrical about the survey center line and has excess area on the inside of the curve, Ce has a positive sign and is subtracted from the volume as computed by ignoring the curvature. Where the excess area is on the outside of the curve, the curvature correction is added. In applying either of the formulas to find the curvature correction for a solid between two different cross-sections L feet apart, the results are averaged and multiplied by the ratio of L to 100. For example, if a 10° curve to the left is assumed, calculations for the curvature correction between stations 61 +48 and 62+00 in the notes in Art. 6-7 give: Sta. 62+00....C. 1.17 cu yd per sta. Sta. 61+48....Cc-6.37 Sum=7.54 cu yd per sta. Avg=3.77 cu yd per sta. Cc=0.52×3.77=2.0 cu yd The final corrected volume equals 457.6 cu yd, found as. follows: Ve=465.2 cu yd (Art. 6–10) (Art. 6-11) -C₂ = −5.6 -Сp= -Cc=-2.0 V=457.6 cu yd 6-13. Borrow Pits.-When the quantity of material within the theoretical limits of excavation is not enough to make the fills, it is necessary to provide additional material, termed borrow. It is most convenient to obtain borrow by widening the cuts adjacent to the fills where the material is needed. When this can be done within the right-of-way limits (and without interfering with existing or planned structures), it has the added advantages of permitting wider shoulders (on EARTHWORK 139 highways), of “daylighting” curves, of reducing slope erosion, and of minimizing snow drifting on the traveled way. Material taken from borrow pits adjacent to the mair construction may be measured by extending the regular cross- sections and adding intermediate ones where necessary. The work is conveniently done by the cross-section-leveling method (see Art. 6–7). Borrow pits located away from the route are cross-sectioned independently of the survey stationing. A convenient method is to stake out over the area a system of rectangles referenced to points outside the limits of the work. By leveling at the stakes before and after excavation, data are obtained from which to compute the volume of borrow taken from the pit. a 2 3 49 5 e b. 6 | 7 8 OC 9 10 Id 13 14 // 15 17 18 8 22 19 2/ 20 23 24 25 26 27 28 12 16 Fig. 6-7. Borrow pit Fig. 6-7 shows a borrow-pit area over which 28 squares were originally staked out. The cross-hatched line represents the limits of the excavation. Squares are of such size that no important breaks, either in the original ground surface or in the pit floor, are assumed to lie between the corners of squares or between the edge of the excavation and the nearest interior corner. Those squares falling completely within the excava- tion are outlined by a heavy line. Within that line each square excavated to the pit floor is the volume of a truncated square prism. Square 7, for example, has the surface corner points b, c, d, and e; after excavation, corresponding points on the pit floor are b', c', d', and e' (see Fig. 6-8). The volume of the resulting prism is the product of the right cross-sectional 140 EARTHWORK dd' area A and the average of the four corner heights bb', cc', and ee'. In cubic yards, A V₁=- 4X27 (bb'+cc'+dd'+ee′) exactly Each similar complete prism might be computed by the preceding method. However, when a number of such prisms adjoin one another, it is quicker to use the following relation which gives the total volume of any number of complete prisms: A 4X27 V= (Σh₁+2 Zh₂+3 Σh3+4 Σhs) (6-17) 1 In formula 6-17, A is the right cross-sectional area of the unit rectangular prism, not the total area of all the complete prisms; h₁ is a corner height found in only one prism; h₂ is one common to two prisms; h, is one common to three prisms; and h is one common to four prisms. For example, ee' is an hı, dd' is an h₂, and cc' is an h. f a b B C 2' 9 Fig. 6-8 The total borrow-pit quantity also includes the wedge- shaped volumes lying between the complete prisms and the limits of the excavation. The portion of square 3, Fig. 6-7 excavated to the near face of prism 7 is shown in Fig. 6-8 to be a wedge-shaped mass with the cutting edge fa and the trapezoidal base ebb'e'. For all practical purposes its volume is one-half the product of the area of the base and the average of the horizontal dis- tances ab and fe. At a corner the portion of the square excavated is composed approximately of two quarter-cones, base to base. For example, as shown in Fig. 6-8, the mass in square 4 has one quarter-cone with base fxg and altitude xe, and another quarter- EARTHWORK 141 cone with the same base but with altitude xe'. The radius. r of the circular base may be taken as the average of fx and gx Consequently, the volume at the corner equals (1) Xee 4 cu ft. If the height ee' is designated by h, the volume reduces r² h to approximately cu yd. 103 6-14. Shrinkage, Swell, and Settlement.-On many routes, one object of the paper-location study is to design the grade line so that total cut within the limits of the work will equal. total fill. If it is assumed economical to haul all excavated material to the embankments, the result is that borrow and. waste are eliminated. Attainment of this ideal is prevented. by many factors, one of which is the uncertainty regarding shrinkage or swell of the material. Shrinkage denotes the fact-commonly noticed—that 1 cubic yard of earth as measured by cross-sectioning before excavation will occupy less than a cubic yard of space when excavated, hauled to an embankment, and compacted in place. This difference is due principally to the combined effects of loss of material during hauling and compaction to a greater than. original density by the heavy equipment used in making the embankment. Shrinkage is small in the case of granular materials such as sand and gravel; larger in ordinary earth containing appreciable percentages of silt, loam, or clay; and very high (possibly as much as 30 per cent) for shallow cuts containing humus which is discarded as being unsuitable for building embankments. Since payment for grading is usually based upon excavation quantities (see Art. 6-1), the shrinkage allowance in grade- line design is made by adding a percentage to the calculated fill quantities. Swell is the term used in referring to a condition which is the reverse of shrinkage. It occurs rarely, and then usually in the case of broken rock blasted from solid beds and mixed. with little, if any, earth in making embankments. Swell is apt to be fairly uniform for a given material. Shrinkage, however, varies not only with changes in the soil constituents but also with fluctuations in moisture content when compacted and with the type of construction equipment. 142 EARTHWORK used. Consequently, a percentage allowance assumed in design may eventually prove to be 5 per cent or more in error. A common shrinkage allowance is 10 to 15 per cent for ordinary earth having little material unsuitable for fills. The term settlement refers to subsidence of the completed embankment. It is due to slow additional compaction under traffic and to gradual plastic flow of the foundation material beneath the embankment. On railroad fills, small settlement can be corrected by tamping more ballast beneath the ties as routine maintenance work. In highway construction, new fills are sometimes built higher than the designed subgrade elevation and the placing of permanent pavement is deferred until most of the settlement has taken place. With modern construction methods, however, involving good foundations and compaction at optimum moisture content, settlement of fills is rarely serious. DISTRIBUTION ANALYSIS On projects in which embankments are built from material excavated and hauled from cuts within the limits of the right- of-way, mere calculation of separate cut and fill quantities does not provide enough information. The distribution of the earthwork, which involves the quantity, direction, and distance hauled, is also important both in planning the work and in computing extra payment in case the contract contains an overhaul clause. 6-15. Haul, Free Haul, and Overhaul.-The word haul has several definitions. In earthwork analyses, however, it means either the distance over which material is moved or (in a more technical sense) the product of volume and distance moved, the units being station-yards. The contract sometimes contains a clause providing extra payment for hauling material a distance greater than a specified amount, known as the limit of free haul. In this case there is one unit price, per cubic yard, for earth excavation and another unit price, per station-yard, for overhaul. The former price includes hauling within the free-haul limit and forming the embankments either inside or outside that limit (see Art. 6-1). Short hauls are never averaged with those DISTRIBUTION ANALYSIS 143 longer than the free-haul limit; therefore, there is no need to calculate the station-yards of free haul. TEXEIR 6-16. Limit of Economic Haul.-With an overhaul clause in effect, there is obviously a certain distance beyond which the cost of overhaul exceeds the cost of excavation without overhaul. This limit of economic haul equals the limit of free haul plus the quotient found by dividing the unit price for borrow (or for excavation, if there is no separate price for borrow) by the unit price for overhaul. Thus, if the free-haul limit were 1,000 feet and unit prices for excavation and over- haul were $0.60 per cu yd and $0.05 per sta.-yd, respectively, the limit of economic haul would be 10+2=22 stations. Balance points, BA с L ANRIFIED G Grade Line AV Ľ Fig. 6-9. Station-to-station method 6-17. Balance Points. The principal problem in making a distribution analysis is locating the stationing of balance points between which excavation equals fill plus shrinkage allowance. On a small job the primary balance points may be found by making separate sub-totals of the cuts and corrected fills, balance points being located where the two sub-totals are equal. On important work this method is inadequate. It does not fix intermediate balance points; neither does it give data for computing overhaul, nor show how to schedule the work. More detailed analyses may be made by the station-to- station method or by the mass-diagram method. Regardless of how complete an analysis is made, it is fairly common practice to show balance points on the plans, together with estimated quantities of cut, fill, borrow, and waste. It is advisable to label such balance points as "approxi- Mad F Α 144 EARTHWORK mate," in order to avoid controversy with the contractor in case the balance points should prove to be in error because of variable shrinkage. 6-18. Station-to-Station Method.-Making a distribution analysis by the station-to-station method is a numerical process. The steps are illustrated by Fig. 6–9 which shows a portion of the profile along a route center-line. A grade point G is first located in the notes. Then balance points A and A', a distance apart equal to the limit of economic haul, are found by adding computed cuts and fills (plus shrinkage allowance) in opposite directions from G. Balance points L and L', spaced at the limit of free haul, are located similarly. Excavation between A and L, which just equals that portion of the fill between L' and A', is subject to payment for over- haul. The average distance over which that excavation is hauled is assumed to be the distance between the center of gravity of the cut mass and the center of gravity of the fil mass. Deducting the free-haul limit LL' from that distance and multiplying by the yardage hauled gives the overhaul in station-yards In this method the center of gravity of each cut solid and each fill solid between adjacent cross-sections (usually one station apart) is assumed to lie midway between the sections. Overhaul on each solid is the product of its volume and the distance between its center of gravity and the beginning of the free-haul limit. Thus, in Fig. 6-9, C is at the center of gravity of the individual cross-hatched cut volume and F is at the center of gravity of the indicated fill volume. The overhaul on the cut is its volume times CL; the overhaul on the fill is its volume times L'F. The total overhaul is the sum of the products found by multiplying each volume of cut between A and L by the distance between its center of gravity and station L, plus those products found by multiplying each volume of fill (plus shrinkage) between L' and A' by the dis- tance between its center of gravity and station L'. If B is an economic balance point following an earlier grade point, the quantity of excavation between B and A is not used in making embankment; it represents waste. DISTRIBUTION ANALYSIS 145 WIM 6-19. Mass-Diagram Method. Though the numerical method just described is quite simple and rapid, it is not adapted to making a broad study of grading operations by analyzing the effects upon the over-all economy produced by various shifts in balance points. This is best done by a semi- graphic method in which the mass diagram is used. The earthwork mass-diagram is a continuous graph of net cumulative yardage. It is plotted with stations as abscissas and algebraic sums of cut and fill as ordinates. Customarily, a cut volume is given as a plus sign: a fill volume (plus shrinkage allowance) is given a minus sign. Profile А 1cuyd -X stations- G Grade Line 1 cu yd وا 1 cu yd Mass Diagram Fig. 6-10 Á' Haul in station-yards is measured by areas on the mass diagram. In Fig. 6-10, suppose 1 cu yd of excavation at A on the profile is moved X stations to A' in the embankment. The haul is obviously X station-yards, which is shown graphi- cally on the mass diagram by the cross-hatched trapezoidal If the remaining excavation between A and G were to be moved to the embankment between G and A', the haul for each cubic yard would be shown on the mass diagram as a area. 146 EARTHWORK stack of trapezoidal areas above the one indicated. The total haul in station-yards between A and A' would be the area aga'. The profile illustrated in Fig. 6-9 is repeated (to reduced scale) in the upper sketch of Fig. 6-11. Directly below is a representation of the corresponding mass diagram. By reference to Fig. 6-11 the following characteristics of a mass diagram are apparent: BA T Va Pb Profile L HELENINTE GL وا е K Mass Diagram Fig. 6-11 h A' La (a) Any horizontal line (as aa') intersecting the mass dia- gram at two points is a balance line; total cut and total fill are equal between the stations at the intersections (as A and A'). (b) Any ordinate between two balance lines (as kl) is a measure of the yardage between the stations at the extremities of the balance lines (as between A and L or between L' and A'). Stated more generally, the vertical distance between two points on the diagram (as a and b) is a measure of the yard- age between the corresponding stations. (c) The highest point of a loop (as at g) indicates a change from cut to fill (in the direction of the stationing); conversely, the lowest point represents a change from fill to cut. Such points may not fall exactly at the stationing of center-line DISTRIBUTION ANALYSIS 147 grade points if there is a side-hill transition (as at sta. E in Fig. 6-1). (d) The area between the diagram and any balance line is a measure of the haul in station-yards between the stations at the extremities of the balance line. If this area were divided by the maximum ordinate between the balance line and the mass diagram, the result would be the average haul in stations. In Fig. 6-11 the area bounded by aga' measures the total haul between A and A'; that bounded by lgl' measures the total haul between L and L'. Since the latter is free haul, as is also the station-yards represented by the rectangle kl', the differ- ence between total haul and free haul is the overhaul between A and A'. This overhaul is represented by the two cross- hatched areas. When the portions of a mass diagram on the sides of two related overhaul areas are fairly smooth (as al and l'a'), even though not straight, the sum of the two areas may be found by drawing a horizontal line midway between the two balance lines, deducting the free-haul distance from its length, and multiplying the difference by the ordinate between the balance lines. For example, hh' bisects kl. The points h and h' are approximately at the centers of gravity of the volumes between A and L and between L' and A'. Consequently, the overhaul between A and A'is (hh'—ll')×kl. In case the mass diagram is very irregular between balance lines, the overhaul may be determined either by planimeter or by the method of moments. In the first of these methods the overhaul is found directly by planimetering the areas repre- senting overhaul and applying the necessary scale factors to convert areas to station-yards. If needed, the distance to the center of mass of the yardage overhauled could be found by dividing the overhaul by the volume. Thus, in Fig. 6-11, the station of the center of mass of the yardage between A and L area alk is sta. A+ kl In the method of moments each separate volume is multi- plied by its distance from a selected station, and the sum of the products is divided by the sum of the volumes. The result is the distance from the selected station to the center of mass. 148 Fig. 6-12 NET CUMULATIVE YARDAGE € こ ​Stations MASS DIAGRAM 391 I ELEVATIONS | | PROFILE | | | Borrow Waste Waste Borrow Waste DISTRIBUTION ANALYSIS 149 As in any other method, overhaul=yardage (distance between centers of mass — free-haul distance). Other useful principles in making a distribution analysis by mass diagram are illustrated by Fig. 6-12, which represents the profile and mass diagram of a continuous section of line. Balance lines equal in length to the limit of economic haul (as aa' and cc') are first drawn in the larger loops. 1= Between a' and c the most economical position of the balance line is at bb', which is drawn so that bb₁ = b₁b' with neither segment longer than the limit of economic haul. That this is the best position may be shown by imagining bb' lowered to coincide with the horizontal plotting axis. There would be no change in the total waste; the waste at b would be decreased by the increase at b'. However, the total haul would be increased by the area shown cross-hatched diagonally and would be decreased by the area cross-hatched vertically. Since these areas have equal bases bb₁ and b₁b', there is a net increase in area, or haul. Shifting the balance line higher than bb' would obviously have the same effect. The balance line dd' is adjusted so that (ddı+d½d' — d₁d2} is equal to the limit of economic haul and no segment is greater than that limit. An analysis similar to that made for bb' would prove that raising or lowering dd' from the position shown also increases the cost. In general, the most economical position for a balance line cutting any even number of loops is that in which the sum of the segments cutting convex loops equals the sum of the segments cutting concave loops, no segment being longer than the limit of economic haul. The most economical position for a balance line cutting any odd number of loops is that in which the sum of the segments cutting convex (or concave) loops less the sum of the segments in loops of opposite form equals the limit of economic haul, no segment being longer than that limit. Theoretically, the foregoing principles are unaffected by the length of free haul. For example, if the alternate positions of balance line bb' produced segments longer than the free-haul limit, overhaul would be increased with consequent increase in the payment to the contractor. If the balance lines were shorter than the free-haul limit, there would be no actual pay- 150 EARTHWORK ment for overhaul in either case. Nevertheless, the total haul in station-yards would be increased, thus adding to the contractor's cost of doing the work and, possibly, influencing him to submit slightly higher bid prices. In drawing balance lines, one note of caution should be mentioned: adjacent balance lines must not overlap. The effect is to use part of the mass diagram twice-an obvious impossi- bility except by borrowing an extra mass of earthwork meas- ured by the distance between the overlapping balance lines. Figs. 6-13 and 6-14 show two solutions for a case not found in Fig. 6-12. This is the case in which there is an intermediate loop that is not cut by a balance line equal in length to the limit of economic haul. Borrow. (+) O (-) X C Profile Yardage K Yardage KI || C D Mass Diagram Fig. 6-13. Two-way hauling from intermediate cut Waste B In both solutions, AB is the limit of economic haul and CD is the free-haul distance. The total overhaul in Fig. 6-13 is the sum of the two numbered cross-hatched triangles on the mass diagram (found in the usual way) plus the overhaul (shaded) on yardage K, which equals (XY-CD) XK station- yards. DISTRIBUTION ANALYSIS 151 In the solution shown by Fig. 6-14, the total overhaul is the sum of the four numbered cross-hatched triangles plus the over- haul (shaded) on yardage K', which equals (X'Y' −CD)×K' station-yards. Borrow Theoretically, the solution in Fig. 6-14 is the more eco- nomical one because it has less overhaul, more free haul, and the same amounts of borrow and waste. Yet, in practice, the solution in Fig. 6-13 might be preferred because of the two- way hauling and the shorter haul distances. (+ (-) 1'0 Profile -Yardage K -Yardage K 3°0 Mass Diagram 2 Fig. 6-14. Uni-directional hauling Ό < Waste Making a distribution analysis by mass diagram is not the purely mechanical process implied in the preceding discussion. Factors other than obtaining theoretical maximum economy enter into the planning of grading operations. For example, on steep grades the contractor prefers loaded hauls to be down hill. Moreover, he may prefer to haul more of a particular cut in a certain direction than is indicated on the plans. Again, there may be one fill which acts as a bottle-neck. Building it ahead of schedule, possibly by using extra borrow 152 EARTHWORK or longer hauls than those theoretically needed, may save time and money. These preferences may be realized by exercising good judgment in altering the theoretical balance lines. The result may be submission of lower bid prices. Even if the bid is not lower, the contractor is better satisfied-a condition which should produce a better job and friendlier relations with the owners. Even if a grading contract contains no overhaul clause (this practice is becoming more common), the mass diagram is still very useful in the work of grade-line design. Approximate balance points are shown on the final plans to indicate the grading schedule to the contractor. It is then his responsibility to calculate or estimate the hauls and to adjust his bid prices for excavation to cover their cost. PROBLEMS (NOTE.-Problems 6-1 through 6-8 refer to the notes on page 127.) 6–1. Compute grade-rod and ground-rod readings at: (a) Sections at A and B. Assume H.I.=557.65. G. Assume H.I.=566.14. Assume H.I. =575.32. (b) Sections at D, E, and (c) Sections at H and I. 6-2. Verify any of the end areas specified by the instructor, using the formulas shown in the table on page 132. Check the results at stations 61+25, 61+48, 62+00, and 63+00 by use of formula 6-5. 6-3. Verify any of the volumes specified by the instructor, assuming the areas tabulated on page 132 to be correct. Use formula 6-8 (except for the two pyramids) and check the results by use of Table XIX. 6-4. Verify the calculations tabulated on page 133. 6-5. Verify the prismoidal corrections for the three cut solids between stations 61+36 and 63+00 as found by the two methods used in Art. 6-11. -11. Then find values of V, by applying these corrections (with proper sign) to the values of Ve tabulated on page 132. 6-6. Use formula 6-10 to compute values of V, for any p DISTRIBUTION ANALYSIS 153 (or all) of the cut solids between stations 61 +36 and 63+00. Compare the results with Prob. 6-5 and decide which of the two methods of finding V, is preferable. 6-7. Assume that all sections lie on a curve to the left. By inspection of the notes, determine the sign of the curvature correction for each solid. 6-8. Using formula 6-17 and assuming a 12° curve to the left, determine the curvature corrections for any (or all) of the cut volumes between stations 61+36 and 63+00. Indi- cate whether the corrections should be added or subtracted. (NOTE.-Problems 6-9 through 6-15 refer to the notes on page 130.) 6-9. Compute grade-rod and ground-rod readings at: (a) Stations 16+48 through 17+83. (b) Stations 17 +98 through 18+37. (c) Stations 18+47 through 19+65. (d) Station 20+15. Assume H.I.=667.6. (a) 16+48 to 17+83. (b) 17+83 to 18+28. (c) 18+28 to 18+47. (d) 18+47 to 19+65. (e) 19+65 to 20+15. Assume H.I. =683.4. Assume H.I.=681.7. Assume H.I.=689.7. 6-10. Compute yardages of cut and fill between the indi- cated stations. Use formula 6-8 supplemented by Table XIX for all solids except pyramids. Verify the results by use of Table XVIII. Partial answer: Fill-31.0 cu yd. Partial answer: Cut=14.4 cu yd. Partial answer: Fill=2.7 cu yd. Partial answer: Fill=0. Partial answer: Cut=111.9 cu yd. 6-11. What condition must exist in formulas 6-13 or 6-14 in order for the prismoidal volume to (a) exceed the average- end-area volume and (b) equal the average-end-area volume? Which solids in the notes conform to either of these conditions? 6-12. Compute the prismoidal corrections for the solids between the following stations, and state whether the cor- rections should be added to, or subtracted from, the average- end-area volumes: (a) 16+48 to 17+05 (fill). Answer: Subtract 1.5 cu yd. 154 EARTHWORK (b) 17+83 to 17+98 (cut). Answer: Subtract 0.3 cu yd. (c) 18+47 to 19+00 (cut). (d) 19+00 to 19+65 (cut). (e) 19+81 to 20+15 (fill). 6-13. Use formula 6-10 to compute values of V, for any (or all) of the solids in Prob. 6-12. Compare the results with those obtained by combining Probs. 6-10 and 6–12. 6-14. Assume that all sections lie on a curve to the right. By inspection of the notes, determine the sign of the curvature correction for each solid. 6-15. Using formula 6-17 and assuming a 20° curve to the right, determine the curvature corrections for any (or all) of the solids in Prob. 6-12. Indicate sign. Partial answers: (a) subtract 0.5 cu yd; (c) add 2.8 cu yd. 6-16. Plot a mass diagram from the data in Table A or Table A: Free-haul limit 800 ft. Cost of excavation $0.70 per cu yd; borrow $0.80 per cu yd; overhaul $0.08 per sta.-yd. Sta. O12 M † 10 CO I ∞ ∞ 0 3 4 5 6 7 8 9 10 11 12 13 Net Cumu- lative Yardage 0 -386 - 1352 -2881 -4668 -6175 -7290 -8108 -8652 -8994 -9303 -9382 -9278 -9090 Sta. 14 15 16 17 18 19 20 21 2223 24 25 26 27 Net Cumu- lative Yardage -8745 - 8264 -7837 -7290 -6524 -5605 -4112 - 2606 0 2992 5115 6784 7992 8263 Sta. 28 29 30 31 32 33 34 34+70 35 36 37 38 39 40 Net Cumu- lative Yardage 8091 7100 5408 2996 1707 1220 1046 1018 1092 1387 2175 3290 4464 5985 DISTRIBUTION ANALYSIS 155 Table B using a horizontal scale of 1"=5 sta. and a vertical scale of 1″=5,000 cu yd. (An 8X11 inch sheet of cross- section paper will suffice.) Show a hypothetical profile above the diagram, as in Fig. 6-12. Establish balance points and compute the cost of grading. On the profile, show the sepa- rate amounts of waste, borrow, and yardage excavated; indi- cate disposition of excavation by arrows. Sta. Table B: Free-haul limit 800 ft. Cost of excavation $1.00 per cu yd; borrow $0.80 per cu yd; overhaul $0.10 per sta.-yd. 012 30 + 10 67 4 5 8 9 10 11 12 12+50 13 14 Net Cumu- lative Yardage 0 284 691 1090 1672 2393 3205 4184 5351 6904 7922 8465 8732 8860 8614 8035 Sta. 15 16 17 18 19 20 21 22 23 24 25 25+60 26 27 28. 29 Net Cumu- lative Yardage 7100 5993 4481 1573 -315 -2064 -3182 -4057 -4876 -5221 -5402 -5483 -5470 -5252 -4773 -3588 G Sta. 282383 30 31 34 35 36 37 38 39 40 41 42 43 44 45 Net Cumu- lative Yardage -1206 +620 +1021 +810 -208 -2182 -3889 -4750 -5015 -4823 -4462 -3924 -3348 -2180 -605 +1400 PART II PRACTICAL APPLICATIONS : CHAPTER 7 SPECIAL CURVE PROBLEMS 7-1. Foreword.—In a subject as utilitarian as route survey- ing, there is hardly a strict division between basic principles and practical applications. Though these headings are used in this book, many practical features have already been re- ferred to in Part I; moreover, some problems involving addi- tional theory will be found in Part II. Nevertheless, Part I is complete in itself; it does not require this additional material in order to understand and apply the theory to any practical problem met in route surveying. Part II contains specific applications of basic theory to some of the common problems and survey procedures found in practice. It is not a detailed compilation of instructions covering field and office work; such instructions are well taken care of in the manuals published by most state highway de- partments and various other organizations for the guidance of their chiefs of party. Part II is in the nature of a supple- ment to such manuals. Technical knowledge of route survey- ing being assumed, the explanations are briefer than those given in Part I and the simpler proofs are omitted. In practice, special curve problems occur in such great variety that it is not possible to include a large number of them in the space allotted to this chapter. Doing so, if possible, would have questionable merit, since the "textbook type" of problem is less apt to occur than some perplexing variation of it. To serve the purpose, a few of the more common problems will be described and general methods of approach will be outlined. These, combined with a thorough grounding in the basic principles of Part I, should enable the engineer to develop the skill needed for solving any special curve problem. 7-2. Methods of Solution.-In solving special curve prob-. lems there are four general methods of approach: (1) an exact. geometric or trigonometric solution, (2) a cut-and-try calcula- 159 160 SPECIAL CURVE PROBLEMS tion method, (3) a graphical method, and (4) a cut-and-try field method. Generally the first method is preferred. However, if the solution cannot be found or is very complicated, cut-and-try calculation often provides a fairly quick solution. In case a problem is not readily solvable by either of these methods, the unknowns may sometimes be scaled from a careful drawing; the scale must be fairly large to give adequate precision. Some problems are adaptable to cut-and-try solution in the field (see Art. 3–14 for an example previously described). Addi- tional examples of these methods of solution follow. OBSTACLE PROBLEMS 7-3. P.I. Inaccessible.-Simple Curve: This problem is of frequent occurrence. Conditions are shown in Fig. 7-1. The problem is to locate the curve points A and B. L X J === 1 B Fig. 7-1 Find any convenient line XY cutting the established tangents. Measure distance XY and deflection angles x and y. Angle [=x+y. Calculate XV and VY by using the sine law. Subtract their values from T (or T、), giving the required distances to the beginning and end of the curve. Compound Curve, Fig. 7-2: In this case the cut-off line is chosen so as to establish the T.C. and C.T. at X and Y. One OBSTACLE PROBLEMS 161 From Σ latitudes: more variable must be known. Assume Rs, since the maxi- mum D is often fixed by specifications. Thus, the four known values are XY, Rs, and the angles x and y. Use the closed traverse shown by heavy lines and solve by the traverse method described in Art. 3-6. Angle I=x+y RL-XY sin x-Rs cos I—(RL-RS) cos IL=0 X R₁ OL Y Os R tan IL: Is Fig. 7-2 If the hint preceding equation 3-3 in Art. 3-6 is used, this relation reduces to vers IL: = XY sin x-Rs vers I RL-RS (7-1) Similarly, the relation based on Σ departures reduces to XY cos x-Rs sin I RL-RS sin IL (7-2) When equation 7-1 is divided by 7-2, the result is XY sin x-Rs vers I XY cos x-Rs sin I (7-3) Solve equation 7-3 for IL. Then obtain RL-Rs from equation 7-1 (or 7-2). Finally, Is=I—IL. Use the same method if RL were assumed; the final relations differ only in signs and subscripts. 162 SPECIAL CURVE PROBLEMS 7-4. T.C. or C.T. Inaccessible.-In Fig. 7-3, assume В to be the C.T. The problem is to stake the computed curve and to check the work for alignment and stationing. Set a check point F on the forward tangent by measuring VF, using right-angle offsets to get around the obstacle. Sta. F=Sta. C.T.+VF−T. a Stake the curve from A to a station (as P) from which a sight parallel to the forward tangent would clear the obstacle. Occupy P and deflect angle I-2 (i.e., angle I minus the tabulated deflection for the station occupied), thereby placing the line of sight parallel to the tangent. Set point E on this line by measuring PE=Sta. F-Sta. B+R sin (I—a). A R1 1 kay V Fig. 7-3 E 012 Occupy E, turn 90° from EP, and check the distance and direction to F. The offset EF should equal R vers (I-a). (If EF is small, it may be computed by slide rule from formula 2-30, in which arc PB is used for s.) While the transit is at A (or P), set stakes on the curve for cross-sectioning between P and the obstacle, leaving one stake at the plus point marking the beginning of the obstacle. If B were the T.C., run in the part AP of the curve back- ward from the C.T. The rest of the process is similar in principle to that just described. OBSTACLE PROBLEMS 163 If the curve is spiraled and the S.T. or T.S. is made inacces- sible, such as by the obstacle at position 1 in Fig. 7-4, the field procedure is the same but the computations differ somewhat. In the general case, assume that the line of sight from the C.S., pointed parallel to the forward tangent, would be cut off by the obstacle at the S.T. As before, run in the layout to a station P on the circular arc, a being the central angle (twice the deflection difference) between P and the C.S. at C. a→ or P_CTC.S.) Δ X त Į Δ R 2010 KILWA E -Position 2 sta. F-sta. P+ (5.7.) QB w's F -pa -Position I Fig. 7-4 Occupy P, turn the line of sight parallel to the forward tangent, and measure the distance PE to any convenient point beyond the obstacle. Point K is the offset C.T. (KJ=0; BJ=X。). The offset PQ (=EF)=0+} (PK)² D, the value for PK being taken equal to the difference in stationing between P and C plusLs. If the offset is large, compute it from the relation PQ=0+R vers (a+A). For checking out on the tangent, the relation is: sta. F-sta. P+PC+CB+BF 100 a D +L+[PE-Xo-R sin (a+A)] If both the P.I. and the T.C. (or C.T.) are inaccessible, a combination of the foregoing procedures will provide the solu- tion. 164 SPECIAL CURVE PROBLEMS 7-5. Obstacle on Curve. For methods of by-passing obstacles preventing sights to curve points or obstacles on the curve itself, see Arts. 2-11 and 2-14 along with Figs. 2-8 and 2-11. you ++++B' Main B' Main B X Track V ffffff | est 1 | od 05 کار Proposed Warehouse Fig. 7-5 F 1 t + 2 22살 ​Rest If the obstacle cuts the spiral and the tangent but does not obstruct the S.T. (or T.S.), as at position 2 in Fig. 7-4, first run in the layout to the C.S. (or S.C.). Then set up at the C.S. (or S.C.) and locate stakes on the spiral which are needed for cross-sectioning between the set-up and the obstacle. Finally, check the position of the S.T. (or T.S.) and the direction of the main tangent, by measuring the spiral coordinates X and Y and turning the necessary right angles. An alternate procedure, which may be used if the obstacle interferes with the sight from C pointed parallel to the main tangent, is to place the line of sight on the local tangent at C CHANGE-OF-LOCATION PROBLEMS 165 and to measure the spiral short tangent to a point X on the main tangent. The field work may then be checked by occupying point X, deflecting angle A from a backsight to point C, and measuring (possibly using right-angle offsets around the obstacle) the spiral long tangent to a check at the S.T. (or T.S.) of the layout. See also Art. 5-2 and Fig. 5-2. 7-6. Obstacle on Tangent.-For the general method of by- passing an obstacle on a tangent at a point unaffected by a curve, see Art. 9-13. Examples of obstacles spanning both a tangent and a curve are given in Arts. 7-4 and 7-5. Special problems affecting tangent distances of curves have infinite variety. Fig. 7-5 represents a case in which it was required to run a spur track to a proposed warehouse. Con- ditions (not shown) fixed the warehouse location as indicated. It was impossible to run in a simple curve AB without inter- fering with existing buildings and a turnout track. The solu- tion was a compound curve APB'. See Prob. 7-9 for the numerical values involved. CHANGE-OF-LOCATION PROBLEMS After part of the paper-location alignment has been staked, desirable minor adjustments often become apparent (see Art. 1-12). Frequently the data obtained and the stakes already set for the original curve can be used to advantage in making the revision. A few common cases coming under this heading are outlined in the following articles. More extensive adjust- ments are best made by locating the new P.I. and staking the revised curve irrespective of the original layout. If the line has been staked and cross-sectioned beyond a location change, it is necessary to determine and mark clearly the station equation at the point common to both layouts. 7-7. Practical Suggestions.-Skill in solving change- of-location problems does not come from memorizing certain "textbook solutions" but is developed by identifying the key steps in those solutions and applying them to the unusual prob- lems that arise in practice. The following practical hints, numbered for ease of reference, are helpful. 166 SPECIAL CURVE PROBLEMS Hint 1: Draw a careful sketch, which is not necessarily to scale. Exaggerate small distances to make their effects clear. Preserve right angles. Do not make other angles close to 90°; otherwise, a special case might result. If only one graphical solution is possible when the known data are used, the problem is definite and determinate. Hint 2: If the problem involves a revision of some kind, such as the shift of a tangent, the solution must contain that known revision. Try to connect known revisions to known points on the original layout by simple geometric construction, especially by triangles. Considering a triangle containing curve centers or vertices often leads to the solution. A A V V оо Fig. 7-6 SB Jok Hint 3: A known linear revision may often be expressed as the difference between a known part of the original layout and a similar unknown part of the revised scheme. Also, an unknown linear revision may equal the difference between similar known parts of the two layouts. Hint 4: If a point is common to both layouts, perpendicu- lars dropped from that point to tangents or radii frequently disclose the key to the solution. Hint 5: Although there is only one correct set of numerical answers to a definite problem, there may be several correct geometric solutions. If a certain solution cannot produce adequate precision, determine the reason for the lack of preci- sion and search for a better solution. CHANGE-OF-LOCATION PROBLEMS 167 Hint 6: If a solution by means of simple construction can- not be found, recall that a solution by traverse is usually applicable. (See Art. 3-6.) 7-8. Simple Curve; New Parallel Tangent; Same D. Assume that the forward tangent is to be shifted outward parallel to itself a small distance p in order to reduce grading or to improve the approach to the next curve. A 오 ​0° Rs S 0% 11 R₁ B skew shift b !B' P sin I P Fig. 7-7 In Fig. 7-6, the skew shift obviously equals AA'=00'= VV'= BB'. From a triangle at any one of these positions (see Hint 2, Art. 7–7), (7-4) Tape the skew shift from A and B to locate hubs at the new curve points A' and B'. For a tangent shifted inward, use A'B' as the original curve. 7-9. Compound Curve; New Parallel Tangent; Same D's. This is the same problem as the one in Art. 7-8, except that the curves are compounded at C and C' (Fig. 7-7). Although a solution by construction is possible (Hints 3 and 4 being used), it may not be readily apparent. Therefore, use the traverse method (see Hint 6). In the closed traverse bBО10s0′ıb, Σ departures=-RL+(RLRs) cos IL — (RL-Rs) cos I'+(Rь−р)=0 - L Ꮮ 168 SPECIAL CURVE PROBLEMS from which (7-5) The distance bB needed for locating the new C.T. at B' is found by setting Σ latitudes equal to zero and reducing. The result is cos I'L=cos IL- bB=(RL-Rs) (sin I'L-sin IL) (7-6) (Observe that equation 7-6 also comes directly from Hints 3 and 4 by dropping perpendiculars from Os to the radii.) There are four variations of this problem, the solution depending on whether the layout starts with the sharper or flatter arc and on the direction (outward or inward) of the tangent shift. The final relations contain different signs and subscripts. A v v o's R 1 p RL-RS B Hot R⋅ т q p R' = R+ vers I B' Ok Fig. 7-8 7-10. Simple Curve; Parallel Tangent; Same T.C.-In contrast to the situation in Art. 7-8, assume that the original T.C. must be preserved, thereby requiring a curve of new D, as indicated in Fig. 7–8. From the triangle at the vertex (Hint 2), VV'= the skew p shift = and the new tangent distance T' equals T+VV'. sin I' = Then D' is found from Table VIII, or, if preferred (Hints 4 and 3), from (7-7) CHANGE-OF-LOCATION PROBLEMS 169 For setting the new C.T. at B', notice that B' must lie on AB produced. Since angle bBB' equals 1, P sin I (7-8) When the tangent is shifted inward, use AB' as the original curve. R Q BB': 7-11. Simple Curve; New C.T. Opposite Original C.T.-If conditions do not permit moving the C.T. forward (as in Fig. 7-8), it may be kept on the same radial line opposite the original position, as in Fig. 7–9. A Á V V X R'A K = Api A A' RARG 0%____ P exsec I Fig. 7-9 Fig. 7-10 For the triangle at the vertex (Hint 2), VK=p cot I, and the new tangent distance T' equals T-VK. ********** Then D' is found from Table VIII, or (if preferred) BB' = BX-B'X (Hint 3). That is, p= (R-R') exsec I, from which R' = R- (7-9) For setting the new T.C. at A', notice that AA' does not equal VV'. Find AA' from the triangle at the centers (Hint 2). This triangle gives AA'=(R—R') tan I (7-10) When the tangent is shifted inward, use A'B' as the original curve. 7-12. Simple Curve; New Direction From C.T.-Changing the direction of the forward tangent after a curve has been staked may place the alignment on more favorable ground 170 SPECIAL CURVE PROBLEMS than by shifting the tangent parallel to its original position. Fig. 7-10 represents a case in which the tangent is swung in- ward through a measured angle a, the C.T. at B being pre- served. The new central angle I' equals I+a. Using Hint 4, drop perpendiculars (not shown) from B to the tangent AV produced and to the radii OA and O'A'. Then, by inspection, R' vers l'= R vers I, and R vers I R' vers I' Also, from Hint 3, AA'R sin I - R' sin I' (7-12) If preferred, solve triangle VBV'' (Hint 2) for T'. Thus, T sin I (7-13) sin I' Then, obtain D' from Table VIII. T' - (7-11) 7-13. Modification for Spiraled Curve.-In the preceding examples illustrating change-of-location problems, the curves were not spiraled. Spiraling complicates field adjustments to a certain extent. The best general method is to locate on the ground the positions of the offset T.C.'s and the offset P.I., thereby converting the problem to one involving unspiraled curves. In a simple problem it may not be necessary actually to stake the offset T.C.; but the calculations must then take the spiral into account. (See Fig. 7-4 for an example.) RELOCATION PROBLEMS Major relocations of existing highways are continually being made in order to bring them into conformity with modern standards. To a lesser extent, some large sections of railroad line are being relocated, especially in mountainous terrain where the amount of traffic originally expected did not warrant low grades and expensive alignment. In such work little, if any, use is made of the existing alignment records. Minor relocations, both on highways and railroads, are even more common; they will probably continue to outrank RELOCATION PROBLEMS 171 major relocation projects in total mileage and construction cost. The shorter the relocation the more convenient it becomes to tie the survey work closely to the original align- ment. Survey and design problems are closely related to those having to do with obtaining new right-of-way and abandoning old right-of-way. of A Two typical minor relocation problems are outlined in the following articles. References to some major projects are given in Chapters 9 and 10. pc.s. S.C B C -pl Is Rs FR FRL yó H Fig. 7-11 | C.S. S.C. 7-14. Replacement of Broken-Back Curve.-A "broken- back" curve consists of two curves in the same direction separated by a tangent shorter than the sum of the distances needed to run out the superelevation. Formerly, such align- ment was often used for reasons of economy, but present standards rarely justify the practice. When the entire lay- out is visible, it is very unsightly; even though obscured, it is apt to be dangerous (on highways). Elimination of the tangent between the curves is a common relocation problem. Occasionally it can be done by inserting a single curve between the outer tangents of the existing curves. 02 172 SPECIAL CURVE PROBLEMS A more general method is illustrated in Fig. 7-11, which shows the original tangent BC separating curves with centers at Os and OL. A new curve with its center at O is sprung between points A and D on the existing curves, thus forming a three-centered compound curve (Art. 3-9). The problem is to locate points A and D. If a value is assumed for the radius R of the new curve, the positions of A and D can be found by solving the right tri- angle OsHOL and the triangle Os00L, and then calculating the angles Is and IL, which locate A and D. A Is Os B Rs 1- R- OL X R Fig. 7-12 The maximum offset PK between the original and revised layouts should be computed to see if it falls within the limit permitted by topography. PK=(R − Rs) vers Is (7-14) If spirals are required between the curves, the problem then becomes a special case of inserting spirals between arcs of a compound curve. The center O is preserved and the radius of the new curve is increased to R+KJ, where KJ · The two spirals usually have different lengths, since = 01-02. RELOCATION PROBLEMS 173 the differences between the degrees of the new and original The theory of the process is curves will rarely be the same. outlined in Arts. 5-8 and 5-9. Side DX ΧΟ 00s Os B BC COL OLD Fig. 7-12 illustrates how a change in specifications some- times complicates a problem. The existing layout is a broken- back curve similar to that in Fig. 7-11, but field conditions require that the new curve start at A (the T.C. of the original shorter-radius curve) and end on the existing forward tangent at an unknown point X. The problem is to find the new radius R and the distance DX. No solution is possible by merely solving two triangles, as was the case in Fig. 7-11. To avoid more-intricate construction, the traverse method is used. (Hint 6, Art. 7–7). The closed traverse DXO0sBCOLD is imagined to be oriented so that direction DX is 0° azimuth (Rule 2, Art. 3–6). The data for the traverse are then as follows: Length DX R R-Rs R$ BC ᎡᏞ RL Azimuth 0° 270° 90°-I 90°- IL 180°- IL 270°— IL 90° R = Setting Σ departures equal to 0 and reducing gives Rs (cos IL-cos I)+BC sin IL+RL vers IL vers I Similarly, setting Σ latitudes equal to 0 gives DX= (RL-Rs) sin IL-(R-Rs) sin I+BC cos IL (7-16) As in Fig. 7-11, the maximum offset is expressed by formula 7-14. (7-15) The foregoing formulas are solved quickly by calculating machine and Table XX, in which all needed natural functions appear in the same table. (See Prob. 7-5.) 7-15. Replacement of Reverse Curve.-Fig. 7-13 shows an existing reverse curve ACB which is to be replaced by a new simple curve starting at the same T.C. at A. The problem is 174 SPECIAL CURVE PROBLEMS to find the new radius R and distance XB. The following solution is by the traverse method employed in Fig. 7-12, 0° azimuth being taken parallel to OX in the closed traverse OXBO SOLO. Angle I=Is-IL. Setting Σ latitudes equal to 0 and reducing gives RL (cos I-cos Is)+Rs vers Is vers I R= Then, (See Prob. 7-6.) X Setting departures equal to 0 and reducing gives XB=(RL+R) sin I−(RL+Rs) sin Is (7-18) To find the maximum offset PK, first calculate angle a from the relation -R tan a= Offset PK=(R-Rs) exsec a B V PR XB R-Rs Pos C Fig. 7-13 A (7-17) O (7-19) (7-20) O₁ 7-16. General Method for Major Relocation.-Even in the case of a long relocation supplanting several curves and their intervening tangents, it is useful to tie the survey to the exist- ing alignment and to compute the resulting closed traverse by means of the old alignment data on file. This not only gives a check on the field work without extra surveying but also MISCELLANEOUS PROBLEMS 175 provides the coordinates needed for drawing a map of the two layouts. Relocations often result in surprisingly simple alignment. Fig. 7-14* shows a case in which a single 1° curve and two tangents replaced seventeen curves having total central angles of more than 900°. 7-17. Curve Through Fixed Point.-A curve may be made to pass through (or close to) a fixed point either by trial methods or by an exact geometric solution. -BRISTOW RELOCATION OF U.S.66 NEAR BRISTOW, OKLAHOMA To MISCELLANEOUS PROBLEMS Begin relocation NEW LOCATION (2.9 miles; 1 curve) SAPULPA Fig. 7-14 OLD LOCATION (3.8 miles; 17 curves) U.S.66. LEnd relocation A method of accomplishing the result by a trial field method from a selected T.C. was described in Art. 2-14 under the heading of chord offsets. This problem is more intricate where the P.I. and the directions of the tangents have been established. In this situation a trial field method is apt to be unduly time-con- suming. Either a trial calculation or an exact geometric method is better. Fig. 7-15 shows this situation, P being the point fixed by ties to the P.I. The tie measurements may be the distances VP' and P'P or the distance VP and the angle a. Either pair of values may be obtained from the other by computation. The problem is to find the unknown radius R, after which all remaining data are easily computed. * Concrete Highways, Vol. XX, No. 1, Jan.-Feb., 1939. 176 SPECIAL CURVE PROBLEMS The key to the trigonometric solution is the triangle OPV (the interior angles of which are denoted by o, p, and v). Although only one side (PV) and one angle (v) are known, the relation between the two unknown sides is known; there- fore, the triangle can be solved. A XXX 1 R 21+0 The ratio of the unknown sides OP and OV is R:R sec 11, which equals cos 1. Therefore, the law of sines can be used in the key triangle, giving sin p:sin v=OV:OP, from which (7-21) Fig. 7-15 sin P R= = Since all angles of the triangle are now known, R may be found from the sine law. However, if angles v and o are very small, R may not be calculable to sufficient precision owing to the rapid variation in the sines of the angles (see Hint 5, Art. 7-7). In this case, solve for R from the relation ***** sin v cos I (7-22) The problem just described may be used to illustrate how a quick slide-rule solution by a trial calculation method often gives results close enough for the purpose. For example, sup- pose that I=28°16′, VP'=150 ft, and P'P=20 ft. It is required to find D to the nearest 10 minutes. T₁o (Table VIII) = 1,442.7 PV sin (I+a) vers (1+0) MISCELLANEOUS PROBLEMS 177 Try D=3° 00: AV VP' AP'diff. B 1,442.7 3 = T.O.3° (Table I)=2.62 and PP'3° =3.31²×2.62=28.7 3 (PP'₂° may be checked by formula 2-30.) Since PP';° exceeds 20 feet, the correct D is greater than 3°. Try D=4° X From a similar process, PP'4° = 15.4 Hence, by interpolation, the required value of D is approxi- mately equal to 3°+13.3×60′=3°39′ (say 3°40′). 8.7 о a 481 = 150 =331 R C ए Fig, 7-16 The 3°40' curve will not pass exactly through point P. If a closer value of D is required, interpolation between another pair of values for D=3°30′ and 3°40′ should give D to the nearest minute. 7-18. Intersection of Straight Line and Curve.-Fig. 7-16 represents a more general case of Fig. 7-15 in which a straight line XP' cuts the tangent AV of a given curve. The problem 178 SPECIAL CURVE PROBLEMS is to locate the intersection of the line and the curve at P. Among other places this problem occurs in right-of-way work, as in defining the corner of the piece of property shown shaded. All curve data are known and the survey notes also provide the angle a and the distance AP' (or P'V). This information being given, the problem could be con- verted to the preceding one by drawing another tangent (not shown) from P' to the curve, thereby making P' correspond to point V in Fig. 7-15. The problem could also be converted to one in analytic geometry (see Art. 7-19) by finding the equations of the line and of the circle and solving them simultaneously. However, the traverse solution is more direct. If 0° azimuth is assumed in the direction PP', setting Σ departures equal to 0 in the traverse PP'AOP gives cos (a+c)= R cos a-P'A sin a Ꭱ (7-23) from which the central angle c and the stationing of P may be computed. From Σ latitudes =0, PP' = R sin a+P'A cos a−R sin (a+c) (7-24) This is the type of problem which is solved readily by graphical methods. For example, if AP' is known, the exact tangent offset at P' is computed and laid off at right angles to a line representing the tangent AV. A large scale should be used (say 1 inch = 1 foot). Then, at a point 10 feet closer to A, another tangent offset is computed and laid off parallel to the previous one and 10 inches away. A spline fitted to three such points is used for drawing in the curve, and the line XP' is then drawn to the intersection at P. Finally, the required distance P'P is scaled to the nearest 0.01 inch, the ground distance thus being determined with an error hardly greater than 0.01 foot. In the case of a field problem, rather than one met in the office, the point P may be found by setting two points close together on the curve either side of where the straight line comes through. Point P is then located by "string intersec- tion." MISCELLANEOUS PROBLEMS 179 Y 7-19. Solutions by Analytic Geometry.-When a curve problem cannot be solved readily by any other method, recourse may be had to analytic geometry. This procedure relies on a basic mathematical tool and has the virtue that computations can be arranged so as to be self-checking. Analytic geometry is also the basis for the COGO system of programming problems for solution by electronic digital com- puter (Art. 13–5). To review some of the principles of analytic geometry, the equation of a line cutting the Y-axis (as line 1 in Fig. 7-17) is X Y=Iy±tan @ (7-25) For a line cutting the X-axis (line 2), X=IY tan 0 Y Linel 8 X+ Y X- Ix Fig. 7-17 Line 2 X (7-26) To find the equation of a line from the coordinates of two points on the line, first find the bearing from 0= X difference arc tan Then find I, or I by substituting the Y difference* coordinates of one of the points in equation 7-25 or 7-26. When 0 falls between zero and 10°, equation 7-26 is preferred; between 80° and 90°, equation 7-25 is preferred. In either 180 SPECIAL CURVE PROBLEMS case, it is advisable to check the result by using the coordinates of the second point in the same equation. The equation of a circle, as shown in Fig. 7-18, is (X-h)²+(Y-k)² = R² (7-27) Any of the problems previously solved by the traverse method might have been solved by analytic geometry. In fact, analytic geometry can also be applied to computing the locations of critical points along a simple-curve or spiraled- curve layout. This method is particularly useful where all details of a route alignment are tied to a state plane coordinate system. Y Y R h→ -X· Fig. 7-18 P X Analytic geometry is especially adapted to solving a problem that requires finding the locations of points of intersection of straight lines or curves. The problem in Art. 7-18 is such a case. Fig. 7-19 illustrates the solution of this problem by analytic geometry for the general case where the coordinate axes are not rotated or translated so as to simplify the solution. The same basic data are known as in the traverse solution of Art. 7-18. These data are the coordinates of V (or A), the bearings of the tangents, all geometric-curve data, the distance VP'(or AP'), and the bearing 0 of the intersecting line. To find the desired coordinates of the intersection P, proceed as follows: MISCELLANEOUS PROBLEMS 181 Solve for the unknown constants h and k from h=X₁+ R sin 0₁ and k=YA-R cos 01. The equation of the simple curve (formula 7-27) is then known. Commence with the given coordinates of V (or A) and find the coordinates of P'. This fixes the coordinates of one point on the intersecting line. Y A k ト ​نا B& h 02 p' Р || || Fig. 7-19 11 XA 01 LR 1 =0 о X XP' tan 02 Find the value of 1, from Iy=Yp'+; The equation of the intersecting line (formula 7-25) is then known. Finally, obtain the required coordinates of P by solving the equations of the curve and the intersecting line simultaneously. For additional applications of analytic geometry to practical problems, see "Analytic Geometry in Highway Design and Layout," Proceedings ASCE, Vol. 86, Paper 2548, July, 1960 and “Drafting-Room Problems Solved by Analytic Geometry" by S. L. Goldberg, Civil Engineering, Vol. 30, No. 12, December, 1960, pp. 68–70. 182 SPECIAL CURVE PROBLEMS PROBLEMS (NOTE:-Deflection angles for staking the following curves are not called for. These may be specified by the instructor if desired.) 7-1. Simple curve with P.I. inaccessible (Fig. 7-1). Find: sta. T.C. (A), sta. C.T. (B), and distance YB. (a) Sta. X=172+50; XY=366.28; x=32°30'; y=23°22′; Da=6°. Answers: T.C. = 169+19.19; C.T. = 178+50.30; YB = 268.56. (b) Sta. X=67+00; XY=411.57; x=25°12′10″; != 39°36′30″; Dc=5°. Answers: T.C.=62+62.35; C.T.=75+ 58.57; YB = 533.94. (c) Sta. X=82+40.6; XY=550.2; x=57°18'; y=16°35'; R=500 ft. (d) Sta. X=275+00; XY=1,034.7; x=32°00′; y-92°26';' Dc=10°. 7-2. Compound curve with P.I. inaccessible (Fig. 7-2). Find: sta. C.T.(Y), IL, Is, and the missing radius. (a) Sta. T.C.(X)=48+00; XY=1,985.2; x=29°33′; y= 47°25'; Rs 1,000. Answers: C.T. = 69+32.6; IL=30°24′38″; Is=46°33'22"; RL=2,487.1. (b) Sta. T.C.(X) = 432+00; XY=1,562.73; x=33°52′40″; y=52°04′10″; Ds (chord def.) =8°. 7-3. Change-of-location problems. Assume that original curves are staked and that field revisions conform to the indi- cated figures. Find: the station of the new C.T. and the distances needed to set hubs at the new T.C. and C.T. by taping from their original positions. (a) Fig. 7-6: Sta. A=63+84.2; I=41°24′; Da=5°; p=20. (b) Fig. 7-8: Sta. A =82+10.6; I = 54°15′; R = 1,000; p=45. (c) Fig. 7-9: Sta. A=164+25.91; I=36°24′30″; D.=3°; p=10. (d) Fig. 7-10: Sta. A=287+68.34; I = 65°42′50″; D.=41°; a=5°. 7-4. Broken-back curve (Fig. 7-11). Find: PK and the station equation at point D. (a) Sta. B=92+41.26; Rs=500; R1=800; R=1,000; BC= MISCELLANEOUS PROBLEMS 183 385.47. Answers: PK=61.84; sta. D 103+00.76 revised sta. 102+73.28 original. (b) Sta. B=36+82.53; Rs=800; RL=1,200; R=1,500; BC=270.19. 7-5. Broken-back curve (Fig. 7-12). Find: R, the maxi- mum offset, and the station equation at point D. (a) Sta. A=73+48.2; Rs=310; RL=500; Is=29°35′; IL= 22°04'; BC=269.6. Answers: R=613.54; max. offset =39.6; sta. D 79+84.5 revised 79+70.4 original. = (b) Sta. A =31+82.56; Ds=10° and D=8° (both are def.); Is=42°48′20″; IL=32°30′10″; BC=264.37. 7-6. Replacement of reverse curve (Fig. 7-13). Find: R, PK, and the station equation at point X. (a) Sta. T.C. (4) = 18+52.34; D=1°35′ and Ds=4°25′ (both are def.); Iz=16°42′; I=75°26′. (Note: This is the reverse curve used in Prob. 3-5. Answers: R=4,031.47; PK=528.97; sta. X 59+84.96 revised = 63+96.13 original. (b) Sta. T.C.(A)=71+83.1; RL=1,000; Rs=500; IL= 24°03′; Is = 55°35'. 7-7. Curve through fixed point (Fig. 7–15). Find: Da (to nearest minute) and sta. T.C.(4). Verify answers by the trial-calculation method. (a) Sta. P.I.(V) = 53+47.6; I =58°10'; VP' =490.7; P'P = 26.4. Answers: Da=4°12'; sta. T.C. =45+88.8. (b) Sta. P.I.(V) = 18+35.7; I=42°00′; VP'=179.2; P'P = 50.4. (c) Sta. P.I.(V)=76+02.46; I=53°40′20″; VP=298.59; a =5°32′10″". 7-8. Intersection of line and curve (Fig. 7-16). Find: distance P'P, sta. P, and the coordinates of P by the method of Art. 7-18. Verify answers by the method of Art. 7-19. (a) Sta. P.I.(V)=81+92.47; coordinates of V=N 6,055.22, E 5,409.63; bearings AVS 52°42′20″W, VBS 8°08′40″E, XP'=S_80°37'10" E; lengths AV(T) = 587.28, AP'=480.27, R=1,000. Answers: PP' =115.41; sta. P=86+05.17; coordi- nates of PN 6,101.25, E 5,608.63. 184 SPECIAL CURVE PROBLEMS (b) Sta. T.C. (A) = 226+82.54; coordinates of A = N 4,368.27, E 11,836.52; bearings AVS 84°28′45″ E, VB = S 19°26′30″ E, XP' =S3°02′45″ E; lengths AV (T) =1,912.59, AP' =1,191.73, R=3,000. (NOTE: The remaining problems are "original" in the sense that no special formulas for solving them appear in this book. The suggestions found in Arts. 7-2 and 7-7 are especially pertinent. Problems appear in the order of increasing difficulty. Answers are purposely omitted as a chal- lenge to the computer to verify his work by a different method.) 7-9. Fig. 7-5. Given: angles XVA=100°, VXP=36°, VAP=22°; distances VA = 1,200, AOs=1,000; sta. A=12+ 00. Find: sta. B'(along curve APB') and distance VB'. 7-10. Two independent simple curves have the following data:. Curve 1. R=2,500; sta. T.C.=75+16.21; coordinates of T.C.=N 20,782.65, E 36,030.62; bearing initial_tangent = N 73°04′10″ W, final tangent = N 23°56′40″ W. Curve 2. R=1,000; sta. T.C.=27+84.35; coordinates of T.C.=N_22,290.14, E 32,780.44; bearing initial tangent N 6°10′20″ W, final tangent = N 80°56′00″ W. A connection in the form of a common tangent is to be run from point X on curve 1 to point Y on curve 2. Find: length and bearing of XY, sta. X on curve 1, and sta. Y on curve 2. = 7-11. A simple curve AB has R = 1,000, I=55°27', and sta. T.C.(A)=47+21.63. A location change requires the curve to be compounded at sta. 51 +50 so as to join a new forward tangent located exactly 100 feet outward parallel to its origi- nal position. Find: R of the second arc, sta. of the new C.T. (B'), distance BB', and the angle between BB' and the original tangent at B. 7-12. Reverse curve between non-parallel tangents. Given: angle between tangents at P.I.=30°19′10″; Ts(P.I. to T.C.) = 438.62; Tı(P.I. to C.T.) =2,037.54; sta. T.C.=429+81.67. Conditions require that both arcs have exactly the same radius. Find: R, sta. of point of reversal, and sta. of C.T. CHAPTER 8 CURVE PROBLEMS IN HIGHWAY DESIGN 8-1. Foreword.-Because of the public nature of highway traffic, highway curves have a greater effect upon safety of operation than do curves on railroad lines. Railways, operating over fixed track on private right-of-way, are able to control the volume and spacing of traffic and to enforce slow orders on dangerous curves. Such restrictions are not practicable on the public highway. Consequently, it is neces- sary to "build safety into the highways" by proper location and design. It would be difficult enough to meet this require- ment if conditions were static, but the continuous improve- ments in vehicle design and in highway construction, both of which encourage ever-increasing speeds, make safety the high- way designer's paramount engineering problem-as yet unsolved in several important respects. The importance and variety of curve problems in highway design warrant devoting a separate chapter to aspects of these problems not fully covered in the preceding chapters. Though certain physical and geometric principles are reasonably well established, the numerical recommendations controlling design are in many cases only tentative. Illustrative examples are taken from recent research or from current design "policies" or "standards." Revision of policies and standards can be expected as conditions change and as research discloses facts not yet known. Until recently the various elements entering into highway- alignment design had been fixed largely by rule-of-thumb methods, and there was little agreement among State highway departments. This difference in practice was partly due to the mushroom growth of traffic, which forced the highway engineer to concentrate upon meeting the resulting demands quickly by any methods that seemed adequate at the time. However, the principal reason was lack of basic research concerning the human and mechanical factors which con- tribute to safe operation at high speeds. Research during 185 186 CURVE PROBLEMS IN HIGHWAY DESIGN the decade preceding World War II supplied much of the missing information; from time to time additional research continues to reveal new facts needed to bring all design ele- ments into harmony with a chosen design speed. C. M. Noble has listed¹* the design elements affected by speed as follows: (1) Over-all Width of Highway (a) Median strip, width and treatment (b) Shoulders, width and treatment (c) Paved lane width Sight Distance (a) Vertically (b) Horizontally (c) Determination of proper friction factor and reac- tion time (3) Minimum Radius for Horizontal Curvature (4) Rates of Superelevation for Horizontal Curves (a) Determination of proper friction factor (un- balanced centrifugal ratio) (b) Correlation of superelevation rate with require- ments of slow and fast vehicles (5) Length of Spiral Curves (6) Length of Superelevation Runout Beyond Spiral (7) Length of Profile Tangents (8) Distance Between Horizontal Curves (a) Same direction (b) Reverse direction (9) Spacing of Points of Access and Exit (10) Length of Acceleration and Deceleration Lanes at Points of Access and Exit (11) Design of Turnouts at Points of Exit (12) Signs (a) Size of letters (b) Maximum number of words in sign message *Superscript numbers refer to the bibliography at the end of this chapter. SIGHT DISTANCE 187 (c) Reflectorization (d) Position (13) Type of Pavement Of the items in the foregoing list, those from (2) to (8) inclu- sive come logically within the scope of this chapter; the others belong more properly to the field of highway construction and design. An important step toward the incorporation in practice of design features which will result in the maximum degree of safety and utility was taken in 1937 by the American Associa- tion of State Highway Officials with the organization of a "Special Committee on Administrative Design Policies." Since that year several brochures have been approved by the States after thoughtful research, discussion, criticism, and final revision. One of the most useful was "A Policy on Sight Distance for Highways," approved in 1940. This policy, along with six others on various aspects of geometric design, played an important role in the gradual replacement of rule- of-thumb methods by scientific design based on research. Later, the material in these seven policies was revised, ex- panded, and brought up to date in the form of a single volume² entitled "A Policy on Geometric Design of Rural Highways." This latest policy, adopted May 3, 1954, is a monumental work which is bound to have a good influence on geometric highway design for many years. In the following articles, references to this publication are denoted, for brevity, by AASHO Policy. SIGHT DISTANCE 8-2. Speeds.-Speed and sight distance are closely related. Several definitions of speed are used in the AASHO Policy. Over-all travel speed is the speed over a specified section of highway, being the distance divided by the over-all travel time. The term running speed refers to the distance divided by the time the vehicle is in motion. In either case, the average speed for all traffic, or component thereof, is the summation of distances divided by the summation of running (or over-all travel) times. The most useful concept of speed is design speed, which is the maximum safe speed that can be 188 CURVE PROBLEMS IN HIGHWAY DESIGN maintained over a specified section of highway when conditions are so favorable that the design features of the highway govern. 8-3. Definitions.-Two definitions of sight distance are in use, known as "stopping" and "passing." Stopping sight distance should be long enough to permit a vehicle traveling at the assumed design speed to stop safely before reaching a stationary object in its path. At horizontal curves and at crest vertical curves, the height of the driver's eye is assumed to be 4.5 feet, and the height of the object is taken as 4 inches (AASHO Policy). At no point on a high- way should the sight distance be less than the stopping value. Passing sight distance on a tangent is the shortest distance required for a vehicle safely to pull out of a traffic lane, pass a vehicle traveling in the same direction, and return to the correct lane without interfering either with the overtaken vehicle or with opposing traffic. At horizontal curves and at crest vertical curves, passing sight distance is the length of road that must visibly be free of obstructions in order to permit a vehicle moving at the design speed to pass a slower-moving vehicle. For these cases the height of both eye and object is taken to be 4.5 feet (AASHO Policy). Highways on which passing must be accomplished on lanes that may be occupied by opposing traffic should be provided with frequent safe pass- ing sections on which the sight distance is not less than the passing value for the assumed design speed. Sight distances on overlapping horizontal and vertical curves are determined independently for each type of curva- ture. The critical sight distance at any point is then taken as the smaller of the two. 8-4. Stopping Sight Distance.-Stopping sight distance is the sum of two distances: (1) that traversed during perception plus brake reaction time; (2) that required for stopping after brakes are applied. Numerous scientifically controlled tests have been made to determine perception time and brake reaction time. As might be expected, the results vary according to vehicle speed, age and natural aptitude of the driver, and the conditions accom- panying the test. Brake reaction time is assumed to be 1 second, this having been found to be the value sufficient for SIGHT DISTANCE 189 most drivers; perception time is selected as slightly greater than that required by most drivers, and is assumed to be 1.5 seconds (AASHO Policy). For a speed of V miles per hour and perception plus brake reaction time of t seconds, the total reaction distance in feet is D, 1.47 V t (8–1) (The conversion factor 1.47 may be recalled more readily by means of the exact relation: 60 mph=88 ft per sec.) Braking distance may be determined from fundamental principles of mechanics. The force causing a vehicle to stop after application of the brakes equals mass times decelera- tion, or W F=Ma= a g v2 If the coefficient of friction ƒ is assumed to be uniform during deceleration, F =W ƒ; hence, a =ƒ g. Since the distance trav- ersed in decelerating from a velocity v to rest is the brak- 2 a' v2 ing distance is When g is taken as 32.2 ft per sec², and 2 fg the speed is converted to V in miles per hour, the braking dis- tance in feet reduces to Do= = V2 30f (8-2) Actually the coefficient of friction is not constant during deceleration, but assuming it to be constant introduces no error so long as the proper equivalent uniform value is assumed. to fit the speed in effect at the beginning of the operation. The coefficients of friction used in the AASHO Policy apply to normal clean wet pavements that are free of mud, snow, or ice. In Table 8-1, values from 30 to 70 mph, inclusive, are from the AASHO Policy; others are obtained by extrapolation. The speed for wet conditions is taken to be slightly less than the design speed so that the greater proportion of traffic, traveling at yet lower speeds, will enjoy an additional safety factor. If the full design speed were used along with the coefficients of friction for dry pavements (almost double the tabulated values), the required stopping sight distances would : 190 CURVE PROBLEMS IN HIGHWAY DESIGN be somewhat less than those for the assumed wet conditions. Therefore, the critical design values are those in Table 8–1. TABLE 8-1 MINIMUM STOPPING SIGHT DISTANCE-WET PAVEMENTS Design Speed mph 888888 30 40 50 60 70 80 90 100 Assumed Speed for Condi- tion mph V 28 36 44 52 59 67 75 888 82 Perception plus Reaction Time sec t 2.5 2.5 2.5 2.5 2.5 2.5 2.5 2.5 Dist. ft Dr 103 132 161 191 216 245 275 300 Coef- ficient of Friction f Braking Dis- tance on Level V2 Do= 30 (f±G) ft Do Stopping Sight Distance Com- puted ft Dr+ Do 176 263 369 492 616 780 945 Rounded for Design ft 0.36 73 0.33 131 0.31 208 0.30 301 0.29 400 0.28 535 0.28 670 0.27 830 1,130 1,150 200 275 350 475 600 775 950 Theoretically, stopping distances are affected slightly by grades. If G is the per cent grade divided by 100, the formula for braking distance becomes (8–3) In practice the sight distance is usually longer on down- grades than on upgrades, a fact that automatically compen- sates for the greater braking distances on downgrades required by formula 8-3. Exceptions would be one-way lanes on divided highways having independent profiles for the two roadways. 8-5. Passing Sight Distance.—In the AASHO Policy the minimum passing sight distance for two-lane highways is the SIGHT DISTANCE 191 sum of the following four distances which are shown in Fig. 8-1: d₁=distance traversed during the preliminary delay period (the distance traveled during perception and reaction time and during the initial acceleration to the point of encroachment on the left lane). d₂ = distance traveled while the passing vehicle occupies any part of the left lane. d3=distance between the passing vehicle at the end of its maneuver and the opposing vehicle. d4= distance traversed by an opposing vehicle for two-thirds of the time the passing vehicle occupies the left lane, or 3d2. The preliminary delay period d is a complex one. For purposes of analysis it may be broken into two components: (1) time for perception and reaction, and (2) an interval dur- ing which the driver accelerates his vehicle from the trailing speed V-m to the passing speed V at the point of encroach- ment on the left lane. The distance traversed is expressed as (8-4) The distance traveled while the passing vehicle occupies the left lane is d2 = 1.47 Vt2 (8-5) Reference to Fig. 8-1 shows that during the first part of the passing maneuver the driver can still return to the right lane if he sees an opposing vehicle. From experience, this "uncommitted" distance is about d₂. Since the opposing and passing vehicles are assumed to be traveling at the same speed, d4=3d2. d₁ = 1.47 t₂ (V−m+ at m+ali) Basic data used in establishing the design curves in Fig. 8-1 are summarized in Table 8-2. The values of a, t₁, ta, da, and average passing speed come from a report on extensive field observations of driver behavior during passing maneuvers. The average value of m is taken as 10 mph. 192 CURVE PROBLEMS IN HIGHWAY DESIGN Elements of Passing Sight Distance-Feet d d₁ 2,500 2,000 1,500 1,000 500 /d2 30 Passing Vehicle A 30 3d2 d2 40 FIRST PHASE SECOND PHASE d3 Opposing vehicle appears when passing vehicle reaches point A Design Speed-mph 50 d2 Total di+d₂+da+ds d4 d4 di d3 60. 40 50 Average Speed of Passing Vehicle-mph Fig. 8-1. Passing sight distance (2-lane highways) B 70 60 HORIZONTAL ALIGNMENT 193 TABLE 8-2 ELEMENTS OF SAFE PASSING SIGHT DISTANCE- 2-LANE HIGHWAYS Speed group, mph Average passing speed, V, mph Preliminary delay: a = avg. acceleration, mph per second t₁ = time, seconds d₁=distance traveled, feet Occupation of left lane: t₂ = time, seconds d₂-distance traveled, feet Clearance length: d3=distance traveled, feet Opposing vehicle: d4-distance traveled, feet Total distance, d₁+d₂+dз+ds, feet 30-40 34.9 1.40 3.6 145 9.3 475 100 315 40-50 43.8 1.43 4.0 215 HORIZONTAL ALIGNMENT 10.0 640 180 425 1,035 1,460 50-60 52.6 1.47 4.3 290 10.7 825 250 550 1,915 Table 8-3 contains a summary of passing sight distances determined from the foregoing analysis. Also included are values tentatively suggested in the AASHO Policy for the case of 3-lane highways. However, these values are not based on actual field observations and cannot be considered so reliable as those for 2-lane highways. The 3-lane values come from computation by omitting the distance d4. 8-6. Superelevation Theory.-Fig. 8-2 shows the forces W (weight of vehicle) and F (centrifugal force) acting through the center of gravity c of a vehicle traveling at a speed v around a curve of radius R, when the pavement is super- elevated at an angle with the horizontal (0=tan¯¹ e). 194 CURVE PROBLEMS IN HIGHWAY DESIGN TABLE 8-3 MINIMUM PASSING SIGHT DISTANCE Design speed, mph Passing speed, V, mph Minimum passing sight distance, feet: Fig. 8-1 Rounded e Calculated Rounded unity (3) مرحوم (1) 33333 30 30 810 800 40 40 50 48 2-Lane Highways 1,265 1,265 1,675 2,040 2,310 1,300 1,700 2,000 2,300 3-Lane Highways W Wp Wn (2) Possible directions of resultant 1,190 1,450 1,650 1,200 1,400 1,600 FP Ө ↓ 60 55 F= Wv2 GR Fn Fig. 8-2. Superelevation theory 70 60 R In order to simplify the analysis, the two forces are resolved into their components normal and parallel to the pavement. The resultant of the forces must take one of three possible general directions: HORIZONTAL ALIGNMENT 195 (1) When W₂=Fp, the resultant is perpendicular to the pavement and no centrifugal sensation is felt by the occupants of the vehicle. The speed which produces this effect is called "equilibrium speed." (2) When Wp>Fp, the resultant is inclined to the pavement down the slope. Consequently, there is a tendency for the vehicle to slide inward, and this tendency is resisted by a lateral force acting up the slope at the contact between the wheels and the road surface. Obviously, there is also a clockwise overturning moment causing the vehicle to tilt inward. (3) When W₂Fp (or V is less than equilibrium speed), e-f= e e+f= When W₂Equilibrium speęd Side friction and superelevation assist each other in counter- balancing centrifugal force. Fig. 8-3 (b)—Adverse crown Only one possible case regardless of speed. Side friction alone holds car on road. V2 15 R < f + → (Formula 8-7) V2 15 R e V2 15 R Compressing (Formula 8-10) f e (Formula 8-11) e + f → = e + V2 15 R The term ƒ has been called the "lateral ratio" in research done by Leeming in Great Britain, and this appears to be the most logical expression. In the United States, f has been termed "unbalanced centrifugal ratio," "cornering ratio” (at General Motors Proving Ground), "unbalanced side friction," and "side friction factor." Because of the widespread use of the last expression, it will be adopted in this book—with the warn- ing that it should not be confused with the "coefficient of friction" as understood in dynamics. 8-7. Dynamics of Vehicle Operation on Curves.-On a curve having accurately built constant superelevation, there is a particular speed, known as the equilibrium speed or “hands- off" speed, at which a car steers itself around the curve. this speed WFp, and the value of ƒ is zero. At 198 CURVE PROBLEMS IN HIGHWAY DESIGN At other than equilibrium speed, equations 8-10 and 8-11 seem to indicate that safe operation around a given curve is entirely within the control of the driver. He has only to adopt any desired speed and rely upon the automatic develop- ment of whatever value of ƒ is needed to make up for the lack of V2 balance between e and However, the matter is not so 15 R simple as this. On the contrary, it is very complex; and further research is required before curve design for high-speed operation can be placed upon a sound scientific basis. When WpFp, the car tends to creep out of the traffic lane. To offset this tendency the driver must exert force at the steering wheel and must steer slightly toward or away from the center of curvature, the direction depending on whether V is greater or less than equilibrium speed. As a result, each pair of tires must "slip" across the surface at a definite angle between the path of travel and the longitudinal axis of the wheels. Fig. 8-4 illustrates the normal condition when V exceeds the equilibrium speed. Front Slip Angle ·Steering Angle ===| Path of front of car 3. Path of rear of car Rear Slip Angle Fig. 8-4. Understeering action Front and rear slip angles are rarely equal. When the front slip angle is greater than the rear slip angle, the car is said to be "understeering," as in Fig. 8-4; when the reverse is true, the car is "oversteering." Whether a car understeers or oversteers depends principally on its design and partly on factors within the control of the operator. For example, HORIZONTAL ALIGN MENT 199 research at the General Motors Proving Ground shows that it is possible to make a car either highly oversteering or highly understeering by merely varying front and rear tire pressures within certain limits. car. The understeering car is somewhat more stable and sus- ceptible to control than the oversteering type. Perhaps this is true because an increase in speed on a curve requires an increase in the steering angle of the understeering car (an operation that is instinctively natural), whereas a decrease in the steering angle is necessary in the case of the oversteering Above a certain critical speed the front wheels of the understeering car start to slide off the road, but by careful braking the driver can generally regain control and return to a fairly fixed course at a speed below the critical value. It is more difficult to hold an oversteering car on a fixed path even at moderate speeds. Above a certain critical speed the rear end of the car starts to slide off the road, and any slight application of brakes is apt to put the car into a spin. At the same time at which a car develops certain slip angles in rounding a curve, there is some tilt or "body roll." The roll angle is a linear function of f, at least up to the limits of ƒ considered safe. Roll angles are not large. Tests show that, when f=0.20, body-roll angles vary between 1.8° and 3.5°, the value depending on the make and model year of the car. Though body roll has less effect upon a car's general "road- ability" than do the slip angles, it is a factor that must be allowed for in the accurate use of the ball bank indicator (see Art. 8-8). Valuable research on the relation of slip angles, steering angles, and body roll to safe speed on curves has been pub- lished by Fox (low-speed tests) and by Stonex and Noble (high-speed tests on the Pennsylvania Turnpike). The facts brought out show why all cars do not handle alike on the same curves. Information is also available on the special problems involved in test-track design.24 8-8. Side Friction Factors.-The value of ƒ at which side skidding is imminent depends principally upon the speed of the vehicle, the condition of the tires, and the characteristics of the roadway surface. Moyer's work indicated maximum 200 CURVE PROBLEMS IN HIGHWAY DESIGN values of ƒ of about 0.50 at relatively low speeds, with a reduction to approximately 0.35 at high speeds. The tests at very high speed on the Pennsylvania Turnpike (speeds up to 105 mph) showed maximum values as low as 0.30, even though the cars were driven by skilled test drivers. An important problem in curve design-especially on curves to be marked with safe-speed signs—is to determine the percentage of the maximum side friction that can be utilized safely by the average driver. The resulting values of ƒ used in design should give posted speeds that have an ample margin of safety even when the pavement is wet. Furthermore, when the posted speed is exceeded, the added unbalanced centrifugal force should be enough to produce an uncomfortable sensation and an instinctive reduction in speed. The simplest device yet developed for determining maxi- mum safe speeds and their relation to side friction factors is the ball bank indicator, apparently first used by the Missouri State Highway Department in 1937. It consists of a sealed curved glass tube containing liquid and a steel ball slightly smaller than the bore of the tube. When the indicator is mounted on the dash by means of rubber suction cups, the ball is free to roll transversely under the influence of the forces acting upon it. The liquid produces enough damping effect to hold the ball fairly steady, even when the car is driven around a curve at high speed on a slightly rough surface. Readings are taken on a scale graduated in degrees with the 0° mark at the center of the tube. Where the ball bank indicator is to be used, it is first mounted on the dash with the ball at the 0° reading when the car is in a stationary level position. Obviously, all observers who are to be in the car during the test run must be in their assigned positions when the indicator is set in place. The indicator is used for two purposes: (1) to determine the ball bank angle and side friction factor at the maximum comfortable speed on a particular curve, and (2) to determine the speed on a curve required to produce a specified ball bank angle. In the first use, the body roll p of the test car is determined by stopping the car on the curve and reading the ball bank HORIZONTAL ALIGNMENT 201 angle B. When the car is stationary, p=ß-0, as shown in Fig. 8-5. (Obviously the superelevation @ must be measured.) Then trial runs are made around the curve at various constant speeds until that speed is reached which first produces an uncomfortable centrifugal sensation. Simultaneous readings of speed and ball bank angle are then made, and the averages are taken. Thus, one of the desired values, B, is measured by direct observation. Axis kp 0=tan'e of car -Ł Fig. 8-5. Ball bank indicator-car stopped Ball bank -indicator To find the desired side friction factor f, the following analysis, based on Fig. 8-6, is made: 22 9 R When a car rounds a superelevated curve at equilibrium speed, the resultant of the forces is perpendicular to the pave- ment surface; there is no body roll and the ball bank indicator reads 0°. At a speed greater than equilibrium speed, side friction comes into play, acting inward. Were it not for the body roll, the ball bank angle would be practically a direct function of this side friction. However, the outward body roll tilts the car toward the horizontal, thereby increasing the reading of the ball bank indicator. The condition is shown in Fig. 8-6, from which B-p=tan-1 Ꮎ (8-12) 202 CURVE PROBLEMS IN HIGHWAY DESIGN But equation 8-9 shows that v2 g R tan-¹f=tan-1 or Ball bank indicator Centrifugal force f= e=tan 'e H HP р | кон кв- ト ​-1 tan-¹ƒ=tan-¹ CAR اماد v2 9 R g ik AXIS e v2 g R -e) Fig. 8-6. Ball bank indicator when V > equilibrium speed tan' y² GR Yook Because of the small angles involved, it is sufficiently accurate to assume that 22 g R -tan-¹ e=tan-1 Substituting from equation 8-12 gives tan-¹ƒ=ẞ-p (8-13) Approx. The work may be checked by assuming that p is zero and solving equation 8-12 for ß, thus obtaining the theoretical ball HORIZONTAL ALIGNMENT 203 bank angle on the assumption of zero body roll. The difference between the calculated and observed ball bank angles is the body roll, which should agree with the value measured while For any the car is stationary on the superelevated curve. one test car there should be a linear relation between the values p and f. This first use of the ball bank indicator represents its application in research. After the ball bank angle correspond- ing to the maximum safe speed has been determined, the second use of the indicator is in connection with establishing posted speeds on curves. In this application it is not neces- sary to measure the radius or the superelevation. The speed of the test car is gradually increased until the specified ball bank angle is reached, and this maximum speed is recorded. The practical value of the ball bank indicator rests in its simplicity and in the fact that there is a surprisingly close agreement among the various States using it in regard to the numerical value, 10°, most widely adopted to indicate maximum safe speed. A canvass made by Moyer and Berry⁹ showed that, after curves were first marked with safe-speed indications in Missouri in 1937, the plan was quickly adopted in 25 States and the ball bank indicator was the device most commonly used for determining posted speeds. As a result of this study, which also included an analysis of driver reaction to posted speeds, the authors arrived at the following conclu- sions: To obtain the driver's respect for the speed on the sign over a wide range of speed, the following ball bank angles are recommended: 14° for speeds below 20 mph, 12° for speeds of 25 and 30 mph, and 10° for speeds of 35 mph and higher. For speeds up to 50 or even 60 mph, a ball bank angle of 10° has been found to be quite satisfactory but for speeds above 60 mph a lower value should be used. If the foregoing recommendations are converted into side friction factors by means of equation 8-13 (in which average values of body roll reported by the General Motors Proving Ground are used), the resulting values of ƒ range from about 0.21 at 20 mph to 0.14 at 50 mph. In earlier tests reported by Barnett¹º a safe side friction factor of 0.16 had been recommended for speeds up to 60 mph, 204 CURVE PROBLEMS IN HIGHWAY DESIGN with a reduction of 0.01 in ƒ for each 5 mph increase in speed above 60 mph. However, of the 900 tests involved in this research only a few were made at speeds of 60 or more mph. f=Side Friction Factor 0.22 0.20 0.18 0.16 0.14 0.12 0.10 0.08L 10 H.R.B. 1940 -Moyer & Berry 20 Arizona Meyer 1949 30 Assumed for Curve Design' H.R.B. 1936 Barnett H.R.B. 1940 Moyer & Berry 40 50 Speed-mph Fig. 8-7 Meyer 1949 60 Arizona H.R.B. 1940 Stonex & Noble 70 80 As a result of the high-speed tests on the Pennsylvania Turnpike, Stonex and Noble' concluded: "f=0.10 is the maximum that should be utilized in curve design on public highways at speeds of 70 mph and higher." The slight inconsistencies in the recommended values of f noted in the preceding paragraphs merely reflect the dif- HORIZONTAL ALIGNMENT 205 ferences in judgment as to what constitutes incipient insta- bility or uncomfortable centrifugal sensation. Further research and a more scientific means of measuring discomfort should narrow the range of disagreement. For reasons to be explained in Art. 8-9, it is not practicable to use sufficient superelevation to counteract centrifugal force completely, except possibly on sharp curves designed for low- speed operation. On flat curves on which vehicles are operated at high speeds, drivers place more reliance upon side friction than upon superelevation. It is therefore logical to design with a greater margin of safety at high speeds, owing to the greater difficulty in steering a true course and to the longer stopping distance required in case of an emergency. The practice may be stated differently as follows: A smaller percentage of the available side friction should be used at high speeds than at low values. Design Speed V mph 22243 20 25 30 35 40 45 50 55 60 65 70 80 90 100 RECOMMENDED VALUES FOR USE IN DESIGN Side Friction Factor f TABLE 8-4 0.17 0.165 0.16 0.155 0.15 0.145 0.14 0.135 0.13 0.125 0.12 0.11 0.10 0.09 tan-¹ƒ or (B-p)° 9.6 9.4 9.1 8.8 8.5 8.3 8.0 7.7 7.4 7.1 6.8 6.3 5.7 5.2 Body Roll Angle 3.0 2.7 2.5 2.4 2.2 2.1 2.0 1.9 1.8 1.7 1.6 1.5 1.4 1.3 Ball Bank Angle B° 12.6 12.1 11.6 11.2 10.7 10.4 10.0 9.6 9.2 8.8 8.4 7.8 7.1 6.5 206 CURVE PROBLEMS IN HIGHWAY DESIGN In view of the maximum values of ƒ noted in the first paragraph of this article, it will be observed that the values of ƒ summarized in Fig. 8-7 (from A ASHO Policy) embody this principle of a greater safety factor at high speeds. The straight-line relation assumed for curve design represents a reasonable compromise based on the safe values recommended by various investigators; it was purposely kept lower at the low design speeds in order to compensate for the tendency of drivers to overdrive on highways with low design speeds. Table 8-4 gives recommended side friction factors cor- responding to the straight-line relation in Fig. 8-7. The ball bank angles were found by calculation, average body roll angles reported by General Motors Proving Ground being used. The final ball bank angles are accurate enough for determining posted speeds on curves, even though test-car roll angles differ somewhat from those listed. In the range of speeds-45 to 55 mph-within which the safe-speed signs are most frequently used, the recommended side friction factors give ball bank angles very close to the value 10° used by most States. 8-9. Maximum Superelevation Rates.-Because of the presence of both slow-moving and fast traffic, and the varia- tions in weather conditions over the seasons, it is impossible to design a highway so that the superelevation is ideal for all traffic at all times. Safety is the paramount consideration. This requires a fairly low superelevation rate, with the result that road speeds are usually greater than the equilibrium speed. When the speed is less than the equilibrium value, the resultant (Fig. 8-2) acts inward and the driver must steer slightly away from the center of curvature in order to maintain a true course in the traffic lane. The effect is somewhat like the action of an oversteering car. Since steering outward on a curve is not a natural operation, there is a tendency for slow-moving vehicles to "edge in" toward the shoulder or toward the inner traffic lane. Moreover, if the side friction factor is greater than about 0.05 when the road is icy, vehicles may slide inward despite the driver's efforts to steer a true course. On the other hand, if the superelevation rate is too HORIZONTAL ALIGNMENT 207 e = Superelevation in Feet per Foot low, design speeds on curves are limited by the safe side fric- tion factors to values less than considered practicable in modern design. Therefore, a compromise between these con- flicting requirements is necessary. 0.13 0.12 0.11 0.10 0.09 0.08 0.07 0.06 0.05 0.04 0.03 0.02 0.01 Michigan 1 2 Washington-max 3 Washington and Idaho California Arkansas Colorado 4 5 6 D= Degree of Curve Fig. 8-8 7 Washington-normal J Idaho 1-4 Michigan 8 9 10 There is fairly general agreement that a superelevation rate of 0.10 (approximately 14 inches per foot) is about the maxi- mum that should be used in regions where snow and ice are encountered. Where exceptionally adverse winter conditions are likely to prevail for several months, a maximum super- 208 CURVE PROBLEMS IN HIGHWAY DESIGN. elevation rate of 0.07 or 0.08 is recommended. A maximum as high as 0.13 is used in localities free from snow or ice. Fig. 8-8 shows superelevation practice in several States when it was customary to ignore design speed. This was the traditional method. Since publication of the AASHO Policy an increasing number of States vary superelevation with design speed. In general the same maximum superelevation TABLE 8-5 MAXIMUM CURVATURE Design Speed V, mph 30 40 50 60 70 30 40 50 60 70 30 40 50 60 70 30 40 50 60 70 Maximum Maximum Total е ƒ e+f 88888 888 88 89 9 .06 .06 .06 .06 .06 .08 .08 .08 .08 .10 .10 .10 .10 .10 .12 .12 .12 .12 .16 .15 .14 .13 .12 .16 .15 .14 .13 .12 .16 .15 .14 .13 .12 .16 .15 .14 .13 .12 2229* ***** ***** *222 2 .21 .20 .19 .18 .24 .23 .25 .22 .28 .25 .24 Minimum Maximum D Ꭱ Ft Deg 273 508 833 1,263 1,815 250 464 758 1,143 1,633 231 427 694 1,043 1,485 214 395 641 960 1,361 21.0 11.3 6.9 4.5 3.2 22.9 12.4 7.6 5.0 3.5 24.8 13.4 8.3 5.5 3.9 26.7 14.5 8.9 6.0 4.2 HORIZONTAL ALIGNMENT 209 is used at all speeds, but at the higher design speeds the maximum is reached on flatter curves. e+f=Rate of Superelevation Plus Side Friction Factor In the A ASHO Policy it is “concluded that (a) several rates rather than a single rate of maximum superelevation should be 0.32 0.28 0.24 0.20 0.16 0.12 0.08 0.04 of 8886 8ង្គ៩ ៖ BO 000 V = 70 4 V = 60 V = 50 8 R = Radius in Feet V = 40 -400 Safe Maximum D When e=0.12. e = 0.10 e = 0.08 e = 0.06 V = Design Speed = 30 mph 300 12 16 D = Degree of Curve Fig. 8-9 Formula 8-11 v2 15R e+f= -250 or D₂=85,700 (e+f) 20 24 28 recognized in establishing design controls for highway curves, (b) a rate of 0.12 should not be exceeded, and (c) at the other extreme a rate of 0.06 is applicable for urban design. Con- sistent with current practice, values for the 0.10 rate are referred to as generally desirable or nationally representative." 210 CURVE PROBLEMS IN HIGHWAY DESIGN 10 Fig. 8-10. Design superelevation rates D = Degree of Curve 15 20 25 0.01 0.02 e = Superelevation Rate 00888 8880 = 30 0.08 0.09 V = 70 V = 60 V = 50 V = 40 3.86° 5.49° 8.25° 13.43° 24.83° 0.10 -5,000 3,000 -2,000 1,500 -1,000 -900 800 -700 -600 500 -400 -300 212 R = Radius of Curve-Feet HORIZONTAL ALIGNMENT 211 8-10. Maximum Degree of Curve.-The use of any recom- mended maximum rate of superelevation in combination with a particular design speed results in a maximum degree (or minimum radius) of curve. If sharper curvature were used with the stated design speed, either the superelevation rate or the side friction factor would have to be increased beyond recommended safe limits. Thus, this maximum degree of curve is a significant value in alignment design. Table 8-5 (from AASHO Policy) lists limiting values of curvature for four maximum rates of superelevation. The final values are consistent with formula 8-11 in which are sub- stituted the safe side friction factors from Table 8-4. The relationships given by formula 8-11 are shown graphi- cally in Fig. 8–9 (from AASHO Policy) by the straight lines for each design speed. Superimposed on the graph are the values of maximum curvature, as taken from Table 8-5. 8-11. Superelevation Rate Over Range of Curvature.-It is not necessary to superelevate very flat curves; the normal crown is carried around the curve unchanged. (This matter is treated in Art. 8-12.) However, it is not logical to change abruptly from zero superelevation on a very flat curve to maximum superelevation at some arbitrary value of D or R. There should be a transition range of curvature within which maximum superelevation increases in a rational manner from zero to the full value permitted by climatic conditions. Fig. 8-8 indicates how some States have handled this matter. As a result of careful analysis of the dynamic factors involved in four different methods of approach to this problem, "it was concluded (AASHO Policy) that a parabolic form, with the horizontal distance governing, represents a practical distribution [of superelevation] over the range of curvature." This is the type of relationship that was proposed in the first edition of this textbook as "a rational suggestion for general design." 8-12. Superelevation Rates for Design. Fig. 8-10 (AÁSHO Policy) shows recommended design superelevation rates for the case where the maximum rate of superelevation equals 0.10. The maximum values of curvature at e=0.10 correspond to those in Table 8-5. On curves flatter than the 212 CURVE PROBLEMS IN HIGHWAY DESIGN maximum, the superelevation rates lie on parabolic curves of the form recommended in Art. 8-11. In practice similar design curves could be constructed for other maximum super- elevation rates, such as those given in Table 8-5. On two-lane highways, if the pavement cross-section normally used on tangents is carried around a horizontal curve unchanged, traffic entering a curve to the right has the benefit of some favorable superelevation from the crowned pavement. On the other hand, traffic entering a curve to the left meets an adverse crown, as in Fig. 8-3 (b). This leads to a considera- tion of the maximum curvature for which the normal crowned cross-section is suitable. As a general rule, it is recommended that the minimum rate of superelevation on any curve (except at a reverse transition) should be about 0.012 and that the particular value should correspond to the average rate of cross slope used on tangents. With an average adverse cross slope of 0.012, the correspond- ing degree of curve (rounded) for each design speed in Fig. 8-10 is shown in the third column of Table 8-6 (from AASHO Policy). It should be observed that the resulting side friction required to counteract both adverse superelevation and cen- trifugal force is very small. Obviously, if the curves were made sharper, the required side friction factors would increase, Design Speed V, mph MAXIMUM CURVATURE FOR NORMAL CROWN SECTION 30 40 50 60 70 Average Running Maximum Speed D mph AAA ON 27 34 TABLE 8-6 40 45 49 1°30' 0°45' 0°30' 0°20' 0°15' Minimum R ft 3,800 7,600 11,450 17,200 22,900 Resulting Side Friction Factor f When Adverse Crown e=0.012 At Design At Running Speed Speed .028 .026 .027 .026 .027 .025 .023 .022 .020 .019 HORIZONTAL ALIGNMENT 213 and a point would be reached where a favorable slope across the entire pavement would be desirable. In the AASHO Policy it is recommended that a plane slope across the pavement should be used wherever a curve is sharp enough to require a superelevation rate in excess of about 0.02. This practical limit corresponds to degrees of curve ranging from 2°30′ at 30 mph to 0°45′ at 70 mph. For curves between these values and those in Table 8-6 a compromise could be made, in the interest of construction economy, by rotating the normal crown slightly toward the inside of the curve. How- ever, a change to a plane slope across both lanes would be pre- ferable, at least at the higher design speeds. Table 8-7 shows the resulting design superelevation rates for the case in which e=0.10; it is the tabular form of Fig. 8-10. Similar tables for three other values of maximum e are found in the AASHO Policy. The basis for selecting the tabulated runoff or spiral lengths is discussed in Arts. 8-13 and 8-15. 8-13. Length of Spiral.-The purposes served by an ease- ment curve and the reasons for choosing the spiral as the ease- ment were stated succinctly in Art. 5–1. Safe operation at high speeds requires that curves be designed to fit natural driver-vehicle behavior. It is obviously impossible, when traveling at any appreciable speed, to change instantaneously from a straight to a circular path at the T.C. of an unspiraled curve. On such alignment the driver makes his own transition as a matter of necessity, usually by starting to steer toward the curve in advance of the T.C. In so doing, there is bound to be some deviation from the traffic lane. If the curve is sharp or if the speed is high, the deviation may result in dangerous encroachment on the shoulder or on the adjacent traffic lane (see Fig. 8–11). Though the operational and aesthetic advantages of spirals are generally recognized, their adoption in the United States (since about 1925) has been very gradual; as of 1962 more than one-half of the State highway departments used them. Among the reasons for this are the cumbersome, highly-mathematical treatments often presented, which result in the belief that tedious computations and awkward field work are inherent in the use of the spiral; the mistaken belief that a spiral of 214 CURVE PROBLEMS IN HIGHWAY DESIGN D 0° 15' 22918' 0° 30' 0°.45' 1° 00' 11459' 7639' 5730' 1° 30' 2° 00' 2° 30′ 3° 00' 3° 30' 4° 00' 5° 00' 6° 00' 7° 00' 8° 00' 9° 00' 10° 00' 11° 00' 12° 00' 13° 00′ 14° 00' 16° 00' 18° 00' 20° 00' 22° 00' R 24° 00' 24.8° 3820' RC 2865' RC Q 2292' .020 1910' .024 819' 716′ NC NC NC NC 1637' .027 1432'❘ .030 1146' .038 955' | .044 637' 573' 239' 231' .050 .055 .061 .065 521' .070 477' .074 441' .078 409' 358' .087 318' .093 286' .096 260' .099 V = 30 L .100 .100 2-lane OOOO 0 0 100 100 100 100 100 100 100 100 100 100 130 130 140 .082 150 110 120 160 170 170 180 4-lane Oooo Ο 100 100 100 100 140 150 100 .045 100 .050 100 .060 120 .068 190 200 210 220 240 250 260 270 e 180 180 D max = 24.8° 160 .089 180 .093 270 270 .020 .027 .033 .038 NC 0 NC 0 RC 125 RC 125 V = 40 .096 .098 .099 2-lane 4-lane 125 125 125 125 .076 160 .084 180 125 125 130 140 190 200 L 200 210 210 .100 210 D max e max = 0.10 V 0 0 125 125 125 125 125 125 140 160 190 210 240 260 280 290 300 310 310 320 13.4° NC RC RC .018 0 150 150 150 2-lane 4-lane .027 150 .036 150 .045 150 .054 150 .063 150 .070 170 .083 200 .093 220 50 .097 230 .100 240 .100 240 D max L 0 150 150 150 150 150 160 190 230 250 300 330 350 360 360 8.3° е NC RC :018 .022 .034 .046 .059 .070 V = 60 L .081 .090 .099 .100 2-lane 4-lane 0 175 175 175 175 175 175 190 0 175 175 175 175 190 240 280 220 240 270 270 D max = 5.5° 330 360 400 400 е RC RC .020 .028 .042 .055 .069 .083 V = 70 .096 .100 2-lane 4-lane 200 200 200 200 200 200 L 210 250 200 200 200 200 200 250 290 300 D max =3.9° - 310 370 .430 450 NOTES. NC=normal crown section. RC remove adverse crown, superelevate at normal crown slope. Spirals desirable but not as essential above heavy line. Lengths rounded in multiples of 25 or 50 feet permit simpler calculations. TABLE 8-7.-DESIGN VALUES FOR RATE OF ELEVATION (e) AND MINIMUM LENGTH OF RUNOFF OR SPIRAL CURVE (I IN FEET) HORIZONTAL ALIGNMENT 215 particular length is required for each different value of curve radius or of design speed; and inertia-a reluctance to change existing rule-of-thumb practices. Ineffective pavement −1 . Konkrete T.C. BAR Fig. 8-11. Vehicle paths on unspiraled curve It is hoped that the simple presentation of the basic geo- metry of the spiral in Chapter 5, in which easily remembered analogies to the corresponding parts of a circular curve are emphasized, will assist in dispelling the bugaboo of mathe- matical complexity. Moreover, the various spiral tables in Part III are so complete and so readily adapted to basing the circular arc either upon the radius or upon the chord or the arc definition of degree of curve that the required trigo- nometry and field work are no more complicated for the calculation and staking of a spiral-curve layout than for an unspiraled curve. (As a matter of interest, it is the author's practice to require that students be able to compute and stake an acceptable spiral without referring to tables of any kind. The method-given in Art. 5-13-is based upon a sketch showing the basic geometry of the spiral, from which all needed approximate relations may be derived by inspection; slide-rule calculation is adequate.) The belief that the proper length of spiral is closely cal- culable adds to the impression of mathematical complexity This belief is probably based upon early research done by Shortt" in the field of railroad practice. Later, the Shortt formula was applied to highways by Royal-Dawson¹ and others, although the physical conditions differed in some important respects. Until recently, no proof of the correct- 216 CURVE PROBLEMS IN HIGHWAY DESIGN ness of this transfer existed, although observation of highway driving practices led many engineers to doubt its validity. Fortunately, certain fallacies have been disclosed by recent research, the outcome of which promises to be a simpler method of selecting spirals. It is significant that Shortt's research was on unsuper- elevated transition curves on railway track. Briefly, the result of his work seemed to indicate that the length of transition for comfortable operation was a definitely calculable variable. The reasoning was as follows: At constant speed, the length of time required to traverse an easement curve of length L, is Ls seconds. On the curve, the acceleration toward the center ย v2 is ft per sec². Consequently, the average (assumed con- R ft per stant) rate of change in centripetal acceleration is 23 R LS sec.³ Shortt denoted this constant rate by C. Converting v to V in miles per hour and solving for L. gives the basic Shortt formula, which is 8 Ls = Ls 3.15 V3 Ꭱ Ꮯ Shortt concluded from these experiments on unsuperelevated railroad track that a value for C of 1 ft per sec³ was the maxi- mum that would go unnoticed. In transplanting the Shortt formula to highway practice, it has been customary to overlook the possible effect of super- elevation and also to use a larger value of C. Tentative sug- gestions that 2 might be a suitable value of C for highways led to the following version of the Shortt formula: *** (8-14) 1.58 V³ Ꭱ - (8-15) Unfortunately, equation 8-15 has sometimes been used quite literally, as though to deviate from it would represent a departure from correct spiral theory as applied to highways. Arbitrary use of this equation involves two fallacies. One is neglect of the superelevation. Actually, the presence of superelevation cancels out part or all of the centrifugal force (as far as its effect upon comfort is concerned), thereby invalidating any mathematical relation that is based upon HORIZONTAL ALIGNMENT 217 unsuperelevated curves. Review of the geometry of the spiral shows that it is a curve of uniformly increasing degree. If superelevation on a curve were increased uniformly, it follows from basic superelevation theory (Art. 8-6) that the side fric- tion factor ƒ would be zero when traversing the spiral at the so-called equilibrium speed for the circular arc. In other words, it would be theoretically possible for a car to steer itself on a true course around the complete spiral-curve layout with- out the driver touching the wheel. It may be shown that the correct form of the Shortt formula for superelevated curves is 1/v3 L. ===√( CR cos 0-v g sin sin e L₂ = 3.15 V (V²-15 e) Ls с R Since the values of used in practice are small, it is close enough to assume that cos 0=1 and that sin 0=tan 0=e. When these substitutions are made and v is converted to V in miles per hour, equation 8-16 becomes¹³ Ls (8-16) (8-17) When e=0, formula 8-17 reduces to the Shortt formula for unsuperelevated curves; for this reason it has been called² the "modified Shortt formula.” 47. V f с In practice the speed on the circular arc is usually greater than the equilibrium value, resulting in a uniform value of ƒ that must fit equation 8-11. Both comfort and safety at high speed make it desirable to approach ƒ at a uniform rate along some form of easement curve. The spiral, when banked at a uniformly increasing rate, produces this condition. A simpler form of equation 8-17 for the case in which V is greater than the equilibrium value is found by substituting 15(e+f) for V2 R The result is (8-18) A relation of this basic form was given by Haile,14 though he recommended that it should not be used because of the short spiral lengths produced when ƒ is small. There is no 218 CURVE PROBLEMS IN HIGHWAY DESIGN need to discard the theoretically correct relation represented by equation 8-18 solely for this reason. It is important, however, to consider the rotational effect. Though an extremely short spiral to a superelevated curve will result in no centrifugal sensation (if traversed at equilibrium speed), yet the rotational change about the axis of the car may be too rapid for comfort or safety. Long years of operating experience on spiraled superelevated railroad track have led the American Railway Engineering Association to recommend that minimum spiral lengths be based upon attaining superelevation across standard-gage track at a desirable maximum rate of 1½ inches per second of time. Highway and railroad operation are by no means analogous; but, in the absence of research on the motor- vehicle rotational rate at which discomfort begins, there is logic in tentative adoption of the same rate used successfully on railroads. (Haile¹ and other engineers advocated consid- eration of the rotational effect as early as 1936.) A rise of 1.25 inches per second across the track gage of 4 ft 8 in. is equivalent to about 0.022 ft per ft per sec. Con- sequently, L. = 1.47 V (0.622) " or Ls=67 e V (8-19) The two formulas for minimum desirable spiral length are separately inconsistent for certain conditions. Equation 8-18 gives values which are too short when ƒ is small (4,=0 at equilibrium speed), whereas equation 8-19 gives values which are too short when e is small (L, =0 for unsuperelevated curves). However, by using each formula within its proper range, the resulting minimum spiral lengths will produce neither unsafe values of ƒ nor an uncomfortable rate of angular rotation. 47 V f C The spiral length at which the change from equation 8-18 to 8-19 occurs is found by equating the two values of L. Thus, governs choice of minimum L, when e<0.7 £ HORIZONTAL ALIGNMENT 219 67 e V governs choice of minimum L, when e>0.7 The value of e is found from the relation V2 15 R.-). V2 Da 85,700 Rotational change, rather than side friction and centripetal acceleration, is likely to govern minimum spiral lengths on the f open highway. This is because e will exceed 0.7 wherever C the actual superelevation rate is greater than about 60 per cent of the recommended maximum for the given degree of curve and design speed. -f (or Table 8-8 (from AASHO Policy) shows values of spiral length on the sharpest curves recommended when e=0.10, as determined from the several formulas just described. The variations serve to emphasize that there is no basis for insist- ing on great precision in calculating lengths of spirals for design. TABLE 8-8 CALCULATED LENGTHS OF SPIRAL FOR MAXIMUM CURVATURE Basis e=0.10 The practical value of the rotational-change method of choosing minimum spiral lengths is well-illustrated in the case of the Pennsylvania Turnpike. The spirals on this high- way (Table 8-10) were designed on the basis of a rotational change of about 0.02 ft per ft per second-practically, the value Shortt formula, C=1 Shortt formula, C=2 Modified Shortt formula, C=1 Modified Shortt formula, C=1.35 Meyer, L=67 e V Ls Minimum length of spiral in feet for design speed, mph, of: 30 40 50 60 70 370 470 570 650 730 185 235 285 325 365 230 285 330 370 400 170 210 250 275 295 200 270 335 400 470 220 CURVE PROBLEMS IN HIGHWAY DESIGN 7 used in deriving equation 8-19. The generally favorable operating characteristics of these spirals, as observed on high-speed tests, are undoubtedly due in no small measure to the constant (and comfortable) rate of rotational change experienced on successive curves. Until recently, valid objection to this method of selecting spiral lengths might have been made on the grounds that it does not necessarily produce a constant value of C. The impression that C must be constant on a highway spiral— as it must of necessity be in the case of a spiral on railroad track-is another fallacy which has been disclosed by research. This assumption is equivalent to stating that the driver of a motor vehicle who is free to choose his own path in making the transition from a tangent to a circular curve always turns his wheel (1) at a constant rate on any given transition and (2) at the same rate on all transitions. The careful field tests and statistical analyses made by Leeming and Black, 15 summarized and amplified in Leeming's later report,16 verify the first part of this assumption. (This, in effect, validates the spiral as a curve of suitable shape but does not involve any condition as to its length.) However, the research, made with a recording accelerometer on more than 2,000 curves, shows that C varies between such wide limits that there is no "natural rate of turning" the wheel, such as is represented by C=2 or by any other constant value. Though these investigators found no correlation between C and V nor between C and R, there was a definite tendency for C to increase as the value of ƒ reached on any curve becomes greater. Since the higher values of ƒ were recorded on the sharper curves, this trend is equivalent to stating that a driver turns his wheel faster upon entering a sharp curve than upon entering a flat one. Though contrary to the Shortt formula, this conclusion is in accordance with observation of general driver behavior, and has been verified in tests by Warren¹ and by Welty.18 From Leeming's experiments it appears that safety and comfort depend mainly on the value of f; and that a driver slows down to reduce ƒ, not to reduce C. Relatively large values of C (far in excess of 2 ft per sec³) were frequently recorded as producing an "imperceptible" degree of discom- HORIZONTAL ALIGNMENT 221 fort, as long as the accompanying values of ƒ were moderate (in the neighborhood of the design values suggested in Fig. 8-7). · The length of spiral may also be made equal to the length required for superelevation runoff. Runoff length is deter- mined by the rate at which the pavement cross slope is changed, or rotated, subject to some modification on the basis of appearance as viewed by the driver. Thus, the resulting formula for runoff (and spiral) length would have the same general form as 8-19. This subject is treated in greater detail in Art. 8-15. 8-14. Minimum Curvature for Use of Spirals.-Neither superelevation nor spirals are required on extremely flat curves. It would appear logical to use spirals approaching all curves on which a plane cross slope is used across the entire pavement. In Art. 8-12 the superelevation requiring such design was fixed (AASHO Policy) at the rate e=0.02 or greater. However, at this limiting rate a selected spiral would have such a small o- distance (offset, or throw, at the offset T.C.) that the spiral would have little significance. It could be omitted without hampering the ability of the driver to keep well within the traffic lane; if used, it would serve principally as a graceful method of changing from the normal crown to the super- elevated cross-section. In view of the fact that minimum curvature for use of spirals TABLE 8-9 MINIMUM DEGREE OF CURVE FOR USE OF SPIRALS Design Speed mph 30 40 50 60 70 Minimum Curvature 3°30' 2°15' 1°45' 1°15' 1°15' Assumed Mini- mum Length of Spiral ft 100 125 150 175 200 Calculated o-Distance ft .25 .26 .29 .26 .36 222 CURVE PROBLEMS IN HIGHWAY DESIGN must be set arbitrarily, the control values selected in the AASHO Policy were taken as rounded values obtained from Fig. 8–10 at the points where e=0.03, approximately. The resulting recommendations are given in Table 8-9, the throws in the last column being obtainable from Table XI. Mini- mum lengths of spirals approximate the distances traveled in 2 seconds at the design speeds. 8-15. Length of Superelevation Runoff.-Superelevation runoff is the general term denoting the transition from the normal crown section on a tangent to the fully superelevated section on a curve. The runoff should be pleasing in appear- ance to the driver and effected smoothly over a length that is safe and comfortable when the vehicle is operated at design speed. There is no completely rational method of determining length of runoff. It has been made equal to the length of spiral, as calculated from one of the formulas in Art. 8-13. If this method is used, the most logical formula would be one having the same general form as 8-19, since this formula is based on restricting the rate of angular change in supereleva- tion. To possess a pleasing appearance as viewed by the driver, the edge profiles should not appear to be distorted. Control of runoff length from this standpoint has also been used; the numerical controls must, of course, be empirical. In the A ASHO Policy the values suggested are as follows: Design speed, mph...... 30 40 50 60 70 Max. relative slope in % gradient between edges of 2-lane pavement.... 1.33 1.14 1.00 0.89 0.80 On spiraled curves there is no sound basis for using dif- ferent lengths of spiral and runoff. Simplicity in construction is gained by using identical lengths. Since length of runoff is applicable to all superelevated curves, whether spiraled or not, it is concluded (AASHO Policy) that runoff lengths, as deter- mined from the foregoing appearance controls, should also be used for minimum lengths of spirals. On 4-lane highways the runoff lengths are taken to be 1.5 times the lengths for 2-lane highways, purely on an empirical basis. The resulting spiral • • HORIZONTAL ALIGNMENT 223 and runoff lengths are listed in Table 8-7. It should be emphasized that these are minimum values; high-type align- ment or the attainment of proper pavement drainage may justify the use of greater lengths. 8-16. Methods of Attaining Superelevation.-The transi- tion from the normal crowned section on a tangent to the fully superelevated section on a curve should be pleasing in appear- ance and inherently safe and comfortable for the operation of vehicles at the highway design speed. In addition, it should be relatively simple to calculate and stake out the transition. Spiraled curves may be superelevated by the method shown in Fig. 8-12. In this method the normal profile grade of the center line is unchanged. The outer lane between sections a-a and b-b is gradually warped from the normal crowned section to a straight level section at the T.S.; beyond the T.S. the section is rotated at a uniform rate about the survey center- line until it reaches full superelevation at the S.C. (section d-d). The normal profile grade of the inner edge of the pavement is continued as far as section c-c. Between sections b-b and c-c the normal convex crown (if any) on the inner lane is gradually converted to a straight inclined section at c-c, where the rate of superelevation equals that on the outside lane. (The pave- ment areas over which the crown is taken out are shown cross- hatched in the plan view.) Between sections c-c and d-d there is a uniformly increasing one-way bank across both lanes. The same method is used on a curve to the left and on the leaving spiral. In Fig. 8-12 the edge profiles are shown as straight lines merely to illustrate the basic design; the edge breaks would actually be rounded in construction. Some agencies obtain the effect of short vertical curves by eye adjustments of the stakes or forms; others insert true vertical curves at the breaks; and a few States use reversed vertical curves. Graphical determination of edge profiles by means of splines is an excel- lent and economical method in office design. The preceding method of rotating a section about the center line should not be adhered to rigidly. Practical considerations, as well as aesthetics, are poorly served by such stereotyped design. Drainage conditions, for example, may not permit 224 CURVE PROBLEMS IN HIGHWAY DESIGN depressing the inside edge of the pavement by the amount required by this method. In such a case the pavement can be rotated about the normal profile grade of the inside edge or about a line a short distance from that edge and parallel to it. Where summit vertical curves and horizontal curves overlap, لوں b 소 ​a لوين T.S a Ł R b a S.C t CROSS- SECTIONS - utside_edge } I Grade Tangent Runout Profile sto I's \s.c. PLAN Fig. 8-12. Attaining superelevation at spiraled curve Inside edge Crown PROFILE rotation about the normal profile grade of the outside edge may be the obvious method of reducing the unsightly hump produced along that edge by either of the preceding methods. No one method is best for all situations; each case should be studied individually. Multi-lane highways having a median strip present an HORIZONTAL ALIGNMENT 225 especially difficult problem in runoff design. Here, considera- tion of all important factors-aesthetics, drainage conditions, economics of grading, riding comfort, and safety—is neces- sary in arriving at a harmonious solution. Tangent Runout The design finally adopted on the original section of the Pennsylvania Turnpike is especially instructive in these respects. On this highway the rather narrow median strip (10 ft wide) and frequent curves-aggregating 50 miles in the 160-mile distance-were principally responsible for the decision to keep the edges of the paved roadway nearest the median strip in the same horizontal plane at all times. Each 24-ft roadway slopes away from these edges at a rate of in. per ft. Consequently, on tangents there is surface drainage over the roadways from the median strip. This disadvantage, however, is offset by the simpler method of runoff design made possible. The method is essentially that of Fig. 8-12, adapted to rotation about the edges closest to the median strip. Fig. 8-13 shows the runoff details for a curve to the left; specific curve data are given in Table 8-10. 120° V.C. T.S. + Length of Spiral 1 Profile along outer edge of 24' pavement-Right roadway S.C. V.C. 150' V.C. Profile along outer edge of 24 pavement-Left roadway Fig. 8-13. Runoff design on Pennsylvania Turnpike 1-3" Profile grade along inner edge adjacent to median strip · | | Full Super. נוך It should be observed that the level-inclined section, cor- responding to b-b in Fig 8-12, occurs in advance of the T.S. in Fig. 8-13, and that the inclined section corresponding to c-c in Fig. 8-12 occurs at the T.S. in Fig. 8-13. These modifica- Super. 226 CURVE PROBLEMS IN HIGHWAY DESIGN Degree of Curve 1°45' 2°00' 2°15' 2°30' 2°45' 3°00' 3°15' 3°30' 4°00' 4°30' 5°00' 5°15' 5°30' TABLE 8-10 PENNSYLVANIA TURNPIKE SPIRALS Rate of Superelevation per Foot of Width Inches 1 155/65 0100 7 16 9 16 11 34 HH 700 11 16 13 16 8 116 3 11% 3 116 1136 Length of Spiral Feet 150 150 200 200 250 250 280 300 350 370 410 400 400 Tangent Runout Feet 260 210 210 164 162 160 158 157 154 148 146 145 141 tions are required by the one-way bank over the roadways on tangents. (C Observations of high-speed driving over spiraled curves built with and without a tangent runout on the outer lane indicate that the runout is a desirable feature of superelevation runoff design. Used in combination with a suitable length of spiral, it is a pronounced aid in entering horizontal curva- ture. This is quite noticeable at night during adverse visi- bility conditions. The car appears to steer itself into the curve before the operator is aware of its presence. This quality of self-steering eliminates the element of surprise when entering curves travelling at speeds in excess of visibility requirements during adverse weather." Unspiraled circular curves are superelevated by various rule-of-thumb methods. Obviously, no method can be com- pletely rational, since it is impossible to have full supereleva- HORIZONTAL ALIGNMENT 227 tion between the T.C. and the C.T. (where it belongs) without placing the runoff entirely on the tangent (where it does not belong). On the other hand, the runoff cannot be accom- plished completely on the curve without having inadequate and variable superelevation over a substantial portion of the distance. No agencies are known to follow the latter proce- dure, although several States (Massachusetts among them) place all the runoff on the tangent. The method adopted is usually a compromise, in which the runoff starts on the tangent and ends at a point some distance beyond the T.C. In the foregoing method there is invariably a section of tangent at each end of the curve over which the cross-section varies from the normal crown on tangents to a one-way bank at the T.C. and C.T., where the rate is between seven-tenths and nine-tenths of the full superelevation value. There is no standard practice as to details. For example, some State highway departments provide full superelevation a fixed distance beyond the T.C., regardless of the length of runoff (Washington, 50 feet). The distance may or may not coincide with the point at which full widening (Art. 8-18) is attained. Other States provide full superelevation beyond the T.C. at a variable distance equal to a certain fraction of the length of runoff. In Michigan and California the fraction is one-third. Rotation may be about the center-line or about any other line parallel to the center-line; the modifying circumstances that need to be considered are the same as those in the case of spiraled curves. The objection inherent in all methods of designing super- elevation runoff for unspiraled curves is the inevitable viola- tion of sound dynamic principles. In traversing that portion of the runoff on the entering tangent, the driver-if he is to maintain a straight course-must steer against the gradually increasing superelevation. However, as soon as he reaches the T.C. of a curve involving the usual combination of an understeering car and a speed greater than the equilibrium value, he must steer toward the center of curvature (see Art. 8-7). This reversal in steering direction is neither natural nor obtainable instantaneously. Consequently, dur- ing the approach to the T.C. the vehicle usually creeps toward the shoulder or toward the inner lane. Near the T.C. it 228 CURVE PROBLEMS IN HIGHWAY DESIGN traverses a reverse curve in getting back into the traffic lane. Upon leaving the curve similar effects are produced. The effects just described are not particularly important where vehicles are operated at low speeds. But at high design speeds they may have consequences serious enough to justify universal adoption of center-line spiraling. In fact, one of the conclusions of Stonex and Noble as a result of the care- fully-instrumented high-speed tests on the Pennsylvania Turn- pike was: "the use of spirals in modern highway design is imperative if inherent safety is to be provided.” 8-17. Pavement Widening on Curves.-The practice of widening pavements on sharp curves is well established, although there is little uniformity among State highway departments as to the amount of widening required. L Fig. 8-14 R When a vehicle travels at equilibrium speed around a curve, the rear wheels track inside the front wheels by an amount equal to R- √R²- L² (see Fig. 8-14). At other than equilib- rium speed, the rear wheels track further in or out, the posi- tions depending on whether the speed is less or greater than the equilibrium value. When the speed is high, though still within safe limits, the rear wheels may even track outside the front wheels (see Fig. 8-4). There is no way of determining the exact amount of extra lane widening required to compen- sate for the non-tracking effect, except at equilibrium speed, since it depends on the particular slip angles developed by HORIZONTAL ALIGNMENT 229 each vehicle. However, measurements of actual wheel paths on two-lane highways show that drivers sense the need for greater clearance between opposing traffic, and that they instinctively increase the clearance when the speed is higher or the curvature is sharper. One of the earliest formulas giving the recommended total extra width for a two-lane highway was that suggested by Voshell.19 This formula is พ 35 =2[R- √ R²—L³] + (8-20) VR Formula 8-20, with L taken as 20 ft, has been used by several agencies. The expression is not entirely rational, however, since the first term applies only at equilibrium speed and the second term is purely empirical. Other simpler empirical formulas give results fully as satisfactory. Among these are: w= VD, w= D 3 +1, and w= 10 It is customary to limit the widening for a 2-lane pavement to between 1.5 and 6.0 feet, approximately, there being no widening on curves flatter than 5° or 6°. There are many exceptions to these values, however. Some States determine the widening only to the nearest foot; others work as close as the nearest 0.1 foot. Ꭰ 5° In an attempt to rationalize the subject, the A ASHO Policy contains an analysis in which four factors enter into the formula for widening. These are (1) the track width of the design vehicle (a single-unit truck or bus); (2) the lateral clearance per vehicle; (3) the width of front overhang of the vehicle on the inner lane; and (4) an extra width allowance that depends on the sharpness of the curve and the design speed. Accompanying the analysis is the recommendation that design values for widening should be multiples of foot and the minimum value should be 2 feet. On this basis no widening is required on 2-lane pavements that are normally 24 feet wide or greater. Table 8-11 contains a summary of values for widening obtained by three representative methods. The term W is the normal width of the 2-lane pavement. Widening is no longer the important subject that it was when sharp curves and 8-foot or 9-foot lane widths were preva- 230 CURVE PROBLEMS IN HIGHWAY DESIGN +1 67∞ Degree of Curve Formula D 8-20 L=20 4 5 8 10 13 16 20 24 TABLE 8-11 WIDENING ON CURVES-TWO-LANE PAVEMENTS 1.2 1.4 1.6 1.7 1.9 2.2 2.6 3.0 3.5 4.0 D 10 Widening, in feet, by: +1 1.4 1.5 1.6 1.7 1.8 2.0 2.3 2.6 3.0 3.4 30 2 2 2.5 3 3.5 4 AASHO Policy, W=20 ft Design Speed, mph 60 40 2 2 2 2 M 3 50 2 2 2.5 2.5 2 2 30 70 AASHO W = 22 ft Speed, mph 40 2 2 2.5 3 2 lent. In much modern alignment design no extra widening is used, since high design speeds limit curvature to 5° or 6° and traffic lanes are commonly 11 and 12 feet wide. 8-18. Transition to Widened Section.-Theoretically, the full extra widening should continue for the whole length of a circular arc. It is relatively easy to do this with spiraled curves. When curves are not spiraled, however, it is impos- sible to carry the full widening from the T.C. to the C.T. without introducing undesirable kinks in the edge of the pave- ment. Spiraled curves may be widened by the methods shown in Figs. 8-15 and 8-16. In Fig. 8-15 the total widening is placed on the inside of the curve. Widening begins at the T.S., reaches the full amount at the S.C., and tapers off from the C.S. to the S.T. in like manner. At intermediate points on the transition the widenings are proportional to the distances from the T.S. Forms for the curve at the inside edge of the roadway are located on radial offsets from the survey center-line at HORIZONTAL ALIGNMENT 231 Yo You źb źb - 1 źb źbł T.S. TITTITO =x+~+ TS. @▪▪▪¶¶ ko Fig. 8-15. Inside widening on spiraled curve Ď ко لا TIL 1/ S.C Fig. 8-16. Equal lane widening on spiraled curve Ew JION IS.C 5. E21 distances equal to 6 plus the proportional amounts of the widening. In this method the curve of the inside edge is not a true spiral. However, the transition is smooth except at the S.C., where the slight break may be remedied by eye adjustment of the stakes or forms. The alternative would be to calculate a separate spiral for the inside edge having a throw equal to w plus the throw of the center-line spiral, and having a radius 232 CURVE PROBLEMS IN HIGHWAY DESIGN R' equal to R-b-w. The length of the edge spiral is com- puted as in the example on page 234. This procedure, pre- ferred by some engineers, results in a spiral much longer than that on the center-line; it also complicates the field work somewhat. Fig. 8-17 illustrates the layout; see also Prob. 8-9. In Fig. 8-16 the total widening is divided equally between the inside and outside edges, and is distributed along the transition by the proportion method used in Fig. 8-15. If the spirals are long enough to attain the superelevation properly, the breaks in the edges of the pavement at the S.C. are hardly noticeable; in case they are apparent at all, they may be rectified by eye adjustment of the forms. žb źb TS. T.S. 0 O+W R Xt= x = L.√//w =L₂y S.C. พ 2 Y S.C. Fig. 8-17. Spiraled center-line and inside edge + w b The slight reverse curve in the outer edge of the pavement near the T.S. may be avoided by starting the outside widening at the point where the tangent produced intersects the widened pavement, as point t in Fig. 8-16. The distance from the T.S. to t is approximately equal to (8-21) Theoretically, there is a slight break at point t, but it is imperceptible. Moreover, the small loss in widening between t and the T.S. is negligible. For example, on a 10° HORIZONTAL ALIGNMENT 233 curve for which L,=400 ft and w=2 ft, ≈¿=59 ft and the widening at point t is only 0.15 ft. When curves are spiraled, the method of Fig. 8-16 has considerable justification, particularly in the case of a 2-lane concrete pavement having a longitudinal joint on the survey center-line. For one thing, staking is simplified. In addi- tion, traffic on the outside lane is provided with the same extra widening that is given to the inner lane, and the ten- dency to edge across the longitudinal joint is thereby reduced. On sharp curves requiring center striping, there is no unsightly and confusing deviation between the striping and the center joint. b źb-1 ½ after which TS T. C. q I 不 ​aaaaaa R By ▲ (in radians) S.C 5.9977 Fig. 8-18. Inside widening on unspiraled curve R.. Unspiraled circular curves are widened at the inside edge of the pavement and approached by some sort of easement curve, such as a spiral (Fig. 8–18). Theoretically, a perfectly smooth transition will result by using a spiral which has a throw equal to w and which terminates in a circular curve hav- ing a radius R' equal to R-b-w. There are several methods of determining the value of L.. The simplest is to assume that Y = 4 times the throw (equation 5-20). Then, L.=√24 R'o (from equation 5-21) (from equation 5-6) Lis 2 R' ہوۓ 234 CURVE PROBLEMS IN HIGHWAY DESIGN Example.—Given: D。=10°; ž½b=12 ft; w=2 ft. Ls=√24X558.958×2=163.8 ft, and ▲=8.395° On a very sharp curve having a large value of ▲, the approxi- mation Y = 40 may not give sufficient accuracy. In this case, calculate the coefficient M (Art. 5-11) and determine ▲ from Table XIII. Thus, in the preceding example, M = R'+w R' Ls 560.96 558.96 From Table XIII, by interpolation, A = 8.397°. Then, from formula 5-6, L=163.8 ft as before. (In this example the Or, from Table XII, two methods agree.) = = 1.003578 2.0 0.01221 163.8 ft The method of Fig. 8-18 leaves a strip of ineffective pave- ment at the outside edge near the T.C. (see Fig. 8-11). In order to compensate for this, the outside edge may be inde- pendently spiraled. This produces a layout in which the survey center-line is a simple curve but the edges of the pave- ment are true spirals. (The State of Indiana used this practice for many years on curves having D=5° and greater.) One method of selecting the spirals is by using the following pro- cedure, illustrated with the aid of Fig. 8–19: 1. Choose a value for the throw o of the outside spiral. In practice, o is usually about w. 2. Calculate L. (and ▲) for the outside spiral, as previously described, using R' =R+b−0. 3. Calculate L, (and ▲) for the inside spiral, using a throw equal to o+w and a radius R' = R— žb—0—w. 4. Examine the two spiral lengths and, if necessary, adjust the value of o (and possibly of w) to give more suitable spirals. When the inner and outer edges are separately spiraled, the S.C.'s of the two spirals will not be opposite each other. Moreover, the inside spiral must be longer than that on the outside edge, because of the greater throw (see Prob. 8–11). HORIZONTAL ALIGNMENT 235 źb- žb I.S. w. T.S. O+W £ T.C. R + S.C. =% S.C. k—b+w⋅ Fig. 8-19. True edge spirals on unspiraled curve An objection to using a spiral for the widening transition to unspiraled curves-aside from the fact that each combina- tion of R, b, and w requires a different spiral-is that only one- half the desired widening is attained at the T.C. of the circular arc. Furthermore, if the circular curve is short, there may not be distance enough beyond the T.C. in which to reach full widening unless an exceedingly short spiral is used. Accord- ingly, most State highway departments that have not yet adopted center-line spiraling use transitions which reach full widening on the inside edge at some relatively small fixed distance beyond the T.C., regardless of the values of R, b, and The length of the transition is also a fixed distance, although some States vary the length with the degree of curve according to a rule-of-thumb procedure. The edge transition itself cannot be a spiral; usually it is a curve approximating a parabola. On pavement work, the eye adjustment of the forms required to produce a smooth curve near the point of maximum widening is likely to be quite extensive. This matter is treated in greater detail in Art. 8–19. The voluminous tables worked up by some State highway departments for staking widening transitions and supereleva- tion runoffs on unspiraled curves-in contrast to the simple procedures based upon Figs. 8-12, 8-15, and 8-16—are them- selves strong arguments for adoption of center-line spiraling. 236 CURVE PROBLEMS IN HIGHWAY DESIGN 8-19. Edge Lengths. It is often necessary to determine the curved length of the inner edge or outer edge of the pavement or of a line a certain distance from either edge. This problem occurs in connection with estimating the length of curb or of guard rail and in staking an offset curve parallel to the center line. Unwidened circular arcs present no special difficulty. This form of the problem is treated in detail in Art. 2–15. In the case of a circular arc on which inside widening is accomplished by means of a true spiral (Fig. 8–18), the length of each spiraled edge is found from the basic spiral-length formula, L. =2 ▲ R' (equation 5–6), ▲ being in radians and R' being the radius of the fully widened edge, i.e., R' = R—≥b-w. The total length of the curved inside edge between the T.S. and S.T. of the spirals is (I+2 ▲) (R −žb−w), whereas the length of the curved outside edge is I(R+16). The modification of the preceding case, in which the true spiral is replaced by a rule-of-thumb transition reaching full widening a short distance beyond the T.C., does not admit of any mathematically simple method of calculating edge lengths accurately. Since high precision is rarely required, approxi- mate methods usually suffice. Thus, in Fig. 8-20, full widen- źb- źb A a h T.C. BI Fig. 8-20 d. R źb ing is attained at C, the distances a, d, h, and w being given. The length of the curved edge AB is approximately equal to HORIZONTAL ALIGNMENT 237 the chord distance, or (approx.) Also, the curve BC is approximately equal to the arc BC', or BC = BC' = ( b- · (R-16h) d (approx.) Ꭱ Curved edge lengths along an unwidened curve which is spiraled along the center line depend on the method of aligning the edges. If true spirals are used for the edge curves, their lengths equal 2 ▲(R±‡b) and the total curved edge lengths equal (1+2 ▲) (R±žb). However, the edge spirals do not quite begin, or end, on radial lines through the T.S. and S.C. Moreover, the pavement width is not exactly uniform between those points. Simplicity is gained and the effects of true spirals are closely approximated by keeping a uniform width of pavement. That is, the edges of the pavement are on radial offsets from the center line at distances of b(as in Fig. 8-15, but without the widening). formula 5-7, 8= The lengths of the resulting edge curves between points radially opposite the T.S. and S.C. are found as follows: In Fig. 5-3, dl=rds, and the corresponding relations for the inside and outside edges are h2 AB=a+za dl;= (r-3b) dô and dlo = (r+b)dô i Consequently, dl;= dl-1bd8 and dl.=dl+3bdd. But from 2 = 5-7, 8= (2) A, from which đô stitution, therefore, By integration, and dli = dl — 2Aldl L2 baldl L2 1₁ = 1 - (3-4) (12)² 2 + (32-4) (12.) ² (8-23) For the complete edge curve, l=Ls, li=Li, and l。=L。. l=l+ baldl L2 and dl。=dl+ Lis After sub- (8-22) 238 CURVE PROBLEMS IN HIGHWAY DESIGN Consequently (Fig. 8-21), and and in which A is in radians. If the pavement is widened on the inside by the method shown in Fig. 8-15, an analysis similar to the foregoing yields L₁ =L, A(b+}w) (8-26) Where the widening is divided equally between the inside and outside lanes, as in Fig. 8-16, the edge lengths are given by Li=Ls-A(b+3w) Lo=Ls+A(3b+} w) b(or P) Li=L.-1bs Lo=L₂+&bs C₁ 8-20. Staking Offset Curve Parallel to a Spiral.-An offset curve parallel to a spiral may be staked either by deflection angles or by offsets (see Chapter 5). In either method it is necessary to find the chords to be taped. To illustrate the theory involved, Fig. 8-21 shows a center line spiral L, divided 17.5 81 TS. δι 1 C₂ 82 Δ L。 Ls C3 83- (8-24) (8-25) Fig. 8-21. Offset curve parallel to spiral (8-27) (8-28) S.C. To P.I into three equal parts. It is required to stake the parallel offset curve L, by setting points radially opposite the corre- sponding points on the center line. In contrast to the analo- gous problem at a circular curve (Art. 2-15), the chords along the offset curve are not the same length because of the increasing rate of curvature along the spiral and the con- sequent increase in the values of d. HORIZONTAL ALIGNMENT 239 If the offset curve is divided into n equal parts, for- 2 (1/2) (1)². Ls mula 8-23 shows that c₁ == + N n 2Ls Also C2 n 2 C1, which may be reduced to c₂ = c₁₂+2(24) (4)² η 2 S. T. 2 Similarly, C3=C₂+2 etc. To generalize, sub- stitute the offset p for b. The formulas applicable to parallel offset curves outside or inside a center-line spiral then become ()(); 2 C1 = C2=C₁±2i C3=C₂+2i where the increment i equals S. C. L±i n Cn=Cn-1±2i R • k b P N (57.296). At w 1-24 I C. S. L. + (8-29) S. T. Fig. 8-22. Pavement areas at spiraled curve The actual chords to be taped will differ slightly from the nominal chords (given by formulas 8-29) only near the end of a long sharp spiral. Where this is the case, the chord cor- rections may be found with the aid of Tables II and III. If the center-line spiral has been staked and it becomes necessary to set parallel edge curves, the required points may 240 CURVE PROBLEMS IN HIGHWAY DESIGN be located by offsets (Art. 5-15). Each point is at a constant offset p from the center-line stake and also at the computed chord distance ahead of the offset stake previously set. 8-21. Pavement Areas on Curves.-The area of pavement along any unwidened curve equals pavement width times length of curve. For a circular curve, A=bL, where L is the arc length between T.C. and C.T. At an unwidened spiraled curve (see lightly-shaded portion of Fig. 8--22), A=b [2L+(I −2^)R] where I and A are in radians; or (8-30) 100 (I-2A) A = b[2L6+ (8-30a) D where I and ▲ are in degrees. In other words, the presence of spirals does not affect the basic relation for pavement area so long as the pavement width is uniform. If the pavement is widened as in Fig. 8-15, the total extra area along the inside of a curve with equal spirals consists of a curved strip of uniform width w and two equal curved strips of variable width. From the osculating-circle principle (Fig. 5-4), the four heavily-shaded areas in Fig. 8-22 are approxi- mately equal. Therefore, the total extra area due to wid- ening is AwwI (R-6—1w) (8-31) Approx. where I is in radians. If slightly higher precision is needed, a theoretically correct relation for the area of the strip of variable width (A) may be found by expressing dA as the difference between two sectors. Then by integration, Avw= ½wLs—▲(}bw+}w²) (8-32) where A is in radians. The second term in this formula is usually small enough to be neglected at the flat curves used on high-speed alignment. Omission of this term indicates that the area approximates a triangle. 8-22. Sight Distances on Horizontal Curves.-Where a building, wall, cut slope, or other obstruction is located at the inside of a curve, the designer must consider the possible effect of the obstruction on the sight distance. Fig. 8-23 shows this HORIZONTAL ALIGNMENT 241 situation for the case in which the sight line AB is shorter than the curve. The driver's eye at A is assumed to be at the center of the inside lane. Although the chord AB is the actual line of sight, the stopping sight distance S is taken as the arc AB because this is the travel distance available for stopping in order to avoid hitting an object at B. II M Fig. 8-23. Sight distance on horizontal curve SH m In the following analysis, R, D, and L refer to the center of the inside lane, not to the survey center-line. If the nota- tion on Fig. 8-23 is used, m = R vers a. But a:D=SH:100 and R is approximately equivalent to Hence = R 28.65 5,730 SHD D 200 m= R vers Cos-1 5,730 D B R-m Ꭱ L(2SH-L) 8 R Also, (8-34) Fig. 8-24 is a design chart (AASHO Policy) showing the required middle ordinates, at various degrees of curve, needed to satisfy the stopping sight distances given in Table 8-1. Where the obstruction is a cut slope, the criteria for height of eye and object (Art. 8-3) can be approximated by using a height of 2.5 feet at the point where m is measured. In case the sight distance is longer than the curve, the following approximate formulas may be used: J (8-33) (8-35) Approx. ! 242 CURVE PROBLEMS IN HIGHWAY DESIGN 30 25 D= Degree of Curve - Center Line of Inside Lane 15 20 10 = Max D when e = 0.10 => I V = Design Speed mph V=30 S (Stopping) = 200′(Measured along & Inside Lane) V=40 S=275 V = 50 S=350 V=60 S = 475 V = 70 S = 600 25 30 10 15 20 m = Middle Ordinate from Center Line Inside Lane to Sight Obstruction-Feet Fig. 8-24 200 250 300 3000 35 R = Radius-Center Line of Inside Lane - Feet Instead of using the foregoing methods, the designer may of little value except on long flat curves. distances given in Table 8-3. However, this application is These formulas may also be used with the passing sight (8-36) Approx. and SH L 4 Rm + 21 L VERTICAL ALIGNMENT 243 prefer to scale sight distances from the plans. Since high precision is unnecessary, the procedure is to place a straight- edge on the survey center-line (at the station for which the sight distance is to be determined) and tangent to the obstruc- tion. The sight distance is then taken as the difference in stationing between the points where the straightedge inter- sects the center line. When scaled, it is suggested (AASHO Policy) that SH be recorded to the nearest 50 feet when less than 1,000 feet and to the nearest 100 feet when greater than 1,000 feet. h1 VERTICAL ALIGNMENT 8-23. Sight Distances at Crest Vertical Curves.-At a crest vertical curve the sight distance is considered to be the hori- zontal projection of the line of sight for the assumed condi- tions. Fig. 8-25 shows the situation where the sight distance S is less than the length L of the vertical curve, or SL. In the general case h₁#h₂ and the sight line ad is not parallel to the chord joining the ends of the parabola. The problem is to find the slope of the sight line that will make the distance ad a minimum. Let g represent the dif- ference between the gradient of the sight line and the gradient G₁. Then A-g will be the difference between the gradient of V/G₂ L 2 L (8-37) (8-38) ·S- Fig. 8-26. Sight distance on vertical curve, where S>L hz VERTICAL ALIGNMENT 245 the sight line and the gradient G2. Use is also made of the following property of the parabola: If a tangent to the para- bola is drawn between the main tangents, the horizontal pro- jection of the intercept cut off on this new tangent by the main tangents is equal to one-half the horizontal projection of the long chord of the parabola; that is, the horizontal projection. of bc is equal to L. By definition, S equals the sum of the horizontal projections of the distances ab, bc, and cd. Consequently, the general expression for sight distance where S>L is S= -*** dS dg Solving for g gives dS For the sight distance to be a minimum, =0, or dg 100 hi. L. 100 h₂ + 2+ g 2 A-g g 100 hi g² + } 100 h2 (A—g)² Ahi h₂-h₁ A h₂-hi =0 When S>L, (non-passing conditions) L=2S-1,457 A (A) The result of substituting the value of g from equation B in equation A and solving for L is the following general rela- tion: L=2S_3,600 A (B) 200(√h₁+ √h₂)². When S>L, L=2S- (8-40) A For the values of h₁ and h₂ in the AASHO Policy the practi- cal relations are: (8-41) (passing conditions) (8-42) The light solid lines in Fig. 8–27 (AASHO Policy) show minimum lengths of crest vertical curves needed to provide stopping sight distances at various design speeds. The value of K, or the length of curve required to effect a 1% change in 246 CURVE PROBLEMS IN HIGHWAY DESIGN CER 2 = 2 G 16 15 14 13 A = Algebraic Difference in Grades-Per Cent w 12 ∞ 7 L the theoretical minimum lengths become zero for small values of A because the sight line passes over the crest of the vertical curve. However, good practice in design calls for inserting a vertical curve at all changes in vertical alignment. As an approximation of current practice, the minimum length of vertical curve is taken as about 3 times the design speed. This approximation is represented by the heavy vertical lines at the lower left of Fig. 8-27. There has been concern over the effect on the required lengths of crest vertical curves caused by the trend toward lower vehicles. Research suggests the advisability of reducing the height of eye from 4.5 feet to slightly less than 4 feet.25 Such a reduction requires about a 10 percent increase in the crest vertical curve lengths given by Fig. 8-27. However, theoretical reductions in both stopping and passing sight dis- tances caused by decrease in eye height are offset by improve- ments in vehicle performance. Considering all factors, no change in design standards for crest vertical curves appears to be warranted.26 Drainage requirements may affect the maximum lengths of vertical curves. If pavements are curbed, experience indi- cates the desirability of attaining a minimum longitudinal grade of 0.35% at a point about 50 feet from the crest. This corresponds to a K-value of 143 feet for a change of 1 per cent in A; the resulting line is plotted in Fig. 8-27 as the drainage maximum. Special attention to drainage should be given for combinations below and to the right of this line. Some attempts have been made to introduce headlight sight distance as a design control for stopping sight distance at crest vertical curves, the height of headlight h₁ being taken as 2.5 feet and the height of object h₂ as 4 inches or more. Obviously these conditions would demand much longer vertical curves, but this requirement is considered to be unnecessary in view of the lower running speeds used in night driving. Although formulas 8-39 and 8-42 for passing sight distance 248 CURVE PROBLEMS IN HIGHWAY DESIGN are contained in the AASHO Policy, there is no design chart comparable to Fig. 8-27. (This is in contrast to the original 1940 Policy.20) Because of the high construction cost where crest cuts are made, it is ordinarily impracticable to provide the much longer vertical curves needed for passing. 8-24. Sight Distances at Sag Vertical Curves.-There is no generally accepted basis for establishing the lengths of sag vertical curves. Four criteria have been used: (1) headlight- beam distance, (2) rider comfort, (3) drainage control, and (4) general appearance. 2.5' Ź VIES Fig. 8-28. Headlight beam distance, where SL, L Fig. 8-29. Headlight beam distance, where S>L S Headlight-beam distance, as used by the Pennsylvania Turnpike Commission¹, is represented by Figs. 8-28 and 8-29. With the aid of these figures it is not difficult to derive the practical relations, which are: When SL, (8-47) In the case of dual highways it may be desirable to check the distance available for passing at an undercrossing without ramps. This can be done either by using the preceding formulas or by scaling from the profile. Limited sight distance is more likely to occur where an interchange is located at a horizontal curve. Ordinarily, the 252 CURVE PROBLEMS IN HIGHWAY DESIGN lateral clearance to bridge rails at an overpass or to abut- ments at an underpass is not enough to permit use of maximum curvature for the design speed. The formulas for SH in Art. 8-22 can be used in analyzing this situation. DESIGN PRINCIPLES Exact adherence to the specific controls outlined in the foregoing articles will not guarantee attainment of the best location. Experience, judgment, and the observance of recognized principles of good design are also necessary. When the geometric controls are applied, certain general principles should also be observed. 8–26. General Controls for Horizontal Alignment.—Impor- tant principles relating to horizontal alignment are as follows: 1. Alignment between the location control points (see Art. 9–3) should be as directional as possible. Long, flowing curves fitted to the topography (Fig. 8-32) are better than long tangents that slash through the terrain in an artificial manner. 2. Closely spaced short curves should be avoided. Such unsightly kinks as broken-back and reverse curves may be converted into more pleasing alignment in several ways. (See Arts. 7-14 and 7-15.) 3. Small changes in direction should not be accomplished by means of the sharpest curve permitted by the design speed. The maximum degree of curve should only be used with large central angles and at critical locations in general. 4. Curves, unless very flat, should be avoided on long, high embankments. 5. Consistent alignment design should be attained (see Art. 1-5). In case the topography requires a reduction in design speed, the change-reflected in reduced sight distances, increased curvature, and shorter distances between curves- should be made gradually over a distance of several miles. Moreover, there should be conspicuous warning signs to show that such a change is in progress. 6. Horizontal and vertical alignment should be studied together. Some general design controls for such study are outlined in Art. 8-28. 254 CURVE PROBLEMS IN HIGHWAY DESIGN 8-27. General Controls for Vertical Alignment.-When considering vertical alignment, some important principles are the following: 1. A smooth-flowing profile with long vertical curves is preferable to a profile with numerous breaks and short grades. 2. Care should be taken to avoid sag vertical curves on comparatively straight horizontal alignment. These produce “hidden dips” and are serious hazards, especially during pass- ing maneuvers. 3. In general, long steep grades may be broken to the advantage of traffic by placing the steepest grade at the bottom of the ascent. 4. Steep grades should be reduced through important inter- sections at grade, in order to minimize hazards to turning traffic. 5. Unnatural and unsightly design should be avoided. Among these defects are crest vertical curves on embankments and sag vertical curves in cuts; broken-back vertical curves; and the presence of numerous minor undulations in grade line so located that they are visible to the driver. 6. On important highways carrying a large percentage of commercial traffic, economic studies of motor-truck perform- ance relative to grades should accompany the office work of grade-line design. Some references 21,22,23 are included in the bibliography at the end of this chapter. 8-28. Combination of Horizontal and Vertical Alignment. Where there is a combination of horizontal and vertical curva- ture the following principles should be kept in mind. 1. It is not essential to separate horizontal and vertical curves; in general, the alignment is more natural and more pleasing in appearance if they are combined-subject to the limitations which follow in 2 and 3. 2. A change in horizontal alignment should preferably be made at a sag vertical curve where the change in direction is readily apparent to the driver. However, the horizontal curve should be flat, in order to avoid the distorted appearance caused by foreshortening. DESIGN PRINCIPLES 255 3. If horizontal curvature at a crest vertical curve can- not be avoided, the change in direction should precede the change in profile. 4. Relatively small savings in cost of right-of-way or of grading should not be an excuse for the insertion of short sections of sub-standard design. On most locations in rural areas the cost of these relatively permanent elements of the highway is less than that of the pavement and other shorter- lived appurtenances. Therefore, it is unwise to reduce the built-in safety of some sections of a highway, and to invite almost certain early obsolescence, for the sole purpose of reducing the cost by a small percentage. 5. As noted in Art. 1-5, "the aim of good location should be the attainment of consistent conditions with a proper balance between curvature and grade." Balanced design, everywhere consistent with the chosen design speed, is the ideal to be constantly sought. Straight alignment obtained at the expense of long, steep grades, or excessive curvature inserted to follow the grade contour closely, are both poor designs. The best design is a compromise in which safety, economics, and aesthetics are sensibly blended. PROBLEMS 8-1. Compute minimum stopping sight distance on level pavement for any assigned design speed. Take values of t and ƒ from Table 8–1. 8-2. Compute minimum passing sight distance on a two- lane highway for any assigned design speed. Take passing speed from Table 8--3 and interpolate in Table 8-2 for proper values of.a, ti, t2, and dз. 8-3. Compute the side friction factor ƒ developed on the following curves, each of which has favorable crown. Is f within the safe maximum recommended for curve design by AASHO? (a) R=5,000 ft; e=0.10; V=55 mph. Answer: 0.06; yes. (b) Da=5°; e=0.06; V=60 mph. Answer: 0.15; no. (c) R=1,200 ft; e=0.08; V=60 mph. (d) Da=1°40′; e=0.08; V=60 mph. 256 CURVE PROBLEMS IN HIGHWAY DESIGN • 8-4. If the actual coefficient of sliding friction between tires and icy pavement is 0.05, theoretically within what range of speeds could a vehicle be operated without sliding inward or outward during icy conditions on the curves in Prob. 8-3? Partial answers: (a) 61 to 106 mph; (b) 13 to 43½ mph. 8-5. Compute the stopping sight distance on straight icy pavement when operating without chains (ƒ=0.05) at an actual speed of 35 mph (take t from Table 8-1). Compare answer with the range of speeds found in Prob. 8-4. What conclusions appear to be justified (a) with regard to the super- elevation designs in Prob. 8-3, and (b) with regard to maxi- mum speed of operation without chains on icy pavement? 8-6. For any assigned design speed, verify: (a) Values of R and D listed in Table 8-5. (b) Values of R, D, and ƒ listed in Table 8-6. (c) The fact that superelevation rates in Table 8-7 and Fig. 8-10 lie on parabolic curves. (d) Values of L, listed in Table 8-8. 8-7. Compute design speeds at the following curves on the Pennsylvania Turnpike consistent with values of ƒ recom- mended by AASHO (Fig. 8-7 and Table 8-4). See Table 8-10 for the superelevation rates. (a) Da=2°; (b) Da=3°; (c) Da=4°; (d) Da=5°. Partial answers: (a) 78 mph; (b) 72 mph. 8-8. A typical section of the Massachusetts Turnpike is a 6-lane dual highway. On tangents, each inner lane has a 2 per cent cross slope toward the median; outer lanes, a 2 per cent cross slope toward the shoulders. The radius of the sharpest horizontal curve is 3,500 ft. If this section were continued around the sharpest curve without rotating the pavement, for what maximum speeds would the lanes be safe? Take ƒ as recommended by AASHO in Fig. 8-7 and Table 8-4. (Note: This curve is actually banked so that all lanes have a 2 per cent favorable cross slope.) 8-9. Compute the length of true spiral on the inside edge of the following spiraled curves, assuming that the inside lane is widened as in Fig. 8–17: DESIGN PRINCIPLES 257 (a) Da=5°; b=10 ft; w=2 ft; L, on 2 ft; Ls on (b) R=500 ft; 3b=10 ft; w=2 ft; L, on (c) Da=13°; b=11 ft; w= 2 ft; L, on (d) R=800 ft; b=10 ft; w=2.5 ft; Ls on Partial answers: (a) 378.9 ft; (b) 250.1 ft. &=300 ft. ¢=200 ft. =210 ft. (a) Da=5°; b=10 ft; w=2 ft. (b) R=500 ft; b=10 ft; w=2 ft. 2 ft. (c) Da=13°; }b=11 ft; w=2 ft. (d) R=800 ft; b=10 ft; w=2.5 ft. ¢=230 ft. 8-10. Compute the length of true spiral on the inside edge of the following unspiraled curves, assuming that the inside lane is widened as in Fig. 8-18. Compare answers with those in Prob. 8-9. Answer: 233.3 ft. Answer: 153.1 ft. 8-11. Compute the lengths of true spirals on the inside and outside edges of the curves in Prob. 8–10, assuming that the inside lane is widened as in Fig. 8-19. Use w as the throw of the outside spiral. Compare answers with those in Prob. 8–10. Partial answers: (a) inside 285.7 ft; outside 166.5 ft; (b) inside 187.4 ft; outside 110.5 ft. 8-12. Compute the edge lengths of the curves in Prob. 8–9 between points radially opposite the T.S. and S.C., assuming that widening is omitted. Partial answers: (a) L¿=298.69 ft; L=301.31 ft; (b) L;=198 ft; L,=202 ft. 8-13. Compute the inside-edge lengths of the curves in Prob. 8-9 between points radially opposite the T.S. and S.C., assuming that the widening is applied as in Fig. 8-15. Partial answers: (a) L;=298.52 ft; (b) L;=197.73 ft. 8-14. Compute the edge lengths of the curves in Prob. 8-9 between points radially opposite the T.S. and S.C., assuming that the widening is divided equally between the lanes as in Fig. 8–16. Partial answers: (a) L;=298.60 ft; Lo=301.40 ft; (b) Li=197.87 ft; L,=202.13 ft. 8-15. Compute the chords needed to locate offset curves parallel to the spirals in Prob. 8-9. (As a check, the sum of the chords should equal the value found by formula 8-24 or 258 CURVE PROBLEMS IN HIGHWAY DESIGN 8-25, in which p is substituted for ½b.) Spiral (a): n=6, p=60 ft outside. Spiral (b): n=4, p=60 ft inside. Spiral (c): n=7, p=150 ft outside. Spiral (d): n=10, p=150 ft inside. 8-16. Compute the total pavement area in square yards between the T.S. and S.T. of the following unwidened spiraled curves: (a) I=45°32′; Da=5°; b=10 ft; L=300 ft. Answer: 2,690.4 sq yd. (b) I=51°17'; R=500 ft; (c) I=54°46′; Da=13°; (d) I=61°25'; R=800 ft; b=10 ft; L=200 ft. b=11 ft; L¸=210 ft. b=10 ft; L=230 ft. 8-17. Compute the total extra pavement area in square yards caused by widening the curves in Prob. 8-16 by the method of Fig. 8-15. Use approximate formula 8-31; check by exact method involving formula 8–32. Answer: 200.4 sq yd approx.; 201.6 sq Curve (a): w=2 ft. yd exact. Curve (c): w=2 ft. Curve (b): w=2 ft. Curve (d): w=2.5 ft. 8-18. Design standards for a 2-lane highway provide for 12-ft opposing traffic lanes and 8-ft shoulders. Bridge abut- ments at underpasses are located 1 ft beyond the shoulders. If an abutment occurs at the middle of a curve having a center-line radius of 1,000 feet (no spirals), Answer: 346 feet. (a) What is SH if I equals 23°? (b) What is SH if I equals 13°? (c) What is the maximum recommended design speed in (a)? (d) Would the maximum recommended design speed be limited by the presence of the bridge abutment or by the side friction factor developed, considering the superelevation rate e is 0.10? 8-19. Determine the recommended minimum lengths of crest and sag vertical curves where: BIBLIOGRAPHY 259 (a) A=5%; V=50 mph. Answers: Crest 400 ft; sag 350 ft. (b) A=4.75%; V = 70 mph. 8-20. At which of the four vertical curves in Prob. 8-19 would difficulty with surface drainage probably occur, assum- ing the pavements to have edge curbs? 8-21. Compute the actual stopping sight distances at the following vertical curves: (a) Crest curve: L=600 ft; A=3%. Answer: 540 ft. (b) Crest curve: L=600 ft; A =6%. (c) Sag curve: L=600 ft; A=3%. (d) Sag curve: L=600 ft; A=6%. 8-22. If the sag vertical curves in Prob. 8-19 occurred at underpasses, what sight distances would be provided? (a) Sag curve (a). Answer: 995 ft. (b) Sag curve (b). 8-23. Principles of sight distances at vertical curves: (a) Starting with formula A (Art. 8-23), derive formula 8-40. (b) Verify the fact that the theoretical K-values in Figs. 8-27 and 8-30 are consistent with the rounded stopping sight distances in Table 8-1. (c) Derive formulas 8-43 and 8-44. (d) Derive formulas 8-46 and 8-47. BIBLIOGRAPHY 1. Noble, C.M., "Engineering Design of Superhigh- ways," Proceedings, American Road Builders' Association, 1941, pp. 183-217. 2. "A Policy on Geometric Design of Rural Highways," American Association of State Highway Officials, 1954. 3. Prisk, C.W., "Passing Practices on Rural Highways," Proceedings, Highway Research Board, 1941, pp. 366-378. 4. Leeming, J.J., "Road Curvature and Superelevation," Road Paper No. 7, Inst. C.E., Oct., 1942. 5. Stonex, K.A., "Car Control Factors and Their Mea- surement," S.A.E. Journal, March, 1941. 260 CURVE PROBLEMS IN HIGHWAY DESIGN 6. Fox, M.L., "Relations Between Curvature and Speed," Proceedings, Highway Research Board, 1937, pp. 202- 211. 7. Stonex, K.A., and Noble, C.M., "Curve Design and Tests on the Pennsylvania Turnpike,” Proceedings, Highway Research Board, 1940, pp. 429-451. 8. Moyer, R.A., Bulletin 120, Iowa Engineering Experi- ment Station, 1934. 9. Moyer, R.A., and Berry, D.S., "Marking Highway Curves with Safe Speed Indications," Proceedings, Highway Research Board, 1940, pp. 399-428. 10. Barnett, J., "Safe Side Friction Factors and Super- elevation Design," Proceedings, Highway Research Board, 1936, pp. 69-76. 11. Shortt, W.H., "A Practical Method for the Improve- ment of Existing Railway-Curves," Proceedings, Inst. C.E., Vol. 176, 1909, pp. 97 ff. 12. Royal-Dawson, F.G., Elements of Curve Design, E.& F.N. Spon, Ltd., London, 1932. 13. Smirnoff, M.V., "Analytical Method of Determin- ing the Length of Transition Spiral," Transactions, ASCE, Vol. 116, 1951, pp. 155-185. 14. Haile, E.R., Discussion on "The Modern Express Highway," Transactions, ASCE, Vol. 102, 1937, pp. 1091- 1099. 15. Leeming, J.J., and Black, A.N., "Road Curvature and Superelevation: Experiments on Comfort and Driving Practice," Journal, Inst. Municipal and County Engineers, Vol. LXXI, No. 5, Dec., 1944, pp. 137 ff. 16. Leeming, J.J., "The General Principles of Highway Transition Curve Design," Transactions, ASCE, Vol. 113, 1948, pp. 868-896. 17. Warren, H.A., and Hazeldine, E.R., "Experimental Transition Curves," Journal, Inst. Municipal and County Engineers, Vol. LXV, No. 21, March, 1939, pp. 1012 ff. 18. Welty, W.R.,. "A Method for Studying the Paths of Motor Vehicles on Curves," Bureau of Highway Traffic, Yale University, New Haven, Conn., 1947. 19. Bruce, A.G., and Brown, R.D., "The Trend of Highway Design," Public Roads, Vol. 8, No. 1, March, 1927, p. 8. BIBLIOGRAPHY 261 20. "A Policy on Sight Distance for Highways," American Association of State Highway Officials, 1940. 21. Saal, C.C., "Hill Climbing Ability of Motor Trucks," Public Roads, Vol. 23, No. 3, May, 1942, pp. 33-54. 22. Taragin, A., "Effect of Length of Grade on Speed of Motor Vehicles," Proceedings, Highway Research Board, 1945, pp. 342-353. 23. "Time and Gasoline Consumption in Motor Truck Oper- ation," Research Report No. 9-A, Highway Research Board, 1950. 24. "Highway Curves and Test Track Design," Bulletin 149, Highway Research Board, 1957. 25. Lee, C. E., "Driver Eye Height and Related Highway- Design Features," Proceedings, Highway Research Board, 1960, pp. 46-60. 26. Stonex, K.A., Loutzenheiser, D.W., and Haile, E.R.Jr., "Driver Eye Height and Vehicle Performance in Relation to Crest Sight Distance," Bulletin 195, Highway Research Board, 1958, pp. 1-8. CHAPTER 9 RAILROAD SURVEYS 9-1. Foreword. The purpose of this chapter is to present a few examples of curve and earthwork theory and surveying procedures applied to the field of railway surveying. More detailed descriptions of some of the subjects, particularly track layout and maintenance (turnouts, connecting tracks, string lining, etc.), will be found in railway surveying hand- books, notably Railroad Curves and Earthwork, by Allen, or Field Engineering, by Searles, Ives, and Kissam. It is essential that Chapter 1 be restudied in connection with the following description of survey methods and paper- location procedure. Otherwise, much of the material in that chapter-consisting of basic considerations more important than the technical details to be presented-would have to be repeated. Fig. 9-1 shows an example of railroad location in the Rocky Mountains near Blacktail, Montana. The pictured alignment includes a simple 8° curve with a total central angle of 152°40′ and a total length, including two 180-foot spirals, of 2,088 feet. On the adjoining tangents the grade is 1.80%; on the curve it is compensated 0.04% per degree, and the actual grade is 1.48%. Shown is a 106-car freight train powered by a 5,400- horsepower diesel locomotive at the head and a 4,050-horse- power helper at the rear. 9-2. Reconnaissance.-Typically, the conception of a project is followed first by a careful study of the best available maps and then by field reconnaissance of the terrain between the proposed termini. In the early years of railroad expansion in the United States, it was often necessary to reconnoiter relatively unexplored regions without the aid of maps. Direc- tions were determined by pocket compass; elevations, by barometer; slopes, by clinometer; and distances, by pedometer or by timing the gait of saddle horses. Though such devices are still useful at times, they have been made nearly obsolete by the growing file of good maps and by improvements in 262 264 RAILROAD SURVEYS the science of photogrammetry. In fact, it is becoming increasingly apparent that, except for minor projects, aerial- surveying methods may almost entirely supplant the older methods of field reconnaissance, and perhaps of the pre- liminary survey as well. Several particularly valuable types of information that may be obtained more readily from aerial photographs than from former ground methods are noted in Chapter 12. See also Reference 7 in Art. 9–20. 9-3. Location.Controls.-The proposed railway must pass through or near certain controlling points. Some of the primary controls will have been fixed in the conception of the project; others, including most of the secondary ones, will be revealed by office studies of the maps and by whatever field reconnaissance is needed to verify questionable points. Typical location controls include: Primary Controls The termini. Important intermediate traffic centers. Unique mountain passes, tunnel sites, or major stream crossings. Secondary Controls Minor intermediate markets or production centers. Water courses. Crossings of existing railroads or important highways. Swampy areas. Areas subject to snow or rock slides. Areas involving costly land damages. Topography in general, as it affects the economical attain ment of desirable grades and curvature. 9-4. Organizing the Field Work.-Prior to starting exten- sive field work, the locating engineer preferably should make a field examination of the general route recommended in the reconnaissance report. Before going into the field, he must become acquainted with the general objectives of the project. Moreover, he should be informed as to how much information he may divulge to curious property owners along the route. A great variety of useful purposes may be accomplished in this preliminary field examination. Among these are: RAILROAD SURVEYS 265 Arrangements for temporary office quarters, and for housing and boarding the men. Hiring of local help for axemen or other positions. Permission to trespass on private property for survey pur- poses, with whatever qualifications are imposed by the owner. Identification of convenient bench marks described in Federal or State publications. Determination of best access to the work by automobile or other means of transportation. Making of special notes regarding secondary controls. Taken together, the information acquired should enable the locating engineer to select the needed field and office personnel and to determine the most efficient methods of per- forming the various surveying operations. 9-5. Stadia Traverse.-In remote regions that are in- adequately mapped and on projects for which aerial-surveying methods are not justified, the reconnaissance may not definitely disclose the best general route. In such cases it is wise to run a stadia traverse along each of the possible locations. Needed measurements are made as rapidly as possible, consistent with the required accuracy. Transit stations are far apart. Single deflection angles need be read no closer than the nearest 10 minutes, though it is advisable to check the resulting bearings by compass in order to guard against blunders. A few intermediate shots along the traverse line may be needed to give data for plotting a profile of the traverse. Only enough side shots (supplemented by sketches) need be taken to give the approximate positions and elevations of the secondary controls. Especially good judgment is needed in conducting this type of stadia survey; if the survey is intrusted to inexperi- enced personnel, it usually reverts to an unnecessarily detailed and time-consuming topographical survey. The resulting maps, plotted by protractor and scale, really serve as high-grade reconnaissance; if the work is well done, they permit the definite discard of certain routes and go far 266 RAILROAD SURVEYS toward fixing closely the best general route to be followed in the more precise preliminary surveys. 9-6. Transit-and-Tape Traverse.-Whenever the recon- naissance narrows the location down to a fairly definite route, it is good practice to run a careful transit-and-tape traverse, called the "base line" or "P-line," joining the various loca- tion controls. This traverse then serves not only as an accu- rate framework for plotting the topographic details but also as a convenient means of transferring the paper location to the ground and checking its accuracy. The P-line is a continuous deflection-angle traverse located as close as convenient to the expected position of the final location. Transit stations are marked by substantial tacked hubs, which are driven flush, carefully referenced, and identified by guard stakes. Deflection angles are at least doubled, the telescope being reversed on the second angle in order to eliminate instrumental errors. To guard against blunders in reading angles the magnetic bearing of the forward line should be compared with the calculated bearing before leaving any transit station. If the survey is a long one, a traverse bearing should be checked independently every 10 miles or so by means of a sun or star observation for azimuth. Horizontal distances are measured with a 100-foot (or longer) steel tape, usually being recorded to the nearest tenth of a foot, but sometimes to hundredths. Station stakes are set at regular 100-ft stations, at intermediate plus points where profile breaks occur, and, possibly, at fence lines and highways crossing the center line. It is not necessary to center all station stakes, since they serve only for profile leveling and cross-sectioning. The method described in Art. 2-11 is invariably close enough for the purpose. However, chaining from pin to pin, not from stake to stake, is always advisable. 9-7. Levels.—If the survey is over terrain permitting the transit party to make rapid progress, it is often worth while to start two two-man level parties at the time at which the transit party begins its work. One, the bench level party, carries the elevations from the nearest bench mark and sets additional bench marks every 1,000 feet or so along the RAILROAD SURVEYS 267 general route. It is not necessary for this party to follow the exact path taken by the transit party; swampy areas and steep slopes, for example, should be by-passed wherever possible. In fact, the best plan is for the bench level party to work ahead of the transit party along a general route specified by the locating engineer. This party can then close its levels back to the starting point each half-day without falling behind the transit party. The second level party, the profile level party, takes its initial backsight on a bench mark established near station P 0+00 by the bench level party. It follows immediately behind the transit party, taking rod readings to tenths of a foot on the ground at every station stake and intermediate plus point. Elevations are carried along through turning points on which readings are made to hundredths. In proceeding along the line, a check is made on bench marks previously set by the bench level party. Thus, there is no need for the profile level party to close its levels back; the party is always close to the transit party, where the locating engineer fre- quently needs the information on elevations in planning the position of forward transit stations. In following the dual leveling-party scheme, it is advisable to alternate rodmen every half-day; this practice reduces delays to the profile leveling party in searching for bench marks established by the bench level party. Bench-mark elevations should be adjusted as required by the closing errors. Closures of bench levels should be less than 0.05√M, where M is the distance between bench marks in miles. Another criterion sometimes used is 0.01√S, where S is the total number of set-ups in a closed circuit between bench marks. Bench-mark elevations as determined by the profile level party should be compared with their adjusted values each day. The adjusted elevations should be noted in the field book and used on all subsequent work. 9-8. Topography by Stadia.-The method to be used for taking topography depends on the character of the terrain, the scale of the map, and the selected contour interval. A scale of 1 in. =400 ft, with 10-ft contours, is about the small- 268 RAILROAD SURVEYS est useful combination. A better general combination is 1 in. = 200 ft, with 5-ft contours; a scale of 1 in. = 100 ft, with 5-ft contours, is also popular. Under some circumstances the stadia method of taking topography is the most efficient one. This may be the case in open regions permitting unobscured sights, especially if a wide strip of topography is required. In this method, no station stakes are set between traverse stations, and profile leveling is unnecessary. All field work (except bench leveling) is done by one large party. It is good practice to have a separate computer and field draftsman in the party, in order that the notes may be reduced and plotted as the field work progresses. This method requires skilled personnel and care- ful supervision by the locating engineer. 9-9. Topography by Hand Level.-Wherever a narrow strip of accurate topography is required through a region covered with brush or timber, the "standard" railway-survey- ing method of taking topography with hand level, rod, and tape is almost essential. In this method the topography party is supplied with the ground elevation at each station stake, as determined by the profile leveling. The locations of contours on lines at right angles to the survey center-line are then determined by the following method: A perpendicular to the traverse is first established at each station either by estimation or with the aid of a pocket com- pass, an optical square, or a cross staff. In timber or brush the transverse lines are kept reasonably straight by ranging through with three flags or range poles. The location of the first regular contour on a transverse line is determined by hand leveling from the known ground elevation at the station stake. A forked stick cut for a 5-ft height of eye is a convenient support for the hand level. To illustrate the process, assume that the center-line ground elevation is 673.2 and that the locations of 5-ft contours are required along rising ground to one side of the center line. The levelman, resting the hand level in the fork of the 5-ft stick, directs the rodman out until the hand level reads 3.2 on the rod. This reading locates the 675-ft contour, the distance to which, say 36 ft, is measured with a metallic tape. If notes RAILROAD SURVEYS 269 3 6 are kept (somewhat similar to cross-section leveling, Art. 6-7), the entry is recorded as 575. The levelman then continues out past the rodman until he reads 10.0 on the rod, and the distance beyond the previous point, say 42 ft, is measured. The corresponding entry would be 80. If the distances between contours are too great for hand-level readings, inter- mediate readings are taken at shorter distances by the same step-by-step process until the desired contour is reached. With a The hand-level method is surprisingly accurate. little experience, levels may be carried 400 ft from the center line and checked back with an error of less than 0.5 ft. Since each new cross line starts with a correct center-line elevation, there is no cumulative error. In wooded terrain the speed in taking topography is greater by hand leveling than by any other method giving comparable accuracy. Only a thin gap need be cut through brush. Trees never need be cut, for the tape and sight line may be offset around them by eye without introducing serious error, the scale of the map being considered. In addition to locating contours, the topography party locates all buildings, property lines, highways, streams, rock outcrops, and other physical features likely to affect the loca- tion of the railroad. Though some engineers prefer to record notes of contour locations (supplemented by sketches in the field book), a method which is usually more accurate and much faster is to plot the topography in the field at once on special field sheets. These are usually strips of cross-section drawing paper mounted on a topographer's sketch board about 12″x18″ in size. The sheets are prepared in advance by drawing the survey center-line straight and continuous through traverse stations, provided the angles are small (possibly less than 5º). Where the deflection angles are larger, distortion of the plotted topography is reduced by repeating the traverse station after leaving a 1-inch gap in the center line. A still better method -one that eliminates all distortion at large horizontal angles— is to cut adjoining sheets on the proper bevel through the plotted position of the transit station and mount them on the sketch board so that the center line is an exact reproduction of the traverse line. The lines on the cross-section paper are 270 RAILROAD SURVEYS thus parallel and perpendicular to the center line, thereby being more convenient for plotting in the field. The final step in preparing the field sheets is to record the stations and eleva- tions along one edge. The particular advantage of the preceding method, aside from eliminating voluminous notes, is that contours and all other topographic details are plotted immediately in the field, where the faithfulness of the reproduction is readily apparent. Moreover, field plotting to the scale that is to be used on the subsequent map gives the topographer a clear idea of the degree of precision needed in the field work. He is better able to decide whether cross lines at some stations might logically be omitted, and whether contours along additional lines (such as on lines parallel to the center line or on ridge lines and valley lines making an angle with the center line) are necessary in order to complete the topography of difficult sections. 9-10. Plotting the Preliminary Map.-If the map is to serve most efficiently for paper-location purposes, the con- trol traverse should be plotted by coordinates. The survey should be tied, if convenient, to a State-plane-coordinate system or to some other official system having coordinated monuments; otherwise, an origin of coordinates may be assumed arbitrarily. Stadia topography is plotted in the usual manner by pro- tractor angles and distances scaled from the plotted transit stations. Hand-level topography taken on special field sheets may be transferred to the map by scale or dividers. However, this is a time-consuming method. When the field sheets are to the scale of the preliminary map-a relation strongly recommended-a much better way is to fit each section of field sheet to the corresponding traverse line and to transfer the plotted topography to the map directly through thin carbon paper, using a well-sharpened, very hard pencil or a slightly-rounded stylus. This process is rapid, inexpensive, and accurate; it results in the exact reproduction of the field sheets, free from the possibility of drafting-room errors. RAILROAD SURVEYS 271 9-11. Paper-Location Procedure. The preliminary sur- veys and subsequent office work result in a topographic map of a strip of territory, varying possibly from 400 to 1,000 feet. in width, in which the ultimate location is expected to lie. Finding a satisfactory location having suitable curves. and grades is not usually a difficult task; it is largely a technical process involving patience and quite a bit of routine scaling. and calculation. But finding the best location requires some- thing more than drafting-room technique. As stated in Art. 1–5, “To produce a harmonious balance between curva- ture and grade, and to do it economically, requires that the engineer possess broad experience, mature judgment, and a thorough knowledge of the objectives of the project.” It is obviously impossible to write a set of rules which, if followed, will inevitably produce the best location. The set which follows is merely a suggested office procedure that will be principally of value to the novice; the intangible ingredients, skill and judgment, grow with the locator's experience. (NOTE: In the technique to be described, splines may be substituted for thread and curve templates.) 1. Using the preliminary map, set small pins at the termini and also near the intermediate controls. Stretch a fine thread around the pins. 2. Examine the terrain along the thread line, and set addi- tional pins (angle points) where they apparently are needed between location controls. 3. Scale the elevations at the pins and the distances between them, thus giving the approximate grades. 4. Place transparent circular-curve templates tangent to the thread, allowing enough room between curves for subsequent insertion of spirals. Shift pins and change templates until a trial alignment is obtained which fits the alignment specifications and appears to be reasonable in so far as gradients and probable earthwork quantities are concerned. It may be helpful to use the grade con- tour as a guide (see Art. 11-5). 5. Pencil the trial alignment lightly but precisely, and station it continuously along the tangents and curves by stepping around it with dividers. 272 RAILROAD SURVEYS 6. Plot the ground profile of the trial alignment to an exaggerated vertical scale. 7. Using pins and thread, establish a tentative grade line on the profile which fits the specifications for grades and appears to produce a reasonable balance of earth- work. The circular-curve templates may be used for vertical curves. In estimating earthwork balance from center cuts and fills, make approximate allowance for the fact that the graded roadbed is wider in cuts than on fills and that a certain percentage will be added to the fill quantities for shrinkage (see Art. 6-14). 8. Examine the trial alignment and grade line together. Go over the alignment station by station, visualizing the finished roadbed if built -as- indicated. The need for drainage structures and the probable maintenance diffi- culties dealing with drainage, slides, and snow drifting should be examined. Then make whatever changes will obviously improve operating and maintenance character- istics without changing earthwork quantities appreciably. 9. Make an earthwork estimate, using the following column headings: Cubic Yards Cut Fill+*% (*Insert suitable shrinkage factor-possibly from 10 to 15% for purposes of estimate) Station Center Height In the station column, enter in proper order each 100-ft station, the station and plus of each high or low point, and the station and plus of each grade point. Scale center heights from the profile at positions midway between the points entered in the station column; designate the values C or F. Take earthwork quantities from the proper table of level sections (Table XVII, Part III). Do not forget to reduce tabulated quantities for fractional distances or to add the shrinkage percentage to the fill quantities. 10. Enter the sub-totals for each increment of cut and fill. If conditions appear to warrant striving for an approxi- mate balance of quantities along certain grading sec- RAILROAD SURVEYS 273 tions, see how close the balance comes. Observe also the relative sizes of adjoining cuts and fills and the approximate distances between their centers of gravity. For convenience, note these numerical values on the profile. 11. Re-examine the tentative alignment and grade line in the light of the numerical values obtained in the first earthwork estimate. Make any minor changes in the alignment or the grade line, or both, which will reduce the pay quantities and improve the balance and distribu- tion of earthwork. Do not erase the first trial; merely use a different style of line for the revised portions. Scale new center heights along the revised portions and deter- mine the new quantities. Preserve all discarded tabula- tions, but identify them and mark them "void." 12. Repeat step 11 until the location appears to be the best one possible. The paper location finally established by the foregoing process should not be accepted rigidly as final; the remarks contained in Arts. 1-11 and 1-12 are pertinent in this respect. Though the earthwork estimate is based upon level sections, the errors introduced by transverse slopes tend to cancel. In a long line, level-section quantities will usually be within 5 per cent of the true values found later by cross-sectioning. 9-12. The Location Survey. The principal purpose of the location survey is to transfer the paper location, called the "L-line," to the ground. This may be done quite accurately if the preliminary map is based upon a transit-tape traverse plotted by coordinates. The first step is to scale the coordinates of the P.I.'s of the L-line and from them to compute the bearings of the tangents and the distances between P.I.'s. If the map is carefully drawn to a scale of 1 in. = 100 ft, these computed bearings and lengths are usually reliable to the nearest minute and foot. The bearings and lengths are useful not only in making ties to the P-line but also in checking the location field work. The L-line should never be run by turning the calculated angles and measuring the calculated distances continuously from beginning to end. Instead, each L-line tangent should 274 RAILROAD SURVEYS be tied independently to the P-line and run to a string inter- section with the adjacent L-line tangent, at which point the exact central angle of the curve is then measured. An excellent tie exists wherever an L-line tangent crosses the P-line. The P-line stationing of the cross- ing can be scaled close enough for the purpose if the angle of intersection is large; otherwise, it may be computed by coordinates. A hub at the intersection is then located by sighting and meas- uring from the most convenient P-line hub, after which the L-line tangent is projected in both directions by setting up at the intersection hub and turning off the calculated angle. E ()) (6) L-line tangents may sometimes be tied to the P-line by right-angle offsets. Another method is to produce a P-line course for a scaled or cal- culated distance to an intersection with the L-line. Considerable ingenuity and field experi- ence are needed in establishing ties rapidly and accurately. © Great care should be taken to insure the straightness of the L-line tangents. The lines should always be produced forward through P.O.T.'s by double centering. Obstacles on the tangents may be by-passed by the method described in Art. 9-13. | D ( @ & C B (2) After the P.I.'s have been located and the central angles have been measured, the curves and spirals are run in as described in Part I. Stationing is continuous along the tangents and curves. Some minor adjustments in alignment are usually made during or following the staking A of the curves (see Art. 1-12). These adjust- ments may involve some of the special curve | problems described in Chapter 7. It is a good plan to run profile levels over the staked L-line in order to compare the actual ground profile with the paper-location ground profile. The degree of "fit" is a measure of the accuracy of the topog- raphy. Fig. 9-2 RAILROAD SURVEYS 275 If it is suspected that the earthwork estimate may be in error, owing possibly to the prevalence of side-hill sections, the line may be cross-sectioned by the slope-staking method described in Art. 6-7. The more accurate earthwork quanti- ties may then justify some slight revisions in the grade line without necessarily changing the alignment. Further analysis of the earthwork distribution may be made by means of a mass diagram (see Art. 6-19). The location survey also includes ties to property lines and existing improvements, as well as a variety of measure- ments needed for the design of miscellaneous structures. 9-13. By-Passing Obstacles on Tangents.-Where location tangents (or other straight survey lines) are produced through woods, large trees often obstruct the line. To avoid felling them without authorization, and also to save time, the best recourse is to by-pass them by a small-angle deflection-angle traverse. Sta. Defl. Fig. 9-2 and the accompanying notes illustrate the process. Point A is a transit station (P.O.T.) on the location tangent. It is assumed that large trees obstruct the line beyond A. Consequently, a small deflection angle is turned to the right Notes for Fig. 9–2 A B C Ꭰ E Tang. 35' R 42' L 30' L 20' R 17' R Angle with Tangent 35' R 640 7' L 37' L Dist. zero 400 420 17' L 238.82 Products Angle X Dist. +22,400 -2,800 -15,540 -4,060 Alg. Sum zero Offset from Tangent zero +22,400 6.5 R +19,600 5.7 R +4,060 1.2 R zero 276 RAILROAD SURVEYS and a hub B is set at any convenient distance. At B it does not prove possible to get back on the tangent; therefore, the auxiliary traverse is continued through convenient openings between the trees until point D is reached, after which the tangent is resumed at E. It is convenient to adopt a systematic form of notes which will indicate the distance from the tangent as well as the measurements needed to get back on line. In the form sug- gested, for example, the algebraic sum of the products of distances and angles in minutes must be zero up to a point on the tangent. Moreover, since the reciprocal of the sine of 1 minute is 3,440, the offset at any point is found by dividing the proper algebraic sum by that constant. The sign of any product is determined by the angle that the course makes with the tangent. An angle to the right gives a plus product; one to the left, minus. In the example given, it is assumed that a deflection angle of 20′ R at D is a convenient direction toward the tangent. The required distance to a P.O.T. at E is, therefore, 4,060÷17 =238.82 ft. At E the deflection required to place the line of sight on the correct tangent produced is obviously 17′ R. If the angle between any auxiliary course and the tangent is kept below 1 or 2 degrees, a negligible error results from assuming that the length along the auxiliary traverse is the same as the distance along the tangent. In the foregoing example the true tangent distance between A and E is only 0.06 ft shorter than the traverse distance of 1,698.82 ft. This small correction is found quickly by slide rule, if required, by summing the products of the distances and the versines of the angles with the tangent. It is not usual to move station stakes back on the correct tangent. However, if required, it may be done by eye with the aid of the offsets in the last column of the notes. 9-14. Construction Surveys.-It is not considered necessary in a book of this kind to give detailed examples of the great variety of measurements required on railroad construction. These are best covered by reference to instructions and forms supplied by railroads to their resident engineers. Briefly, RAILROAD SURVEYS 277 the principal survey work related to new construction includes the following operations: 1. Re-Establishing the Final Location Checking and referencing key points, such as P.I.'s, T.S.'s, S.T.'s, and occasional intermediate points on long tangents, so that they are quickly available during construction. Resetting enough station stakes on curves to control clearing of the right-of-way. Checking the bench-mark elevations and setting con- venient new bench marks in locations in which they are not likely to be disturbed during construction. 2. Setting Construction Stakes Cross-sectioning the line after clearing (and just ahead of grading operations), together with setting slope stakes wherever needed. Line and grade stakes (and in some cases, batter boards) for appurtenant structures, such as buildings, bridge piers, culverts, and trestles. Finishing stakes for completing cuts and fills to exact grade; center stakes for track laying; grade stakes for ballast and final rail profile. Stakes for borrow pits; also cross-sectioning borrow pits after stripping. Stakes for right-of-way fences. 3. Making Periodic Quantity Measurements Measurements, calculations, and estimates of work done to serve as basis of monthly payments to contractor, as well as for progress reports to headquarters. 4. Final Measurements Final cross-sections for calculation of total grading pay quantities. "As-built" measurements of all work to serve as basis for final payment, as well as for preparation of "record" plans. Monumenting curve points. 278 RAILROAD SURVEYS 5. Property Surveys Making all measurements needed for preparing legal descriptions of easements and of land acquired by pur- chase or through condemnation proceedings. Setting right-of-way monuments. 9-15. Superelevation. Fundamentally, superelevation. theory is the same on railways as on highways. Fig. 8-2 and the equations developed in Art. 8-6 are valid for both types of operation. The equilibrium formula for superelevation of railroad track* is E=0.0007 V2D (9-1) in which E is the superelevation, in inches, of the outer rail. This relation corresponds to formula 8-8, and is found by substituting E÷59.5 for e. ("Standard gage" of track is 4 ft 8 inches, but E is measured with respect to center to center of rails, i.e., 4 ft 11½ inches.) According to the A.R.E.A. Manual: "If it were possible to operate all classes of traffic at the same speed on a curve, the ideal condition for smooth riding and minimum rail wear would be obtained by elevating for equilibrium. However, curved track must handle several classes of traffic operating at various speeds, which results in slow trains causing excessive wear on the inside rail and high-speed trains causing accelerated wear on the outside rail. "Safety and comfort limit the speed with which a passenger train. may negotiate a curve. Any speed which gives comfortable riding on a curve is well within the limits of safety. Experience has shown that the conventional baggage cars, passenger coaches, diners, and Pullman cars will ride comfortably around a curve at a speed which will require an elevation about 3 inches higher for equilibrium. Equipment designed with large center bearings, roll stabilizers, and outboard swing hangers can negotiate curves comfortably at greater than 3 inches unbalanced elevation because there is less car body roll. It is suggested that where complete passenger trains are equipped with cars utilizing the foregoing refinements that a lean test be made on the equipment to determine the amount of body roll. If the roll angle is less than 1°30', experiments indicate that cars can negotiate curves comfortably at 44 inches unbalanced elevation. "The inner rail should preferably be maintained at grade." *1956 Manual, American Railway Engineering Association. 279 E TABLE 9-1 EQUILIBRIUM ELEVATION FOR VARIOUS SPEEDS ON CURVES V=Speed, mph Degree 10 20 30 60 65 0.71 1.06 1.26 1.48 0.87 1.42 2.12 2.52 2.96 1.29 2.13 2.63 3.18 3.78 4.44 3.50 4.24 5.04 5.92 of Curve De 35 0°30' 0.04 0.14 0.32 0.43 1°00' 0.07 0.28 0.63 1°30' 0.11 0.42 0.95 2°00' 0.14 0.56 1.26 2°30' 0.18 0.70 1.58 3°00' 0.21 0.84 1.89 3°30' 0.25 0.98 2.21 4°00' 0.28 1.12 2.52 5°00' 0.35 | 1.40 3.15 6°00' 0.42 1.68 3.78 7°00′ 0.49 1.96 4.41 8°00' 0.56 2.24 5.04 9°00' 0.63 2.52 | 5.67 10°00′ 0.70 2.80 6.30 11°00′ | 0.77 3.08 6.93 9.43 12°00' 0.84 | 3.36 1.72 2.84 2.14 2.80 3.54 4.38 5.29 6.30 7.39 2.57 3.36 4.25 5.25 6.35 7.56 8.87 3.00 3.92 4.96 6.13 7.41 8.82 10.35 4.48 5.67 7.00 8.47 10.08 10.59 3.43 4.29 5.60 7.09 8.75 5.15 6.72 8.51 10.50 6.00 7.84 9.92 6.86 8.96 11.34 7.72 10.08 8.58 11.20 7.56 10.29 40 0.56 1.12 1.68 2.24 45 50 0.88 1.75 55 70 75 80 1.72 1.97 2.24 2.53 3.43 3.94 4.48 5.06 5.15 5.91 6.72 7.59 6.86 7.88 8.96 10.12 11.34 8.58 9.84 11.20 10.29 11.81 85 E, in inches =0.0007 V2D 90 95 100 2.84 3.16 3.50 5.67 6.32 7.00 8.51 9.48 10.50 12.46 280 RAILROAD SURVEYS Using these recommendations, the A.R.E.A. formula for superelevation based on maximum speed becomes E=0.0007 (max. V)² D-3 Formula 9-2 is analogous to equation 8-11. Table 9-1 gives the equilibrium elevation E for various values of Dc. The 5-mph increments represent general prac- tice for use on speed-limit signs. 9-16. Spirals.-In contrast to the situation with regard to the use of spirals on highways (Art. 8-13), spirals have been used on railroad track since about 1880. (A concise history of the use of spirals is given in Proceedings, A.R.E.A., Vol. 40, 1939, pp. 172–174.) (9-2) As a result of long years of experience in operating over spiraled superelevated curves, American railroads almost in- variably base minimum spiral length upon the rate of rota- tional change. For many years it has been the recommenda- tion of the A.R.E.A. that spiral length be based upon attain- ing superelevation across standard-gage track at a desirable maximum rate of 1.25 inches per second when trains are operated at maximum speed. or In a committee report* on "Spirals Required for High Speed. Operation," it was found that some American railroads operat- ing high-speed passenger trains used values higher than 1.25 inches per second, and other railroads used lower values. However, this value was substantially verified by modern practice, and it was concluded that there should be no change in the recommendation. (This report also contains an inter- esting tabulation of spiral practice on European high-speed. lines.) Based upon attaining superelevation at a rate of 1.25 inches per second, the equation for desirable minimum spiral length is Ls=1.17 EV Un L= && EV 88 75 *Proceedings, A.R.E.A., Vol. 39, 1938, pp. 497-507. (9-3) RAILROAD SURVEYS 281 where V is the maximum train speed in mph. This equation is the same as 8-19, except for different notation. As in the case of highways, the superelevation is run out uniformly over the spiral. The slight vertical curves in the outer rail at the beginning and end of the spiral are taken care of automatically by the flexibility of the rail. Track spirals are staked either by deflection angles or by offsets. The basic theory is fully covered in Chapter 5. Art. 5-15 contains practical suggestions for applying the offset methods. 9–17. String Lining.-In spite of ballast and rail braces, tracks on curves tend to creep slowly out of line. This creep- ing is due principally to the unbalanced lateral forces caused by operation at other than equilibrium speed. Other con- tributing factors are rapid deceleration during emergency stops and, possibly, temperature expansion and contraction. Track once irregularly out of line becomes progressively worse, owing to the variable impact produced by moving trains. The trend toward higher train speeds in both freight and passenger operation makes it more important than ever to maintain curved track continuously in good alignment. This can be done either by the deflection-angle method or by string lining. The latter method has so many obvious advantages that it is rapidly superseding the former method. Briefly, string lining consists in shifting the track in or out along the circular curve until equal middle ordinates are obtained at equal chords. Theoretically, the chord used may be of any length; but to obtain good control on main-line track it should be between 50 and 80 feet. Many engineers use a 62-ft chord. This is the value recommended by the A.R.E.A.; it is a convenient length, and also produces the useful relation that the degree of curve is numerically equal to the middle ordinate in inches (see equation 2–31). Equipment consists simply of a tape, a strong fish line or a fine wire, and a scale for measuring the middle ordinates. Some engineers use wooden or metal templates which are held against the rail head; the string passes through holes or slots a fixed distance from the rail. With such devices, it is neces- 282 RAILROAD SURVEYS sary to deduct the fixed distance from the measured middle ordinates, or to use a special scale with an offset zero point. The procedure involves (1) preliminary field work, (2) calculation, and (3) track shifting in accordance with the approved calculations. Preliminary field work 1. Locate the T.C. by sighting along the gage side of the outer rail. Make a keel mark on the inside of the rail head at this point and mark it sta. O on the web. 1 a O -1 2e_original Revised -C d Fig. 9-3 2. Mark sta. -1 similarly, 31 feet back from sta. O on the tangent. Then mark stations, 1, 2, 3, etc. at 31-ft intervals along the outer rail until the last station is beyond the end of the curve. 3. Stretch the line taut between the keel marks at stations -1 and 1. Measure and record the middle ordinate at sta. 0. In similar manner, stretch the cord between RAILROAD SURVEYS 283 stations 0 and 2 and measure the middle ordinate at sta. 1. Continue this process until the middle ordinates become zero. Calculation is based upon four simple rules. The first comes from the fact that the middle ordinate m is proportional to D. 100 I Since D=- it follows that Em ∞ I. This relation may 1 L be expressed by the following rule: Rule 1. For any chord length the sum of the middle ordinates on a curve between given tangents is constant. The other rules come from Fig. 9-3, in which the solid line represents the outer rail of curved track badly out of line, and the dotted line shows the correct position. (The scale is greatly exaggerated in order to make the relations clear.) The offset distance between the original and final positions of the track at any station is called the throw. Track moved outward in revising its position is given a positive throw; for track moved inward, the throw is negative. Thus, the throw at sta. 1 is negative and is numerically equal to the distance ab. The error at any station is found from the following relation: error=original middle ordinate minus revised. middle ordinate (algebraically). In the sketch the error at sta. 1 is ac-bd. It is obvious that the first throw will occur at sta. 1. Since the middle ordinates at successive stations are practically parallel, the throw at sta. 1 is twice the error at sta. 0; both have negative signs. This relation may be expressed by the following rule: Rule 2. At the first station at which a throw occurs, the half-throw (½ t) equals the error at the preceding station. The throw at sta. 2 is ef (negative sign); and for all practical purposes ef=twice cd. The length cd may be written in the following form: -cd=(−1 ab)+(−1 ab)+[(ab+bc)—bd] (1) (2) (3) (4) 284 RAILROAD SURVEYS Term (1) is the half-throw at sta. 2. Term (2) is the half-throw at sta. 1. Term (3) is the error at sta. 0. Term (4) is the error at sta. 1. From the foregoing relation, the following rule may be stated: Middle Ordinates, in. Rule 3. The half-throw at any station equals the half- throw at the preceding station plus the algebraic sum of the errors up to and including the preceding station. 5 10 Original Trial 3 15 20 Stations at 31-ft intervals Fig. 9–4 25 30 35 In solving a string-lining problem, it is helpful to plot a graph of the measured middle ordinates. Fig. 9-4 shows such a graph for a spiraled curve very badly out of line. The curve is too flat near sta. 13 and too sharp near sta. 22. The original middle ordinates were measured to tenths of inches at stations 31 feet apart; their values (with the decimal point omitted for simplicity) are given in Table 9-2, col. (2). For perfect alignment the middle ordinates on the circular curve must be constant, and those on the spirals must change uniformly. Moreover, the half-throw at the final station must be zero; otherwise, the forward tangent will be shifted parallel to itself by an amount equal to the full throw. Trial 1 is shown in Table 9-2; it approximates trial 3, shown in Fig. 9-4. The middle ordinate for a 4.4° curve between stations 7 and 28 was assumed to be the average of the exist- ing middle ordinates on the circular arc. Col. (3) contains the revised middle ordinates. The middle ordinates on the spirals were adjusted so that the sum of the RAILROAD SURVEYS 285 Station (1). 101234B ONATO IN? 5 10 11 Original ԱՆ 18 (2) 0 4 14 6 41 ** 27828 FORD FOREBBE #99 88*‡‡ ;*#* 16 29 36 40 48 40 12 40 13 36 14 38 15 41 47 16 42 44 23 25 -2 19 46 20 46 21 50 47 Revised U 42 STRING-LINING CALCULATIONS (3) 43 (4) 0 0 0 6-2 12 +2 19-34 Error TRIAL 1 31 +5 44 +3 44 26 40 44 22 50 44 +6 23 48 24 44 44 25 41 44 44-2-21 17 44 44 0 -21 *#*#*2 ROS +5← 38 +3 +3 44-4 - 1 44 +6 44 44 44 44 +4 +3 44 +4 TABLE 9-2 31 24 32 15 33 14 34 9 35 0 Sum 1231 1231 Sum of Errors 44-4 +2 44 4 -2 44-8-10 44 -6 -16 44-3 -19 66403 +2 C 44+2-19 442-17 -3 | | │ (5) (6) 0 38+5 30 34 32+2 25-1 19 12+2 6 +3 0 0 2 LO +++ 0 31∞ ∞ ∞ +6 +6 Half- Throw - C 44 +3-14-116 -2 M G B 0 0 2 2250 -5 1++++ 10 -10 -7 -8 -5 00 LO +1 +7 +9 +7 -3 -19 -5-137 -7-142 -7-149 -156 0-158 -1-158 Revised 4 -5 -159 -3-164 0 -167 0-167 W (7) TRIAL 2 Error 5-1 11 +3 18-2 24-1 44 44 44 44 (8) 0 0 44-4 1 11 -8-130 -2-138 44 +6 +2-140 +2-138 -136 -38 -59 -80 -99 44 +2-11 30+6+5 +9 +5 +5+14 +9+19 44 +3 +12+28 37 +4 44-4 44 +4 44 0+12 +40 +8+52 -8 4 +4+60 -4+64 ·6-10 +60 -13+50 G Sum of Errors 44-2 44 0 44 +2 13 (9) 44 -3 0 0 -1. I+A!++++ 44 44 44 0 O 44 +6 -2 26-2 21-6 12 +2 7 +2 0 1231 44 +4 +8 44 44 +3 -8-17 -25 +4-27 15 +37 15 +22 1+++++11 +++i 114 2 +5 39 +4 +3 33 +1 +4 1 Half- Throw L (10) 0 +2 S +8-15 +7 -6 -23 1111 2123− +CONO -3 +4 +++ -4 +6 -2 +2 0 0 0 0 286 TABLE 9-2-(Continued) Station (11) -1 0 HORED ONOG IS 1 2 3 4 6 8 10 11 7-3 13+1 18 24-1 30+6+1 35 +6 41-1 +7-13 +6 -6 44 +4 +10 9 44 +3 +13 | +10 44 +13 +23 97022 22*** ***** ** Revised 21 น 23 12 44 24 25 26 13 44 14 44 15 44 16 TRIAL 3 (12) | (13) 0 0 0 0 Error P 44-4 111 -4 1 S RAILROAD SURVEYS Sum of Errors +9+36 44 44 +5 +45 -3 +50 -9+47 -12 +38 -14+26 0-14+12 44 +2 -12 -10-14 -7-24 -2 44 +2 44 +3 44 +6 -1-31 +6 44 44 +4 44 44 44-2 44 40 +3 35-1 (14) C 26-2 18-3 33 12+2 34 8+ 35 0 Sum 1231 2 L - +9 44-3 +6 420 1500U NOOMN O 12 4 Half- Throw +2 ++ (15) +5-32 +9-27 +3 0 0 Sign 14 - -18 -9 ++++ 13 +2 +2 +4 +4 0 Sta. Revision-Trial 1 to 2 1267 Sta. 1234 LO CO Sum 29 30 31 Sum Net 32 33 34 Sum Change in m ++11 +2 +2 22NO -2 1 3 -1 +1+1++ 123-d Change in 772 29 30 +2 32 34 -3 +1 Sum +1 Net 0 M Mapa M 1 pomoć przed pred -6 7777 717 +1 +1 Revision-Trial 2 to 3 +1 +2 0 +6 A 0 35 Change in tat sta. 35 -6 -10 +9 +34 +33 -8 0 +32 +31 +30 +29 +189 111 COLÓ H CO - -6 Magda Change int at sta. 13 4 -22 +167 -68 -24 42 -66 -22 -40 +58 +14 +32 +84 +18 +45 +8 -14 -5 22 < RAILROAD SURVEYS 287 revised middle ordinates is equal to the original sum. Rule 1 requires this relation. The errors and their algebraic sums were next calculated; the arithmetic was automatically checked by the zero value at the foot of col. (5). Then the half-throws were calculated from Rules 2 and 3 and entered in col. (6). Arrows indicate the additions. Up to about sta. 17, it appeared that a fairly close solution might be found on the first trial. After that, however, the half-throws became excessive. Instead of starting over when this happens, it is a good plan to continue col. (6) to completion; otherwise, a large number of trials might have to be made before finding a solution giving zero half-throw at the final station. In the illustrative example the result of the first trial was modified by a method which guarantees a check on the second trial. The method is based upon the following rule: Rule 4. The effect upon the half-throw at any station caused by a change in middle ordinate at any preceding station equals the product of the change in middle ordinate and the difference in stationing; the sign of the product is opposite to the sign of the change in the middle ordinate. The modification of trial 1 is shown at the top of the page to the right of trial 3. It should be observed that the small changes were made entirely on the spirals. The middle ordinates were adjusted in such a way as to make their net change zero (Rule 1) and at the same time to produce the required change of +167 units in the half-throw at sta. 35. The resulting half-throws are given in col. (10). Trial 2 might be considered an acceptable solution, pro- vided that there are no objects which might interfere with the fairly large throws between stations 10 and 15. There are any number of solutions which will give zero throw at the end of the curve. The best solution is the one having the smallest intermediate throws, consistent with specified clearances and smooth curvature. Trial 3 shows a second solution to the illustrative example. In revising trial 2, an attempt was made to decrease the throws near sta. 13 without increasing those near sta. 22 too 288 RAILROAD SURVEYS much. The tabulation at the bottom of the page to the right of trial 3 shows how this was done and the zero throw at the end checked before the detailed calculations for trial 3 were performed. The resulting half-throws are given in col. (15). By using trial 3 instead of trial 2, the full throw is reduced from a maximum of 12.8 inches to 10.0 inches. It is possible to obtain further improvement in this example by continuing the foregoing process, especially if the middle ordinates are expressed to the nearest 0.05 inch. (This is suggested as a profitable exercise for the student.) String-lining problems are more complicated if it is neces- sary to hold the track fixed at certain points, such as at frogs, bridges, or station platforms. In such cases, zero throws are entered at the proper stations and the middle ordinates are adjusted so as to produce the required result. Numerous restrictions on throws make it difficult to obtain perfectly smooth track. Track shifting in conformity with the throws finally approved is controlled by setting suitable line (and, possibly, grade) stakes. Stout tacked line stakes are driven between the ties opposite each station, or as close thereto as permitted by the position of the ties. On double-track roadbeds, stakes are eliminated by setting tacks on the ties of the parallel track. Some engineers prefer to set the line stakes on the revised center line. Track in the shifted position is then checked by means of the usual track gage. Instead of being centered, the line stakes may be set level with the base of the rail at a distance such that, when the track is shifted, the base of the rail will be a constant distance, e.g., 1 foot, from the tack. On a curve requiring large throws, it may also be necessary to set grade stakes for adjusting the rails to proper superelevation. Track shifting was formerly done by moving track and ties with the aid of lining bars. Lining and ballasting about 300 feet of main track was a normal day's work for a 10-man section gang. Since about 1956, specially-designed machines permit the same-sized gang to surface at least ten times as much track per day. RAILROAD SURVEYS 289 A A' A 9-18. Spiraling Existing Curves. In earlier years of railway surveying a variety of track realignment problems arose in connection with spiraling existing track originally laid out as simple curves. Since such problems are much less common now, only one typical case will be illustrated. EE+O |OFF + 02 S.C. E ·R₁-R₂ +EE' Fig. 9-5. Spiraling an existing curve 1 1 P.1. Fig. 9-5 shows half of an existing circular curve, AE. It is necessary to introduce spirals in such a way as to minimize shifting of the track and at the same time to keep the new and old track lengths practically the same. So doing facili- tates shifting the track to its new position. The spiraled half-curve is shown at A'E'. The throw EE' at the center of the curve is usually restricted to a maximum value of 10 to 12 inches. Obviously, the new simple curve, with radius R2, must be somewhat sharper than the original one. The selected value of Ls and the final value of R2 must fit the following relation: (R1-R₂+EE') vers I= EE'+o (9-4) Any number of combinations of R2 and L, may be found. A suggested procedure follows: 1. Select a trial value of D2 slightly greater than the original degree of curve. 290 RAILROAD SURVEYS 2. Select a practical spiral length not less than that required by equation 9-3; and calculate the resulting value of o from the relation 2 Lis or from Tables XI or XII. 24 R2 3. By a trial slide-rule calculation, determine the value of EE' needed to balance equation 9-4. If EE' is greater than the permitted maximum, go through the same process with new values of D2 and Ls properly chosen to bring EE' within the required limit. 4. After satisfactory values of D2 and L, have been obtained, calculate the difference in length between the original and revised alignments. This difference should be figured between points common to both layouts, namely, the T.S. and the S.T. of the new alignment. See Prob. 9-3 for practical examples of the preceding case. In other problems, it may be necessary to hold a certain portion of the circular curve in its original position, such as on a bridge, trestle, or high embankment. In this case, it is necessary to compound the curve with slightly sharper arcs in order to obtain the needed clearance for inserting the spirals. As in the previous case, any number of combina- tions of R2 and L, will fit the conditions. A practical example of this type of problem is given in Prob. 9-4. 3. Crossings 9-19. Track Layouts.-Railway track layouts involving surveying operations in their location are exceedingly com- plex. Included under this heading are: 1. Turnouts (2) Simple split-switch turnouts from straight track (4) Turnouts from curved track (c) Double turnouts, involving three-throw and tandem split switches 2. Crossovers (a) Between parallel straight tracks (see Fig. 9–6) (b) Between parallel curved tracks (a) Straight or curved track (b) Combination crossings, or slip switches RAILROAD SURVEYS 291 4. Connecting tracks from turnout to: (a) Diverging track (b) Another turnout, such as at wye tracks (c) Parallel siding 5. Yard Layouts (a) Complex combinations of the foregoing (b) Various arrangements of ladder tracks Each of these layouts involves a multitude of features, including switches, frogs, guard rails, operating devices, rail braces, and fasteners of various kinds. - One of the layouts most frequently used is a crossover between parallel straight tracks, a simplified diagram of which is shown in Fig. 9-6. S f f Fig. 9-6 f -S S The layout involves two turnouts, each of which includes the two switch rails, the frog, and the sections of curved and straight track shown located between lines s-s and f-f. The crossover tracks are straight between lines f-f, which are located at the heels of the frogs. The best general source of information concerning track details is the portfolio of Trackwork Plans of the A.R.E.A. These have been undergoing extensive revision since 1940. Plans 910-41, and 911-41, covering straight split switches, are given in Table XXV, Part III (the data, occupying two sheets in the A.R.E.A. portfolio, have been rearranged slightly to fit the pages of this book). 292 RAILROAD SURVEYS The sketch on Plan No. 910-41 shows in outline form the principal features of a straight split-switch turnout and crossover. The data given on this plan are used in conjunc- tion with Plan No. 911-41. Corresponding plans covering curved split switches (not included here) are numbers 920–51 and 921-51. The following definitions are taken from the latest A.R.E.A. Manual: Curved Lead-The distance between the actual point of switch and the half-inch point of the frog measured on the outside gage line of the turnout. Frog-A track structure used at the intersection of two running rails to provide support for wheels and passageways for their flanges, thus permitting wheels on either rail to cross the other. Frog Angle-The angle formed by the intersecting gage lines of a frog. Frog Number One-half the cotangent of one-half the frog angle, or the number of units of center line length in which the spread is one unit. Gage (of Track)-The distance between the gage lines, measured at right angles thereto. (The standard gage is 4 ft 8 in.) Guard Rail-A rail or other structure laid parallel with the running rails of a track to prevent wheels from being derailed; or to hold wheels in correct alinement to prevent their flanges from striking the points of turnout or crossing frogs or the points of switches. Lead (Actual)-The length between the actual point of the switch and the half-inch point of the frog measured on the line of the parent track. Stock Rail-A running rail against which the switch rail operates. Stock Rail Bend-The bend or set which must be given the stock rail at the vertex of a switch to allow it to follow the gage line of the turnout. RAILROAD SURVEYS 293 Turnout—An arrangement of a switch and a frog with closure rails, by means of which rolling stock may be diverted from one track to another. Turnout Number-The number corresponding to the frog number of the frog used in the turnout. The values most useful to the surveyor are the frog number and the lead; these determine the distance occupied by the turnout and the angle to whatever connection is to be made. beyond the frog. The field work for ordinary problems, such as locating a turnout from straight track, follows a simple routine: (a) Selecting the position for the frog. (b) Choosing (tentatively) a standard combination of the switch rail and the frog number. (c) Measuring the lead to see where the point of switch comes. (d) Modifying the position of the frog (or changing the frog number) so as to bring the switch point the proper distance from the joints in the stock rails. (Recommended distances are given in Plan No. 911–41.) (e) Setting a tacked hub on the turnout opposite the actual point of frog at a distance equal to half the gage distance from the gage line of the main track. (f) Laying out the turnout with the aid of the dimensions and gage line offsets given in Plan No. 910-41. Data for staking connections to track layouts beyond the frog must be calculated from certain key measurements con- trolling the individual problems. The great variety of such problems precludes their inclusion in this textbook. 9-20. Relocations.-Though the principal trunk railroad lines in the United States that can be justified in the foresee- able future have already been located, relocations are con- tinually being made in order to bring sub-standard sections of line into conformity with modern requirements. A typical relocation problem takes the form of flattening a single sharp curve formerly requiring operation under a slow order. If economic considerations do not eventually force 294 RAILROAD SURVEYS the relocation, a serious wreck of a fast passenger train usually does. The elimination (in 1947) of the "Gulf curve" at Little Falls, N. Y.,* is an example. Major relocations are invariably made for economic reasons. The changes include (either separately or in combination) reduction in distance, in grade, or in rate of curvature. The objectives generally sought are: (1) increased speed, in order to reduce running time; (2) greater riding comfort for passengers; (3) operating savings; (4) increased train tonnage, either as a result of grade reduction or from conservation of momentum formerly wasted through braking at the approach to slow-order curves. A complete treatment of the economics of railway location and operation is beyond the scope of a Route Surveying text- book. Excellent analyses of these subjects will be found in Proceedings, A.R.E.A., Vol. 39 (1938), pp. 439-560, and in Proceedings, A.R.E.A., Vol. 45 (1944), pp. 25-44. See also Chapter 16 in the latest A.R.E.A. Manual. Major relocations involve surveying operations fully as complex and interesting as those met in the original location of trunk lines. In view of the existence of thousands of miles of track having curvature and grades which limit economical operation at high speeds, there is every reason to believe that such major relocations will continue to be made for many years. The railroads-stimulated by competition from other forms of transportation, as well as by competition from each other—are apparently aware of the necessity for making many improvements in the alignment of main-line track. References to a few examples of relocation and new location follow (it is suggested that they be made required reading assignments for students): 1. "The Eight-Mile Cascade Tunnel, Great Northern Rail- way," Transactions, ASCE, Vol. 96 (1932), pp. 915–1004. 2. "Two Important Tunnels Built in 1945." (1) The 3,015-Foot Bozeman Pass Tunnel in Montana (Northern Pacific), Railway Age, Vol. 120, No. 19, May 11, 1946, pp. 952–955. *Railway Age, Vol. 122, No. 1. Jan. 4, 1947, p. 118. RAILROAD SURVEYS 295 (2) The 2,550-Foot Tennessee Pass Tunnel in Colorado (Denver & Rio Grande Western), Railway Age, Vol. 120, No. 21, May 25, 1946, pp. 1056–1058. 3. "Frisco Line Changes Improve Operation" (12-mile re- location in Missouri, involving grade reduction from 2.3 to 1.27% and curvature reduction amounting to more than 1,046 degrees), Railway Age, Vol. 121, No. 7, Aug. 17, 1946, pp. 281–284. 4. "Rock Island Completes Relocation in Iowa" (about 88 miles of relocation, involving elimination of 1,020 feet of rise and fall, and curvature reduction of 2,900 degrees), Engineering News-Record, Vol. 139, No. 22, Nov. 27, 1947, pp. 726-730. 5. "Grade and Line Revisions Lower Operating Costs on Missouri Pacific" (two relocations involving grade reduc- tion from maximum of 2.45% to 1.25% compensated, distance saving of 3 miles, and curvature reduction of almost 900 degrees), Civil Engineering, March, 1949. 6. "Short-cut Through Missouri" (71-mile relocation on C.B. & Q. reduces Chicago-Kansas City run by 22 miles and passenger schedules by 5 hours. Has high design standards, such as maximum grade of 0.8% and maxi- mum curvature of 1°. Aerial photographs used in planning the location). Engineering New-Record, Vol. 145, No. 19, Nov. 9, 1950, pp. 32–35. 7. "Crews Race to Complete Port, Railroad" (193-mile ore- handling railroad built through rugged terrain in Quebec Province. About half of line is curve track with few curves sharper than 51°. Construction to high standards of curvature and grade required 14 million cu yd of excavation, half of it rock. Extensive use made of aerial photogrammetry). Engineering News-Record, Vol. 165, No. 24, Dec. 15, 1960, pp. 34-40. 8. "New Rails Cross Oregon Trail to Reach Mine" (76-mile railroad spur built in Wyoming to main line criteria. Location surveyed and designed by combining traditional methods with use of aerial photographs and electronic computer). Engineering News-Record, Vol. 166, No. 24, June 15, 1961, pp. 44-46. 296 RAILROAD SURVEYS PROBLEMS 9-1. From the notes for Fig. 9--2 compute: (a) The true tangent distance AE by the most efficient method. (b) The deflection angles at D and E if distance DE were 203 ft. (c) The distance CX and the deflection angle at X if the tangent were resumed at X after deflecting 33′ L at station C. 9-2. Revise the string-lining problem of Art. 9-17 so as to: (a) Obtain equal maximum positive and negative throws. (b) Hold the track fixed at stations 17 and 18. 9-3. In the following cases of Fig. 9-5, verify the given solutions and find another suitable combination of L, and new D. which has a smaller difference in length, yet a throw that does not exceed 10 inches. (a) Given: Existing D.=5°; I=36°28′; Sta. T.C.=179+ 43.27; E=5.75 inches; max. V=50 mph. Solution: New Dc=5°30′; Ls=350 ft; throw EE' =0.36 ft; sta. T.S. 178+ 01.20; revised length 0.45 ft shorter than original. = (b) Given: Existing D.=8°; I = 47°56′; sta. T.C.=74+81.06; E=5 inches; max. V=40 mph. Solution: New D.-8°30′; L=240 ft; throw EE' =0.09 ft; sta. T.S. =73+78.43; revised length 0.50 ft shorter than original. 9-4. Given: An unspiraled curve on existing track; De=3°; I = 27°16′; E = 2.25 inches; sta. T.C. =26+44.82; max. V = 50 mph. The central 200 feet of track is on a bridge. Verify the following solution and find another suitable curve which, when compounded and spiraled with values of Ls closer to their desirable minimum, will not require shifting track on the bridge. Solution: De of first and third arcs =3°10'; L,= 270 ft; unchanged length of 3° curve =210.21 ft; sta. T.S. = 25+28.14; revised length 0.13 ft shorter than original. 9-5. Using the standard dimensions of switch and frog given in Plan No. 910-41, check the tabulated values of lead and crossover distances (columns 4, 23, and 24) for a turnout number specified by the instructor. CHAPTER 10 HIGHWAY SURVEYS 10-1. Foreword. As a separate subject, adequate treat- ment of Highway Surveys would require many pages of detailed description. In this chapter, however, the subject is pre- sented briefly in order to avoid repeating material already covered in previous chapters. One referring directly to this chapter for information about highway surveys should not fail to note the discussion in Chapter 1 of the basic considera- tions affecting route location; the details of curve and earth- work theory given in Chapters 2, 3, 4, 5, and 6; and, in particular, the practical treatment of curve problems in high- way design found in Chapter 8. Much of Chapter 9 (Railroad Surveys) applies equally to highways. Moreover, all applica- tions of aerial photography and automation in Chapters 12 and 13 are to highway location. Purposely omitted are samples of field notes and examples of the various maps and profiles needed for location and con- struction. Typical curve notes are given in Arts. 2-9 and 5-5; notes for cross-sectioning and slope staking, in Art. 6–7. Gen- erally, the best sources of information for practical forms of notes are the instruction manuals issued to their engineers by State highway departments. Highway drawings, especially plan-profile sheets and "vicinity maps" for railroad crossings or bridge sites, suffer so much by reduction to book-page size as to be practically worthless for illustration. For instruction of students, reference to a set of full-scale highway plans (obtainable from most State highway departments) is strongly recommended. Continued improvements in survey methods and in stand- ards of alignment design are due not alone to the progressive policies of numerous State highway departments but also to the activities of certain other organizations. Among these are the Bureau of Public Roads (formerly the Public Roads Administration), whose original research and whose insistence upon high standards of design and construction in administer- ing the provisions of the Federal-Aid Highway Act are per- 297 298 HIGHWAY SURVEYS petual stimuli to progress; the American Association of State Highway Officials, whose close cooperation with the B.P.R. in developing modern "design policies" (Art. 8-1) is only one of its many valuable activities; the American Road Builders' Association (the oldest highway organization in the United States), pre-eminent in highway public relations, early sponsor of improved alignment standards, and recently active in attracting better trained engineering personnel to the highway profession; and the Highway Research Board, whose outstand- ing work in basic highway research-organizing, correlating, disseminating information—has been largely responsible for supplanting rule-of-thumb methods with scientific design. 10-2. The Scope of a Modern Highway Project.-The definition of Route Surveying given in Art. 1-2 suggested the broad economic aspects of the subject. Modern highway planning illustrates the economic relationships particularly well, for in highway construction the taxpayer's dollar is spent, in competition with countless other demands for public services, upon projects which return to him only the intangible benefits of improved transportation. Though many phases of highway planning and design are not properly a part of route surveying, it is felt that an illus- tration of their interrelationship would be valuable—at least to students. For this reason, there is included the following outline taken directly from the Manual for Chiefs of Party issued by the New Jersey State Highway Department. PROCEDURES FOR PLANS PREPARATION FOR STATE HIGHWAY PROJECTS FIRST STEP (Responsibility of Division of Planning and Economics) 1. Prepare brief report on purpose of highway, giving its functions: (a) To serve through traffic (b) To serve local traffic predominantly (c) To develop recreational, industrial, residential and agricultural areas. HIGHWAY SURVEYS 299. 2. Recommend classification of highway: (a) Density of traffic (30th peak hour, 30 years hence) (b) Passenger cars (P), Mixed traffic (M), Trucks (T) (c) Design speed. 3. Recommend type of highway: (a) Two lane (b) Three lane (not normally recommended) (c) Four lane undivided (not normally recommended) (d) Four or more lanes divided (not more than four lanes normally recommended) (e) At grade "land service highway" (f) At grade with major intersections separated (either initially or eventually) (g) Freeway (h) Parkway. 7. Justification: 4. Recommend location of termini. 5. Recommend general area of location and reasons therefor. 6. Preliminary recommendations on traffic Interchange locations. (a) Traffic (b) Economic factors (c) Benefit-cost ratio (d) Priority (e) Place in comprehensive plan. 8. Review of report by Department of Design and Construc- struction. After approval (or modification) of above report by the State Highway Engineer he will transmit to the Chief, Depart- ment of Design and Construction, for progressing Surveys and Plans. (Copies of this report shall be sent to Bureau of Public Roads if participation in financing is expected.) tions. SECOND STEP (Responsibility of Department of Design and Construction) 1. Reconnaissance surveys and proposed typical cross-sec- 300 HIGHWAY SURVEYS 2. After approval by the State Highway Engineer of Item 1, prepare "Hearing Map" precedent to line adoption. After line has been adopted by the State Highway Com- missioner, design shall proceed. 3. Develop typical main roadway cross-sections (including right-of-way width) based on satisfactory maximum roadway capacity for the 30th peak hour, thirty years hence. (In some cases this may be desirable, tolerable, or maximum roadway capacity, in which case it will be the subject of individual decision of the State Highway Engineer with review by the State Highway Com- missioner.) 4. Develop geometric design standards for approved design speed. 5. Field reports on Interchange locations as outlined in Memo of State Highway Engineer dated October 3, 1946, shall be submitted. 6. Detailed traffic and economic data relating to Interchange sites shall be obtained from Planning and Economics and transmitted to field. 7. Preliminary sketch designs of Interchanges based on data included in (6) above shall be submitted by field for approval. 8. Submission of a general plan (generally 1″-200′) and profile showing widths, alignment, grades, and tentative Interchanges to State Highway Engineer for approval. (After approval, prints of this plan shall be submitted to Bureau of Public Roads.) 9. On approval of Interchange sketches and alignment and grades, an accurate layout of Interchange design shall be submitted for approval before being tied down mathe- matically. 10. Submission of proposal for developing order and extent of construction contracts shall be submitted to the State Highway Engineer for approval, plus special or unusual specification provisions. HIGHWAY SURVEYS 301 11. Approval of construction plans and specifications by State Highway Engineer and State Highway Com- missioner. In developing plans it is expected that Planning and Economics and Department of Design and Construction will cooperate closely and draw freely on information and tech- niques each from the other, and that the Maintenance Division and Parkway Engineer will be consulted freely on matters of mutual concern. 10-3. Similarity to Railroad Surveys on New Locations. Surveys for major rural highways on new locations may follow identically the same procedure as those on railroad loca- tion. For this reason, the descriptive material in Arts. 9-2 to 9-14 should also be considered as part of this chapter. The principal differences in highway survey methods are caused by the somewhat greater latitude with respect to pro- file grades and especially by problems of highway interchange design. Generally, these differences require a wider strip of topography than on railroad location. Perhaps this is the reason why aerial survey methods-rarely used by railroads— are supplanting field reconnaissance, and even preliminary surveys, on important new highway location. examples are given in Chapter 12.) (Some Aside from the use of aerial survey methods, the greatest difference in technique on new locations is in the method of cross-sectioning, which is usually done by cross-section level- ing rather than by slope staking (see Art. 6-7). The reason for this is that the exact profile grades are not designed until after the alignment is fixed. The cross-sections, plotted to scale, aid in selecting the grades and in designing drainage facilities. 10-4. Modifications of Railroad Methods on Relocations. Most new highway construction is in the form of improve- ments of existing highways. The changes usually involve widening of pavements, increasing the number of traffic lanes, reduction of grades, and flattening of curves to increase sight distances and safe speeds. Frequently, most of the existing. right-of-way can be utilized, but minor relocations or "cut- 302 HIGHWAY SURVEYS offs" over new right-of-way are often required when sub-stand- ard sections cannot be improved without incurring excessive land damages. A closely related problem is the location of by-passes around congested areas, with the accompanying problems of grade separation and interchange design. Surveys for relocations involve numerous modifications of the usual railroad survey methods. A few of the common modifications are described in the following paragraphs. For one thing, reconnaissance is more localized. The reason is that the need for possible relocation is usually disclosed by accident statistics or by obvious traffic bottle-necks. Recon- naissance is often simplified by reference to the original con- struction plans, to tax maps, and—in increasing instances—to aerial photographs (in New Jersey, for example, photographs are available for the entire State and can be ordered to any scale). Alignment closely approximating the final location can usually be selected from a study of the reconnaissance information. The proposed alignment, complete with curves, is very carefully staked, since it serves as one of the "base lines" for design and construction. In case it is not possible to fix the alignment in advance, the base line may follow the center line of the old road; all drawings and designs are simplified, however, if it follows the center line of the proposed road. In the case of dual highways, it is advisable to use two base lines, one at the crown line (the profile grade line) of each roadway. Additional construction base lines are needed at interchanges; in most cases the center lines of ramps or connections serve best. Ordinarily the alignment is staked at full stations and at. half-stations. Station stakes are centered and tacked; on a pavement each exact point is chiseled or marked by a nail driven through a washer or a square of red cloth. Angles are determined at least to the nearest 30 seconds; distances, to the nearest 0.01 foot. On important surveys through congested areas, temperature corrections are applied to the taped distances, and tape tension is estimated carefully and checked occasionally with a spring balance. Check chaining or calculated traverse closures are required to have a precision of from 1 in 5,000 to 1 in 10,000. HIGHWAY SURVEYS 303 In comparison with surveys for new locations, those for relocations cover a relatively narrow strip of territory. But it is necessary to measure and record many more topographic details. Among these are present paving, curbs, sidewalks, trees, guard rails, drainage structures, fences, walls, property lines, public utilities, buildings, land usage, intersecting high- ways, streams, railroads, and-in general- all features which might affect the grade-line design or which might have to be removed and relocated. Measurements for topography and right-of-way data are customarily made by the transit party and recorded in the field book. Details are tied to the base line by "plus and offset," supplemented by range ties. Intersecting railroads, pole lines, etc. are located by stationing and angle of intersec- tion. Contours are not located in this form of topographic survey. Some highway departments use the "field-sheet" method described in Art. 9-9. Cross-sectioning differs from railroad practice in that the process of cross-section leveling is used instead of slope stak- ing. The usual method is that given in Art. 6-7, though some engineers prefer to run profile levels first and then to do cross- sectioning by recording rod readings as plus or minus from the given center-line elevations. Since no elevations are de- termined in taking topography, the cross-sections must give the needed information concerning elevations of existing curbs, walls, drainage structures, utilities, and building foundations. Other special methods are found in Art. 10–7. Though ground cross-sections are used principally for deter- mining earthwork end areas, they sometimes serve the purpose of plotting contours to assist in the design of ramps and grade separations. 10-5. Soil Surveys.-Comprehensive soil surveys, rarely needed in railroad location, have become standard practice among progressive State highway departments. Such surveys are superseding the former types of soil surveys which were often restricted to borings at bridge sites and cursory examina- tion of the route for surface indications of snow slides or unstable side slopes. 304 HIGHWAY SURVEYS Modern alignment standards often require that routes traverse topographic features formerly avoided; as a result, long heavy fills and deep cuts-sometimes through bedrock- are frequently necessary. Since the cost of a modern high- way may exceed one-half million dollars per mile, possible savings in construction and maintenance costs justify using fairly expensive methods of determining pertinent informa- tion about surface and subsurface soil conditions. Soils investigations for highways continue to grow more comprehensive in scope. This phase of highway engineering requires close cooperation with the soil physicist, the geologist, and even the seismologist. The modern tendency is to go beyond merely making auger borings along the proposed route and classifying the soil samples in the laboratory. Instead, the past geologic history of the area is investigated. From these studies, area soil maps are prepared which show the soil "pattern"—land forms, types of soil deposits, swamp areas, drainage conditions, and related information. A proposed route traversing the region covered by an area soil map is then the subject of a preliminary soil report which shows the rela- tionship of the soils to the engineering considerations of align- ment, grade, drainage, and grading and compaction processes. The availability of materials for borrow, for subbase, or for concrete aggregates is also indicated. The report may suggest alignment changes; it also contains specific recommendations regarding the extent of subsurface exploration needed to answer detailed questions for design and construction. In glaciated regions, erratic depths to bedrock may justify the use of seismic methods of subsurface exploration. Mass- achusetts, for example, has developed a procedure in which a geologic "strip" map is prepared and the locations where seismic studies are recommended, such as at deep cuts and bridge sites, are shown on this map. Seismological field work has been done under a cooperative program of the Mass- achusetts Department of Public Works and the U.S. Geological Survey. Extensive use was made of seismic profiles in obtain- ing quantity estimates on the Massachusetts Turnpike.¹* Seismic methods have become less costly with the develop- ment of a light-weight seismograph, the sound waves for *Superscript numbers refer to the bibliography at the end of this chapter. HIGHWAY SURVEYS 305 which are generated by the impact of a sledge hammer on a metal plate instead of by an explosive charge.2 Complete treatment of the subject of modern highway soil surveys is beyond the scope of a text on Route Surveying. For detailed information, see any modern text on Highway Engineering. Broader aspects of the subject are described in detail in References 3 through 7 in the bibliography. 10–6. Preparation of Plans.-Office procedure in design and preparation of plans for a major highway project involves a multitude of operations. Some of these are quite routine and may be done by the sub-professional members of the surveying crews during rainy weather; others require special- ized training and experience. State highway departments usually follow certain “stand- ards" with regard to methods of design, sizes of drawing sheets, arrangement of work, and forms for estimating quanti- ties. No one scheme is best for all projects; a great deal depends on the size and type of the project and on the per- sonnel available. However, on Federal-Aid projects certain specifications of the B.P.R. relative to size of drawing sheet and form of layout must be followed. The final objective of the office work is to prepare a cost estimate and a complete set of plans showing clearly all in- formation needed (1) by the engineers in laying out the lines and grades to be used by the contractor in building the project, (2) by the contractor in estimating the nature and extent of all work to be performed, in order that he may prepare his bid, and (3) by the legal agents to assist in preparing the right-of- way descriptions and other data connected with land takings and easements. A detailed description of office design methods not only would be too voluminous for inclusion in this book but also would encroach upon subjects more properly treated in a study of highway engineering. Consequently, only an outline of conventional office routine is given to show the relation between survey work and design. Since about 1956, the use of automation in location and design (see Chapter 13) has led to important changes in some of the steps described. Supplied with the reconnaissance report and all the data from the field surveys, the designers carry out these steps: 306 HIGHWAY SURVEYS 1. Design of typical sections: These are dimensioned drawings showing the proposed roadway cross-sections of the standard portions of the project. Shown are width, thick- ness, and crown of pavements; shoulder widths and slopes; positions of ditches, side slopes, curbs, median strips, guard rails, and other construction details. 2. Preparation of location map: Usually done on a series of 22"X36" Federal Aid Sheets, which show the profile as well as the plan. Common scales are 1″-100′ horizontally; 1" 10' vertically. Plan shows survey base lines, topographic details, and all alignment and right-of-way data. Profile (sometimes drawn on separate sheets) shows the ground line, grade line as finally designed, drainage structures, and esti- mated earthwork quantities and balance points. = 3. Plotting of cross-sections: Ground cross-sections, used for earthwork calculation and in grade-line design, are plotted directly from the cross-section leveling notes. A common scale is 1'10'. Scale may be larger when end areas are to be determined by the "strip" method (Art. 6—6); smaller when found by calculating machine (Art. 6–4). 4. Establishing of profile grades: Grade line designed with regard to relative importance of economy of construction, balance of earthwork quantities, property damage, sight distances, safety of operation, drainage and soil conditions, aesthetics, and adaptability to future property development and to future highway or railroad grade separations. Fre- quent reference to plotted ground cross-sections is helpful in design. 5. Drawing of cross-section plans: Proposed roadway cross-sections drawn on ground cross-section sheets in con- formity with the designed profile grades. These sections show the pay lines for excavation. Widening and supereleva- tion are allowed for. 6. Making of special detail drawings: Includes detail draw- ings of all types of drainage structures; of retaining walls, curbs, guard rails, and other appurtenances; and of compli- cated interchanges and intersections. In connection with the latter problems, standards often followed are those given in the AASHO Policy on Geometric Highway Design. HIGHWAY SURVEYS 307 7. Preparation of right-of-way plans: Property maps of all parcels to be acquired or conveyed, showing locations, owners' names, and ties to existing and proposed right-of-ways. 8. Estimate of quantities: Detailed estimate of quantities of grading, paving, and other construction work, prepared systematically with the aid of special "take-off sheets." Summary of results, to serve as basis for engineer's cost esti- mate and to aid contractors in preparing bids. 9. Preparation of specifications: Detailed general and special provisions relating to proposal conditions, submission of bids, prosecution of work, construction details, and methods of measurement and payment. 10-7. Construction Surveys.-Generally, the types of sur- veying operations needed on highway construction are the same as those outlined for railroad construction in Art. 9-14; therefore, the descriptions will not be repeated here. In general, field layout and staking are somewhat more complex in highway work, owing to the multiplicity of lanes and the many ramps and intersections. Staking practices vary with the type of highway, the nature of the terrain, the magnitude and the cuts and fills, and the preferences of the particular organization. In the conventional method, tacked line stakes, marked with station and offset, are set no more than 50 feet apart on offset lines from the construction base lines. Their elevations are determined and recorded for future use in setting grade stakes. After the right-of-way has been cleared, a double line of slope stakes or "rough grading" stakes is set at 50-foot intervals. Finishing stakes are necessary for the final operations of side- slope trimming, subgrade preparation, and setting of forms for paving. After the grading has been completed, "blue-topped" line and grade stakes are set on the subgrade near enough to the work to permit forms to be set truly by means of a short grade board. In mountainous terrain, where grading is very heavy and there are complications in the form of variable slopes and benches, the customary method of setting construction slope stakes is very clumsy. Instead, a "traverse method" may be used to great advantage. Because of its specialized applica- tion, the traverse method will not be described. (See Refer- ence 8 for details). viag 308 HIGHWAY SURVEYS The use of freeway design, in which double roadways are often at different levels separated by a median of varying width, complicates not only the construction staking but also the calculation of grading quantities. Good results can be obtained by substituting a contour grading plan for the usual voluminous set of cross-section sheets. In essence, "contour grading" consists in superimposing contour lines of the pro- posed construction on the existing contour map, thereby form- ing a series of areas bounded by closed contours. The areas are planimetered, and the volumes of the horizontal slices of earthwork are determined by the average-end-area method. This method is subject to further refinement and greater accuracy if partial contour intervals are taken into account. As a result of some time studies, it is estimated that earthwork calculations, together with the drafting and survey operations, can save about 40 per cent in man-hours. Even this saving is small, however, compared with that resulting from the use of electronic computers (see Chapter 13) 9 Warped surfaces at intersections require specially worked out staking arrangements in order to produce smooth riding surfaces. Record plans of all work "as built" are worked up as con- struction proceeds. Since pavement is usually paid for on the basis of surface area, the final measurement of the length of the project is somewhat greater than the horizontal survey measurement. 10-8. Examples of Modern Practice.-Examples of good practice in highway location and interchange design are so numerous as to permit reference to only a few. The following examples illustrate various types of problems: 1. "Difficult Location Problems on 476-Mile Blue Ridge Parkway." (Shows application of railway surveying methods to new highway location in mountainous terrain. Alignment includes spirals and double spirals, eleven tunnels, grade separations, and grade compensation for curvature.) Civil Engineering, Vol. 17, No. 7, July, 1947, pp. 378 ff. 2. "North Santiam Highway Follows Difficult Route Near Cascade Summit." (Costly 15.6-mile Oregon highway in- volves heavy cuts and fills; stability of fills affected by possible HIGHWAY SURVEYS 309 sudden drawdown of flood-control reservoir.) Civil Engineer- ing, Vol. 18, No. 8, August, 1948, pp. 507 ff. 3. "Application of Coordinate Methods to Freeway Plan- ning and Construction." (Describes precise surveying methods used to solve complex design and right-of-way prob- lems on freeway construction in urban areas.) California Highways and Public Works, Nov.-Dec., 1946. 4. "Evolution of the Pennsylvania Superhighway." (Entire issue devoted to the history, financing, design and construc- tion of the nation's first modern toll highway.) Roads and Streets, Vol. 82, No. 10, October, 1939. 5. "New Jersey Turnpike." (A group of articles covering the planning, financing, design, and construction of this 118- mile expressway.) Civil Engineering, Vol. 22, No. 1, January, 1952, pp. 1-69. 6. "New York State Thruway." (A group of articles covering the planning, financing, and design of the first 427- mile section of this modern toll highway.) Civil Engineering, Vol. 23, No. 11, November, 1953, pp. 735–752. 7. "Tough Terrain Conquered by Builders of West Virginia Turnpike." (Describes a difficult location problem in which a modern 88-mile highway, having geometric design standards suited to speeds of 60 mph or higher, replaced a tortuous route 107 miles long that had some grades of 9% and some curves of 50-ft radius.) Civil Engineering, Vol. 24, No. 2, February, 1954, pp. 74–80. 8. "Big Freeway Will Link Los Angeles, San Diego, Mexico." (Describes 165-mile San Diego Freeway being constructed to 8-lane width at an ultimate cost close to one-half billion dollars.) Engineering News-Record, Vol. 161, No. 22, Nov. 27, 1958, pp. 30 ff. 10-9. Use of Aerial Surveys.-It is noteworthy that high- way engineers have been active in adapting aerial surveys to ever-widening fields of usefulness in the planning, location, and design of highways. In fact, the science has progressed to such a point that E. T. Gawkins, commenting upon the results of experience in New York State, wrote:10 310 HIGHWAY SURVEYS aerial surveying . . . will in most cases obviate the need for one or more reconnaissance surveys and all the labor required for pre- liminary estimates of several alternate routes. Once the line has been selected from the use of aerial surveys, field surveying can be reduced to include only those necessary steps such as laying out of base line, setting of stakes, determination of right-of-way limits on the ground, and taking of sections for earthwork estimates prior to the award of the contract-the steps that will always be required for the construction of a highway. The most suitable relationship between ground-survey and aerial-survey methods has yet to be worked out. Possible combinations of these two methods are suggested in Chapter 12. Their relative use is largely an economic question involv- ing the size of the project, the character of the terrain, and the availability of existing photographs to suitable scale. Most of the United States has been photographed from the air at least once. The work has been done by several agencies and for a variety of purposes. Consequently, not all the photographs are suitable for highway-location purposes. Up-to-date information on the existence and nature of avail- able aerial photographs may be obtained from the Map Information Office of the United States Geological Survey. The Bureau of Public Roads lists the six stages of highway location as follows:11 • First Stage-Reconnaissance survey of the entire area between terminal points. Second Stage-Reconnaissance survey of all feasible route bands. Third Stage-Preliminary survey of the best route. Fourth Stage-Location of the highway on the ground. Fifth Stage-Construction of the highway. Sixth Stage-Operation and maintenance of the highway. The earliest use of aerial photography in highway location was as a supplement to the usual ground reconnaissance surveys. Improvements in the art have now enabled photo- grammetry to supplant ground methods for reconnaissance studies of large areas. The first stage, according to present practice, consists of stereoscopic examination of small-scale aerial photographs covering a broad area between the terminal points. Inter- BIBLIOGRAPHY 311 mediate controls related to topography and land-use are disclosed and broadly considered. The result of these studies is the determination of all bands within the area which might contain a feasible location for the highway. In the second stage, large-scale aerial photographs are taken along each of the feasible route bands. The photographs are examined stereoscopically, as before, but their larger scale permits the controls of topography and land-use to be given special scrutiny. All possible route bands are compared, after evaluating the several controls, and the best one is chosen for more-detailed surveys. Thus, the use of aerial photographs in two stages of reconnaissance will have dis- closed the best route without costly ground surveys of several alternate routes. The third stage of location includes the making of a topo- graphic map of the selected route band, and the projection of a geometric location by the familiar paper-location method (see Art. 9-11). As indicated in the quotation on page 310 photogrammetric methods are being used to an increasing degree in studies following reconnaissance, especially in the preparation of topographic maps. A reproduction of an original aerial photograph, and the resulting topographic map, are shown in Fig. 12-3. Fig. 12-4 shows a newer develop- ment-the photo-contour map. The fourth stage will always be done by ground surveying, since aerial methods cannot conceivably be extended to the processes of running in curves or setting stakes for grading and other construction operations. Information of great value in connection with the fifth and sixth stages can also be obtained from aerial photographs. In the over-all problem of route location, both photogram- metric and ground surveying methods will be used. For practical examples of their interrelationships the engineer should study the up-to-date practices described in Chapter 12. BIBLIOGRAPHY 1. Murphy, V.J., "Seismic Profiles Speed Quantity Esti- mates for Massachusetts Turnpike," Civil Engineering, Vol. 26, No. 6, June, 1956, pp. 374-375. 312 BIBLIOGRAPHY 2. Liebenow, W.R., "Subsurface Bedrock Along Highway Route Mapped by Seismograph," Public Works, July, 1960, pp. 111-112. 3. "Highway-Materials Surveys," Bulletin 62, Highway Research Board, 1952. 4. "Mapping and Subsurface Explorations for Engineering Purposes,” Bulletin 65, Highway Research Board, 1952. 5. "Engineering Applications of Soil Surveying and Map- ping," Bulletin 83, Highway Research Board, 1953. 6. "Air Photo and Soil Mapping Methods: Appraisal and Application," Bulletin 180, Highway Research Board, 1958. 7. "Soil and Materials Surveys by Use of Aerial Photo- graphs," Bulletin 213, Highway Research Board, 1959. 8. Construction Manual, State of California, Dept. of Public Works, Div. of Highways. 9. Kane, C.V., "Contour Grading," California Highways and Public Works, Sept.-Oct., 1952, pp. 1-5. 10. Gawkins, E.T., "Aerial Mapping Cuts Cost of Highway Location in New York," Civil Engineering, Vol. 17, No. 2, February, 1947, pp. 80-82. 11. Pryor, W.T., “Photogrammetry as Applied to Highway Engineering," Photogrammetric Engineering, Vol. 17, No. 1, March, 1951, pp. 111-125. CHAPTER 11 SURVEYS FOR OTHER ROUTES 11-1. Foreword.-Reference to the broad definition of transportation stated in Art. 1-2 suggests that the following additional types of transportation may involve surveying operations similar to those already described for railroads and highways: 1. Transportation (transmission) of power and messages by means of overhead tower or pole lines, or by lines in under- ground conduits. 2. Transportation of liquids and gases through closed conduits under pressure, such as pipe lines for water, gasoline, oil, and natural gas; through closed conduits by means of gravity, such as sewers and aqueducts; and through open channels, such as canals and flumes. 3. Transportation of materials (sand, gravel, stone, or selected borrow) to the site of large construction projects, by means of cableways and belt conveyors. Whenever any of the foregoing are projects of considerable magnitude and involve termini a fairly long distance apart, the required surveying operations may properly be included in the term route surveying. Special types of surveys are necessary in the case of tunnel location and construction. These are noted briefly in Art. 11-6. 11-2. Similarity to Railroad and Highway Surveys.-Sur- veys for all routes of transportation and communication are similar in general respects to those described in Chapters 9 and 10 for railroads and highways. This is because all routes have certain location controls (Art. 9-3); in fitting the line to those controls the natural sequence of field and office work approximates that outlined in Art. 1-8. The particular differences that do occur are caused by requirements peculiar to a specific type of route. The engineer acquainted with railroad or highway surveying should have no difficulty in 313 314. SURVEYS FOR OTHER ROUTES adapting his knowledge to surveys for other routes, once the uses to which the surveys are to be put are known. Surveys for some other routes are described briefly in the succeeding articles. 11-3. Transmission-Line Surveys.-The location of a power transmission line is controlled less by topography than is the location of other types of routes. Power loss due to voltage drop is proportional to the length of the conductor; consequently, high-tension transmission lines run as directly as possible from generating station to substation. Changes in direction, where required by intermediate controls, are made at angle towers instead of along curves. A trunk telephone or telegraph line is usually located within the right-of-way of a highway or of a railroad, in which case the curves of the right- of-way must be followed. Unless aerial photographs are used, the field and office work for transmission-line location involves, after a study of avail- able maps, the following operations: 1. Reconnaissance for the location of intermediate features to be avoided, such as buildings, cemeteries, extensive swamps, stands of heavy timber, and particularly valuable improved land; and for the location of intermediate controls fixing points on the line, such as the most advantageous crossings of impor- tant highways, railroads, and streams. 2. A transit-and-tape (or a stadia) traverse. The traverse may be either a preliminary line or the final center line, the selection depending on the difficulty of the problem. In stak- ing the long straight sections between intermediate controls, the deflection-angle method of by-passing obstacles on tan- gents (described in Art. 9–13) is particularly useful. Contours are not located; however, all topographic features and right- of-way data are measured with respect to the traverse, as described in Art. 10–4. 3. Levels sufficient in extent to aid in locating the towers. These may be merely "spot" elevations or those for a complete profile along the traverse line. On final location in difficult terrain, it is advisable to take levels along two lines, one on each side of the center line, in order to obtain proper conductor clearance when spotting the positions of the towers. SURVEYS FOR OTHER ROUTES 315 4. Office studies, including the features common to all route location: drawing of the map, description of right-of-way ease- ments, estimate of quantities and cost, and preparation of specifications. A special problem in transmission-line design is the location of the towers. This location work may be done with the aid of special transparent templates, as described after step 5. X 5. Construction surveys. These are relatively simple on transmission-line construction, since there is practically no grading. Stakes are needed only for clearing the right- of-way and for building tower footings. However, the sur- veyor's assistance is also valuable in planning other details related to construction, such as in spotting cable reels and locating suitable dead-end and pulling points. THETHE Axis Lower -Minimum EMEIFUR EMELEME Sag GREE Conductors Clearance DENEIGENENSI deliam T Fig. 11-1 A convenient method of spotting tower locations on the profile is to use a transparent template, the lower edge of which is cut to the curve (approximately a parabola) that will be taken by the conductor cables. Obviously the curve must be modified to fit the scale of the profile. Two other curves are inscribed on the template parallel to the curve of the lower edge. The axial distance from the lower edge to the middle curve equals the maximum cable sag for a par- ticular span; that from the middle curve to the upper curve equals the specified minimum ground clearance. The template is used as shown in Fig. 11-1. First a point X is located at a suitable position for a tower; then the lower edge of the template is placed on this point and the template is moved until the middle curve touches the ground 316 SURVEYS FOR OTHER ROUTES line. The other point Y at which the lower edge of the tem- plate intersects the ground line is the possible location of the next tower. One template fits a considerable range of spans with sufficient accuracy. After the towers at certain controlling points have been located, the location of the intermediate towers is a matter of cut and try; the object is to cover the greatest length of line with the least number of towers. On important new transmission-line work, aerial photo- graphs are now commonly used, at least for reconnaissance, and they are sometimes used for all phases of the survey work except final staking. The growing file of available aerial photographs (Art. 10-9) often makes this method feasible where it was formerly prevented by economic considerations. 11-4. Surveys for Pressure Pipe Lines and Underground Conduits. Surveys for the location of long pressure pipe lines are almost as simple as those for transmission lines. In fact, the descriptions contained in steps 1 and 2 in Art. 11-3 apply also to pipe-line surveys. However, since pressure pipe lines are usually located underground, greater attention is paid to foundation conditions and especially to avoiding costly rock excavation and frequent stream crossings. Acces- sibility to power for operating booster pumping stations is also an important intermediate control. Grades and undulations in the profile are relatively unim- portant, especially on small-diameter steel pipe lines; conse- quently, detailed profile levels may be omitted and replaced by spot elevations at proposed pumping stations and at the high and low points along the line. HAR On construction, line stakes are more important than grade stakes. In fact, grade stakes for steel pipe lines may be needed only at pumping stations and at crossings of high- ways, railroads, and streams. Along intervening sections, at least in easy terrain, several sections of pipe are welded together on the ground before being laid in the relatively uni- form trench dug by the trenching machine. Large reinforced-concrete pipe lines require much more careful attention to undulations in the profile, since there is a SURVEYS FOR OTHER ROUTES 317 practical limit to the change in direction possible at each joint, and beyond that limit special pipe sections are necessary. As in the case of transmission lines, right-of-way for a pressure pipe line usually takes the form of easements for its construction and operation. Aerial surveys are particularly useful in the location of long pipe lines. Only mosaics are used, since contours are not essential. As a rule, a stereoscopic study of the photographs will give enough information for the preliminary location. After this the line may be "walked over" prior to deciding upon the final location. It is possible, however, to rely upon aerial photographs to an even greater extent.¹,2 * For example, in building one of the longest pipe lines from the southwestern part of the United States to the industrial middle west, no surveyor went on the job until the sections of pipe were ready to be laid; yet, the right-of-way agents completed much of their work before that time. Surveys for underground conduits containing power lines on private right-of-way are much the same as those for pres- sure pipe lines. Underground communication circuits are commonly placed in conduits located beneath the highway pavement. Access for maintenance is by means of manholes. Coaxial cables used for telephone, broadcast, and television circuits may be drawn through existing conduits. However, they are also placed directly in a shallow ploughed trench beside the high- way. In neither case is any extensive survey work required. 11-5. Surveys for Construction at the Hydraulic Gradient. Surveys for hydraulic construction in which flow is by gravity require very careful attention to elevations, owing to the flat grades used. If the flow is in an open channel, as in a canal, the alignment may have to be circuitous in order to obtain proper velocity and to avoid costly grading. A more direct alignment is possible if the construction is below the ground surface, such as in the case of a grade-line tunnel, aqueduct, or sewer. Surveys for surface construction may be identical with those for railroad location, the principal modification being that a narrower strip of topography will suffice. This condition is *Superscript numbers refer to the bibliography at the end of this chapter. 318 SURVEYS FOR OTHER ROUTES caused by the necessity for keeping the gradients between relatively narrow limits. Stations on the preliminary traverse are kept close to the final location by setting them near the "grade contour." The grade contour is the line on the ground (starting at a con- trolling point) along which the grade changes at the rate best suited to the construction. In locating the stations, it is obviously necessary that the leveling be kept up with the transit work. In simple irrigation-ditch construction in easy terrain, a line may be located on the grade contour in the field by tape and level, without need for the transit. On a contour map the grade contour is found by starting at a controlling point and stepping from contour to contour with dividers set at a distance equal to the contour interval divided by the desired rate of grade. The closer the final alignment follows the grade contour, the lower will be the grading quantities. Since economy of grading is an important factor in canal construction, careful cross-sections are taken at short inter- vals. Construction surveys for canals are very similar to those for highways, but all stakes must be set on offset lines. There are cases in which aerial surveys have been used in studies for canal location-for example, on the proposed Florida Barge Canal. They have also been used in studies for levees and dikes to control meandering rivers. Difficulty of access for ground-survey parties is an important consideration favoring the use of aerial-survey methods. However, the small contour interval needed on maps for canal studies does not ordinarily permit the location of contours by photo- grammetric methods. Mosaics are useful for general studies; but for detailed location the best method probably is to make an accurate planimetric map from the aerial photographs and then to add the contours by the plane-table method. For gravity-flow structures below the ground surface, it is entirely suitable to use railroad surveying methods, supple- mented by adequate subsurface exploration. A most impor- tant aspect of the office studies for such construction is to decide whether cut-and-cover construction or tunnel con- struction is the better. Often a combination of the two pro- vides the most economical solution. ■ SURVEYS FOR OTHER ROUTES 319 11-6. Tunnel Surveys.-In mountainous terrain, it is sometimes necessary to use tunnels on route alignment. Surveying operations for locating tunnels vary greatly in complexity. Preliminary studies are best made by using aerial photography, especially in regions which have experi- enced earth movements. Even detailed field studies may not disclose old earthquake faults, but good photographs quickly reveal them. As an example, some topographically-favorable tunnel sites considered for Interstate Highway 70 under the Continental Divide, west of Denver, were found to follow major fault zones³, a fact which resulted in the choice of a different location.¹ The final alignment of a short tunnel may be fixed by locating a transit line on the ground directly over the tunnel. As a rule, however, an indirect precise traverse is necessary. In the case of subaqueous tunnels or long tunnels to be driven through rugged mountain ranges, triangulation control must be used. This is a subject outside the scope of route surveying. The traverse or triangulation control provides only the data for calculating the tunnel alignment; elevations must be determined by careful spirit leveling between the proposed portals. Locating the portals, adits, and shafts by means of the accurate control surveys is only one of the surveyor's impor- tant tasks. His work in controlling the accuracy of the tunnel driving is fully as important; it must be done with the highest precision, for it cannot be verified conclusively until the head- ings are holed through-and then it is too late to make adjust- ments. Surveying for tunnels driven through rock involves special- ized operations not found in other types of route surveying. Among these are: 1. Carrying the alignment down shafts by means of heavy bobs damped in oil and suspended from piano wires. The equipment also includes lateral adjusting devices for the sheaves and scales for measuring the swing of the wires. 2. Transferring the alignment from the wires to plumb bobs suspended from riders, or "skyhooks," mounted on scales attached to the roof of the tunnel. 320 BIBLIOGRAPHY 3. Extending the alignment into the tunnel on "spads" driven in plugged holes in the roof. The transitman usually works on a suspended platform, out of the way of the muck cars. 4. Carrying the alignment to the working face, or "painting the heading," for locating the drill holes. 5. Transferring grade down shafts by means of weighted tapes or by taping down elevator guides. 6. Carrying temporary grade into the tunnel by means of inverted rod readings on the wood plugs in which the spads are driven. 7. Cross-sectioning twice; first for locating points needing trimming, and finally for obtaining permanent graphical records of the sections and for computing pay yardage and overbreak. Several ingenious devices for cross-sectioning have been used, such as pantographs and "sunflowers." The latter are designed to locate breaks in the tunnel cross-section by polar coordinates. A unique adaptation of the sunflower was used in cross-sectioning the tunnels on the Pennsylvania Turnpike, 5 Numerous other special procedures are necessary in survey- ing for shield-driven tunnels and for those driven by the com- pressed-air method. BIBLIOGRAPHY 1. MacDonald, G.E., "Surveys and Maps for Pipelines," Transactions, ASCE, Vol. 121, 1956, pp. 121-134. 2. Guss, P., “Aerial Photography Aids Pipeline Location,” Civil Engineering, Vol. 31, No. 6, June, 1961, pp. 48-51. 3. Mitcham, T.W., "Tunnel-Site Selection by Use of Aerial Photography," Civil Engineering, Vol. 31, No. 8, August, 1961, p. 64. 4. "Road Tunnel Will Pierce Divide," Engineering News- Record, Vol. 167, No. 7, Aug. 17, 1961, p. 25. 5. “Evolution of the Pennsylvania Superhighway," Roads and Streets, Vol. 82, No. 10, October, 1939, p. 77. CHAPTER 12 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 12-1. Foreword.-The uses of aerial photographs in route surveying justify devoting a separate chapter to aspects of the subject not covered in textbooks on photogrammetry. Aside from a brief review of certain definitions and mapping proc- esses, this chapter avoids repeating the technical principles of photogrammetric mapping as described in books on the sub- ject.¹* Instead, the emphasis is on the special applications of this new science to route location, and on their advantages, limitations, and economic value. Some new developments that involve photogrammetry appear in Chapter 13. 12–2. Definitions.-Definitions of photogrammetric terms to be used in this chapter are given in this article. For a more comprehensive list the engineer is referred to the Manual of Photogrammetry of the American Society of Photogrammetry.2 Photogrammetry is the science or art of obtaining reliable measurements by means of photography. The subject is sub- divided into terrestrial photogrammetry and aerial photogram- metry. In terrestrial photogrammetry the photographs are taken from one or more ground stations; in aerial photogram- metry, from an aeroplane in flight. Terrestrial photogram- metry utilizes horizontal photographs or oblique photographs, whereas aerial photogrammetry utilizes vertical photographs or oblique photographs. Since oblique photographs are used only for special purposes (see Art. 12-12), the aerial photographs referred to in this chapter are considered to have been made with the camera axis vertical, or as nearly vertical as practi- cable in an aircraft. The photographs used may be contact prints, made with the negatives in contact with sensitized photographic paper; ratio prints, the scales of which have been changed from those of the negatives by enlargement or reduction; or stereoscopic pairs (stereo-pairs), in which two photographs of the same area are taken in such a manner as to afford stereoscopic vision. *Superscript numbers refer to the bibliography at the end of this chapter. 321 322 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING An important property of a photograph is its scale, which is the ratio of a distance on the photograph to a corresponding distance on the ground. The scale of a photograph varies from point to point because of displacements caused by camera tilt and topographic relief. These displacements must be cor- rected for, if the photograph is to be used for precise measure- ments. A flight strip is a succession of overlapping aerial photo- graphs taken along a single course. The overlap is necessary for stereoscopic examination and for the construction of mosaics. A mosaic is an assemblage of aerial photographs the edges of which have been trimmed and matched to form a continu- ous photographic representation of a portion of the earth's surface. If the photographs are matched without reference to ground control points, the resulting map is an uncontrolled mosaic; if they have first been brought to a uniform scale and fitted to ground control stations, the map is a controlled mosaic. A planimetric map is one which shows the horizontal posi- tions of selected natural and cultural features, whereas a topographic map also shows relief in measurable form, usually by contours. The term base map is used to define a large-scale planimetric map compiled from aerial photographs. A copy of the base map may be used for the addition of contours and other data located by means of the plane table and/or photo- grammetric methods. 12-3. Uncontrolled Mosaics.-In making an uncontrolled mosaic, contact prints covering the area to be studied are trimmed and assembled by matching like images and are then fastened to a rigid or flexible backing. If the mosaic is for temporary use in the field, the prints are mounted on linen or other material that will permit the map to be rolled up. For this purpose semi-matte prints are preferred because they take pencil lines readily and are not scratched as easily as glossy prints. For more permanent use, properly matched glossy prints may be stapled or pasted to a rigid backing. If desired, the assembly may be photographed to preserve one or more copies of the complete map, after which the mosaic is dis- AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 323 mantled so that the contact prints may be used for stereoscopic study. Such a mosaic is relatively inexpensive and, though subject to errors because of scale variations and displacements, it is extremely valuable for reconnaissance (Art. 12–9) and mis- cellaneous uses (Art. 12-12). 12-4. Importance of Stereoscopic Vision. Most aerial photography is done by flying parallel flights across an area. During the flights, photographs are taken at intervals such that adjacent photographs will overlap approximately 30 per cent at the sides and 60 per cent in the direction of flight. This insures that the center (principal point) in each photo- graph will appear in the adjacent picture taken in the line of flight, thus providing what is called "stereoscopic overlap." By properly orienting the overlapping photographs (stereo- pairs) and viewing them through a stereoscope, the process known as "stereoscopic fusion" takes place. In this process there is a vivid mental impression of the terrain in three dimen- sions. (A simple demonstration of stereoscopic fusion is shown in Fig. 12-1.) In effect, two positions of the camera lens several thousand feet apart are substituted for the observer's eyes. In the resulting image (known as the "stereomodel”), relative heights of hills and structures, depths of canyons, and slopes of terrain are determinable. Used in this way, the old principle of stereoscopic vision has become probably the most important basic tool for studying the manifold problems of route-location. 12-5. Controlled Mosaics.-The utility of a mosaic may be greatly increased by bringing the photographs to a uniform scale, correcting them for tilt, and fitting them in their correct relative positions. This procedure requires the location of control points by ground surveying methods. Control stations, properly distributed over the area, are first selected with the aid of the stereoscope. They should be definite points easily recognized on the photographs and accessible on the ground. Buildings, fence corners, or road intersections usually serve this purpose. Preparatory to planning the ground control surveys, the selected control points are marked on each photograph by a circled prick point. 324 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING The ground control consists of suitable triangulation, traverse, and level circuits from which the coordinates and elevations of the control points may be computed. Ground control is costly and should therefore be no more precise or extensive than is required for the purpose. In research aimed at reducing the cost of ground control for surveys of very large areas, great progress in use of air-borne radar, and shoran techniques, has been made.3,4,5 See also Art. 13–2. In making the finished mosaic, the contact prints are ratioed (brought to the same predetermined scale), rectified (corrected for tilt), and fitted on a base board to the plotted ground con- trol points. There are several methods of doing this, all of which are highly technical and require special equipment. Only the central part of each photograph is used in compiling the mosaic, and the trimmed edges are feathered on the under- side. In addition, prints having the same tone, or degree of exposure, are selected. The finished mosaic then has the appearance of a single large photograph. 12-6. Planimetric Maps.—A planimetric map, on which are shown the accurate positions of such natural and cultural features as watercourses, forests, highways, and buildings, may be constructed from aerial photographs which are tied to adequate ground control. The first step is to make a control plot on which the ground control points are located from their computed coordinates. Photographic control points ("pic- ture points") must also be located on the plot to permit proper matching of the photographs. These are points that are clearly visible on two or more photographs but are not tied in by the ground surveys. They are usually located on the con- trol plot by an analytic or graphical method of radial tri- angulation. The positions of details may be transferred from the photo- graphs to the plot either by a relatively simple tracing method or by a stereographic method that employs special plotting instruments. The tracing method yields good results only if the photographs are relatively free from relief or tilt dis- placements. In this method each photograph is fitted as closely as possible to the plotted control points, and the selected details are traced onto the plot. The positions of AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 325 details which show on two photographs may have to be adjusted to compensate for slight differences in their traced locations. A more accurate map, free from the effects of tilt displace- ment, may be constructed with the aid of complex optical and mechanical instruments called "stereoplotters." Those most widely used include the double-projection map compilation plotters: Balplex, Kelsh, Multiplex, and Nistri Photocartograph; and the more-costly optical train instruments: Galileo-Santoni Stereocartograph, Nistri Photostereograph, Wild Autograph, and Zeiss Stereoplanigraph. 1 X : O Hold a card at right angles to the page and along the dotted line. Closing one eye at a time, adjust the head so that letter X (but not O) can be seen with the left eye, and conversely with the right eye. Then open both eyes and focus them beyond the page. The four dots above the let- ters will fuse and appear as two. Moreover, the lower dot will seem to be floating in space relative to the upper dot. To prove that all four dots are in the image, notice that the letters X and O are superimposed. - Fig. 12-1. Stereoscopic fusion These instruments employ the principle of the floating mark. In the stereoplanigraph and related instruments, the photo- graphs of a stereo-pair are viewed through two movable AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 327 be made to rise or sink vertically. In planimetric mapping, the general procedure is to operate the plotter so that the floating mark appears to be touching the surface of the ground (or other feature to be mapped) in the stereomodel, and then to mark the corresponding points on the manuscript map. In some stereoplotters the coordinates of the point viewed are read from scales. More-complex instruments have a special arrangement of levers, gears, and shafts which permits the path of the floating mark to be plotted directly (Art. 12–7). Some types of stereoplotters, particularly the optical-train instruments, are able to extend ground control accurately through a chain of stereomodels by a process known as bridg- ing, which is an application of aerotriangulation. Aerotri- angulation and the linkage of stereoplotter to electronic com- puter are described in Art. 13-9. Many details appearing on the aerial photographs may be transferred to the planimetric map without commensurate increase in cost-in contrast to the situation in ground survey- ing. Moreover, only the relevant details need be transferred. Thus, several different planimetric maps may be constructed from the same photographs, the features shown on a map depending on the use to be made of the map. 12–7. Topographic Maps by Photogrammetric Methods. A stereoscopic plotting instrument may also be manipulated in such a way as to measure the differences in elevation between points on the stereo-pairs. In principle, the first step in doing this is to adjust the instrument until the floating mark rests on a control point of known elevation. The frame carrying the two eyepieces is then moved in the x-and y-directions until the mark is at the detail being measured but is apparently floating in space above or below it. The mark is then made to rise or sink until it is at the same elevation as the detail. This is done by narrowing or increasing the distance between the eyepieces. Scale readings made during the procedure can be converted to give the x- and y-coordinates of the particular detail viewed and its elevation with respect to the control point. The principle can be extended to the drawing of con- tours, thus converting the planimetric map into a complete topographic representation. AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 329 51 per cent of the elevations tested shall be in error more than one-half the contour interval." That such standards are realistic and attainable was demonstrated by their use in planning the Pennsylvania Turn- pike extensions,6,7 which utilized photogrammetric maps made to a scale of 1 in. =200 ft, showing planimetric details, spot elevations, and 5-ft contours. Even more-rigid requirements are sometimes specified. For example, topographic maps with CITY OF KEOKUK, IOWA コロ ​IAM -625 ESTES 654 CTANK Done w AUREN BEDDED -651- 116460 PARK 625. 575 550 200 525 ST 642 COMMERCIAL BAND HEARING 646 491 -495' CRI&P 00 !!~ ·630· -650- 651 633 -498 -625- SCALE 1:2400 200 95 CONTOUR INTERVAL S' -- 618 ALL WILLIAM Ni 490 ·600° 400 འཚང་ 11-6 1647 (b) Fig. 12-3-Continued -000: 625 -650- 631 X HAD T 0x0 651 SIGN 196 1 CF PAI ROUND HOUSE: && 600 FEET 330 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING a contour interval of 1 ft, at a scale of 1 in. =40 ft, have been prepared for the highway commission of one eastern state. The accuracy required was that 90 per cent of the contours be dependable within ft.8,9 A reproduction of a portion of an aerial photograph is shown in Fig. 12-3(a), and a photogram- metric map of the area covered by the photograph is shown in Fig. 12-3(b). 12-8. Orthophotography.-A new improvement over con- ventional stereoscopic photogrammetry took place about 1956 with the development of equipment to produce the equivalent of an orthographic photograph, i.e., a uniform-scale photo- graph free from distortions due to tilt and relief. The U.S. Geological Survey accomplished this by means of a machine called the orthophotoscope.23 The original incentive came from the acute need for geologic use of uniform-scale maps on which the full wealth of planimetric detail is provided by photo- graphic images. At about the same time a different system of producing topographic maps based on orthophotography was developed commercially by the R.M. Towhill Corporation of Honolulu.24 The product, called the Photo-Contour Map (Fig. 12-4), is not a mosaic with contours superimposed. Because of the method by which the photographic perspective is rectified, it is an orthographic projection at the same scale as the contour plotting. The finished map is a photo copy on which contours are shown as black or white lines, or a combination of both. The tone of the photograph usually determines which is pre- ferable. The Photo-Contour Map is practically self-checking. Inaccurate work in compiling is revealed by obvious mis- matches in contours and planimetric features. Inspection of Fig. 12-4 shows that all contours properly track the visible drains and roads. In general, Photo-Contour Maps cost more than topo- graphic maps made by conventional photogrammetric methods (see Art. 12–11). However, where a proposed route location passes through areas having dense planimetric detail, they may be less costly because of saving in drafting time. 12-9. Photogrammetry for Reconnaissance.-Before mak- ing the detailed projection of a route between selected termini, AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 331 there must be general studies dealing with intermediate con- trols and interpretation of terrain. These studies may be summarized in the one word reconnaissance. If the controls usually present are examined (see Art. 9-3), they will be seen to fall into two principal types: (1) land usage and (2) topography. Both types of controls are recorded in great detail on aerial photographs. In fact, it is now generally agreed that such photographs provide the best means of mak- ing the type of careful reconnaissance so aptly emphasized by Wellington (Art. 1–9). For the first stage of reconnaissance, as described in Art. 10-9, small-scale photographs of the region between the termini will enable the designer to select the important con- trols and locate all feasible route bands. The scale of these photographs will depend on the distance between the termini and the importance of the intervening terrain. In practice, scales as small as 1 in. =2,000 ft (1:24,000) are quite suitable. The best procedure is to lay up an uncontrolled mosaic and to study it in conjunction with stereoscopic examination of stereo-pairs. The result will be the selection of several bands of terrain between the termini within each of which lies an apparently feasible location. These bands may be from 1,800 feet to 1 mile or more in width. The second stage of reconnaissance has for its purpose the comparison of the route bands and the selection of the most promising one. In some instances the choice will become apparent during the first stage, but in more-difficult cases it may first be necessary to study larger-scale photographs. These may be prepared with little extra cost by enlarging the original photographs up to a practical maximum of about four diameters. Even when the original photographs are taken in the summer, these enlargements are usable, since heavy foliage does not detract seriously from their value in reconnaissance studies. In both stages of reconnaissance the aerial photographs should be supplemented by other available maps. One in- genious method is to make photographic enlargements of U.S.G.S. sheets on a transparent-film base, to serve as an over- lay at the same scale as the mosaic.10 Used in conjunction with the stereo-pairs, this method adds a quantitative factor to the study. Inaccuracies in the maps or scale distortions in AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 333 the photographs affect all route bands equally and are not large enough to invalidate this procedure. Many of the mis- cellaneous values disclosed by aerial photographs (Art. 12-12) will become apparent in these studies and will also contribute toward the selection of the best route band. Field inspection at critical locations may be needed to resolve some difficulties. 12-10. Photogrammetry for Detailed Location Studies.-The type of photogrammetric application used for detailed location depends on the type of transportation route involved. It is possible to establish the location of a transmission line or a long pressure pipe line simply from the study of mosaics and stereo- pairs. However, the accurate location of a highway, a rail- road, or other route on which grades and right-of-way costs are more important requires a complete topographic map showing contours at not more than 5-ft intervals. In some instances contours may be drawn by stereoscopic plotting only on certain portions of the planimetric map, the remaining contours being fixed by plane-table or other ground- survey methods. This might be true, for example, in ex- tremely flat areas or where dense ground cover prevents obtain- ing the specified accuracy of contour location from photo- graphs.19 Complete topographic maps, made as outlined in Art. 12-7, vary in scale from 1 in. =200 ft, with a 5-ft or 10-ft contour interval, to 1 in. = 40 ft, with 1-ft contours. To meet the National Map Accuracy Standards the scale of the contact prints cannot ordinarily exceed four times the map scale, although the maps to a scale of 1 in. = 200 ft prepared for the Pennsylvania Turnpike extensions.7 were made from prints having a taking scale of about 1 in. = 1,000 ft. (The selected route band in these examples was 1 mile wide.) Other practical examples from states that have used photo- grammetric maps on highway projects are: California¹¹-Taking scale 200 ft per inch. Map scale 1 in. 50 ft, with 2-ft contours. == Connecticut¹²—Taking scales 500, 200, and 100 ft per inch. Corresponding map scales 1 in. =200 ft (5-ft contours), 1 in. = 100 ft (2-ft contours), 1 in. = 40 ft (1-ft contours). 334 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING Massachusetts,12-Taking scale 600 ft per inch for rural locations; 400 ft per inch for urban work. Map scales 1 in. =200 ft (5-ft contours) and 1 in. = 100 ft (2-ft con- tours). Ohio¹º-Taking scale 200 ft per inch. Map scale 1 in. =50 ft, with 2-ft contours. Once the topographic maps are prepared, trial lines are laid down on them with a spline, and the best route is chosen by following the usual paper-location procedure, as outlined in Art. 9-11. An important feature of the paper-location study is the estimate of grading quantities. If topographic maps made from aerial photographs actually meet the National Map Accuracy Standards, there is no reason why adequate quantity estimates cannot be prepared from them. Recently, highway engineers are finding that this is true. For example, in Massachusetts on a 2-mile relocation the difference between quantities computed from surveyed cross sections and from sections plotted from aerial topographic maps was only 2.6 per cent in embankment and 3.3 per cent in excavation.13 A similar comparison on a 7,600-ft project in Connecticut¹2 showed discrepancies of 1.4 per cent in cut and 1.2 per cent in fill. On a 30-mile project in California"¹ the variation in the excavation quantities was less than 2.5 per cent. The foregoing results lead to the belief that in highway construction we may eventually make contract payment for excavation on the basis of quantities derived from photogram- metric studies. A step in this direction was taken in Ohio¹0 on a 4.12-mile relocation for which a complete set of construc- tion plans was prepared by photogrammetric studies and these plans were used immediately for award of the construction con- tract by the usual competitive method. Research shows that by adjusting photogrammetric sections to field elevations along a route center-line and taking cross sections from a stereomodel, the resulting quantities are within limits con- sidered satisfactory for purposes of payment.25,26 The linkage of stereoplotter and electronic computer (Art. further step toward this goal. 13-9) is a AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 335 12-11. Costs of Photogrammetric Mapping. In addition to possessing many other advantages, photogrammetric maps can often be prepared at far less cost than maps made by con- ventional ground survey methods. The tabulation on page 336 is instructive in this regard. In preparing the tabulation, the cost data for projects not listed in the bibliography were obtained from commercial organizations specializing in photogrammetric mapping. It is important to observe that the cost per mile of photogram- metric maps depends principally on the scale and the contour interval. The length of the project--for given specifications has practically no effect on unit costs. Also mapping costs have not increased significantly over the years despite the large increase in construction costs. This is due to better equipment, improved techniques, and more competition among å greater number of mapping companies. An important fac- tor in keeping costs down is the ability of modern stereo- plotters to extend sparse ground control by bridging. On a cost-per-mile basis, comparable maps made by ground survey methods will rarely cost less, and will usually cost much more, than photogrammetric maps. However, a fairer com- parison of costs should take into account the fact that maps compiled from ground surveys rarely cover as wide a strip of topography as those made photogrammetrically. On work in Massachusetts, for example, the average cost of aerial topographic maps was $680 per mile for a strip 6,000 ft wide; whereas costs for ground surveys and plotting were about $1,500 per mile for a strip only 500 ft wide.13 Regardless of whether photogrammetry produces savings in mapping costs, it is likely to yield substantial savings in construction costs. These savings accrue not only from time savings but also from reduction in grading quantities and construction difficulties because the wider strip of topography and the astute use of stereo-pairs may result in the projec- tion of a better location than is possible by former methods. As an example, on a highway project in Mississippi, excavation quantities averaged 42,872 cu yd per mile as determined from a ground survey location, whereas another location, worked out later with the aid of aerial photographs, was selected with 336 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING Year 1948 1950 1960 1950 1952 1961 1944 1944 1947 1947 1950 1952 1953 1954 1954 1960 1961 Conn. Conn. R.I. State Conn. Mass. N.Mex. Cost Data on Photogrammetric Maps for Highway-Route Location Cost per Mile Cost per Acre 40-ft Scale-1-ft Contours-1,000 ft Wide $25 16 14 N.Y.-N.J. Mass. Pa. Pa. Conn. Mass. Pa. Pa. N.Y. Wisc. N.Y. Mileage Specification: 4 3.8 7.5 7.7 Specification: 100-ft Scale-2-ft Contours-Mile Wide $1,020 1,033 1,130 15 4.6 31 20.5 140 68 Specification: 200-ft Scale-5-ft Contours-1 Mile $ 570 629 586 825 7.1 $3,000 1,950 2,587 60 150 27 100 10.5 24 610 958 953 922 820 $3.19 7.10 1,199 979 23. Special Notes Ref. No. 8, p. 341 Ref. No. 8, p. 341 50-ft scale; 1,500 ft wide $0.79 0.86 0.92 1.29 0.96 1.50 1.49 1.44 1.28 1.88 1.53 Ref. No. 8, p. 341 Strip 1,200 ft wide Strip 400 ft wide Wide 6,000-ft strip. Ref. 21, p. 342 6,000-ft strip. Ref. 22, p. 342 Ref. No. 6, p. 341 Ref. No. 6, p. 341 Ref. No. 8, p. 341 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 337 excavation quantities averaging only 27,536 cu yd per mile.¹4 Similar comparisons on highway projects in Central America and Alaska showed phenomenal savings in construction costs in addition to improvements in alignment and gradients.15 The comments made in Art. 1-13 relative to costs and ultimate accuracies are especially pertinent in aerial photog- raphy and mapping. Photographs should be taken at a scale suited to resolving the smallest detail that must actually be shown on the map; otherwise additional field surveys will be needed and costs will mount. The topographic map itself should be drawn with the smallest horizontal scale and largest contour interval that will serve the requirements. Greater accuracy and larger scales than are needed are wasteful and costly. 12-12. Miscellaneous Uses of Aerial Photographs.-The technical utility and economic advantages of aerial photo- graphs, as described in the preceding articles, carry enough weight to justify their employment on all important route- location projects. However, it is worth emphasizing that aerial photographs possess other inherent values which may result as by-products from their primary uses. Often, these miscellaneous uses will require little additional cost or effort. The auxiliary uses of aerial photographs are many and varied. They may be found in any stage of route location, from the preliminary planning to studies made after the route is in operation. The following valuable uses have been re- ported: For Preliminary Planning Interpretation of terrain. Drainage patterns. Soil types. Land use as affecting costs of right-of-way. Location and extent of wooded areas, swamps, rock outcrops, snow-slide and erosion scars, and borrow material and granular deposits for use in construction. For Detailed Studies Size of drainage areas for culvert determination. Plan- ning of interchanges, using oblique photographs. Large-scale site maps for bridges, intersections, and 338 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING other detailed studies, prepared from one pair of photographs with a stereoscopic plotting instrument.¹0- For Construction Determination of best means of access. Type of clearing. Possible effect of terrain and climatic conditions on choice of construction equipment. Progress reports, using series of oblique photographs taken in sequence along route at convenient time intervals." After Construction Traffic studies, including traffic counts, speeds, and densities, congestion, railroad grade-crossing elimina- tion, efficiency of existing parking facilities, and location of new parking areas. Road-inventory studies, includ- ing changes in use of abutting land and pavement-con- dition surveys.1 16 General Public-relations purposes in general,¹ such as illustrations at public hearings and legislative reviews pertaining to proposed route location and land takings, using oblique photographs that are easier for the layman to understand (see the Frontispiece). 12-13. Limitations of Photogrammetry.-Photogrammetry for purposes of route location is not without its limitations. Clarity in photographs requires good atmospheric conditions— freedom from clouds, mist, smoke, or severe haze. In some parts of the world such ideal conditions may occur only one or two days in the year.18 The interrrelationship between aerial photographs and ground control requires careful planning as to their timing. A hasty decision to take aerial photographs, solely in the belief that they always save time, invites inefficiency and may raise costs. It is virtually impossible to determine precise elevations from photographs taken when there is heavy snow cover or dense vegetation. Consequently, for contour mapping the photographs should be taken when the ground is bare and the trees are defoliated. Regions having dense forests of different AERIAL PHOTOGRAPHY IN ROUTE SURVEYING 339 types and heights of evergreens obviously present a difficult problem. Reference 19 offers a possible solution. Photogrammetric methods should not usually be used for maps requiring elevations with an error of less than 1 ft. For example, contour mapping by photogrammetry is questionable for canal location in areas when contours are widely spaced and where high precision is needed. In such circumstances is would be better to draw a planimetric map by photogram- metric methods and then add contours and spot elevations by appropriate ground surveying methods. If the area to be mapped is small or if only a narrow strip of topography is needed, photogrammetry may then be re- stricted by economics rather than by technical limitations. Finally, projects such as highway relocation require addi- tional data about details that can only be obtained by ground methods. Among these are: precise location of hydrants, water gates, and property-line markers; utility-pole numbers; type, critical elevation, and house number of buildings; size and invert elevation of culverts; and all the information regard- ing existing subsurface installations that are needed for design drawings and construction planning. 12-14. Summary of Advantages of Aerial Photography in Route Surveying.-To summarize the information in this chapter, it is apparent that the salient advantages of aerial photography in route surveying are: 1. The larger area and wider route bands covered by the photographs give greater flexibility in route location and practically insure that no better location has been overlooked. 2. Practically all the studies preceding construction can be made without encroaching on private property or arous- ing premature fears in regard to the extent of property damage. Land speculation is thereby reduced.20 More- over, the eventual acquiring of right-of-way is expedited because property owners can see clearly on the photo- graphs the effects of the takings. 3. On a large project the elapsed time between starting the survey work and construction can be greatly shortened. Should weather conditions provide only a short field 340 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING season, ground control and photography can be done then, the map compilation being left for indoor work dur- ing the winter months. In contrast to plane-table work, the stereoscopic plotting of contours is independent of weather and can be done on a day-and-night schedule if necessary. 4. Over-all survey and mapping costs may be considerably less than by ground methods. 5. Maps made by photogrammetric methods possess a more uniform accuracy than is usually found in those compiled from ground surveys. 6. What was formerly thought to be the ultimate goal of aerial photography-the compilation of detailed topo- graphic maps-is being extended to even more useful purposes, such as quantity estimates and complete con- struction plans. 7. Photogrammetry is of direct value in reducing the short- age of engineering services by releasing engineering personnel from routine survey work for more-advanced employment in design. 8. Aerial photographs have many auxiliary uses and con- tain more information about a variety of significant fea- tures than the engineer can obtain by ground methods except at greatly increased cost. BIBLIOGRAPHY 1. Moffitt, F.H., Photogrammetry, Scranton: International Textbook Company, 1959. 2. Manual of Photogrammetry, 2d ed., American Society of Photogrammetry, Washington, D.C., 1952. 3. Hoover, C.R., "Development of an Optical Radar System for Surveying Purposes," Transactions, American Geophysical Union, Vol. 31, No. 4, August, 1950, pp. 518-524. 4. Ross, J.E.R., "Shoran, Application to Geodetic Tri- angulation," The Canadian Surveyor, Vol. 10, No. 3, Jan- uary, 1950, pp. 9-18. 5. Aslakson, C.I., "The Importance of Shoran Surveying," Transactions, ASCE, Vol. 120, 1955, pp. 225-234. BIBLIOGRAPHY 341 6. Williams, F.J., "Photogrammetry Locates 208 Miles of Pennsylvania Turnpike Extensions," Civil Engineering, Vol. 20, No. 12, December, 1950, pp. 761-763. 7. Gilbert, G.B., "Photogrammetry Aids the Pennsyl- vania Turnpike,” Proceedings ASCE, Vol. 80, Separate No. 577, December, 1954. 8. Hooper, C.J., "Photogrammetry and Its Uses in High- way Planning and Design," Photogrammetric Engineering, Vol. XVII, No. 1, March, 1951, pp. 133-137. 9. Quinn, A.O., "Photogrammetry Aids Highway Engin- eers,” Photogrammetric Engineering, Vol. XVIII, No. 5, De- cember, 1952, pp. 787-790. 10. Meyer, R. W., "Aerial Photography Streamlines Ohio's Highway Program," Photogrammetric Engineering, Vol. XIX, No. 5, December, 1953, pp. 771-776. · 11. Telford, E.T., "Photogrammetry as Applied to High- way Engineering," Photogrammetric Engineering, Vol. XVII, No. 1, March, 1951, pp. 175-180. 12. Perkins, E.T., "Use of Aerial Surveys in Highway Location," Proceedings of Conference on Modern Highways, Massachusetts Institute of Technology, June, 1953, pp. 70-77. 13. Houdlette, E.C., "Photogrammetry as Applied to Highway Engineering in Massachusetts," Photogrammetric Engineering, Vol. XVII, No. 1, March, 1951, pp. 138-143. 14. Brown, I. W., "Photogrammetry as Applied To High- way Engineering in Mississippi," Photogrammetric Engineer- ing, Vol. XVII, No. 1, March, 1951, pp. 151-160. 15. “Photogrammetry and Aerial Surveys,” Bulletin 157, Highway Research Board, 1957, p. 59. 16. McMaster, H.M., and Legault, A.R., "Pavement Con- dition Surveys by Means of Aerial Photographs," Univ. of Nebraska, Eng. Exp. Sta., Bulletin No. 1, April, 1952. 17. Johnson, D.S., "Photogrammetry in Highway Plan- ning," Bulletin 228, Highway Research Board, 1959, pp. 12–20. 18. Cottrell, C.M., Panel: "Engineering Applications of Photogrammetry," Photogrammetric Engineering, Vol. XX, No. 3, June, 1954, pp. 516-520. 19. Sternberg, I., "Aerial Mapping in Areas of Heavy 342 AERIAL PHOTOGRAPHY IN ROUTE SURVEYING Ground Cover," Bulletin 199, Highway Research Board, 1958, pp. 44-48. 20. Winsor, D.E., "Survey Security Through Photogram- metry," Bulletin 199, Highway Research Board, 1958, pp. 14-23. 21. Nelson, S., "Aerial Surveys Expedite Highway Plan- ning," 1944 Group Meeting Book, American Association of State Highway Officials. 22. Houdlette, E.C., "Massachusetts Adapts Aerial Photo- graphy to Highway Location," Civil Engineering, Vol. 17, No. 2, February, 1947, pp. 85 ff. 23. Southard, R.B., Jr., “Orthophotography-Its Tech- niques and Applications," Photogrammetric Engineering, Vol. XXIV, No. 3, June, 1958, pp. 443-451. 24. Mahan, R.O., "The Photo-Contour Map," Photogram- metric Engineering, Vol. XXIV, No. 3, June, 1958, pp. 451-457. 25. Funk, L.L., "Terrain Data for Earthwork Quantities," Bulletin 228, Highway Research Board, 1959, pp. 49-65. 26. Funk, L.L., "Adjustment of Photogrammetric Surveys," Bulletin 228, Highway Research Board, 1959, pp. 12-20. CHAPTER 13 AUTOMATION IN LOCATION AND DESIGN 13-1. Foreword.-Automation is entering every aspect of transportation. Electronic controls have already been ap- plied to road-building equipment, notably, graders and pavers. Automatic train control has proved its worth, as has radio control of highway traffic signals. The present decade will bring practical applications of startling new developments in highway operating controls, such as induction radio to transmit instructions to the driver of a moving vehicle, induc- tion loops under the road surface to detect the passage of a vehicle and actuate warning signals to trailing vehicles, and the complete electronic guidance of streams of traffic on im- portant arteries. Despite the importance of these subjects, this chapter is restricted to automation in the field and office aspects of route location. The use of automation in location and design is so new that most of the applications to be described date since publication of the second edition of this book in 1956. These applications are largely in the office procedures of mapping and design. Yet some revolutionary improvements in surveying field work have also occurred-especially in distance measurement. 13-2. Automation in Field Measurements.-A major break- through in distance measurement has occurred with the intro- duction of accurate portable devices that depend on wave mechanics and electronics. Their development was stimu- lated by the successful application to geodetic surveying of Shoran¹*, a blind-bombing instrument used in World War II. Without Shoran, for example, the islands adjoining the missile test range southeast of Cape Canaveral would remain geodeti- cally isolated. In distance measurement using light waves, an instrument called the geodimeter transmits a beam of light through crossed polaroids and a Kerr cell, which modulates the light at a *Superscript numbers refer to the bibliography at end of this chapter. 343 344 AUTOMATION IN LOCATION AND DESIGN definite frequency between 10 and 30 mc (megacycles) per second. A passive mirror or bank of prisms ("slave unit") at the remote station reflects the light back to a phototube multiplier in the geodimeter. Here a detector instantaneously compares the phase of the returning light with that of the beam just leaving. The phase detector is then moved to zero ("nulled") through manual control, thus bringing the phases into agreement and yielding readings which, with the velocity of light known, may be converted to the distance between the stations. Geodimeters come in several models, the heaviest of which weighs over 200 pounds. The accuracy of these non-portable models is such that they can replace conventional first-order triangulation with trilateration (measurement of the sides of a network of triangles). The maximum effective distance is limited only by attainment of "line-of-sight" conditions; this approximates 40 to 50 miles except under unusual circum- stances. A lighter model geodimeter weighing 58 pounds is well adapted to route-surveying projects requiring photogram- metric ground control by precise traverse or trilateration. This model (Fig. 13-1)² can measure distances up to 20 miles long with a maximum error of about 4 inches. An even lighter model (35 pounds) is available for short-range work- 50 feet to 5 miles-on which cheap expendable reflectors may be used as unmanned receiving stations. This model can replace taping on most route layout, boundary line surveys, and traversing in general. The principal disadvantage of the geodimeter is its depend- ence on fairly good visibility. The light beam will not pene- trate dense fog or haze. Measurements over fairly long lines must be made at night. Instruments for measuring distances using microwaves have reached a high degree of efficiency since 1957. These devices, like geodimeters, are also phase-comparison systems; but their operating principle is based on the instantaneous sampling of the phase of independent crystal oscillators located at each end of the line being measured. In the tellurometer (Fig. 13-2) a carrier microwave radiated at the master unit at about 3,000 mc per sec is modulated to AUTOMATION IN LOCATION AND DESIGN 347 frequencies of 10 mc per sec and others. The remote unit receives, analyzes, and retransmits the pulses to the master unit, where the phase shift is portrayed on a cathode-ray tube and measured with the aid of a calibrated graticule over the tube. The distance between the units is derived from the phase shift and the known velocity of radio waves corrected for humidity and atmospheric pressure. The master and remote units of the original tellurometer each weighed 57 pounds including built-in radio-telephone system, vibrator supply unit, carrying case, and tripod. Fig. 13-2(a) shows a master unit of the original model. A newer version called "Micro-Distancer" [Fig. 13–2(b)] is lighter and has the advantage that master and remote units are inter- changeable. Other tellurometer systems ("Aero-Dist," "Hy- dro-Dist," "Terra-Fix") are available for special commercial and military uses. - The electrotape³ is a light-weight, all-transistorized measur- ing system that employs the same basic principle as the tellurometer. The units are interchangeable and are mounted on standard surveyor's tripods. Round-trip transmission times come from a direct-reading counter instead of a cathode- ray tube. In contrast to the geodimeter, measuring systems using microwave transmission are practically independent of the weather. They are effective day or night, even during fog or light rain. Like the geodimeter, they require an optical line of sight and they measure slope distances. Therefore, vertical angles must also be measured with a theodolite so that slope distances may be reduced to horizontal. All measuring systems using light waves or radio waves have an accuracy which is a certain percentage of the distance plus or minus a fixed amount. Depending on the type and model of instrument, the fixed amount (according to manufacturers' claims) ranges from 1 centimeter to 2 inches; the percentage, from 1 to 3 millionths of the distance measured. Unbiased tests2,4,5,6 substantially verify these claims and also indicate survey cost savings of from 40 to 70 per cent over conven- tional precise traverse or triangulation. For all but very short lines, the accuracy attained is far better than that required on most route-location surveys. 348 AUTOMATION IN LOCATION AND DESIGN The accurate determination of ground profile by electronics is inherently more difficult than slope-distance measurement. However, research on radar altimetry has resulted in an air- borne profile recorder capable of determining elevations to +10 feet from an altitude of 45,000 feet. A truck-mounted elevation meter" with a revolution counter on a fifth wheel and a pendulum cutting an electromagnetic field has been designed so that electrical signals generated by counter and pendulum are combined by an electronic integrator to produce a continuous record of the road profile; the accuracy is satis- factory for fourth-order vertical control. Further refinement in such devices is inevitable. 13-3. Terminology in Automation.-Automation is break- ing down the traditional distinction between field work and office work. As an example, making rod readings in cross sectioning and recording them in a field book is considered to be field work. But is notekeeping field or office work when the readings are recorded on Mark Sense cards (Art. 13-6) which are to be run through automatic office machines? Among the common terms used in automation are data procurement, data processing, data reduction, data transmission, and data presentation. These expressions do not involve bas- ically new operations for the route surveyor or designer. Measurements of distances taped in the field and of xyz coordinates of points read from a stereomodel as the output of a stereoplotter are both forms of data procurement. Com- putations made in the field by slide rule and in the office by electronic computer are merely different forms of data proc- essing. The stereomat (Art. 13-8), an electronic plotting instrument, is a data-reduction system; but so is the drafts- man's hand and contour pen. Mailing a typewritten record of earthwork quantities from field to office serves the same purpose in data transmission as sending the record over a telephone line in the form of binary-coded electrical pulses. Cross sections are a form of data presentation, whether plotted in the field directly from rod readings or stripped from a photogrammetric map and drawn by an automatic line plotter. In route location and design, the electronic computer serves as a bridge linking these applications of automation into an integrated system (Art. 13–9). For this reason it is advisable to review the fundamentals of modern computers. AUTOMATION IN LOCATION AND DESIGN 349 13-4. Fundamentals of Modern Computers.-It would be inconsistent with the title of this book to cover intricate details of the design, circuitry, and programming of modern computers; nor is this essential. Most engineers and science- motivated high-school students know, at least in a general way, what computers do and how they do it. The purpose of this article is to review the fundamentals of computers for readers unfamiliar with them so that the special applications described later in the chapter will be better understood. Engineering data may be presented in analog (graphical) form or in digital (numerical) form. Plotted cross sections and contour maps are examples of analog form; rod readings and distances, of digital form. Engineers have long used mechanical types of analog and digital computers such as the planimeter (analog) and desk calculator (digital). But the application of electronic computers to route-location problems dates only since about 1955. The modern analog computer is especially suited to the analysis of flow in networks, e.g., water or gas pipe systems and electrical circuits; it has also been applied to traffic engineering problems. But all subsequent references to com- puters in this book are to the more widely used electronic digital computer. The stored-program computer has five basic components: input, memory (storage), arithmetic, control, and output. The input unit takes information (problem data and program instructions) from punched cards. punched tape, magnetic tape, or a special typewriter and places it in memory. All items of information must be stored in primary or auxiliary memory before the computer can solve a problem without interruption. The arithmetic unit usually performs only four arithmetic operations: addition, subtraction, multiplication, and division. (Multiplication may be done by repeated addi- tion and shifting of the decimal point; division, by repeated subtraction.) Another function of the arithmetic unit is to assist in making decisions by comparing two numbers (through subtraction) and then following either of two prescribed courses of action depending on which number is the larger. The control unit decodes the program instructions stored in memory and directs signals to the other units based on those instructions and on the results of arithmetic operations. The 350 AUTOMATION IN LOCATION AND DESIGN output unit records numerical answers and any other specified data taken from memory, employing one of the forms used for input or even a graphical display. In most computers the internal computations are done in the binary system rather than the decimal-number system. There are several ways of coding binary variables to represent one decimal digit. In straight binary, for example, the deci- mal number 18.625 is written as 10010.101, each digit in the binary number being the coefficient of a power of 2. Thus (18.625)10 = (10010.101)2, which equals 1·2ª+0·2³+0•2²+1•2¹+ 0·2º+1·2¬¹+0·2-2+1·2˜³. Evaluating these terms gives 16+ 2+0.5+0.125, or 18.625. The reason for using binary num- bers lies in the ease with which they can be represented by cards, tape, or circuitry. In the computer something is either present or absent-a particular place on a punched card or tape either has a hole or does not; a switch or vacuum tube is either on or off; or a magnetic memory core is magnetized in one direction or the other at a given point. The digit () is used to symbolize one condition; the digit 1, the other. These binary digits are called bits. It is not essential that the computer user or programmer be concerned with further details of the binary system. Num- erical data are "read" into memory by the input device as decimal numbers. Built-in circuitry converts the numbers to binary form for computation and back to decimal form for output. The medium-size stored-program computer used in most route-location problems has an internal memory unit capable of storing from 1,000 to 8,000 combinations of bits, with each combination (word) in a separate location (address). A prob- lem to be solved by the computer is broken down to a definite sequence of elementary steps called the program. Each step is a coded number which is also stored in memory at a par- ticular address. Since the computer can only add, subtract, multiply and divide, all required algebraic and trigonometric operations. must be converted to arithmetic. If a problem contains many special operations, such as finding the square root of a number or evaluating a function of an angle by means of a power series, too many addresses in the high-speed memory unit may be AUTOMATION IN LOCATION AND DESIGN 351 used up. For this reason some of these operations may be supplied as subroutines in auxiliary memory, usually in the form of slower but more economical magnetic tape. Some newer computers are designed to accept input instruc- tions in a code based on common English terms-and even to translate simple formulas (e.g., Fortran) into machine lan- guage for internal processing. Programming is thus simplified. Because of its electronic circuitry, a computer operates at very high speed. The over-all time for solving a given prob- lem depends on the efficiency of the program and the design of the computer, particularly with respect to access time (to memory) and to the type of input and output units. Actual internal operations proceed at rates as high as millions of bits per minute. Reference 8 gives further non-technical information about computers. The advantages and uses of computers in route location and design are outlined in the next article. Before considering these applications, however, it is worth remembering that the computer, though a powerful tool for the engineer, is not his master. Though future computers may be developed to function like the human brain, those presently used in high- way-engineering applications were characterized sensibly as follows by the Chief of the Electronics Branch of the Bureau of Public Roads: 9 "The electronic computer is only a calculating machine. The thinking involved in the solution of an engineering problem must continue to be done by the engineer. Although the computer can call upon its memory for information and can make simple logical decisions, it can do these things only when explicitly directed to do them by means of instructions in the program. There is no computer instruction which says, 'Use your own judgment.' The computer cannot exercise judgment, it cannot reason or accum- ulate experience, and it cannot create. It will do exactly what it is directed to do-no more and no less." 13-5. Computer Programs in Route Location. In 1955, the Arizona State Highway Department and the California Division of Highways pioneered in adapting electronic data processing to traverse and earthwork computations. Stirred by the significance of these applications, regional conferences on electronics in highway engineering were held in widely separated States for several years (starting in 1956) under the joint sponsorship of the American Association of State High- way Officials, the Bureau of Public Roads, and the host high- M 352 AUTOMATION IN LOCATION AND DESIGN way department. No more effective action could have been taken to stimulate interest among highway engineers, admin- istrators, and computer manufacturers toward exchange of ideas and development of computer programs. The con- ference reports* are invaluable sources of reference on com- puter applications in all phases of highway operation. 9 Alignment and earthwork computations are repetitive in nature; they consume countless man-hours that the engineer could use to better advantage on more professional work. This characteristic of a lengthy numerical problem-frequent Occurrence is what makes the use of the computer attractive and economical. Once a program has been prepared, its high development cost can be spread over repeated applications. Computers yield extraordinary savings in computation time. "For example, in computing the volumes of earth to be moved in constructing a proposed highway, about 80 to 90 man-hours per mile are required using the traditional method. In the electronic-computer method, using an intermediate size computer, only about 15 minutes per mile of computer time is required. Additional time is, of course, required to punch the input data on cards or tape, but even including this, the time consumed is only about one-thirtieth of that required by the traditional method. Also, because the com- puter results are obtained entirely by arithmetic computation, errors and inaccuracies in plotting, measuring, and tran- scribing data are eliminated." "In other types of problems, even more impressive savings are attained. The computation of the dimensions and eleva- tions needed for laying out, fabricating, and constructing multispan curved bridges with various skewed piers and abutments is tedious and time consuming. In one project of this kind with fourteen spans, a complete solution was obtained on an intermediate size computer in 11 minutes. Based on similar problems done previously, it was estimated that it would have taken 22 man-days to solve the problem using a desk calculator. This is a time ratio of about one to a thousand." *For information on these reports write to Secretary of Committee, Division of Development, Office of Operations, Bureau of Public Roads, Washington 25, D.C. AUTOMATION IN LOCATION AND DESIGN 353 More significant than saving in computation time is the potential upgrading in the quality of the end result. Tradi- tional approximations and rules of thumb can be replaced by more exhaustive treatments based on exact theory. The computer can handle solutions of special alignment problems by analytic geometry (Art. 7-19) with great speed and ease. Refinements in design formerly avoided to simplify computa- tions become practicable-such as more careful fitting of the grade line to terrain by use of unequal-tangent vertical curves (Art. 4-6). As a result of evaluating more possible routes by use of the computer, the savings in the cost of building a project—and particularly in the capitalized saving in annual operation and maintenance costs-can far exceed the mone- tary value of saving in computation time. When first applied to route location, the digital computer merely replaced the desk calculator in performing familiar routine computations. Among these were: (1) calculation of a closed traverse including error of closure, balancing, coordi- nates of stations, and area enclosed; (2) determination of any two items of missing data in an open traverse; and (3) calcula- tion of earthwork quantities from cross sections by any of the methods described in Arts. 6-8 to 6-10. As the spectacular time savings became known, computer programs were developed for all phases of horizontal and vertical alignment-straight and curved, for structural design, traffic problems, soils analyses, and administrative procedures. And the use of computers mushroomed. In 1960, for example, the California Division of Highways processed each month an average of 125,000 traverse courses and over 300 miles of earthwork calculations alone.10 By 1961, 49 of the 53 member departments of AASHO were using computers in highway work.11 The financial burden of program development has been eased by the formation of "user groups" composed of highway departments and consulting firms using the same make and model of computer. However, as of 1961, at least twelve different computers were in use on highway work, each having its own coding system and terminology. In order to over- come difficulties in exchange of programs, the Bureau of Public Roads has a Computer Program Library that serves as 354 AUTOMATION IN LOCATION AND DESIGN an agency for the receipt and distribution of programs used in all fields of highway operation. Perhaps the most valuable feature of this service is the conversion of programs to a "library form" consisting of common English and mathe- matical terms and standardized flow-charting symbols. As a result, any BPR program can be readily coded for use with any computer. A library memorandum which catalogues all programs on file and all those available in library form is distributed periodically. (For information on these memo- randa, see address in footnote on page 352.) Memorandum No. 8 dated November, 1960 gives the details of 30 programs in library form and lists 349 other programs on file. Abstracts of four of the library-form programs follow: PROGRAM BPR SU-2 Traverse Computation-developed in Cali- fornia Division of Highways This program is designed to perform the trigonometric computations encountered in surveys, or in any problem involving the relations between the sides and angles of triangles. It will deduce from given elements, other required elements, calculate area and produce an orderly tabulation of courses with their computed or known factors. Provision is made for some interdependence of traverses, allowing data from specified courses to be stored for later use. Included in the program is a routine for the solution of horizontal curve data. PROGRAM BPR E-2 Earthwork Quantities-developed in Missouri Highway Department This is a design program which is used for both undivided and divided roadways. In addition, it computes rock excavation quantities separately from earth excavation quantities. The program has 7 segments: 1. Station sequence check 2. Conversion of rod readings to elevations 3. Computation of template points and corrections for super- elevation and variable width 4. Slope selection and slope stake coordinates 5. Total areas 6. Earth and rock areas 7. Shrinkage, volumes and cumulative volumes PROGRAM BPR HA-2 Horizontal Alignment--developed as Digital Terrain Model* Systems by Massachusetts Institute of Technology under sponsorship of Massachusetts Department of Public Works in cooperation with the Bureau of Public Roads *See Art. 13-9 for explanation of the Digital Terrain Model System. AUTOMATION IN LOCATION AND DESIGN 355 Part 1-Basic Horizontal Alignment Program computes centerline geometry of alignment including the station of each PI, TC, and CT; external angle between tangents and tangent dis- tance for each curve; azimuth of each tangent; and center- line station, baseline offset, ground elevation at centerline and skew angle for each terrain cross section. Part 2-Even Station Interpolation Program computes ground ele- vations at equal intervals (either full stations or plusses) for plotting a ground profile. Part 3-Parallel Offset Alignment Program computes geometry of two parallel offset lines as well as the centerline and relates it to DTM terrain data. Part 4-Special Alignment Geometry Program computes centerline geometry only without reference to DTM terrain data. Vertical Alignment-developed as in Pro- gram HA-2 PROGRAM BPR VA-1 Part 1-Basic Vertical Alignment Program computes profile geome- try including the station and elevation of each end of vertical curves, the gradient for each tangent, and the profile grade elevation at each station where a cross section was taken. Part 2-Profile Geometry Program computes profile grade elevations at constant interval stations (either full stations or plusses). Successful computer programs are not yet in their final form. Further improvements are inevitable. A promising new approach is represented by COGO12 (derived from Coordinate Geometry). COGO is a programming system which frees the engineer from having to force a solution to an established form. It gives him full control over the form of input/output and the sequence of mathematical operations. Moreover, a COGO program is written quickly on any sheet of paper, used once, and then discarded. No costly program investment is involved. 13-6. Recording Field Data.-The worst bottleneck in the efficient use of the computer is in preparing input data. It takes far longer to punch cards or tape with readings from field notebooks than it does for the computer to process them and perform the computations programmed. Moreover, mis- takes arising from illegible figures and from human lapses in transcribing data are difficult to avoid. Methods of reducing these effects show great promise. The Arizona and Texas¹³ highway departments eliminate hand- written cross section field notes by substituting IBM Mark Sense Cards. These cards are imprinted with rows and 356 AUTOMATION IN LOCATION AND DESIGN columns of small ellipses identified by the digits 0 through 9. In the field, the station and plus, leveling readings, and cross section notes are recorded by marking the proper ellipses with a special graphite pencil. The cards are collated in the office and the marks are read by an interpreting machine as the cards pass under metal brushes. Electrical contacts made through the graphite cause holes corresponding to the field readings to be punched in another deck of cards. These cards are processed through a printer to furnish the field office with a typed record of the cross section data; they also serve as input to the computer for use in the preliminary or final earthwork programs. The Remington Rand Optical Scanning Punch¹¹ operates in much the same way. Several highway departments have used other devices for recording field data. These include a pocket-size card punch, a portable imprinter for tape, and field dictating equipment.15 13-7. Data Transmission.-High-speed transmission of in- ter-office data in highway work takes several forms. Teletype has been used, but because of its limitations in speed and format it is being superseded by methods employing elec- tronics, microwave radio, and optics. Commercial systems are available whereby signals in binary code are shaped for transmission over regular telephone lines at speeds of thousands of bits per second and reshaped at a remote receiver into the original form transmitted. Digital data for input to these transceiver systems may be punched cards, punched tape, or magnetic tape, with output in any of these media or in hard copy readout. Such a system will probably be adopted by most very large highway organizations having outlying offices and a centralized computer complex. Microwave radio is used in somewhat similar data-trans- mission systems, and has the advantage of being free from line failures during storms. Analog as well as digital data can be transmitted by a facsimile printing system that employs optical-electronic scanning.¹4 In this process the document, map, or photo- graph to be reproduced is scanned by a spot of light generated by a cathode-ray tube. The light is reflected to a photo- multiplier and converted to electrical pulses for transmission over coaxial cable or microwave relay system. At the re- 358 AUTOMATION IN LOCATION AND DESIGN to continuous line representations such as profiles or cross sections. A further step toward automation in plotting is represented by an electronically-activated instrument formerly called "Auscor" (Automatic Scanning Correlator)16, an improved form of which was patented in 1961 and is marketed under the name Stereomat. This device is fitted to a double-projec- D balan F (A) Aerial Photos Negatives Diapositives B C Stereomodel Measuring System Terrain Data (xyz coords. of points) Visual Display Computer Programs For example, HA-2, VA-1, E-2 (Art. 13-5) Printed Copy Detailed align- ment, profile, coordinates of Computer Input E (Cords or tape) cross sections, earthwork quan- tities, etc., e. g., HA-2, VA-1, E-2 (Art. 13-5) Computer Memory Computer Arithmetic Computer Output Electrical Signals On-Line Plotter G H Field Surveys Topographic Map Preliminary Studies of Trial Lines (Involving right of way, alignment, grades, drain- age, earthwork, etc.) Controlling Dimensional Data For detailed study. of trial and final horizontal and vert- ical alignments Punched Cards or Tape 1 Off-Line K Plotter Drawings (Plan, pro- file, mass diagram, x - sections) Fig. 13-4. Flow diagrams in highway design 2 4 O L 3 AUTOMATION IN LOCATION AND DESIGN 359 tion stereoplotter and achieves automation in the operations of clearing parallax and guiding the floating mark so as to produce profiles or contours as well as in determining spot elevations. One of the photogrammetric engineer's goals is a completely automated, integrated mapping system. That its attainment is in sight is supported by a progress report¹ on an electron- ically-controlled system in which stereoplotter, coordinato- graph, and orthophotoscope (Art. 12-8) are integrated. 13-9. Integration of Photogrammetry and Computer.- Before photogrammetry and electronics were adapted to route location, the usual procedure in design followed the sequence traced through Fig. 13-4 by 1-2-3-4-H-1-H-I-L (see Chap- ters 9 and 10). The computations (H) were done with the aid of logarithms, desk calculator, and planimeter; drawings (L) were plotted manually. With the advent of automation, however, several systems were developed for mechanizing these operations. In California an economical method of obtaining digital terrain data for determining highway earthwork quantities is based on key punching for computer use directly from strips of map manuscript.18 This is a special example of semi- automation. The Digital Terrain Model (DTM) System, 19 developed non- commercially at the Massachusetts Institute of Technology, is a prototype of a system which effects the maximum inte- gration of photogrammetry and computer in highway work. Other functionally-similar systems differ from DTM princi- pally in the design and arrangement of the components and in the extent to which automation is used. These include unique systems assembled for their own use by the Ohio Department of Highways, by commercial mapping agencies, and by consulting engineering firms, e.g., Photronix, Inc. No one of these automated systems is portrayed perfectly by the oversimplified diagram in Fig. 13-4. The best approximation to the DTM System is the sequence: A-B-2; B or 2-C-D-E; E, F, and 4-G-H-I and/or J-K-L. A digital terrain model is a statistical representation of the ground surface within a route band by the xyz coordinates of a large number of points. When stored on computer input AUTOMATION IN LOCATION AND DESIGN 361 the horizontal guide bar (cross section). Gear trains convert shaft positions to a digital coded output for storage in the control chassis. When the floating mark is on the ground at a desired point, the plotter operator steps on a foot-treadle switch. This action (by the controls exercised in the para- meter board, chassis, and programmer assembly) causes the. station number and the yz coordinates to be typed on hard copy and punched on paper tape in a standard code. An automated stereoplotter such as the Stereomat would elim- inate manual operation of the plotter.16 Many engineers feel that there is no good substitute for a topographic map on which the designer can lay his trial lines and visualize many other matters pertaining to his design. However, automatic readout of terrain data directly from a stereomodel theoretically eliminates the need for a map. In test comparisons on a highway project in Pennsylvania, 20 controlling dimensional data for trial lines were taken success- fully from banks of multiplex models rather than from a topographic map. Obviously this matter needs thorough study from a fresh, unbiased viewpoint. Even if a map is used, extraction of terrain data from the model can be done independently and filed in the computing center ready for use whenever the map has been compiled. The computer has almost entirely supplanted the tradi- tional cross section and planimeter method of determining grading quantities. In States where cross sections are still included in the construction plans,21 they may be drawn by an off-line plotter (K) of the type shown in Fig. 13-3. However, a survey22 shows a definite trend toward digital cross sections in lieu of drawings. Instead of a large number of drawn cross sections, a few sheets of numerical data (I) supply even more information in a form felt to be superior by both engi- neers and contractors.23 In California where this is done, it is the practice to supply a few sample cross sections in the contract plans merely for pictorial purposes.24 The terrain data (D) may be taken along a particular trial alignment as in the traditional method of design. This pro- cedure requires repeating the readout operation for each new alignment, but it has advantages where topography limits the line to only a few logical trials. By contrast, in the DTM 362 AUTOMATION IN LOCATION AND DESIGN System all terrain data in the route band are taken from a generalized baseline and stored at one time; readings do not have to be retaken with each change in alignment. This contributes to the ease of carrying out the premise on which the DTM System is built, i.c., that the best use of computer time is for studying a large number of alignments and profiles. However, the fact that DTM output data are for skewed sections (with respect to the route alignment) creates some problems. These are discussed in a series of searching evalu- ation studies in the report* that includes Reference 20. Fig. 13-4 does not portray the details of the computer phase. With the medium-size computer used by most State Highway Departments, it is necessary to run appropriate data through the computer in a series of passes. Eventually some States may join in integrating these smaller computers with regionally-located and financed super-computers each having memory storage large enough to handle all programs on im- portant projects in one pass. If line representations of cross sections are to be continued as part of the construction plans, the slower off-line plotter may be replaced by a cathode-ray tube and camera assembly connected on-line with the com- puter in such a way that cross sections are portrayed and photographed rapidly and automatically. This was done to a limited degree in Ohio.25 A special problem involving the integration of photogram- metry and computer is that of analytic aerotriangulation. Aerotriangulation uses measurements between points on aerial photographs for the purpose of determining the corresponding ground positions of the points. The process, if done analyti- cally, is more complex than geodetic triangulation because the lines joining the ground points and aerial camera position must be treated as a system of rays in three dimensional space. In route surveying, instrumental aerotriangulation has been used for many years to extend control through a chain of stereomodels by a process called "bridging." With the im- provement in stereoplotters, bridging serves to reduce the amount of costly ground control. An excellent example of the advantages of bridging is described in Reference 21. Because of the complexity of the mathematical relationships *For further information, see footnote on page 352. BIBLIOGRAPHY 363 in aerotriangulation, most of the early attempts to accomplish the process analytically involved approximations, and all were time-consuming.26 With the advent of the computer, how- ever, analytic aerotriangulation can now be done accurately and rapidly. The U. S. Coast and Geodetic Survey devised a system in which the positions of points on aerial photographs are read to the nearest micron by a precise comparator. The measurements are transmitted to an electronic readout device and simultaneously punched on computer input material. Finally, the computer processes the data through a program built around the correct mathematical formulas and delivers the positions and elevations of the points. BIBLIOGRAPHY 1. Aslakson, C.I., "The Importance of Shoran Surveying," Transactions, ASCE, Vol. 120, 1955, pp. 225-234. 2. Alexander, I.H., and Goldin, A.K., "Sierra Highway- Geodimeter Speeds Relocation Survey," California Highways and Public Works, May-June, 1960, pp. 16 ff. 3. Hempel, C.B., "Electrotape-A Surveyor's Electronic Eyes," Surveying and Mapping, Vol. XXI, No. 1, March, 1961, pp. 85-88. 4. Demuth, H.P., "Tellurometer Traverse Surveys," Tech- nical Bulletin No. 2, U.S. Coast and Geodetic Survey, March, 1958. 5. Jones, E.J., "An Electronic Break-Through in Survey- ing," Civil Engineering, Vol. 29, No. 7, July, 1959, pp. 479-481. 6. "Electronic Surveying-1960 Developments," Bulletin 258, Highway Research Board. 7. Moore, R.H., "What's New in Surveying Instruments,” Civil Engineering, Vol. 29, No. 8, August, 1959, pp. 550-553. 8. Merritt, F.S., "What You Should Know About Com- puters," Engineering News-Record, Vol. 164, No. 15, April 14, 1960, pp. 39-63. 9. Schureman, L.R., 'The Use of Electronic Computers in Highway Engineering,” Miller-Smith Lecture Series, Rutgers University, April 20, 1959. 364 AUTOMATION IN LOCATION AND DESIGN 10. Reynolds, F.M., "Data Processing," California High- ways and Public Works, March-April, 1960, pp. 39-42. 11. Radzikowski, H.A., "Advanced Techniques in the High- way Departments," American Highways, Vol. XL, No. 2, April, 1961, pp. 11 ff. 12. Miller, C.L., "COGO-A Computer Programming Sys- tem for Civil Engineering Problems," Civil Engineering Sys- tems Laboratory, Massachusetts Institute of Technology, August 15, 1961. 13. Dingwall, J.C., "Mark Sensing-Field Recording of Earthwork Cross Sections," American Highways, Vol. XXXVIII, No. 2, April, 1959, pp. 9 ff. 14. Schureman, L.R., "Optical-Electronic Scanning- Planes, Lines and Print," American Highways, Vol. XL, No. 2, April, 1961, pp. 12 ff. 15. Nielsen, T.R., "Data Transcription from Maps and Field by Use of Dictating Equipment," American Highways, Vol. XXXVIII, No. 2, April, 1959, p. 10. 16. "Oscar' Can Cut Road Costs By Millions," Engineering News-Record, Vol. 160, No. 25, June 19, 1958, pp. 23-24. 17. Boyajean, J., "The Implementation of the Integrated Mapping System," Photogrammetric Engineering, Vol. XXVII, No. 1, March, 1961, pp. 55-60. 18. Funk, L.L., "From Map to Computer," Bulletin 283, Highway Research Board, 1960, pp. 49-55. 19. Miller, C.L., and LaFlamme, R.A., "The Digital Ter- rain Model—Theory and Application," Photogrammetric En- gineering, Vol. XXIV, No. 3, June, 1958, pp. 433-442. 20. Richardson, E.C., "An Evaluation of the DTM System of Electronic Computer Programs for Highway Location and Design," Report of Electronics Committee, AASHO, San Francisco, Calif., December 4-5, 1958, pp. 62-70. 21. "Eleven Miles of Interstate Designed in 16 Weeks," Engineering News-Record, Vol. 161, No. 13, Sept. 25, 1958, pp. 42-48. BIBLIOGRAPHY 365 22. Huffine, W.B., "Highway Department Usage of Ad- vanced Techniques," American Highways, Vol. XL, No. 2, April, 1961, pp. 14 ff. 23. Schlitt, H.G., "Our Experience on the Use of Digital Cross-Section Presentations," Report of Electronics Committee, AASHO, Boston, Mass., October 15-16, 1959, pp. 15-17. 24. Funk, L.L., "Applications of Photogrammetry to the Location and Design of Freeways in California," Bulletin 157, Highway Research Board, 1957, pp. 26-38. 25. "Ohio Mechanizes Highway Design," Engineering News-Record, Vol. 158, No. 11, March 14, 1957, pp. 37 ff. 26. McNair, A.J., "General Review of Analytical Aero- triangulation," Photogrammetric Engineering, Vol. XXIII, No. 3, June, 1957, pp. 573-582. PART III TABLES 367 I. II. III. LIST OF TABLES Radii, Deflections, Offsets, etc.... Lengths of Arcs and True Chords. XVII-A. Correction Coefficients for Subchords. Chord Definition of D.. IV. Correction Coefficients for Subchords. Arc Definition of D……….. 381 V. Even-Radius Curves. Deflections and Chords 382 VI. Lengths of Circular Arcs; Radius 1....... 384 VII. Minutes and Seconds in Decimals of a Degree 385 VIII. Tangents and Externals for a 1° Curve. 386 409 ' IX. Corrections for Tangents. Chord Def. of D.. X. Corrections for Externals. Chord Def. of D.. XI. Selected Spirals. 409 411 XII. Spiral Functions for Ls = 1 420 XIII. Coefficients for Curve with Equal Spirals.... 429 XIV. Tangents and Externals for Unit Double- Spiral Curve.... XV. Deflection Angles for 10-Chord Spiral.. XVI. Coefficients of a₁ for Deflections to any Chord Point on Spiral. . XVI-C. Corrections to Table XVI for Large Deflec- tions.. • XVII. Level Sections.. • Corrections to Table XVII for Transverse Ground Slopes.. ***** XVII-B. Corrections to Table XVII for Transverse Ground Slopes. • • 368 380 • • 381 430 432 447 458 460 XVIII. Triangular Prisms. Cubic Yards per 50 feet 448 XIX. Cubic Yards per 100-Foot Station. XX. Natural Trigonometric Functions. XXI. Logarithms of Numbers... XXI-A. 7-Place Logarithms of Numbers from 1 to 100 575 XXI-B. 7-Place Logarithms of Useful Constants.. 551 575 576 XXII. Logarithmic Sin, Cos, Tan, and Cot... XXIII. Stadia Reductions.... 622 630 XXIV. Turnout and Crossover Data. XXV. Trigonometric Formulas.. 637 XXVI. Squares, Cubes, Square Roots, Cube Roots, and Reciprocals.. 438 439 440 447 639 368 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. Chord Definition of Degree of Curve* (Dc) MATHEMATICAL RELATIONS 1. sin sin D.= 50 R 1002 R • Arc Definition of Degree of Curve* (Da) MATHEMATICAL RELATIONS exactly 1. Da= 5,729.58 Ꭱ exactly 2. C.O. =200 sin D. 2. C.O.=4 R sin² Da exactly exactly 3. T.O. = C........ exactly 3. T.O.C.O...... exactly 4. M.O. = C.O…………. approx. C.O..... 4. M.O. .-c....... C.O………. approx. 8 Notes 1) For values of Da less than 12°, the C.O. (not tabulated) may be taken equal to the tabulated C.O. for the correspond- ing value of De. Exact values of C.O. are tabulated for both definitions of D, where D equals or exceeds 12°. 2) For values of D. and Da less than 12°, relation 4 will give M.O. without perceptible error. Beyond D.-12°, the exact values of M.O. are tabulated. is numerically the M.O. 3) For any value of D, the ratio C.O. same for both definitions of D. Thus, if Dɑ were 52°, the 11.54 M.O. equals (84.69), which is 11.17. 87.67 a 4) To obtain c.o., t, and m.o. for a chord or arc shorter than 100 ft, multiply C.O., T.O., and M.O. by (chord or are 100 * See Arts. 2-4 and 2–14. 369 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 0° 0' I GOVOG EWN. 51 6' י7 81 9' 10' יוד 12' 131 141 151 16' י7ו 181 19' 20' 211 22' 231 241 25' 261 27' 28' 291 30' 311 32' 331 341 351 36' 371 381 391 40' 411 421 ·431 44' 45' 46' 471 48' 49' 50! 511 52' 531 54' 55' 56' 57' 58' 59' DEFL. PER FT OF STA. (MIN) 0.005 0.01 0.015 C.02 0.025 0.03 0.035 0.04 0.045 C.05 0.055 0.06 0.065 0.07 0.075 0.08 0.085 0.09 0.095 C.I C.105 0.11 0.115 0.12 0.125 0.13 0.135 -0.14 0.145 0.15 0.155 0.16 0.165 0.17 0.175 0.18 0.185 0.19 0.195 0.2 0.205 0.21 0.215 0.22 0.225 C.23 0.235 0.24 0.245 0.25 0.255 C.26 0.265 0.27 0.275 0.28 0.285 0.29 0.295 RADIUS R CHORD DEFINITION LOG R Infinite 343775. 171887. 114592. Infin. 5.536274 5.235244 5.059153 85943.7 4.934214 68754.9 4.837304 57295.8 4.758123 49110.7 4.691176 42971.8 4.633184 38197.2 4.582031 34377.5 4.536274 31252.3 4.494881 4.457093 4.422331 28647.8 26444.2 24555.4 4.39C146 19098.6 4.281002 18093.4 4.257521 17188.8 4.235244 16370.2 4.214055 15626.1 4.193852 14946.8 4.174547 14324.0 4.156064 13751.C 4.138335 13222.1 4.121302 12732.4 4.104911 12277.7 4.089117 11854.3 4.073877 11459.2 11089.6 10743.0 10417.5 10111.1 22918.3 4.360183 C.44 21485.9 4.332154 0.47 20222.1 4.305825 0.49 4.059154 4.044914 4.031125 4.017762 4.004797 9822.18 3.992208 9549.34 3.979973 9291.25 3.968074 9046.75 3.956493 8814.78 3.945212 8594.42 3.934216 8384.80 3.923493 8185.16 3.913027 7994.81 3.902808 7813.11 3.892824 7639.49 3.883065 7473.42 3.873519 7314.41 3.864179 7162.03 3.855036 7015.87 3.846082 6875.55 3.837308 6740.74 3.828708 6611.12 3.820275 6486.38 3.812002 6366.26 3.803885 C.O. 1 STA. 6250.51 3.795916 6138.90 3.788091 6031.20 3.780404 5927.22 3.772851 5826.76 3.765427 C.03 0.06 0.09 0.12 C.15 0.17 0.20 C.23 0.26 C.29 0.32 0.35 0.38 0.41 0.52 0.55 0.58 0.61 0.64 0.67 0.70 0.73 0.76 0.79 0.81 0.84 0.87 0.90 C.93 0.96 0.99 1.02 1.05 1.07 ….[ ] 1.13 1.16 1.19 1.21 1.25 1.28 1.31 1.34 1.37 1.39 1.43 1.45 1.48 1.51 1.54 1.57 1.60 1.63 1.66 1.69 1.72 ARC DEFINITION RADIUS R Infinite 343775. 171887. 114592. Infin. 5.536274 5.235244 5.059153 85943.7 4.934214 68754.9 57295.8 49110.7 42971.8 38197.2 22918.3 21485.9 20222.0 34377.5 4.536274 31252.2 4.494881 28647.8 4.457093 26444.2 4.422331 4.390146 24555.3 19098.6 18093.4 17188.7 16370.2 15626.1 14946.7 14323.9 LOG R 13751.C 13222.1 12732.4 12277.7 11854.3 4.837304 4.758123 4.691176 4.633184 4.582031 A 4.360183 4.332154 4.305825 4.281001 4.257520 4.235244 4.214055 4.193851 4.174546 4.156063 4.138334 4.121300 4.104910 4.089116 4.073876 ||459.2 4.059153 11089.5 4.044912 10743.0 10417.4 10111.0 4.031124 4.017760 4.004795 9822.13 3.992206 9549.29 3.979971 3.968072 9291.21 9046.70 3.956490 8814.73 3.945209 8594.37 3.934214 8384.75 3.923490 8185.11 3.913025 7994.76 3.902805 7813.06 3.892821 7639.44 3.883061 7473.36 3.873516 7314.35 3.864176 7161.97 3.855033 7015.81 3.846078 6875.49 3.837304 6740.68 3.828704 6611.05 3.820270 6486.31 3.811998 6366.20 3.803880 6250.45 3.79591| 6138.83 3.788086 6031.14 3.780399 5927.15 3.772846 5826.69 3.765422 370 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 1° 0' | 21 31 41 51 6' י7 81 91 10' 111 12' 131 14' 151 16' 171 181 19' 201 211 22' 231 241 251 26' 271 281 291 30' 311 32' 331 341 351 361 371 38' 391 40' 411 42' 431 441 451 46' 471 481 491 50' 511 521 531 541 551 56' 571 581 59' DEFL. PER FT OF STA. (MIN) 0.3 0.305 0.31 0.315 0.32 0.325 0.33 0.335 0.34 0.345 0.35 0.355 0.36 0.365 0.37 0.375 0.38 0.385 0.39 0.395 0.4 0.405 0.41 0.415 0.42 0.425 C.43 0.435 0.44 0.445 0.45 0.455 0.46 0.465 0.47 0.49 0.495 0.5 0.505 0.51 0.515 0.52 RADIUS R CHORD DEFINITION LOG R 3.758128 5729.65 5635.72 3.750950 5544.83 3.743888 5456.82 3.736939 5371.56 3.730100 0.575 0.58 0.585 0.59 0.595 5288.92 3.723367 5208.79 3.716737 5131.05 3.710206 5055.59 3.703772 4982.33 3.697432 4583.75 3.661221 4523.44 3.655469 4464.70 3.649792 4407.46 3.644189 4351.67 3.638656 4911.15 3.691183 2.03 4841.98 3.685023 2.07 4774.74 3.678949 2.09 4709.33 3.672959 2.12 4645.69 3.667051 2.15 4044.51 3997.49 3951.54 3906.64 3862.74 0.475 3618.80 3.558564 3581.10 0.48 0.485 3544.19 3.549517 3508.02 3472.59 3819.83 3777.85 3736.79 3.572499 3696.61 3.567804 3657.29 3.563160 4297.28 2.33 3.633194 4244.23 3.627799 2.35 4192.47 3.622470 4141.96 3.617206 2.39 2.41 4092.66 3.612005 2.44 3.606866 3.601787 3.596766 3.591803 3.586896 0.55 3125.36 0.555 3097.20 0.56 3069.55 0.565 3042.39 0.57 3015.71 3.582044 3.577245 3437.87 3403.83 3370.46 3337.74 3305.65 3.519257 2989.48 2963.72 2938.39 2913.49 2889.01 C.O. 1 STA. 0.525 3274.17 3.515101 3243.29 3.510985 0.53 0.535 3212.98 3.506908 0.54 3183.23 3154.03 3.502868 3.498866 0.545 1.75 1.77 1.80 1.83 1.86 1.89 1.92 1.95 1.98 2.01 2.18 2.21 2.24 2.27 2.30 2.47 2.50 2.53 2.56 2.59 2.76 3.554017 2.79 2.82 3.545063 2.85 3.540654 2.88 3.536289 2.91 3.531968 2.94 3.527690 2.97 3.523453 3.00 3.03 ARC DEFINITION 3.494900 3.20 3.490970 3.23 3.487075 3.26 3.29 3.483215 3.479389 3.32 RADIUS R 3.475596 3.35 3.471836 3.37 3.468109 3.40 3.464413 3.43 3.460749 3.46 5729.58 3.758123 5635.65 3.750944 5544.75 3.743882 5456.74 3.736933 5371.48 3.730094 5288.84 3.723360 5208.71 3.716730 5130.97 3.710199 5055.51 3.703765 4982.24 3.697425 4911.07 3.691176 4841.90 3.685015 4774.65 3.678941 4709.24 4645.60 4583.66 4523.35 4464.61 4407.37 4351.58 4297.18 4244.13 4192.37 4141.86 4092.56 4044.41 3997.38 3951.43 3906.53 3862.64 LOG R 2.62 3819.71 3.582031 2.65 3777.74 3.577232 2.68 3736.68 3.572486 3.567791 2.71 3696.50 2.73 3657.18 3.563146 3618.68 3580.99 3544.07 3507.91 3472.47 3.05 3274.04 3.08 3243.16 3.11 3212.85 3183.10 3.14 3.17 3153.90 3.672951 3.667042 3.661213 3.655460 3.649783 3.644179 3.638647 3.633184 3.627789 3.62246C 3.617196 3.611995 3.606855 3.601775 3.596755 3.591791 3.586884 3.558550 3.554003 3.549502 3.545048 3.540638 3437.75 3.536274 3403.71 3.531952 3370.34 3.527673 3337.62 3.523437 3305.53 3.519241 3.515085 3.510968 3.506890 3.502850 3.498847 3125.22 3.494881 3097.07 3.490951 3069.42 3.487056 3042.25 3.483195 3015.57 3.479369 2989.34 3.475576 2963.58 3.471816 2938.25 3.468087 2913.34 3.464392 2888.86 3.460727 371 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 2° 0' ין 21 31 4' 5' 6' י7 8' 9' 10' ||' 121 131 141 151 161 171 18' 19' 201 211 22' 231 241 25' 26' 27' 28' 291 30' 311 321 331 341 351 36' 371 381 391 40' 411 42' 431 44' 45' 46' 471 48' 49' 50' 51' 52' 53' 54' 55' 561 57' 58' 591 DEFL. PER FT OF STA. (MIN) C.6 C.605 0.61 C.615 C.62 0.625 0.63 C.635 0.64 C.645 0.65 0.655 0.66 C.665 C.67 0.675 0.68 0.685 0.69 0.695 C.7 0.705 0.71 0.715 0.72 0.725 0.73 0.735 0.74 0.745 0.75 0.755 0.76 0.765 0.77 0.775 0.78 C.785 0.79 0.795 0.8 C.805 0.81 0.815 0.82 C.85 0.855 RADIUS R 0.86 0.865 0.87 CHORD DEFINITION LOG R 3.457115 2864.93 2841.26 3.453511 2817.97 3.449937 3.446392 3.442876 2795.06 2772.53 2750.35 3.439388 2728.52 3.435928 27C7.C4 3.432495 2685.89 3.429089 2665.08 3.42571C 2644.58 2624.39 26C4.51 3.422356 3.419029 3.415727 2584.93 3.412449 2565.65 3.409197 2546.64 3.405968 2527.92 3.402763 2509.47 3.399582 2491.29 3.396424 2473.37 3.393289 2455.70 3.390176 2438.29 2421.12 2404.19 2387.50 2371.04 3.374938 2354.80 3.371954 2338.78 3.368990 2322.98 2307.39 3.387085 3.384016 3.38C969 3.377943 2261.86 2247.08 2232.49 2292.0I 3.360217 2276.84 3.357332 3.354466 3.351618 3.348789 2218.09 2203.87 3.366046 3.363122 3.345797 3.343187 2189.84 3.340412 2175.98 3.337655 2162.30 3.334916 0.825 2083.68 3.318832 0.83 2071.13 3.316208 2058.73 3.313600 0.835 C.84 2046.48 3.311008 2034.37 3.308431 0.845 2148.79 3.332193 2135.44 3.329488 2122.26 3.326799 2109.24 3.324127 2096.39 3.321471 2C22.41 2010.59 3.303323 1998.90 3.300791 1987.35 3.298274 1975.93 3.295771 0.875 1964.64 3.293283 0.88 1953.48 3.290809 0.885 1942.44 3.288349 0.89 1931.53 1920.75 0.895 C.O. 1 STA. 3.285902 3.283470 3.49 3.52 3.55 3.58 3.61 3.64 3.66 3.69 3.72 3.75 3.78 3.81 3.84 3.87 3.90 3.93 3.96 3.98 4.01 4.04 4.10 4.13 4.16 4.19 4.22 4.25 4.28 4.30 4.33 4.36 4.39 4.42 4.45 4.48 4.51 4.54 4.57 4.60 4.62 4.65 4.68 3.305869 4.94 4.71 4.74 4.77 4.07 2455.53 2438.12 2420.95 2404.C2 4.80 4.83 4.86 4.89 4.92 4.97 5.00 5.03 5.06 ARC DEFINITION 5.09 5.12 5.15 5.18 5.21 RADIUS R 2864.79 2841.11 3.457093 3.453488 2817.83 3.449914 2794.92 3.446369 2772.38 3.442852 2750.20 3.439364 2728.37 3.435903 2706.89 3.43247C 2685.74 3.429064 2664.92 3.425684 2644.42 2624.23 2604.35 2584.77 2565.48 2546.48 2527.75 2509.30 2491.12 2473.20 2370.86 2354.62 2338.60 2322.80 2307.21 2291.83 2276.65 2261.68 2246.89 2232.30 3.380938 2387.32 3.377911 2217.90 2203.68 2189.65 2175.79 2162.IC 2148.59 2135.25 2122.07 2109.05 2096.19 LOG R 2083.48 2070.93 2058.53 2046.28 2034.17 2022.20 2010.38 1998.69 1987.14 1975.72 3.422330 3.419002 3.415700 3.412422 3.409169 3.405940 3.402735 3.399553 3.396395 3.393259 3.390145 3.387055 3.383985 3.374905 3.371921 3.368956 3.366012 3.363087 3.360183 3.357297 3.354430 3.351582 3.348753 3.345942 3.343149 3.340374 3.337617 3.334877 3.332154 3.329448 3.326759 3.324086 3.321430 3.318790 3.316166 3.313557 3.310964 3.308387 3.305825 3.303278 3.300745 3.298228 3.295725 1964.43 3.293236 1953.27 3.290761 1942.23 3.288301 1931.32 3.285854 1920.53 3.283421 372 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 3° 01 INDE DOгöä ö -~мE 21 31 Ц 51 61 71 8' 91 101 121 131 141 151 161 171 181 191 201 211 221 231 241 251 26' 271 28' 29' 30' 311 321 331 341 351 361 371 381 391 40¹ 41 42' 431 441 45' 46' 47' 481 491 501 51' 521 53' 541 55' 56' 57' 58' 59' DEFL. PER FT OF STA. (MIN) 0.9 0.905 0.91 0.915 0.92 0.925 0.93 0.935 0.94 0.945 0.95 0.955 C.96 0.965 0.97 C.975 C.98 C.985 C.99 C.995 1.0 1.005 1.01 1.C15 1.02 1.025 1.03 1.035 1.C4 1.C45 1.05 1.055 1.06 1.C65 1.07 1.075 1.ca 1.085 1.09 1.095 I 1.105 1.11 1.115 1.12 1.125 1.13 1.135 1.14 1.145 1.15 1.155 1.16 1.165 1.17 1.175 1.18 1.185 1.19 1.195 RADIUS R > CHORD DEFINITION LOG R 1910.08 1899.53 1889.09 1878.77 1868.56 1858.47 1848.48 1838.59 3.264486 1828.82 3.262170 1819.14 3.259667 1763.18 1754.19 1745.29 1736.48 1727.75 1809.57 3.257576 18CC.IC 3.255296 1790.73 3.253029 1781.45 3.250774 1772.27 3.248530 3.281051 3.278646 3.276253 3.273874 3.271508 1677.20 1669.06 1661.CO 1653.CI 1645.11 3.269155 3.266814 1599.21 1591.81 1584.48 1577.21 1570.01 3.246297 3.244077 3.241867 3.239669 3.237481 3.235305 3.233140 1475.71 1469.41 1637.28 3.214122 1629.52 3.212060 1621.84 3.210007 1614.22 3.207964 1606.68 3.205930 3.224584 3.222472 3.220369 3.218277 3.216195 1719.12 5.82 1710.57 5.85 1702.1C 3.230985 5.88 1693.72 3.228841 5.90 1685.42 3.226707 5.93 3.203906 3.201892 3.199886 1528.16 3.184169 1521.40 1514.17 1508.06 3.178419 1501.48 3.176519 C.O. 1 STA. 3.182244 3.180327 1494.95 3.174627 1488.48 3.172744 1482.07 3.170868 3.169001 3.167142 5.24 5.26 5.29 5.32 5.35 5.38 5.41 5.44 5.47 5.50 1463.16 3.165291 1456.96 3.163447 1450.81 5.53 5.56 5.58 5.61 5.64 5.67 5.7C 5.73 5.76 5.79 3.197890 6.34 3.195903 6.37 1562.88 1555.81 3.193925 6.40 3.191956 6.43 1548.80 3.189996 6.46 1541.86 3.188045 6.49 1534.98 3.186103 6.51 5.96 5.99 6.02 6.05 6.08 6.11 6.14 6.17 6.19 6.22 6.25 6.28 6.31 6.54 6.57 6.60 6.63 6.66 6.69 6.72 6.75 6.78 6.81 6.83 6.86 3.161612 6.89 1444.72 3.159784 6.92 1438.68 3.157963 6.95 ARC DEFINITION RADIUS. R 1909.86 1899.31 1888.87 1878.55 1868.34 1809.34 1799.87 1790.49 1781.22 1772.03 1762.95 1753.95 1745.C5 1736.24 1727.51 1718.87 171C.32 1701.85 1693.47 1685.17 1858.24 3.269102 1848.25 3.266761 1838.37 3.264432 1828.59 1818.91 1676.95 1668.81 1660.75 1652.76 1644.85 1637.02 1629.26 1621.58 1613.96 1606.42 1598.95 1591.55 1584.21 1576.95 1569.75 1562.61 1555.54 7 1527.89 1521.13 1514.43 1507.78 1501.20 1494.67 1488.20 1481.79 1475.43 1469.12 LOG R 1462.87 1456.67 1450.53 1444.43 1438.39 3.281001 3.278595 3.276203 3.273823 3.271456 3.262116 3.259812 3.257520 3.255240 3.252973 3.250716 3.248472 3.246239 3.244018 3.241808 3.239609 3.237421 3.235244 3.233078 3.230922 3.228778 3.226644 3.224520 3.222407 3.220303 3.218210 3.216128 3.193851 3.191881 1548.53 3.189921 1541.59 3.187969 1534.71 3.186026 3.214C55 3.211991 3.209938 3.207894 3.205860 3.203835 3.201820 3.199814 3.197817 3.195830 3.184091 3.182165 3.180248 3.178339 3.176438 3.174546 3.172661 3.170786 3.168918 3.167058 3.165206 3.163362 3.161526 3.159697 3.157876 373 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 4° 0' I 2' 31 4 51 6' 7' 8' 91 101 111 121 131 141 15' 16' 171 18' 19' 20' 211 22' 231 24' 251 26' 27' 28' 291 30' 311 321 331 341 351 361 371 381 391 40' 41 42' 431 44 451 46' 471 481 49' 50' 511 521 531 541 55' 561 571 581 591 DEFL. PER FT OF STA. (MIN) 1.2 1.205 1.21 1.215 1.22 1.225 1.23 1.235 1.24 1.245 1.25 1.255 1.26 1.265 1.27 1.275 1.28 1.285 1.29 1.295 1.3 1.305 1.31 1.315 1.32 1.325 1.33 1.335 1.34 1.345 1.35 1.355 1.36 1.365 1.37 1.375 1.38 1.385 1.39 1.395 1.4 1.405 1.41 1.415 1.42 1.425 1.43 1.435 1.44 1.445 1.45 1.455 1.46 1.465 1.47 1.475 1.48 1.485 1.49 1.495 RADIUS R CHORD DEFINITION LOG R 1432.69 3.156151 1426.74 3.154346 1420.85 3.152548 1415.01 3.150758 1409.21 3.148975 1403.46 1397.76 1392.1C 1386.49 3.141916 1380.92 3.140170 1375.40 3.138430 1369.92 3.136697 1364.49 3.134971 1359.10 3.133251 1353.75 3.131539 3.147200 7.13 3.145431 7.15 3.143670 7.18 7.21 7.24 1348.45 3.129833 1343.18 3.128134 1337.96 3.126442 1332.77 3.124756 1327.63 1273.57 1268.87 1264.21 1259.58 1254.98 1322.53 1317.46 1312.43 3.118078 1307.45 3.116424 1302.50 3.114777 3.121404 3.119738 1297.58 3.113136 1292.71 3.111501 1287.87 3.109872 1283.07 3.108249 1278.30 3.106632 7.42 7.45 7.47 7.50 3.123077 7.53 3.105022 3.103417 3.101818 3.100225 3.098638 1165.70 1161.76 C.O. 1 STA. 1228.11 3.089236 1223.74 3.087689 1219.40 3.086147 1215.09 3.084610 1210.82 3.083079 6.98 7.01 7.04 7.07 7.10 1206.57 3.081553 1202.36 3.080033 1198.17 3.078518 1194.01 3.077008 1189.88 3.075504 7.27 7.30 7.33 7.36 7.39 7.56 7.59 7.62 7.65 7.68 1250.42 3.097057 8.00 1245.89 3.095481 8.03 1241.40 3.093912 8.06 1236.94 3.092347 8.08 1232.51 3.090789 8.11 7.71 7.74 7.76 7.79 7.82 7.85 7.88 7.91 7.94 7.97 8.14 8.17 8.20 8.23 8.26 8.29 8.32 8.35 8.38 8.40 1185.78 3.074005 8.43 1181.71 3.072511 8.46 1177.66 3.071022 8.49 1173.65 3.069538 8.52 1169.66 3.068059 8.55 3.066585 8.58 3.065116 8.61 157.85 3.063653 8.64 1153.97 3.062194 8.67 1150.11 3.C6C740 8.69 ARC DEFINITION RADIUS R 1432.39 3.156063 1426.45 3.154257 1420.56 3.152458 1414.71 3.150667 1408.91 3.148884 1403.16 1397.46 1391.80 1386.19 1380.62 1375.10 1369.62 1364.19 1358.79 1353.44 1322.21 1317.14 1312.12 1307.13 1302.18 1348.14 3.129734 1342.87 3.128034 1337.64 1332.46 1327.32 1273.24 1268.54 LOG R .1263.88 1259.25 1254.65 1250.09 1245.56 3.147108 3.145339 3.143577 3.141822 3.140074 1241.06 1236.60 1232.17 3.138334 3.13660C 3.134873 3.133153 3.131440 1297.26 3.113028 1292.39 3.111392 3.109762 1287.55 1282.74 3.108139 1277.97 3.106521 3.126341 3.124654 3.122974 3.121300 3.119633 3.117972 3.116318 3.114669 3.104910 3.103304 3.101705 3.100111 3.098523 3.096941 3.095365 3.093974 3.092229 3.090670 1227.77 3.089116 1223.40 3.087566 1219.06 3.086025 1214.75 3.084487 1210.47 3.082955 1206.23 3.081429 1202.01 3.079908 1197.82 3.078392 1193.66 3.076881 1189.53 3.075376 1185.43 3.073876 1181.36 3.072381 1177.31 3.070891 1173.29 3.069406 1169.30 3.067927 1165.34 3.066452 1161.40 3.064982 1157.49 3.063517 1153.61 3.062057 3.060603 149.75 374 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D ONE DOгää ö-~ SONG 8 5° 0' 2' 31 4 5 6' י7 81 91 101 יו! 121 131 141 151 16' י7ו 181 19' 20' 211 22' 23' 241 251 26' 271 28' 29' 30' 311 32' 331 341 351 361 371 381 391 40' 411 42' 431 441 451 461 47.' 48' 49' 50' 51' 52' 531 54' 551 56' 571 58' 59' DEFL. PER FT OF STA. (MIN) 1.5 1.505 1.51 1.515 1.52 1.525 1.53 1.535 1.54 1.545 1.55 1.555 1.56 1.565 1.57 1.575 1.58 1.585 1.59 1.595 1.6 1.605 1.61 1.615 1.62 1.625 1.63 1.635 1.64 1.645 1.65 1.655 1.66 1.665 1.67 1.675 1.68 1.685 1.69 1.695 1.7 1.705 1.71 1.715 1.72 1.725 1.73 1.735 1.74 1.745 1.75 1.755 1.76 1.765 1.77 1.775 1.78 1.785 1.79 1.795 RADIUS R CHORD DEFINITION LOG R 1146.28 3.059290 1142.47 3.057846 1138.69 1134.94 1131.21 1127.50 1123.82 1120.16 1116.52 1112.91 1091.73 1088.28 1084.85 1081.44 IC78.05 1109.33 3.045059 1105.76 3.043662 1102.22 3.042268 1098.70 3.040880 1095.20 3.039495 1074.68 1071.34 1068.01 1064.71 1061.43 1058.16 1054.92 1051.70 1048.49 1045.31 3.056407 3.054972 3.053542 1011.51 1008.55 1005.60 1002.67 3.035368 3.034C02 3.C32639 3.052116 8.87 1127.13 3.050696 8.90 1123.45 3.049280 8.93 1119.79 3.047868 8.96 1116.15 3.046462 8.99 1112.54 3.031281 3.029927 3.028577 3.027231 3.C25890 3.024552 3.C23219 3.021890 3.020565 3.019244 3.017927 1042.14 1039.00 3.016614 IC35.87 3.015305 1032.76 3.C13999 1029.67 3.C12698 C.O. 1 STA. 3.038115 1091.35 9.16 3.036740 9.19 1087.89 9.22 1084.46 9.25 1081.05 9.28 1077.66 3.007532 3.006250 3.004972 3.003698 3.002427 3.001160 8.72 1145.92 8.75 1142.11 8.78 1138.33 8.81 1134.57 8.84 1130.84 9.01 1108.95 9.04 1105.38 9.07 1101.84 9.10 IC98.32 9.13 IC94.82 9.45 9.48 9.51 1026.60 3.011401 9.74 1023.55 3.010107 9.77 1020.51 3.008818 9.80 1017.49 1014.50 9.31 IC74.30 9.33 1070.95 9.36 1067.62 9.39 1064.32 9.42 1061.03 9.54 9.57 ARC DEFINITION RADIUS R 9.60 1041.74 9.62 IC38.59 9.65 IC35.47 9.68 1C32.36 9.71 IC29.27 9.97 999.762 2.999897 10.00 996.867 2.998637 10.03 993.988 2.997381 10.06 991.126 2.996129 IC.09 988.28C 2.994880 985.451 2.993635 1026.19 1023.14 1020.10 9.83 1017.08 9.86 IC14.08 IC.12 10.15 9.89 1011.10 9.92 I008.14 9.94 IC05.19 1002.26 982.638 2.992393 10.18 979.840 2.991155 10.21 977.060 2.989921 10.23 10.26 974.294 2.988690 971.544 2.987463 IC.29 1057.77 IC54.52 968.810 2.986239 10.32 966.091 2.985018 10.35 963.387 2.983801 IC.38 960.698 2.982587 IC.41 958.025 2.981377 10.44 1051.30 1 с48.09 1044.91 999.345 996.448 993.568 990.705 987.858 985.028 982.21.3 979.415 976.632 973.866 971.115 968.379 965.659 962.954 LOG R 3.059153 3.057707 3.056267 3.054831 3.053400 3.051974 3.050553 3.049135 3.C47723 3.046315 3.044912 3.043514 3.042119 3.040729 3.039343 3.037963 3.036587 3.035215 3.033847 3.032483 3.031124 3.029769 3.028418 3.027071 3.025729 3.024390 3.023056 3.021726 3.020400 3.019078 3.017760 3.016446 3.015136 3.013829 3.012527 3.011229 3.009935 3.008644 3.007357 3.006074 3.004795 3.003520 3.002248 3.000980 2.999715 2.998455 2.997198 2.995944 2.994695 2.993448 2.992206 2.990967 2.989731 2.988499 2.987271 2.986045 2.984824 2.983606 960.264 2.982391 957.590 2.981179 375 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 6° 0' 2¹ 4 6' 8' 10' 12' 141 16' 181 201 22' 241 26' 28' 30' 321 341 36' 38' 40' 42' 44' 461 48' 50' 52' 541 56' 58' 7° 0' 21 41 6 81 IC' 12' 14 DEFL. PER FT OF STA. (MIN) 1.8 1.81 1.82 1.83 1.84 1.85 1.86 1.87 1.88 1.89 40' 421 441 46' 48' 2.0 2.C1 2.02 2.03 2.04 1.9 905.131 1.91 900.397 1.92 895.712 1.93 891.076 1.94 886.488 1.95 881.946 1.96 877.451 1.97 873.002 1.98 868.598 1.99 864.238 2.05 2.06 2.1 2.11 2.12 2.13 2.14 2.15 2.16 2.17 16' 2.18 18' 2.19 RADIUS R 20' 2.2 22' 2.21 241 2.22 26' 2.23 28' 2.24 CHORD DEFINITION LOG R 838.972 834.904 2.07 830.876 955.366 950.093 944.877 939.719 934.616 2.970633 929.569 924.576 919.637 914.750 909.915 2.08 826.886 2.09 822.934 2.3 2.31 2.32 2.33 2.34 50' 2.35 52' 2.36 54' 2.37 56' 2.38 58' 2.39 819.020 815.144 811.303 807.499 803.731 301 2.25 764.489 32' 2.26 761.112 341 2.27 757.764 36' 2.28 754.445 38' 2.29 751.155 10.47 2.980170 2.977766 10.53 2.975375 10.58 2.972998 10.64 10.7C 859.922 2.934459 11.63 855.648 2.932295 11.69 2.930142 11.75 851.417 847.228 2.928000 11.80 843.080 2.925869 11.86 2.968282 10.76 2.965943 10.82 2.963616 2.961303 2.959001 C.O. 1 STA. 2.956711 11.05 2.954434 |1.11 2.952168 11.16 2.949915 11.22 2.947673 11.28 2.945442 11.34 11.40 2.943223 2.941015 2.938819 11.45 11.51 2.936633 11.57 10.27 10.93 IC.99 2.923747 2.921637 2.919536 11.92 11.98 12.04 2.917446 12.09 2.915365 12.15 781.840 778.307 774.806 771.336 2.887244 767.897 2.913295 12.21 2.911234 12.27 2.909183 12.33 2.907142 12.38 2.905111 12.44 799.997 2.903089 12.50 2.901076 12.56 796.299 792.634 2.899073 12.62 789.003 2.897079 12.67 785.405 2.895094 12.73 2.893118 12.79 2.891151 12.85 2.889193 12.91 12.96 2.885303 13.02 2.883371 13.08 2.881448 13.14 2.879534 13.20 2.877627 13.25 2.875730 13.31 747.894 744.661 2.871959 741.456 738.279 735.129 2.873840 13.37 13.43 2.870086 13.49 2.868221 13.55 2.866363 13.60 732.005 2.864514 13.66 728.909 2.862673 13.72 725.838 2.860840 13.78 722.793 719.774 2.859014 13.84 2.857196 13.89 ARC DEFINITION RADIUS R 954.930 949.654 944.436 2.975173 939.275 2.972793 934.170 2.970426 929.121 924.126 919.184 914.294 909.457 881.474 876.976 872.525 868.118 863.756 859.437 855.161 850.927 846.736 842.585 904.670 2.956490 899.934 2.954211 895.247 2.951943 2.949687 890.608 886.017 2.947442 838.475 834.405 830.374 826.381 822.427 818.511 814.632 810.789 806.983 803.212 799.476 795.775 792.108 788.474 784.874 781.306 777.771 774.267 770.795 767.354 763.944 760.563 757.213 753.892 750.600 LOG R 747.336 744.101 740.894 737.714 734.561 2.979971 2.977565 731.436 728.336 725.263 722.216 719.194 2.968072 2.965731 2.963402 2.961086 2.958783 2.945209 2.942988 2.940778 2.938579 2.936391 2.934214 2.932048 2.929892 2.927748 2.925616 2.923490 2.921377 2.919274 2.917181 2.915098 2.913025 2.910961 2.908908 2.906864 2.904830 2.902805 2.900790 2.898784 2.896787 2.894800 2.892821 2.890852 2.888891 2.886939 2.884996 2.883061 2.881135 2.879218 2.877309 2.875408 2.873516 2.871631 2.869756 2.867888 2.866028 2.864176 2.862332 2.860496 2.858667 2.856846 376 TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 8° 0' 2' 4' 6' 8' 10' 121 141 16' 18' 20' 22' 241 26' 281 30' 321 341 36' 38' 50' 52' 541 561 58' 6' 8' DEFL. PER FT OF STA. (MIN) 2.4 2.41 2.42 2.43 2.44 20' 221 2.45 2.46 2.47 40' 2.6 42' 2.61 441 2.62 46' 2.63 481 2.64 241 26' 28' 2.48 2.49 2.55 2.56 2.57 2.58 2.59 9° 0' 2.7 21 2.71 4' 2.72 10' 2.75 12' 2.76 [4¹ 2.77 16' 2.78 18' 2.5 688.156 685.419 2.51 2.52 682.704 2.53 680.010 2.54 677.338 2.73 2.74 2.8 2.81 2.82 2.83 2.84 30' 2.85 32' 2.86 341 2.87 RADIUS R 36' 2.88 381 2.89 CHORD DEFINITION LOG. R 2.65 649.274 2.66 646.838 2.67 644.420 2.68 642.021 2.69 639.639 40' 2.9 42' 2.91 ЦЦІ 2.92 46' 2.93 481 2.94 716.779 713.810 50' 2.95 521 2.96 541 2.97 56' 2.98 58' 2.99 710.865 707.945 705.048 702.175 699.326 696.499 693.696 690.914 674.686 672.056 669.446 666.856 664.286 621.203 618.974 2.79 616.760 661.736 659.205 656.694 654.202 651.729 637.275 634.928 632.599 630.286 627.991 625.712 623.450 614.563 612.380 610.214 608.062 605.926 603.805 601.698 599.607 597.530 595.467 593.419 591.384 589.364 587.357 585.364 583.385 581.419 579.466 577.526 575.599 2.855385 2.853583 2.851787 14.07 2.849999 14.13 2.848219 14.18 C.O. 1 STA. 2.846446 14.24 2.844679 14.30 2.842921 14.36 2.841169 14.42 2.839424 14.47 13.95 14.01 2.837687 14.53 2.835956 14.59 2.834232 14.65 2.832515 14.71 2.830805 14.76 2.829102 14.82 2.827405 14.88 2.825715 14.94 15.00 2.824032 2.822355 15.05 2.820685 15.11 2.819021 15.17 2.817363 15.23 2.815712 15.29 2.814067 15.34 2.812428 15.40 2.810796 15.46 2.809169 15.52 2.807549 15.58 2.805935 15.63 2.804327 15.69 2.802724 15.75 2.801128 15.81 2.799538 15.87 2.797953 15.92 2.788566 2.787021 2.777867 2.776360 2.774858 16.27 16.33 2.785482 16.39 2.783948 16.45 2.782420 16.50 2.780897 16.56 2.779379 16.62 16.68 16.74 16.79 2.773361 2.771870 2.770383 16.97 2.768902 17.03 2.767426 17.08 ARC DEFINITION 16.85 16.91 RADIUS R 2.765955 17.14 2.764489 17.20 17.26 2.763028 2.761572 17.32 2.760120 17.37 2.796374 15.98 625.045 2.794801 16.04 622.780 16.10 620.532 2.793234 2.791673 2.790117 716.197 2.855033 713.226 2.853227 710.278 2.851428 707.355 2.849638 704.456 2.847854 701.581 2.846078 698.729 2.844309 695.900 2.842547 693.094 690.311 687.549 684.810 682.093 679.397 676.722 16.16 618.300 16.21 616.084 661.105 658.572 656.059 653.564 651.088 648.632 646.193 643.773 641.371 638.986 636.620 634.271 631.939 674.068 2.828704 671.435 2.827004 668.822 666.23C 663.658 629.624 627.326 LOG R 613.883 611.699 609.530 607.376 605.237 603.114 601.005 598.911 596.831 594.766 592.715 590.678 588.655 586.646 584.651 2.840792 2.839045 2.837304 2.835570 2.833843 2.832123 2.830410 2.825311 2.823624 2.821944 2.820270 2.818603 2.816941 2.815288 2.814640 2.811998 2.810362 2.808732 2.807109 2.805492 2.803880 2.802275 2.800675 2.799081 2.797494 2.795911 2.794335 2.792764 2.791199 2.789640 2.788086 2.786538 2.784995 2.783457 2.781926 2.780399 2.778878 2.777362 2.775851 2.774346 2.772846 2.771351 2.769861 2.768376 2:766897 582.669 2.765422 580.700 2.763952 578.7452.762487 576.803 2.761028 574.874 2.759573 377 TABLE I-RADII, DEFLECTIONS, OFFSETS, ETC. DEGREE OF CURVE D 10° 0' 2' 41 6' 81 10' 12¹ 141 16' 181 201 221 241 26' 28' 3C' 321 341 361 38' 40' 42' 441 461 48' 50' 52' 541 56' 58' 11° 0¹ 21 41 6' 81 10' 12' 141 16' 18' 20' 22' 241 26' 28' 30' 321 341 361 38' 40' 42' 441 DEFL. PER FT OF STA. (MIN) 3.0 3.CI 3.02 3.03 3.C4 3.05 3.06 3.07 3.08 3.09 3.1 3.11 3.12 3.13 3.14 3.15 3.16 3.2 3.21 3.22 3.23 3.24 3.25 3.26 3.27 3.28 3.29 3.3 3.31 3.32 3.33 3.34 3.35 3.36 3.37 3.38 3.39 546.438 544.714 3.17 543.CCI 3.18 3.19 3.4 3.41 3.42 3.43 3.44 3.45 3.46 3.47 3.48 3.49 RADIUS R 3.5 3.51 3.52 46' 3.53 48' 3.54 CHORD DEFINITION LOG R 573.686 571.784 569.896 568.C2C 566.156 564.305 562.466 560.638 558.823 557.019 2.745870 555.227 553.447 551.678 549.920 548.174 541.298 539.606 536.253 534.593 532.943 531.303 529.673 528.053 526.443 524.843 523.252 521.671 520.ICC 518.539 2.758674 2.757232 2.755796 17.55 2.754364 17.61 2.752937 17.66 516.986 515.443 C.O. 1 STA. 2.744471 2.743076 17.43 17.49 2.751514 17.72 2.750096 17.78 2.748683 17.84 2.747274 17.89 17.95 537.924 2.730721 18.59 18.65 2.729370 2.728023 18.71 2.726681 2.725342 18.CI 18.07 2.741686 18.13 2.74C30C 18.18 2.738918 18.24 2.737541 18.30 2.736169 2.734800 18.36 18.42 2.733436 18.47 2.732C77 18.53 18.76 18.82 2.724CC8 18.88 2.722677 18.94 2.721351 19.00 2.72CC29 19.05 2.718711 19.11 2.717397 19.17 2.716087 19.23 2.714781 19.28 2.713479 19.34 2.712181 19.40 513.909 512.385 2.709596 2.71C887 19.46 19.52 510.869 2.70831C 19.57 509.363 2.707027 19.63 5C7.865 2.705748 19.69 506.376 2.704473 19.75 504.896 2.703202 19.81 503.425 2.701934 19.86 501.962 2.700671 19.92 500.507 2.69941C 19.98 499.061 2.698154 20.04 2.6969C1 20.10 497.624 496.195 2.695652 20.15 494.774 2.694407 20.21 493.361 2.693165 20.27 491.956 2.691926 20.33 490.559 2.690692 20.38 489.171 2.689460 20.44 487.790 2.688233 20.50 486.417 2.687C08 20.56 5C1 3.55 485.051 2.685788 20.62 3.56 483.694 521 2.684570 20.67 482.344 541 3.57 2.683357 20.73 561 3.58 481.CCI 2.682146 20.79 58! 3.59 479.666 2.680939 20.85 ARC DEFINITION RADIUS R 572.958 571.054 569.163 567.285 565.419 559.894 558.076 556.270 554.475 552.692 550.921 563.565 2.750944 561.723 2.749522 549.161 547.412 545.674 543.947 542.231 54C.526 538.832 528.884 527.262 525.649 524.047 522.454 520.871 519.297 517.733 516.178 514.633 513.097 511.569 510.051 5C8.542 507.C42 LOG R 498.224 496.784 495.353 493.929 492.514 2.758123 2.756667 491.107 489.708 488.316 2.755237 2.753801 2.75237C 537.148 2.73C094 535.475 2.728739 533.812 2.727388 532.159 2.726041 530.516 2.724699 486.933 485.557 2.748106 2.746693 2.745285 2.743882 2.742483 2.741089 2.7397CC 2.738314 2.736933 2.735557 2.734185 2.732817 2.731453 2.723360 2.722026 2.720696 2.719370 2.718048 2.71673C 2.715417 2.714106 2.712799 2.711497 5C5.551 504.068 502.595 501.129 2.699950 499.672 2.698685 2.710199 2.708905 2.707614 2.706327 2.705044 2.703765 2.702490 2.701218 2.697425 2.696168 2.694914 2.693665 2.692418 2.691176 2.689937 2.688701 2.687469 2.686241 484.19C 2.685015 482.830 2.683974 481.477 2.682576 480.132 2.681361 478.795 2.680149 378 DEGREE OF CURVE D 12° 0' 101 20' 30' 401 50' 13° 0' 10' 201 301 401 50' 14° 0' 10' 201 301 40' 50' 15° 0' 10¹ 20' 30' 40' 50' 16° 0' 10' 201 30' 40' 501 17° 0' 101 201 301 40' 50' 18° 0' 10' 201 30' 40' 50' 19° 0' 10' 201 30' 40' 50' 20° 0' 10' 20' 30' 401 50' 21° 01 101 20' 30' 40' 50' TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEFL. PER FT OF STA. (MIN) RADIUS R CHORD DEFINITION LOG R 3.6 3.65 20.91 21.19 2.62 2.66 3.7 478.339 2.679735 471.810 2.673767 465.459 2.667881 21.48 2.69 459.276 2.662074 21.77 2.73 453.259 2.656345 22.06 3.85 447.395 2.650691❘ 22.35 3.75 3.8 2.77 2.80 3.9 3.95 4.0 4.05 4.1 420.233 2.623490 23.80 4.15 415.194 2.618251 24.09 4.8 4.85 4.9 4.95 5.0 5.05 C.O. 1 STA. 4.2 4.25 4.3 410.275 2.613075 24.37 405.473 2.607962 24.66 400.782 2.602908 24.95 396.200 2.597914 25.24 391.722 2.592978 25.53 4.45 387.345 2.588097 25.82 4.35 4.4 4.5 4.55 4.6 383.065 2.583272 26.11 378.880 2.578501 26.39 374.786 2.573783 26.68 4.65 370.780 2.569116 26.97 366.859 2.564500| 27.26 363.022 2.559933 27.55 4.7 4.75 441.684 2.645111 22.64 2.84 2.88 436.117 2.639603 22.93 430.690 2.634164 23.22 2.91 425.396 2.628794 23.51 2.95 6.0 6.05 6.1 6.15 6.2 335.0132.525062 5.4 319.623 2.504638 | 31.29 5.45 316.715 2.500668 31.57 313.860 2.496736 31.86 5.5 5.55 31.056 2.492839 32.15 5.6 308.303 2.488978 32.44 5.65 305.599 2.485152 32.72 M.O. 1 STA. 359.265 2.555415 27.83 3.50 355.585 2.550944 28.12 3.53 351.98 2.546519 28.41 3.57 348.450 2.542140 28.70 3.61 344.990 2.537806 28.99 3.64 341.598 2.533516| 29.27 3.68 338.273 2.529268 29.56 3.72 29.85 3.75 30.14 3.79 2.516774 30.42 3.82 325.604 2.512690 | 30.71 5.35 322.585 2.508645 31.00 5.1 5.15 5.2 331.816 2.52C898 5.25 328.689 5.3 5.7 5.75 5.8 5.85 5.9 295.247 2.470186 33.87 292.770 2.466526 34.16 5.95 290.334 2.462897 2.462897 34.44 287.939 2.459300 34.73 285.583 2.455733 35.02 283.267 2.452195 35.30 280.988 2.448688 35.59 278.746 2.445209 35.87 6.25 276.541 2.441759 36.16 2.99 3.02 3.06 3.10 3.13 3.17 3.20 3.24 3.28 3.31 3.35 3.39 3.42 3.46 3.86 3.90 302.943 2.481361 33.01 4.16 300.333 2.477603 33.30 4.19 297.768 2.473878 33.58 4.23 3.94 3.97 4.01 4.04 4.08 4.12 4.26 4.30 4.34 4.37 4.41 4.45 4.48 4.52 4.56 6.3 274.370 2.438337 36.45 4.59 6.35 272.234 2.434943 36.73 4.63 6.4 270.132 2.431576 6.45 268.062 266.024 6.55 264.018 2.428235 2.428235 37.02 4.67 37.30 4.70 2.424921 2.424921 | 37.59 4.74 6.5 2.421633 37.88 4.78 RADIUS R ARC DEFINITION LOG R C.O. 1 STA. 477.465 2.678941 20.87 470.924 2.672951 | 21.15 464.560 2.667042 21.44 458.366 2.661213 21.73 452.335 2.655460 | 22.02 446.461 2.649783 | 22.30 440.737 2.644179 22.59 435.158 2.638647 22.88 429.718 2.633184 23.16 424.413 2.627789 | 23.45 419.237 2.622460 23.74 414.186 2.617196 24.03 409.256 2.611995 24.31 404.441 2.606855 24.60 399.738 2.601775 24.89 395.143 2.596755 25.17 390.653 2.591791 25.46 386.264 2.586884 | 25.74 381.972 2.582031 26.03 377.774 2.577232 26.32 373.668 2.572486 26.60 369.650 2.567791 26.89 365.718 2.563146 27.17 361.868 2.558550 27.46 358.099 2.554003 27.74 354.407 2.549502 28.03 350.790 2.545048 28.3! 347.247 2.540638 28.60 343.775 2.536274 28.89 340.371 2.531952 29.16 337.034 2.527673 29.45 333.762 2.523437 29.73 330.553 2.519241 30.02 327.404 2.515085 30.31 324.316 321.285 2.510968❘ 30.59 2.506890 30.87 318.310 2.502850 31.16 315.390 2.498847 31.44 312.522 2.494881 31.72 309.707 2.490951 32.00 306.942 2.487056 32.29 304.225 2.483195 32.58 301.557 298.934 2.479369 32.86 2.475576 33.14 296.357 2.471816 33.42 293.825 2.468087 33.71 291.334 2.464392 33.99 289.886 2.460727 34.27 281.783 279.492 277.238 275.020 286.479 2.457093 34.55 284.111 2.453488 34.83 2.449914 35.12 2.446369 35.40 2.442852 | 35.68 · 2.439364 35.96 272.837 2.435903 36.24 270.689 2.432470 36.52 268.574 2.429064 36.80 266.492 2.425684 37.08 264.442 2.422330 37.37 262.423 2.419002 37.65 379 DEGREE OF CURVE D 22° 0' ICI 201 301 40' 5C' 23° C' ICI 201 301 40' 50' 24° CI 10' 201 30' 40' 50' 25° O' ICI 2C' 301 40' 50' 26° 0' 301 27° 0' 30' 28° C' 30' 29° 0' 30' 30° 0' 32° O' TABLE I.-RADII, DEFLECTIONS, OFFSETS, ETC. DEFL. PER FT OF STA. (MIN) 6.7 6.75 6.8 6.85 6.9 6.95 7.0 7.05 7.1 7.15 6.6 262.042 2.418371 38.16 6.65 260.098 2.415134 38.45 258.180 2.411922 38.73 256:292 2.408734 39.C2 254.431 2.405571 39.30 252.599 2.402431 | 39.59 7.2 7.25 7.3 7.35 RADIUS R CHORD DEFINITION LOG R C.O. 1 STA. 8.4 8.55 250.793 2.399315 39.87 249.013 2.396222 | 40.16 247.258 2.393151 40.44 245.529 2.390103 | 40.73 243.825 2.387077 41.CI 242.144 2.384074 41.30 7.5 231.011 | 2.363633 | 43.29 7.55 229.506 2.360794 | 43.57 7.6 228.020 2.357974 43.86 7.65 226.555 2.355173 NOTE: 238.853 2.37813C 240.487 2.381091 41.58 5.26 41.87 5.29 2.375190 42.15 5.33 2.372270 | 42.44 5.37 234.C84 2.369371 42.72 7.45 232.537 2.366492 43.00 237.241 235.652 7.4 5.40 5.44 7.8 222.271 2.346882 44.99 7.95 218.150 2.338755 45.84 8.1 214.183 2.330785 46.69 8.25 210.362 2.322967❘ 47.54 M.O. 1 STA. 4.81 4.85 4.89 4.92 4.96 5.00 7.7 225.1C8 2.352391 44.42 5.62 7.75 223.68C 2.349627 44.71 5.C4 5.07 5.11 5.14 5.18 5.22 5.48 5.51 5.55 44.14 5.59 2C6.678 2.315295 48.38 203.125 2.307764 | 49.23 5.92 6.03 6.14 6.25 6.36 6.47 6.58 7.03 7.47 7.92 8.7 199.696 2.300370 50.08 8.85 196.385 2.293108 | 50.92 9.C 193.185 2.285974 51.76 181.398 2.258632 55.13 9.6 34° 01 10.2 36° 0' 10.8 8.37 9.04 38° 0' 11.4 41° 0' 12.3 44° C' 13.2 48° 0' 14.4 52° O' 15.6 9.72 171.015 2.233035 | 58.47 161.803 2.208988 61.80 153.578 2.186328 | 65.11 142.773 2.154645 70.04 133.473 2.125395 74.92 122.930 2.089657 81.35 10.63 14.058 2.057128 2.057128 87.67 11.54 104.787 2.020307 95.43 12.7C 94.354 1.974760 106.0 14.34 85.C65 1.929751 117.6 16.25 76.213 1.882027 131.2 18.69 67.817 1.831339 147.5 22.00 59.284 1.772941 168.7 27.43 57° 0' 17.1 64° 0' 19.2 72° C¹ 21.6 82° 0' 24.6 95° 0' 28.5 115° 0' 34.5 RADIUS R ARC DEFINITION 260.435 258.477 256.548 254.648 LOG R 5.66 5.70 220.368 2.343149 44.60 5.81 216.21C 2.334877 45.43 2.415700 37.93 2.412422 38.21 2.409169 | 38.49 2.405940 38.77 252.775 2.402735 39.05 250.93C 2.399553 39.33 249.112 2.396395 39.61 247.320 2.393259 39.89 245.553 2.390145 40.16 243.812 2.387C55 40.44 242.095 2.383985 40.72 240.402 2.380938 41.00 C.O. 1 STA. 238.732 2.377911 41.28 237.C86 2.374905 41.56 235.462 2.371921 41.84 233.860 2.368956 | 42.11 232.280 2.366012 | 42.39 230.721 2.363087 42.67 229.183 2.360183 42.95 227.665 | 2.357279 | 43.23 226.168 2.354430 43.50 224.689 2.351582 43.78 44.06 223.230 2.348753 221.790 2.345942 44.33 204.628 2C1.C38 212.207 2.326759 | 46.26 2.318790 47.08 208.348 2.310964 47.91 2.303278 48.72 2.295725 2.295725 49.55 197.572 194.223 2.288301 50.36 190.986 | 2.281001 51.18 179.049 2.252973 54.42 168.517 2.226644 | 57.62 159.155 2.201820 60.79 150.778 2.178339 63.93 139.746 2.145339 68.55 130.218 2.114669 | 73.09 119.366 2.076881 | 78.98 110.184 2.C42119 84.69 100.519 2.002248 91.55 89.525 1.951943 100.6 79.577 1.90079C 110.0 69.873 1.844309 120.3 1.780399 131.1 49.822 1.697425 141.8 60.311 The odd values of D between 30° and 115° are those whose arc-definition radil vary approximately from 190 feet to 50 feet by 10-ft intervals. For curves having exactly these radii, see Table V. 380 O ooooo 12345 6NOGO ooooo | ° 2° 4° 5° 70 8° 9° 10° OOOOO 11° 12° 13° 14° 15° 16° 17° 18° 19° 20° 21° 22° 23° 24° 25° 26° 27° 28° 29° 30° 32° 34° 36° 38° 41° 44° 48° 52° 57° 64° 72° 82° 95° 115° TABLE II.-LENGTHS OF ARCS AND TRUE CHORDS ARC FOR 1 STA. 100.001 100.005 100.011 100.020 100.032 100.046 100.062 100.081 100.103 100.127 100.154 100.183 100.215 100.249 100.286 100.326 100.368 100.412 100.460 100.510 100.562 100.617 100.675 ICO.735 100.798 100.863 100.931 101.002 101.075 101.152 101.312 101.482 101.664 101.857 102.166 102.500 102.986 103.516 104.246 105.394 106.896 109.073 112.445 118.992 CHORD DEFINITION OF D 1/10 STA. 10 10 10 10 10 10.01 10.01 10.01 10.01 10.01 10.02 10.02 10.02 10.02 10.03 10.03 10.04 10.04 10.04 10.05 10.06 10.06 10.07 10.07 10.08 10.08 10.09 10.10 10.11 10.11 10.13 10.15 10.16 10.18 10.21 10.25 10.30 10.35 10.42 10.53 10.68 10.90 11.23 11.88 TRUE CHORDS 1/4 STA. 5555 25 25 25 25 25.01 25.01 25.02 25.02 25.02 25.03 -25.04 25.04 25.05 25.06 25.07 25.08 25.09 25.10 25.11 25.12 25.13 25.14 25.16 25.17 25.19 25.20 25.22 25.23 25.25 25.27 25.31 25.35 25.39 25.43 25.51 25.59 25.70 25.82 25.98 26.26 26.61 27.12 27.91 29.44 1/2 STA. 50 50 50 50.01 50.01 50.02 50.02 50.03 50.04 50.05 50.06 50.07 50.08 50.09 50.11 50.12 50.14 50.16 50.17 50.19 50.21 50.23 50.25 50.27 50.30 50.32 50.35 50.38 50.40 50.43 50.49 · 50.56 · 50.62 50.69 50.81 50.94 51.12 51.31 51.59 52.01 52.57 53.38 54.63 57.03 1/4 STA. 25 ~~~~~ ~~~~~ ~~~~~ 25 25 25 25 25 25 25 25 25 25 25 25 25 ARC DEFINITION OF D 25 25 25 24.99 24.99 24.99 24.99 24.99 24.99 24.99 24.99 24.99 24.99 24.98 24.98 24.98 24.98, 24.98 24.97 24.97 24.97 24.96 24.95 24.95 24.94 24.92 24.90 24.87 24.82 24.74 TRUE CHORDS 1/2 STA. unuun ung 50 50 50 50 50 49.99 49.99 49.98 49.98 49.98 49.97 49.97 49.96 49.96 49.95 49.95 49.94 49.94 49.93 49.92 49.92 49.91 49.90 49.89 49.88 49.88 49.87 49.86 49.84 49.82 49.79 49.77 49.73 49.69 49.63 49.57 49.49 49.35 49.18 48.94 48.58 47.93 1 STA. 100 100 99.99 99.98 99.97 99.95 99.94 99.92 99.90 99.88 99.85 99.82 99.79 99.75 99.72 99.68 99.63 99.59 99.54 99.49 99.44 99.39 99.33 99.27 99.21 99.14 99.08 99.01 98.94 98.86 98.71 98.54 98.36 98.18 97.88 97.56 97.10 96.60 95.93 94.88 93.55 91.68 88.93 84.04 Chord Definition of D For degrees of curve not listed obtain excess arc per station approximately by interpolation, or exactly to 3 decimal places (up to D = 15°) from: Excess = 0.00127 D2 Arc Definition of D For degrees of curve not listed obtain chord deficiency per station approxi- mately by interpolation, or exactly to 2 decimal places (up to D = 30°) from: Deficiency = 0.00127 D2 381 TABLES III & IV.-CORRECTION COEFFICIENTS FOR SUBCHORDS Chord Definition of D The following table may be used to obtain true lengths of subchords not listed in Table II. Arc Definition of D The following table may be used to obtain true lengths of subchords not listed in Table II. For any degree of curve the small correction to be added to the nominal length in order to obtain the true length is almost a constant percentage of the excess of arc for 1 sta- tion on a curve of that degree. The maximum correction is required for a nominal sub- chord about 57.5 feet long. Nominal Subchord 5 10 HOONER IGUA AKUN NAUG 20 30 35 60 65 70 75 80 85 90 95 100 Ratio of Chord Correction to Excess Arc per Station .050 .099 .147 .192 .234 .273 .307 .336 .359 .375 .383 .384 .375 .357 .328 .288 .236 .171 .093 0 HIDD EXAMPLE. Given: a 20° curve. Required: true sub- chord for 75-ft nominal length. - Solution: Excess arc per sta.=0.510 (from Table II). Corr.=0.510X0.328 0.17. Add corr. to nominal length giving true subchord=75.17. For subchords not listed, interpolate for correction co- efficients. For any degree of curve the small correction to be sub- tracted from an arc length in order to obtain the true chord length is almost a constant percentage of the chord defi- ciency for a 100-foot arc on a curve of that degree. These percentages vary approxi- mately as the cubes of the arc lengths. Length of Arc 5 PO42 ROG FOBO BR858 20 25 30 35 40 50 55 60 75 80 90 95 100 Ratio of Chord Correction to Chord Deficiency for 100-ft Arc .0001 .0010 .0034 .0080 .016 .027 .043 .064 .091 .125 .166 .216 .275 .343 .422 .512 .614 .729 .857 1 EXAMPLE. Given: a 25° curve. Required: true sub- chord for 75-ft arc. Solution: Chord def. per sta.=0.79 (from Table II). Corr.=0.79×0.422=0.33. Subtract corr. from arc giv- ing true subchord=74.67. For arcs not listed, note that correction coefficients are proportional to the cubes of the arcs. 382 RADIUS FT 80 90 ICO 110 50 60 70 24.555 150 16C 170 180 190 200 225 250 275 3C0 TABLE V.-EVEN-RADIUS CURVES. DEFLECTIONS AND CHORDS DEFL. MIN PER FT OF ARC 17.189 2°51.89' 15.626 2°36.26' 120 14.324 2°23.241 130 140 65C 700 750 800 850 900 950 1000 1050 IICC 1200 1300 1400 1500 1600 34.377 5°43.78' 28.648 4°46.48' 4°05.55¹ 10 FT 21.486 3°34.86' 19.099 3°10.99' DEFLECTIONS FOR ARCS OF 325 350 375 4.584 400 425 13.222 2°12.22' 12.278 2°02.78' 450 3.820 475 500 550 600 11.459 1°54.59' 10.743 1°47.43' 10.111 1°41.11 9.549 9.047 1°35.49' 1°30.471 25 FT 3°34.86' 8.594 7.639 3°10.991 6.875 2°51.89' 6.250 2°36.26' 5.73C 2°23.24' 5.289 2°12.221 4.911 2°02.78' 1°54.59' 4.297 1°47.43! 4.044 1°41.111 1°35.49! 3.619 1°30.47' 3.438 1°25.94' 3.235 1°18.13' 2.865 1°11.62' 2.644 1°06.11 2.455 1°01.39' 2.292 0°57.30' 2.149 0°53.71' 2.022 0°50.56' 1.910 0°47.75' 1.809 0°45.23' 1.719 0°42.97' 1.637 0°40.93' 1.563 0°39.071 1.432 0°35.811 1.322 0°33.06' 1.228 0°30.69' 1.146 0°28.65' 1.074 0°26.86' 1.011 0°25.28' 1700 1800 0.955 0°23.87' 1900 0.905 0°22.62' 2000 0.859 0°21.49' 2100 0.819 0°20.46' 2300 2200 0.781 0°19.53' 0.747 0°18.68' 0.716 C°17.911 2400 2500 0.688 0°17.19' 2600 0.661 0°16.53' 25 FT 14°19.441 11°56.20' 10°13.88' 8°57.15' 7°57.46' 7°09.72¹ 6°30.65' 5°58.10' 5°30.55' 5°06.94' 4°46.48' 4°28.58' 4°12.77' 3°58.73¹ 3°46.17' 50 FT 7°09.72' 6°21.97' 5°43.78' 5°12.52' 4°46.48 4°24.441 4°05.55' 3°49.18' 3°34.86' 3°22.221 3°10.99' 3°00.93' 2°51.891 2°36.26' 2°23.241 2°12.22' 2°02.78' 1°54.59' 1°47.43' 1°41.11' 1°35.49' 1°30.47' 1°25.94' 1°21.85' 1°18.131 1°11.62' 1°C6.111 !°CT.391 0°57.30' 0°53.72' 0°50.56' C°47.75' C°45.23' C°42.97' 0°40.93' 0°39.C7' 0°37.37! 0°35.811 0°34.38' 0°33.06' 100 FT 57°17.75' 47°44.79 40°55.53' 35°48.591 31°49.86' 28°38.87' 26°02.61' 23°52.39' 22°02.21 20°27.77' 19°C5.92' 17°54.301 16°51.IC' 15°54.93' 15°C4.67' 14°19.441 12°43.941 11°27.55' 10°25.05' 9°32.96' 8°48.88 8° | | . || ' 7°38.37! 7°09.72' 6°44.441 6°21.97' 6°C1.87' 5°43.771 5°12.52' 4°46.48' 4°24.44 4°05.55' 3°49.181 3°34.86' 3°22.221 3°10.99' 3°00.931 2°51.89' 2°43.70¹ 2°36.26' 2°23.241 2°12.22¹ 2°C2.78' 1°54.59' 1°47.431 1°41.111 1°35.49' 1°30.471 1°25.94' 1°21.851 1°18.13' 1°14.731 1°11.62' 1°08.75' 1°06.11 10 FT 9.98 24.74 24.82 24.87 9.99 9.99 CHORDS FOR ARCS OF IC 24.90 24.92 10 IC ãããoо UOUOO OOUOU 10 IC 10 24.93 95.89 24.95 96.59 97.13 IC 24.96 97.55 24.96 97.88 10 10 IC 10 IC 25 FT 24.98 24.99 •~~~~ 24.99 25 25 25 ~~~~~ 25 50 FT 49.87 98.96 49.90 99.18 99.34 49.93 99.45 24.99 49.92 24.99 24.99 49.94 99.54 25 annnn 25 25 ~~~~~ 25 25 nnn⌁N 25 25 ~~~~~ 25 25 VANNY 25 25 ~~~~~ 25 25 VANNY 25 25 25 ~~~~~ V⌁⌁⌁ 25 25 25 25 ~~~~~ 25 ⌁⌁⌁⌁⌁ 25 25 25 25 25 FT ⌁⌁⌁⌁n 25 25 25 25 25 24.96 24.97 24.97 24.97 24.98 24.98 49.95 49.96 49.96 49.97 49.97 49.97 49.98 49.98 49.98 49.99 49.99 10000 00000 0.00 0.00 0.00 49.99 50 50 50 50 50 50 50 50 50 50 50 50 50 50 50 5C 50 5C 50 50 5C 100 FT 5C 84.15 88.82 91.73 50 93.62 94.94 98.16 98.38 98.57 98.72 98.85 99.61 99.66 99.70 99.74 99.77 99.79 99.82 99.83 99.86 99.89 99.90 99.92 99.93 99.93 99.94 99.95 99.95 99.96 99.96 99.96 99.97 99.97 99.98 99.98 99.98 99.99 99.99 ICO ICC IOC ICC 100 IOC ICC ICO 383 RADIUS FT 2700 2800 2900 3CCC 3100 3200 3300 3400 3500 3600 3700 3800 3900 4000 4100 4500 5000 5500 6000 6500 7000 7500 8000 9000 10000 NOTES: TABLE V.-EVEN-RADIUS CURVES. DEFLECTIONS AND CHORDS DEFL. MIN PER FT OF ARC C.637 C.614 0.593 C.573 0.555 25 FT DEFLECTIONS FOR ARCS OF 0° 15.911 0°15.35' 0°14.82 0°14.321 0°13.86' C.537 0°13.431 C.521 0°13.C2' 0.506 0°12.64' C.491 0°12.28¹ C.477 C. 191 C. 172 0°11.941 C.465 0°11.611 C.452 0°11.311 0.441 0°11.02' C.430 C°IC.741 0.419 0°IC.48¹ C.382 C°09.55' 0.344 C°C8.59' C.313 0°07.81' 0.286 0°07.16' 0.264 C°06.61' C.246 0°C6.141 C.229 C°C5.73' 0.215 C°C5.371 C°C4.771 C°C4.30' 50 FT 0°31.83' 0°3C.69' 0°29.641 C°28.65' 0°27.72¹ C°26.86' 0°26.04' 0°25.28' C°24.56! 0°23.87' C°23.23' 0°22.62' C°22.04' 0°21.49' 0°2C.96' 0°19.10' 0°17.19' 0°15.63' 0°14.32' 0°13.22' 0°12.28¹ 0°11.46' 0°IC.74' 0°09.551 0°C8.59' 100 FT = 1°03.66' T°CI.39' 0°59.27! 0°57.30' C°55.451 C°53.711 0°52.09' 0°50.55' 0°49.11' 0°47.75' 0°46.46' C°45.23' 0°44.C71 0°42.97' 0°41.92' C°38.20' 0°34.38' C°31.25' C°28.65' C°26.441 C°24.56' 0°22.92' 0°21.49' 0°19.10' C°17.19' CHORDS FOR ARCS OF 25 FT ~~~~~ ~~~~~ ~~~~~ ~~~~~ ~~~~~ 25 слепя спел сполосся слося слоя спепел слоя слепелся сл 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 25 50 FT × Arc Length 50 50 88888 88888 50 50 50 50 50 50 50 50 50 50 ggggཤྩ ggggg ggg 50 50 50 50 50 50 50 50 50 50 50 50 50 100 FT 100 100 ICO ICC ICC ICC ICC ICC IOC ICC ICC ICC ICC ICC ICC Degree of Curve (arc definition) = twice the deflection for a 100-ft arc. Deflections for even-radius curves or arcs not listed may be computed from: 1718.873 1718 R Defl. (in minutes) ICC ICC 100 IOC ICC 100 ICC ICO ICO 100 Chords not listed may be obtained by interpolation or computed from: Chord = 2R sin Defl. Total length of curve may be determined by use of Table VI. See Art. 5-|| for selection of spirals for even-radius curves. 384 DEG 1234 augue bajuд 55555 55 wwwww wwwwww~~~~ ~~~ Ñ-Ō 600 voc 10 11 12 13 14 15 17 18 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 39 40 41 43 45 47 50 53 60 ெ TABLE VI.-LENGTHS OF CIRCULAR ARCS; RADIUS=1 (Degrees, Minutes, and Seconds to Radians) LENGTH 0.017 45 329 .034 90 659 .052 35 988 .069 81 317 0.087 26 646 .104 71 976 .122 17 305 .139 62 634 .157 07 963 0.174 53 293 .191 98 622 .209 43 951 .226 89 280 .244 34 610 0.261 79 939 .279 25 268 .296 70 597 .314 15 927 .331 61 256 0.349 06 585 .366 51 914 .383 97 244 .401 42 573 .418 87 902 0.436 33 231 453 78 561 .471 23 890 .488 69 219 .506 14 548 0.523 59 878 .541 05 207 .558 50 536 .575 95 865 .593 41 195 0.610 86 524 .628 31 853 .645 77 182 .663 22 512 .680 67 841 DEG 61 62 63 64 0.959 93 109 0.977 38 438 0.994 83 767 1.012 29 097 1.029 74 426 1.047 19 755 65 66 67 68 69 PENNE POROº 8.*** 88... a.dk. Kukan code 2008 92 95 96 97 98 0.698 13 170 .715 58 499 .733 03 829 100 101 102 .750 49 158 103 .767 94 487 104 0.785 39 816 105 .802 85 146 106 .820 30 475 .837 75 804 107 .855 21 133 109 0.872 66 463 .890 11 792 .907 57 121 ...925 02 450 .942 47 780 110 111 112 113 114 115 116 117 118 119 120 LENGTH 1.064 65 084 .082 10 414 .099 55 743 .117 01 072 1.134 46 401 .151 91 731 .169 37 060 .186 82 389 .204 27 718 1.221 73 048 .239 18 377 .256 63 706 .274 09 035 .291 54 365 1.308 99 694 .326 45 023 .343 90 352 .361 35 682 .378 81 011 MIN -23ª 2 3 4 1.832 59 571 .850 04 901 .867 50 230 56 KONOM ONMI MONOR ONE ON ONE FOR CE 9599 ANKZ KUNANO .884 95 559 5 6 7 8 9 10 11 12 13 14 15 16 17 18 1.396 26 340 .413 71 669 .431 16 999 .448 62 328 .466 07 657 24 19 20 21 22 1.483 52 986 25 .500 98 316 .518 43 645 .535 88 974 28 .553 34 303 29 23 26 1.570 79 633 30 27 .588 24 962 31 .605 70 291 32 .623 15 620 33 .640 60 950 34 1.658 06 279 35 .675 51 608 36 .692 96 937 37 .710 42 267 38 .727 87 596 39 1.745 32 925 40 .762 78 254 .780 23 584 41 42 .797 68 913 43 .815 14 242 44 45 46 47 48 .902 40 888 49 1.919 86 218 50 .937 31 547 51 .954 76 876 .972 22 205 .989 67 535 54 52 53 2.007 12 864 55 .024 58 193 56 .042 03 522 57 58 .059 48 852 .076 94 181 59 .094 39 510 60 LENGTH .000 29 089 0 58 178 0 87 266 1 16 355 .001 45 444 I 74 533 2 03 622 2 32 711 2 61 799 .002 90 888 3 19 977 3 49 066 3 78 155 4 07 243 .004 36 332 4 65 421 4 94 510 SEC .011 63 553 11 92 642 12 21 730 12 50 819 12 79 908 .013 08 997 13 38 086 13 67 175 13 96 263 14 25 352 .014 54 441 14 83 530 15 12 619 15 41 708 15 70 796 1231 UK DULU EESES £5 wwwwwwwwww ~~~~~ ~~ GOVOG FŵÑ=Ō 600 vo .015 99 885 16 28 974 16 58 063 16 87 152 17 16 240 17 45 329 10 5 23 599 18 5 52 688 15 .005 81 776 20 6 10 865 21 6 39 954 22 24 6 69 043 23 6 98 132 .007 27 221 7 56 309 7 85 398 8 14 487 8 43 576 .008 72 665 9 01 753 9 30 842 9 59 931 9 89 020 17 25 26 27 28 29 .010 18 109 35 10 47 198 10 76 286 37 II 05 375 11 34 464 38 39 40 30 31 32 33 34 44 47 48 50 52 53 54 55 56 57 տ 58 59 60 LENGTH .000 00 485 00 970 01 454 01 939 .000 02 424 02 909 03 394 03 879 04 363 .000 04 848 05 333 05 818 06 303 06 787 .000 07 272 07 757 08 242 08 727 09 211 .000 09 696 10 181 10 666 11 151 11 636 .000 12 120 12 605 13 090 13 575 14 060 .000 14 544 15 029 15 514 15 999 16 484 .000 16 969 17 453 17 938 18 423 18 908 .000 19 393 19 877 20 362 20 847 21 332 .000 21 817 22 301 22 786 23 271 23 756 .000 24 241 24 726 25 210 25 695 26 180 .000 26 665 27 150 27 634 28 119 28 604 29 089 385 MIN FELLE DELU 56565 55 wwww wwww XNK EN OG FUN-0 6000 VOG IWN-0 8 10 14 15 16 17 18 19 20 21 22 ~~ ~~~~~ MMMMM MMMMM 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 And TABLE VII.-MINUTES AND SECONDS IN DECIMALS OF A DEGREE 0 .0000 .0167 .0333 .C500 .0667 .0833 .ICCO .1167 .1333 .1500 .1667 .1833 .2000 .2167 .2333 .25CC .2667 .2833 .3000 .3167 .3333 .350C 3667 .3833 .4000 .4167 .4333 .4500 .4667 4833 .5000 .5167 .5333 .5500 .5667 .5833 .6000 .6167 .6333 .6500 .6667 .6833 .7000. .7167 .7333 .7500 .7667 .7833 .8000 .8167 .8333 .8500 .8667 .8833 .9000, .9167 .9333 .9500 .9667 .9833 10 .0028 .C194 .0361 .C528 .0694 .086 I .1028 .1194 .1361 .1528 .1694 .1861 .2028 .2194 .2361 .2528 .2694 .2861 .3028 .3194 .3361 .3528 .3694 .3861 .4028 .5028 .5194 .5361 .5528 .5694 .5861 .6028 .6194 .6361 .6528 .6694 .6861 .7028 .7194 .7361 .4194 .4361 .4528 .4542 .4694 .4708 .4861 .4875 .7528 .7694 .7861 .8028 .8194 .8361 .8528 .8694 .886I .9028 15 -.9194 .936) .9528 .9694 .9861 .0042 .0208 .C375 .0542 .0708 .C875 .1042 .1208 .1375 .1542 .1708 .1875 .2042 .2208 .2375 .2542 .2708 .2875 .3042 .3208 .3375 .3542 .3708 .3875 .4042 .4208 4375 .5042 .5208 .5375 .5542 .5708 .5875 .6042 .6208 .6375 .6542 .6708 .6875 .7042 .7208 .7375 .7542 7708 .7875 .8042 .8208 .8375 .8542 .8708 .8875 .9042 .9208 .9375 .9542 .9708 .9875 20 SECONDS .0056 .C222 .0389 .C556 .C722 .C889 .1056 .1222 .1389 .1556 .1722 .1889 .2C56 .2222 .2389 .2556 .2722 .2889 .3056 .3222 .3389 .3556 .3722 .3889 .4056 .4222 4389 .4556 .4722 .4889 .5056 .5222 .5389 .5556 .5722 .5889 .6056 .6222 .6389 .6556 .6722 .6889 .7056 .7222 .7389 .7556 .7722 .7889 .8056 .8222 .8389 .8556 .8722 .8889 .9056 .9222 .9389 .9556 .9722 .9889 30 .0083 .0250 .C417 .C583 .075C .C917 .IC83 .1250 .1417 .1583 .175C .1917 .2083 .225C .2417 .2583 .2750 .2917 .3083 .3250 .3417 .3583 .3750 .3917 .4083 .4250 .4417 .4583 .4750 .4917 .5083 .5250 .5417 .5583 .575C .5917 .6083 .6250 .6417 .6583 .6750 .6917 .7083 .7250 .7417 .7583 .775C .7917 .8083 .8250 .8417 .8583 .8750 .8917 .9083 .9250 .9417 .9583 .9750 .9917 40 .CIII .0278 .C444 .0611 .0778 .C944 | | | | * .1278 .1444 .1611 .1778 .1944 .2111 .2278 .2444 .2611 .2778 .2944 .3111 .3278 .3444 .3611 .3778 .3944 .4111 .4278 .4444 .4611 .4778 .4944 .5111 .5278 .5444 .5611 .5778 .5944 .6111 .6278 .6444 .6611 .6778 .6944 .7111 .7278 .7444 .7611 .7778 .7944 .8111 .8278 .8444 .8611 .8778 .8944 .9111 .9278 .9444 .9611 .9778 .9944 45 .C125 .C292 .0458 .0625 .C792 .0958 .1125 .1292 .1458 .1625 .1792 .1958 .2125 .2292 .2458 .2625 .2792 .2958 .3125 .3292 3458 .3625 .3792 .3958 .4125 .4292 .4458 .4625 .4792 .4958 .5125 .5292 .5458 .5625 .5792 .5958 .6125 .6292 .6458 .6625 .6792 .6958 .7125 .7292 .7458 .7625 .7792 .7958 .8125 .8292 .8458 .8625 .8792 .8958 .9125 .9292 9458 .9625 .9792 .9958 50 .C139 .0306 .C472 .0639 .0806 .C972 1139 .1306 .1472 .1639 .1806 .1972 .2139 .2306 .2472 .2639 .2806 .2972 .3139 .3306 3472 .3639 3806 .3972 .4139 .4306 .4472 .4639 .4806 4972 .5139 .53C6 .5472 .5639 .5806 .5972 .6139 .6306 .6472 .6639 .6806 .6972 .7139 .7306 .7472 .7639 .7806 .7972 .8139 .83C6 .8472 .8639 .8806 .8972 .9139 .9306 .9472 .9639 .9806 .9972 386 TABLE VIII. TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) Explanation Chord Definition of Degree of Curve (De) MATHEMATICAL RELATIONS 1. 50 sin D. = 200 R la. De 2. = 2a. T- = 3a. E 5,730 R T1° 3. ER exsec = T = R tan¦ I……..exactly 2. Dc E₁º Dc • 1 醾 ​• • exactly 1. approx. Arc Definition of Degree of Curve (Da) approx. la. Da MATHEMATICAL RELATIONS · approx. ...exactly 3. T=3,919.5X E=1,212.3X Da 2a. T 3 26 3 26 3a. E = * 5,729.58 R 5,730 Ꭱ T = R tan I....exactly = .exactly Table VIII gives values of T and E for a 1° curve having various central angles. The values may be considered correct for both the chord definition and the arc definition of D, since the difference in R for D= 1° is only seven units in the sixth significant figure. To find T and E for any given values of I and D, use relations 2a and 3a, as in the following example: Given: I=68°45', D=8°40′. (Note: To avoid lack of precision in calculation, use D as EXAMPLE. 2 26 3' instead of 8.666 ...) For Arc Definition of D, T1° Da E1° · E = R exsec I...exactly ...exactly Da ..exactly 452.25 · = 139.88 approx. ..exactly For Chord Definition of D, T= Arc-definition value plus correction of 0.43 found from Table IX by interpolation; or T=452.68 E-Arc-definition value plus correction of 0.14 found from Table X by interpolation; or E=140.02 387 D TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) T 0-231 DONO ONE ON M2 KO700 27~m7 ❤❤♪❤8 22 400 850HZ KONAA 6 8 9 10 12 13 14 20 21 22 23 24 15 12.5 C.C 25 16 13.3 C.C 17 14.2 O.C 18 15.C 0.0 19 15.8 0.0 27 28 29 30 36 20.8 C.C 26 21.7 0.0 22.5 C.O 23.3 C.C 24.2 0.1 37 38 39 40 41 42 43 T 25.0 C.I 31 25.8 0.1 32 33 34 44 1 = 0° 35 29.2 52 E 0.0 C.C 0.8 0.0 1.7 0.0 0.0 2.5 3.3 C.C 53 4.2 C.O 5.0 0.0 5.8 0.0 6.7 0.0 7.5 0.0 54 8.3 C.C 9.2 0.0 10.0 0.0 10.8 0.0 11.7 0.0 55 16.7 0.0 17.5 0.0 18.3 C.0 19.2 0.0 20.0 0.0 26.7 0.1 27.5 0.1 28.3 C. I 45 37.5 C.I 46 38.3 0.1 47 39.2 0.1 48 40.0 C.I 49 40.8 0.1 41.7 0.2 51 42.5 0.2 43.3 C.2 44.2 0.2 45.0 0.2 0.1 30.0 C.I 30.8 C.I 31.7 C.I 32.5 0.1 33.3 0.1 34.2 C.1 35.0 0.1 35.8 C.I 36.7 C.I 45.8 0.2 56 46.7 C.2 57 47.5 0.2 58 48.3 0.2 59 49.2 C.2 T 1 = 1° 50.0 50.8 51.7 52.5 53.3 LUJ 58.3 59.2 E C.2 C.2 C.2 C.2 0.2 54.2 C.3 55.0 0.3 55.8 C.3 56.7 C.3 57.5 0.3 0.3 0.3 60.C 0.3 60.8 0.3 61.7 0.3 62.5 C.3 63.3 C.4 64.2 0.4 65.C 0.4 65.8 0.4 66.7 0.4 67.5 C.4 68.3 C.4 69.2 C.4 70.0 C.4 70.8 0.4 71.7 0.4 72.5 C.5 73.3 C.5 74.2 C.5 75.0 C.5 75.8 0.5 76.7 0.5 77.5 0.5 78.3 0.5 1 = 2° T 100.0 0.9 ICC.8 C.9 ICI.7 0.9 102.5 0.9 103.3 C.9 104.2 105.0 IC5.8 IC6.7 107.5 112.5 113.3 114.2 115.0 115.9 116.7 117.5 E IC8.3 109.2 110.0 110.8 1.1 1|1.7 1.1 118.4 119.2 120.0 C.9 1.0 1.0 1.0 1.0 129.2 130.0 130.9 131.7 132.5 1.0 1.C 1. I I. J 1.I 1.2 1.2 1.2 1.2 1.2 1.2 1.3 120.9 1.3 121.7 1.3 122.5 1.3 123.4 1.3 124.2 1.3 125.C 1.4 125.9 1.4 126.7 1.4 127.5 1.4 128.4 1.4 79.2 0.5 80.0 C.6 80.8 C.6 81.7 0.6 82.5 133.4 0.6 134.2 135.C C.6 83.3 C.6 84.2 85.C C.6 85.8 C.6 86.7 C.7 87.5 0.7 88.3 0.7 89.2 0.7 90.0 C.7 90.8 0.7 91.7 C.7 141.7 1.8 92.5 0.7 142.5 1.8 93.3 0.8 143.4 1.8 94.2 0.8 144.2 1.8 95.C 0.8 145.C 1.8 95.8 0.8 145.9 1.9 96.7 0.8 146.7 1.9 97.5 C.8 147.5 1.9 98.3 C.8 148.4 1.9 99.2 0.9 149.2 1.9 135.9 136.7 137.5 1.7 138.4 1.7 139.2 140.C 140.9 1.5 1.5 1.5 1.5 1.5 1.6 1.6 1.6 1.6 1.6 1 = 3° T E 150.0 150.9 151.7 2.C 152.5 2.0 153.4 2.1 2.0 2.0 154.2 155.C 155.9 156.7 2.1 157.5 2.2 2.1 2.1 2.1 158.4 2.2 159.2 2.2 160.0 2.2 160.9 2.3 161.7 2.3 162.5 2.3 163.4 2.3 164.2 2.4 165.0 2.4 165.9 2.4 166.7 2.4 167.6 2.4 168.4 2.5 169.2 2.5 170.1 2.5 170.9 2.5 171.7 2.6 172.6 2.6 173.4 2.6 174.2 2.6 175.1 2.7 175.9 2.7 176.7 2.7 177.6 2.8 178.4 2.8 179.2 2.8 180.1 2.8 180.9 2.9 181.7 182.6 2.9 183.4 2.9 184.2 3.0 185.1 3.0 185.9 186.7 3.C 3.0 | = 4 187.6 3.1 188.4 3.1 1.7 189.2 1.7 1.7 3.1 190.1 3.2 190.9 3.2 T 2CC. I 200.9 201.8 3.6 202.6 3.6 203.4 3.6 204.3 205. I 205.9 206.8 207.6 208.4 209.3 210.1 210.9 211.8 212.6 213.4 214.3 215.1 215.9 216.8 217.6 218.4 219.3 220. I 220.9 221.8 222.6 223.4 224.3 E 225. I 226.0 226.8 227.6 228.5 3.5 3.5 3.7 3.7 3.7 6 0-23A 1231 MONDO O-NE DONOR OU202 20700 870M7 MOM08 2007 2000 OMZ KONAA 5 3.7 8 3.8 9 7 3.8 10 3.8 3.9 12 3.9 13 3.9 14 3.9 15 4.0 16 4.0 17 4.0 18 4.1 19 4.1 4.1 21 4.3 4.2 22 4.2 23 4.2 24 4.3 25 4.3 26 4.4 28 4.4 29 4.4 30 4.5 31 4.5 32 4.5 33 229.3 230.I 231.C 2.9 231.8 4.7 38 4.6 34 4.6 35 4.6 36 4.7 37 232.6 4.7 39 233.5 4.8 40 234.3 4.8 41 235.1 4.8 42 236.0 4.9 43 191.7 3.2 192.6 3.2 193.4 3.3 194.2 3.3 195.1 244.3 5.2 3.3 245.2 5.2 195.9 3.3 196.7 3.4 197.6 3.4 198.4 3.4 199.2 3.5 236.8 4.9 44 237.6 4.9 45 238.5 5.0 46 239.3 5.C 47 246.C 5.3 246.8 247.7 5.3 240.1 5.0 48 241.C 5.1 49 241.8 5.1 50 242.6 5.151 243.5 5.2 52 53 54 55 5.356 57 248.5 5.4 58 249.3 5.4 59 388 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) T 01234 FOTOD 0-231 567 5 0 250.2 5.5 7 9 254.3 5.6 6 255.2 5.7 256.C 5.7 5.8 257.7 5.8 12 T 8 256.8 | = 22222 207~~~ 87~37 68788 222 700 85NOT BONGO 21 5° 251.0 28 29 30 E 300.3 5.5 3C1.I 251.8 5.5 301.9 252.7 5.6 302.8 253.5 5.6 303.6 15 262.7 6.0 16 263.5 6.1 17 264.4 6.1 18 265.2 6.1 19 266.0 6.2 308.6 258.5 5.8 259.3 5.9 309.5 260.2 5.9 310.3 261.0 5.9 311.1 312.0 14 261.9 6.0 48 T 275.2 6.6 276.1 6.6 276.9 6.7 32 33 277.7 34 278.6 6.8 35 279.4 6.8 36 280.2 6.9 37 281.1 6.9 38 281.9 6.9 -39 282.7 7.0 1 = 6° 20 266.9 6.2 267.7 6.3 268.5 6.3 23 269.4 6.3 317.0 8.8 317.8 8.8 318.7 8.9 319.5 8.9 24 270.2 6.4 320.3 8.9 25 271.0 6.4 321.2 9.0 26 271.9 6.4 322.0 9.0 272.7 6.5 322.8 9.1 273.5 6.5 323.7 9.1 274.4 6.6 324.5 9.2 E 7.9 7.9 8.0 8.0 8.0 8.1 304.5 305.3 8.1 306.1 8.2 307.0 8.2 307.8 8.3 55 296. I 7.6 56 296.9 7.7 57 297.8 7.7 298.6 7.8 58 59 299.4 8.3 8.4 8.4 8.4 8.5 312.8 8.5 313.7 8.6 314.5 8.6 315.3 8.7 316.2 8.7 325.4 326.2 327.0 9.3 6.7 327.9 9.4 328.7 9.4 329.5 9.5 330.4 9.5 331.2 9.6 332.0 9.6 332.9 9.7 40 283.6 7.0 333.7 9.7 42 43 286. I 41 284.4 7.1 334.6 9.8 285.2 7.1 335.4 9.8 7.1 336.2 9.9 7.2 337.1 9.9 45 287.7 7.2 288.6 7.3 44 286.9 337.9 10.0 338.7 10.0 46 47 289.4 7.3 339.6 10.I 340.4 10.1 290.3 7.3 49 291.1 7.4 341.2 10.2 9.2 9.3 50 291.9 7.4 342.1 10.2 51 292.8 7.5 342.9 10.3 293.6 7.5 343.7 10.3 52 53 294.4 7.6 344.6 10.4 345.4 10.4 54 295.3 7.6 T 1 = 7° 350.4 351.3 10.7 10.8 352.1 10.8 352.9 10.9 353.8 11.0 354.6 355.5 346.3 E 357.1 358.0 11.0 II.C 1. I 11.1 11.2 11.5 11.5 363.C 363.8 364.7 11.6 365.5 11.6 366.3 11.7 367.2 11.8 368.0 11.8 368.8 11.9 369.7 11.9 37C.5 12.0 371.4 12.0 372.2 12.1 373.0 12.1 373.9 12.2 374.7 12.2 375.5 12.3 376.4 12.3 377.2 12.4 378.1 12.5 378.9 12.5 379.7 12.6 380.6 12.6 381.4 12.7 382.2 12.7 383.1 12.8 383.9 12.8 384.7 12.9 385.6 386.4 13.0 13.0 387.3 13.1 388. I 388.9 13.1 13.2 389.8 13.2 390.6 13.3 391.4 13.4 392.3 13.4 393.1 13.5 394.0 394.8 395.6 13.6 13.5 13.6 346.3 10.5 396.5 13.7 347.1 10.5 397.3 13.8 347.9 10.6 398.1 13.8 348.8 10.6 399.0 13.9 7.8 349.6 10.7 399.8 13.9 · 1 = 8° T E 358.8 11.2 359.6 11.3 409.0 14.6 409.9 14.6 11.3 410.7 14.7 361.3 11.4 411.5 14.8 362.2 412.4 14.8 360.5 11.4 400.7 14.C. 401.5 14.1 402.3 14.1 403.2 14.2 404.0 14.2 404.8 14.3 405.7 14.3 406.5 14.4 407.4 14.5 408.2 14.5 413.2 14.9 414.1 14.9 414.9 15.0 415.7 15.1 416.6 15.1 417.4 15.2 418.2 15.2 419.1 15.3 419.9 15.4 420.8 15.4 421.6 15.5 422.4 15.6 423.3 15.6 424.1 424.9 15.7 15.7 425.8 15.8 426.6 15.9 427.5 15.9 428.3 16.0 429.1 16.0 430.0 16.1 430.8 16.2 431.7 16.2 432.5 16.3 433.3 16.4 434.2 16.4 435.C 16.5 435.8 16.6 436.7 16.6 437.5 16.7 438.4 16.7 439.2 16.8 440.0 16.9 440.9 441.7 17.0 17.0 442.5 17.1 443.4 17.1 444.2 17.2 445.1 17.3 445.9 17.3 446.7 17.4 447.6 17.5 448.4 17.5 449.3 17.6 450.1 17.7 1 = 9° T E 450.9 17.7 451.8 17.8 452.6 17.8 453.4 17.9 454.3 18.0 455.I 18.0 456.0 18.1 6 456.8 18.2 457.6 18.2 8 458.5 18.3 9 01234 DO700 0-2MI BORDO 2022 20702 87~87 HOMMA GENRE OF OZNOZ HONO. 459.3 18.4 10 460.2 18.4 18.5 12 461.0 461.8 462.7 5 18.6 13 18.7 14 18.7 15 463.5 464.4 18.8 16 465.2 18.9 17 466.0 466.9 18.9 18 19.0 19 19.1 467.7 468.5 19.1 21 469.4 470.2 19.2 22 19.3 23 471.1 19.3 24 471.9 19.4❘ 25 472.7 19.5 26 473.6 474.4 475.3 19.5 27 19.6 28 19.7 29 19.7 30 476.1 476.9 19.8 31 477.8 19.9 32 478.6 20.0 33 479.5 20.0 34 480.3 20.1 35 481.1 20.2 36 482.0 20.2 37 482.8 20.3 38 483.6 20.4 39 484.5 20.4 40 486.2 20.6 485.3 20.5 41 42 487.0 20.7 43 489.5 20.9 487.8 20.7 44 488.7 20.8 45 46 490.4 20.9 47 491.2 21.0 48 492.C 21.1 49 492.9 21.2 50 493.721.2 51 494.6 21.3 52 495.4 21.4 53 496.2 21.5 54 497.1 21.5 55 497.9 21.6 56 498.8 21.7❘ 57 499.6 21.7 58 500.4 21.8 59 389 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 0-231 VOTO O-NMI DONDO COME DO700 87~ma ❤8588 2222 9999 upofu bubon 667 0 501.3 21.9 22.0 503.0 22.0 22.1 22.2 1 502. 2 3 503.8 4504.6 5 5C5.5 22.3 15 6 506.3 22.3 7 507.2 22.4 8 508.0 22.5 9 508.8 22.6 12 10 509.7 22.6 11 510.5 22.7 511.4 22.8 13 512.2 22.8 513.0 22.9 513.9 23.C 14 16 514.7 17 18 20 515.6 23.1 23.2 516.4 19 517.2 517.2 23.3 25 | = 10° 518.1 21 518.9 23.5 519.8 23.5 23 520.6 23.6 24 521.4 23.7 22 T 30 31 23.8 26 523.1 23.8 524.C 23.9 524.8 24.0 29 525.6 24.1 27 28 37 38 39 40 E 441 42 35 530.7 24.5 36 531.5 24.6 532.4 24.7 533.2 24.8 534.0 24.8 44 522.3 43537.4 54 55 32 526.5 24.1 576.9 29.0 527.3 24.2 577.8 29.I 528.2 24.3 578.6 29.1 33 529.0 24.4 579.5 29.2 529.8 24.4 580.3 29.3 34 I = 11° 45 539.1 25.3 46 539.9 25.4 540.8 25.5 47 48 541.6 25.5 542.5 25.6 49 T 50 543.3 25.7 51 544.1 25.8 52 545.0 25.9 545.8 25.9 546.7 26.0 53 551.7 552.5 553.4 554.2 555. I 555.9 556.7 557.6 558.4 559.3 564.3 27.7 23.1 565.2 27.8 566.0 27.9 566.8 28.0 567.7 28.1 E 26.5 26.6 26.6 26.7 26.7 26.8 23.4 568.5 28.1 569.4 28.2 570.2 28.3 571.1 28.4 571.9 28.5 26.9 27.0 27.1 || 27.2 27.2 27.2 560. I 27.3 561.0 27.4 561.8 27.5 562.6 27.6 563.5 27.6 572.7 28.6 573.6 28.6 574.4 28.7 575.3 28.8 576.1 28.9 534.9 24.9 585.4 29.8 535.7 25.0 586.2 29.9 536.6 25.1 587.C 30.0 25.1 587.9 30.1 538.2 25.2 588.7 30.2 581.2 29.4 582.0 29.5 582.8 29.6 583.7 29.7 584.5 29.7 547.5 26.1 548.3 26.2 56 57 549.2 26.3 58 550.C 26.3 59 550.9 26.4 6C1.4 31.5 T | = 12° E 602.2 31.6 31.6 603.1 603.9 31.7 604.7 31.8 605.6 31.9 606.4 32.0 6C7.3 32.Į 608.1 32.2 609.0 32.3 6C9.8 32.4 610.6 32.4 611.5 | 32.5 612.3 32.6 613.2 32.7 614.0 32.8 614.9 32.9 615.7 33.0 616.5 33.1 617.4 33.2 618.2 33.3 619.1 33.3 619.9 33.4 620.8 33.5 621.6 33.6 622.4 33.7 623.3 33.8 624.1 33.9 625.0 34.0 625.8 34.1 626.7 34.2 627.5 34.3 628.3 34.4 629.2 34.4 630.0 34.5 630.9 34.6 598.0 31.1 648.6 598.8 31.2 649.4 599.7 31.3 650.3 60C.5 31.4 651.1 36.9 652.C 37.0 T 6= | = 13° E Les 652.8 37.I 653.7 37.2 654.5 37.3 655.3 | 37.4 656.2 37.5 657.0 37.6 657.9 37.6 658.7 37.7 659.6 37.8 660.4 37.9 661.3 38.0 662.1 38.1 662.9 38.2 663.8 38.3 664.6 38.4 665.5 38.5 666.3 38.6 667.2 38.7 668.0 38.8 668.9 38.9 631.7 34.7 632.6 34.8 633.4 34.9 634.2 35.0 635.1 35.1 635.9 35.2 636.8 35.3 637.6 | 35.4 638.5 35.5 639.3 35.6 640.2 35.7 41.6 41.7 41.8 690.8 41.5 641.0 35.7 691.7 641.8 35.8 || 692.5 642.7 35.9 693.4 643.5 36.C 694.2 41.9 644.4 36.1 695.I 42.0 645.2 36.2 || 695.9 695.9 42.1 646.1 36.3 646.9 36.4 597.2 31.0 647.7 36.5 589.6 30.3 590.4 30.3 591.3 30.4 592.1 30.5 592.9 30.6 593.8 30.7 594.6 30.8 595.5 30.9 596.3 30.9 696.7 42.2 697.6 42.3 698.4 42.4 669.7 39.0 670.5 39.I 671.4 39.2 672.2 39.3 673.1 39.4 673.9 39.5 674.8 39.6 675.6 39.7 676.5 | 39.8 677.3 39.9 678.1 40.0 679.C 4C.I 679.8 40.2 680.7 40.3 681.5 40.4 682.4 683.2 684. I 684.9 685.8 40.9 4C.5 40.6 40.7 4C.8 686.6 41.C 687.4 41.1 688.3 41.2 689.I 41.3 690.0 41.4 36.6 699.3 42.5 36.7 7CC.1 42.6 36.8 7C1.C 42.7 701.8 42.8 7C2.7 42.9 1 = 14° T 7C3.5 43.0 704.4 43.1 705.2 43.2 706.1 43.3 7C6.9 43.4 4 707.7 43.5 5 7C8.6 43.7 6 709.4 43.8 7 710.3 43.9 8 711.1 44.0 9 712.0 44.1 10 712.8 44.2 " 713.7 44.3 12 714.5 44.4 13 715.4 44.5 14 720.4 721.3 E 716.2 44.6 15 717.1 717.9 44.7 16 718.7 719.6 724.7 725.5 726.4 727.2 T 44.8 17 44.9 18 0-231 BOT∞ OUNCE CONDO ONME KONDO OMMma ❤❤m88 22 202 85AMZ KAKO. 45.C 19 45.1 20 45.2 21 722.1 45.3 22 723.0 45.4 23 723.8 45.5 24 45.6 25 45.8 26 45.9 27 46.0 28 728.1 46.1 29 728.9 46.2 30 729.8 46.3 31 730.6 46.4 32 731.4 46.5 33 732.3 46.6 34 733.1 46.7 35 734.0 46.8 36 734.8 46.9 37 735.7 47.0 38 736.5 47.1 39 737.4 47.3 40 738.2 47.4 41 739.1 47.5 42 739.9 47.6 43 740.8 47.7 42.2 741.6 47.8 45 742.5 47.9 46 743.3 48.0 44 744.2 48.1 48 745.C 747.5 48.6 47 745.8 48.3 50 749.2 48.8 746.7 48.5 51 52 748.4 48.7 53 54 750.1 48.9 55 750.9 49.C 56 751.8 49.1 | 57 752.6 49.2 | 58 753.5 49.3 59 390 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 1 E 754.3 49.4 755.2 49.6 756.0 49.7 3 756.9 49.8 4 757.7 49.9 0123A KO789 6 5 758.6 50.0 759.4 50.I 760.3 50.2 761.1 50.3 762.0 50.4 ~37 13 10 762.8 50.6 11 763.7 50.7 764.5 50.8 765.3 50.9 766.2 51.0 12 14 17 18 2002 DONDº 870M2 28788 2 15 767.0 51.1 16 767.9 51.2 768.7 51.3 769.6 51.5 19 770.4 51.6 25 26 1 = 15° 771.3 51.7 21 772.1 51.8 773.0 51.9 23 773.8 52.0 24 774.7 52.1 27 28 29 T -- 40 41 30 779.8 52.8 31 780.6 52.9 781.5 53.0 33 782.3 53.2 34 32 783.2 53.3 788.3 54.0 789.1 54.1 42 790.0 54.2 43 790.8 54.3 4444 791.7 54.4 g་ྒུ ཀྱྰཀྨཤྩགgདྩོཆོ 55 775.5 52.2 776.4 52.4 777.2 52.5 770. i 52.6 778.9 52.7 45 792.5 54.6 46 793.4 54.7 47 794.2 54.8 54.9 48 795. I 795.9 49 55.0 796.8 55. I 51797.6 55.2 55.4 798.5 53 799.3 55.5 54 800.2 55.6 56 826.5 59.3 827.4 59.4 828.2 59.5 829.1 59.7 829.9 59.8 830.8 59.9 831.6 60.0 832.5 | 60.2 833.3 60.3 834.2 60.4 835.0 60.5 35 784.0 53.4 37 38 36 784.9 53.5 835.9 60.7 785.7 53.6 836.7 60.8 786.6 53.7 837.6 60.9 39 787.4 53.9 838.4 61.0 839.3 61.1 840. I 61.3 841.0 61.4 841.8 61.5 842.7 61.6 801.0 55.7 801.9 802.7 55.8 56.0 57 58 803.6 59 804.4 | = 16° 56. I 56.2 T 805.2 806. I 806.9 807.8 808.6 E 809.5 56.9 810.3 57.0 811.2 57.1 812.0 57.3 812.9 57.4 813.7 57.5 814.6 57.6 815.5 57.7 816.3 57.9 817.2 58.0 822.3 823. I 824.0 824.8 825.7 58. I 58.2 818.0 818.9 819.7 58.3 820.6 58.5 821.4 58.6 56.3 856.3 63.6 56.4 857.2 63.8 56.5 858.0 63.9 56.7 858.9 64.0 56.8 859.7 64.1 860.6 64.3 861.4 64.4 862.3 64.5 863.1 64.6 864.0 64.8 58.7 58.8 58.9 59. I 59.2 843.5 61.8 844.4 61.9 845.2 62.0 846.1 62.1 846.9 62.3 | = 17° T E 864.8 64.9 865.7 65.0 866.5 65.2 867.4 65.3 868.2 65.4 65.5 869. I 869.9 65.7 870.8 65.8 871.6 65.9 872.5 66. I 873.3 66.2 874.2 66.3 875.1 66.4 875.9 66.6 876.8 66.7 877.6 66.8 878.5 67.0 879.3 67.1 880.2 57.2 881.0 67.3 881.9 67.5 882.7 67.6 883.6 67.7 884.4 67.9 885.3 68.0 886. 68.I 887.0 68.3 887.9 68.4 888.7 68.5 889.6 68.6 890.4 68.8 891.3 68.9 892. I 69.0 893.0 69.2 893.8 69.3 894.7 69.4 895.5 69.6 896.4 69.7 897.2 69.8 898.1 70.0 70. I 70.2 847.8 62.4 898.9 848.6 62.5 899.8 849.5 62.6 900.7 70.4 850.3 62.8 901.5 70.5 851.2 62.9 902.4 70.6 852.0 63.0 .903.2 70.8 852.9 63.1 904.1 70.9 853.7 63.3 904.9 71.0 854.6 63.4 905.8 71.2 855.5 63.5 906.6 71.3 1 = 18° T E 907.5 71.4 908.3 71.6 909.2 | 71.7 910. I 71.8 910.9 72.0 911.8 72.1 912.6 72.2 913.5 72.4 914.3 72.5 915.2 72.6 916.0 72.8 916.9 72.9 917.7 73.0 918.6 73.2 919.5 73.3 920.3 73.4 921.2 73.6 922.0 73.7 922.9 73.8 923.7 74.0 924.674.1 925.4 74.3 926.3 74.4 927.I 74.5 928.0 74.7 928.9 74.8 929.7 74.9 930.6 75.1 931.4 75.2 932.3 75.4 75.5 933. I 934.0 75.6 934.8 75.8 935.7 75.9 936.6 76.0 937.4 76.2 938.3 76.3 939.1 76.5 940.0 76.6 940.8 76.7 941.7 76.9 942.5 77.0 943.4 77.1 944.3 77.3 945. I 77.4 946.0 77.6 946.8 77.7 947.7 77.8 948.5 78.0 949.4 78.1 950.2 78.3 951.1 78.4 952.0 78.5 952.8 78.7 953.7 78.8 954.5 79.0 955.4 79.1 956.2 957. I 958.0 79.2 79.4 79.5 1 = 19° T 958.8 79.7 959.7 79.8 960.5 80.0 961.4 80.1 962.2 80.2 E 963. I 964.0 964.8 80.7 80.4 80.5 976.0 976.8 977.7 978.5 979.4 965.7 80.8 8 966.5 80.9 9 967.4 81.1 10 968.2 81.2 969. I 970.0 81.5 13 970.8 81.7 14 1 971.7 81.8 15 972.5 82.0 16 973.4 974.2 82.1 17 82.2 18 82.4 19 975. I 0-23+ DONO IN ON 222 00702 87♡♡7 60m88 20 29500 8508Z HANAA 55 5 81.4 12 82.5 20 82.7 82.7 21 82.8 22 83.0 23 83.1 24 83.2 25 980.2 981.1 982.0 982.8 83.7 28 83.4 26 83.5 27 983.7 83.8 29 984.5 84.0 30 985.4 84.1 31 986.3 84.3 32 987.1 988.0 84.4 33 84.6 34 988.8 989.7 84.8 36 990.5 85.0 37 991.4 85.1 38 992.3 85.3 39 993.1 85.4 40 994.0 85.6 41 994.8 85.7 42 84.7 35 995.7 85.9 43 87.3 996.5 86.0 44 87.5 997.4 86.2 45 998.3 86.346 999. I 1000.0 86.5 47 86.6 48 1000.8 86.8 49 1001.7 86.9 1002.6 87.1 51 1003.4 1004.3 87.2 52 53 54 1005. 1 88.2 1006.0 87.6 55 1006.9 87.8 56 1007.7 87.9 57 1008.6 88. I 58 1009.4 59 391 TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1º CURVE (Chord or Arc Definition) 1 01234 2 3 4 56789 0-234 10 12 13 15 16 17 18 19 66-66 185 55555 £55±5 wwwww wwwww N8280 281 27 14 1022.3 36 37 38 39 20 1027.5 21 1028.3 22 1029.2 23 1030.I 1030.9 24 41 T 25 1031.8 26 1032.6 1033.5 1034.4 29 1035.2 42 1 = 20° 1010.3 1011.2 1012.0 1012.9 1013.7 54 1014.6 89.1 1015.4 89.3 89.4 1017.2 89.6 1018.0 89.7 1016.3 55 56 1018.9 1019.8 1020.6 1021.5 58 1023.2 1024.0 1024.9 1025.8 1026.6 1044.7 1045.6 1046.4 43 1047.3 44 1048.1 45 1036. I 1037.0 1037.8 1038.7 1040.4 1041.3 1042.1 1043.0 1043.8 49 50 1053.3 1054.2 1055.0 53 1055.9 1056.8 1049.0 1049.9 1050:7 1051.6 1052.4 92.9 93.1 93.2 93.4 1039.5 93.5 E 88.4 88.5 88.7 88.8 89.0 1057.6 1058.5 57 1059.3 1.060.2 1061.I 89.9 90.0 90.2 90.3 90.5 90.6 90.8 90.9 91.1 91.2 91.4 91.6 91.7 91.9 92.0 92.2 92.3 92.5 92.6 92.8 93.7 93.8 94.0 94.2 94.3 94.5 94.6 94.8 94.9 95.1 95.2 95.4 95.5 95.7 95.9 96.0 96.2 96.3 96.5 96.6 96.8 97.0 97.1 97.3 97.4 1 = 21° T 1061.9 1062.8 1063.7 1064.5 1065.4 1066.2 1067.1 1068.0 1068.8 1069.7 1070.6 1071.4 1072.3 1073. I 1074.0 1074.9 1075.7 1076.6 1077.5 1078.3 1083.5 1084.4 1085.2 1086. I 1086.9 1087.8 1088.7 1089.5 1090.4 1091.3 1093.9 1094.7 1095.6 1079.2 100.7 1080.0 100.9 1080.9 101.1 1081.8 101.2 1082.6 101.4 1100.8 1101.6 1102.5 ་་་ 1103.4 1104.2 97.6 97.7 97.9 98.1 98.2 1105. I 1105.9 1106.8 1107.7 1108.5 98.4 98.5 98.7 98.8 99.0 99.2 99.3 99.5 99.6 99.8 1109.4 1110.3 100.0 100. I 100.3 100.4 100.6 1092.1 103.2 1093.0 103.3 103.5 101.6 101.7 101.9 102.0 102.2 1096.4 104.0 1097.3 104.1 1098.2 104.3 1099.0 104.5 1099.9 104.6 102.3 102.5 102.7 102.8 103.0 103.6 103.8 104.8 104.9 105. I 105.3 105.4 105.6 105.8 105.9 106. I 106.3 106.4 106.6 111.1 106.7 1112.0 106.9 1112.9 107.1 | = 22° T E 1113.7 107.2 1114.6 107.4 1115.5 107.6 1116.3 107.7 1117.2 107.9 1118.1 1118.9 1119.8 1120.7 1121.5 1122.4 1123.2 1124.1 1125.0 1125.8 1131.0 1131.9 1132.8 1133.6 1134.5 1126.7 109.7 1127.6 109.9 1128.4 110.1 1129.3 110.2 1130.2 110.4 108.1 108.2 108.4 108.6 108.7 108.9 109.1 109.2 109.4 109.6 1145.8 1146.6 1147.5 1135.4 111.4 1136.2 111.6 1137.1 111.8 1138.0 11.9 1138.8 112.1 1148.4 1149.2 1150. I 1151.0 1151.8 110.6 110.7 1139.7 112.3 1140.6 112.4 1141.4 112.6 1142.3 112.8 112.9 1143.2 110.9 III. [11.1 111.2 1144.0 113.1 1144.9 113.3 113.4 1159.6 1160.5 113.6 113.8 113.9 114.1 114.3 114.5 114.6 1152.7 114.8 1153.6 115.0 1154.4 115.1 1155.3 115.3 1156.2 115.5 1157.0 115.7 1157.9 115.8 1158.8 116.0 116.2 116.3 1161.4 116.5 1162.2 116.7 1163.1 1164.0 116.9 117.0 1164.8 117.2 1 = 23° T E 1165.7 117.4 1166.6 117.6 1167.4 117.7 1168.3 117.9 1169.2 118.1 1170.1 118.3 1170.9 118.4 1171.8 118.6 1172.7 118.8 1173.5 118.9 1174.4 1175.3 1176.1 1177.0 1177.9 1183.1 1183.9 1184.8 1185.7 1186.6 0 I ·237 119.1 10 119.3 119.5 12 6678σ 5 119.6 13 119.8 14 1178.7 120.0 15 1179.6 120.2 16 1180.5 1181.3 1182.2 9 120.3 17 120.5 18 120.7 -NMI BOMO UN D700 8~~~ 120.9 20 121.0 21 121.2 22 1200.5 124.4 1201.3 124.6 1202.2 124.8 1203.1 124.9 1203.9 125.1 121.4 23 121.6 24 121.8 25 121.9 26 1187.4 1188.3 1189.2 122.1 27 1190.0 122.3 28 122.5 I 190.9 1209.2 1210.0 1210.9 126.6 1191.8 122.6 30 1192.6 122.8 31 1193.5 1194.4 I 195.2 123.0 32 123.2 123.3 1211.8 126.7 123.5 1196.1 1197.0 1198.9 123.7 36 123.9 I 198.7 124.1 1199.6 124.2 1217.0 127.8 80 38588 FIRE CONDO OUNCE 33 34 1204.8 125.3 1205.7 125.5 1206.6 125.7 1207.4 125.8 48 1208.3 126.0 49 40 42 126.2 50 126.4 51 46 LOLOLO LO LO LO LO L 6678 σ 52 53 1212.6 126.9 54 1213.5 127.1 55 1214.4 127.3 1215.3 127.5 57 56 1216.1 127.6 58 59 392 T TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 567 0-2MH BOTH OUNCE ON ONE DONO CUMA KOMMA 220 250g unõbõ hubog नं 3 Ц 5 6 7 8 9 10 15 16 17 18 12 13 14 1230.1 22 25 26 19 1234.4 131.5 27 20 1235.3 131.7 28 21 1236.2 131.8 1237.0 132.0 30 23 1237.9 132.2 32 24 1238.8 132.4 1239.7 1240.5 132.6 132.8 1241.4 132.9 1242.3 133.1 29 1243.2 133.3 36 1 = 24° 37 T E 1217.9 128.0 1218.7 128.2 1219.6 128.4 128.5 128.7 1220.5 1221.4 38 1222.2 128.9 1244.0 133.5 31 1244.9 133.7 39 1223.1 129.1 1224.0 1224.8 40 42 1225.7 129.6 33 1246.6 134.1 134.2 34 1247.5 43 44 1226.6 129.8 130.0 1227.5 130.2 1228.3 1229.2 130.4 130.6 35 1248.4 1249.3 1250. I 1251.0 1251.9 129.3 129.5 45 1230.9 130.7 1231.8 130.9 1232.7 131.1 1233.6 131.3 46 47 གླ846n 58 1252.8 135.4 41 1253.6 135.5 1254.5 135.7 1255.4 135.9 1256.3 136.1 1245.8 133.9 1257.1 136.3 1258.0 136.5 1258.9 136.7 1259.7 136.9 48 49 1260.6 137.0 1261.5 137.2 50 51 1262.4 137.4 52 1263.2 137.6 53 1264.1 137.8 1265.0 138.0 54 134.4 134.6 134.8 135.0 135.2 55 1265.9 138.2 56 1266.7 138.4 1267.6 138.5 1268.5 138.7 57 59 1269.4 138.9 1 = 25° T 1270.2 1271.1 1272.0 1272.9 1273.7 1274.6 1275.5 1276.4 1277.2 1278.1 1279.0 141.0 1279.9 141.2 1280.7 141.4 1281.6 141.6 1282.5 141.8 1285.1 1286.0 1286.9 1283.4 142.0 1284.2 142.2 142.4 142.5 142.7 1287.7 1288.6 1289.5 1290.4 E 139.1 139.3 139.5 139.7 139.9 140.1 140.3 140.4 140.6 140.8 142.9 143.1 143.3 143.5 1291.2 143.7 1294.7 1295.6 1292.1 143.9 1293.0 144.1 1293.9 144.3 1296.5 1297.4 1298.2 1299. I 1300.0 144.5 144.7 144.9 145.0 145.2 145.4 145.6 1300.9 145.8 1301.7 146.0 1302.6 146.2 1303.5 146.4 1304.4 146.6 1305.3 146.8 1306.1 147.0 1307.0 147.2 1307.9 147.4 1308.8 147.6 1309.6 147.8 1310.5 148.0 1311.4 148.2 1312.3 148.4 1313.1 148.6 1314.0 148.7 1314.9 148.9 1315.8 149.1 1316.7 149.3 1317.5 149.5 1318.4 149.7 1319.3 149.9 1320.2 150.1 1321.0 1321.9 150.3 150.5 1 = 26° T 1322.8 1323.7 1324.5 1325.4 1326.3 1327.2 1328.1 1328.9 1329.8 1330.7 1331.6 1332.5 1333.3 1334.2 1335.1 1336.0 1336.8 1337.7 1338.6 1339.5 1340.4 1341.2 1342.1 1343.0 1343.9 E 150.7 150.9 151.1 151.3 151.5 151.7 151.9 152.1 152.3 152.5 152.7 152.9 153.1 153.3 153.5 1356.2 1357.1 153.7 153.9 154. I 154.3 154.5 154.7 154.9 155. I 155.3 155.5 1344.8 155.7 1345.6 155.9 1346.5 156.1 1347.4 156.3 1348.3 156.5 1349.2 156.7 1350.0 156.9 1350.9 157.1 1351.8 157.3 1352.7 157.5 1353.6 157.7 1354.4 157.9 1355.3 158.1 158.3 158.5 1358.7 1358.8 1359.7 159.1 1360.6 159.3 1361.5 159.5 158.7 158.9 1362.4 159.7 1363.2 159.9 1364.1 160.I 1365.0 1365.9 160.4 160.6 1366.8 160.8 1367.6 161.0 1368.5 161.2 1369.4 161.4 1370.3 161.6 1371.2 161.8 1372.0 162.0 1372.9 162.2 1373.8 162.4 1374.7 162.6 | = 27° T E 1375.6 162.8 1376.4 163.0 1377.3 163.2 1378.2 163.4 1379.1 163.6 1381.7 164.2 1380.0 163.8 1380.9 164.0 6 1382.6 164.5 8 1388.8 1389.7 1390.6 1391.4 1392.3 1383.5 164.7 9 0-23- 1384.4 164.9 10 1385.3 165.1 1386.1 165.3 12 1387.0 1387.9 4 165.5 13 165.7 14 BO700 0-2MI DONOR OU222 KON≈≈ 87~♡7 68588 2722E OF 85087 KANO8 LO 165.9 166. I 166.3 166.5 18 1393.2 1394.1 1395.0 167.4 1395.9 1396.7 166.7 19 167.0 20 15 16 167.2 21 17 167.6 23 167.8 24 168.0 25 1397.6 1398.5 168.2 26 1399.4 168.4 27 1400.3 168.6 28 1401.2 168.8 29 169.0 30 1402.0 1402.9 1403.8 169.5 32 1404.7 169.7 33 1405.6 169.9 34 169.3 31 171.6 1406.5 170.1 35 1407.3 170.3 36 1408.2 170.5 1409.1 170.7 38 1422.4 173.9 1423.3 1410.0 170.9 39 1410.9 1411.8 1412.6 1413.5 171.8 43 1414.4 172.0 44 1415.3 172.2 1416.2 172.4 1417.1 172.6 1417.9 172.8 1418.8 173.1 1424.1 1425.0 1425.9 1426.8 1427.7 175.2 171.2 40 37 171.4 41 174.8 175.0 42 45 46 47 1419.7 173.3 1420.6 173.5 51 1421.5 173.7 52 48 49 174.1 54 53 174.3 55 174.6 56 57 58 59 393 1 0-231 DONO DINE KONCO ~~~ TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1º (Chord or Arc Definition) 4 5 6 7 8 9 10 11 12 13 1437.4 177.6 1438.3 177.8 1439.2 178.0 1440.1 178.2 14 1441.0 178.4 33 122 20~~2 2~~m~ komm E NO COME DOOR 24 20 1446.3 21 22 23 32 40 41 42 15 1441.8 178.6 16 1442.7 178.9 17 1443.6 179.1 1444.5 179.3 19 1445.4 179.5 18 44 45 46 47 48 49 55L55 T 1 = 28° 25 1450.7 180.8 26 1451.6 181.0 27 1452.5 181.2 1453.4 181.5 1454.3 181.7 1455.1 181.9 1456.0 182.1 1456.9 182.3 1457.8 182.5 34 1458.7 182.8 55 1428.6 1429.4 1430.3 1431.2 1432.1 56 57 LAS 58 E 59 175.4 175.6 175.8 176.1 176.3 1433.0 176.5 1433.9 176.7 1434.8 176.9 1435.6 177.1 1436.5 177.3 179.7 1447.2 180.0 1448.1 180.2 1448.9 180.4 1449.8 180.6 1472.9 186.3 51 1473.8 186.5 52 1474.7 186.7 53 1475.6 187.0 54 1476.5 187.2 1459.6 183.0 183.2 1460.5 1461.4 183.4 1462.2 183.6 1463.1 183.9 1464.0 184.1 1464.9 184.3 1465.8 184.5 1466.7 184.7 1467.6 185.0 1468.5 185.2 1469.3 185.4 1470.2 185.6 1471.1 185.8 1472.0 186.1 1477.3 187.4 1478.2 187.6 1479.1 187.8 1480.0 188.1 1480.9 188.3 1 = 29° T E 1481.8 188.5 1482.7 188.7 189.0 1483.6 1484.5 189.2 1485.3 189.4 1486.2 189.6 1487.1 189.8 1488.0 190.1 1488.9 1489.8 1490.7 190.7 1491.6 191.0 1492.5 191.2 1493.4 191.4 1494.2 191.6 190.3 190.5 1495.1 191.9 1496.0 1496.9 1497.8 1498.7 1499.6 1500.5 1501.4 1502.3 1503.1 1504.0 1504.9 1505.8 192.1 192.3 192.5 192.8 193.0 193.2 193.4 193.7 193.9 194.1 194.3 194.6 1506.7 194.8 1507.6 195.0 195.2 1508.5 1509.4 195.5 1510.3 195.7 1511.2 195.9 1512.1 196.2 1512.9 196.4 1513.8 196.6 1514.7 196.8 1515.6 197.1 1516.5 197.3 1517.4 197.5 1518.3 197.8 1519.2 198.0 1520.1 198.2 1521.0 198.4 1521.9 198.7 1522.8 198.9 1523.6 199.1 1524.5 199.4 199.6 1525.4 1526.3 199.8 1527.2 200. I 1528.1 200.3 1529.0 200.5 1529.9 200.7 1530.8 201.0 1531.7 201.2 1532.6 201.4 1533.5 201.7 1534.4 201.9 1 = 30° T E 1535.3 202.1 1536.1 202.4 1537.0❘ 202.6 1537.9 202.8 1538.8 203.0 1539.7 1540.6 1541.5 1542.4 1543.3 1544.2 1545.1 1546.0 1546.9 1547.8 1548.7 1549.6 1550.4 1551.3 1552.2 1557.6 1558.5 1559.4 1560.3 1561.2 1562.1 1563.0 203.3 203.5 1563.9 1564.8 1565.7 203.7 204.0 204.2 1553.1 206.8 1554.0 207.0 1554.9 207.2 1555.8 207.5 1556.7 207.7 204.4 204.7 204.9 205.1 205.4 205.6 205.8 206.1 206.3 206.5 207.9 208.2 208.4 208.7 208.9 209.1 209.4 209.6 209.8 210. I 1566.6 210.3 1567.5 210.5 1568.4 210.8 1569.2 211.0 1570.1 211.2 1571.0 211.5 1571.9 211.7 1572.8 212.0 1573.7 1574.6 212.2 212.4 1575.5 212.7 1576.4 212.9 1577.3 213.1 1578.2 213.4 1579.1 213.6 1580.0 213.9 1580.9 214.1 1581.8 214.3 1582.7 214.6 1583.6 214.8 1584.5 215.1 1585.4 215.3 1586.3 215.5 215.8 216.0 1587.2 1588. I 1 = 31° CURVE T E 1589.0 216.2 1589.9 216.5 1590.8 216.7 1591.7 217.0 1592.6 217.2 1593.5 217.5 1594.4 217.7 1595.3 217.9 1596.2 218.2 1597.1 218.4 1598.0 1598.8 1599.7 1600.6 1601.5 1 OI234 5O700 0-231 1616.8 1617.7 1618.6 1619.5 0 6 8 9 218.7 10 218.9 1615.9 223.5 223.8 224.0 224.2 224.5 11 219.1 12 219.4 13 219.6 14 1602.4 1603.3 1604.2 220.1 16 220.4 17 220.6 18 1605.1 1606.0 220.8 19 219.9 15 1606.9 221.1 20 1607.8 221.3 21 1608.7 221.6 1609.6 221.8 1610.5 222.1 56 22222 6666 65 55555 555 wwwww wwwww ~~ ~~~ ~~ 23 1611.4 222.3 1612.3 222.5 1613.2 222.8 27 1614.1 223.0 1615.0 223.3 24 25 26 28 29 1620.4 224.7 35 1621.3 225.0 36 1622.2 225.2 1623.1 225.5 38 1624.0 225.7 39 37 40 41 1624.9 226.0 1625.8 226.2 1626.7 226.5 42 1627.6 226.7 1628.5 226.9 43 44 45 49 1629.4 227.2 1630.3 227.4 46 1631.2 227.7 1632.1 227.9 48 1633.0 228.2 1633.9 228.4 1634.8 228.7 1635.7 228.9 52 1636.6 229.2 1637.5 229.4 1638.4 229.7 1639.3 229.9 56 1640.2 230.2 57 1641.1 230.4 58 1642.0 230.7 59 53 54 55 394 01234 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arç Definition) 2 4 66789 0-2M‡ 5 10 11 1652.0 1652.9 1653.8 13 1654.7 14 1655.6 12 DOMOO 87♡♡ 17 15 1656.5 16 1657.4 1658.3 1659.2 1660. I 22222 222 20 1661.0 21 1661.9 24 26 235.9 236.2 22 1662.8 236.4 27 ოოო 23 1663.7 236.7 1664.6 236.9 33 25 1665.5 237.2 35 36 40 41 1 = 32° 42 43 44 T E 1643.0 230.9 1643.9 231.1 1644.8 231.4 1645.7 231.6 1646.6 231.9 45 46 1647.5 232.1 1648.4 232.4 1649.3 1650.2 1651.1 30 1670.0 238.4 1670.9 238.7 32 1671.8 238.9 47 48 49 100 85087 HONOR 55 LO 1672.8 239.2 34 1673.7 239.4 51 1674.6 239.7 1675.5 239.9 37 1676.4 240.2 38 39 1677.3 240.5 1678.2 240.7 1679.1 241.0 1680.0 241.2 1680.9 241.5 1681.8 241.7 1682.7 242.0 52 53 232.6 232.9 233. I 233.4 233.6 233.9 234. I 234.4 55 56 234.6 234.9 57 235. I 235.4 235.6 1666.4 237.4 1667.3 237.7 1668.2 237.9 1669.1 238.2 1688. I 1689.0 1690.0 243.5 243.8 244.0 1690.9 244.3 54 1691.8 244.5 1692.7 1693.6 1694.5 58 1695.4 1683.6 242.2 1684.5 242.5 1685.4 242.8 1686.3 243.0 1687.2 243.3 244.8 245. I 245.3 245.6 59 1696.3 245.8 1 = 33° T 1697.2 1698. I 1699.0 1699.9 1700.8 1701.7 247.4 1702.6 247.6 1703.5 247.9 1704.5 248.I 1705.4 248.4 1706.3 248.7 1707.2 248.9 1708.1 249.2 1709.0 249.4 1709.9 249.7 E 246.1 246.3 246.6 246.9 247. I 1710.8 250.0 1711.7 250.2 1712.6 250.5 1713.5 250.7 1714.4 251.0 1715.3 251.3 1716.3 251.5 1717.2 1718. I 1719.0 1719.9 1720.8 1721.7 1722.6 1723.5 251.8 252.0 252.3 1738.1 1739.0 1739.9 1740.8 1741.7 252.6 252.8 253. I 253.3 253.6 1724.4 253.9 1725.3 254.I 1726.2 254.4 254.7 1727.2 1728.1 254.9 1729.0 255.2 1729.9 255.4 1730.8 255.7 1731.7 256.0 1732.6 256.2 1733.5 256.5 1734.4 256.8 1735.3 257.0 1736.3 257.3 1737.2 257.6 257.8 258. I 258.3 258.6 258.9 1742.6 259. I 1743.5 259.4 1744.4 259.7 1745.4 259.9 1746.3 260.2 1747.2 260.5 1748.1 260.7 1749.0 261.0 1749.9 261.3 1750.8 261.5 | = 34° T 1751.7 1752.6 1753.6 1754.5 1755.4 1756.3 1757.2 1758.1 1759.0 1759.9 1760.8 1761.8 1765.4 1766.3 1767.2 1768. I 1769.1 E 261.8 262. I 1762.7 265.0 265.3 1763.6 1764.5 265.5 262.3 262.6 262.9 1777.3 1778.2 263. I 263.4 263.7 263.9 264.4 264.5 264.7 1770.0 267.2 1770.9 267.4 1771.8 267.7 1772.7 268.0 1773.6 268.2 265.8 266. I 266.4 266.6 266.9 1774.5 268.5 1775.4 268.8 1776.4 269. I 1797.4 1798.3 1799.2 1800. I 1801.1 269.3 269.6 1779.1 269.9 1780.0 270.1 1780.9 270.4 1781.8 270.7 1782.8 270.9 271.2 1783.7 1784.6 271.5 1785.5 271.8 272.0 1786.4 1787.3 272.3 1788.2 272.6 1789.2 272.9 1790.1 273.1 1791.0 273.4 1791.9 273.7 1792.8 273.9 1793.7 274.2 1794.6 274.5 1795.6 274.8 1796.5 275.0 275.3 275.6 275.9 276.1 276.4 1802.0 276.7 1802.9 277.0 1803.8 277.2 1804.7 277.5 1805.6 277.8 | = 35° T E 1806.6 278.1 1807.5 278.3 1808.4 278.6 1809.3 278.9 1810.2 279.2 4 1811.1 279.4 1812.1 279.7 1813.0 280.0 1813.9 280.3 1814.8 280.5 1815.7 1816.6 1817.6 1818.5 1819.4 1820.3 1821.2 1822.1 1823. 1 1824.0 1832.2 1833.2 280.8 10 0123A 281.I " 1838.7 1839.6 1840.5 1841.4 1842.4 56789 0-23A 281.4 12 1829.5 285.0 1830.4 285.3 1831.3 285.6 285.8 286. I 281.7 13 281.9 14 282.2 15 282.5 16 282.8 17 283.0 18 283.3 19 1824.9 283.6 20 1825.8 283.9 21 1826.7 284.2 1827.6 284.4 1828.6 284.7 24 DOMOD 222 2 1843.3 1844.2 289.2 289.5 1845.1 289.8 1846.0 290.0 1847.0 290.3 1847.9 290.6 1848.8 290.9 1849.7 291.2 1850.6 291.5 1851.5 291.7 1852.5 292.0 1853.4 292.3 1854.3 292.6 1855.2 292.9 1856.2 293.2 6 O EEEEE E55=5 wwwww wwwww ~~28 EN 23 25 26 1834.1 286.4 1835.0 266.7 1835.9 287.0 32 27 29 1836.8 287.2 33 1837.8 287.5 34 30 31 287.8 35 288. I 36 288.4 37 288.6 288.9 38 39 40 41 42 44 45 53 1857.1 293.4 55 1858.0 1858.9 294.0 1859.8 294.3 1860.8 O O 293.7 56 58 294.6 59 395 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) T 0 1861.7 1862.6 2 1863.5 3 1864.4 4 1865.4 O-NMH BOTOK O-NET DOO ON 2 HO700 87~~~ ~8~8. O 00 8500 HONOR 5 1866.3 1867.2 7 1868. I 6 8 9 16 10 1870.9 297.7 1871.8 298.0 12 13 14 1874.6 298.9 1872.7 298.3 1873.7 298.6 1876.4 17 1877.4 15 1875.5 299.2 299.4 299.7 18 1878.3 300.0 300.3 20 19 1879.2 21 22 23 24 27 28 29 30 26 25 1884.7 302.0 1885.7 302.3 1886.6 302.6 1887.5 302.9 1888.4 303.2 1889.4 303.5 1890.3 303.8 1891.2 304.1 1892.1 304.3 1893.1 304.6 1894.0 304.9 36 1894.9 305.2 1895.8 305.5 38 1896.7 305.8 31 32 33 34 35 1 = 36° 37 40 1869.0 1870.0 41 39 1897.7 306.1 47 48 49 E 294.9 295. I 295.4 295.7 296.0 306.7 42 1900.4 307.0 43 1901.4 44 296.3 296.6 296.9 297.1 297.4 300.6 1880. I 1881.0 300.9 1882.0 301.2 1882.9 301.5 1883.8 301.7 51 45 1903.2 46 1904. I 1898.6 306.4 1899.5 307.2 1902.3 307.5 307.8 308.1 308.4 308.7 1906.9 309.0 1905.1 1906.0 1907.9 309.3 1908.8 309.6 52 1909.7 309.9 1910.6 310.2 53 54 1911.6 310.5 55 1912.5 310.8 56 1913.4 311.0 57 1914.3 311.3 58 1915.3 311.6 59 1916.2 311.9 | = 37° T E 312.2 1917.1 1918.0 312.5 1919.0 312.8 1919.9 313.1 1920.8 313.4 1921.7 313.7 1922.7 314.0 1923.6 314.3 1924.5 314.6 1925.5 314.9 315.2 1926.4 1927.3 315.5 315.8 1928.2 1929.2 316.1 1930.1 316.4 1931.0 316.7 1932.0 316.9 1932.9 317.2 317.5 1933.8 1934.7 317.8 1935.7 318.1 1936.6 318.4 1937.5 318.7 1938.5 319.0 1939.4 319.3 1940.3 319.6 1941.2 319.9 1942.2 320.2 1943.1 320.5 1944.0 320.8 1945.0 321.1 1945.9 321.4 1946.8 321.7 1947.7 322.0 1948.7 322.3 1949.6 322.6 1950.5 322.9 1951.5 323.2 1952.4 323.5 1953.3 323.8 1954.3 1955.2 1956. I 1957.0 1958.0 324. I 324.4 324.7 325.0 325.3 1958.9 325.6 1959.8 325.9 1960.8 326.2 1961.7 326.5 1962.6 326.8 1963.6 327.1 1964.5 327.4 1965.4 327.7 1966.4 328.0 1967.3 328.3 1968.2 1969.1 1970. I 1971.0 1971.9 329.2 329.5 329.8 1 = 38° T 1972.9 1973.8 1974.7 1975.7 1976.6 1977.5 1978.5 1979.4 1980.3 1981.3 1982.2 1983.1 1984. 1985.0 1985.9 1986.9 334.7 1987.8 335.0 E 330. I 330.5 330.8 331.1 331.4 1988.7 335.3 1989.7 335.6 1990.6 335.9 2000.9 2001.8 2002.8 2003.7 2004.6 331.7 332.0 332.3 332.6 332.9 1991.5 336.2 1992.5 336.6 1993.4 336.9 1994.3 337.2 1995.3 337.5 333.2 333.5 333.8 334.1 334.4 1996.2 1997.1 1998.1 338.4 1999.0 338.7 1999.9 339.0 2014.9 2015.9 2016.8 2017.7 2018.7 2019.6 2020.5 2021.5 2022.4 2023.4 328.6 2024.3 328.9 2025.2 2026.2 337.8 338. I 2005.6 340.9 2006.5 341.2 2007.4 341.5 2008.4 341.8 2009.3 342.1 2010.2 342.4 2011.2 342.7 2012.1 343.0 2013.0 343.3 2014.0 343.7 339.3 339.6 339.9 340.2 340.6 344.0 344.3 344.6 344.9 345.2 345.5 345.8 346. I 346.5 346.8 347.1 347.4 347.7 2027. I 348.0 2028.0 348.3 | = 39° T E 2029.0 348.6 2029.9 349.0 2030.9 349.3 2031.8 349.6 3 2032.7 349.9 2035.5 350.8 2033.7 350.2 2034.6 350.5 6 1 2047.8 2048.7 2036.5 351.2 8 2037.4 351.5 9 2038.4 351.8 10 2039.3 352.I 2040.2 352.4 12 2041.2 2042.1 2052.5 2053.4 2054.3 0-NMI DO700 O-NMI CON UNA PO708 87~MA HOMOM DE NO AGAMZ KANO. == 232 2 2055.3 2056.2 2057.2 2058. I 2059.0 2060.0 2060.9 5 2043.1 353.4 15 2044.0 353.7 16 2044.9 354.0 17 2045.9 2046.8 354.3 18 354.6 19 2066.6 2067.5 352.7 13 353.0 14 2049.6 2050.6 355.9 23 2051.5 354.9 20 355.3 21 355.6 22 356.2 24 356.5 25 356.8 26 357.2 27 357.5 28 357.8 29 358. I 358.4 358.7 32 30 31 359.1 33 359.4 34 2061.9 2062.8 2063.7 360.3 37 2064.7 360.7 38 2065.6 361.0 39 359.7 35 360.0 36 361.3 40 361.6 41 2068.5 361.9 42 2069.4 362.3 43 2070.3 362.6 44 45 46 362.9 2071.3 2072.2 363.2 2073.2 363.5 2074. I 363.9 48 2075.0 364.2 49 47 2076.0 2076.9 364.8 51 364.5 50 2077.9 365.1 52 2078.8 365.5 53 2079.8 365.8 54 2080.7 366.1 55 2081.6 366.4 56 2082.6 366.8 57 2083.5 367.1 58 2084.5 367.4 59 396 ↑ TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 01234 2222 DO700 0-2MI DONDO OUNCE DONO0 OZ~M7 KOMMA DE 2700 8OOOZ KONAO 01234 6678 2089.2 5 2090. I 6 2091.1 2092.0 2093.0 8 369.3 369.7 370.0 370.3 9 2093.9 370.6 12 13 10 2094.9 371.0 2095.8 2096.8 371.3 371.6 2097.7 371.9 17 14 2098.6 372.3 15 2099.6 372.6 16 2100.5 372.9 2101.5 373.2 21 18 2102.4 373.6 22 19 2103.4 373.9 20 2104.3 T 1 = 40° E 2085.4 367.7 2086.4 368.0 2087.3 368.4 2088.3 23 2107.2 27 24 2108.1 25 2109.0 375.8 26 2110.0 376.2 376.5 376.8 377.1 32 28 2111.9 29 2112.8 36 30 2113.8 377.5 374.2 2105.3 374.5 2106.2 374.9 31 2114.7 377.8 37 33 2116.6 378.5 40 368.7 369.0 2110.9 34 2117.6 378.8 41 35 2118.5 379.1 42 43 2119.5 2120.4 38 2121.4 380. I 380.4 39 2122.3 46 49 2115.7 378.1 2123.3 380.8 2124.2 381.1 2125.1 381.4 2126.1 381.8 44 2127.0 382.1 375.2 375.5 50 45 2128.0 382.4 2128.9 382.7 2129.9 383.I 47 48 2130.8 383.4 2131.8 383.7 52 2134.6 379.4 379.8 2132.7 384.1 51 2133.7 384.4 384.8 385. I 385.4 53 2135.6 54 2136.5 55 2137.5 385.7 56 2138.4 386.1 57 2139.4 386.4 58 2140.3 59 2141.3 386.7 387.0 | = 41° T 2142.2 2143.2 2144.1 2145. I 2146.0 2147.0 2147.9 2148.9 2149.8 2150.8 2151.7 2152.7 2153.6 2154.6 2155.5 2156.5 2157.4 2158.4 2159.3 2160.3 2161.2 2162.2 2163.2 2164.1 2165. I 2166.0 2167.0 2167.9 2168.9 2169.8 2170.8 2171.7 2172.7 2173.6 2174.6 2175.5 2176.5 2177.4 2178.4 2179.4 ་་ 387.4 387.7 388.0 388.4 388.7 389.0 389.4 389.7 390.0 390.4 390.7 391.0 391.4 391.7 392. I 392.4 392.7 393. I 393.4 393.7 394. I 394.4 394.7 395. I 395.4 395.7 396. I 396.1! 396.8 397. I 397.4 397.8 398. I 398.4 398.8 399. I 399.5 399.8 400. I 400.5 2180.3 400.8 2181.3 401.2 2182.2 401.5 2183.2 2184.1 401.8 402.2 2185.1 402.5 2186.0 402.9 2187.0 403.2 2187.9 403.5 2188.9 403.9 2189.9 404.2 2190.8 404.6 2191.8 404.9 2192.7 405.2 2193.7 405.6 2194.6 405.9 2195.6 406.3 2196.5 406.6 2197.5 407.0 2198.5 407.3 | = 42° T 2199.4 2200.4 2201.3 2202.3 408.3 408.7 2203.2 409.0 2204.2 2205. I 2206. I 2207. I 2208.0 2209.0 411.1 2209.9 411.4 2210.9 411.8 2211.8 412.1 2212.8 412.5 E 407.6 408.0 2213.8 412.8 2214.7 413.1 2215.7 413.5 2216.6 413.8 2217.6 414.2 2223.3 2224.3 2225.3 2226.2 2227.2 2218.6 414.5 2219.5 414.9 2220.5 415.2 2221.4 415.6 2222.4 415.9 2228. I 2229. I 2230. I 2231.0 2232.0 409.4 409.7 410.0 410.4 410.7 2232.9 2233.9 2234.9 2235.8 2236.8 416.3 416.6 416 9 2252.2 2253. I 2254. I' 2255.0 2256.0 417.3 417.6 418.0 418.3 418.7 419.0 419.4 419.7 420. I 420.4 420.8 421.1 2237.7 421.5 2238.7 421.8 2239.7 422.2 2240.6 422.5 2241.6 422.9 2242.5 423.2 2243.5 423.6 2244.5 423.9 2245.4 424.3 2246.4 424.6 2247.3 425.0 2248.3 425.3 2249.3 425.7 426.0 2250.2 2251.2 426.4 426.7 427.1 427.4 427.8 428. I 1 = 43° T E 2257.0 2257.9 428.5 428.9 2258.9 429.2 2259.9 429.6 2260.8 429.9 2261.8 430.3 2262.7 430.6 2263.7 431.1 2264.7 431.3 2265.6 431.7 0 I 234 BO7∞ 0-234 S 2266.6 432.0 10 2273.4 2274.3 434.9 2275.3 435.2 2276.2 2277.2 2278.2 2279.1 2280. I 8 2267.6 432.4 2268.5 432.8 12 2269.5 433.1 13 2270.5 433.5 14 9 2271.4 2272.4 434.2 16 433.8 15 434.5 17 435.6 435.9 21 0 2002 DON¤* 8.~♡~ ❤❤❤❤. 2 00 85087 KOKOO 436.3 436.7 23 43.7.0 24 2281.1 437.4 437.7 2282.0 2283.0 438.1 27 447. 1 447.4 447.8 25 26 2284.0 438.4 28 2284.9 438.8 29 2285.9 439.2 2286.9 439.5 31 2287.8 439.9 32 440.2 2288.8 2289.8 440.6 34 2290.7 441.0 35 2291.7 441.3 36 2292.7 441.7 37 2293.6 442.0 2294.6 442.4 39 2295.6 442.7 40 2296.5 443.1 41 2297.5 443.5 42 2298.5 443.8 43 2299.4 444.2 44 2300.4 444.6 45 2301.4 444.9 46 2302.3 445.3 47 2303.3 445.6 48 2304.3 446.0 49 2305.2 446.4 2306.2 446.7 2307.2 2308. I 2309.1 52 54 2310.1 448.2 55 2311.1 448.5 56 2312.0 2313.0 448.9 449.3 2314.0 449.6 59 57 397 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) T 0 2314.9 01234 VOT∞0 0-2M7 DO789 2 3 42318.8 5 7 8 T= 2319.8 451.8 6 2320.7 452.2 2321.7 452.5 2322.7 452.9 9 2323.7 453.3 2315.9 2316.9 2317.8 12 10 2324.6 453.6 11 2325.6 454.0 15 17 44° 2326.6 13 2327.5 14 2328.5 455.1 16 2330.5 E 450.0 450.3 450.7 451.1 451.4 2329.5 455.4 455.8 2331.4 456.2 18 2332.4 456.5 19 2333.4 456.9 25 2339.2 26 2340.2 27 2341.1 28 2342. | 29 2343.1 454.4 454.7 20 2334.3 457.3 21 2335.3 457.6 458.0 22 2336.3 23 2337.3 242338.2 458.4 458.7 50 2363.5 51 2364.5 52 2365.5 53 2366.5 54 2367.4 459.I 459.5 459.8 460.2 460.6 30 2344.1 31 2345.0 32 2346.0 33 2347.0 462.1 34 2348.0 462.4 460.9 461.3 461.7 35 2348.9 462.8 36 2349.9 463.2 37 2350.9 463.5 38 2351.8 463.9 39 2352.8 464.3 40 2353.8 464.6 41 2354.8 465.0 422355.7 465.4 43 2356.7 465.8 442357.7 466. I 45 2358.7 466.5 46 2359.6 466.9 47 2360.6 467.2 48 2361.6 467.6 49 2362.6 468.0 468.4 468.7 469. I 469.5 469.8 55 2368.4 470.2 56 2369.4 470.6 57 2370.4 471.0 471.3 58 2371.3 59 2372.3 471.7 | = 45° T 2373.3 2374.3 2375.3 2376.2 2377.2 2378.2 2379.2 2380.I 2381.1 2382.1 2383. I 2384.0 2385.0 2386.0 2387.0 E 472.1 472.5 472.8 473.2 473.6 2402.6 2403.6 2404.6 2405.6 2406.6 474.0 474.3 474.7 475. I 475.4 475.8 476.2 477.7 2388.0 2388.9 478.1 2389.9 478.5 2390.9 478.8 2391.9 479.2 476.6 477.0 477.3 2392.8 479.6 2393.8 480.0 2394.8 480.3 2395.8 480.7 2396.8 481.1 2397.7 481.5 2398.7 481.9 2399.7 482.2 2400.7 482.6 2401.7 483.0 2427.2 2428.2 2429.1 2430. I 2431.1 483.4 483.8 484. I 484.5 484.9 2407.5 485.3 2408.5 485.7 2409.5 486.0 2410.5 486.4 2411.5 486.8 2412.4 2413.4 2414.4 487.9 2415.4 488.3 2416.4 488.7 487.2 487.6 2417.4 489.1 2418.3 489.5 2419.3 489.8 2420.3 490.2 2421.3 490.6 2422.3 491.0 2423.2 2424.2 2425.2 2426.2 491.4 491.7 492. I 492.5 492.9 493.3 493.7 494. I 494.4 1 = 46° T 2432.1 2433. I 2434.1 2435.0 2436.0 2437.0 496.7 2438.0 497.1 2439.0 497.5 2440.0 497.9 498.3 2440.9 2441.9 498.7 2442.9 499.1 2443.9 499.4 2444.9 499.8 2445.9 500.2 2446.9 2447.8 2448.8 2449.8 2450.8 2451.8 2452.8 2453.8 2454.7 2455.7 E 494.8 495.2 495.6 496.0 496.4 2459.7 2460.7 2456.7 504.5 2457.7 504.9 2458.7 505.3 2466.6 2467.6 2468.6 2469.6 2470.5 500.6 501.0 501.4 501.8 502.2 2471.5 2472.5 2473.5 2474.5 2475.5 502.5 502.9 503.3 503.7 504.I 2461.7 506.4 2462.6 506.8 2463.6 507.2 2464.6 507.6 2465.6 508.0 505.6 506.0 508.4 508.8 509.2 509.5 509.9 510.3 510.7 511.1 511.5 511.9 2476.5 512.3 2477.5 512.7 2478.5 513.1 513.5 2479.4 2480.4 513.9 2481.4 514.3 2482.4 514.6 2483.4 515.0 2484.4 515.4 2485.4 515.8 2486.4 516.2 2487.4 516.6 2488.4 517.0 2489.3 517.4 2490.3 517.8 1 = 47° T E 2491.3 518.2 2492.3 518.6 2493.3 519.0 2494.3 519.4 2495.3 519.8 2496.3 520.2 2497.3 520.6 2498.3 521.0 2499.3 521.4 2500.2 521.8 2506.2 2507.2 2508.2 2509.2 2510.2 2511.2 2512.2 2513.2 2514.1 2515. I 2516. I 2517.1 2518. I 2519.1 2520. I 2521.I 2522.1 2523. I 2524.I 2525. I 2526. I 2527. I 2528. I 2529. I 2530. I 2531.I 2532.I 2533. I 2534.1 2535.0 2501.2 522.2 10 2502.2 522.6 11 2503.2 2504.2 2505.2 I 0-234 DONOR ONE DONOR 7222 20702 A.~♡~ ❤❤M88 279 28500 8OOOZ KANAA 555555 5 6 7 8 526. I 526.5 526.9 527.3 527.7 9 523.0 12 523.4 13 523.7 14 524.1 15 524.5 16 534.1 534.6 535.0 535.4 535.8 524.9 17 525.3 18 525.7 19 20 21 23 24 528. I 528.5 528.9 529.3 529.7 29 25 26 28 '530.1 30 530.5 31 530.9 531.3 531.7 34 32 33 532.1 532.5 36 532.9 533.3 533.7 39 35 37 38 40 41 42 43 44 2536.0 536.2 45 2537.0 536.6 46 2538.0 537.0 47 2539.0 537.4 48 2540.0 537.8 49 2541.0 538.2 50 2542.0 538.6 51 2543.0 539.0 52 2544.0 539.4 53 2545.0 539.8 54 2546.0 540.2 2547.0 2548.0 540.6 541.0 2549.0 541.4 2550.0 541.8 55 56 57 58 59 398 01234 5O789 2 3 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 42555.0 2556.0 6 2557.0 7 2558.0 8 2559.0 9 2560.0 NMI D 10 2561.0 546.3 11 2562.0 546.7 12 2563.0 547.1 13 2564.0 547.5 547.8 14 2565.0 15 2566.0 2567.0 17 2568.0 18 2569.0 19 2570.0 16 1 = 48° 222222 T E 2551.0 542.2 542.6 2552.0 2553.0 543.0 2554.0 543.5 543.9 22 20700 800 20 2571.0 550.4 21 2572.0 550.8 22 2573.0 551.2 23 2574.0 551.6 24 2575.0 552.0 30 2581.0 31 25 2576.0 552.4 26 2577.0 552.9 27 2578.0 553.3 28 2579.0 553.7 2580.0 554.I 554.5 554.9 555.3 33 2584.0 555.7 34 2585.0 556.2 2582.0 32 2583.0 6600 20000 55555 £5555 42 43 44 35 2586.0 556.6 2587.0 557.0 36 37 2588.0 557.4 38 2589.0 557.8 39 2590.0 558.2 40 47 544.3 544.7 545. I 545.5 545.9 45 2596.1 46 2597. I 2598. I 2599. I 48 49 2600.1 548.3 548.8 549.2 549.6 550.0 558.6 2591.I 2592.1 559.0 2593. I 559.5 559.9 2594. I 2595.1 560.3 50 2601.I 51 2602. I 52 2603.1 53 2604.1 54 2605.1 55 2606. I 2607.1 56 57 2608. I 58 2609.1 59 2610.1 560.7 561.1 561.5 561.9 562.4 564.9 565.3 565.7 1 = 49° 566. I 566.5 T 2611.2 2612.2 2613.2 2614.2 2615.2 2616.2 2617.2 2618.2 2619.2 2620.2 E 566.9 567.4 567.8 568.2 568.6 2621.2 571.I 2622.2 571.5 2623.2 572.0 2624.2 572.4 2625.3 572.8 569.0 569.4 569.9 570.3 570.7 2626.3 573.2 2627.3 573.6 2628.3 574.1 2629.3 574.5 2630.3 574.9 2641.4 2642.4 2643.4 2644.4 2645.4 2631.3 575.3 2632.3 575.7 2633.3 576.2 2634.3 576.6 577.0 2635.3 2636.4 577.4 2637.4 577.9 2638.4 2639.4 578.3 578.7 2640.4 579. I 2651.5 2652.5 2653.5 2654.6 2655.6 579.5 580.0 580.4 580.8 581.2 581.7 2646.5 2647.5 582. I 2648.5 582.5 2649.5 582.9 2650.5 583.4 583.8 584.2 584.6 585. I 585.5 562.8 563.2 2661.6 588.0 2662.7 588.5 563.6 2663.7 588.9 564.0 2664.7 589.3 2665.7 589.8 2666.7 590.2 2667.7 590.6 564.4 2668.7 591.0 2669.8 591.5 2670.8 591.9 2656.6 585.9 2657.6 586.3 2658.6 586.8 2659.6 587.2 2660.6 587.6 T 1 = 50° 2671.8 2672.8 2673.8 2674.8 2675.8 2681.9 2682.9 2684.0 2676.9 594.5 2677.9 594.9 2678.9 595.3 2679.9 595.8 2680.9 596.2 2685.0 2686.0 2687.0 2688.0 2689.0 2690. I 2691. I 2692.1 2693. I 2694.1 2695.2 2696.2 2697.2 2698.2 E 592.3 592.8 593.2 593.6 594.0 596.6 597. I 597.5 597.9 598.3 2712.5 2713.5 2714.5 2715.5 2716.6 598.8 599.2 599.6 600. I 600.5 603. I 603.5 2699.2 604.0 2700.2 604.4 2701.3 604.8 2702.3 605.3 2703.3 605.7 2704.3 ❘ 606.1 2705.3 606.6 2706.4 607.0 2707.4 607.4 2708.4 607.9 2709.4 608.3 2710.4 608.8 2711.5 609.2 609.6 610. I 610.5 610.9 611.4 2717.6 611.8 2718.6 612.2 2719.6 612.7 2720.6 613.1 2721.7 613.6 2722.7 2723.7 614.0 614.4 2724.7 614.9 2725.7 615.3 2726.8 615.8 2727.8 616.2 2728.8 2729.8 616.6 617.1 2730.9 617.5 2731.9 618.0 T E 2732.9 618.4 2733.9 618.8 2734.9 619.3 2736.0 619.7 2737.0 620.2 1 = 51° *** 2738.0 620.6 2739.0 621.0 2740.1 621.5 621.9 2741.1 2742. I 622.4 2743. I 2744.2 2745.2 2746.2 2747.2 2748.3 2749.3 2750.3 2751.3 2752.4 2758.5 2759.5 2760.6 2761.6 2762.6 2763.7 2764.7 2765.7 2766.7 2767.8 622.8 623.3 623.7 2773.9 2775.0 2776.0 2777.0 2778.1 2779. I 2780.I 2781.1 600.9 2753.4 627.2 20 601.4 627.7 2754.4 2755.4 21 601.8 602.2 2756.5 602.7 2757.5 122 2 0-23I DONO DINA DOO ~Z KO700 A.~m~ ❤omo R 9700 850MZ BONAA ოოოო ოოო 6 7 8 9 624. I 13 10 624.6 14 628. I 628.6 629.0 12 625.0 15 625.4 16 625.9 17 626.4 18 626.8 19 634.4 636.2 636.6 637. I 637.5 638.0 22 23 629.5 629.9 630.4 27 24 25 630.8 28 26 631.2 29 631.7 632. I 632.6 633.0 633.5 34 30 2768.8 633.9 35 2769.8 2770.8 634.8 36 37 2771.9 635.3 38 2772.9 635.7 39 40 41 31 32 33 42 43 44 638.4 45 638.9 46 639.3 47 2782.2 639.8 48 2783.2 640.2 49 2784.2 640.7 2785.3 641.1 2786.3 641.6 2787.3 642.0 53 2788.4 642.5 54 51 52 2789.4 642.9 55 2790.4 643.4 56 2791.4 643.8 57 2792.5 644.3 58 2793.5 644.7 59 399 TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 1 = 52° T 0 2794.5 I 2795.6 2 2796.6 3 2797.6 24 2798.7 5 2799.7 6 2800.7 22 15 16 17 18 19 7 2801.8 648.3 8 2802.8 648.8 9 2803.8 649.2 E 645.2 645.6 646. I 10 2804.9 649.7 11 2805.9 650.2 12 2806.9❘ 650.6 2808.0 651.1 14 2809.0 651.5 13 646.5 647.0 647.4 647.9 2810.0 652.0 2811.1 652.4 2812.1 652.9 2813. I 653.3 2814.2 653.8 20 2815.2 654.3 21 2816.2 654.7 22 2817.3 655.2 23 2818.3 655.6 24 2819.3 656.I 25 2820.4 656.5 26 2821.4 657.0 27 2822.4 657.5 28 2823.5 657.9 29 2824.5 658.4 37 2832.8 38 2833.8 39 30 2825.6 658.8 31 2826.6 659.3 32 2827.6 659.7 33 2828.7 660.2 34 2829.7 660.7 35 2830.7 661.1 36 2831.8 661.6 662.0 662.5 2834.9 663.0 50 2846.3 51 2847.3 52 2848.4 53 | 2849.4 542850.5 663.4 2837.0 663.9 42 2838.0 664.3 40 2835.9 41 43 2839.0 44 2840.I 664.8 665.3 45 2841.I 665.7 46 2842.| 47 2843.2 48 2844.2 49 2845.3 666.2 666.6 667. I 667.6 668.0 668.5 669.0 669.4 669.9 55 2851.5 670.3 56 2852.5 670.8 57 2853.6 671.3 58 2854.6 671.7 59 2855.7 | 672.2 | = 53° T 2856.7 2857.7 2858.8 2859.8 2860.9 2861.9 2862.9 2864.0 2865.0 2866. I 2872.3 2873.4 2874.4 E 672.7 673.1 673.6 674. I 674.5 675.0 675.5 2867.1 677.3 2868.2 677.8 2869.2 678.3 2870.2 678.7 2871.3 679.2 675.9 676.4 676.9 679.7 680. I 680.6 2875.5 681.1 2876.5 681.5 2888.0 2889.0 2890. I 2891.1 2892.2 2877.5 682.0 2878.6 682.5 2879.6 682.9 683.4 2880.7 2881.7 683.9 2882.8 684.3 2883.8 684.8 2884.8 685.3 2885.9 685.7 2886.9 686.2 686.7 667.2 687.6 688. I 688.6 2893.2 689.0 2894.3 689.5 2895.3 690.0 2896.3 690.5 2897.4 690.9 2898.4 691.4 2899.5 691.9 2900.5 692.3 2901.6 692.8 2902.6 693.3 2903.7 693.8 2904.7 694.2 2905.8 694.7 2906.8 695.2 2907.9 695.7 2908.9 696. I 2910.0 2911.0 696.6 697.I 2912.1 697.6 2913.1 698.0 2914.2 698.5 2915.2 699.0 2916.3 699.5 2917.3 699.9 2918.4 700.4 | = 54° T 2919.4 2920.5 2921.5 2922.6 2923.6 2924.7 2925.7 2926.8 2927.8 2928.9 2929.9 2931.0 2932.0 2933. I 2934.1 2935.2 2936.2 2942.5 2943.6 2944.6 708. I 708.6 2937.3 709.0 2938.3 709.5 2939.4 710.0 2948.9 2949.9 2951.0 2952.0 2940.4 710.5 2941.5 710.9 711.4 711.9 712.4 2953. I 2954. I 2955.2 ་་ 700.9 701.4 701.8 702.3 702.8 2945.7 712.9 2946.7 713.4 2947.8 713.8 714.3 714.8 703.3 703.8 704.2 704.7 705.2 2966.8 2967.9 2968.9 705.7 706.1 706.6 2970.0 2971.0 707.1 707.6 2972. I 2973. I 2974.2 2975.3 2976.3 2956.2 717.8 2957.3 718.2 2958.3 718.7 2959.4 719.1 2960.5 719.6 715.3 715.6 716.2 2961.5 720. I 2962.6 720.6 721.1 2963.6 2964.7 721.6 2965.7 722.1 716.7 717.2 722.5 723.0 723.5 724.0 724.5 725.0 725.5 725.9 726.4 726.9 2977.4 727.4 2978.4 727.9 2979.5 728.4 2980.5 728.9 2981.6 729.4 | = 55° E 729.9 730.3 2984.8 730.8 2985.8 731.3 2986.9 731.8 T 2982.7 2983.7 2988.0 2989.0 2990: I 2991.I 2992.2 2998.6 2999.6 3003.9 3004.9 3006.0 3007.1 3008. I 3009.2 3010.3 3011.3 3012.4 3013.5 3014.5 3015.6 3016.6 3017.7 3018.8 3019.8 3020.9 732.3 732.8 3022.0 3023.0 3024. I 733.3 2993.3 2994.3 735.3 2995.4 735.7 12 2996.5 2997.5 733.8 734.3 1 3000.7 738.2 17 3001.8 738.7 18 3002.8 739.2 19 0-23= 734.8 10 DO700 0-2I DONOR 2222 20702 07~M7 ❤❤MMM DEINE 2700 8887 KADAR 3041.2 3042.2 3043.3 3044.4 3045.4 5 6 736.2 13 8 736.7 14 737.2 15 737.7 16 743.1 739.7 20 740.2 21 740.7 741.2 23 741.7 24 742.1 25 742.6 26 743.6 28 744.1 29 744.6 30 745. I 745.6 745.1 33 3032.6 753.1 746.6 34 3033.7 753.6 31 747.1 35 32 747.6 36 748.1 37 748.6 38 749.1 39 3025.2 749.6 3026.2 750. I 3027.3 750.6 3028.4 751.1 43 757.1 757.6 3029.4 751.6 44 40 3030.5 752.1 45 41 3031.6 752.6 46 42 47 3034.8 754.1 49 48 3035.8 754.6 50 3036.9 755.I 51 3038.0 755.6 52 3039.0 756.1 53 756.6 3040. I 54 55 56 758. I 758.6 759.1 59 57 58 400 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 0-23= 6678σ O-2M4 50 5 3048.6 3049.7 4 3050.8 9 II 12 13 14 10 3057.2 3058.3 3059.3 15 16 17 18 19 22222 007°° 67087 COMM DIE DOOD OTOMY HONO 21 23 24 T | = 56° 20 3067.9 3069.0 3070. I 3071.1 3072.2 38 39 3046.5 3047.6 42 3051.9 3052.9 3054.0 43 44 3055. I 3056.1 47 48 49 3060.4 3061.5 3062.6 3063.6 3064.7 3065.8 3066.8 55 56 57 3089.4 40 41❘ 3090.5 E 759.6 760. I 25 3073.3 772.2 26 3074.4 772.7 27 28 3075.4 773.2 3076.5 773.7 29 3077.6 774.2 760.6 761.1 761.6 762. I 762.6 763. I 763.6 764.1 30 31 32 3080.8 775.7 764.6 765. I 765.6 766. I 766.6 33 3081.9 776.3 34 3082.9 776.8 767.1 767.6 768. I 35 3084.0 777.3 36 3085.1 777.8 37 3086.2 778.3 3087.2 778.8 3088.3 779.3 768.6 769.2 769.7 770.2 770.7 771.2 771.7 58 59 3109.9 45 3094.8 782.4 3095.9 782.9 46 3096.9 3098.0 3099. I 779.8 780.3 3091.6 780.9 3092.6. 781.4 3093.7 781.9 50 31.00.2 784.9 51 3101.2 785.5 3078.7 774.7 3143.4 3079.7 775.2 3144.5 3145.6 3146.6 3147.7 52 3102.3 786.0 53 3103.4 786.5 54 3104.5 787.0 | = 57° T E 3110.9 790.1 3112.0 790.6 791.1 3113.1 3114.2 791.6 3115.3 792.1 3116.3 792.7 3117.4 793.2 3118.5 793.7 3119.6 794.2 3120.7 794.7 3121.7 795.2 3122.8 795.8 3123.9 796.3 3125.0 796.8 3126.1 797.3 3127.2 797.8 798.3 3128.2 3129:3 798.9 3130.4 799.4 3131.5 799.9 3132.6 800.4 3133.6 800.9 3134.7 801.5 3135.8 802.0 3136.9 802.5 3138.0 803.0 3139.1 803.5 3140.1 3141.2 3142.3 804.1 804.6 805. I 805.6 806. I 806.7 807.2 807.7 3148.8 808.2 3149.9 808.8 3151.0 809.3 3152. 809.8 3153.2 810.3 3159.7 813.5 3160.8 814.0 783.4 3161.8 814.5 3162.9 815.0 783.9 784.4 3164.0 815.6 3165. I 3166.2 3167.3 3168.4 3169.5 3154.2 810.9 3155.3 811.4 3156.4 811.9 3157.5 812.4 3158.6 812.9 816. I 816.6 817.2 817.7 818.2 3105.6 787.5 3170.6 818.7 3106.6 788.0 3171.6 819.3 3107.7 788.5 3108.8 789.1 789.6 3172.7 819.8 3173.8 820.3 3174.9 820.8 |= T E 3176.0 821.4 3177.1 821.9 3178.2 822.4 3179.3 823.0 3180.4 823.5 3181.4 3182.5 3183.6 3184.7 3185.8 58° 3195.6 3196.7 826.7 3186.9 3188.0 827.2 3189.1 827.7 3190.2 828.3 3191.3 828.8 824.0 824.5 3192.4 829.3 3193.5 829.9 3194.5 830.4 830.9 831.4 3203.3 3204.4 825.1 825.6 826. I 3197.8 832.0 3198.9 3200.0 3201.I 3202.2 832.5 833.0 833.6 834.1 834.6 835.2 3205.5 835.7 3206.6 836.2 3207.7 836.8 3208.8 837.3 3209.9 837.8 3210.9 838.4 3212.0 838.9 3213.1 839.5 3214.2 840.0 3215.3 840.5 3216.4 841.1 3217.5 841.6 3218.6 842.1 3231.8 3232.9 3234.0 3235. I 3219.7 842.7 843.2 3220.8 3221.9 843.7 3223.0 844.3 3224.1 844.8 3225.2 845.4 3226.3 3227.4 845.9 846.4 3228.5 847.0 3229.6 847.5 3230.7 848.1 848.6 849.1 849.7 850.2 3236.2 850.8 3237.3 851.3 3238.4 851.8 3239.5 852.4 3240.6 852.9 1 = 59° T 3241.7 3242.8 3243.9 3245.0 3246.1 3249.4 857.3 3252.7 3253.8 3247.2 3248.3 856.7 6 3254.9 3256.0 3257.1 3258.2 3259.3 3260.4 3261.5 3262.6 E 853.5 854.0 854.5 855. I 855:6 3263.7 3264.8 3265.9 3267.0 3268. I 3269.2 3270.3 1 3250.5 857.8 8 3251.6 858.3 3271.4 3272.6 3273.7 01234 856.2 5 KONOK DIEMI DONOR ONE DONOR 87~M7 HOM08 2007 20000 850MZ HONOR 7 9 858.9 859.4 860.0 12 10 £60.5 13 861.1 14 861.6 15 862.2 16 862.7 17 863.2 18 863.8 19 864.3 20 864.9 21 865.4 22 866.0 866.5 23 24 867. I 867.6 958.2 27 25 26 868.7 28 869.3 29 869.8 30 3274.8 3275.9 3277.0 3278.1 871.5 33 870.4 31 870.9 32 3279.2 872.0 34 3280.3 872.6 35 3281.4 873.1 36 3282.5 873.7 37 3283.6 874.2 38 3284.7 874.8 39 3285.8 875.3 40 3286.9 875.9 441 3288.0 876.4 42 3289.2 3290.3 877.0 43 877.5 44 878. I 45 3291.4 3292.5 3293.6 879.2 47 3294.7 879.7 48 3295.8 880.3 49 3296.9 880.8 3298.0 881.4 51 3299.1 3300.2 881.9 882.5 3301.4 878.6 46 52 53 883. I 54 3302.5 3303.6 884.2 3304.7 884.7 3305.8 885.3 3306.9 885.8 59 883.6 55 56 57 58 401 ↑ TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 0-234 BOTO0 0-2MT DO 0 3308.0 3309. I 3310.2 3311.3 3312.5 5 6 7 8 9 10 12 15 16 13 3322.5 17 893.6 14 3323.6 894.2 - ONE DO700 8. 18 2222 3324.7 894.7 3325.8 895.3 3326.9 895.9 3328.0 896.4 19 3329.2 897.0 ოოო ოო 27 28 29 20 21 3330.3 897.5 3331.4 898.1 3332.5 898.7 22 23 3333.6 899.2 24 3334.7 899.8 T | = 60° 34 25 3335.9 900.3 26 3337.0 900.9 3338.1 901.5 33 36 3313.6 3314.7 3315.8 890.3 3316.9 890.8 3318.0 891.4 30 3341.4 903.2 3342.6 903.7 32 3343.7 904.3 E5558 3319.1 891.9 3320.2 892.5 3321.4 893.1 33 3344.8 904.8 3345.9 905.4 35 3347.0 906.0 3348.1 906.5 37 3349.3 907.1 38 3350.4 907.7 908.2 39 3351.5 40 3352.6 41 3353.7 60000 20000 55555 E 886.4 886.9 887.5 828. I 888.6 42 3354.8 45 889.2 889.7 43 3356.0 44 3357.1 47 3358.2 911.6 3359.3 912.2 3360.4 912.8 48 3361.6 913.3 49 3362.7 913.9 58 59 50 3363.8 51 3364.9 52 3366.0 53 3367.2 54 3368.3 55 3369.4 56 3370.5 3403.1 934.5 3404.3 935.0 3405.4 935.6 3339.2 902.0 3406.5 936.2 3340.3 902.6 3407.7 936.8 908.8 909.4 909.9 910.5 911.1 917.3 917.9 57 3371.7 918.4 3372.8 919.0 3373.9 919.6 914.5 915.0 915.6 916.2 916.7 T | = 61° 3375.0 3376.1 3377.3 3378.4 3379.5 3380.6 923.0 3381.8 923.6 3382.9 924.1 3384.9 924.7 3385.1 925.3 3386.3 3387.4 3388.5 3389.6 3390.8 3397.5 3398.6 3399.8 3391.9 928.7 3393.0 929.3 3394.1 929.9 3395.3 930.4 3396.4 931.0 3400.9 3402.0 E 920.1 920.7 921.3 921.9 922.4 925.8 926.4 927.0 927.6 928. I 931.6 932.2 932.7 933.3 933.9 937.3 3408.8 3409.9 3411.0 937.9 938.5 3412.2 939.1 3413.3 939.7 940.2 3414.4 3415.6 940.8 3416.7 941.4 3417.8 942.0 3418.9 942.5 3431.4 3432.5 3433.7 3420. I 3421.2 3422.3 3423.5 944.9 3424.6 945.4 3434.8 3435.9 3425.7 946.0 3426.9 946.6 3428.0 947.2 3429.1 947.8 3430.3 948.3 948.9 949.5 950. I 950.7 951.3 1 = 62° 3437.1 951.8 3438.2 952.4 3439.3 953.0 3440.5 953.6 3441.6 954.2 T 3442.7 3443.9 3445.0 3446. I 3447.3 3448.4 3449.5 3450.7 3451.8 3452.9 3454.1 3455.2 3456.3 3457.5 3458.6 3459.8 3460.9 3462.0 3465.4 3466.6 3467.7 953.5 964.1 964.7 3463.2 965.3 3464.3 965.9 3474.6 3475.7 943.1 943.7 3489.4 944.3 3490.5 3491.7 3492.8 3476.8 3478.0 3479.1 3480.3 3481.4 3468.9 958.2 3470.0 968.8 E 954.8 955.3 955.9 956.5 957. I .:3471.1 3472.3 3473.4 970.6 957.7 958.3 958.8 959.4 960.0 3494.0 3495. I 3496.2 3497.4 3498.5 960.6 961.2 3499.7 3500.8 3502.0 3503. I 3504.3 961.8 962.4 963.0 3505.4 3506.6 3507.7 3508.8 3510.8 966.5 967.I 967.7 975.3 3482.5 3483.7 975.9 3484.8 976.5 3486.0 977.1 3487.1 977.7 3488.2 978.3 978.9 979.5 980. I 980.7 969.4 970.0 971.2 971.8 972.4 973.0 973.6 974.2 974.8 981.3 981.9 982.5 983.1 983.7 984.3 984.9 985.5 986. I 986.7 987.3 987.9 988.4 989.0 989.6 1 = 63° T E 3511.1 990.2 3512.3 990.8 3513.4 991.4 3514.6 3515.7 3516.9 3518.0 3519.2 3520.3 3521.5 3522.6 3523.8 3524.9 3526. I 3527.2 3528.4 3529.5 3530.7 3531.8 3533.0 3534.1 3535.3 3536.4 3537.6 3538.7 3539.9 3541.0 3542.2 3543.3 3544.5 3545.6 3546.8 3547.9 3549. I 3550.2 3551.4 3552.5 3553.7 3554.8 3556.0 3557.2 3558.3 3559.5 3560.6 3561.8 3562.9 3564.1 3565.2 3566.4 3567.5 3568.7 3569.9 3571.0 3572.2 3573.3 3574.5 3575.6 3576.8 3578.0 3579.1 1 01237 992.0 992.6 4 993.2 5 993.8 6 994.4 7 995.0 8 995.6 9 996.2 10 996.8 11 997.5 12 998. I 13 998.7 14 999.3 15 999.9 16 ICCO.5 17 1001. 18 1001.7 19 1002.3 20 1002.9 21 1003.5 22 1004. 23 1004.7 24 1005.3 25 1005.9 26 1006.5 27 1007.1 28 1007.7 29 1008.3 30 1008.9 31 1009.5 32 1010.1 33 1010.7 34 1011.3 35 1012.0 36 1012.6 37 1013.2 38 1013.8 39 1014.4 40 1015.0 41 1015.6 42 1016.2 43 10.6.81 44 1017.4 45 1018. 1 46 1018.7 47 1019.3 48 1019.9 49 1020.5 50 1021.1 51 1021.7 52 1022.3 53 1022.9 54 1023.5 55 1024.2 56 1024.8 57 1025.4 58 1026.0 59 402 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 0-NMI MONO DINA DONO ONE LO700 07037 0OMMA DIN 99700 8508Z KANAA 2 3 3583.8 1028.5 3584.9 1029.1 7 5 3586.1 6 3587.2 3588.4 8 3589.6 9 3590.7 || 12 13 10 3591.9 15 143596.5 17 1035.9 16 3598.8 1036.5 22 18 3601.2 25 1037.1 1037.8 19 3602.3 1038.4 27 20 3603.5 1039.0 1 = 64° T E T 3650.2 3580.3 1026.6 3581.4 1027.2 3651.4 3582.6 1027.8 3652.5 3653.7 3654.9 3673.7 21 3604.7 1139.6 3674.8 23 3607.0 1040.9 24 3608.2 1041.5 26 3610.5 35 37 38 29 3614.0 40 3593.0 3594.2 3595.4 1034.7 3597.7 الا 3600.0 28 3612.8 1044.0 1044.6 43 45 1045.2 31 3616.3 1045.8 46 47 48 49 51 52 1029.7 1030.3 1030.9 1031.6 1032.2 32 33 34 3619.8 1047.7 54 1032.8 1033.4 1034.0 3661.9 3663. I 3664.3 3665.4 1035.3 3666.6 3611.6 3609.3 1042.1 42 3629.I 56 3605.8 1040.2 3676.0 3677.2 3678.4 59 3615.1 3617.5 3621.0 1048.3 3691.3 1048.9 3692.5 36 3622.| 3623.3 1049.5 3693.7 3624.5 1050.2 3694.9 393625.6 1050.8 3696.0 1042.7 1043.3 1046.4 3617.6 1047.1 3626.8 1051.4 3697.2 3628.0 1052.0 3698.4 1052.7 3699.6 3630.3 1053.3 3700.8 44 3631.5 1053.9 3702.0 53.3642.0 1 = 65° 3656. I 3657.2 3658.4 3659.6 3660.7 3667.8 3669.0 3670. I 3671.3 3672.5 3679.5 3680.7 3681.9 3683. I 3684.3 3685.4 3686.6 3687.8 3689.0 3690. I 3705.5 3706.7 3707.9 55 3644.3 1060.8 3715.0 3645.5 1061.4 3716.1 58 3647.8 1062.7 3718.5 1063.3 3719.7 3649.0 E T 1063.9 3720.9 3722.1 1064.5 1065.2 1065.8 3723.2 3724.4 1066.4 3725.6 1067.0 1067.7 1068.3 1068.9 1069.6 1073.4 1074.0 1074.7 1075.3 1076.0 1070.2 1070.8 1071.5 3735.1 1072.1 3736.3 1072.8 3737.5 1076.6 1077.2 1077.9 1078.5 1079. I 1079.7 1080.4 1081.0 1081.6 1082.3 1082.9 1083.5 3632.6 3633.8 3635.0 3636. I 3637.3 3638.5 1057.7 3709.0 1095.7 3639.7 1058.3 3710.2 1096.3 3640.8 1058.9 3711.4 1097.0 1059.6 3712.6 1097.6 3643.2 1060.2 3713.8 1098.3 1054.5 3703.1 1092.5 1055.2 3704.3 1093.1 1055.8 1056.4 1093.8 1094.4 1057. I 1095. I 1086. I 1086.7 1087.4 1088.0 1088.7 1098.9 1099.6 57 3646.7 1062.0 3717.3 1100.2 1089.3 1089.9 1090.6 1091.2 1091.9 | = 66° 3729.2 3730.4 3731.6 3726.8 1105.4 3728.0 1106.0 1106.7 1107.3 1108.0 3732.7 3733.9 3742.2 3743.4 3744.6 3745.8 3747.0 1084.2 3758.9 1084.8 3760.1 1085.5 3761.3 3748.2 3749.4 3738.7 1!11.8 3739.9 1112.5 3741.1 1113.1 3750.6 3751.8 3752.9 3754. I 3755.3 3756.5 3757.7 3762.5 3763.7 3764.9 3766. I 3767.3 3780.4 3781.6 E 1102.2 1102.8 3782.8 3784.0 3785.2 1103.5 1104.1 1104.8 3786.4 3787.6 3788.8 1100.9 3790.0 1101.5 3791.2 1108.6 1109.2 1113.8 |||4.4 115.1 1115.8 1116.4 [17. | 1117.7 3805.6 1109.9 3806.8 1110.5 3808.0 |||1.2 3809.2 118.4 1119.1 !!!9.7 1120.4 1121.0 1128.2 3768.5 3769.6 1128.9 3770.8 1129.5 3772.0 1130.2 3773.2 1130.8 3774.4 1131.5 3775.6 1132.2 3776.8 1132.8 3778.0 1133.5 3779.2 1121.7 1122.3 1123.0 1123.6 1124.3 1125.6 1126.2 1 = 67° T E 3792.4 1141.4 3793.6 1142.1 3794.8 1142.7 3796.0 1143.4 3797.2 1144.0 1134.8 1135.5 3798.4 3799.6 3800.8 3802.0 3803.2 1138.1 1138.8 1139.4 1140. I 1140.7 3804.4 1148.0 1148.7 3810.4 3811.6 3812.8 3814.0 3815.2 3816.4 3817.6 3818.8 3820.0 3821.2 3822.4 3823.6 1124.9 3834.5 3835.7 3836.9 1126.9 3838.1 1127.5 3839.3 3824 8 3826.0 3827.2 3828.4 3829.6 3830.8 3832.0 3833.3 3840.5 3841.7 3842.9 3844.1 3845.3 3846.5 3847.7 1134.1 3851.4 3849.0 3850.2 3852.6 3853.8 1136.1 3855.0 1136.8 3856.2 3857.4 1137.4 3858.6 3859.8 3861.1 3862.3 3863.5 1144.7 5 1145.4 1146.0 1146.7 8 1147.3 9 0123= 1149.3 1150.0 1150.7 14 667000-231 LOT OF 20 1151.3 15 1152.0 16 1152.7 17 1153.4 18 1154.0 19 1154.7 20 1155.421 1156.0 22 1156.7 23 157.3 24 1158.7 1158.0 25 26 1159.3 27 1160.0 28 1160.6 29 1161.3 30 1162.0 31 1162.7 32 1163.3 33 1164.0 34 1164.7 35 1165.4 36 1166.1 37 1166.7 38 1167.4 39 1168.1 40 1168.8 41 1169.4 42 1170. I 43 1170.8 44 1171.4 45 1172. 46 1172.8 47 1173.5 48 1174.49 1174.8 50 1175.5 51 1176.2 52 1176.8 53 1177.5 54 1178.2 55 1178.9 56 1179.6 57 1180.2 58 180.9 59 403 1 TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 01234 KONOK DINMI CON ~~2 20700 07087 667MM DIE 1792 mon 9 8 3874.4 3864.7 1181.6 3865.9 1182.3 3867.1 1183.0 3868.3 1183.6 3869.6 5 3870.8 6 3872.0 3944.0 3945.2 7 3873.2 1186.4 3946.5 1187.0 3947.7 3948.9 3875.6 1187.7 12 15 16 17 18 19 10 3876.8 1188.4 3950.2 || 3878.0 1189.1 3951.4 3879.3 1189.8 3952.6 13 3880.5 1190.4 3953.9 14 3881.7 1191.1 3955. I 23 22 3891.4 25 26 24 3893.9 29 T 20 3889.0 1195.2 21 3890.2 1195.9 1 = 68° 3882.9 3884. I 3885.3 3886.6 3887.8 35 3892.6 38 39 E .... T 3937.9 3939. I 3940.3 3941.6 1184.3 3942.8 3895. I 3896.3 3897.5 40 3907.3 36 3908.5 41 1198.6 1199.3 1200.0 28 3898.7 1200.6 3972.3 3900.0 1201.3 3973.6 30 3901.2 1202.0 42 1185.0 1185.7 31 3902.4 1202.7 32 3903.6 1203.4 1191.8 1192.5 1193.2 1193.8 1194.5 33 3904.8 1204.1 55555 1196.6 1197.2 197.9 1 = 69° 3974.8 1243.7 3976.0 1244.4 3977.3 1245.1 3978.5 1245.8 34 3906.1 1204.8 3979.7 1246.5 3956.3 3957.5 3958.8 3960.0 3961.2 1205.4 1206. I 1206.8 1207.5 43 44 3918.3 1211.7 45 3919.5 1212.3 46 3962.5 3963.7 3981.0 1247.2 3982.2 1248.0 3983.4 1248.7 3984.7 1249.4 37 3909.7 3910.9 3912.2 1208.2 3985.9 1250.1 E 1222.7 1223.4 1224.1 1224.8 1225.5 1226.2 1226.9 1227.6 1228.3 1229.0 3913.4 1208.9 3987.2 3914.6 1209.6 3988.4 3915.8 1210.3 3989.6 3917.1 1211.0 3990.9 1229.7 1230.4 1231.1 1231.8 1232.5 3968.6 1240.2 3969.9 1240.9 3971.1 1241.6 1236.7 1237.4 3964.9 1238.1 4039.3 3966.2 1238.8 4040.6 3967.4 1239.5 4041.8 1242.3 1243.0 1233.2 4030.6 1233.9 4031.8 1234.6 4033.1 1235.3 4034.3 1236.0 4035.6 T 1250.8 1251.5 1252.2 1252.9 3992.1 1253.6 1 = 70° E 4011.9 1265.0 4013.2 1265.7 4014.4 1266.4 4015.7 1267.1 4016.9 1267.8 1254.3 1255.1 1255.8 4018.2 4019.4 4020.6 4021.9 4023. I 4024.4 4025.6 4026.9 4028. I 4029.4 4036.8 4038.1 4043.1 4044.3 4045.6 4046.8 4048.1 4049.3 4050.6 4051.8 4053.I 4054.3 4055.6 4056.8 4058. I 4059.3 4060.6 4061.8 4063.1 4064.3 4065.6 4066.8 4068.1 4069.3 4070.6 4071.9 4073. I 4074.4 4075.6 4076.9 4078.1 4079.4 1275.7 1276.4 1277.1 1277.9 1278.6 1268.5 4093.2 1269.3 4094.5 1311.9 5 1312.6 6 1313.4 7 1270.0 4095.7 1270.7 4097.0 1314.1 8 1271.4 4098.2 1314.9 9 1272.1 1272.8 1273.5 1274.3 4103.3 1275.0 4104.5 1282.9 1283.6 1284.3 1285.1 1285.8 3993.3 3920.7 1213.0 3994.6 3921.9 1213.7 47 3995.8 48 3923.2 1214.4 3997.1 1256.5 3924.4 1215.1 1257.2 3998.3 3999.5 1215.8 1257.9 50 3925.6 51 3926.8 1216.5 52 3928.1 1217.2 53 3929.3 54 3930.5 55 3931.7 1219.2 4005.7 56 3933.0 1219.9 57 3934.2 1220.6 4008.2 1262.9 4083.1 4000.8 1258.6 4002.0 1259.3 1217.9 4003.3 1260.0 1218.6 4004.5 1260.7 1261.4 4007.0 1262.2 4080.6 1304.5 4081.9 1305.3 58 3935.4 1221.3 59 3936.7 1222.0 4009.5 1263.6 4010.7 1264.3 1306.0 4084.4 1306.7 4085.7 1307.5 | = 71° T E 4086.9 4088.2 1308.2 1308.9 4089.4 1309.7 4090.7 1310.4 4091.9 1311.2 1279.3 1280.0 1280.7 1281.5 4115.9 1282.2 4117.2 1293.7 1294.3 1295. I 1295.8 1296.5 4099.5 4100.8 4102.0 1297.2 1298.0 1298.7 1299.4 1300.2 4105.8 4107.1 4108.3 4109.6 4110.9 4112.1 4113.4 4114.6 1286.5 4124.8 1287.2 4126.0 1287.9 4127.3 1288.6 4128.6 1289.3 4129.8 1290.0 4131.1 1290.8 1291.5 4132.4 4133.6 4134.9 1292.2 1292.9 4136.2 4118.4 4119.7 4121.0 4122.2 4123.5 4137.4 4138.7 4140.0 4141.2 4142.5 4143.8 4145.0 4146.3 4147.6 4148.8 1300.9 4150.1 1301.6 4151.4 1302.4 4152.7 4153.9 1303.1 1303.8 4155.2 0-23A 4156.5 4157.7 4159.0 4160.3 4161.6 1315.5 10 1316.3 || 1317.1 12 1317.8 13 1318.5 14 1319.2 15 1320.0 16 1320.7 17 1321.4 18 1322.2 19 1322.9 20 1323.6 21 1324.4 22 1325. 23 1325.9 24 1326.6 25 1327.3 26 1328.1 27 1328.8 28 1329.6 29 1330.3 30 1331.0 31 1331.8 32 1332.5 33 1333.3 34 1334.0 35 1334.7 36 1335.5 37 1336.2 38 1337.0 39 1337.7 40 1338.4 41 1339.2 42 1339.9 43 1340.744 1341.4 45 1342. 46 1342.9 47 1343.6 48 1344.4 49 1345.1 50 1345.8 51 1346.6 52 1347.3 53 1348.1 54 1348.8 55 1349.6 56 1350.3 57 1351. 58 1351.859 404 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 1 0123➡ 5678 σ 9 10 11 123I BOMB ONE O❤7°º 8~~ma 14 21 22 15 4182.0 1363.8 16 4183.2 1364.6 17 4184.5 1365.3 ოო 19 4187.1 1366.8 27 20 4188.4 4189.6 32 23 24 4193.5 33 1=72° T E 4162.8 1352.6 4164.1 1353.3 4165.4 1354.1 4166.7 1354.8 4167.9 1355.6 == w w wy £5555 39 42 4169.2 1356.3 4246.2 1357.1 4247.5 1357.8 4170.5 4171.8 4173.0 4174.3 1358.6 4250.0 1359.3 4251.3 35 4207.6 36 4208.8 37 4210.1 ཝཟ ཟ 4252.6 4253.9 4175.6 1360.1 4176.9 1360.8 4178.1 1361.6 4255.2 4179.4 1362.3 4256.5 4180.7 1363.1 4257.8 1367.6 1368.4 4190.9 1369. I 4192.2 25 4194.8 1371.4 4272.0 26 4196.0 1.372.2 4273.3 4197.3 1372.9 4274.6 45 28 4198.6 1373.7 4275.9 29 4199.9 1374.4 4277.2 4185.8 1366.1 4263.0 4264.3 30 4201.2 1375.2 4278.5 31 4202.4 1376.0 4279.8 4281.1 4203.7 1376.7 4205.0 1377.5 4282.4 34 4206.3 1378.2 4283.7 40 4214.0 1555 -234 41 4215.3 4216.5 51 43 4217.8 44 4219.1 1369.9 1370.6 1 = 73° T 4239.7 4241.0 4242.3 4243.6 4244.9 1379.0 1379.8 1380.5 52 53 54 4232.0 4259.1 4260.4 4261.7 1383.6 1384.3 1401.8 1402.6 4248.8 1403.4 1385. I 1385.8 4211.4 1381.3 4288.9 4212.7 1382.0 4290.2 4285.0 4286.3 4287.6 1382.8 4291.5 4292.8 4294.1 4295.4 4296.7 50 4226.8 1390.4 4304.6 E 1398.0 1398.8 1399.5 1400.3 1401.1 4228.1 1391.2 4305.9 4229.4 1391.9 4307.2 4230.7 1404.2 1404.9 4265.6 1413.5 4266.9 1414.3 4268.2 1415.0 4346.4 1405.7 1406.5 1407.3 1408.0 1408.8 55 56 4234.6 1395.0 4312.4 57 4235.9 1395.7 4313.7 58 4237.1 1396.5 4315.0 59 4238.4 1397.2 4316.3 1409.6 1410.4 1411.2 1411.9 1412.7 4269.5 1415.8 4347.7 4270.7 1416.6 4349.0 4220.4 1386.6 4298.0 1432.9 46 4221.7 1387.4 4299.3 1433.7 47 4223.0 1388.1 4300.6 1434.5 1435.2 48 4224.3 1388.9 4301.9 49 4225.5 1389.6 4303.2 1436.0 1417.3 1418.1 1418.9 1419.7 1420.4 1421.2 1422.0 1422.8 1423.5 1424.3 1425.1 1425.9 1426.7 1427.4 1428.2 1429.0 1429.8 1430.6 1436.8 1437.6 1438.4 1392.7 4308.5 1439.1 1393.4 4309.8 1439.9 | = 74° T 4317.6 4318.9 4320.2 4321.5 4322.8 4233.3 1394.2 4311.1 1440.7 1441.5 1442.3 1443.0 1443.8 4324.1 4325.4 4326.8 4328.1 4329.4 4330.7 4332.0 4333.3 4334.6 4335.9 4337.2 4338.5 4339.9 4343.8 4345.1 4350.4 4351.7 4353.0 4354.3 4355.6 4370. I 4371.4 4372.7 1431.3 4374.1 1432.1 4375.4 4341.2 1458.8 4342.5 1459.6 4366.1 4367.5 4368.8 4376.7 4378.0 4379.3 4380.6 4382.0 E T E 1444.6 1445.4 4396.5 1492.4 4397.8 1493.2 1446.2 4399.2 1494.0 1447.0 4400.5 1494.8 1447.8 4401.8 1495.6 4383.3 4384.6 4395.9 4387.3 4388.6 1448.5 4403.1 1449.3 1450.1 1450.9 1451.7 1452.5 1453.3 4389.9 4391.2 4392.5 4393.9 4395.2 1454.1 1454.9 1455.7 1456.4 1457.2 1458.0 4363.5 4364.8 1473.2 1474.0 1474.8 1475.6 1460.4 1461.2 1462.0 1462.8 1463.6 | = 75° 4356.9 1468.4 4436.4 4358.2 1469.2 4437.7 4359.6 1470.0 4360.9 1470.8 4362.2 1471.6 1476.4 1477.2 1478.0 1478.8 1479.6 4404.5 4405.8 1498.1 4407.1 4408.4 1480.4 1481.2 1482.0 1482.8 1483.6 4409.8 4411.1 4412.4 4413.8 4415.1 1464.4 4429.7 1465.2 4431.0 1466.0 4432.4 1466.8 4433.7 1467.6 4435.0 4416.4 4417.7 4419.1 4420.4 4421.7 4423.1 4424.4 4425.7 4427.0 4428.4 1472.4 4443.0 4439.0 4440.4 4441.7 4444.4 4445.7 4447.0 4448.4 4449.7 4451.1 4452.4 4453.7 4455. I 4456.4 4457.7 4459. I 4460.4 4461.7 1496.4 1497.3 6 1499.7 1498.9 8 01234 I 500.5 1501.3 1502.1 12 DO700 0-2MI MOZOM OU DON°2 2~~♡~ ❤OM88 GENRE CONDO IGNAZ KANH8 5 1502.9 13 9 1503.7 14 1504.5 15 10 1505.4 16 1506.2 17 1507.0 18 1507.8 19 1508.6 20 1509.4 21 1510.2 22 1511.0 23 1511.8 24 1512.6 25 1513.5 26 1514.3 27 1515. 28 1515.9 29 1516.7 30 1517.5 31 1518.3 32 1519.2 33 1520.0 34 1520.8 35 1521.6 36 1522.4 37 1526.5 1523.3 38 1524. 39 1524.9 40 1525.7 41 1530.6 1527.4 43 1528.2 44 42 1529.0 45 1488.4 4469.8 1489.2 1490.0 4472.5 1538.9 1490.8 1491.6 1529.8 46 1537.2 1531.5 48 47 1532.3 49 1484.4 4463.1 1533.1 50 1485.2 4464.4 1533.9 51 1486.0 4465.8 1534.8 52 1486.8 4467.1 1535.6 53 1487.6 4468.4 1536.4 54 55 4471.1 1538.1 56 57 4473.8 1539.7 58 4475.2 1540.6 59 405 1 TABLE VIII.—TANGENTS AND EXTERNALS FOR A 1° curve (Chord or Arc Definition) 1 = 76° T E T 0 4476.5 1541.4 4557.6 1542.2 4558.9 I 4477.8 2 4479.2 1543.1 4560.3 3 1543.9 4561.7 4480.5 4481.9 1544.7 4563.0 5 4483.2 6 4484.6 7 4485.9 1547.2 8 4487.2 1548.0 9 4488.6 1548.9 10 4489.9 11 4491.3 12 4492.6 13 4494.0 144495.3 154496.7 16 4498.0 4499.4 17 18 4500.7 19 4502.0 1545.5 1546.4 25 4510.I 26 4511.5 27 4512.8 4514.2 29 4515.5 28 30 4516.9 31 4518.2 32 4519.6 334520.9 34 4522.3 1549.7 1550.5 1551.4 20 4503.4 1558.0 4504.7 1558.8 22 4506.1 1559.7 21 23 4507.4 1560.5 1561.3 24 4508.8 4571.2 4572.6 4573.9 1552.2 4575.3 1553.0 4576.6 | = 77° 1553.8 4578.0 1554.7 4579.4 1555.5 4580.7 1556.3 4582.1 1557.2 4583.5 4564.4 4565.7 4567. I 4568.5 4569.8 1570.5 1571.3 1562.1 4591.7 1563.0 4593.I 1563.8 4594.4 1564.6 4595.8 1565.5 4597.2 1572.2 1573.0 1573.9 ་ 4605.4 4606.8 4608. I 4609.5 4610.9 T 1591.6 4639.8 1592.4 4641.2 1593.3 4642.5 1594.1 4643.9 1595.0 4645.3 1595.8 4646.7 1596.7 4648.1 1597.5 4649.4 1598.4 4650.8 1799.2 4652.2 1600. I 1600.9 1601.8 1602.6 1603.5 4584.8 1608.6 4586.2 1609.4 4587.6 1610.3 4589.0 4590.3 1604.3 1605.2 1606.0 1606.9 1607.7 1566.3 4598.5 1567.1 4599.9 1568.0 4601.3 4602.6 1568.8 1569.7 4604.0 1620.5 1611.1 1612.0 1612.8 1613.7 1614.5 1615.4 1616.2 35 4523.7 36 4525.0 37 4526.4 384527.7 39 | 4529.1 4612.2 1625.7 1574.7 1575.5 4613.6 1626.6 40 4530.4 41 4531.8 424533.1 1576.4 4615.0 1627.4 43 4534.5 1577.2 4616.4 1628.3 444535.8 1578.1 45 4537.2 1578.9 4619.1 46 4538.6 1579.7 4620.5 474539.9 1580.6 4621.9 48 4541.3 1581.4 4623.2 49 4542.6 1582.3 4624.6 1 = 78° 1630.0 1630.9 1631.8 1632.7 1633.5 4653.6 4655.0 50 4544.0 1583.1 4626.0 1634.4 51 4545.3 4627.4 1635.3 1583.9 1584.8 1636. I 4628.8 1585.6 4630.I 1637.0 1586.5 4631.5 1637.8 52 4546.7 53 4548.I 544549.4 554550.8 564552.1 57 4553.5 58 4554.9 594556.2 4656.4 4657.7 4659.1 1587.3 4632.9 1638.7 1588.2 4634.3 1639.6 1589.0 1589.9 4635.6 1640.4 4637.0 1641.3 1590.7 4638.4 1642. I 4660.5 4661.9 1617.1 4681.3 1618.0 4682.7 1618.8 1619.7 4663.3 4664.7 4666.1 4667.4 4668.8 4670.2 4671.6 4673.0 1621.4 4688.3 1622.3 4689.7 1623.1 4691.1 1624.0 4692.4 1624.8 4693.8 4674.4 4675.8 4677.2 4678.5 4679.9 4695.2 4696.6 4698.0 4699.4 4617.7 1629.2 4700.8 4684.1 4685.5 4686.9 4702.2 4703.6 4705.0 4706.4 4707.8 4709.2 4710.6 4712.0 4713.4 4714.8 4716.2 4717.6 4719.0 4720.4 4721.8 E 1643.0 1643.9 1644.7 1645.6 1646.5 1647.3 1648.2 1649.1 1650.0 1650.8 1651.7 1652.6 1653.5 1654.3 1655.2 1656. I 1657.0 1657.9 1658.7 1659.6 1664.8 1665.7 1666.6 1667.5 1668.3 1669.2 1670. I 1671.0 1671.9 1672.8 1660.5 4751.2 1661.4 4752.6 1662.2 4754.0 1663.1 4755.4 1664.0 4756.8 1682.5 1683.4 1684.3 | = 79° 1685. I 1686.0 T E 4723.2 1695.8 4724.6 1696.7 4726.0 1697.6 4727.4 1698.5 4728.8 1699.4 1691.3 1692.2 4737.2 4738.6 4740.0 4741.4 4742.8 1693. I 1694.0 1694.9 4744.2 4745.6 4747.0 4748.4 4749.8 4730.2 1700.2 4731.6 1701.1 4733.0 1702.0 4734.4 1702.9 8 4735.8 4758.3 4759.7 4761.1 4772.4 1673.6 1674.5 4773.8 1675.4 4775.2 1676.3 4776.6 1677.2 .4778.0 4762.5 4763.9 4765.3 4766.7 4768.1 4769.5 4770.9 1 4786.5 4787.9 4789.3 4790.7 4792.1 0-231 567BK 0-2MA DOT6K 4 4800.7 4802.1 4803.5 4804.9 4806.3 1703.8 9 1704.7 10 1705.6 1706.5 12 1707.4 13 1708.3 14 1709.2 15 1710.1 16 1711.0 17 1711.9 18 1712.8 19 1713.7 20 22222 222 1678. I 4779.4 1679.0 4780.8 4782.2 4783.7 1734.4 43 1731.7 40 1732.6 41 1733.5 42 1679.9 1680.7 1681.6 4785.1 1735.3 44 1736.2 45 1737.246 1738.1 47 1739.0 48 1739.9 49 1714.6 21 1715.5 22 1716.4 23 1717.3 24 1718.2 25 1719.1 26 1720.0 27 1720.9 28 1721.8 29 1722.7 30 1723.6 31 1724.5 32 1725.4 33 1726.3 34 1686.9 4793.6 1740.8 50 1687.8 4795.0 1741.751 1688.7 4796.4 1742.6 52 1689.6 4797.8 1743.5 53 1744.4 54 1690.5 4799.2 1727.2 35 1728.1 36 1729.0 37 1729.9 38 1730.8 39 1745.355 1746.3 56 1747.2 57 1748.1 | 58 1749.0 59 406 1 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) 01234 KONOM ONMI DONDO ONE D0700 8.~M7 KOMM. 22 0 508 7 5 4814.9 1754.4 1755.4 6 4816.3 1756.3 1757.2 1758. I 8 9 10 12 19 4824.8 1760.8 1761.8 14 4827.7 1762.7 21 13 4826.2 22 1763.6 15 4829.1 16 4830.5 1764.5 17 4831.9 1765.4 24 25 | = 80° T 27 E 4807.7 1749.9 4893.6 4809.2 1750.8 4895.0 4810.6 1751.7 4896.5 4812.0 1752.6 4897.9 1753.5 4813.4 4899.4 28 29 4817.7 4819.1 4820.5 18 4833.4 1766.4 4919.6 4921.0 31 4822.0 4823.4 32 20 4836.2 1768.2 4922.5 34 1759.0 1759.9 4834.8 1767.3 23 4840.5 1771.0 4926.8 51 | = 81° T 30 4850.5 4900.8 4902.2 4903.7 4905. I 4906.6 26 4844.8 1773.7 4931.2 1774.6 4932.6 1846.2 4847.6 4849. I 4934.1 1775.6 1776.5 4935.5 4908.0 4909.5 4910.9 4912.4 4913.8 4915.2 4916.7 4837.6 1769.1 4923.9 33 4854.8 1780.2 4839.1 1770.0 4925.4 35 4857.7 36 4859. I 37 4860.5 38 4862.0 4841.9 1771.9 4928.3 4843.4 1772.8 4929.7 1819.4 1820.3 4918.1 1821.3 1822.2 1823.2 50 4879.2 1796.0 4880.6 1796.9 52 4882.1 1797.9 1777.4 4937.0 4851.9 1778.3 4938.4 4853.4 1779.3 4939.9 4941.3 4856.2 1781.1 4942.8 1782.0 1783.0 1783.9 1784.8 39 4863.4 1785.8 4950. I 4944.2 4945.7 40 4864.8 1786.7 4951.5 41 4866.3 1787.6 4953.0 4867.7 1788.6 4954.4 42 43 4869.1 1789.5 4955.9 44 4870.6 1790.4 4957.3 45 4872.0 1791.3 4958.8 46 4873.4 1792.3 4960.3 47 4874.9 1793.2 4961.7 48 4876.3 1794.1 4963.2 49 4877.8 1795.1 4964.6 4947.2 4948.6 4966. I 4967.6 4969.0 E 1805.3 1806.2 1807.2 53 4883.5 1798.8 4970.5 54 4884.9 1799.7 4971.9 1800.6 4886.4 4973.4 55 1802.5 4976.3 56 4887.8 1801.6 4974.9 57 4889.3 58 4890.7 1803.4 4977.8 59 4892. I 1804.4 1808. I 1809. I 1814.7 1815.6 1816.6 1817.5 1818.5 1810.0 4988.0 1810.9 4989.5 4991.0 1811.9 1812.8 4992.4 1813.8 4993.9 1824.1 1825.0 1826.0 1826.9 1827.9 1833.6 1834.5 1835.5 1836.4 1837.4 1838.3 1839.3 1840.2 1841.2 1842.1 1843.1 1844.0 1845.0 1845.9 1846.9 1 = 82° T 4980.7 4982.2 4983.6 1852.6 1853.6 1854.5 1855.5 1856.4 4985.1 4986.6 1857.4 1858.4 1859.3 1860.3 4979.2 1861.2 1828.8 5017.4 1829.8 5018.9 1830.7 5020.3 1831.7 1832.6 4995.4 4996.8 4998.3 4999.8 5001.2 5002.7 5004.2 5005.6 5007. I 5008.6 5010.0 5011.5 5013.0 5021.8 5023.3 5024.8 5026.2 5027.7 5029.2 5030.7 5032.1 5033.6 5035. I 5036.6 5038. I 1847.8 5046.9 1848.8 5048.4 1849.7 5049.9 1850.7 5051.4 1851.6 5052.8 5039.5 5041.0 5042.5 5044.0 5045.4 E 1862.2 1863.2 1864. I 1865. I 1866.0 1867.0 1868.0 1868.9 1869.9 1870.8 1871.8 1872.8 1873.7 1874.7 1875.7 1876.6 1877.6 1878.6 1881.5 5099.0 1882.5 5100.4 1883.4 5101.9 5014.5 1884.4 5103.4 5015.9 1885.4 5104.9 1891.2 1892.2 1893.1 1894. I 1895.1 1 = 83° 1896.0 1897.0 1898.0 1899.0 1900.0 T 5069.2 5070.7 1900.9 1901.9 1902.9 1903.8 i 904.8 5072.1 5073.6 5075. I 5094.5 1879.6 5096.0 1880.5 5097.5 5076.6 5078. I 5079.6 5081.1 5082.6 5084.0 5085.5 5087.0 5088.5 5090.0 1886.3 5106.4 1887.3 5107.9 1888.3 5109.4 1889.3 5110.9 1890.2 5112.4 5061.7 1915.6 5063.2 5064.7 1916.6 1917.6 5066.2 1918.5 5067.7 1919.5 5091.5 5093.0 E 1920.5 1921.5 1922.5 1923.5 1924.5 1925.4 1926.4 1927.4 1928.4 1929.4 1930.4 1931.4 1932.4 12 1933.4 13 1934.4 14 10 1935.3 15 1936.3 16 1937.3 17 1938.3 18 1939.3 1940.3 20 60700 0-2MI DONDO OU DONº 8. 1941.3 21 1942.3 22 1943.3 23 1944.3 24 1945.3 25 1946.3 26 1 1947.3 27 1948.3 28 1949.3 29 0123A 1950.3 30 5113.9 5115.4 1951.3 31 5116.9 1952.3 32 5118.4 1953.3 33 5119.9 1954.3 34 5142.4 5143.9 5055.8 1911.7 5145.4 5054.3 1910.7 5057-3 1912.7 5146.9 1972.3 5058.8 1913.6 1914.6 5060.3 5121.4 1955.2 35 5122.9 1956.2 36 5124.4 1957.2 5125.9 1958.2 38 5127.4 1959.2 39 COLOR 20000 55555 £5555 wwwww 1960.2❘ 40 1961.241 5128.9 5130.4 5131.9 1962.2 5133.4 1963.2 43 5134.9 1964.2 44 37 5136.4 1905.8 1906.8 1965.2 45 5137.9 1966.3 46 1907.8 5139.4 1967.3 47 1908.7 5140.9 1968.3 48 1909.7 1969.3 49 42 1970.3 50 1971.3 51 52 5148.4 1973.3 53 5150.0 1974.3 54 5151.5 1975.3 55 5153.0 1976.4 56 5154.5 1977.4 57 5156.0 1978.4 5157.5 1979.4 59 58 407 TABLE VIII. TANGENTS AND EXTERNALS FOR A 1º CURVE (Chord or Arc Definition) T 222 2 0-2MT DONCK OUNCE ON OMA KONDO OM~m7 ❤❤♪❤. O 00 85885 6858 E T 0 5159.0 1980.4 5250.3 5160.5 1981.4 1 5251.8 5253.3 5254.9 5256.4 2 5162.0 1982.4 3 5163.5 1983.4 5165.0 1984.4 5 5166.6 65168.1 75169.6 8 5171.1 9 5172.6 105174.1 II 5175.6 125177.1 13 5178.7 145180.2 21 5190.8 24 5195.3 2001.6 5282.5 22 5192.3 2002.6 5284.1 27 23 5193.8 2003.7 5285.6 2004.7 5287.2 28 T 5265.6 5267.I 1990.5 1991.5 1992.5 5268.7 1993.5 5270.2 1994.5 5271.8 1995.5 5273.3 15 2057.3 5181.7 16 5183.2 1996.6 5274.8 2058.0 1997.6 5276.4 2059.4 1998.6 5277.9 5279.5 17 5184.7 185186.2 19 5187.7 1999.6 2060.4 2061.5 20 5189.3 2000.6 5281.0 | = 84° 25 5196.8 2005.7 5288.7 26 5198.4 2006.7 5290.3 30 32 M 29 5202.9 2009.8 5294.9 5204.5 315206.0 5207.5 33 5209.0 40 2010.8 5296.4 2011.8 5298.0 2012.9 5299.5 2014.0 5301.1 34 5210.5 2014.9 5302.6 38 5216.6 1985.4 5257.9 1986.5 5259.5 1987.5 5261.0 1988.5 1989.5 5262.5 5264. I 48 35 5212.1 2015.9 5304.2 36 5213.6 2017.0 5305.7 37 5215.1 49 1 = 85° 39 5218.2 2020. I 50 51 5201.4 2008.8 5293.3 52 2067.7 2068.8 5199.9 2007.7 5291.8 2069.8 2070.9 2071.9 41 42 5222.7 2023.2 43 5224.3 2024.2 44 5225.8 2025.2 5219.7 45 5227.3 2026.2 5228.8 2027.3 5230.4 2028.3 5231.9 46 47 57 2021.1 5221.2 2022. I E 2041.7 2042.7 2043.8 2044.8 2045.9 2078.2 2079.3 2018.0 5307.3 2080.3 2019.0 5308.8 2081.4 5310.4 2082.4 2029.3 5324.3 5233.4 2030.4 5325.9 2052. I 2053. I 2054.2 2055.2 2056.3 5234.9 2031.4 5327.4 5236.5 2032.4 5329.0 5238.0 2033.5 5330.5 54 5241.1 2035.5 5333.6 2046.9 2110.0 2047.9 2111.1 2049.0 5353.9 2112.1 2050.0 5355.5 2113.2 2051.1 5357.5 2114.2 2062.5 2063.5 2064.6 2065.6 2066.7 2073.0 2074.0 2075. I 2076. I 2077.2 5311.9 5313.5 5315.0 5316.6 2086.7 5318.1 2087.7 2094. I 2095.2 2096.2 53 5239.5 2034.5 5332.1 2097.3 2098.3 5319.7 2088.8 5321.2 2089.9 5322.8 2090.9 2092.0 2093.0 2083.5 2084.6 55 5242.6 2036.5 5335.2 2099.4 5244.1 2037.6 5336.8 2100.5 5245.7 2038.6 5338.3 2101.5 58 5247.2 2039.6 5339.9 2102.6 1 = 86° T 5343.0 5344.5 5346. I 5347.7 5349.2 59 5248.7 2040.7 5341.4 2103.6 5350.8 5352.3 5358.6 5360.1 5361.7 5405.6 5407.2 2085.6 5408.8 5410.4 5412.0 2115.3 2116.4 2117.4 5363.3 2118.5 5364.8 2119.6 5366.4 5368.0 5369.5 5371.1 5372.7 5374.2 5375.8 5377.4 5378.9 5380.5 5382.1 5383.6 5385.2 5386.8 5388.3 5389.9 5391.5 5393.1 5394.6 5396.2 5397.8 5399.3 5400.9 5402.5 5404. I E 2104.7 2105.8 2106.8 2107.9 2108.9 2120.6 2121.7 2122.8 2123.9 2124.9 5429.3 5430.9 5432.5 5434.1 5435.7 2126.0 2127.1 2128.1 2129.2 2130.3 2131.3 2132.4 2133.5 2134.6 2135.6 2139.9 2141.0 2142.1 2143.2 2144.3 5413.5 5415.1 5416.7 5418.3 2156.2 5419.8 2157.3 | = 87° T 5437.2 2169.2 5438.8 2170.3 5440.4 2171.4 5442.0 2172.5 5443.6 2173.6 2152.9 2154.0 2155.1 5421.4 2158.4 5423.0 2159.5 5424.6 2160.6 5426.2 5427.7 2161.6 2162.7 5445.2 2174.7 5446.7 2175.8 5448.3 2176.9 5449.9 2178.0 5451.5 5453. I 5454.7 5456.3 5457.9 5459.5 2136.7 5484.9 2137.8 5486.5 2138.9 5488.1 5489.7 5491.3 5461.0 5462.6 5464.2 5465.8 5467.4 5469.0 5470.6 5472.2 5473.8 5475.4 5492.9 5494.5 5496.1 2145.3 5497.7 2146.4 5477.0 5478.6 5480.2 5481.8 5483.4 ་་ 01234 2179.1 9 5678∞ 2180.2 10 2181.3 "1 2182.4 12 2183.5 13 22 IZMI MODE. ONE HO700 87087 68788 25222 99700 BDOBJ 2184.6 14 2185.6 15 2186.7 16 2187.8 17 2188.9 18 2190.0 19 2191.1 20 2192.2 21 2193.3 22 2194.4 2195.5 23 2196.6 25 24 2197.8 26 2198.9 27 2200.0 28 2201.1 29 2202.2 30 2203.3 31 2204.4 32 2205.5 33 2206.6 34 2207.7 35 2208.8 36 2209.9 37 2147.5 5500.9 2213.2 40 2148.6 5502.5 2214.3 41 2149.7 5504.1 2215.4 42 2150.8 5505.7 2216.5 43 2151.9 5507.3 2217.6 44 5509.0 2218.7 45 5510.6 2219.9 46 5512.2 2221.0 2222.1 5513.8 5515.4 2211.0 38 2224.3 5499.3 2212.1 39 5520.2 2226.5 47 2223.249 48 5517.0 5518.6 2225.4 51 50 52 5521.8 2227.7 53 5523.4 2228.8 54 2163.8 5525.0 2229.9 55 2164.9 5526.6 2231.0 56 2166.0 2167.0 2168.1 5528.2 2232.1 57 5529.8 2233.3 58 5531.4 2234.4 59 408 TABLE VIII.-TANGENTS AND EXTERNALS FOR A 1° CURVE (Chord or Arc Definition) INN NN 56 0-NMI BONO OLEME DONE ONE DONDO CO~~7 ❤om. I DO 885 2 3 4 5 6 7 8 9 10 12 13 14 16 17 19 2252.3 2253.5 2254.6 18 5562.1 2255.7 5563.7 2256.9 20 15 5557.3 25 26 27 28 32 33 34 5565.4 2258.0 21 5567.0 2259.1 5568.6 2260.3 5666.7 22 23 5570.2 2261.4 5668.3 24 5571.8 2262.5 5670.0 30 5581.6 2269.3 35 5573.5 2263.6 5671.6 2264.8 5673.3 5575. I 5576.7 2265.9 5674.9 5578.3 2267.0 5676.6 29 5580.0 2268.2 5678.2 37 T --| 40 41 1 = 88° 2274.9 2276. I 2277.2 38 5594.6 2278.3 42 E 5533.1 2235.5 5534.7 2236.6 5536.3 2237.7 5537.9 2238.9 5539.5 2240.0 5589.7 36 5591.3 5593.0 2241.1 5541.1 5542.7 2242.2 5544.3 2243.3 5546.0 2244.5 5547.6 2245.6 5679.9 31 5583.2 2270.4 5681.5 5584.8 5586.5 5588. I 2271.6 2272.7 2273.8 5549.2 2246.7 5550.8 5552.4 2247.8 2249.0 5554.0 5555.7 2250. I 2251.2 45 39 5596.2 2279.5 47 5558.9 5560.5 48 49 43 5602.7 2284.0 51 44 5604.4 2285.2 53 46 5607.6 2287.4 5597.9 2280.6 5599.5 2281.7 5601.1 2282.9 1 = 89° T 5630.5 5632.2 5633.8 5635.4 5637. I 5638.7 5640.3 5642.0 5643.6 5645.3 5646.9 5648.6 5650.2 5651.8 5653.5 5655. I 5656.8 5658.4 5660.I 5661.7 5663.4 5665.0 5696.4 5698. I 5699.7 5701.4 5703.0 5606.0 2286.3 5704.7 E 2303.5 2304.6 2305.8 2306.9 2308. I 50 5614.2 2292.0 5713.0 5615.8 2293.1 52 5617.4 2294.3 2309.2 2310.4 2311.5 2312.7 2313.8 2315.0 2316.2 2317.3 2318.5 2319.6 2320.8 2322.0 2323. I 2324.3 2325.4 54 5620.7 2296.6 5719.7 2326.6 2327.8 2328.9 2330. I 2331.2 5683.2 2340.5 5684.8 2341.7 5686.5 2342.8 2332.4 2333.6 2334.7 2335.9 2337.0 2338.2 2339.4 2355.6 5706.4 2356.8 2358.0 2359.2 2349.8 2351.0 2352.1 2353.3 2354.5 5609.3 2288.6 5708.0 5610.9 2289.7 5709.7 5612.5 2290.9 5711.3 2360.3 2361.5 5714.7 2362.7 5716.3 2363.9 5619.1 2295.4 5718.0 2365.0 2366.2 55 5622.3 2297.7 5721.3 56 5624.0 2298.9 5723.0 5724.7 57 5625.6 2300.0 58 5627.2 2301.2 5726.3 2370.9 59 5628.9 2302.3 5728.0 2372.1 | = 90° 5688. I 2344.0 5689.8 2345.2 5691.4 2346.3 5791.7 5693.1 2347.5 5793.3 5694.8 2348.6 5795.0 2367.4 2368.6 2369.8 T 5729.7 5731.3 E 2373.3 2374.5 5733.0 2375.7 5734.7 2376.8 5736.3 2378.0 5738.0 5739.7 5741.3 5743.0 5744.7 5746.3 5748.0 5749.7 5751.4 5753.0 5754.7 5756.4 5758. I 5759.7 5761.4 5763. I 5764.8 5766.4 5768. I 5769.8 5771.5 5773.2 5774.9 5776.5 5778.2 5779.9 5781.6 5783.2 5784.9 5786.6 5788.3 5790.0 5796.7 5798.4 5800. I 5801.8 5803.5 5805. 1 5806.8 5808.5 5810.2 5811.9 5813.6 5815.3 5817.0 5818.7 5820.4 5822.1 5823.8 5825.4 5827.1 5828.8 2385. I 2386.3 2387.5 2388.7 2389.9 2391.0 2392.2 2393.4 2394.6 2395.8 2397.0 2398.2 2399.4 2400.6 2401.8 2379.2 5839.0 2380.4 5840.7 2381.6 5842.4 2382.7 5844. I 2383.9 5845.8 2402.9 2404. I 2405.3 2406.5 2407.7 2408.9 2410. I 2411.3 2412.5 2413.7 | = 91° 2426.9 2428.1 2429.3 2430.5 2431.7 T 5830.5 5832.2 E 2444.9 2446. I 2447.3 2448.6 5837.3 2449.8 2438.9 2440. I 2441.3 5833.9 5835.6 2442.5 2443.7 5852.6 5854.3 5847.5 5849.2 2458.3 5850.9 5856.0 5857.7 5859.4 5861.1 5862.9 5864.6 5866.3 5868.0 5869.7 5871.4 2414.9 5890.2 2416.1 5891.9 2417.3 5893.6 5895.4 2418.5 2419.7 5897.1 5873.1 5874.8 5876.5 5878.2 5879.9 2420.9 5898.8 5900.5 2422.1 2423.3 5902.2 2424.5 5903.9 2425.7 5905.7 5881.7 5883.4 5885. I 5886.8 5888.5 2451.0 2452.2 2453.4 2454.7 2455.9 5907.4 5909. I 5910.8 5912.5 5914.3 0-23♬ 6678σ 9 2457.1 10 IZMI KONO ME DON** 8~~87 KHM88 27 700 85087 KANOO 2459.5 12 2460.8 13 2462.0 14 2463.2 15 2464.4 16 2465.6 17 2466.9 18 2468. I 19 2469.3 20 2470.5 21 2471.7 22 2473.0 23 2474.2 24 2475.4 25 2476.6 26 2477.8 27 2479. 28 I 2480.3 29 2481.5 30 2482.7 31 2484.0 32 2485.2 33 2486.4 34 2487.6 35 2488.9 36 2490. 37 2491.3 38 2492.6 39 2493.8 40 2495.0 41 2496.3 42 2497.5 43 2498.7 44 2499.9 45 2501.246 2502.4 47 2503.6 48 2432.9 5916.0 2434.1 5917.7 2507.3 51 2435.3 5919.4 2508.6 52 2436.5 5921.2 2509.8 53 5922.9 2437.7 2511.1 54 2504.9 49 2506. 50 5924.6 2512.3 55 5926.3 2513.5 56 5928.0 5929.8 2514.8 57 5931.5 2517.3 59 2516.0 58 409 I 5° 10° 2° 30 4° 5° .00 .01 .01.01 .02 .02 .01 .01 .02 .03 .03.04 15° .01 .02 .03.04 .05.06 20° .02.04.05 .05.06.08 .01 25° .02 30° .02 35° 40° I TABLE IX. —CORRECTIONS FOR TANGENTS* (Chord Definition of D) After dividing T,° (Table VIII) by D add the correction. с .10 .03 .05.07 .08 .04.06 .06.08 .10 .12 .02.04.07.09 .II .14 03.05 .08.11 .13 .16 .13 .17 45° .03 .06 .09 .12 50° .03 .07 .10 .14 55° .04 .07 .11 .16 60° .04 .08 65° .04 .09 70° .05 .10 15 .21 75°.05.11 .17 .23 80° .06 .12 .18 .25 10° ]。 85° .06 .13.20 .27 90° .07 .14 .22 .30 95° .08 .15 .24 .33 100°❘ .08 .17 .26 .36 105° .09 .18.29 110° .10 .20 .31 115° 11 .22 .24 120° .12 95° 100° 105° 110° .14.19 · 1° FOT .35 38 • Degree of Curve (Dc) 6° .05 .10 115° .06 .12 120° .07 .14 .15.18 .17 .20 .19.23 .21 .25 .23.28 .25 .31 .28 .33 .30 .37 .33.40 .36 .44 .39 .48 .43.52 8° 10° .03 .03 .05 .06 .08 .10 .12 .10 .13 .15 .13 .16 .18 .21 .24 .27 .30 .34 6° .37 .41 .45 .49 .53 .58 .63 .69 .16 .20 .23 .26 .30 .34 .38 .42 .46 .51 .56 .61 .03 .07 .11 .14 .17 .21 .28 .04.08 .12 .17 .20 .24 .32 .04.09 .14 .19 .23.28 .37 Degree of Curve (D) 2° 3° 4° 5° 8° 10° 12° .00 .00 .00 .00 .00 .00 .00 .00 .00 20° .00 .00 .00 .00 .01.01.01 .01 .01 30° .00 .00 .01.01 .01.02 .02.03.03 40° .00 .01.01.02.02.03 .04 .05 .06 50° .01 .01.02.03 .04.05 .06 .08 .09 60° .01 .02 .03.05 .05.06.07 .07.09 .11 .14 12° .04 .04 .08 .09 .19 .23 .28 .32 .36 .41 65° .01.03.04.06 .07 .08 .11 .14 .16 70° .02.03.05.07 .08 .10 .13 .16 .19 75° .02 .04.06 .08 .09 .|| .15 .19 80° .02.04 .07 .09 .11 85° .13 .03 .05 .08 .11 .13 .16 .03 .06 .09 .12 .15 .18 .24 .18 .22 .21 .23 .27 .26 .31 .30 .36 90° .45 .50 .56 .61 .67 .73 • 14° .13 .18 * See page 386 for explanation and example. TABLE X.-CORRECTIONS FOR EXTERNALS* (Chord Definition of D) .23 .26 .27 .31 .32 .37 .42 .48 .53 .59 After dividing E,° (Table VIII) by De add the correction. с 16° .05 .10 .15 .21 .65 .74 .71 .82 .78 .89 .86 .98 .67 .73 .87 .80 .93 1.07 85° 1.02 1.17 90° .79 .95 1.11 1.27 95° .87 1.04 1.21 1.39 .39 .47 .57 .76 .95 1.14 1.33 1.52 105° .43 .51.62 .83 1.04 1.25 1.46 1.67 110° .47 .57 .68 .91 1.14 1.37 1.60 1.83 115° .52.62.76 | 1.01 1.26 1.51 1.76 120° 2.02 .61 .67 .16 .22 .27 .32 .43 .54 .65 .. 76 .19 .26 .31 .22 .30 .36 * See page 386 for explanation and example. 25° 30° .37 35° .42 40° I .48 45° .54 50° 5° 16° 10° 15° 20° I 55° 60° 65° 70° 75° 80° 100° 14° .00 .00 10° .02 .02 20° .04 .04 30° .07 .07 40° .12 .18 .!| 50° .16 60° .19 .22 .22 .26 .27 .30 .31 .36 80° .36 .42 85° .48 90° .42 65° 70° 75° .35 .40 42 .49 .56 95° .49 .57 .65 .47 .56 .65 100° .75 105° .87 110° .38.50 .63 .75 .88 1.00 115° .58.73 .87 1.02 1.17 120° .44 410 TABLES XI & XII.—SPIRAL TABLES-GENERAL EXPLANATION D PARTIAL NOTATION (See Chapter 5 for complete theory and notation) Degree of central circular curve (Da=arc definition of D; De-chord definition of D). Length of spiral curve, in feet. Central angle of the spiral, or spiral angle. Ls Δ X, Y Coordinates (abscissa and ordinate) of the S.C. referred to the T.S. as origin and to the initial tangent as X-axis. Xo, o Coordinates (abscissa and ordinate) of the offset T.C., which is the point where a tangent to the circular curve produced backward becomes parallel to the tangent at the T.S. L.T. "Long tangent" of the spiral. S.T. "Short tangent" of the spiral. L.C. "Long chord" of the spiral. Table XI. This table gives spiral parts for various selected values of D and Ls. It may be used for both chord definition and arc definition of D. The definition of D affects only the co- ordinates of the offset T.C.; correct values of these coordinates may be obtained by observing the following: 1. When arc definition of D is used, select values of o and Xo from sub-columns headed Da. 2. When chord definition of D is used, subtract the correc- tions in the columns headed from the arc-definition values of o and Xo. Table XII. This table may be used to obtain spiral parts for any combination of D and Ls up to A=45. Proceed as follows: 1. When arc definition of D is used, enter table with given value of ▲ (interpolating if necessary) and multiply the tabulated coefficients by the value of L. 2. When chord definition of D is used, calculate spiral parts as above. Then, since only the coordinates of the offset T.C. are affected by the definition of D, correct the calcu- lated values of o and Xo by subtracting the products of D and the coefficients in the columns headed by an asterisk. Example. D=12; L,=320; A=19.2. For arc definition, 8.90 o=320X.02781 Xo=320X.49813=159.40 For chord definition, = 0 = 8.90-12X.0041 Xo=159.40-12X.0240=159.11 = 8.85 411 L. 100 125 150 200 250 0 37.5 300 0 45.0 350 0 52.5 400 1 00.0 700 800 900 1000 450 1 07.5 500 1 15.0 550 1 22.5 600 1 30.0 100 125 150 200 Δ 500 550 600 0°15.0' 0 18.8 0 22.5 0 30.0 700 800 900 1000 250 0 50.0 300 1 00.0 350 1 10.0 400 1 20.0 100 125 150 200 450 1 30.0 1 40.0 1 50.0 2 00.0 1 45.0 2 00.0 2 15.0 2 30.0 0°20.0' 0 25.0 0 30.0 0 40.0 700 800 900 1000 2 20.0 2 40.0 3 00.0 3 20.0 0°25.0' 0 31.3 0 37.5 0 50.0 250 1 02.5 300 1 15.0 350 400 450 1 52.5 500 2 05.0 550 2 17.5 600 2 30.0 TABLE XI.—SELECTED SPIRALS Xo | X Y L.T. | 1 | D=0° 30' 100.00 0.14 66.67 125.00 0.23 83.33 100.00 150.00 0.33 200.00 0.58 133.33 0 3 45.0 4 10.0 0.03 0.06 0.08 0.15 0.23 0.31 0.44 0.58 0.74 0.91 1.10 1.31 1.78 2.33 2.94 3.64 0.05 0.08 0.11 0.20 50.00 62.50 75.00 100.00 2.38 3.10 3.93 4.85 125.00 150.00 0.06 0.09 0.14 0.24 175.00 200.00 225.00 250.00 274.99 299.99 0.30 125.00 0.44 150.00 0.59 175.00 0.78 200.00 50.00 62.50 75.00 100.00 0.98 225.00 1.21 249.99 1.47 274.99 1.75 299.99 349.99 699.93 399.98 799.90 449.98 899.86 11.78 499.97 999.81 14.54 1 27.5 0.74 175.00 1 40.0 0.97 199.99 0.38 125.00 0.55 150.00 250.00 299.99 349.99 399.99 224.99 1.23 1.51 249.99 1.83 274.99 2.18 299.98 449.98 499.98 549.97 599.96 4.91 449.93 6.06 499.91 125.00 150.00 200.00 0.91 166.67 1.31 200.00 1.78 233.34 2.33 266.67 D=0° 40' 249.99 299.99 349.99 399.98 2.95 300.01 3.64 333.34 4.40 366.68 5.24 400.01 100.00 0.18 0.30 0.44 0.78 449.97 499.96 549.95 599.93 7.13 9.31 349.98 699.88 399.97 799.83 12.41 449.96 899.75 15.70 499.94 999.66 19.39 449.95 499.93 549.91 599.89 466.69 533.37 600.05 666.73 1.21 166.67 1.75 200.00 2.38 233.34 3.10 266.67 3.93 300.01 4.85 333.35 5.87 366.69 6.98 400.03 D=0° 50' 50.00 100.00 0.24 62.50 125.00 0.38 75.00 150.00 0.55 100.00 100.00 200.00 0.97 133.33 9.50 466.71 66.67 83.33 249.99 166.67 200.00 349.98 2.97 233.34 1.52 299.99 2.18 399.97 3.88 266.68 100.00 66.67 33.33 83.33 41.67 125.00 100.00 50.00 150.00 200.00 133.33 66.67 4.91 300.02 6.06 333.36 7.33 8.73 2 55.0 2.97 349.97 699.82 11.88 466.73 3 20.0 3.88 399.95 799.73 15.51 +533.43 899.63 19.63 600.14 999.47 24.23 666.85 S.T. 366.70 400.04 I L.C. 33.33 100.00 41.67 125.00 50.00 150.00 66.67 200.00 83.33 100.00 116.67 350.00 133.34 399.99 250.00 300.00 233.37 699.95 533.39 266.72 799.92 600.09 666.79 300.08 899.89 333.44 999.85 150.01 449.99 166.67 499.99 183.34 549.99 200.01 599.98 233.35 699.97 266.70 799.96 300.05 899.94 333.39 999.92 83.33 250.00 100.00 300.00 116.67 349.99 133.34 399.99 150.01 449.99 166.68 499.98 183.35 549.98 200.02 599.97 33.33 100.00 41.67 125.00 50.00 150.00 66.67 200.00 83.34 250.00 100.00 299.99 116.67 349.99 133.34 399.99 150.02 449.98 166.69 499.97 183.36 549.96 200.04 599.95 233.39 699.92 266.75 799.88 300.12 899.83 333.50 999.77 412 L8 100 125 150 200 250 300 350 400 450 500 550 600 700 800 900 1000 100 125 150 200 250 300 350 400 450 500 550 600 700 800 900 1000 100 125 150 200 250 300 350 400 450 500 A 550 600 700 800 900 0°30.0' 0 37.5 0 45.0 1 00.0 1 15.0 1 30.0 1 45.0 2 00.0 2 15.0 2 30.0 2 45.0 3 00.0 3 30.0 4 00.0 4 30.0 5 00.0 0°37.5' 0 46.9 0 56.2 1 15.0 1 33.8 1 52.5 2 11.3 2 30.0 2 48.8 3 07.5 3 26.3 3 45.0 4 22.5 5 00.0 5 37.5 6 15.0 0°45.0' 0 56.2 1 07.5 1 30.0 1 52.5 2 15.0 2 37.5 3 00.0 3 22.5 3 45.0 4 07.5 4 30.0 0 5 15.0 6 00.0 6 45.0 TABLE XI.-SELECTED SPIRALS | L.T. 0.07 0.11 0.16 0.29 1.47 1.82 2.20 2.62 Xo Da 0.45 125.00 0.65 150.00 0.89 174.99 1.16 199.99 50.00 62.50 75.00 100.00 224.99 249.98 274.98 299.97 0.09 50.00 0.14 62.50 0.20 75.00 0.36 | 100.00 0.11 0.17 0.25 0.57 124.99 149.99 0.82 1.11 174.99 1.45 | 199.99 50.00 62.50 75.00 0.44 100.00 0.68 124.99 • • • 3.56 349.94 4.65 399.94 .01 5.89 449.91 .01 7.27 499.87 .01 • · - · • * • • • · · • · • • • • • • * • 1.84 224.98 2.27 249.97 2.75 274.97 .01 3.27 299.96 .01 • 4.45 349.93 .01 5.82 | 399.90 7.36 | 449.86 9.08 | 499.80 .01 .01 .01 · • · D=1° 15' X D=1° 0.98 149.99 1.33 174.99 1.74 199.98 2.20 | 224.97 .01 2.72 249.96 .01 • • 66.67 100.00 .0.29 125.00 0.45 83.33 150.00 0.65 100.00 199.99 1.16 133.34 249.99 1.82 166.67 299.98 2.62 200.01 349.97 399.95 3.56 233.34 4.65266.68 Y 449.93 5.89 300.02 499.91 7.27 333.37 549.87 8.80 366.71 599.84 10.47 | 400.06 699.74 | 14.25 | 466.76 466.76 799.61 18.61 533.47 899.44 23.55 | 600.19 999.24 29.07 | 666.93 666.93 100.00 0.36 66.67 Į 125.00 0.57 83.33 150.00 0.82 100.00 199.99 1.45 133.34 249.98 2.27 166.67 299.97 3.27 200.01 349.95 4.45 233.35 399.92 5.82 266.69 449.89 499.85 549.80 599.74 | D=1° 30' 7.36 300.04 9.09 333.39 11.00 11.00 366.74 13.09 | 400.09 13.09 400.09 100.00 0.44 125.00 0.68 149.99 0.98 199.99 249.97 66.67 83.33 100.00 1.75 133.34 2.73 166.68 S.T. 299.95 349.93 3.93 | 200.02 5.34233.36 399.89 6.98 266.71 449.85 8.83 300.06 499.78 10.90 333.41 L.C. 33.33 | 100.00 41.67 125.00 50.00 150.00 66.67 200.00 249.99 83.34 100.01 299.99 116.68 349.99 133.35 | 399.98 150.02 449.97 166.70 499.96 183.37 549.94 200.05 599.93 233.42 233.42 466.81 699.59 17.81 799.39 23.26 233.46 699.82 533.54 266.86 799.73 899.13 29.43 600.30 300.28 899.62 998.80 | 36.33 | 667.08 333.71 999.48 699.89 799.82 266.79 300.18 | 899.76 333.58 333.58 | 999.66 33.33 100:00 41.67 125.00 50.00 150.00 66.67 200.00 83.34 244.99 100.01 299.99 116.68 349.98 133.36 399.97 150.03 | 449.95 166.71 499.93 183.40 549.91 599.89 200.08 183.42 549.87 200.12 | 599.84 3.30 274.95 .01 3.92 | 299.94 .01 5.35 | 349.90 .01 6.98 399.86 .01 8.83 449.79 .01 549.71 13.19 366.77 599.63 15.70 400.13 699.41 21.36 466.88 233.52 699.74 799.12 27.90 | 533.64 | 266.94 | 799.61 898.75 | 35.31 | 600.44 | 300.40 | 899.44 Subtract from tabulated value for Da when chord definition of D is used. 33.33 100.00 41.67 125.00 50.00 150.00 66.67 199.99 83.34 249.99 100.01 299.98 116.69 | 349.97 133.37 | 399.95 150.05 | 449.93 166.74 499.90 413 Ls 100 125 150 200 250 300 350 400 450 500 550 600 700 800 900 100 125 150 200 250 300 350 400 450 500 550 600 700 800 100 125 150 200 250 300 350 400 450 500 Δ 0°52.5' 1 05.6 1 18.8 1 45.0 2 11.3 2 37.5 3 03.8 3 30.0 3 56.3 4 22.5 4 48.8 5 15.0 6 07.5 7 00.0 7 52.5 1°00.0' 1 15.0 1 30.0 2 00.0 2 30.0 3 00.0 3 30.0 4 00.0 4 30.0 5 00.0 5 30.0 6 00.0 7 00.0 8 00.0 1°07.5' 1 24.4 1 41.2 2 15.0 2 48.8 3 22.5 3 56.3 4 30.0 5 03.8 5 37.5 550 6 11.3 600 6 45.0 700 7 52.5 800 9 00.0 0 TABLE XI.—SELECTED SPIRALS 1.15 1.56 2.03 2.57 3.18 Χρ 0.13 50.00 0.20 62.50 0.29 75.00 0.51 100.00 0.80 | 124.99 Da 0.15 0.23 0.33 0.58 0.91 X D=1° 45' 100.00 125.00 0.51 | 66.67 0.80 83.33 149.99 1.15 100.00 199.98 2.36 133.34 249.96 3.18 166.68 * | 149.99 .01 299.94 174.98 .01 349.90 199.98 .01 399.85 224.96 .01 449.79 249.95 .01 499.71 3.85 274.93 .01 4.58 299.92 .01 6.24 349.87 .01 399.80 .02 8.14 10.30 449.71 .02 • D=2° 549.61 599.50 699.20 798.81 898.31 0.16 50.00 0.26 62.50 0.37 74.99 0.65 99.99 .01 1.02 124.99 .01 4.94 274.90 5.89 | 299.86 8.02 10.46 50.00 62.50 75.00 • 124.99 0.91 149.99 100.00 | .01 199.98 124.99 .01 249.95 • Y 4.58 200.02 6.23 | 233.37 8.14 266.72 10.30 300.07 333.43 12.72 L.T. 15.39 366.80 18.32 | 400.18 24.92 | 466.95 32.54 | 533.75 41.18 600.60 100.00 0.58 66.67 83.34 1.31 100.00 2.33 133.34 3.64 166.68 1.30 | 149.99 .01 1.78 174.98.01 2.32 199.97 .01 2.94 224.96.01 3.64249.94 .01 4.40 | 274.92 | .01 549.49 17.59 366.84 5.23 | 299.89 .02 | 599.34 | 20.93 | 400.23 7.13 | 349.82 .02 698.96 28.48 467.03 | 9.30 399.74 .02 | 798.44 37.18 | 533.88 D=2° 15' 1.47 149.98 .01 299.90 2.00 174.97 .01 349.83 2.62 199.96 .01 399.75 3.31 4.09 299.92 5.24 200.03 349.87 7.13 233.38 399.80 9.30 266.73 449.72 11.78 | 300.10 499.62 | 14.54 | 333.47 100.00 0.65 124.99 1.02 149.99 1.47 199.97 249.94 66.67 83.34 100.00 133.34 2.62 4.09 166.69 5.89 | 200.04 8.02 | 233.39 10.47 266.75 224.94 .01 449.65 13.24 300.12 249.92 .02 16.35 333.50 499.52 .02 549.36 19.78 366.89 .02 599.17 23.54 | 400.29 349.78 | .03 | 698.69 | 32.03 | 467.13 399.67 399.67 | .03 798.03 | 41.82 | 534.02 S.T. L.C. 33.33 100.00 41.67 125.00 50.00 150.00 66.67 199.99 83.35 | 249.98 100.02 116.70 299.97 349.96 133.38 399.93 150.07 | 449.91 166.76 | 499.87 183.46 549.83 599.78 200.16 233.59 699.65 267.05 799.47 300.55 300.55 | 899.25 33.33 100.00 41.67 125.00 50.00 150.00 66.67 199.99 83.35 249.98 100.03 299.96 116.71 349.94 133.40 399.91 150.09 | 449.88 166.79 499.83 183.50 549.77 200.21 | 599.71 233.67 699.54 267.16 799.30 33.33 | 100.00 41.67 125.00 50.00 | 149.99 66.68 199.99 83.35 249.97 100.03 299.95 116.72 349.93 133.41 399.89 150.11 449.84 166.82 499.79 183.54 549.72 200.26 599.63 233.75 699.42 267.30 799.12 * Subtract from tabulated value for Da when chord definition of D is used. A. Eque ار tem to by totul (bungi duitur ton Ch 23 L. 100 125 150 200 250 300 350 400 450 500 550 600 700 800 100 125 150 200 250 300 350 400 450 500 550 600 700 100 125 150 200 250 300 350 400 450 500 Δ 1°15.0' 1 33.8 1 52.5 2 30.0 3 07.5 3 45.0 4 22.5 5 00.0 5 37.5 6 15.0 6 52.5 7 30.0 8 45.0 10 00.0 But berat 414 A 1°22.5' 1 43.2 2 03.8 2 45.0 3 26.3 4 07.5 4 48.8 5 30.0 6 11.3 6 52.5 7 33.8 8 15.0 9 37.5 1°30.0' 1 52.5 2 15.0 3 00.0 3 45.0 4 30.0 5 15.0 6 00.0 6 45.0 7 30.0 TABLE XI.—SELECTED SPIRALS 0.18 0.28 0.41 0.73 1.13 1.63 2.22 2.91 3.68 4.54 0.20 0.31 0.45 0.80 1.25 1.80 2.45 3.20 4.05 5.00 6.04 7.20 9.80 0.87 1.36 Xo 1.96 2.67 3.49 Da X D=2° 30' 100.00 0.72 66.67 33.33 100.00 83.34 124.99 1.14 149.98 41.67 125.00 50.01 149.99 75.00 .01 100.01 1.64 2.91 99.99 .01 199.96 133.35 66.68 199.98 124.99 .01 249.93 4.54 166.69 83.36 249.97 5.49 21.98 26.15 274.87.02 | 549.21 6.55 | 299.83 | .02 | 598.97 8.90 349.73.03 | 698.37 698.37 35.57 399.59 | .03 | 797.57 | 46.44 11.62 D=2° 45' 99.99 124.99 149.98 199.95 249.91 4.42 5.46 50.00 62.50 • 149.98.01 299.87 174.97 | .01 349.80 199.95 .02 | 399.70 224.93 | .02 | 449.56 249.90 | .02 | 499.40 50.00 62.50 .01 75.00 .01 99.99 .01 124.98 | .01 0.22 50.00 | .01 99.99 0.34 62.50 .01 124.99 0.49 75.00 .01 149.98 99.99 .01 199.95 124.98.01 | 249.89 149.97 .01 299.85 174.96 | .02 | 349.75 199.94 | .02 | 399.63 224.91.02 | 449.47 249.88.02 | 499.28 499.28 274.84 .03 549.03 299.79 .03 598.76 349.67 | .03 | 698.02 698.02 D=3° 149.97 .02 299.81 174.95 .02 349.71 199.93 .02 | 399.56 224.89 .03 449.37 249.86 | .03 | 499.14 6.60 274.81 .03 7.85 | 299.75 | .03 | 10.68 349.61 .04 548.86 548.86 Y 598.52 598.52 6.54 8.91 697.66 697.66 11.63 14.72 18.16 24.17 28.76 39.12 0.87 1.36 1.96 3.49 5.45 L.T. 0.80 1.25 1.80 3.20 133.35 5.00 166.70 7.85 10.68 13.95 17.65 21.79 26.36 31.36 42.66 200.04 100.04 299.94 349.91 233.40 116.73 266.77 266.77 | 133.43 133.43 399.86 300.15 150.14 449.81 333.54 | 166.86 499.73 366.94 183.59 400.36 400.36 | 200.33 467.24 | 233.86 534.18 267.45 | 7.20 299.93 349.89 9.79 12.79 266.80 133.45 399.84 300.19 19.98 | 333.58 333.58 16.19 150.17 449.77 166.90 | 499.68 S.T. L.C. 66.67 33.34 100.00 83.34 41.67 125.00 100.01 50.01 149.99 66.68 199.98 83.36 249.96 200.06 | 100.05 233.42 116.75 367.00 400.43 467.36 66.67 83.34 549.65 599.54 699.27 798.92 100.01 133.35 166.70 183.64 549.58 200.40 599.45 233,96 | 699.13 33.34 | 100.00 41.67 124.99 50.01 149.99 66.68 199.98 83.37 249.95 550 8 15.0 600 9 00.0 367.06 183.70 549.49 | 400.52 | 200.47 | 599.34 467.49 234.08 | 698.96 700 10 30.0 * Subtract from tabulated value for Da when chord definition of D is used. 200.06 100.06 299.92 233.44 116.76 | 349.87 266.82 | 133.47 | 399.80 300.22 150.20 | 449.72 333.63 166.94 499.62 415 La 100 125 150 200 250 300 350 400 450 500 L8 100 125 150 200 250 Δ 1°45.0' 2 11.3 550 9 37.5 600 10 30.0 700 12 15.0 100 125 150 200 250 2 37.5 3 30.0 4 22.5 300 350 5 15.0 6 07.5 7 00.0 7 52.5 8 45.0 300 6 00.0 350 7 00.0 400 8 00.0 450 9 00.0 500 10 00.0 A 2°00.0' 2 30.0 3 00.0 4 00.0 5 00.0 550 11 00.0 600 12 00.0 650 13 00.0 2°15.0' 2 48.8 3 22.5 4 30.0 5 37.5 6 45.0 7 52.5 400 9 00.0 450 10 07.5 500 11 15.0 + 0 X D=3° 30' 0.25 50.00 .01 99.99 0.40 62.50 | .01 124.98 0.57 74.99 .01 149.97 1.02 99.99 .02 199.93 1.59 | 124.98 | .02 | 249.85 TABLE XI.-SELECTED SPIRALS 2.29 3.12 4.07 5.15 | 224.86.03 6.36 249.80.04 0 7.69 274.74.04 9.16 299.66 .05 12.45 | 349.46 .05 Da * 0.29 0.45 0.65 1.16 1.82 2.62 3.56 4.65 5.89 7.26 0.33 0.51 0.74 1.31 2.04 ... 2.94 4.01 5.23 ……… • • • • • Xo Do I * • 8.79 .01 274.66 .06 547.98 | 10.46 | .01 299.56.06 | 597.37 .01 299.56 .06 597.37 12.27.01 324.44.07 646.66 | | ► ·· • 149.96 .02 299.75 9.16 200.09 174.93.03 | 349.60 12.46 233.47 199.90.03 399.40 | 16.27 266.88 449.15 | 20.59 | 300.30 498.84 | 25.41 333.74 .... Xo Do I * X 50.00.01 99.99 62.50 .01 | 124.98 74.99 .02 | 149.96 99.98 .02 | 199.90 124.97 .03 249.81 149.95.03 174.91.04 Y L.T. D=4° 30' 50.00 | .01 | 99.98 62.50 .02 124.97 74.99 .02 149.95 99.98 .03 | 199.88 124.96.03 249.76 | 1.02 1.59 2.29 100.01 4.07 133.36 6.36 166.72 66.67 83.34 " 548.45 | 30.73 | 367.21 | 183.83 | 549.31 597.99 36.56 400.71 | 200.64 599.10 696.80 | 49.72 | 467.79 | 234.35 | 698.58 D=4° Y 1.16 100.01 1.82 2.62 4.65 133.37 7.27 166.73 299.67 10.46 349.48 14.24 200.11 | 100.10 | 299.85 233.52 116.83 | 349.77 199.87 .04 399.22 18.59 266.94 133.58 399.65 224.82.05 448.89 23.52 300.39 | 150.35 | 449.50 | 249.74 .05 498.48 29.02 333.87 167.15 499.32 | | 183.98 549.10 | 200.84 598.83 | 217.74 648.51 | S.T. L.C. 33.34 | 100.00 41.67 124.99 149.99 50.01 66.69 199.97 83.38 249.94 L.T. S.T. L.C. 66.67 33.34 83.34 99.99 41.67 124.99 50.01 149.98 66.70 199.96 83.39 249.92 367.38 400.92 48.98 434.51 35.11 41.75 299.89 100.08 116.97 349.82 133.52 | 399.73 150.27 | 449.63 167.04 499.48 1.31 66.67 2.04 2.94 83.34 100.02 5.23 | 133.38 8.18 166.75 149.93 .04 299.58 11.77 200.15 100.13 | 299.81 174.89 .04 | 349.34 | 16.02 | 233.56 116.88 349.71 199.84.05 | 399.02 | 20.91 267.01 | 133.65 | 399.56 6.62.01 224.77 .06 448.60 26.45 300.49 150.45 449.37 8.17.01 249.68 .06 498.08 | 32.64 | 334.01 | 167.28 | 499.14 33.34 99.99 41.67 124.99 50.02 | 149.98 66.71 199.95 83.41 249.89 550 12 22.5 9.88 .01 274.57 .07 600 13 30.0 11.76 .01 299.45.08 | 650 14 37.5 13.79 .01 | 324.30 .08 547.44 39.47 | 367.57 | 184.15 184.15 596.68 46.94 401.17 | 201.07 | | 645.78 55.05 434.82 218.02 648.12 548.86 598.52 *Subtract from tabulated value for Dɑ when chord definition of D is used.. 416 I Ls 100 125 150 2°30.0' 3 07.5 3 45.0 2005 00.0 Δ 250 6 15.0 300 7 30.0 350 8 45.0 400 10 00.0 450 11 15.0 500 12 30.0 550 13 45.0 600 15 00.0 100 125 150 200 250 300 2°45.0' 3 26.3 4 07.5 5 30.0 6 52.5 8 15.0 350 9 37.5 400 11 00.0 450 12 22.5 500 13 45.0 550 15 07.5 600 16 30.0 100 3°00.0' 125 3 45.0 150 4 30.0 200 6 00.0 250 7 30.0 300 9 00.0 350 10 30.0 400 12 00.0 450 13 30.0 500 15 00.0 100 3°15.0' 125 4 03.8 150 4 52.5 200 6 30.0 250 8 07.5 Da 0 0.36 0.57 0.82 1.45 0.40 0.62 0.90 1.60 TABLE XI. SELECTED SPIRALS Xo 0.44 0.68 0.98 1.74 2.73 0.47 0.74 1.06 1.89 2.95 • 2:27 3.27 124.95 .04 249.70 149.91 .05 299.49 4.45 174.86 .06 349.18 5.81 .01 199.80 199.80 .06 398.78 .07 7.36 .01| 224.71 9.08.01 249.60.08 10.98 .01 274.47 .09 13.06 • • · D • * Da • • .. · • · 8.09.01 224.65 .09 9.98 | | .01 249.52.10 12.07 .01 274.36.10 14.36 .02 | 299.17 .11 • - * ► • D=5° 50.00 | .02 99.98 62.4902 124.96 74.99 .02 149.94 99.97.03 199.85 449.23 448.27 448.27 29.37 | 300.61 | 150.55 150.55 497.62 | 36.24 | 334.17 | 167.43 167.43 546.84 43.82 367.78 | 184.36 | | 498.94 548.59 .01 299.32.09 595.90 52.10 401.45 201.32 | 598.17 | | | D=5° 30′ 50.00 .02 99.98 62.49 .02 124.96 74.99 .03 149.92 99.97 .04 199.82 2.50 124.94.05 | 249.64 9.99 166.79 83.45 249.84 3.60 149.90 .06 299.38 14.38 200.22 | | | 100.20 100.20 299.72 4.90 .01 174.84 174.84 .07 349.01 19.56 | 233.68 | 116.98 | 349,56 | 6.39 .01 199.76 .08 398.53 25.53 267.18 133.80 399.34 | | | | X • D=6° Y L.T. 50.00.02 99.97 62.49.03 .03 124.95 74.98 .03 149.91 99.96 .05 | 199.78 124.93 .06 249.57 1.45 66.67 2.27 83.35 3.27 | 100.02 5.81 133.39 D=6° 30' 49.99 .03 99.97 62.49.03 .03124.94 74.98.04 .04 149.89 99.96 .05 .05 199.74 124.91 .07 249.50 9.08 166.77 83.43 249.87 13.07 200.18 100.16 | 299.77 17.79 | 233.62 | 116.93 | 349.64 23.22 267.09 133.72 399.46 | | 1.60 2.50 66.67 83.35 3.60 100.03 6.40 133.40 S.T. L.C. 33.34 99.99 41.68 124.98 50.02 149.97 66.72 199.93 447.90 32.29 300.74 | 150.67 | 449.07 | | 497.13 39.83 334.35 167.59 498.72 | | 546.16 48.15 368.02 | 184.56 | 548.30 | 595.04 57.26 401.75 | 201.59 | 597.79 | | 3.92 .01 5.34 01 6.97 .01 149.88 149.88 .07 174.80 174.80 .08 299.26 15.68 200.26 100.24 299.67 | | 348.83 21.33 233.75 117.04 | 349.48 199.71 .09 398.25 27.84 267.28 133.89 399.22 8.82 .01| 224.59 | .10|447.51 | 35.20 | 300.88 | 150.80 | 448.89 10.88 .01 | 249.43 .11 496.58 | 43.42 | 334.54 | 167.76 | 498.48 1.74 2.73 66.68 83.35 3.93 | 100.03 6.98 | 133.41 10.90 166.82 | 33.34 99.99 41.68 124.98 50.02 149.97 66.73 199.92 1.89 66.68 2.95 83.36 4.25 | 100.04 7.56 133.42 11.80 166.84 33.34 99.99 41.68 124.98 50.03 149.96 66.74 83.47 199.90 249.81 33.34 99.99 41.69 124.97 50.04 149.95 66.75 | 199.89 83.49 249.78 300 9 45.0 350 11 22.5 4.25 | .01 | 149.85 149.85 .08 299.13 16.98 200.30 100.28 | 299.61 174.77 | .09 | 348.62 | 23.10 | 233.82 | 117.11 | 349.39 5.78.01 400 13 00.0 7.55.01 | .02 450 14 37.5 9.55 500 16 15.0 11.78 .02 199.66 199.66.11 397.94 30.14 224.51.12 447.08 38.11 | | 249.33.13 495.99 47.00 | | 267.39 133.99 | 399.08 | 301.03 150.94 | 448.70 | 334.75 167.96 498.22 | * Subtract from tabulated value for Da when chord definition of D is used. 417 L8 Δ 100 125 3°30.0' 4 22.5 150 5 15.0 200 7 00.0 250 8 45.0 300 10 30.0 350 12 15.0 400 14 00.0 | 450 15 45.0 50017 30.0 4°00.0' 100 125 5 00.0 150 6 00.0 200 8 00.0 250 10 00.0 300 12 00.0 350 14 00.0 400 16 00.0 45018 00.0 500 20 00.0 100 4°30.0' 125 5 37.5 150 6 45.0 200 9 00.0 250 11 15.0 30013 30.0 350 15 45.0 400 18 00.0 45020 15.0 500 22 30.0 100 5°00.0' 125 6 15.0 150 7 30.0 200 10 00.0 250 12 30.0 TABLE XI.-SELECTED SPIRALS Da | Xo * Da l * X 4.58 .01 6.23.01 8.13 .02 10.28 .02 12.68 .02 D=7° 0.51 0.79 49.99 .03 99.96 2.04 66.68 62.49.04 | 124.93 3.18 83.36 74.98.05 | 149.87 4.58 100.04 99.95.06 | 199.70 8.14 133.44 3.18 .01 124.90 .08 249.42 | 12.70 166.87 1.15 2.04 0.58 0.91 1.31 2.33 .01 3.63 .01 · 0.65 1.02 1.47 2.62.01 4.09 .01 Y 0.73 1.14 1.64 .01 2.91 .01 4.54 .02 ·· L.T. 2.33 66.68 3.63 83.37 49.99 | .04 99.95 62.48.05 | 124.90 74.97 .06 149.83 99.93.08 | 199.61 100.06 5.23 9.30 133.47 124.87.10 | 249.24 | 14.51 | 166.93 49.99 .05 99.94 2.62 66.69 62.48 .06 | 124.88 4.09 83.38 74.96.08 149.79 5.88 100.07 99.92 .10 | 199.51 199.51 | 10.45 | 133.51 124.84 .13 249.04 16.32 167.00 | | | D=10° 49.99 .06 99.92 62.48 .08 124.85 74.96 .10 149.74 99.90 .13 124.80.16 S.T. | 149.83.09 298.99 18.28 200.35 100.32 299.55 | | | 174.73.11 | 348.40 | 24.86 233.89 117.18 349.29 | 199.60.12 397.62 | 32.44 | 267.51 | 134.10 398.94 224.43 224.43.14 | | .14 446.61 | 41.01 301.20 151.09 448.49 | 249.22.15 495.36 | 50.56 | 334.98 168.16 | 497.93 | D=8° 5.23.01 7.11.02 9.28.02 11.74 .03 149.78.12 298.69 20.88 200.46 100.42 | 299.42 174.65.14 347.92 | 28.38 | 234.07 117.33 | 349.07 | | 199.48 .16 | 396.89 | 37.03 | 267.76 | 134.33 398.62: 224.26.18 445.58 46.79 | 301.57 151.42 | 448.03 14.48 .04 | 248.99 | .20 | 493.94 | 57.68 | 335.49 | 168.63 497.30 D=9° L.C. 1 33.35 99.98 41.69 124.97 50.04 149.94 66.76 199.87 83.52 249.74 2.91 66.69 4.54 83.39 6.54 100.09 199.39 11.61 133.55 | | 248.81 248.81 18.12 | 167.08 | 5.88 .02 149.72 .15 298.34 | 23.47200.58 100.53 299.26 | 7.99 .02 174.56.18 347.36 31.90 234.26 | 117.51 | 348.83 | | | | 10.43 .03 | 199.34 .20 396.07 41.59 268.06 134.60 398.25 13.19.04 224.07.23 | 444.41 | 52.54 301.99 151.81 447.51 | | | 16.27.05 248.72.25 492.34 64.73 | 336.07 169.15 496.58 | | | 33.35 99.98 41.70 124.96 50.05 149.93 66.79 199.83 83.58 249.66. 33.35 99.97 41.71 124.95. 50.07 149.91 66.82 199.78 83.64 249.57 33.36 99.97 41.71 124.93 50.08 149.89 66.86 199.73 83.71 249.47 297.95 26.05 200.72 100.66 299.09 | | | | 346.75 35.40 | 234.48 117.71 348.55 | | | 300 15 00.0 350 17 30.0 400 20 00.0 450 22 30.0 500 25 00.0 6.53 .02 149.66.19 8.88 .03 174.46 .22 | 11.58 | | .04 199.19.25 14.64 .06 223.85.28 | | 18.06.07 248.42.31 395.15 46.14 268.39 134.90 397.84 | | | | 443.11 58.26 302.46 | 152.24 | 446.92 | 490.56 71.74 336.72 169.75 495.78 | | | | | *Subtract from tabulated value for Da when chord definition of D is used. 418 Ls Δ 4°24.0' 80 100 5 30.0 125 6 52.5 150 8 15.0 200 11 00.0 250 13 45.0 300 16 30.0 35019 15.0 400 22 00.0 500 27 30.0 4°48.0' 80 100 6 00.0 125 7 30.0 150 9 00.0 200 12 00.0 250 15 00.0 300 18 00.0 350 21 00.0 400 24 00.0 500 30 00.0 80 5°12.0' 100 6 30.0 125 8 07.5 150 9 45.0 200 13 00.0 250 16 15.0 300 19 30.0 350 22 45.0 400 26 00.0 500 32 30.0 80 5°36.0' 100 7 00.0 125 8 45.0 150 10 30.0 200 14 00.0 Da 250 17 30.0 300 21 00.0 350 24 30.0 400 28 00.0 500 35 00.0 0 TABLE XI.—SELECTED SPIRALS * 0.51 0.80 · 1.25 .01 1.80 .01 3.20 .01 • · • • 4.99 .02 7.18 .03 9.76 .04 12.73 .06 19.84 .09 0.56 0.87 1.36 .01 1.96 .01 3.49.02 ·· 5.44.03 .03 7.82.04 · ·· 0.60 0.94 .01 1.48 .01 2.13.01 3.77 .02 Χο Da l * 5.89 .04 8.47.05 X 0.64 1.02 .01 1.59 .01 2.29 .02 4.06 .03 D=11° 39.99.06 79.95 49.98 .08 99.91 62.47 | .10 | 124.82 74.95.12 | 149.69 99.88 .15 199.26 D=12° 39.99 | .07 79.94 49.98 .09 99.89 62.46.11 124.79 74.94.14 | 149.63 99.85.18 199.12 Y L.T. D=13° 39.99.09 79.93 49.98 .11 99.87 62.45.13 124.75 74.93 .16 149.57 99.83.21 198.97 2.05 53.35 3.20 66.70 5.00 83.40 7.19 12.77 19.92 124.76.19 248.56 167.17 149.59.23 297.52 28.63 | 200.88 174.34 .26 346.07 38.88 234.73 199.02 .30 394.14 50.66 268.76 248.09 .37 488.60 337.45 78.69 100.11 133.59 2.23 53.35 3.49 66.70 5.45 83.41 7.84 100.13 13.92 | 133.64 124.72.23 248.29 21.71 167.27 | | 83.88 149.51 .27 | 297.05 | 31.19 | 201.04 | 100.95 100.95 10.64 .06 | 174.22.31 | 345.33 | 42.35 | 235.00 | 118.18 118.18 13.88.08 198.84.36 198.84 .36 393.04 55.16 269.16 | | | 135.60 135.60 21.60.12 247.73.44 486.46 85.57 338.25 171.14 | | | S.T. L.C. 26.68 | 79.98 33.36 99.96 41.72 124.92 50.10 149.86 66.90 199.67 39.99.10 79.93 49.98.12 99.85 62.45.16 124.71 74.92 .19 | 149.50 99.80.25 198.81 | 16.22 | 133.75 83.79 249.36 100.80 298.90 117.94 | 348.25 135.23 | 397.39 170.41 494.90 26.68 79.98 33.37 99.95 41.74 124.90 50.12 149.84 66.95 199.61 124.67 .27 248.00 23.50 167.37 83.98 249.11 149.42 .32 296.54 33.75 201.23 101.12 | 298.46 11.52 .07 174.09 .37 344.52 45.80 235.29 | | | 118.45 118.45 347.55 15.01.10 198.63.42 391.84 59.62 | 269.60 | | 136.00 136.00 396.35 23.36.15 | .15 247.34 | .51 | 484.15 92.39 339.13 | 171.95 492.89 | D=14° 249.24 298.69 347.91 396.89 493.93 2.42 53.36 26.69 79.97 3.78 66.71 33.37 99.94 5.90 83.42 41.75 124.89 8.49 100.15 50.14 149.81 15.07 133.69 | 67.00 199.54 2.56 53.36 26.69 79.97 4.07 66.72 33.38 99.93 6.35 83.44 41.76 124.87 9.14 100.18 50.16 149.78 67.05 199.47 124.61.31 247.68 25.28 167.49 84.08 248.96 6.34 .05 | 9.12 .07 149.33 .37 296.00 36.30 201.43 101.30 | | | 12.39 .09 173.94 .42 343.65 | 16.15.12 198.42 .48 390.55 | 25.12.18 246.92.59 481.66 298.21 347.16 49.24 235.61 118.74 | | 64.06 270.08 136.44 395.77 | | 99.13 340.09 172.83 491.76 | | | *Subtract from tabulated value for Da when chord definition of D is used. 419 Ls Δ 80 6°00.0' 100 7 30.0 125 9 22.5 150 11 15.0 200 15 00.0 250 18 45.0 300 22 30.0 350 26 15.0 400 30 00.0 500 37 30.0 80 6°24.0' 100 8 00.0 125 10 00.0 150 12 00.0 200 16 00.0 80 7°12.0' 100 9 00.0 125 11 15.0 150 13 30.0 200 18 00.0 250 22 30.0 300 27 00.0 350 31 30.0 400 36 00.0 500 45 00.0 TABLE XI.-SELECTED SPIRALS 60 6°00.0' 80 8 00.0 100 10 00.0 125 12 30.0 150 15 00.0 0 Da | * 0.70 .01 1.09.01 1.70 .01 2.45 .02 4.35 .04 6.79.06 9.76 .08 13.26 .11 17.28 .15 26.86 .22 250 20 00.0 300 24 00.0 350 28 00.0 400 32 00.0 500 40 00.0 | 28.59 .27 0.74 1.01 1.16 .01 1.82 .02 2.61 .03 4.64 .05 0.84 1.01 1.31 .02 2.04.03 2.94 .04 5.22 .06 8.14 10 11.69.14 .14 15.86.19 20.65 | .25 32.02 .38 Χο 0.52 | .01 0.93 .01 1.45.02 2.27 .03 3.26.05 Da * X D=15° 7.24 .07 124.50 .40 246.97 10.41.10 149.13.48 294.78 | 14.13.14 | 173.62 | .55 341.73 | 18.41 .18 197.94 197.94.62 | 387.70 246.00 .75 476.18 | | D = 18° 124.56.35 247.34 | 149.23.42 295.41 173.78 .48 342.72 198.18.55 389.17 | 246.48 .67 479.00 | D=16° 39.99.11 79.91 2.79 53.36 26.69 79.96 49.97.14 99.83 4.36 66.73 33.39 99.92 62.44.18 | 124.67 6.80 83.45 41.77 124.85 74.90.21 149.42 9.79 100.20 50.18 149.74 99.77 .28 | 198.63 17.37 133.82 67.11 199.39 39.98.13 79.90 49.97.16 99.80 62.44.20 | 124.62 74.89 .24| 149.34 99.74 .32 | 198.45 39.98.15 79.87 49.96.21 99.75 62.42 .26 | 124.52 74.86 .31 | 149.17 99.67.41 | 198.04 Y 124.36.50 148.90.60 173.25.69 197.40 .77 384.50 244.95 .93 470.02 | D=20° L.T. S.T. L.C. 29.99 .15 59.93 39.97 .20 79.84 49.95 25 99.70 62.40.31 | 124.41 74.83 .38 148.98 | 27.06 167.61 38.84 201.64 52.65 235.95 68.46 270.60 105.79 341.14 2.98] 53.37 4.65 66.74 7.26 83.47 10.44 100.23 26.70 79.96 33.40 99.91 41.79 124.83 50.21 149.71 18.51 133.88 67.17 199.31 246.17 32.36 168.03 293.41 46.38 202.38 339.57 62.77 237.14 81.44 272.40 125.24 344.78 84.19 248.81 101.49 297.95 119.05 | 346.75 136.92 395.15 | 173.78 490.55 | 28.84 167.74 84.31 248.65 41.37 201.87 101.70 297.67 56.05 236.32 119.39 346.30. 72.82 271.16 137.43 394.48 112.36 342.26 174.81 489.25 3.481 53.38 5.23 66.75 8.16 83.50 11.73 100.29 20.80 134.03 26.71 79.94 33.41 99.89 41.82 124.79 50.27 | 149.63 67.30 199.12 84.58 248.29 102.16| 297.05 120.13 345.32 | 138.56 | 393.03 177.12 486.43 20.02 59.97 79.93 99.86 2.09 | 40.02 3.72 53.39 26.72 5.80 66.77 9.06 83.54 13.03 100.36 | 33.43 41.86 124.74 50.33 149.54 200 20 00.0 250 25 00.0 300 30 00.0 350 35 00.0 400 40 00.0 5.79.09 99.60 .50 197.58 23.07 134.19 9.03.14 124.21 .62 245.28 35.87 | 168.36 12.96 | | .20 148.64 .73 291.88 51.34 202.95 17.58 .27 172.85 .84 337.16 69.39 238.06 | 22.87.34 196.80.94 380.94 89.89 273.81 | | | 67.45 198.92 84.87 247.89 102.69 296.36 | 120.98 344.23 139.85 391.40 .34 * Subtract from tabulated value for Da when chord definition of D is used. 420 Δ 0.0 .I .2 ~33 .3 .4 0.5 .6 .7 .8 .9 1.0 .1 .2 .3 .4 1.5 .6 .7 .8 .9 IME 5 .3 .4 2.0.00291 .1 .2 2.5 .6 .7 .8 .9 ~~+ Dorog 0-234 .4 3.5 .6 .7 .8 .9 Da .00000 015 029 044 058 .00073 .2 088 102 117 131 3.0.00435 . I .2 .3 .3 .00146 161 175 190 204 .4 .00219 233 248 262 277 305 320 334 349 .00363 377 392 406 421 4.0.00581 450 464 479 493 .00508 523 537 552 566 596 610 625 639 4.5 .6 .7 .8 .9 5.0 .00727 .00654 669 683 698 712 TABLE XII. SPIRAL FUNCTIONS FOR LS=1 ⭑ ဗွီ8888 §8888 ဗြိ8888 ဗွီ8888 ဗြိ8867 gမံ ဂ္ယီဝ .0000 .0000 .0000 00 .0001 .0000 |.49999 .0001 01 01 01 ខ្ញុំ 88 ធ្នូ8888 g8888 .0001 02 .0002 Do .50000.0000 000 000 000 000 .0002 Xo .50000 000 000 000 000 999 998 998 998 858 88822 998 997 997 997 01 03 04 05 .0006 08 .49999.0013 999 999 999 999 09 10 14 15 17 18 .0019 20 DONNE 22 23 24 .49998.0025 22223 27 28 29 31 .49997.0032 996 996 996 996 33 34 36 37 OM JŌ. .49995.0038 995 994 994 994 39 41 42 43 .49994.0045 993 993 993 992 46 Anuo nuuko 855 .49992.0051 991 991 991 990 .49990.0057 989 989 988 988 0003 ..49987 62 0064 X Y 1.00000.00000 1.00000 1.00000 .99999 .99999 058 116 175 233 .99999.00291 999 998 998 997 349 407 465 524 .99997.00582 996 995 995 994 640 698 756 814 .99993.00873 992 991 989 .99988.01163 987 985 984 982 931 989 990.01047 105 222 280 338 396 .99981.01454 979 978 976 975 512 571 629 687 .99973.01745 971 969 967 965 803 861 919 978 .99963.02036 961 958 956 953 094 152 210 268 .99951.02326 948 946 943 941 384 443 501 559 L.T. .66667 667 667 667 667 * .66668 668 668 669 669 .66667 |.33334 667 334 668 334 668 334 668 334 .66669 669 670 670 671 .66671 671 672 672 673 .66676 677 678 678 679 .66680 681 681 682 683 S. T. .66684 685 686 686 687 .99938.02617 935 675 .66688 689 733 690 932 930 791 691 927 849 692 .99924.02907 1.66693 .33333 1.00000 333.00000 1.00000 1.00000 1.00000 334 334 334 .33334 335 335 335 335 .66673.33339 674 675 675 676 .33336 336 336 337 337 .33337 338 338 339 339 340 340 341 341 .33342 343 343 344 345 .33345 346 347 347 348 .33349 350 350 351 352 .33353 354 355 L.C. 356 357 .33358 1.00000 1.00000 .99999 999 999 .99999 998 998 998 997 99997 997 996 996 995 .99995 994 993 993 992 .99992 991 990 990 989 .99988 987 986 985 984 .99983 982 981 980 979 .99978 977 976 975 974 .99973 971 970 969 967 .99966 When chord * Multiply functions (except * values) by the given value of Ls. definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of De and the values. See page 410 for example. 421 1° 5.0 .I .2 NME .3 .4 5.5.00800 .6 .7 .8 .9 * 6.0 .I .2 234 .3 .4 .6 .7 .8 .9 6.5.00945 .I .2 .3 .4 7.5 .6 .7 .8 .9 8.0 .I 234 567BG .2 .3 .4 8.5 .6 .7 .8 .9 .I 23= 7.0.01018 .0005 .2 .3 .4 Da .00727 742 756 771 785 5678 M 814 829 843 858 .8 .9 10.0 .00872 887 901 916 930 9.0.01308 960 974 989 .01003 033 047 062 076 .01091 105 120 134 149 .01163 178 192 207 221 9.5 .01381 .6 .7 .01236 250 265 279 294 TABLE XII.-SPIRAL FUNCTIONS FOR L:=1 323 337 352 366 395 410 424 439 .01453 * .0003 g838 83ဝတီတီ ဗွီ388 ဗွီ8888 g8888 ဗွီ ဒွ588 ဗွီဒီ888 g882- .0004 .0006 Da .0003.49985.0070 984 984 Xo .0009 .0010 10 10 || || 0011 .49987.0064 987 986 986 985 983 983 .0007 .49967 966 965 965 964 ⭑ .49982.0076 981 981 980 979 .0008 .49963 65 66 67 69 .49979.0083 978 977 976 976 962 961 961 960 71 73 74 75 958 957 956 955 78 79 .49954 953 952 951 950 .49949 80 81 .49975.0089 974 973 973 972 84 85 86 .49971 970 969 969 968 .0100 ww 88 90 91 93 94 .0095 97 98 99 .0102 DE BON FOND ONIO 03 04 05 07 .49959.0114 .0108 09 10 12 13 16 17 18 19 .0120 22 23 24 26 .0127 X .99924 921 914 911 918.03023 .99908 904 901 897 894 886 882 879 875 .99871 867 863 859 .99829 824 819 815 810 Y 800 795 790 785 .99780 775 .02907.66693 965 855.04010 082 140 764 759 .99890.03488.66705 .33368 546 369 604 371 662 372 720 373 748 742 737 731 372 430 .03198.66699 256 314 719 713 708 702 .99696 .03778 836 894 952 .99851 .04068.66719 846 842 838 833 126 184 L.T. 242 300 .04358 416 474 694 696 697 698 532 590 700 701 703 704 04937 995 706 708 709 710 .66712 713 715 716 717 720 722 724 725 .66727 728 730 732 733 .99805.04648.66735 .33395 706 397 764 399 822 400 879 402 737 738 740 742 .66744 745 747 749 751 S. T. 755 757 759 761 .33358 359 360 361 362 765 767 .33363 364 365 366 367 769 771 770.05053 … 169 .99754.05227.66753 .33412 285 414 342 416 400 417 458 419 .33374 376 377 378 380 .33381 382 384 385 386 .33388 389 391 392 394 .99725.05516.66763 .33421 574 632 690 747 .05805.66773 .33403 405 407 409 410 423 425 427 428 33430 L.C. .99966 965 963 962 961 .99959 958 956 954 953 .99951 950 948 946 944 .99943 941 939 937 936 .99934 932 930 928 926 99924 922 920 918 916 .99913 911 909 907 904 .99902 900 897 895 893 .99890 888 885 883 880 .99878 875 873 870 867 .99865 When chord Multiply functions (except * values) by the given value of Ls. definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the values. See page 410 for example. 422 10.0 1 .2 IMI SO760 0 .3 .4 10.5 .6 .7 .8 .9 11.0 . I .2 22 567∞a .3 .4 11.5 .6 .7 .8 .9 12.0 .│ .2 .3 .4 12.5 .6 .7 .8 .9 13.0 :| .2 .3 H BOT∞0 .4 13.5 .6 .7 .9 .I .2 .3 .4 567 Da .01453 468 482 .6 497 511 .7 TABLE XII.-SPIRAL FUNCTIONS FOR LS=1 .01526 540 555 569 584 .01598 613 627 642 656 .01671 685 700 714 729 .8 .02003 018 .01743 757 772 786 801 .01815 829 844 858 873 14.0.02032 .01887 902 916 931 945 046 061 14.5.02104 075 090 118 133 147 162 ★ .8 .9 15.0 .02176 .001 1 IL ~~~ ~~MMM 12 12 12 .0012 12 13 13 13 .0013 14 14 14 14 5555 O .0015 15 .01960.0020 974 989 15 15 16 .0016 16 16 17 17 .0017 18 18 18 18 .0019 19 19 20 20 20 21 21 21 .0022 22 22 23 23 Xo Da .49949 948 947 946 945 .49944 943 942 94-1 940 .49939 938 937 935 934 .49933 932 931 929 928 .49927 926 924 923 922 .49921 919 918 917 915 .49914 913 911 910 909 .49908 906 905 904 902 * .0127 28 29 2006 CXFUN DE555 £55 wwwww wwnn 32 .0133 34 36 37 38 .0139 43 44 .0146 48 51 .0152 55555 53 54 56 57 .0158 59 63 .0164 65 67 68 69 .0170 72 73 74 75 .49901.0177 900 898 897 895 78 79 80 82 .0023 .0183 .49894 892 24 84 24 891 85 24 889 86 25 888 88 .0025 .49886 .0189 X .99696 690 684 677 671 .99632 625 618 612 605 .99665.06094 658 652 645 639 547 540 532 .99525 517 509 502 494 .99486 478 470 462 454 .06671 .99598 591 729 584 787 576 844 569 902 .99562 .06959 555.07017 .99446 438 430 421 413 Y .99405 396 387 379 370 99362 353 344 335 326 .99317 .05805.66773 863 921 978 .06036 152 210 267 325 556 614 .06383.66796 440 498 075 132 190 .07248 305 363 420 478 L.T. .07823 880 938 995 .08053 776 778 780 782 .66784 787 789 791 794 168 225 282 340 798 801 803 806 .66808 811 813 816 818 .66821 823 826 828 83! .66834 836 839 .07535.66847 593 650 708 765 842 845 850 853 856 859 .66862 865 868 871 874 S.T. 880 883 886 889 .33430 432 434 436 438 .33440 442 444 447 449 .33451 453 455 457 460 .33462 464 466 469 471 .33473 476 478 480 483 33485 488 490 493 495 .33498 500 503 505 508 .08110.66877 .33524 527 530 532 535 .33511 513 516 519 521 T 08397 .66892 455 895 512 898 569 901 627 904 08684 66908 .33553 .33538 541 544 547 550 L.C. .99865 862 859 856 854 99851 848 845 842 839 .99836 833 830 827 824 .99821 818 815 812 808 .99805 802 799 795 792 .99789 785 782 778 775 .99771 768 764 761 757 .99753 750 746 742 739 .99735 731 727 723 720 99716 712 708 704 700 .99696 When chord * Multiply functions (except * values) by the given value of Ls. definition of degree of curve (Dc) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the values. See page 410 for example. * 423 4° 15.0 .2 .3 NAI Đi .4 15.5.02248 .6 .7 .8 .9 16.0 .1 .2 .3 .4 16.5 .6 .7 .8 .9 17.0 .I .2 * .3 VMI S .4 .6 .7 .8 .9 18.0 .I .2 .3 4 • 18.5 .6 .7 ∞ a .8 .9 19.0 I .2 VMI S6 .3 .4 19.5 Da .02176 190 205 219 234 .6 .7 .8 .9 20.0 262 277 291 306 TABLE XII.-SPIRAL FUNCTIONS FOR L.=1 .02320 335 349 364 378 .02393 407 422 436 451 .02465 479 494 508 522 17.5.02537 | .0034 551 565 579 594 .02608 622 637 651 666 .02680 694 709 723 738 .02752 766 781 795 810 * .02824 838 853 867 882 .02896 .0025 25 26 26 26 27 27 28 28 .0028 29 02228 29 .0026.49878 | .0195 29 30 .0030 30 31 31 32 بیا بیا به این بی بی بی 32 33 33 33 34 35 35 55 35 www.com .0036 36 37 37 37 12 .0032.49854 | .0213 .0040 40 41 41 41 £5555 Do .0042 42 Xo 43 43 44 .0044 .49886.0189 884 883 881 880 876 875 865 864 873 872 .0200 .49870.0201 868 867 .0038.49827 38 39 39 39 * * 852 850 849 847 .49845 843 841 840 838 .49862.0207 860 859 857 856 .49836 834 832 830 828 90 91 93 94 *ឥតខ្ញុំ ផ្លូវ88 គ្ន8--- 825 823 821 819 .49808 806 804 04 35678 15 16 17 18 .0220 21 22 23 24 .0226 27 28 29 30 .49817.0238 815 813 811 809 .0232 33 34 35 36 39 40 41 42 .0244 45 46 47 48 802 800 49798 .0250 X 308 299 289 280 .99317.08684.66908 741 799 856 913 911 914 918 921 .99271.08970 | .66924 261 .09028 928 252 085 931 242 142 934 233 200 938 213 203 194 184 164 154 143 133 .99123 113 102 092 Y .99223.09257.66941 .33583 314 586 371 589 428 593 485 596 060 050 039 029 .99018 007 .98996 985 974 .98962 951 940 929 917 .99174.09543.66959 .33599 600 602 657 606 714 609 771 612 .98906 894 883 871 860 .98848 836 824 812 800 .98788 .09828 885 942 999 081.10056 .9907.10113.66995 170 L.T. 284 341 .10398 455 512 569 626 945 948 952 955 .10967 .11024 962 966 970 973 227.67003 081 138 194 .66977 981 984 988 992 999 007 011 .10683.67035 740 797 854 910 .67015 019 023 027 031 039 043 047 051 .67055 059 063 067 072 .11251.67076 308 364 421 478 .11535 S. T. 080 084 .33553 556 559 089 093 .67097 561 564 .33567 571 574 577 580 .33615 619 622 626 629 .33632 636 639 643 646 .33650 654 657 661 664 .33668 672 675 679 683 .33687 690 694 698 702 .33706 709 713 717 721 .33725 L.C. .99696 692 688 683 679 .99675 671 667 662 658 .99654 649 645 641 636 .99632 627 623 618 614 .99609 605 600 595 591 .99586 581 576 572 567 99562 557 552 547 542 .99537 532 527 522 517 .99512 507 502 497 491 .99486 481 476 470 465 .99460 When chord Multiply functions (except * values) by the given value of Ls. definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the values. See page 410 for example. 津 ​424 4° 20.0 . I .2 .3 233 5 .4 20.5 .6 .7 .8 .9 21.0 ./ .2 IMI SOT∞G O-~Mª 5678 .3 .4 21.5 .6 .7 ·8 .9 22.0 .1 .2 .3 .4 22.5 .6 .7 .8 .9 MI NO7∞ .3 .4 23.5 .6 .7 .8 23.0.03326 .I .2 .9 24.0 .1 .2 .3 .4 567 24.5 .6 .7 Do .02896 910 925 939 954 .8 .9 25.0 .02968 982 997 .03011 026 .03111 125 140 154 169 .03183 197 211 226 240 .03254 268 283 297 312 340 354 369 383 .03469 483 497 512 526 TABLE XII.-SPIRAL FUNCTIONS FOR Ls=1 ⭑ .03040.0048 054 068 083 097 .03540 554 568 583 597 .03611 .0044 44 45 C0555 55556 5&6EE 45 46 .0046 47 47 48 48 49 49 An gaana 53 .0051.49766 51 52 5555555 57 58 .0053.49755 54 54 98888 .03397.0061 411 426 440 455 60 60 Xo Do .49798 796 794 791 789 .0056 .49745 743 740 738 735 61 62 62 63 .49787 785 783 781 779 .0063 64 64 .49777 775 773 770 768 .0058.49733 59 59 65 65 764 762 759 757 753 751 749 747 • 731 728 726 723 .49721 719 716 714 711 49709 707 704 702 699 .0066 .49697 66 694 67 692 67 689 68 687 .0068 .49684 * .0250 51 52 53 54 .0256 57 58 59 60 .0262 63 3338 GOREN PAPER 2.0¤ã 64 .0267 .0285 86 88 89 90 .0291 92 93 95 96 .0297 98 99 .0300 02 .0303 04 05 06 07 .0309 X .98788 776 764 752 740 .98728 715 703 690 .0273 .98536 523 509 496 482 .98601 588 575 562 549 678.12044 .98665 .12101 652 639 627 614 .98469 455 442 428 415 .98401 387 · 373 359 345 .98331 316 302 288 274 .98260 245 231 216 202 Y .98187 172 157 143 128 .98113 .11535 591 648 705 761 .11818 875 931 988 157 214 270 327 .12383 439 496 552 609 .12665 721 777 834 890 .12946 .13002 059 115 172 .13508 564 621 677 733 L.T. 845 901 957 .14012 .67097 102 106 ||| 115 .14068 124 180 236 292 .14348 .67119 124 128 133 137 .67142 147 151 156 161 .67165 170 175 180 184 .13228.67238 284 340 396 452 .67189 194 199 204 208 .67213 218 223 228 233 243 248 254 259 .67264 269 274 280 285 S.T. .67317 322 328 333 339 67344 .33725 729 733 737 741 .33745 749 753 758 762 .33766 770 774 779 783 .33787 791 796 800 804 .33809 813 818 822 826 .33831 835 840 844 849 .33854 858 863 868 872 .33877 882 886 891 896 906 910 915 920 L.C. .33925 930 935 940 945 .33950 .99460 454 449 443 438 .99432 427 421 415 410 .99404 399 393 387 381 99376 370 364 358 352 .13789.67290.33901 .99222 295 216 301 209 306 203 311 196 .99346 340 334 328 322 .99316 310 304 298 292 .99286 279 273 267 261 .99254 248 242 235 229 .99190 183 177 170 163 .99157 * Multiply functions (except * values) by the given value of Ls. When chord definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the * values. See page 410 for example. 425 1° 25.0 .1 .2 ~M 5O7∞. .3 .huf 25.5 .6 .7 .8 .9 26.0 .1 .2 .3 .4 5678σ O .6 .7 .8 26.5.03825 .9 27.0 .I 233 56 .2 .3 .4 27.5 .6 .7 .8 .9 28.0 .I .2 .3 .4 28.5 .6 .7 .8 .9 o 29.0 .1 233 .2 .3 .4 5678 29.5 .6 .7 Da .03611 625 640 654 669 .8 .9 30.0 .03683 697 711 725 739 .03753 767 782 796 811 839 853 868 882 910 924 939 953 .03967 981 995 .04009 023 .04108 122 136 151 165 .04179 193 207 222 236 TABLE XII.—SPIRAL FUNCTIONS FOR Ls=1 ⭑ .04250 264 278 293 307 .04321 .0068 69 69 70 71 .0071 72 72 73 73 ZIPPO FRO .0074 74 75 76 .03896 .0080 76 .0077 77 78 78 79 .04037 .0085 051 86 065 87 080 094 80 81 81 82 .0082 83 84 84 85 88888 87 88 .0088 89 90 90 91 .0092 92 93 93 94 .0095 95 96 97 97 Xo Da .49684 681 679 676 674 .49671 668 666 663 661 .49646 643 640 638 635 .49632 629 626 624 621 .49618 615 613 610 608 .49658.0320 656 653 651 648 .49590 587 584 582 579 • .49576 573 570 567 564 ⭑ .0309 10 11 12 13 .0314 = 15 17 18 19 2~~~~ 21 22 23 25 .0326 27 28 29 30 .0331 33 34 .49605.0343 602 599 596 593 * 35 36 .0337 38 39 40 42 44 45 46 47 .0348 997nn kunni göðbó .0354 .49561 558 555 552 549 64 .0098 49546 .0365 .0359 62 X .98038 022 007 .97991 976 .98113.14348 | .67344 098 404 350 083 459 355 068 515 361 053 571 366 945 929 913 898 .97882 866 850 834 818 .97721 704 688 671 655 Y .97802.15461 786 770 753 737 621 604 588 571 .97960.14905.67400 .34001 961 .15016 072 128 .97554 537 520 503 486 .14627 682 738 794 849 .97469 452 434 417 399 .97382 364 346 329 311 .97293 .15183 239 294 350 405 516 571 627 682 .15738 793 848 903 959 L.T. 180 235 .16290 345 400 455 510 .67372.33975 378 383 389 395 406 412 418 424 .67430 435 441 447 453 .67459 465 471 477 483 .67490 496 502 508 514 .97638.16014.67520 .34111 069 116 124 122 128 134 527 533 539 546 .67552 558 565 571 578 S.T. .16565.67584 620 675 730 785 .33950 955 960 965 970 591 597 604 610 .16840 .67617 895 623 630 950 .17005 637 060 643 17114 .67650 981 986 991 996 007 012 017 023 .34028 033 039 044 049 .34055 060 066 071 077 .34083 088 094 099 105 .34139 145 151 157 163 34169 165 171 177 193 .34199 205 211 217 223 .34229 L.C. .99157 150 143 136 129 .99123 116 109 102 095 .99088 081 074 067 060 99053 046 038 031 024 .99017 009 002 .98995 987 .98980 973 965 958 950 .98943 935 928 920 913 98905 897 890 882 874 98866 859 851 843 835 .98827 819 811 803 795 .98787 * Multiply functions (except values) by the given value of Ls. When chord definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the values. See page 410 for example. 426 4° 30.0.04321 ./ .2 .3 .4 233 56 30.5 .6 .7 .8 .9 31.0 .. .2 0123I SOT .3 . Ц 31.5 .6 * .7 .8 .9 32.0 . | .2 .3 .4 32.5 I 56 .6 .7 .8 ·9 33.0 . | .2 234 56 .3 .4 33.5 • .6 .7 .8 .9 34.0 .1 .2 .3 • UMI 56 Do .4 TABLE XII.-SPIRAL FUNCTIONS FOR Ls=1 335 349 363 377 .04391 405 419 434 448 .04462 476 490 504 518 .04532 546 560 574 588 .04602 616 630 645 659 .04673 687 701 715 729 .04743 757 771 785 799 .04813 827 841 855 869 .04883 897 911 925 939 04953 967 981 995 * .0098 98 99 .0100 88 ㅇㅇㅇ ​00880 88 00 .0101 02 03 04 .0104 05 06 06 07 09 10 10 1110* -~~~# I5OON 12 12 13 14 .0108.49500 15 16 16 17 .01 18 18 19 20 21 .0121 22 23 23 24 .0125 26 26 27 28 34.5 .6 .7 .8 .9 .05009 35.0 .05023 .0132 .0128 29 30 31 31 Xo Da .49546 543 540 • 537 534 49531 528 525 522 519 .49516 513 510 506 503 497 494 490 487 .49484 481 478 475 472 466 462 459 455 49452 449 445 442 438 .49435 432 429 425 422 49419 415 412 408 405 .49401 398 395 * .0114.49469 | .0392 391 388 49385 .0365 66 67 600 INNER FOR 68 69 .0371 72 73 74 75 .0376 77 78 79 80 .0381 83 84 85 86 .0387 88 89 90 91 93 94 95 97 .0398 99 .0400 01 02 .0403 04 05 06 07 .0408 09 10 [1 235 12 .0413 15 16 17 18 .0419 X .97293 275 257 239 221 .97203 185 167 148 130 057 038 .97112.17661 094 075 907 887 868 849 Y .97020.17934 001 .96982.18043 963 944 .96733 713 694 674 655 .17114 169 224 279 333 .17388 443 498 552 607 .96536 516 496 475 455 96435 414 716 770 825 879 .96830.18478 811 791 772 752 394 373 353 .96332 988 097 152 .96635.19019 615 595 576 556 532 586 640 694 .18748 803 857 911 965 073 127 181 234 .96926.18206.67790 .34356 260 363 315 370 369 376 424 383 .19288 342 396 450 504 .19557 611 665 718 772 .19826 L.T. .67650 657 664 * 670 677 .67684 691 698 705 712 .67719 726 733 740 747 .67754 761 768 775 783 797 804 812 819 .67826 834 841 849 856 .67863 871 878 886 894 .67901 909 916 924 932 .67939 947 955 963 971 .67979 987 994 S.T. .68002 010 .68018 .34229 235 241 248 254 .34260 266 273 279 285 .34292 298 304 311 317 .34324 330 337 343 350 .34390 397 403 410 417 .34424 431 438 444 451 .34458 465 472 479 486 .34493 500 508 515 522 .34529 536 544 551 558 34565 L.C. .98787 779 771 763 755 .98746 738 730 722 713 .98705 697 688 680 672 .98663 655 646 638 629 .98621 612 603 595 586 .98577 569 560 551 542 .98534 525 516 507 498 .98489 480 471 462 453 .98444 435 425 416 407 .98398 389 379 Multiply functions (except values) by the given value of Ls. When chord definition of degree of curve (De) is used, correct the calculated values of values. See page 410 for o or Xo by subtracting the product of Dc and the example. 370 361 .98351 427 4° 35.0 .1 .2 .3 .4 35.5 5678σ o .6 .7 .8 .9 36.0 .I .2 .3 234 .4 36.5 .6 .7 .8 .9 37.0 ·/ 0-234 5 .2 .3 .4 37.5 .6 · .7 .8 .9 38.0 .1 .2 .3 4 38.5 .6 .7 .8 .9 ·23= .2 .3 .4 39.5 .6 .7 .8 ∞ a .9 40.0 Da .05023 037 051 065 079 TABLE XII.—SPIRAL FUNCTIONS FOR L,=1 177 191 204 218 .05232 246 260 273 287 .05301 39.0.05579 .I .05093.0136 107 121 135 149 315 329 343 357 .05371 385 399 413 427 .05441 455 469 482 496 .05510 524 538 551 565 ⭑ .05163.0139.49349 593 607 620 634 .0132 33 33 .05648 662 676 690 704 .05718 Ew wwwww wwww 34 35 36 37 38 39 40 41 42 42 .0143 44 45 45 46 .0147 48 49 49 50 .0151 52 52 53 54 .0155 56 56 57 58 .0159 59 60 61 62 .0163 63 64 65 66 .0167 68 68 Xo 69 70 .0171 Da .49385 381 378 374 371 345 342 338 335 .49331 327 324 320 317 .49367.0424 363 360 356 353 .49313 309 306 302 299 .49295 291 287 284 280 ..49256 252 249 245 242 ⭑ .49238 234 230 226 222 .0419 2022 2020 21 23 25 26 27 28 .0429 30 31 32 33 .0434 35 36 37 38 .0439 40 41 42 43 .49276.0449 272 268 264 260 • .0444 45 46 47 48 50 51 52 53 .0454 55 56 57 58 .0459 60 61 62 63 .49218.0464 214 210 207 203 49199 65 66 67 68 0469 X .96332 311 291 270 .96229 208 187 250.20040 .20094 147 201 254 307 166 145 .96017 .95996 .96124.20361 103 081 060 038 974 953 931 .95800 778 756 734 712 .95690 668 645 623 601 .95578 556 533 Y .95910.20893 888 866 844 822 511 488 .19826 879 933 987 .95466 443 420 397 374 .95351 328 305 281 258 .95235 414 467 521 574 .20627 680 734 787 840 946 999 .21052 105 .21158 211 264 317 370 .21423 475 528 581 634 .21686 739 792 844 897 .21949 .22002 054 107 159 .22212 264 316 369 421 .22473 L.T. .68018 026 034 042 051 .68059 067 075 083 092 .68100 108 116 125 133 .68141 150 158 167 175 .68184 192 201 210 218 .68227 236 244 253 262 .68271 279 288 297 306 .68315 324 333 342 351 .68360 369 379 388 397 S.T. 34565 573 580 587 595 .34602 610 617 625 632 .34640 647 655 663 670 34678 686 693 701 709 .34717 725 732 740 748 .34756 764 772 780 788 .34796 804 812 820 829 .34837 845 853 861 870 .34878 886 895 903 911 .34920 928 937 945 954 .68406 415 424 434 443 68452 .34962 L.C. .98351 342 333 323 314 .98304 295 285 276 266 .98257 247 237 227 218 .98208 198 188 179 169 .98159 149 139 129 119 .98109 099 089 079 069 .98059 049 038 028 018 .98008 .97997 987 977 967 .97956 946 935 925 914 .97904 893 883 872 861 .97851 values) by the given value of Ls. When chord * Multiply functions (except definition of degree of curve (De) is used, correct the calculated values.of o or Xo by subtracting the product of Dc and the * values. See page 410 for example. 428 4° 40.0 .I .2 .3 .4 40.5 .6 .7 .8 .9 41.0 .1 .2 .3 .4 4 567 41.5 .6 .7 .8 .9 42.0 } • .2 .3 .4 Our 42.5 ·6 .7 .8 .9 43.0 .] .2 .3 .4 43.5 .6 .7 .8 .9 44.0 .I .2 ~34 5 6 .3 .4 44.5 • .6 7 .8 .9 45.0 Do .05718 732 745 759 772 .05786 800 814 827 841 .05855 869 883 896 910 .05924 938 952 965 979 .05993 .06007 020 034 047 075 089 102 116 212 226 239 253 TABLE XII. SPIRAL FUNCTIONS FOR Ls=1 .06267 281 294 308 321 * .06335 .0171 72 72 349 362 376 389 06403 ZZZZZ ZZZñ 73 74 .0175 76 77 77 78 .0179 80 81 82 82 .0183 84 85 86 87 .0196 06130 144 97 157 98 171 99 184 .0200 .0187 88 89 90 91 33883 8588 Do 04 Xo .0205 .49199.0469 195 191 187 183 .49179 175 171 167 163 .49138 134 130 126 122 .06061.0192.49097.0493 93 93 94 95 .49159.0479 155 151 146 142 105 101 093 088 084 079 ⭑ .49118.0488 114 110 70 71 72 73 .06198.0200.49054 | .0503 .0474 75 76 77 78 028 024 019 015 .0209.49011 10 80 81 82 83 007 003 .0484 85 86 87 88 11 12 .48998 13 994 .0214 .48990 .49075 .0498 071 99 067 .0500 062 058 89 90 91 92 94 95 96 97 050 045 041 036 .49032 .0507 að 855 * § 8 = .0512 13 14 14 15 .0516 X .95235 212 188 165 141 95118 094 071 047 023 95000 .94976 952 928 904 .94880 856 832 807 783 .94759 734 710 685 661 .94636 612 587 562 538 .94388 363 337 312 287 Y .94262 236 211 185 160 .22473 526 578 630 682 .22734 786 838 890 942 .22994 .23046 098 150 202 .23254 306 358 409 461 .23513 564 616 667 719 .23771 822 874 .94513.24028 488 463 438 413 925 976 079 130 182 233 .24284 335 387 438 489 .24540 591 642 693 744 .94134 108 082 057 031 94005 .25049 .24795 846 896 947 998 L.T. .68452 462 471 481 490 .68500 509 519 528 538 .68547 557 567 577 586 .68596 606 616 626 635 68645 655 665 675 685 .68695 706 716 726 736 .68746 756 767 777 787 .68798 808 818 829 839 .68850 860 871 882 892 .68903 914 924 935 946 .68957 S.T. .34962 971 980 988 997 .35006 014 023 032 041 .35049 058 067 076 085 .35094 103 | 12 121 130 .35139 148 158 167 176 .35185 194 204 213 222 .35232 241 250 260 269 .35279 288 298 307 317 .35327 336 346 356 365 35375 385 395 405 415 .35424 L.C. .9785! 840 829 819 808 .97797 786 775 765 754 .97743 732 721 710 699 .97688 677 666 655 643 .97632 621 610 599 587 .97576 565 553 542 531 .97519 508 496 485 473 .97462 450 438 427 415 .97404 392 380 368 357 .97345 333 321 309 297 .97285 * Multiply functions (except * values) by the given value of Ls. When chord definition of degree of curve (De) is used, correct the calculated values of o or Xo by subtracting the product of Dc and the values. See page 410 for example. * 429 Δ TABLE XIII.—COEFFICIENTS FOR CURVE WITH EQUAL SPIRALS* 508508 508508 508508 508508 508508 508508 508508 508508 508508 508588 1 00 20 40 2 00 20 40 3 00 20 4.00 20 40 5 00 20 40 6 00 20 40 7 00 20 40 8 00 20 40 9.00 20 40 10 00 20 40 11 00 20 40 12 00 20 40 13 00 20 40 14 00 20 40 15.00 20 40 16.00 20 40 17 00 20 40 18 00 20 40 19.00 20 40 20 00 20 40 N 0.034906 0.046540 0.058173 0.069805 0.081435 0.093064 0.104691 0.116316 0.127938 0.139558 0.151175 0.162789 0.174400 0.186007 0.197611 0.209210 0.220805 0.232396 0.243982 0.255563 0.267139 0.278709 0.290274 0.301832 0.313358 0.324931 0.336471 0.348004 0.359530 0.371049 0.382560 0.394063 0.405558 0.417046 0.428524 0.439994 0.451455 0.462907 0.474350 0.485783 0.497206 0.508619 0.520022 0.531414 0.542795 0.554166 0.565525 0.576873 0.588209 0.599534 0.610846 0.622146 0.633433 0.644708 0.655969 0.667217 0.678452 0.689673 0.700881 0.712074 P 0.000203 0.000361 0.000564 0.000812 0.001106 0.001 444 0.001827 0.002256 0.002729 0.003248 0.003812 0.004421 0.005074 0.005773 0.006517 0.007305 0.008139 0.009017 0.009940 0.010908 0.011921 0.012979 0.014081 0.015229 0.016420 0.017657 0.018938 0.020264 0.021634 0.023049 0.024508 0.026011 0.027559 0.029152 0.030788 0.032469 0.034194 0.035963 0.037777 0.039634 0.041535 0.043480 0.045469 0.047502 0.049579 0.051699 0.053863 0.056071 0.058322 0.060616 0.062954 0.065335 0.067759 0.070227 0.072737 0.075291 0.077888 0.080527 0.083209 0.085934 M 1.000051 1.000090 1.000141 1.000203 1.000277 1.000361 1.000457 1.000564 1.000682 1.000812 1.000953 1.001106 1.001269 1.001444 1.001630 1.001827 1.002036 1.002255 1.002486 1.002728 1.002982 1.003247 1.003523 1.003811 1.004108 1.004419 1.004739 1.005072 1.005415 1.005770 1.006135 1.006511 1.006900 1.007300 1.007710 1.008131 1.008564 1.009008 1.009464 1.009930 1.010407 1.010895 1.011395 1.01 1906 1.012428 1.012961 1.013505 1.014061 1.014627 1.015204 1.015792 1.016391 1.017002 1.017624 1.018256 1.018899 1.019554 1.020220 1.020896 1.021584 S 0.017454 0.023271 0.029088 0.034905 0.040722 0.046539 0.052355 0.058171 0.063986 0.069802 0.075616 0.081430 0.087244 0.093057 0.098870 0.104682 0.110492 0.116306 0.122113 0.127921 0.133729 0.139536 0.145342 0.151146 0.156951 0.162753 0.168555 0.174356 0.180155 0.185954 0.191751 0.197546 0.203340 0.209134 0.214925 0.220715 0.226504 0.232291 0.238077 0.243861 0.249643 0.255424 0.261203 0.266980 0.272755 0.278529 0.284300 0.290070 0.295837 0.301604 0.307367 0.313129 0.318888 0.324646 0.330401 0.336154 0.341904 0.347653 0.353400 0.359143 430 1° - P FORON MINUN AMOIN MIDON NOO 4 6 8 10 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 TABLE XIV.-TANGENTS AND EXTERNALS FOR UNIT DOUBLE-SPIRAL CURVE 1.00178.02918 1.00257.03507 Ts Es Ts 1.00028 .01164 42.5 1.03394 1.00064 .01747 43.0 1.03479 1.00114 .02332 43.5 1.03566 44.0 1.03653 44.5 1.00794 1.00873 1.00955 1.01042 1° 1.00302 .03802 1.03922 .14191 1.00402 1.00458 45.0 1.00350.04098 45.5 .04396 46.0 1.04015 .14370 .4 .04696 46.5 1.04109 1.00518.04992 47.0 1.04204 .14550 .14730 1.00581 .05292 47.5 1.04301 1.00648 .05593 48.0 1.04399 1.00719.05895 48.5 1.04498 .06198 49.0 1.04598 .06502 49.5 1.04701 .06808 50.0 .07115 1.01 132 .07424 1.01226 .07734 1.01324.08045 30.0 1.01644 .08990 30.5 1.01700 ..09149 31.0 1.01758 .09309 31.5 1.01817 1.01817.09469 32.0 1.01877 .09630 .2 .4 27.5 1.01375 .08201 51.0 28.0 1.01427 .08358 1.01480 .08515 28.5 29.0 29.5 1.01588 .08831 .6 .8 .2 .4 1.01533.08674 .6 .8 37.5 1.02609 .11432 38.0 1.02682 .11599 38.5 1.02756 .11767 39.0 1.02832 .11936 39.5 1.02909 .12105 52.0 .2 .4 .6 .8 53.0 32.5 1.01938 .09791 33.0 1.02000 .09952 .2 33.5 1.02064 .10114 .4 34.0 1.02128 .10277 .6 34.5 1.02194 .10440 .8 35.01.02260 .1060454.0 35.5 1.02327 .10768 36.0 1.02396 .10933 36.5 1.02466 .11099 37.0 1.02537 .11265 .2 .4 Es Ts Es .13135 57.0 1.06399 .18536 .13309 .2 1.06449 .18617 .13484 .4 1.06499 .18698 .13660 1.03742 .13836 .6 1.06550 .18778 !.06600 .18859 .8 55.0 .2 .4 .6 .8 40.0 1.02987 .12275 56.0 40.5 1.03066 .12446 41.0 1.03146 .12617 41.5 42.0 1.03227 .12789 1.03310 .12962 .2 .4 .6 .8 1.03831.14013 58.0 1.04929 .16055 1.04971 .16130 1.05014.16206 1.05057 .16281 1.05100 .16356 1.05143 .16432 1° .14912 59.0 .15094 .15277 .15460 .6 .15645 .8 1.05318.16736 1.05362.16813 1.05407.16889 1.05452.16966 ∞ ONICO ON 1.05913 1.05961 1.04804.15831|| 60.0 1.04845.15905 .2 1.04887.15980 .2 .6 1.06009.17899 1.06057.17979 1.06105.18058 .8 1.06250.18296 .2 1.06299 .18376 1.06349 .18456 .4 68 ON=6∞ 1.05186.16508 1.05230.16584 62.0 1.05274 .16660 .2 .4 .4 .6 .8 61.0 .2 .4 .6 1.05680 .17352 64.0 1.05726 .17430 1.05772 .17508 .6 1.05819 .17586 .8 1.05866 .17664 .8 .6 1.05497 .17043 1.05542 .17120 1.05588 .17197 .6 1.05634 .17275 .8 .8 ∞ O 63.0 .2 .17742 65.0 .17820 .4 .6 .8 ∞∞ ONE 1.07953 .20947 1.08010 .21034 .2 1.08068 .21120 .4 1.08126 .21207 1.08184 1.08243 .2 1.06153 .18137 66.0 1.06201 .18217 1.06651.18940 1.06754.19103 1.06703 .19021 ONJO∞ 1.06806 .19184 1.06857 .19266 1.06909 .19348 1.06962 .19431 1.07015 .19513 1.07068 | .19596 1.07121 .19679 .4 1.07174 1.07228 1.07282.19929 1.07391.20097 1.07446.20181 1.07501.20266 .19762 .19846 1.07337 .20013 1.07556 .20350 1.07612 .20435 1.07668 .20519 1.07724 .20604 1.07781 | .20690 1.07838 .20775 1.07895.20861 .4 1.08724 .22086 1.08302 .21468 .21555 1.08361 1.08421 .21643 1.08481 .21731 1.08541 .21820 .21294 .21381 1.08602 .21908 1.08663 .21997 .6 .8 1.08847 .22265 1.08785.22175 .2 1.08971 1.08909 .22355 .22445 .6 1.09097 .8 1.09160 1.09034.22535 .22625 .22716 431 1° TABLE XIV.-TANGENTS AND EXTERNALS FOR UNIT DOUBLE-SPIRAL CURVE 67.0 .2 1.09287 1.09351 1.09416 1.09481 .4 600 ON‡60 .6 .8 68.0 .2 .4 69.0 .2 .4 .6 .23544 1.09744 .8 1.09810 .23637 .6 .8 70.0 .2 .6 .8 ∞ O .4 1.10352 1.10421 1.10491 .24585 71.0 .6 000 .8 72.0 .2 .6 .8 Ts Es 1.09223 .22807 75.0 .22898 .22990 .23082 .23174 73.0 .2 1.09546.23266 1.09612.23358 1.09678.23451 .8 ∞ ON468 74.0 .2 .4 1.10078 .24013 1.10146 .24108 .4 1.11062 .6 .8 1.11281 .25660 1.11355 .25760 .4 1.11429 .25860 .6 1.11504 .25960 .26060 1.11579 1.09876 .23731 77.0 1.09943.23825 .2 1.10010.23919 .4 .6 .8 .24203 78.0 1.10214 1.10283 .24298 .24393 .24489 1.10561 .24681 79.0 1.13661 .2 1.10632 .24777 .24874 .4 1.10703 1.10774.24971 1.10854 1.10917 1.10989 .25069 .25167 .25265 .25363 1.11135 .25462 1.11208 .25561 1° 1.11654 .26161 1.11730.26262 1.11806 .26363 11882.26465 1.11959 | .26567 .2 .4 .6 .8 · 76.0 .2 .4 .6 .8 .2 .4 .6 .8 80.0 .2 44 • Ts Es 1.12036 .26669 83.0 1.12124 | .26772 .2 1.12192 | .26875 1.12270 .26978 1.12348 .4 .6 .27082 .8 .27186 .27290 .27394 1.12667 .27499 1.12747 .27604 .28786 .2 1.13746 .28896 · 4 1.13832 .29006 .6 1.13918 .29116 1.14005 .29226 .8 81.0 .2 1.12427 1.12507 1.12587 ON: 1.12828 .27710 1.12909 .27816 .29337 .29449 1.14267 .29561 .6 .29673 1.14356 .8 1.14445 .29785 82.0 1.12991.27923 1.14092 1.14179 1° 84.0 .2 . • .4 .2 .4 1.15173 .30699 .6 1.15266 .30815 .8 1.15359 .30931 .6 .8 1.13074 .28030 1.13157 .28137 1.13240 .28244 86.0 1.13323 .28352 .2 1.13407 .28460 .4 1.13491 .28568 .6 1.13576 .28677 .8 87.0 .2 .4 85.0 0226 .2 .4 .6 .8 .6 .8 88.0 .2 4 • 1.14535 .29898 89.0 1.14625 .30011 .4 1.14715 • .30125 .30239 .6 1.14805 .8 1.14896 .30353 Ú∞ ONIO∞ ONIO∞ .8 .2 .4 .6 1.18174 .34373 .6.1.18282 .34503 .34633 1.18391 1.18500 1.18500 .34764 .34895 1.14988 .30468 90.0 1.15080 .30583 .2 .4 Ts Es 1.15453 .31048 1.15547 .31165 1.15642 .31283 1.15738 .31401 1.15834 .31520 1.15930 .31639 1.16027 .31759 1.16124 .31879 1.16222 .31999 1.16320 .32120 .6 1.16418 .32241 1.16517 .32363 1.16617 .32485 1.16717 .32607 1.16818 .32730 .8 1.16919.32854 1.17021.32978 1.17123 1.17226 1.17329 .33478 1.17433 1.17537 1.17642 .33732 .33605 1.17748.33859 1.17854.33987 .8 1.18942 .33102 .33227 .33352 1.17960.34115 1.18067.34244 I.18609 1.18719.35027 1.18830.35159 .35292 1.19054 35425 .35559 1.19167 1.19394 .35828 • 1.19280.35693 1.19508.35963 NOTES: (1) For any given I and selected spiral length, Ts and Es may be found by for the double-spiral, or all-transitional, curve (2) If multiplying the tabulated values by the length of spiral. the given I does not correspond a tabulated value, Ts and Es may be found by simple interpolation. (3) Deflection angles for staking the curve may be computed, as for any spiral, by using Δ 4 = 1/1/ 432 A 2 6 10 / O O / / 0.0 0 00.00 0 00.00 00.0 10 00.0 0 00.0 0 00.0 10 00.0 0 00.0 |0 00.0 10 00.0 .1 00.02 00.1 00.2 00.3 00.5 00.7 01.0 01.3 01.6 02.0 00.04 00.2 00.06 00.2 00.08 02.0 00.4 00.5 00.6 01.0 01.0 01.4 01.5 02.2 02.0 02.9 02.6 03.2 04.9 06.5 08.0 04.0 06.0 02.9 03.8 00.3 00.7 01.3 03.9 05.1 öävää Awniŏ OONGG AWN .6 0.5 0 00.10 0 00.4 234 56789 .4 1.0 0 00.20 0 00.8 00.22 00.9 00.24 01.0 0 01.8 0 03.2 0 05.0 0 07.2 0 09.8 02.0 05.5 07.9 10.8 06.0 03.5 02.2 03.8 08.6 11.8 04.2 06.5 09.4 12.7 00.26 01.0 02.3 .4 00.28 01.1 07.0 10.1 13.7 1234 2.0 0 00.40 0 01.6 0 03.6 0 06.4 0 10.0 0 14.4 .1 00.42 01.7 03.8 06.7 10.5 15.1 07.0 11.0 15.8 00.44 01.8 04.0 00.46 01.8 04.1 00.48 01.9 07.4 11.5 16.6 04.3 07.7 12.0 17.3 TABLE XV.—DEFLECTION ANGLES FOR 10-CHORD SPIRAL 1 3 5 9 1 00.32 01.3 1.5 0 00.30 0 01.2 0 02.7 10 04.8 0 07.5 0 10.8 0 14.7 0 19.2 02.9 05.1 08.0 11.5 15.7 20.5 03.1 05.4 12.2 03.2 05.8 13.0 01.5 03.4 06.1 09.5 00.34 00.36 00.38 08.5 09.0 16.7 21.8 17.6 23.0 18.6 24.3 13.7 .1 23+ 0 00.9 00.12 00.5 01.1 00.14 00.6 01.3 00.16 00.6 01.4 00.18 00.7 01.6 .4 .7 .8 4 2.5 0 00.50 0 02.0 0 04.5 0 08.0 0 12.5 0 18.0 0 24.5 .6 00.52 02.1 04.7 08.3 13.0 .7 00.54 02.2 04.9 02.2 05.0 08.6 09.0 .8 00.56 .9 00.58 02.3 05.2 09.3 .9 01.4 01.4 O-NET MONO!! 0 01.6 0 02.5 0 03.6 0 04.9 0 06.4 0 08.1 0 10.0 01.9 03.0 04.3 05.9 07.7 09.7 12.0 02.2 03.5 05.0 06.9 09.0 11.3 02.6 04.0 05.8 10.2 13.0 07.8 06.5 08.8 02.9 04.5 11.5 14.6 02.5 04.5 .3 7 .4 5.5 8 5.0 0 01.00 0 04.0 0 09.0 0 16.0 10 25.0 .1 01.02 04.1 09.2 16.3 25.5 .2 01.04 04.2 09.4 16.6 01.06 04.2 09.5 17.0 01.08 04.3 09.7 17.3 0 19.6 20.6 3.0 0 00.60 0 02.4 0 05.4 0 09.6 0 15.0 0 21.6 0 29.4 0 38.4 0 48.6 1 00.0 00.62 02.5 05.6 09.9 15.5 22.3 30.4 39.7 50.2 02.0 00.64 02.6 05.8 10.2 16.0 23.0 31.4 41.0 51.8 04.0 00.66 02.6 05.9 10.6 16.5 23.8 32.3 42.2 00.68 02.7 06.1 10.9 17.0 24.5 33.3 43.5 53.5 06.0 55.1 08.0 0 12.8 14.1 15.4 16.6 17.9 0 25.6 26.9 21.6 28.2 22.5 23.5 3.5 0 00.70 0 02.8 0 06.3 0 11.2 0 17.5 0 25.2 0 34.3 0 44.8 0 56.7 1 10.0 00.72 02.9 06.5 11.5 18.0 .6 25.9 35.3 46.1 58.3 12.0 .7 00.74 03.0 26.6 06.7 11.8 18.5 00.76 03.0 06.8 12.2 19.0 00.78 03.1 07.0 12.5 .8 36.3 27.4 37.2 19.5 28.1 38.2 14.0 16.0 .9 18.0 4.0 0 00.80 0 03.2 0 07.20 12.8 0 20.0 0 28.8 10 39.2 0 51.2 1 04.8 1 20.0 00.82 03.3 07.4 13.1 20.5 29.5 40.2 52.5 06.4 22.0 .2 00.84 03.4 07.6 13.4 21.0 30.2 41.2 53.8 08.0 24.0 00.86 03.4 07.7 13.8 21.5 31.0 42.1 55.0 00.88 03.5 07.9 14.1 22.0 31.7 43.1 09.7 26.0 56.3 11.3 28.0 29.4 30.7 0 16.2 0 20.0 17.8 22.0 19.4 24.0 21.1 26.0 22.7 28.0 4.5 0 00.90 10 03.6 10 08.1 0 14.4 10 22.5 0 32.4 0 44.1 0 57.61 12.9 .6 00.92 03.7 08.3 14.7 23.0 33.1 45.1 58.9 14.5 00.94 23.5 33.8 03.8 08.5 15.0 03.8 08.6 15.4 00.98 03.9 08.8 15.7 24.5 00.96 16.1 17.8 46.1 1 00.2 34.6 47.0 01.4 35.3 48.0 02.7 24.0 19.4 0 24.3 0 30.0 25.9 32.0 27.5 34.0 29.2 36.0 30.8 38.0 0 32.0 18.7 25.5 33.3 13.5 19.4 26.5 34.6 14.0 20.2 27.4 35.8 14.5 20.9 28.4 37.1 47.0 58.0 0 40.5 0 50.0 42.1 52.0 43.7 45.4 54.0 56.0 14.0. 16.0 18.0 0 40.0 0 32.4 34.0 42.0 35.6 44.0 37.3 46.0 38.9 48.0 47.4 59.9 48.6 1 01.6 49.9 03.2 26.0 37.4 51.0 06.6 24.2 26.5 38.2 51.9 07.8 25.9 27.0 38.9 52.9 09.1 27.5 1 30.0 32.0 34.0 36.0 38.0 0 36.0 0 49.0 1 04.0 1 21.0 1 40.0 36.7 50.0 05.3 22.6 42.0 44.0 46.0 48.0 54.9 11.7 30.7 52.0 .6 .7 01.14 0 01.10 0 04.4 0 09.9 0 17.6 0 27.5 0 39.6 0 53.91 10.41 29.1 1 50.0 01.12 04.5 10.1 17.9 28.0 40.3 28.5 41.0 29.0 41.8 29.5 42.5 54.0 .8 01.16 04.6 10.3 18.2 04.6 10.4 18.6 04.7 10.6 18.9 55.9 13.0 56.8 14.2 57.8 15.5 32.3 34.0 35.6 56.0 .9 01.18 58.0 433 TABLE XV.-DEFLECTION ANGLES FOR 10-CHORD SPIRAL 1 3 6 9 O O / G / 6.0 0 01.20 0 04.8 0 10.8 0 19.2 0 30.0 0 43.2 0 58.8 1 16.8 1 37.2 2 00.0 .1 01.22 04.9 11.0 19.5 .2 01.24 .3 30.5 05.0 19.8 31.0 43.9 59.8 44.6 1 00.8 45.4 01.7 18.1 38.8 02.0 19.4 40.4 04.0 42.1 06.0 20.2 31.5 01.26 05.0 .4 01.28 05.1 20.6 20.5 32.0 46.1 02.7 21.9 43.7 08.0 Δ O 2 11.2 11.3 11.5 4 5 / 7 8 6.50 01.30 10 05.2 0 11.7 0 20.8 1 03.7 1 23.2 04.7 .6 01.32 05.3 11.9 21.1 24.5 0 32.5 0 46.8 33.0 47.5 .7 01.34 05.4 12.1 21.4 33.5 48.2 05.7 .8 01.36 05.4 12.2 21.8 34.0 49.0 06.6 .9 01.38 05.5 12.4 22.1 34.5 49.7 07.6 28.3 51.8 18.0 25.8 27.0 7.00 01.40 0 05.6 0 12.6 0 22.4 10 35.0 10 50.4 1 08.6 1 29.6 1 53.4 2 20.0 .1 01.42 05.7 12.8 22.7 35.5 51.1 09.6 30.9 55.0 22.0 .2 01.44 05.8 13.0 23.0 36.0 51.8 10.6 32.2 .3 01.46 05.8 13.1 23.4 36.5 52.6 .4 0.1.48 05.9 13.3 23.7 37.0 53.3 12.5 24.0 11.5 33.4 26.0 34.7 28.0 .1 .2 .3 41.0 59.0 41.5 59.8 42.01 00.5 8.00 01.60 0 06.4 0 14.4 0 25.6 0 40.0 0 57.6 1 18.4 1 42.4 01.62 06.5 14.6 25.9 40.5 58.3 19.4 43.7 01.64 06.6 14.8 26.2 01.66 06.6 14.9 26.6 .4 01.68 06.7 15.1 26.9 8.50 01.70 10 06.8 0 15.3 0 27.2 .6 01.72 06.9 15.5 27.5 .7) 01.74 07.0 15.7 27.8 .8 01.76 07.0 15.8 28.2 .9 01.78 07.1 16.0 28.5 44.5 0 42.5 1 01.2 1 23.3 43.0 01.9 24.3 43.5 02.6 25.3 44.0 03.4 04.1 1 45.3 2 10.0 46.9 12.0 48.5 14.0 50.2 16.0 7.50 01.50 0 06.00 13.5 0 24.0 0 37.5 0 54.0 1 13.5 1 36.0 2 01.5 .6 01.52 06.1 13.7 24.3 38.0 54.7 14.5 06.2 .8 01.56 06.2 .9 01.58 06.3 14.2 25.3 37.3 03.1 38.6 .7 01.54 04.7 13.9 24.6 14.0 25.0 38.5 39.0 55.4 15.5 56.2 16.4 39.8 06.4 17.4 41.1 08.0 39.5 56.9 I 56.6 58.3 59.9 10 2 40.0 2 09.6 11.2 42.0 12.8 44.0 20.4 45.0 21.3 46.2 14.5 46.0 47.5 16.1 48.0 22.3 51.4 26.2 52.6 27.2 53.9 24.2 2 30.0 32.0 34.0 36.0 38.0 1 48.8 2 17.7 |2 50.0 50.1 19.3 52.0 20.9 54.0 22.6 56.0 58.0 9.00 01.80 0 07.2 0 16.2 0 28.8 0 45.0 1 04.8 1 28.2 1 55.2 2 25.8 3 00.0 .1 01.82 07.3 16.4 29.1 45.5 05.5 29.2 56.5 27.4 02.0 .2 01.84 07.4 29.4 46.0 06.2 30.2 57.8 16.6 16.7 29.8 46.5 .3 01.86 07.4 .4 01.88 07.5 16.9 30.1 07.0 31.1 59.0 32.1 2 00.3 47.0 07.7 29.0 30.7 32.3 04.0 06.0 08.0 09.1 34.1 02.9 9.50 01.90 0 07.6 0 17.1 0 30.4 0 47.5 1 08.4 1 33.1 2 01.6 .6 01.92 07.7 17.3 30.7 48.0 .7 01.94 07.8 17.5 31.0 48.5 01.96 07.8 17.6 31.4 49.0 .9 01.98 07.9 17.8 31.7 49.5 11.3 09.8 2 33.9 3 10.0 35.5 12.0 35.1 04.2 37.1 14.0 36.0 05.4 38.8 16.0 37.0 06.7 40.4 18.0 .8 10.6 12.7 10.00 02.00 0 08.0 0 18.0 0 32.0 0 50.0 1 12.0 1 38.0 2 08.0 2 42.0 3 20.0 .1 02.02 08.1 18.2 32.3 50.5 02.04 08.2 18.4 32.6 02.06 08.2 18.5 33.0 .4 02.08 08.3 18.7 33.3 52.0 14.9 .2 51.0 39.0 09.3 43.6 21.9 13.4 40.0 14.2 40.9 .3 51.5 10.6 45.2 23.9 11.8 46.8 25.9 41.9 13.1 48.5 27.9 10.5 0 02.10 0 08.4 0 18.9 0 33.6 0 52.5 1 15.6 1 42.9 2 14.4 2 50.1 3 29.9 .6 02.12 08.5 19.1 33.9 53.0 16.3 43.9 15.7 51.7 31.9 .7 02.14 08.6 19.3 34.2 53.5 17.0 44.9 17.0 .8 02.16 08.6 19.4 34.6 54.0 17.8 45.8 18.2 .9 02.18 08.7 19.6 34.9 54.5 18.5 46.8 19.5 53.3 54.9 33.9 35.9 56.6 37.9 .2 02.24 09.0 20.2 11.00 02.20 0 08.8 0 19.8 0 35.2 0 55.0 1 19.2 1 47.8 2 20.8 2 58.2 .1 02.22 08.9 20.0 35.5 55.5 19.9 48.8 22.1 59.8 35.8 56.0 20.6 49.8 .3 02.26 09.0 20.3 36.2 56.5 21.4 50.7 .4 02.28 09.1 20.5 36.5 57.0 22.1 11.50 02.30 0 09.2 0 20.7 0 36.8 0 57.5 1 22.8 1 52.7 2 27.2 3 06.3 3 49.9 .6 02.32 09.3 20.9 37.1 58.0 23.5 53.7 28.5 07.9 51.9 23.4 3 01.4 24.6 03.0 25.9 04.7 51.7 .7 02.34 09.4 37.4 58.5 24.2 21.1 21.2 09.5 53.9 11.1 55.9 .8 02.36 09.4 09.5 21.4 37.8 59.0 38.1 59.5 54.7 29.7 55.6 31.0 32.3 12.7 25.0 25.7 .9 02.38 56.6 57.9 3 39.9 41.9 43.9 45.9 47.9 434 TABLE XV.-DEFLECTION ANGLES FOR 10-CHORD SPIRAL 1 2 3 4 5 6 8 9 O / / O / 12.00 02.40 0 09.6 0 21.6 0 38.4 1 00.0 1 26.4 1 57.6 2 33.6 3 14.4 3 59.9 .1 02.42 09.7 21.8 38.7 00.5 27.1 58.6 34.9 16.0 4 01.9 .2 09.8 22.0 39.0 01.0 36.1 17.6 03.9 .3 02.44 02.46 09.8 .4 02.48 09.9 22.1 39.4 01.5 37.4 19.2 05.9 22.3 39.7 02.0 38.7 20.8 07.9 Δ O 12.50 02.50 0 10.0 0 22.5 .6 02.52 10.1 22.7 .7 02.54 10.2 22.9 .8 02.56 10.2 23.0 .9 02.58 10.3 23.2 13.00 02.60 0 10.4 0 23.4 .1 02.62 10.5 23.6 .2 02.64 10.6 .3 02.66 10.6 .4 02.68 10.7 24.1 23.8 23.9 0 40.0 40.3 40.6 41.0 41.3 42.6 42.9 1 02.5 03.0 03.5 04.0 04.5 48.6 49.0 49.3 7 0 41.6 1 05.0 1 33.6 2 07.4 2 46.4 41.9 05.5 34.3 08.4 35.0 09.3 47.7 42.2 48.9 35.8 10.3 50.2 36.5 11:3 51.5 06.0 06.5 07.0 ܡ 27.8 59.5 28.6 2 00.5 29.3 01.5 1 30.0 2 02.5 30.7 03.5 2 40.0 41.3 04.4 42.5 05.4 32.9 06.4 31.4 32.2 .7 03.34 13.4 30.1 .8 53.4 03.36 13.4 30.2 53.8 .9 03.38 13.5 30.4 54.1 25.7 43.8 27.3 45.1 28.9 14.5 0 02.90 0 11.6 0 26.1 0 46.4 1 12.5 1 44.4 2 22.1 3 05.6 23.1 06.8 24.0 08.1 .6 02.92 11.7 26.3 46.7 13.0 45.1 13.5 45.8 .8 .7 02.94 11.8 26.5 47.0 11.8 26.6 47.4 26.8 47.7 14.0 46.6 25.0 02.96 02.98 11.9 .9 14.5 47.3 26.0 3 22.5 24.1 13.50 02.70 0 10.8 0 24.3 0 43.2 1 07.5 1 37.2 2 12.3 2 52.8 13 38.6 4 29.9 .6 02.72 10.9 24.5 43.5 08.0 37.9 13.3 54.0 40.3 08.5 .38.6 55.3 41.9 09.0 39.4 56.6 43.5 57.9 45.1 31.9 33.9 .7 02.74 11.0 24.7 43.8 14.2 15.2 24.8 44.2 35.9 44.5 09.5 40.1 16.2 37.9 .8 02.76 11.0 .9 02.78 11.1 25.0 14.00 02.80 0 11.2 0 25.2 0 44.8 .1 02.82 11.3 25.4 45.1 .2 02.84 11.4 25.6 45.4 11.4 .3 02.86 25.7 45.8 25.9 46.1 .4 02.88 11.5 1 10.0 1 40.8 2 17.2 2 59.2 10.5 41.5 18.2 3 00.4 11.0 19.1 01.7 11.5 43.0 20.1 03.0 12.0 43.7 21.1 04.3 42.2 10 3 30.5 4 19.9 32.2 21.9 33.8 23.9 35.4 259 37.0 27.9 4 09.9 11.9 13.9 15.9 17.9 51.6 53.2 3 46.7 4 39.9 48.4 41.9 50.0 43.9 45.9 47.9 15.0 0 03.00 0 12.0 0 27.0 0 48.0 1 15.0 1 48.0 2 27.0 3 12.0 4 02.9 4 59.8 .1 03.02 12.1 27.2 48.3 15.5 48.7 28.0 13.2 04.5 5 01.8 .2 03.04 12.2 27.4 16.0 49.4 28.9 14.5 06.1 03.8 .3 03.06 12.2 27.5 16.5 50.2 29.9 15.8 07.8 .4 03.08 12.3 27.7 17.0 50.9 30.9 05.8 17.1 09.4 07.8 3 54.8 4 49.9 56.4 51.9 58.1 09.4 59.7 10.7 4 01.3 15.50 03.10 0 12.40 27.9 0 49.61 17.5 1 51.6 2 31.9 3 18.4 4 11.0 5 09.8 .6 03.12 12.5 28.1 49.9 18.0 52.3 32.9 19.6 12.6 11.8 .7 03.14 12.6 28.3 50.2 18.5 53.0 33.8 20.9 14.2 13.8 .8 02.16 12.6 28.4 50.6 19.0 53.7 34.8 22.2 15.9 15.8 .9 03.18 12.7 28.6 50.9 19.5 54.5 35.8 23.5 17.5 17.8 53.9 55.8 57.8 16.00 03.20 0 12.8 0 28.8 0 51.2 1 20.0 1 55.2 2 36.8 3 24.8 4 19.1 5 19.8 03.22 12.9 29.0 51.5 20.5 55.9 37.8 26.0 20.7 21.8 .2 03.24 13.0 29.2 51.8 21.0 56.6 38.7 23.8 .3 03.26 13.0 29.3 52.2 21.5 57.3 39.7 25.8 .4 03.28 13.1 29.5 52.5 22.0 58.1 40.7 29.9 25.6 27.3 22.3 28.6 23.9 27.8 16.50 03.30 0 13.2 0 29.7 0 52.8 1 22.5 1 58.8 2 41.7 3 31.1 4 27.2 5 29.8 .6 03.32 13.3 29.9 53.1 23.0 59.5 23.5 2 00.2 24.0 00.9 24.5 01.7 42.7 32.4 28.8 31.8 43.6 33.7 30.4 33.8 44.6 35.0 32.0 35.8 45.6 36.3 33.6 37.8 17.00 03.40 0 13.6 0 30.6 0 54.4 1 25.0 2 02.4 2 46.6 3 37.5 4 35.3 5 39.8 .1 03.42 13.7 30.8 54.7 25.5 03.1 47.5 38.8 36.9 41.8 .2 03.44 13.8 31.0 55.0 26.0 03.8 48.5 40.1 38.5 43.7 03.46 13.8 31.1 55.4 26.5 04.5 49.5 41.4 40.1 45.7 .4 03.48 13.9 31.3 55.7 27.0 05.3 50.5 42.7 41.7 47.7 .3 46.6 48.2 49.0 49.8 17.50 03.50 0 14.0 0 31.5 0 56.0 1 27.5 2 06.0 2 51.5 3 43.9 4 43.4 5 49.7 .6 03.52 14.1 31.7 56.3 28.0 06.7 52.4 45.2 45.0 51.7 .7 03.54 14.2 31.9 28.5 07.4 53.4 46.5 53.7 56.6 57.0 .8 29.0 08.1 54.4 47.8 55.7 03.56 14.2 32.0 .9 03.58 14.3 32.2 57.3 29.5 08.9 55.4 5.77 435 Δ TABLE XV.—DEFLECTION ANGLES FOR 10-CHORD SPIRAL 1 3 9 O 2 4 5 O / / O / 32.6 57.9 51.6 18.00 03.60 0 14.4 0 32.4 0 57.6 1 30.0 2 09.6 2 56.4 3 50.3 4 51.5 5 59.7 .1 03.62 14.5 03.64 03.66 14.6 .4 03.68 14.7 .2 14.6 32.8 58.2 30.5 10.3 57.3 11.0 58.3 11.7 59.3 31.0 52.9 53.16 01.7 54.7 03.7 54.2 56.3 05.7 55.4 57.9 07.7 .3 32.9 58.6 31.5 33.1 58.9 32.0 12.5 3 00.3 1 32.5 33.0 6 / 7 14.6 33.5 34.0 34.5 16.1 15.3 41.0 41.5 8 2 13.2 3 01.3 13.9 3 56.7 4 59.5 02.2 58.0 5 01.2 03.2 59.3 02.8 04.2 4 00.6 05.2 01.8 23.00 04.60 0 18.4 0 41.4 .1 04.62 18.5 41.6 .2 04.64 18.6 41.8 .3 04.66 18.6 41.9 .4 04.68 18.7 42.1 18.5 0 03.70 0 14.8 0 33.3 0 59.2 .6 03.72 14.9 33.5 59.5 5 07.6 6 19.7 09.2 21.7 36.0 18.2 10.9 23.7 .7 03.74 15.0 33.7 59.8 .8 03.76 15.0 33.8 1 00.2 .9 03.78 15.1 34.0 00.5 19.00 03.80 0 15.2 0 34.2 1 00.8 1 35.0 2 16.8 3 06.2 4 03.1 .1 03.82 15.3 34.4 01.1 35.5 17.5 07.1 04.4 .2 03.84 15.4 34.6 08.1 05.7 .3 03.86 15.4 34.7 09.1 06.9 12.5 .4 03.88 15.5 34.9 02.1 10.1 08.2 14.1 27.6 19.5 0 03.90 0 15.6 0 35.11 02.4 1 37.5 2 20.4 3 11.14 09.5 5 15.7 6 29.6 .6 03.92 15.7 35.3 02.7 38.0 21.1 12.0 10.8 17.3 .7 03.94 15.8 35.5 .8 03.96 15.8 35.6 .9 03.98 15.9 35.8 03.7 39.5 23.3 01.4 01.8 18.9 25.6 36.5 37.0 19.7 31.6 33.6 03.0 38.5 21.8 03.4 39.0 22.5 13.0 12.1 14.0 13.3 15.0 14.6 18.9 20.6 22.2 37.6 35.6 10 6 09.7 11.7 13.7 15.7 04.4 06.0 17.7 20.0 0 04.00 0 16.0 0 36.0 1 04.0 1 40.0 2 24.0 3 16.04 15.9 5 23.8 6 39.6 .1 04.02 16.1 36.2 04.3 40.5 24.7 16.9 17.2 25.4 41.6 43.6 18.5 27.0 .2 04.04 16.2 .3 04.06 16.2 .4 04.08 16.3 36.7 05.3 42.0 36.4 36.5 04.6 05.0 25.4 17.9 26.1 18.9 19.7 26.9 19.9 21.0 30.3 47.6 28.6 45.6 20.50 04.10 0 16.4 0 36.9 1 05.6 1 42.5 2 27.6 3 20.9 4 22.35 31.9 6 49.6 .6 04.12 16.5 37.1 05.9 43.0 28.3 21.8 23.6 33.5 51.6 .7 04.14 16.6 53.6 .8 04.16 16.6 55.6 .9 04.18 16.7 37.6 06.9 44.5 30.5 37.3 06.2 37.4 06.6 43.5 29.0 44.0 29.7 22.8 24.8 35.1 23.8 26.1 36.7 24.8 27.4 38.3 57.5 21.00 04.20 0 16.8 0 37.8 1 07.2 1 45.0 2 31.2 3 25.8 4 28.7 5 40.0 6 59.5 31.9 26.7 30.0 .1 04.22 16.9 38.0 07.5 45.5 .2 04.24 17.0 38.2 07.8 46.0 .3 04.26 17.0 38.3 08.2 46.5 .4 04.28 17.1 38.5 08.5 47.0 34.1 29.7 33.8 32.6 27.7 33.4 28.7 31.2 32.5 41.6 7 01.5 43.2 03.5 44.8 05.5 46.4 07.5 21.50 04.30 0 17.2 0 38.7 1 08.8 1 47.5 2 34.8 3 30.7 4 35.1 5 48.0 7 09.5 .6 04.32 17.3 38.9 09.1 48.0 35.5 31.6 36.4 49.7 11.5 39.1 09.4 48.5 36.2 32.6 37.6 51.3 04.36 17.4 39.2 09.8 49.0 37.0 33.6 38.9 52.9 .9 04.38 17.5 39.4 10.1 49.5 37.7 34.6 40.2 54.5 .7 04.34 17.4 13.5 15.5 .8 17.5 22.00 04.40 0 17.6 0 39.6 1 10.4 1 50.0 2 38.4 3 35.5 4 41.5 5 56.1 .1 04.42 17.7 39.8 10.7 50.5 39.1 36.5 42.7 58.7 .2 04.44 17.8 40.0 11.0 51.0 39.8 37.5 44.0 59.3 .3 04.46 17.8 40.1 11.4 51.5 40.6 38.5 45.3 6 01.0 .4 04.48 17.9 40.3 11.7 52.0 41.3 39.5 46.6 02.6 22.50 04.50 0 18.0 0 40.5 1 12.0 1 52.5 2 42.0 3 40.5 4 47.9 6 04.2 7 29.4 .6 04.52 18.1 40.7 12.3 53.0 42.7 41.4 49.1 05.8 .7 04.54 18.2 40.9 12.6 53.5 43.4 42.4 50.4 07.4 .8 04.56 18.2 41.0 13.0 54.0 44.2 43.4 51.7 09.0 .9 04.58 18.3 41.2 13.3 54.5 44.9 44.4 53.0 10.7 37.4 31.4 33.4 35.4 7 19.5 21.5 23.5 25.5 27.5 23.50 04.70 0 18.8 0 42.3 1 15.2 1 57.5 2 49.2 3 50.2 5 00.6 16 20.4 .8 .6 04.72 18.9 42.5 15.5 58.0 49.9 51.2 01.9 22.0 .7 04.74 19.0 42.7 15.8 58.5 50.6 52.2 03.2 23.6 53.2 04.5 25.2 54.2 05.7 04.76 19.0 42.8 16.2 16.5 59.0 51.4 59.5 52.1 .9 04.78 19.1 43.0 26.8 1 13.6 1 55.0 2 45.6 3 45.31 54.2 6 12.3 7 39.4 13.9 55.5 46.3 46.3 55.5 13.9 41.4 14.2 56.0 47.0 47.3 56.8 14.6 56.5 47.8 48.3 58.1 15.5 43.4 17.1 45.4 14.9 57.0 48.5 49.2 59.4 18.7 47.4 7 49.4 51.4 53.3 55.3 57.3 436 24.0 .1 .2 .3 .4 24.5 .6 .7 .8 .9 25.0 .1 .2 .3 .4 25.5 .6 .7 .8 .9 26.0 .1 .2 .3 .4 26.5 .6 .7 .8 .9 27.0 .2 .4 .6 .8 28.0 .2 .4 .6 .8 29.0 .2 .4 .6 .8 30.0 .2 .4 .6 .8 31.0 .2 .4 .6 • 32.0 .2 .4 .6 .8 TABLE XV.-DEFLECTION ANGLES FOR 10-CHORD SPIRAL 1 04.84 04.86 04.88 0 04.90 04.92 04.94 04.96 04.98 0 04.80 0 19.2 0 43.21 16.8 04.82 19.3 43.4 17.1 19.4 43.6 17.4 19.4 43.7 17.8 19.5 43.9 18.1 0 05.00 05.02 05.04 05.06 05.08 0 05.10 05.12 05.14 05.16 05.18 05.22 05.24 05.26 05.28 2 0 05.30 05.32 05.34 05.36 0 19.6 19.7 19.8 19.8 19.9 0 20.0 20.1 20.2 20.2 20.3 0 05.80 05.84 05.88 05.92 05.96 0 20.4 20.5 20.6 20.6 20.7 0 21.2 21.3 21.3 21.4 05.38 21.5 0 05.400 21.6 05.44 21.8 05.48 21.9 05.52 22.1 05.56 22.2 0 05.200 20.8 0 20.80 46.8 0 46.8 1 23.2 20.9 47.0 23.5 21.0 47.2 23.8 21.0 47.3 24.2 21.1 47.5 24.5 0 05.60 05.64 0 22.4 22.6 05.68 22.7 05.72 22.9 05.76 23.0 0 23.2 23.4 23.5 23.7 23.8 3 0 24.0 0 06.00 06.04 24.2 06.08 24.3 06.12 24.5 24.6 06.16 4 0 06.40 0 25.6 06.44 25.8 06.48 25.9 06.52 26.1 06.56 26.2 0 44.11 18.4. 44.3 18.7 44.5 19.0 44.6 19.4 44.8 19.7 0 45.01 20.0 45.2 20.3 45.4 20.6 45.5 21.0 45.7 21.3 0 45.91 21.6 46.1 21.9 46.3 22.2 46.4 22.6 46.6 22.9 0 47.71 24.8 47.9 25.1 48.1 25.4 48.2 25.8 48.4 26.1 0 48.6 1 26.4 49.0 27.0 49.3 27.7 49.7 28.3 50.0 29.0 0 50.41 29.6 50.8 30.2 51.1 30.9 51.5 31.5 51.8 32.2 0 52.21 32.8 52.6 33.4 52.9 34.1 53.3 34.7 35.4 53.6 5 2 00.0 2 52.8 00.5 53.5 01.0 54.2 55.0 55.7 01.5 02.0 2 02.5 03.3 03.5 04.0 04.5 2 07.5 08.0 08.5 09.0 09.5 2 05.0 | 3 00.0 05.5 00.7 06.0 01.4 06.5 02.1 07.0 02.9 2 10.0 10.5 11,0 11.5 12.0 2 12.5 13.0 13.5 14.0 14.5 6 2 56.4 57.1 57.8 58.6 59.3 2 20.0 21.0 3 03.6 04.3 05.0 05.8 06.5 0 54.0 1 36.0 2 30.0 54.4 36.6 31.0 54.7 37.3 320 55.1 37.9 33.0 55.4 38.6 34.0 3 07.2 07.9 08.6 09.3 10.1 2 15.0 | 3 14.4 16.0 15.8 17.3 17.0 18.0 18.7 19.0 20.1 3 10.8 11.5 12.2 13.0 13.7 3 21.5 23.0 22.0 24.4 23.0 25.9 24.0 27.3 2 25.0 3 28.8 26.0 30.2 27.0 31.6 28.0 33.1 29.0 34.5 3 35.9 37.4 38.8 40.3 41.7 0 06.20 0 24.8 0 55.81 39.2 2 35.0 3 43.1 06.24 25.0 56.2 39.8 36.0 44.6 06.28 25.1 56.5 40.5 37.0 46.0 06.32 25.3 56.9 41.1 38.0 47.5 06.36 25.4 57.2 41.8 39.0 48.9 0 57.6 1 42.4 2 40.0 3 50.3 58.0 43.0 41.0 51.8 58.3 43.7 42.0 53.2 58.7 44.3 59.0 45.0 43.0 54.7 44.0 56.1 7 3 55.1 56.1 57.1 58.1 59.0 4 00.0 01.0 02.0 03.0 03.9 8 5 07.0 08.3 09.6 11.8 12.8 13.7 10.9 12.1 5 13.4 14.7 16.0 17.2 18.5 4 04.9 5 19.8 05.9 21.1 06.9 22.4 07.9 23.6 08.8 24.9 4 09.8 5 26.2 10.8 27.5 28.7 30.0 31.3 4 14.7 5 32.6 15.7 33.9 16.7 35.1 17.6 36.4 18.6 37.7 4 19.6 5 39.0 20.6 40.2 21.6 41.5 22.5 42.8 23.5 44.1 4 24.5 5 45.4 26.5 47.9 28.4 50.5 30.4 53.0 32.3 55.6 4 34.3 5 58.1 36.2 6 00.7 38.2 03.2 40,2 05.8 42.1 08.3 4 44.1 6 10.8 46.0 13.4 48.0 16.0 49.9 18.5 51.9 21.0 4 53.8 6 23.6 26.2 55.8 57.8 28.8 59.7 } 31.3 5 01.7 33.9 5 03.66 36.4 05.6 39.0 07.5 41.5 09.5 44.0 11.5 46.6 5 13.4 6 49.2 15.4 51.7 54.2 17.3 19.3 56.8 21.2 59.3 9 6 28.4 30.1 31.7 33.3 34.9 6 36.5 38.1 39.7 41.3 43.0 6 44.6 46.2 47.8 49.4 51.0 6 52.7 54.3 55.9 57.5 59.1 7 00.7 02.3 04.0 05.6 07.2 7 08.8 10.4 12.0 13.7 15.3 7 16.9 20.1 23.3 26.6 29.8 7 33.0 36.3 39.5 42.7 45.8 7 49.1 52.3 55.6 58.8 8 02.0 8 05.3 08.5 11.7 15.0 18.2 8 21.4 24.6 27.8 31.0 34.3 8 37.5 40.7 43.9 47.1 50.4 10 7 59.3 8 01.3 03.3 05.3 07.3 8 09.3 11.3 13.3 15.3 17.2 8 19.2 21.2 23.2 25.2 27.2 8 29.2 31.2 33.2 35.2 37.1 8 39.1 41.1 43.1 45.1 47.1 8 49.1 51.1 53.1 55.1 57.0 8 59.0 9 03.0 06.9 10.9 14.9 9 18.9 22.9 26.8 30.8 34.7 9 38.7 42.7 46.7 50.7 54.6 9 58.6 10 02.6 06.5 10.5 14.5 10 18.5 22.5 26.4 30.4 34.3 10 38.3 42.3 46.2 50.2 54.2 437 Δ O 33.00 06.00 .2 06.64 .4 06.68 .6 06.72 .8 06.76 35.0 34.0 0 06.80 .2 06.84 .4 06.88 .6 06.92 .8 06.96 0 07.00 .2 07.04 .4 07.08 .6 07.12 .8 07.16 37.0 .2 TABLE XV.—DEFLECTION ANGLES FOR 10-CHORD SPIRAL 36.0 0 07.20 .2 07.24 .4 07.28 .6 07.32 .8 07.36 1 0 07.40 07.44 .4 07.48 .6 07.52 .8 07.56 .6 .8 38.0 0 07.60 07.64 .2 .4 07.68 39.0 .2 0 07.80 07.84 .4 07.88 .6 .8 41.0 .2 07.72 07.76 40.00 08.00 .2 08.04 .4 08.08 .6 08.12 08.16 .8 07.92 07.96 0 08.20 08.24 .4 08.28 .6 .8 44.0 .2 .4 .6 .8 45.0 08.32 08.36 2 0 08.40 08.44 08.48 0 26.4 0 59.4 26.6 59.8 26.7 1 00.1 26.9 00.5 27.0 00.8 0 27.2 27.4 27.5 27.7 1 01.2 01.6 01.9 02.3 27.8 02.6 0 28.0 1 03.0 28.2 03.4 03.7 28.3 28.5 28.6 0 28.8 29.0 29.1 29.3 29.4 3 0 30.4 30.6 30.7 30.9 31.0 0 29.6 1 06.6 29.8 07.0 29.9 07.3 30.1 07.7 30.2 08.0 42.0 .2 .4 .6 08.52 34.1 .8 08.56 34.2 04.1 04.4 1 04.8 05.2 05.5 05.9 06.2 0 31.2 1 10.2 31.4 10.6 31.5 10.9 31.7 11.3 31.8 11.6 0 33.6 33.8 33.9 1 08.4 08.8 09.1 09.5 09.8 0 32.0 1 12.0 32.2 12.4 32.3 12.7 32.5 13.1 32.6 13.4 0 32.8 1 13.8 33.0 14.2 14.5 33.3 14.9 33.4 15.2 33.1 1 16.0 16.3 4 0 08.60 0 34.4 43.0 .2 34.6 08.64 .4 08.68 34.7 18.1 .6 08.72 08.76 34.9 35.0 18.5 18.8 .8 1 45.6 46.2 46.9 47.5 48.2 1 48.8 49.4 50.1 50.7 51.4 53.3 53.9 54.6 1 55.2 55.8 56.5 57.1 57.8 1 58.4 59.0 5 2 45.0 46.0 3 57.5 59.0 47.0 4 00.4 48.0 01.8 49.0 03.3 2 50.0 51.0 52.0 53.0 16.7 17.0 17.0 1 52.0 2 55.04 11.9 | 5 42.8 5 42.8 52.6 56.0 13.3 44.7 57.0 58.0 59.0 3 05.0 06.0 59.7 07.0 08.0 2 00.3 01.0 09.0 6 3 00.0 01.0 02.0 03.0 04.0 1 4 04.75 33.0 06.2 34.9 07.6 36.9 09.0 38.8 54.0 10.5 40.8 201.6 3 10.0 02.2 11.0 12.0 02.9. 03.5 04.2 4 19.1 20.5 22.0 23.4 24.8 4 26.3 27.7 29.2 30.6 32.0 4 33.5 34.9 36.3 13.0 37.8 14.0 39.2 7 14.8 46.7 16.2 48.6 17.7 50.6 2 04.8 3 15.04 40.7 05.4 16.0 42.1 06.1 17.0 43.5 06.7 45.0 18.0 07.4 19.0 46.4 5 23.2 25.1 27.1 29.1 31.0 2 11.2 3 24.9 4 55,0 11.8 25.9 56.5 12.5 26.9 57.9 13.1 27.9 59.4 13.8 28.9 5 00.8 5 52.5 54.5 56.5 58.4 6 00.4 8 7 01.9 04.5 07.0 09.5 12.1 6 21.9 23.8 25.8 27.7 29.7 7 14.7 17.2 19.7 22.4 24.9 7 27.4 29.9 32.6 35.1 37.6 7 40.2 42.7 45.2 47.8 50.3 6 02.3 04.3 7 52.9 55.5 58.0 08.2 8 00.6 06.2 10.1 03.1 6 12.18 05.6 14.0 08.2 16.0 10.7 18.0 13.3 19.9 15.8 2 08.03 20.0 4 47.9 6 31.6 8 31.1 08.6 20.9 49.3 33.6 33.7 09.3 21.9 50.7 35.5 09.9 22.9 52.2 37.5 10.6 23.9 53.6 39.5 36.2 38.8 41.3 2 14.43 29.9 5 02.2 15.0 30.9 03.7 15.7 31.9 05.1 16.3 32.9 06.5 08.0 33.9 1 17.4 2 17.6 3 34.9 5 09.4 17.8 35.9 10.9 36.9 12.3 19.5 37.9 13.7 06.7 16.9 15.2 08.7 19.5 18.2 700.9 9 09.3 02.9 11.9 04.8 14.4 18.9 20.2 38.9 8 18.4 20.9 23.5 26.0 28.6 6 41.4 8 43.9 43.4 46.4 45.3 49.0 47.3 51.5 49.2 54.0 6 51.18 56.5 53.1 59.1 55.19 01,7 57.0 04.2 59.0 06.8 0 08.80 0 35.2 35.4 5 16.67 10.79 22.0 18.0 12.6 24.6 08.84 08.88 19.5 14.6 27.1 1 19.2 2 20.83 39.9 19.6 21.4 40.9 35.5 19.9 22.1 41.9 08.92 35.7 20.3 22.7 42.9 20.9 08.96 35.8 20.6 23.4 43.9 22.4 0 09.00 0 36.0 1 21.0 2 24.0 3 44.9 5 23.8 16.5 29.7 18.5 32.2 7 20.4 9 34.8 9 8 53.6 56.8 9 00.0 03.2 06.5 9 09.7 12.9 16.1 19.4 22.6 9 25.8 29.0 32.3 35.5 38.7 9 41.9 45.1 48.3 51.6 54.8 9 58.0 10 01.2 04.4 07.6 10.9 10 14.1 17.3 20.5 23.7 26.9 10 46.2 49.4 52.7 55.9 59.1 11 02.3 05.5 08.7 11.9 15.1 10 11 34.4 37.6 40.8 44.0 47.2 10 58.1 11 02.1 06.1 10.0 14.0 11 50.4 53.6 56.8 12 00.0 03.3 12 06.5 11 18.0 21.9 25.9 29.9 33.8 11 37.8 41.7 45.7 49.7 53.6 10 30.1 12 56.9 33.4 13 00.9 36.6 04.8 08.8 39.8 43.0 12.7 11 57.6 12 01.6 05.5 09.5 13.4 12 17.4 21.3 25.3 29.3 33.2 12 37.1 41.1 45.0 49.0 52.9 13 16.7 20.6 24.6 28.5 32.4 11 18.3 13 56.1 21.6 14 00.1 24.8 04.0 08.0 28.0 31.2 11.9 13 36.4 40.4 44.3 48.3 52.2 14 15.8 18.8 23.7 27.7 31.6 14 35.5 39.5 43.4 47.4 51.3 14 55.2 438 DEFLECTION TO CHORD POINT NO. T.S. = 0 -2315 67∞σo 8 9 10 || -2315 12 13 14 15 16 17 18 19 20 NOTES: TABLE XVI.-COEFFICIENTS OF a: FOR DEFLECTIONS TO ANY CHORD POINT ON SPIRAL⭑ 0 9 16 25 36 49 64 81 100 - NOVORO OH 4 40 108 8507 322- ~70- M DIODON HERON AND 2 16 27 3 18 14 10 22 40 36 55 52 72 91 112 70 90 112 4 32 27 20 28 45 5 ││ 0 13 0 0000 00041 OERSESS 64 6 0 19 40 85 76 63 108 88 133 126 7 72 65 56 45 32 54 17 38 DOO NENO 08. 6593 68 72 115 100 160 154 144 130 TRANSIT AT CHORD POINT NUMBER 8 9 10 T 12 13 14 15 128 162 450 434 119 108 476 162 200| 242 288 338 392 152 189 230 275 324 377 140 176 216 260 308 360 416 95 126 161 200 243 290 341 396 455 80 110 144 182 224 224 270 270 320 374 432 63 92 125 203 248 297 350 407 140❘ 180 180❘ 224 272 116 155 198 245 128 170 216 140 185 152 99 68 108 20 44 00DKOM FRONT 72 104 23 50 81 0 26 56 0 29 25 52 28 0 90 62 32 121 130 135 136 58 31 0 144 154 160 162 90 64 34 112 145 124 99 169 180 187 190 189 184 175 162 196 208 216 | 220 220 216| 208 196 180 160 136 225 238 247 252 253 250 243 232 217 198 70 108 256 270| 280 286 288 286 289 304 315 322 325 324 280 319 364 364 360 175 148 270 256 238 216 190 160 310| 297 280 259 | 234 205 352 340 324 304 280 252 361 378 391 400 405 406 403 396 385 370 351 328 | 301 400 418 432 442 448 450 448 442 432 418 400 378 352 324 340 352 360 See examples on next page and theory in Art. 5-7. 35 74 38 0 37 76 O 40 117 82 16 17 18 19 20 512 578 648 800 495 560 629 722 702 779 680 | 756 540 608 518 585 656 731 494 560 630 704 468 468, 533 602 675 0 43 324 296 380 440 504 351410 473 266 320 378 440 234 234 287 344 405 200 252 308 368 117 164 215 270 329 392 459 80 126 176 230 288 350 416 41 86 135 188 245 306 371 44 92 144 200 260 324 O 47 98 153 212 275 125 07858 126 88 46 172 135 94 49 220 184 144 100 270 322 50 0 52 104 53 572 644 540 611 506 | 576 470❘ 539 432 500 235 196 153 106 288 250 208 162 112 162 224 110 171 0 56 116 55 0 59 0 58 DEFLECTION TO CHORD POINT NO. T.S. = 0 -2345 67000 -2MIS Ø7600 8 9 10 || 12 13 14 15 16 17 18 19 20 439 TABLE XVI.-C.-CORRECTIONS TO TABLE XVI FOR LARGE DEFLECTIONS (MINUTES) 15° 68ម 25 32 3333444444 34 36 38 40 41 42 43 44 45 Ratio of 1s 0.6 to Ls 0.7 0.02 0.01 0.02 0.05 0.04 0.10 0.5 0.01 0.01 0.02 0.07 0.03 0.08 0.03 0.10 0.04 0.11 0.29 0.04 0.13 0.34 0.05 0.06 0.06 0.06 0.07 0.16 0.20 0.24 0.16 0.17 0.18 0.88 0.94 1.01 0.19 0.49 1.09 0.21 0.53 1.17 0.07 0.22 0.56 1.25 " 0.8 0.04 0.11 0.21 0.39 0.42 0.46 - 0.37 0.45 0.54 0.64 0.75 0.9 0.09 0.22 0.43 0.74 0.90 1.09 1.29 1.52 1.78 1.91 2.06 *1, length of spiral sighted over S 2.21 2.37 2.54 1.0 0.17 0.41 0.81 1.40 1.70 2.05 2.43 2.86 3.34 3.60 3.87 4.16 4.46 4.77 Table XVI provides a rapid method of obtain- ing deflections to locate any chord point of a spiral from a transit set up at any other point. It is valid for any number of equally-spaced chord points up to twenty, provided that a, is always de- fined as the deflection from the tangent at T.S._to the first chord point. Calculate a₁ from the rela- 204 (in degrees) tion a₁ (in minutes) where n = the number of equal chords in the spiral, n2 For large deflections and long sights the results obtained by using Table XVI should be altered by applying small correc- tions found by interpolation from Table XVI-C. For sights toward the S.C., these corrections are subtracted; for sights toward the T.S., they are added. The source of these corrections is explained in Appendix A. Given: A spiral with L. = 150 ft and ▲=6°, EXAMPLE 1. to be staked as a 3-chord spiral. 20 X 6 9 13.33' Deflections from the tangent at the T.S. are found by multi- plying 13.33′ by the coefficients 1, 4, 9. Local tangent at S.C. is found by turning off deflection of 13.33 × 18=4°00' from backsight to T.S. No corrections are required. a1= EXAMPLE 2. Given: A spiral with Ls=800 ft and ▲ =32°, to be staked as a 20-chord spiral. 20X32 a1 400 = 1.6' "" Deflections from the tangent at the T.S. are found by multi- plying 1.6' by coefficients 0 to 400, found in the column headed "Transit at 0. Corrections vary from -0.5' for chord point 16 to 1.7', for the sight to the S.C. If chord points 13 to S.C. are located from a set-up at point 12, deflections from local tangent are found by multiplying 1.6' by coefficients 37 to 352. The corrections are negligible, the maximum value being +0.08′ for the backsight to the T.S. G 440 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 5www wwww NNNNN ~~~~~ 60 GG FIWW~ ~- 12.0 12.5 13.0 13.5 14.0 14.5 15.0 15.5 16.0 16.5 17.0 17.5 18.0 18.5 19.0 19.5 20 21 22 23 24 25 26 27 28 29 30 32 33 34 35 36 37 38 39 40 BASE 14 26 53 80 107 135 163 193 222 252 282 313 344 376 408 441 474 508 542 576 611 647 682 719 756 793 831 869 907 947 986 1026 1067 1108 1149 1191 1233 1276 1319 1363 1407 1497 1589 1682 1778 1875 1974 2075 2178 2282 TABLE XVII.—LEVEL SECTIONS BASE 16 3307 3431 3556 30 60 91 122 154 186 219 252 285. 319 354 389 424 460 497 533 571 608 647 685 724 764 804 844 885 926 969 1010 1054 1096 1141 1184 1230 1274 1321 1366 1413 1460 1508 1556 1653 1752 1853 1956 2060 2166 2274 2384 2496 2389 2611 2497 2726 2607 2719 2833 2949 3067 3333 3186 3460 3589 CUBIC YARDS PER 100-FT STATION BASE 18 3719 3852 34 68 102 137 172 208 245 281 319 356 395 433 472 512 552 593 634 675 717 759 802 845 889 933 978 1023 1069 1115 1161 1208 1256 1304 1352 1401 1450 1500 1550 1601 1652 1704 1808 2833 2956 2844 3081 2964 3208 3085 3337 2245 2359 2475 2593 2712 3208 3468 3600 3734 3870 4008 4148 BASE 20 37 75 113 152 191 231 271 311 352 394 435 478 521 564 608 652 696 742 787 833 880 927 974 1022 1071 1119 1169 1219 1269 1352 1964 1915 2078 2023 2194 2133 2311 1319 1371 1422 1474 1527 1580 1633 1687 1742 1797 2431 2552 2675 2800 2927 BASE 24 45 90 135 181 3727 3867 4008 4152 4297 4444 228 275 322 370 419 468 517 567 617 668 719 770 822 875 928 981 1035 1090 1144 1200 1256 1312 1369 1426 1484 1542 1600 1659 1719 1779 1839 1900 1961 2023 2085 2148 2275 2404 2534 2667 2801 2937 3075 3215 3356 3056 3186 3319 3793 BASE 30 56 112 169 226 4245 4400 4556 4715 4875 5037 284 342 400 459 519 579 639 700 761 823 885 948 1011 1075 1139 1204 1269 1334 1400 1467 1534 1601 1669 1737 1806 1875 1945 2015 2085 2157 2228 2300 2593 2742 2893 3045 3200 3357 3514 3675 3837 4001 3500 4167 3645 4334 4504 3453 3942 4675 3589 4093 4848 BASE 40 74 149 224 300 5742 5926 376 453 530 607 685. 764 843 922 1002 1083 1163 1245 1326 1408 1491 1574 1658 1742 1826 1911 2373 3058 2445 3149 2519 3241 1996 2082 2169 2256 2343 2431 2519 2607 2696 2786 2876 2967 3333 3520 3707 3897 4089 4282 4478 4675 4874 5075 5278 5482 5689 5897 6108 5023 6320 5200 6533 5379 6749 5559 6967 7186 7407 1/4:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 11.11 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 ||||| 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 441 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 12.0 12.5 13.0 13.5 14.0 14.5 15.0 15.5 16.0 16.5 17.0 17.5 18.0 18.5 19.0 19.5 20 O-23I DON∞0 21 22 23 24 25 26 27 28 29 30 31 32 33 34 MMM 35 36 37 38 39 40 BASE 14 26 54 82 111 141 172 204 237 271 306 341 378 415 454 493 533 575 617 660 704 749 794 841 889 937 987 1037 1089 1141 194 1249 1304 1360 1417 1475 1533 1593 1654 1715 1778 1906 2037 2172 2311 2454 2600 2750 2904 3061 3222 3387 3556 3728 3904 4083 4267 4454 4644 TABLE XVII.—LEVEL SECTIONS BASE 16 30 61 93 126 160 194 230 267 304 343 382 422 463 506 549 593 638 683 730 778 826 876 926 978 1030 1083 1138 1193 1248 1306 1363 1422 1482 1543 1604 1667 1730 1794 1860 1926 2061 2200 2343 2489 2639 2793 2950 3111 3276 3444 3617 3793 3972 4156 4343 4533 4728 4926 4839 5128 5037 5333 BASE 18 CUBIC YARDS PER 100-FT STATION 34 69 104 141 178 217 256 296 338 380 423 467 512 557 604 652 700 750 800 852 904 957 1012 1067 1123 1180 1238 1296 1356 1417 1478 1541 1604 1669 1734 1800 1867 1935 2004 2074 2217 2363 2513 2667 2824 2985 3150 3319 3491 3667 3846 4030 4217 4407 4602 4800 5002 5207 5417 5630 BASE 20 38 76 115 156 197 239 282 326 371 417 463 511 560 609 660 711 763 817 871 926 982 1039 1097 1156 1215 1276 1338 1400 1463 1528 1593 1659 1726 1794 1863 1933 2004 2076 2149 2222 2372 2526 2683 2844 3009 3178 3350 3526 3706 3889 4076 4267 4461 4659 4861 5067 5276 5489 5706 5926 BASE 24 45 91 138 185 234 283 334 385 438 491 545 600 656 713 771 830 889 950 1012 1074 1138 1202 1267 1333 1400 1469 1538 1607 1678 1750 1823 1896 1971 2046 2123 2200 2278 2357 2438 2519 2683 2852 3024 3200 3380 3563 3750 3941 4135 4333 4535 4741 4950 5163 5380 5600 5824 6052 6283 6519 BASE 30 56 113 171 230 289 350 412 474 538 602 667 733 800 869 938 1007 1078 1150 1223 1296 1371 1446 1523 1600 1678 1757 1838 1919 2000 2083 2167 2252 2338 2424 2512 2600 2689 2780 2871 2963 3115 3341 3535 3733 3935 4141 4350 4563 4780 5000 5224 5452 5683 5919 6157 6400 6646 6896 7150 7407 BASE 40 75 150 226 304 382 461 541 622 704 787 871 956 1041 1128 1215 1304 1393 1483 1575 1667 1760 1854 1949 2044 2141 2239 2338 2437 2538 2639 2741 2844 2949 3054 3160 3267 3375 3483 3593 3704 3928 4156 4387 4622 4861 5104 5350 5600 5854 6111 6372 6637 6906 7178 7454 7733 8017 8304 8594 8889 1/2:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 | | . || 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 || | . || 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 442 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 12.0 12.5 13.0 13.5 14.0 14.5 15.0 15.5 16.0 16.5 17.0 17.5 18.0 18.5 19.0 19.5 22222222 20 21 22 22222 222 Mongo ƆMM MMMM 567 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 BASE 14 27 250 56 81 119 153 189 227 267 308 352 397 444 494 544 597 652 708 767 827 889 953 1019 1086 156 1227 1300 1375 1452 1531 1611 1694 1778 1864 1952 TABLE XVII.—LEVEL SECTIONS BASE 16 31 63 97 133 171 211 253 4889 5167 5452 5744 6044 296 342 389 438 489 542 596 653 711 771 833 897 963 1031 1100 1171 1244 1319 1396 1475 1556 1638 1722 1808 1896 1986 2078 2042 2171 2133 2267 2227 2364 2322 2463 2419 2564 3611 3852 4044 4100 4300 4356 4563 4619 4833 CUBIC YARDS PER 100-FT STATION 5111 5396 5689 5989 6296 BASE 18 6352 6611 6667 6933 6989 7263 7319 7656 7600 7944 8000 8296 34 70 108 148 190 233 279 326 375 426 479 533 590 648 708 770 834 900 968 1037 1108 1181 1256 1333 2519 2667 2722 2878 2933 3096 3259 3152 3322 3493 3378 3556 3733 1412 1493 1575 1659 1745 1833 1923 2015 2108 2204 2301 2400 2501 2604 2708 3796 3981 4237 4500 4770 5048 2815 3033 5333 5626 5926 6233 6548 6870 7200 7537 7881 8233 8593 BASE 20 38 78 119 163 208 256 305 356 408 463 519 578 638 700 764 830 897 967 1038 1111 1186 1263 1342 1422 | 505 1589 1675 1763 1853 1944 2038 2133 2231 2330 2431 2533 2638 2744 2853 2963 3189 3422 3663 3911 4167 4430 4700 4978 5263 5556 5856 6163 6478 6800 7130 7467 7811 8163 8522 8889 BASE 24 45 93 142 193 245 300 356 415 475 537 601 667 734 804 875 948 1023 1100 1179 1259 1342 1426 1512 1600 1690 1781 1875 1970 2068 2167 2268 2370 2475 2581 2690 2800 2912 3026 3142 3259 3500 3748 4004 4267 4537 4815 5100 5393 5693 6000 6315 6637 6967 7304 7648 8000 8359 8726 9100 9481 BASE 30 56 115 175 237 301 -367 434 504 575 648 723 800 879 959 1042 1126 1212 1300 1390 1481 1575 1670 1768 1867 1968 2070 2175 2281 2390 2500 2612 2726 2842 2959 3079 3200 3323 3448 3575 3704 3967 4237 4515 4800 6667 7004 BASE 40 8426 8800 9181 75 152 231 311 9570 9967 10370 394 478 564 652 742 833 927 1022 1119 1219 1319 1422 1527 1633 1742 1852 1964 2078 2194 2311 2431 2552 2675 2800 2927 3056 3186 3319 3453 3589 3727 3867 4008 4152 4297 5093 6019 5393 6356 5700 6015 6337 4444 4744 5052 5367 5689 7778 8152 7348 8533 7700 8922 8059 9319 6700 7052 7411 9722 10133 10552 10978 [1411 11852 1:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 11.11 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 |||.|| 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 443 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 12.0 12.5 13.0 13.5 NMMIT DOWN N'occio 22222 20700 E COM 14.0 14.5 15.0 15.5 16.0 16.5 17.0 17.5 18.0 18.5 19.0 19.5 20 21 23 26 28 29 30 31 32 33 im MMMMM= 34 35 36 37 38 39 40 BASE 14 25 27 57 90 126 164 206 250 296 346 398 453 511 572 635 701 770 841 917 994 1074 1157 1243 1331 1422 1516 1613 1713 1815 1920 2028 2138 2252 2368 2487 2609 2733 2861 2991 3124 4769 5104 5450 5807 6176 TABLE XVII.-LEVEL SECTIONS 7761 8185 BASE 16 8620 9067 9524 9993 31 65 101 141 183 228 275 326 379 435 494 556 620 687 757 830 905 983 1064 1148 1235 1324 1416 1511 1609 1709 1813 1919 2027 2139 2253 2370 2490 2613 3259 3407 3539 3694 3830 3993 4131 4302 4444 4622 2738 2867 6556 6946 7348 7585 8006 8437 4954 5296 5650 6015 6391 CUBIC YARDS PER 100-FT STATION BASE 18 8880 9333 9798 10274 10761 10472 10963 11259 35 72 113 156 201 250 301 356 413 472 535 600 668 739 813 889 968 1050 1135 1222 1313 1406 1501 1600 2868 3000 2998 3135 3131 3272 3268 3413 1701 1806 1913 2022 2135 2250 2368 2489 2613 2739 4472 4800 5139 5489 5850 6222 6606 6778 7000 7176 7406 7822 8250 8689 9139 9600 10072 10556 BASE 20 | 1050 11556 38 80 124 170 220 272 327 385 446 509 575 644 716 791 868 948 1031 1117 1205 1296 1390 1487 3556 3704 3850 4006 4156 4319 4643 4978 1587 1689 1794 1902 2013 2126 2242 2361 2483 2607 2735 2865 2998 3133 3272 3413 3557 5324 5681 6050 6430 6820 7222 7635 8059 8494 8941 BASE 24 46 94 146 200 257 317 379 444 513 583 657 733 813 894 979 1067 1157 1250 1346 1444 1546 1650 1757 1867 2213 2333 2457 2583 2713 2844 2979 3117 3257 3400 3546 3694 3846 4000 4317 4644 4983 5333 5694 6067 6450 6844 7250 1979 2257 2094 2383 2513 7667 8094 BASE 30 57 117 179 244 9398 9917 9867 10400 10346 10894 10837 11400 313 383 457 533 613 694 779 867 957 1050 1146 1244 1346 1450 1557 1667 1779 1894 2013 2133 2644 2779 2917 3057 3200 3346 3494 3646 3800 3957 4117 4279 4444 4783 5133 5494 5867 6250 6644 7050 7467 7894 8333 8783 9244 9717 8533 8983 9444 10200 10694 I 1200 BASE 40 75 154 235 319 405 494 587 681 779 880 983 1089 1198 1309 1424 1541 1661 1783 1909 2037 2168 2302 2438 2578 2720 2865 3013 3163 3316 3472 3631 3793 3957 4124 4294 4467 4642 4820 5001 5185 5561 5948 6346 6756 7176 7607 8050 8504 8969 9444 9931 10430 10939 11459 11991 12533 13087 11717 12244 13652 11339 11917 12783 14228 11852 12444 13333 14815 112:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 11.11 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 ||| . || 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 444 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 12.0 12.5 13.0 13.5 14.0 14.5 15.0 15.5 16.0 16.5 17.0 17.5 18.0 18.5 19.0 19.5 20 20 21 22 23 24 ~~~~~ MMMMM MMMMMI 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 BASE 14 28 59 94 133 176 222 272 326 383 444 509 578 650 726 806 889 976 1067 1161 1259 1361 1467 1576 1689 1806 1926 2050 2178 2309 2444 2583 2726 2872 3022 3176 3333 3494 3659 3828 4000 4356 4730 5111 5511 TABLE XVII.—LEVEL SECTIONS BASE 16 31 67 106 148 194 244 298 356 417 481 550 622 698 778 861 948 1039 1133 1231 1333 1439 1548 1661 1778 1898 2022 2150 2556 2698 2844 2994 3148 3306 3467 3631 3800 3972 4148 4511 4889 5281 5689 5926 6111 6356 6548 6800 7000 7467 7259 7733 7948 CUBIC YARDS PER 100-FT STATION 8444 8956 9481 BASE 18 35 74 1991 2119 2250 2281 2385 2417 2524 117 163 213 267 324 385 450 519 591 667 746 830 917 1007 1102 1200 1302 1407 1517 1630 1746 1867 2667 2813 2963 3117 3274 3435 3600 4296 4667 5052 5452 5867 6296 6741 7200 7674 8163 8222 8667 8726 9185 9244 9719 9778 10022 10267 10326 10578 10830 BASE 20 10889 11467 I 2059 12333 12607 12667 12948 13230 13289 13578 13867 39 81 128 178 231 289 350 415 483 556 631 711 794 881 972 1067 1165 3565 3733 3769 3906 3941 4081 4117 4261 1267 1372 1481 1594 1711 1831 1956 2083 2215 2350 2469 2631 2778 2928 3081 3239 3400 4444 4822 5215 5622 6044 6481 6933 7400 7881 8378 8889 9415 9956 10511 11081 11148 11407 11667 11733 12000 12267 12881 13511 14156 13926 14222 14519 14815 BASE 24 46 96 150 207 269 333 402 474 550 630 714 800 891 985 1083 1185 1291 1400 1513 1630 1750 1874 2002 2133 2696 2846 3000 3157 3319 3483 3652 3824 4000 4741 5133 5541 5963 6400 2269 2546 2407 2696 2550 2850 3007 3169 6852 7319 7800 8296 8807 BASE 30 9333 9874 10430 11000 I 1585 57 119 183 252 12185 12800 13430 14074 14733 324 400 480 563 650 741 835 933 1035 1141 1250 1363 1 480 1600 1724 4180 4591 4363 4785 4550 4983 3333 3502 3674 3850 4030 4213 4400 5185 5600 6030 6474 6933 1852 2222 1983 2372 2119 2526 2257 2683 2400 2844 7407 7896 8400 8919 9452 BASE 40 12963 13600 14252 14919 76 156 239 326 15600 15407 16296 417 511 609 711 817 926 1039 | 156 1276 1400 1528 1659 1794 1933 2076 3009 3178 3350 3526 3706 3889 4076 4267 4461 4659 4861 5067 5276 5489 5706 5926 6378 6844 7326 7822 10000 ||||| 10563 11711 11141 12326 11733 12956 12341 13600 8333 8859 9400 9956 10526 1 4259 14933 | 5622 16326 17044 17778 2:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 11.11 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 ||| . || 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 445 HEIGHT 0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 5.5 6.0 6.5 7.0 7.5 8.0 8.5 9.0 9.5 10.0 10.5 11.0 11.5 12.0 12.5 13.0 13.5 14.0 14.5 15.0 15.5 16.0 16.5 17.0 76000 ~~~~~ ~~~~~ MMMMM MMMMM= 17.5 18.0 18.5 19.0 19.5 20 21 22 wwwww N 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 BASE 14 29 63 103 148 199 256 318 385 458 537 621 711 806 907 1014 1126 1244 1367 1495 1630 1769 1915 2066 2222 2384 2552 2725 2904 3088 4310 4533 4762 4996 5236 TABLE XVII.-LEVEL SECTIONS BASE 16 8241 8859 32 70 114 163 218 278 344 415 492 574 662 756 855 959 1069 1185 1306 1433 1566 1704 1847 1996 2150 2311 3278 3389 3473 3588 3674 3793 3881 4003 4093 4219 2477 2648 2825 3007 3195 4440 4667 4899 5137 5381 5481 5630 5989 6144 6519 6681 7241 7070 7644 7822 CUBIC YARDS PER 100-FT STATION 9500 10163 10370 10848 11063 BASE 18 36 78 125 178 236 300 369 444 525 611 703 800 903 1011 1125 1244 1369 1500 1636 1778 1925 2078 2236 2400 2569 2744 2925 3111 3303 3500 3703 3911 4569 4800 5036 5278 5525 5778 6300 6844 7411 8000 8426 9052 9700 9900 10578 11278 8611 9244 BASE 20 40 85 136 193 255 322 395 474 558 648 744 844 951 1063 1181 1304 1432 1567 1706 1852 2003 2159 4125 4247 4344 4470 2321 2489 2662 2841 3025 3215 3410 3611 3818 4030 4699 4933 5173 5419 5669 5926 6456 7007 7581 8178 8796 9437 10100 10785 11493 BASE 24 12285 12515 13037 13274 13811 14056 14607 14859 15111 15363 47 100 158 222 292 367 447 533 625 722 825 933 1047 1167 1292 1422 1558 1700 1847 2000 2158 2322 2492 2667 2847 3033 3225 3422 3625 3833 4047 4267 4492 4722 4958 5200 5447 5700 5958 6222 6767 7333 7922 8533 11556 11778 12000 12222 12667 12744 13511 12974 13433 13748 14222 14300 14544 15033 15426 15685 16267 16533 17130 17404 15867 15944 16204 16722 16800 17067 17600 17678 17952 18500 18015 18296 18578 18859 19422 18922 19211 19500 19789 19852 20148 20444 20367 20741 21333 BASE 30 58 122 192 267 347 433 525 622 725 833 947 1067 1192 1322 1458 1600 1747 1900 2058 2222 2392 2567 2747 2933 3125 3322 3525 3733 3947 4167 4392 4622 4858 5100 5347 5600 5858 6122 6392 6667 7233 7822 8433 9067 9167 9722 9822 10400 10500 11100 11200 11922 13333 14122 BASE 40 77 159 247 341 14933 15767 440 544 655 770 892 1019 1151 1289 1432 1581 1736 1896 2062 2233 2410 2593 2781 2974 3173 3378 3588 3804 4025 4252 4484 4722 4966 5215 5469 5730 5995 6267 6544 6826 7114 7407 8011 8637 9285 9956 11822 12859 12567 13641 10648 11363 12100 14444 15270 16119 16989 16622 17881 18796 17500 18400 19733 19322 20693 20267 21674 22678 22222 23704 21233 3:1 PER FT OF ADDED BASE 1.85 3.70 5.56 7.41 9.26 11.11 12.96 14.81 16.67 18.52 20.37 22.22 24.07 25.93 27.78 29.63 31.48 33.33 35.18 37.04 38.89 40.74 42.59 44.44 46.30 48.15 50.00 51.85 53.70 55.56 57.41 59.26 61.11 62.96 64.82 66.67 68.52 70.37 72.22 74.07 77.78 81.48 85.19 88.89 92.59 96.30 100.00 103.70 107.41 ||1.11 114.81 118.52 122.22 125.93 129.63 133.33 137.04 140.74 144.44 148.15 446 The coefficients in the tables on the opposite page provide a rapid method of correcting the level-section quantities of Table XVII for transverse ground slopes. .b. or From the figure, Similarly, 21 which reduces to $ b di==+sc+ 2 dr= dr b 2 + sc 1- b SG 100 +sc SG 100 1+- C sd G 100 G 100 dr. d.G A = AL + 1 ( +sc) ( 100 ) − 1 ( +) (100) - -sc 212 A = AL+260 (2 +sc) (dı−d,) 2002 From equation 6-3, the area of the level section is AL= c(b+cs). On a transverse slope, the level-section area is in- creased by one triangular area and decreased by another, as shown by the cross-hatched areas in the figure. The resulting net area A is (1) 33 (+2) (0) [ ] 1002 -s2 G (2) (3) When equations 1 and 2 are substituted in equation 3, the net area A reduces to A=AL+(c+; Therefore, 2 Cr Cu yd per 100 ft = level-section yardage+ c(c+1) 3 (4) 447 BASE b 14 16 18 20 24 30 40 50 60 GROUND SLOPE G TABLE XVII -A. VALUES OF b/2s where :1 28 32 36 40 48 60 80 100 120 2:1 14 16 18 20 24 30 28988 40 50 60 SIDE SLOPE RATIO, s 1:1 7 8 9 10 12 15 20 25 30 12:1 4.67 5.33 6 6.67 8 10 SIDE SLOPE RATIO, $ 4:1 2:1 1:1 1:1 5% 0.0001 0.0012 0.0093 0.0313 10% 0.0006 0.0046 0.0374 0.1278 15% 0.0013 0.0105 0.0852 0.2962 20% 0.0023 0.0187 0.1543 0.5494 25% 0.0036 0.0294 0.2469 0.9090 30% 0.0052 0.0426 0.3663 1.411 35% 0.0071 0.0585 0.5170 2.113 40% 0.0093 0.0771 0.7054 3.125 45% 0.0119 0.0988 0.9405 4.650 50% 0.0147 0.1234 1.235 7.143 60% 2.083 0.0213 0.1831 70% 0.0292 0.2585 3.557 80% 0.0386 0.3526 6.584 90% 0.0494 0.4702 15.79 100% 0.0617 0.6172 13.3 16.7 20 TABLE XVII.-B. VALUES OF C 23.68 100 C-(199) [(0) --] с 27 1002 s2 = 2:1 3.50 4 4.50 5 6 7.5 10 12.5 15 2:1 0.0748 0.3086 0.7325 1.411 2.469 4.167 7.117 13.17 31.58 3:1 2.33 2.67 3 3.33 4 5 6.67 8.33 10 3:1 0.2558 1.099 3.821 6.250 14.29 47.37 Example. Given: a cross section on a uniform transverse ground slope G of 20%. Other data are: base b=30 ft; center cut or fill c=15 ft; side slope ratio s= =1:1. From Table XVII, Level-section quantity =2917 cu yd per sta. From Tables XVII-A and XVII.-B, Correction for slope (15+10)2(0.5494) 343 cu yd per sta. Yardage corrected for slope=3260 cu yd per sta. 448 HEIGHT OR WIDTH 0.1 0.09 .2 0.19 0.28 0.37 .3 = .4 0.5 .6 .7 .8 .9 1.0 .I •~34 567 .2 .3 .4 1.5 .6 .7 .8 .9 2.0 .2 .3 E SO780 .4 2.5 .6 .7 1.85 .I 1.94 2.04 2.13 .8 .9 3.0 . I .2 .3 = 56 | .4 3.5 .6 .7 4.0 .I 234 .2 .3 .4 TABLE XVIII.-TRIANGULAR PRISMS. CUBIC YARDS 1 0.46 0.56 0.65 0.74 0.83 •234 56769 0.93 1.02 5.5 .6 .7 .8 .9 1.11 3.24 3.33 3.43 .8 3.52 .9 3.61 1.20 1.30 1.39 1.48 1.57 1.67 1.76 2.22 2.31 2.41 2.50 2.59 2.69 2.78 2.87 2.96 3.06 3.15 4.5 .6 .7 .8 4.44 .9 4.54 3.70 3.80 3.89 3.98 4.07 4.17 4.26 4.35 2 0.19 0.37 0.56 0.74 0.93 1.11 1.30 1.48 1.67 1.85 2.04 2.22 2.41 2.59 2.78 2.96 3.15 3.33 3.52 4.63 4.81 5.00 5.19 5.37 3 5.56 5.74 5.93 6.11 6.30 0.28 0.56 0.83 1.11 1.39 1.67 1.94 2.22 2.50 2.78 3.06 3.33 3.61 3.89 3.70 5.56 3.89 5.83 4.07 6.11 4.26 6.39 4.44 6.67 4.17 4.44 4.72 5.00 5.28 8.61 8.89 9.17 9.44 6.48 9.72 6.67 10.00 6.85 7.04 10.56 7.22 10.83 7.41 11.11 7.59 11.39 7.78 11.67 7.96 11.94 8.15 12.22 5.0 4.63 .I 4.72 .2 4.81 .3 9.26 13.89 9.44 14.17 9.63 14.44 4.91 9.81 14.72 .4 5.00 10.00 15.00 PER 50 FEET 8.33 12.50 8.52 12.78 8.70 13.06 8.89 13.33 9.07 13.61 WIDTH OR HEIGHT 0.37 0.74 1.11 1.48 6.94 9.26 7.22 9.63 7.50 10.00 7.78 10.37 8.00 10.74 1.85 2.22 2.59 2.96 3.33 8.33 11.11 11.48 11.85 12.22 12.59 3.70 4.07 4.44 4.81 5.19 5.56 5.93 6.30 6.67 7.04 7.41 7.78 8.15 8.52 8.89 12.96 13.33 10.28 13.70 14.07 14.44 14.81 15.19 15.56 15.93 16.30 18.52 18.89 19.26 19.63 20.00 5.09 10.19 15.28 5.19 10.37 15.56 5.28 10.56 15.83 21.11 20.37 20.74 5.37 10.74 16.11 21.48 5.46 10.93 16.39 21.85 5 0.46 0.93 1.39 1.85 2.31 2.78 3.24 3.70 4.17 4.63 5.09 5.56 6.02 6.48 6.94 7.41 7.87 8.33 8.80 16.67 20.83 17.04 21.30 17.41 21.76 17.78 18.15 18.52 19.98 19.44 19.91 20.37 6 0.56 1.11 1.67 2.22 9.26 9.72 10.19 12.22 10.65 12.78 |.|| 13.33 22.22 22.69 2.78 3.33 3.89 23.15 23.61 24.07 4.44 5.00 24.54 25.00 5.56 6.11 6.67 7.22 7.78 16.20 19.44 16.67 20.00 17.13 20.56 17.59 18.06 25.46 25.93 26.39 26.85 27.31 7 0.65 1.30 11.57 13.89 16.20 12.04 14.44 16.85 12.50 15.00 17.50 12.96 15.56 18.15 13.113 !6.!! 18.80 1.94 2.59 8.33 8.89 9.44 10.00 11.67 10.56 12.31 13.89 16.67 19.44 14.35 17.22 20.09 14.81 17.78 20.74 15.28 18.33 21.39 15.74 18.89 22.04 3.24 3.89 4.54 5.19 5.83 6.48 7.13 7.78 8.43 9.07 11.11 12.96 11.67 9.72 10.37 11.02 26.11 26.67 27.22 13.61 14.26 14.91 15.56 22.69 23.33 23.98 21.11 24.63 21.67 25.28 22.22 25.93 22.78 26.57 23.33 23.89 24.44 27.22 27.87 28.52 25.00 29.17 25.56 29.81 30.46 8 0.74 1.48 30.56 35.65 31.11 36.30 31.67 2.22 2.96 3.70 4.44 5.19 5.93 6.67 7.41 8.15 8.89 9.63 10.37 ||.|| 11.85 12.59 13.33 14.07 18.52 19.26 20.00 20.74 21.48 22.22 22.96 23.70 24.44 25.19 25.93 26.67 27.41 28.15 28.89 29.63 30.37 14.81 16.67 15.56 17.50 16.30 18.33 17.04 19.17 17.78 20.00 31.11 31.85 32.59 33.33 34.07 34.81 31.11 35.56 31.76 36.30 38.52 39.26 40.00 9 40.74 41.48 36.94 42.22 0.83 1.67 2.50 3.33 32.22 37.59 42.96 32.78 38.24 43.70 4.17 5.00 5.83 6.67 7.50 8.33 9.17 10.00 10.83 11.67 12.50 13.33 14.17 15.00 15.83 20.83 21.67 22.50 23.33 24.17 25.00 25.83 26.67 27.50 28.33 29.17 30.00 30.83 31.67 32.50 27.78 32.41 37.04 41.67 28.33 33.06 37.78 42.50 28.89 33.70 43.33 29.44 34.35 44.17 30.00 35.00 45.00 33.33 34.17 35.00 35.83 36.67 37.50 38.33 39.17 40.00 40.83 45.83 46.67 47.50 48.33 49.17 449 HEIGHT OR WIDTH 0-23= 6.0 . I .2 .3 .4 5678 σ 6.5 .6 .7 .8 .9 7.0 .2 .3 = 56 4 7.5 6.48 . Į 6.57 6.67 6.76 6.85 .6 234 .3 8.5 .6 .7 .I .2 .3 ~MI 56 .4 9.5 TABLE XVIII.-TRIANGULAR PRISMS. CUBIC YARDS 1 6.94 13.89 20.83 .7 21.67 7.04 14.07 21.11 7.13 14.26 21.39 .8 7.22 14.44 .9 7.31 14.63 8.0 7.41 14.81 7.50 15.00 21.94 .2 7.59 15.19 .6 · 5.56 5.65 11.11 11.30 5.74 11.48 5.83 11.67 5.93 11.85 6.02 6.11 6.20 6.30 6.39 22.22 22.50 22.78 7.69 15.37 23.06 .4 7.78 15.56 23.33 ~MI NO76a .3 .7 8.98 2 9.0 8.33 8.43 8.52 8.61 17.22 25.83 8.70 17.41 26.11 .8 9.07 9.17 8.80 8.89 .8 12.04 12.22 12.41 12.59 12.78 3 16.67 16.94 9.54 18.06 18.33 18.61 18.89 19.17 12.96 19.44 13.15 19.72 13.33 20.00 13.52 20.28 13.70 20.56 17.22 22.96 17.50 17.78 7.87 15.74 15.93 7.96 8.06 16.11 23.61 31.48 23.89 31.85 24.17 16.30 ! 24.44 16.48 32.22 .8 8.15 32.59 .9 8.24 24.72 32.96 .9 10.0 9.26 18.52 27.78 .I 9.35 18.70 28.06 16.67 25.00 16.85 25.28 17.04 25.56 .2 9.44 18.89 28.33 .9 10.09 20.19 .4 9.63 19.26 28.89 PER 50 FEET 4 WIDTH OR HEIGHT 22.22 22.59 23.33 23.70 20.37 30.56 20.56 20.74 20.93 21.11 24.07 24.44 24.81 25.19 25.56 25.93 26.30 26.67 27.04 27.41 27.78 28.15 28.52 28.89 29.26 17.59 26.39 35.19 17.78 26.67 35.56 17.96 26.94 35.93 18.15 27.22 36.30 18.33 27.50 36.67 29.63 30.00 30.37 30.74 31.11 10.5 38.52 19.44 29.17 38.89 .6 9.81 19.63 29.44 39.26 9.72 .7 9.91 19.81 29.72 39.63 10.00 20.00 30.00 40.00 30.28 40.37 40.74 30.83 41.11 31.11 41.48 31.39 41.85 31.67 42.22 6 27.78 33.33 28.24 33.89 5 28.70 29.17 29.63 30.09 30.56 31.02 31.48 31.94 32.41 32.87 33.33 33.80 34.26 34.72 35.19 35.65 36.11 36.57 37.04 37.50 37.96 38.43 38.89 33.33 41.67 33.70 42.13 34.07 34.44 34.81 37.04 46.30 37.41 46.76 37.78 47.22 19.07 28.61 38.15 47.69 40.28 40.74 41.20 42.59 43.06 43.52 43.98 44.44 44.91 45.37 45.83 34.44 35.00 35.56 39.35 47.22 39.81 47.78 36.11 36.67 37.22 37.78 38.33 50.93 51.39 51.85 38.89 39.44 40.00 40.56 41.11 44.44 45.00 45.56 46.11 46.67 48.33 48.89 49.44 41.67 48.61 42.22 49.26 42.78 49.91 43.33 50.56 43.89 51.20 50.00 50.56 51.1 51.67 52.22 52.78 53.33 53.89 54.44 55.00 48.15 48.61 58.33 49.07 58.89 49.54 50.00 50.46 7 11.0 10.19 .1 10.28 .2 10.37 .3 10.46 10.56 10.65 21.30 31.94 42.59 53.24 63.89 .4 11.5 .6 10.74 21.48 32.22 42.96 .7 10.83 21.67 32.50 43.33 54.17 65.00 .8 10.93 21.85 32.78 43.70 54.63 .9 11.02 22.04 33.06 44.07 55.09 53.70 64.44 65.56 66.11 38.89 39.54 40.19 40.83 41.48 47.41 42.13 42.78 43.43 44.07 44.72 61.11 61.67 62.22 52.31 62.78 52.78 63.33 45.37 46.02 46.67 8 44.44 45.19 45.93 51.67 46.67 52.50 53.33 51.85 52.59 53.33 48.15 54.17 48.89 55.00 49.63 55.83 50.37 56.67 51.11 57.50 51.85 59.26 52.50 60.00 53.15 60.74 53.80 61.48 54.44 62.22 71.30 71.94 47.31 54.07 47.96 54.81 61.67 55.56 56.30 57.04 57.78 58.52 72.59 73.24 73.89 55.09 62.96 55.74 63.70 56.39 64.44 57.04 65.19 57.69 55.56 64.81 74.07 56.11 65.46 74.81 56.67 66.11 75.56 57.22 66.76 76.30 57.78 67.41 77.04 9 61.57 62.22 62.87 63.52 72.59 64.17 73.33 50.00 50.83 71.11 71.85 58.33 59.17 60.00 60.83 70.83 71.67 72.50 73.33 65.93 74.17 58.33 66.67 75.00 58.98 67.41 75.83 59.63 68.15 76.67 60.28 68.89 77.50 60.93 69.63 78.33 81.48 82.22 82.96 83.70 84.44 62.50 63.33 64.17 65.00 65.83 66.67 67.50 68.33 70.37 79.17 80.00 80.83 69.17 70.00 68.06 77.78 68.70 78.52 59.44 69.35 79.26 89.17 60.00 70.00 80.00 90.00 60.56 70.65 80.74 90.83 81.67 82.50 83.33 84.17 85.00 85.83 86.67 87.50 88.33 91.67 92.50 93.33 94.17 95.00 74.54 85.19 95.83 75.19 85.93 96.67 97.50 75.83 86.67 76.48 87.41 98.33 77.13 88.15 99.17 450 HEIGHT OR WIDTH 12.0 .1 .2 .3 .4 12.5 .6 .7 .8 .9 13.0 234 SU .3 .4 12.04 .1 12.13 13.5 .6 .7 .8 .9 14.0 .2 12.22 24.44 JMI .3 15.5 .6 .7 TABLE XVIII.-TRIANGULAR PRISMS. CUBIC YARDS 1 .8 .9 | | . || 11.20 11.30 11.39 11.48 16.5 2 233 567∞a 22.22 22.41 11.57 23.15 11.67 23.33 11.76 23.52 11.85 23.70 11.94 23.89 12.50 12.59 12.69 12.78 12.87 12.96 25.93 .I 13.06 26.11 .2 .3 .4 22.59 33.89 22.78 34.17 22.96 34.44 24.07 24.26 3 33.33 33.61 34.72 35.00 35.28 35.56 35.83 12.31 24.63 12.41 24.81 37.22 14.5 13.43 .6 13.52 .7 13.61 .8 13.70 27.41 .9 13.80 15.0 13.89 27.78 41.67 .1 13.98 27.96 41.94 14.07 28.15 14.17 28.33 42.50 .2 .4 14.26 28.52 42.78 25.00 37.50 25.19 37.78 25.37 25.56 25.74 38.89 39.17 13.15 26.30 39.44 13.24 26.48 39.72 26.67 40.00 13.33 26.85 40.28 27.04 40.56 27.22 40.83 41.11 27.59 41.39 PER 50 FEET 4 50.00 50.37 38.06 50.74 38.33 51.11 38.61 51.48 14.35 28.70 43.06 14.44 14.54 28.89 43.33 29.07 43.61 29.26 43.89 14.63 14.72 29.44 44.17 16.0 .J .2 15.00 30.00 45.00 .3 15.09 30.19 45.28 45.56 .4 15.19 30.37 WIDTH OR HEIGHT 44.44 44.81 45.19 45.56 45.93 36.11 48.15 60.19 36.39 48.52 60.65 36.67 48.89 61.11 36.94 49.26 61.57 49.63 62.04 46.30 46.67 47.04 47.41 47.78 51.85 52.22 52.59 52.96 53.33 55.56 55.93 42.22 56.30 56.67 57.04 53.70 54.07 54.44 54.81 55.19 14.81 29.63 44.44 59.26 14.91 29.81 44.72 59.63 60.00 60.37 60.74 15.28 .6 15.37 .7 15.46 30.93 46.39 .8 15.56 31.11 46.67 62.22 .9 15.65 31.30 46.94 62.59 30.56 45.83 61.11 30.74 46.11 61.48 61.85 17.0 62.96 15.74 31.48 47.22 .1 15.83 31.67 47.50 63.33 .2 15.93 31.85 47.78 63.70 16.02 .3 .4 17.5 .6 32.04 48.06 64.07 16.11 32.22 48.33 64.44 16.20 32.41 48.61 64.81 16.30 32.59 48.89 65.19 16.39 32.78 49.17 65.56 16.48 32.96 49.44 65.93 .9 16.57 33.15 49.72 66.30 .7 .8 5 55.56 56.02 56.48 56.94 57.41 57.87 58.33 58.70 59.26 59.72 62.50 62.96 63.43 63.89 64.35 57.41 71.76 57.78 58.15 58.52 58.89 72.22 72.69 73.15 73.61 74.07 74.54 64.81 77.78 65.28 78.33 65.74 78.89 66.20 79.44 66.67 80.00 67.13 80.56 67.59 81.11 68.06 81.67 68.52 82.22 68.98 82.78 76.39 76.85 69.44 83.33 69.91 83.89 70.37 84.44 70.83 85.00 71.30 85.56 77.31 77.78 78.24 6 78.70 79.17 79.63 80.09 80.56 66.67 77.78 67.22 67.78 68.33 68.89 69.44 70.00 70.56 81.02 81.48 81.94 71.11 71.67 82.41 82.87 75.00 75.56 76.11 76.67 77.22 7 72.22 84.26 72.78 84.91 73.33 85.56 73.89 86.20 74.44 86.85 78.43 79.07 79.72 80.37 81.02 81.67 82.31 82.96 83.61 88.89 103.70 89.44 104.35 90.00 105.00 75.00 75.46 90.56 105.65 75.93 87.50 88.15 8 86.11 100.46 86.67 101.11 87.22 101.76 87.78 102.41 88.33 103.06 9 88.89 100.00 89.63 100.83 90.37 101.67 91.11 102.50 91.85 103.33 92.59 104.17 93.33 105.00 94.07 105.83 112.50 113.33 88.80 101.48 114.17 89.44 102.22 115.00 90.09 102.96 115.83 94.81 106.67 95.56 107.50 96.30 108.33 97.04 109.17 97.78 110.00 98.52 110.83 99.26 111.67 100.00 100.74 116.67 90.74 103.70 91.39 104.44 117.50 105.19 118.33 92.04 92.69 105.93 119.17 93.33 106.67 120.00 93.98 107.41 120.83 94.63 108.15 121.67 95.28 122.50 108.89 95.93 109.63 123.33 96.57 110.37 124.17 97.22 |||.|| 97.87 111.85 98.52 112.59 126.67 99.17 113.33 127.50 99.81 114.07 128.33 125.00 125.83 114.81 129.17 115.56 130.00 116.30 130.83 117.04 131.67 117.78 132.50 118.52 133.33 119.26 134.17 120.00 135.00 120.74 135.83 91.11 106.30 121.48 136.67 91.67 106.94 122.22 137.50 92.22 107.59 122.96 138.33 92.78 108.24 123.70 139.17 93.33 108.89 124.44 140.00 93.89 109.54 125.19 140.83 94.44 110.19 125.93 141.67 95.00 110.83 126.67 142.50 111.48 127.41 143.33 95.56 96.11 112.13 128.15 144.17 96.67 112.78 128.89 145.00 97.22 113.43 129.63 145.83 97.78 114.07 130.37 146.67 98.33 114.72 131.11 147.50 98.89 115.37 131.85 148.33 99.44 116.02 132.59 149.17 451 HEIGHT OR WIDTH 18.0 | .2 16.85 16.94 17.04 .3 M= .4 18.5 .9 19.0 17.13 .6 17.22 .7 .8 123= • .2 .3 .9 20.0 .1 17.59 35.19 .I 17.69 35.37 17.78 19.5 .6 .7 .8 18.33 18.43 234 567∞a .3 TABLE XVIII.—TRIANGULAR PRISMS. CUBIC YARDS 1 17.87 35.74 .4 17.96 35.93 20.5 .8 .2 18.70 21.0 .1 .2 0-23I SO7∞a 16.67 33.33 16.76 17.31 17.41 17.50 [ 18.06 18.15 18.24 21.5 2 18.52 55.56 37.04 18.61 37.22 55.83 37.41 56.11 37.59 56.39 .4 18.89 37.78 56.67 234 50.00 33.52 50.28 33.70 50.56 33.89 50.83 34.07 51.11 18.80 34.26 34.44 34.63 34.81 35.00 18.98 37.96 56.94 .6 19.07 38.15 57.22 19.17 38.33 19.26 38.52 57.78 58.06 .7 .9 19.35 38.70 52.78 53.06 35.56 53.33 53.61 53.89 36.11 36.30 3 23.5 21.76 .6 21.85 .7 21.94 .8 22.04 .9 22.13 51.39 51.67 51.94 52.22 52.50 .3 19.72 39.44 36.48 54.72 36.67 55.00 36.85 55.28 .4 19.81 39.63 54.17 54.44 19.63 39.26 58.89 PER 50 FEET 59.17 59.44 WIDTH OR HEIGHT 66.67 67.04 43.52 65.28 43.70 65.56 43.89 65.83 44.07 66.11 44.26 66.39 67.41 67.78 68.15 19.44 38.89 58.33 77.78 19.54 39.07 58.61 78.15 78.52 68.52 68.89 69.26 69.63 70.00 70.37 70.74 71.11 71.48 71.85 75.93 76.30 57.50 76.67 77.04 77.41 72.22 72.59 72.96 73.33 73.70 5 78.89 79.26 83.33 100.00 83.80 84.26 84.72 85.19 6 85.65 102.78 86.11 103.33 86.57 103.89 104.44 87.50 105.00 87.04 87.96 105.56 88.43 106.11 88.89 106.67 89.35 107.22 89.81 107.78 74.07 92.59 ||||| 74.44 93.06 [11.67 74.81 93.52 75.19 93.98 75.56 94.44 100.56 117.31 101.11 | 117.96 101.67 118.61 102.22 119.26 97.22 97.69 98.15 109.44 110.00 110.56 94.91 113.89 95.37 114.44 115.00 95.83 96.30 115.56 96.76 116.11 136.11 155.56 175.00 136.76 156.30 175.83 137.41 138.06 19.91 39.81 59.72 79.63 .6 20.00 40.00 60.00 .7 180.83 181.67 157.04 176.67 157.78 177.50 138.70 158.52 178.33 99.54 119.44 139.35 159.26 179.17 80.00 100.00 120.00 140.00 160.00 180.00 20.09 40.19 60.28 80.37 100.46 120.56 140.65 160.74 .8 20.19 40.37 60.56 80.74 100.93 121.11 141.30 161.48 .9 20.28 40.56 60.83 81.11 101.39 121.67 141.94 162.22 22.0 20.37 40.74 61.11 81.48 101.85 20.46 40.93 61.39 81.85 102.31 .2 20.56 41.11 61.67 82.22 102.78 .3 20.65 41.30 61.94 82.59 103.24 .4 20.74 41.48 62.22 82.96 103.70 41.67 62.50 83.33 41.85 62.78 83.70 182.50 104.17 104.63 84.07 105.09 84.44 105.56 84.81 106.02 22.5 20.83 .6 20.93 .7 21.02 42.04 63.06 .8 21.11 42.22 63.33 .9 21.20 42.41 63.61 23.0 21.30 42.59 63.89 85.19 106.48 .1 21.39 42.78 64.17 85.56 106.94 .2 21.48 42.96 64.44 85.93 107.41 86.30 107.87 86.67 108.33 .3 21.57 43.15 64.72 .4 21.67 43.33 65.00 87.04 108.80 87.41 109.26 87.78 109.72 88.15 110.19 88.52 110.65 112.22 112.78 113.33 11.6.67 117.22 117.78 98.61 118.33 99.07 118.89 7 90.28 108.33 126.39 144.44 162.50 90.74 108.89 127.04 145.19 163.33 91.20 127.69 145.93 91.67 164.17 128.33 146.67 165.00 128.98 147.41 165.83 92.13 116.67 133.33 150.00 134.07 150.83 134.81 151.67 135.56 152.50 136.30 153.33 123.15 123.80 124.44 125.09 125.74 119.91 137.04 154.17 120.56 137.78 155.00 121.20 138.52 155.83 121.85 139.26 156.67 122.50 140.00 157.50 8 9 132.87 133.52 134.17 134.81 135.46 129.63 148.15 166.67 130.28 148.89 167.50 130.93 149.63 168.33 131.57 150.37 169.17 132.22 151. 170.00 140.74 158.33 141.48 159.17 142.22 160.00 142.96 160.83 143.70 161.67 126.11 147.13 126.67 147.78 127.22 148.43 127.78 128.33 128.89 129.44 130.00 151.67 151.85 170.83 152.59 171.67 153.33 172.50 154.07 173.33 154.81 174.17 184.17 122.22 142.59 162.96 183.33 122.78 143.24 163.70 123.33 143.89 164.44 123.89 185.00 144.54 165.19 185.83 124.44 145.19 165.93 186.67 125.00 145.83 166.67 187.50 125.56 146.48 3/ 167.41 188.33 168.15 189.17 168.89 190.00 169.63 190.83 149.07 170.37 191.67 149.72 171.11 192.50 150.37 151.02 172.59 171.85 193.33 194.17 195.00 173.33 130.56 152.31 174.07 131.11 152.96 174.81 131.67 153.61 175.56 132.22 154.26 176.30 198.33 132.78 154.91 177.04 199.17 195.83 196.67 197.50 452 HEIGHT OR WIDTH 24.0 .I 24.5 22.31 .2 22.41 .3 22.50 .4 22.59 25.5 22.69 .6 22.78 .7 22.87 .8 22.96 .9 23.06 23.15 23.24 25.0 .1 .2 23.33 .3 23.43 .4 23.52 23.61 .6 23.70 .7 23.80 .8 23.89 .9 26.0 .3 .4 26.5 .6 .7 .8 .9 24.07 . 1 24.17 .2 24.26 TABLE XVIII.-TRIANGULAR PRISMS. CUBIC YARDS 1 34 22.22 44.44 44.63 44.81 45.00 45.19 28.5 · 6 .> 29.0 · / ~MI 5o7 29.5 28.0 25.93 .6 2 47.78 23.98 47.96 24.81 24.91 48.15 48.33 48.52 24.35 48.70 24.44 51.85 .I 26.02 52.04 .2 26.11 52.22 26.20 52.41 .3 .4 47.22 47.41 47.59 46.30 69.44 46.48 69.72 46.67 70.00 46.85 70.28 47.04 70.56 24.54 49.07 24.63 49.26 24.72 49.44 49.63 49.81 3 66.67 66.94 67.22 67.50 67.78 45.37 68.06 45.56 68.33 45.74 45.93 68.61 91.48 68.89 46.11 69.17 91.85 92.22 70.83 71.11 72.22 72.50 72.78 73.06 48.89 73.33 .9 27.69 • 71.39 71.67 71.94 PER 50 FEET 4 74.44 74.72 WIDTH OR HEIGHT 88.89 89.26 89.63 90.00 90.37 90.74 113.43 91.11 113.89 114.35 114.81 115.28 96.30 96.67 97.04 50.00 75.00 100.00 125.00 27.0 25.00 .1 25.09 .2 25.19 50.37 50.19 75.28 100.37 125.46 100.74 125.93 126.85 75.56 .3 25.28 50.56 75.83 101.11 126.39 .4 25.37 50.74 76.11 101.48 27.5 25.46 50.93 76.39 101.85 .6 25.56 51.11 76.67 102.22 .7 25.65 51.30 .8 25.74 51.48 .9 | 25.83 76.94 102.59 77.22 102.96 103.33 51.67 77.50 97.41 97.78 73.61 98.15 73.89 98.52 74.17 98.89 99.26 99.63 92.59 115.74 92.96 11.6.20 93.33 116.67 93.70 117.13 94.07 117.59 77.78 103.70 78.06 104.07 78.33 104.44 78.61 104.81 26.30 52.59 78.89 105.19 5 94.44 118.06 94.81 118.52 95.19 118.98 95.56 119.44 95.93 119.91 ||| . || 111.57 112.04 27.31 54.63 81.94 109.26 133.33 155.56 177.78 200.00 133.89 156.20 178.52 200.83 134.44 156.85 179.26 201.67 112.50 135.00 157.50 180.00 202.50 112.96 135.56 158.15 180.74 203.33 120.37 120.83 121.30 121.76 122.22 122.69 123.15 123.61 124.07 124.54 6 129.63 130.09 136.57 27.41 54.81 82.22 109.63 137.04 138.89 139.44 140.00 26.39 26.48 26.57 .8 26.67 .9 26.76 26.85 80.56 107.41 134.26 161.11 53.70 26.94 53.89 80.83 107.78 .2 27.04 54.07 81.11 108.15 134.72 161.67 135.19 162.22 .3 54.26 81.39 108.52 135.65 162.78 27.13 .4 27.22 54.44 81.67 108.89 136.11 163.33 .8 27.59 55.19 82.78 110.37 137.96 55.37 83.06 110.74 138.43 136.11 158.80 181.48 204.17 136.67 159.44 182.22 205.00 137.22 160.09 182.96 205.83 137.78 160.74 183.70 206.67 184.44 207.50 138.33 161.39 140.56 141.11 164.63 144.44 145.00 145.56 146.|| 146.67 127.31 152.78 127.78 153.33 128.24 153.89 128.70 154.44 129.17 155.00 155.56 156.11 156.67 130.56 131.02 157.22 131.48 157.78 150.00 150.56 151.11 151.67 152.22 52.78 79.17 105.56 131.94 158.33 52.96 79.44 105.93 132.41 53.15 79.72 106.30 132.87 53.33 80.00 106.67 53.52 133.33 80.28 107.04 133.80 7 147.22 171.76 147.78 172.41 148.33 173.06 148.89 173.70 174.35 149.44 141.67 165.28 188.89 212.50 142.22 165.93 189.63 213.33 142.78 166.57 190.37 214.17 143.33 167.22 143.89 191.11 215.00 167.87 191.85 215.83 162.04 162.69 163.33 163.98 158.89 159.44 160.00 160.56 .7 27.50 55.00 82.50 110.00 137.50 165.00 165.56 166.11 8 9 185.19 208.33 185.93 209.17 186.67 210.00 187.41 210.83 188.15 211.67 192.59 216.67 168.52 169.17 193.33 217.50 169.81 194.07 218.33 170.46 194.81 219.17 171.11 195.56 220.00 196.30 220.83 197.04 221.67 197.78 222.50 198.52 223.33 199.26 224.17 175.00 200.00 225.00 175.65 200.74 225.83 176.30 | 201.48 226.67 176.94 202.22 227.50 177.59 202.96 228.33 178.24 203.70 229.17 178.89 204.44 230.00 179.54 205.19 230.83 180.19 205.93 231.67 180.83 206.67 232.50 181.48 207.41 233.33 182.13 208.15 234.17 182.78 208.89 235.00 183.43 209.63 235.83 184.07 210.37 236.67 184.72 211.11 237.50 185.37 211.85 238.33 186.02 212.59 239.17 186.67 213.33 240.00 187.31 214.07 240.83 187.96 214.81 241.67 188.61 215.56 242.50 189.26 216.30 243.33 189.91 217.04 244.17 190.56 217.78 245.00 245.83 163.89 191.20 164.44 191.85 219.26 246.67 220.00 | 247.50 192.50 193.15 220.74 248.33 193.80 221.48 249.17 218.52 218.52 453 HEIGHT OR WIDTH .2 30.0 27.78 .127.87 27.96 28.06 .4 28.15 JMI .3 30.5 0123- .6 28.33 .7 28.43 .8 28.52 .9 28.61 31.0 .I TABLE XVIII.—TRIANGULAR PRISMS. CUBIC YARDS 1 33.5 32.5 30.09 .6 30.19 .7 30.28 .8 30.37 .930.46 28.24 56.48 84.72 85.00 56.67 56.85 85.28 57.04 85.56 57.22 85.83 31.5 29.17 58.33 .6 29.26 .7 29.35 .8 29.44 .9 | 29.54 58.52 58.70 32.0 29.63 .129.72 .229.81 .3 29.91 .430.00 33.0 30.56 .I 30.65 .2 30.74 .3 30.83 .430.93 2 31.02 .6 31.11 .731.20 .831.30 .931.39 0-23= 55.56 55.74 55.93 56.11 56.30 28.70 86.11 114.81 143.52 28.80 86.39 115.19 143.98 .2 28.89 86.67 115.56 |44.44 .3 28.98 57.96 86.94 115.93 144.91 .4 29.07 58.15 87.22 116.30 145.37 34.0 31.48 .1 31.57 .231.67 .331.76 .4 31.85 57.41 57.59 57.78 3 58.89 59.07 PER 50 FEET 4 WIDTH OR HEIGHT 5 138.89 166.67 139.35 83.33 111.11 83.61 111.48 83.89 111.85 84.17 112.22 140.28 84.44 112.59 167.22 167.78 139.81 168.33 168.89 140.74 112.96 141.20 113.33 141.67 113.70 142.13 114.07 142.59 114.44 143.06 87.50 116.67 87.78 117.04 88.06 117.41 88.33 117.78 88.61 118.15 145.83 146.30 146.76 147.22 147.69 6 123.70154.63 35.5 32.87 65.74 98.61 131.48 164.35 .6 32.96 65.93 98.89 131.85 164.81 .7 33.06 66.11 99.17 132.22 165.28 .8 33.15 66.30 99.44 132.59 165.74 33.24 66.48 99.72 132.96 .9 166.20 7 169.44 197.69 170.00 198.33 170.56 198.98 171.11 199.63 171.67 200.28 90.28 | 243.70 92.22 122.96 59.26 88.89 118.52 148.15 177.78 207.41 59.44 89.17 118.89 148.61 178.33 208.06 59.63 89.44 119.26 149.07 178.89 208.70 59.81 89.72 119.63 149.54 179.44 209.35 60.00 90.00 120.00 150.00 180.00 210.00 60.19 120.37 150.46 180.56 210.65 240.74 270.83 60.37 90.56 120.74 150.93 181.11 211.30 241.48 271.67 60.56 90.83 121.11 151.39 181.67 211.94 242.22 272.50 60.74 91.11 121.48 151.85 182.22 212.59 242.96 273.33 60.93 91.39 121.85 152.31 182.78 213.24 274.17 61.11 91.67 122.22 152.78 183.33 213.89 244.44 275.00 61.30 91.94 122.59 153.24 183.89 214.54 245.19 275.83 61.48 153.70 184.44 215.19 245.93 | 276.67 61.67 92.50 123.33 154.17 185.00 215.83 246.67 277.50 61.85 92.78 185.56 216.48 247.41 278.33 62.04 93.06 124.07 155.09 186.11 217.13 248.15 279.17 62.22 93.33 124.44 155.56 186.67 217.78 248.89 280.00 62.41 93.61 124.81 156.02 187.22 218.43 249.63 280.83 62.59 93.89 125.19 156.48 187.78 219.07 250.37 281.67 62.78 94.17 125.56 156.94 188.33 219.72 251.11 282.50 62.96 94.44 125.93 157.41 188.89 220.37 251.85 283.33 63.15 94.72 126.30 157.87 189.44 221.02 252.59 | 284.17 63.33 95.00 126.67 158.33 190.00 221.67 253.33 285.00 63.52 95.28 127.04 158.80 190.56 222.31 254.07 285.83 63.70 95.56 127.41 159.26 191.|| 222.96 254.81 286.67 34.5 31.94 63.89 95.83 127.78 159.72 .6 32.04 64.07 96.11 128.15 160.19 .7 32.13 64.26 96.39 128.52 160.65 .8 32.22 64.44 96.67 128.89 161.11 .9 32.31 64.63 96.94 129.26 161.57 35.0 32.41 64.81 97.22 129.63 162.04 .I 32.50 65.00 97.50 130.00 162.50 194.44 195.00 162.96 195.56 163.43 | 196.11 .2 .3 .4 32.59 65.19 97.78 130.37 32.69❘ 65.37 98.06 130.74 32.78 65.56 98.33 131.11 163.89 196.67 8 194.44 222.22 250.00 195.09 222.96 250.83 195.74 223.70 251.67 196.39 224.44 252.50 197.04 225.19 253.33 175.00 204.17 175.56 204.81 176.II 205.46 176.67 177.22 197.22 197.78 9 225.93 | 254.17 226.67 226.67 255.00 172.22 200.93 229.63 258.33 172.78 201.57 230.37 259.17 173.33 202.22 | 231.11 260.00 173.89 202.87 231.85 260.83 174.44 203.52 232.59 261.67 227.41 | 255.83 228.15 | 256.67 228.89 | 257.50 262.50 233.33 234.07 263.33 234.81 264.17 206.II 235.56 265.00 206.76 236.30 | 265.83 237.04 266.67 237.78 267.50 238.52 | 268.33 239.26 | 269.17 240.00 270.00 191.67 223.61 255.56 287.50 192.22 224.26 256.30 288.33 192.78 224.91 257.04 289.17 193.33 225.56 257.78 290.00 193.89 226.20 258.52 290.83 226.85 259.26 | 291.67 227.50 228.15 228.80 229.44 260.00 292.50 260.74 | 293.33 261.48 | 294.17 262.22 295.00 230.09 230.74 262.96 | 295.83 263.70 | 296.67 231.39 264.44 297.50 298.33 299.17 198.33 198.89 232.04 265.19 199.44 232.69 265.93 454 HEIGHT OR WIDTH 36.0 . I ~MJ 5678σ ·2 .3 36.5 .6 .7 .8 33.33 66.67 100.00 33.43 66.85 100.28 33.52 67.04 100.56 67.22 100.83 33.61 .4 33.70 67.41 101.11 134.81 168.52 .9 233 5 .3 .4 38.5 35.19 70.37 105.56 .I 35.28 70.56 105.83 .2 .6 .7 .8 89 137.04 137.41 37.0 34.26 68.52 102.78 .I 34.35 68.70 103.06 .2 34.44 68.89 103.33 .3 34.54 69.07 103.61 138.15 137.78 .4 34.63 69.26 138.52 37.5 .6 103.89 34.72 69.44 104.17 34.81 69.63 104.44 139.26 .7 34.91 69.81 104.72 139.63 .8 35.00 140.00 .9 35.09 140.37 38.0 70.00 105.00 70.19 105.28 .9 39.0 40.0 TABLE XVIII.—TRIANGULAR PRISMS. CUBIC YARDS 1 .I 36.20 .2 36.30 36.39 .3 .4 36.48 ∞σ 0-23= .9 2 .2 37.22 .3 37.31 37.41 .4 3 39.5 36.57 .6 36.67 .7 36.76 .8 36.85 .9 36.94 37.04 74.07 ||1.11 .I 37.13 ∞ a 40.5 37.50 .6 37.59 .7 37.69 .8 37.78 .8 .9 PER 50 FEET 33.80 33.80 67.59 101.39 | 135.19 | 168.98 202.78 236.57 33.89 67.78 101.67 135.56 169.44 203.33 33.98 67.96 101.94 135.93 169.91 | 203.89 34.07 68.15 102.22 136.30 170.37 204.44 34.17 68.33 102.50 170.83 136.67 WIDTH OR HEIGHT 140.74 141.11 35.37 70.74 106.|| 141.48 141.85 142.22 35.46 70.93 106.39 35.56 71.11 106.67 35.65 71.30 106.94 35.74 71.48 107.22 35.83 71.67 107.50 143.33 35.93 71.85 107.78 143.70 36.02 72.04 108.06 144.07 142.59 142.96 41.5 38.43 .6 38.52 .7 38.61 6 133.33 166.67 200.00 233.33 133.70 167.13 200.56| 233.98 134.07 201.11 | 234.63 134.44 201.67 235.28 202.22 | 235.93 167.59 168.06 36.11 72.22 108.33 72.41 108.61 72.59 108.89 145.19 72.78 109.17 145.56 72.96 109.44 145.93 144.44 144.81 73.15 109.72 146.30 73.33 110.00 146.67 73.52 110.28 147.04 73.70 110.56 147.41 73.89 110.83 147.78 75.00 112.50 150.00 75.19 112.78 150.37 75.37 113.06 150.74 75.56 113.33 151.11 37.87 75.74 113.61 151.48 37.96 75.93 113.89 151.85 41.0 .I 38.06 76.11 114.17 152.22 152.59 .2 38.15 76.30 114.44 .3 38.24 76.48 114.72 152.96 .4 38.33 76.67 115.00 153.33 138.89 173.61 208.33 174.07 208.89 174.54 209.44 175.00 210.00 175.46 210.56 148.15 74.26 111.39 148.52 74.44 III.67 148.89 74.63 ||1.94 149.26 74.81 112.22 149.63 5 76.85 115.28 153.70 77.04 115.56 154.07 77.22 115.83 154.44 38.70 77.41 116.11 154.81 38.80 77.59 116.39 155.19 171.30 171.76 172.22 172.69 173.15 175.93 176.39 7 178.24 213.89 178.70 214.44 179.17 215.00 179.63 215.56 180.09 | 216.11 270.37 304.17 237.22 | 271.11 305.00 237.87 271.85 305.83 238.52 272.59 | 306.67 205.00 239.17 | 273.33 307.50 205.56 | 239.81 274.07 206.11 240.46 206.67 | 241.|| 207.22 241.76 207.78 242.41 211.11 211.67 211.67 246.94 176.85 212.22 247.59 177.31 212.78 248.24 177.78 213.33 248.89 218.33 218.89 187.50 187.96 188.43 188.89 189.35 180.56 216.67 252.78 181.02 217.22 | 253.43 181.48 217.78 254.07 181.94 182.41 8 266.67 300.00 267.41 300.83 268.15 301.67 268.89 302.50 269.63 303.33 246.30 281.48 189.81 227.78 190.28 | 228.33 190.74 228.89 191.20 229.44 191.67 230.00 192.13 230.56 192.59 231.|| 193.06 193.52 193.98 243.06 243.70 244.35 277.78 312.50 278.52 | 313.33 279.26 | 314.17 245.00 280.00 315.00 245.65 | 280.74 280.74 315.83 185.19 222.22 259.26 185.65 222.78❘ 259.91 186. 223.33 | 260.56 186.57 223.89 261.20 187.04 224.44 | 261.85 249.54 285.19 250.19 | 285.93 250.83 286.67 251.48 287.41 252.13 288.15 9 274.81 275.56 310.00 276.30 310.83 277.04 311.67 182.87 183.33 219.44 256.02 292.59 220.00 | 256.67 293.33 183.80 220.56 257.31 | 294.07 316.67 282.22 317.50 282.96 | 318.33 283.70 319.17 284.44 320.00 308.33 309.17 231.67 270.28 232.22 | 270.93 232.78 | 271.57 254.72 291.11 327.50 255.37 | 291.85 328.33 288.89 325.00 289.63 325.83 290.37 326.67 331.67 184.26 | 221.1|| 257.96 | 294.81 184.72 221.67 258.61 295.56 332.50 225.00 262.50 225.56 | 263.15| 300.74 226.11 | 263.80 | 301.48 226.67 | 264.44 302.22 227.22 | 265.09 302.96 320.83 321.67 322.50 323.33 324.17 329.17 330.00 330.83 296.30 | 333.33 297.04 334.17 297.78 335.00 298.52 335.83 299.26 | 336.67 300.00 337.50 338.33 339.17 340.00 340.83 303.70 341.67 265.74 266.39 304.44 342.50 267.04 305.19 343.33 267.69 305.93 305.93 268.33 306.67 344.17 345.00 268.98 307.41 345.83 269.63 308.15 346.67 308.89 347.50 309.63 348.33 310.37 349.17 455 HEIGHT OR WIDTH 42.0 38.89 38.98 .2 39.07 .I .3 39.17 39.26 .4 43.0 39.81 .1 39.91 .2 40.00 .3 40.09 .4 40.19 42.5 39.35 78.70 118.06 .6 39.44 78.89 118.33 .7 39.54 79.07 .8 39.63 79.26 118.61 118.89 .9 39.72 79.44 119.17 43.5 40.28 .6 40.37 .7 40.46 .8 40.56 .9 40.65 44.0 234 56 .3 44.5 .6 TABLE XVIII.—TRIANGULAR PRISMS. CUBIC YARDS 1 45.0 41.67 .I 41.76 .2 41.20 82.41 123.61 41.30 7.41.39 .8 41.48 .941.57 46.0 .3 41.94 .4 42.04 MI SO7∞g o-NKI SO 45.5 42.13 .6 42.22 .742.31 .8 42.41 .9 42.50 81.48 122.22 40.74 .1 40.83 81.67 122.50 .2 40.93 81.85 122.78 82.04 123.06 41.02 .441.11 82.22 123.33 164.44 205.56 42.59 .I 42.69 .2 42.78 .3 .4 46.5 2 47.0 3 155.93 77.78 116.67 155.56 77.96 116.94 78.15 117.22 78.33 117.50 156.67 78.52 117.78 157.04 156.30 47.5 PER 50 FEET 41.85 83.70 125.56 WIDTH OR HEIGHT 157.41 157.78 158.15 158.52 158.89 278.70 79.63 119.44 79.81 119.72 279.35 280.00 159.26 199.07 238.89 159.63 199.54 239.44 80.00 120.00 160.00 200.00 240.00 80.19 120.28 160.37 200.46 240.56 280.65 80.37 120.56 160.74 200.93 241.11 281.30 80.56 120.83 161.11 80.74 121.11 161.48 80.93 121.39 81.11 121.67 81.30 121.94 6 194.44 233.33 272.22 194.91 233.89 272.87 195.37 234.44 273.52 195.83 235.00 274.17 196.30 235.56 | 274.81 196.76 236.11 275.46 197.22 | 236.67 | 276.11 197.69 237.22 276.76 198.15 237.78 277.41 198.61 238.33 278.06 5 83.33 125.00 166.67 83.52 125.28 167.04 162.96 203.70 163.33 204.17 163.70 204.63 164.07 205.09 167.41 83.89 125.83 167.78 84.07 126.11 168.15 247.22 164.81 206.02 82.59 123.89 165.19 206.48 247.78 289.07 82.78 124.17 165.56 206.94 248.33 289.72 82.96 124.44 165.93 207.41 248.89 83.15 124.72 166.30 207.87 249.44 84.26 126.39 168.52 210.65 84.44 126.67 168.89 211.11 84.63 126.94 169.26 84.81 127.22 169.63 85.00 127.50 170.00 85.19 127.78 170.37 212.96 85.37 128.06 170.74 213.43 85.56 128.33 171.11 213.89 42.87 85.74 128.61 171.48 214.35 42.96 85.93 128.89 171.85 214.81 201.39 241.67 281.94 322.22 362.50 201.85 242.22 282.59 322.96 363.33 161.85 202.31 242.78 283.24 | 323.70 364.17 162.22 | 202.78 243.33 283.89 324.44 365.00 162.59 203.24 243.89 284.54 | 325.19 | 365.83 43.06 86.11 129.17 172.22 215.28 .6 43.15 86.30 129.44 172.59 215.74 .7 43.24 86.48 129.72 172.96 .8 43.33 86.67 130.00 173.33 .9 43.43 86.85 130.28 173.70 43.52 87.04 130.56 174.07 .1 43.61 87.22 130.83 174.44 218.06 .2 43.70 .3 43.80 .4 7 87.41 131.11 174.81 218.52 87.59 131.39 175.19 218.98 43.89 87.78 131.67 175.56 219.44 219.44 43.98 87.96 131.94 175.93 219.91 .6 44.07 88.15 132.22 176.30 220.37 .7 44.17 88.33 132.50 176.67 220.83 .8 44.26 88.52 132.78 .9 44.35 88.70 133.06 177.04 221.30 | 177.41 221.76 216.20 259.44 216.67 | 260.00 217.13 | 260.56 290.37 291.02 208.33 208.80 250.00 291.67 333.33 375.00 250.56 292.31 334.07 375.83 209.26 251.11 292.96 334.81 376.67 209.72 | 251.67 293.61 335.56 377.50 210.19 252.22 | 294.26 336.30 378.33 252.78 252.78 294.91 244.44285.19 | 325.93 | 366.67 245.00 285.83 326.67 367.50 245.56 286.48 | 327.41368.33 246.11 287.13 | 328.15 369.17 287.78 328.89 | 370.00 288.43 246.67 8 337.04 379.17 253.33 295.56 337.78 380.00 211.57 253.89 253.89 296.20 212.04| 254.44 296.85 339.26 212.50 255.00 .297.50 | 340.00 338.52 380.83 217.59 261.11 9 311.11 350.00 311.85 | 350.83 312.59 351.67 313.33 352.50 314.07 353.33 314.81 354.17 315.56 355.00 316.30 355.83 317.04 356.67 317.78 357.50 304.63 261.67 305.28 262.22 | 305.93 262.78 306.57 307.22 263.33 263.33 318.52 | 358.33 319.26 | 359.17 320.00 | 360.00 320.74 360.83 321.48 361.67 263.89 307.87 264.44 | 308.52 265.00 | 309.17 265.56 309.81 266.11 310.46 329.63 | 370.83 330.37 371.67 331.11 372.50 331.85 373.33 332.59 | 374.17 383.33 384.17 255.56 298.15 340.74 256.11 | 298.80 341.48 256.67 | 299.44 342.22 385.00 257.22 300.09 342.96 385.83 257.78 300.74 343.70 386.67 258.33 301.39 344.44 387.50 258.89 302.04 345.19 388.33 302.69 345.93 389.17 303.33 303.98 346.67 390.00 347.41 390.83 381.67 382.50 348.15 | 391.67 348.89 | 392.50 349.63 393.33 350.37 394.17 351.11 | 395.00 351.85 | 395.83 352.59 396.67 353.33 397.50 354.07 398.33 354.81 399.17 456 HEIGHT OR WIDTH 48.044.44 .1 .2 .3 .4 44.54 44.63 44.72 44.81 48.5 44.91 .645.00 .7 45.09 .8 45.19 45.28 .9 49.0 50.0 46.30 .! 46.39 .246.48 .3 46.57 .4 46.67 .7 .8 .9 50.5 46.76 .646.85 46.94 47.04 47.13 56 | TABLE XVIII.-TRIANGULAR PRISMS. CUBIC YARDS 1 51.5 45.37 .1 45.46 .2 45.56 .3 45.65 .4 45.74 49.5 .6 45.83 45.93 .7 46.02 .8 46.11 92.22 138.33 .9 46.20 92.41 138.61 51.0 47.22 .1 47.31 .2 47.41 .3 47.50 .4 .6 .7 52.0 . I .2 53.5 5 2 3 6 88.89 133.33 177.78 222.22 266.67 89.07 133.61 178.15 222.69 267.22 89.26 133.89 178.52 223.15 267.78 89.44 134.17 178.89 223.61 268.33 89.63 134.44 179.26 224.07 268.89 179.63 224.54 269.44 180.00 225.00 270.00 180.37 225.46 270.56 180.74 225.93 271.11 135.83 181.11 226.39 271.67 89.81 134.72 90.00 135.00 90.19 135.28 90.37 135.56 90.56 90.74 90.93 91.11 136.67 91.30 136.94 91.48 137.22 49.07 49.17 91.67 137.50 91.85 137.78 92.04 138.06 49.54 .6 49.63 .7 49.72 .8 49.81 .9 49.91 47.59 95.19 142.78 PER 50 FEET .8 47.96 95.93 143.89 191.85 .9 48.06 96.11 144.17 192.22 52.5 48.61 97.22 145.83 .6 48.70 97.41 146.11 .7 48.80 97.59 146.39 .8 48.89 97.78 146.67 .9 48.98 97.96 146.94 98.15 147.22 4 WIDTH OR HEIGHT 240.28288.33 48.15 96.30 144.44 192.59 240.74 | 288.89 48.24 96.48 144.72 192.96 241.20 289.44 48.33 96.67 145.00 193.33 241.67 290.00 .3 48.43 96.85 145.28 193.70 242.13 .4 48.52 97.04 145.56 290.56 291.11 194.07 242.59 136.11 | 181.48 226.85 272.22 317.59 362.96 408.33 136.39 181.85 227.31 272.78 318.24 363.70 409.17 182.22 | 227.78 273.33 318.89 364.44 410.00 182.59 228.24 273.89 319.54 365.19 410.83 182.96 228.70 274.44 320.19 365.93 411.67 183.33 229.17 183.70 229.63 184.07 184.44 230.09 230.56 231.02 184.81 53.0 .I .2 .3 49.35 98.70 148.06 197.41 .4 49.44 98.89 5 283.33 330.56 377.78 283.89 | 331.20 | 378.52 284.44 331.85 379.26 285.00 190.37 237.96 285.56 47.69 95.37 143.06 190.74 238.43 286.|| 47.78 95.56 143.33 191.11 238.89 332.50 333.15 380.00 380.74 333.80 381.48 286.67 334.44 382.22 47.87 95.74 143.61 191.48 239.35 287.22 239.81 287.78 7 49.26 98.52 147.78 197.04 8 92.59 138.89 185.19 231.48 277.78 92.78 139.17 185.56 231.94 278.33 92.96 139.44 185.93 232.41 278.89 93.15 139.72 186.30 232.87 279.44 93.33 140.00 186.67 233.33 280.00 93.52 140.28 187.04 233.80 280.56 327.31 374.07 420.83 93.70 140.56 187.41 234.26 281.11 327.96 374.81 421.67 93.89 140.83 187.78 234.72 281.67 328.61 375.56 422.50 94.07 141.11 188.15 235.19 282.22 329.26 376.30 94.26 141.39 188.52 235.65 282.78 94.44 141.67 188.89 236.11 94.63 141.94 189.26 236.57 94.81 142.22 189.63 237.04 95.00 142.50 190.00 237.50 423.33 424.17 329.91 377.04 9 311.11 355.56 400.00 311.76 356.30 400.83 312.41 357.04 401.67 313.06 357.78 357.78 402.50 313.70 358.52 403.33 196.30 245.37 98.33 147.50 196.67 314.35 359.26 404.17 315.00 360.00 360.00 405.00 315.65 360.74 405.83 316.30 361.48 406.67 316.94 352.22 352.22 407.50 275.00 320.83 275.56 321.48 276.11 | 322.13 366.67 412.50 367.41 413.33 368.15 414.17 276.67 322.78 368.89 415.00 277.22 323.43 369.63 415.83 324.07 370.37 416.67 324.72 371.11 417.50 325.37 371.85 418.33 326.02 372.59 419.17 326.67 373.33 420.00 425.00 425.83 194.44 243.06 243.06 291.67 340.28 388.89 437.50 194.81 243.52 292.22 340.93 389.63 438.33 195.19 243.98 | 292.78 341.57 390.37 195.56 244.44 293.33 | 342.22 | 391.11 195.93 244.91 293.89 342.87 391.85 426.67 427.50 428.33 431.67 432.50 429.17 430.00 335.09 382.96 430.83 335.74 383.70 336.39 384.44 337.04 385.19 337.69 | 385.93 338.33 386.67 338.98 287.41 339.63 433.33 434.17 435.00 435.83 388.15 436.67 439.17 440.00 440.83 294.44 343.52 392.59 441.67 245.83 295.00 344.17 393.33 422.50 246.30 295.56 344.81 394.07 443.33 246.76 296.II 345.46 394.81 444.17 247.22 296.67 346.11 395.56 445.00 148.33 197.78 99.07 148.61 | 198.15 247.69 | 297.22 346.76 396.30 445.83 99.26 148.89 198.52 248.15 297.78 347.41 397.04 446.67 99.44 149.17 198.89 248.61 298.33 99.63 149.44 199.26 249.07 298.89 99.81 149.72 199.63 249.54 299.44 348.06 397.78 447.50 348.70 398.52 448.33 349.35 399.26 449.17 457 HEIGHT OR WIDTH 233 SON 54.5 233 56789 55.5 .6 .8 0-23- 56.0 5678 σ 56.5 .6 .7 54.0 50.00 100.00 150.00 200.00 . I 50.09 100.19 150.28 .2 50.19 100.37 150.56 .3 50.28 100.56 150.83 .4 50.37 100.74 151.11 400.00 | 450.00 400.74 450.83 401.48 | 451.67 453.33 .6 202.22 252.78 404.44 250.00 300.00 350.00 200.37 250.46 300.56 350.65 200.74 | 250.93 | 301.1| 351.30 201.11 251.39 301.67 351.94 402.22 452.50 201.48251.85 | 302.22 | 352.59 | 402.96 50.46 100.93 151.39 201.85 252.31 302.78 353.24 403.70 50.56 101.11 151.67 303.33 | 353.89 .7 50.65 101.30 151.94 202.59 | 253.24 303.89 354.54 50.74 101.48 152.22 202.96 253.70 | 304.44 | 355.19 50.83 101.67 152.50 50.93 101.85 152.78 .I 51.02 102.04 153.06 204.07 .2 51.11 102.22 .3 51.20 102.41 .4 51.30 102.59 153.89 205.19 405.19 355.19 405.93 405.93 .8 .9 203.33 254.17 305.00 | 355.83406.67 55.0 203.70 203.70 153.33 204.44 .8 .9 51.39 102.78 51.48 102.96 .751.57 103.15 51.67 103.33 155.00 206.67 258.33 .9 51.76 103.52 155.28 207.04 258.80 57.0 .I .2 ~34 5678 51.85 103.70 155.56 207.41 .151.94 103.89 155.83 207.78 52.04 104.07 156.11 208.15 .3 52.13 104.26 156.39 208.52 .4 52.22 104.44 156.67 208.89 .2 .3 57.5 .6 .8 .9 58.0 .I .2 ~34 5678σ o 52.96 105.93 158.89 211.85 53.06 106.11 159.17 212.22 .4 53.15 106.30 159.44 212.59 .3 .9 TABLE XVIII.—TRIANGULAR PRISMS. CUBIC YARDS 1 59.0 2 . I 3 233 561 .3 .4 PER 50 FEET 4 59.5 WIDTH OR HEIGHT 153.61204.81 53.24 106.48 159.72 212.96 266.20 53.33 106.67 160.00 213.33 | 266.67 .753.43 106.85 160.28 | 213.70 | 267.13|320.56 53.52 107.04 160.56 214.07 | 267.59 321.11 53.61 107.22 160.83 214.44 268.06 | 321.67 209.26 52.31 104.63 156.94 52.41 104.81 157.22 209.63 52.50 105.00 157.50 52.59 105.19 157.78 52.69 105.37 158.06 5 210.00 210.37 210.37 210.74 254.63 | 305.56 356.48 407.41 458.33 255.09 | 306.11 357.13 408.15 459.17 255.56 306.67 357.78 408.89 460.00 256.02 307.22 358.43 409.63 460.83 256.48 307.78 359.07 410.37 | 461.67 154.17 205.56 256.94 411.11 462.50 154.44 205.93 | 257.41 411.85 463.33 154.72 206.30 | 257.87 412.59 464.17 413.33 465.00 414.07 465.83 6 52.78 105.56 158.33 211.11 263.89 52.87 105.74 158.61 211.48 264.35 264.81 265.28 265.74 308.33 | 359.72 308.89 360.37 309.44 | 361.02 310.00 | 361.67 310.56 362.31 259.26 311.11 | 362.96 259.72 | 311.67 363.61 260.19 | 312.22 | 364.26 260.65 | 312.78 | 364.91 261.|| 313.33 365.56 7 8 261.57 313.89 | 366.20 | 418.52 252.04 314.44 366.85 262.50 315.00 | 367.50 262.96 | 315.56 368.15 263.43 316.11 368.80 319.44 320.00 53.70 107.41 161.11 214.81 483.33 484.17 215.19 215.56 215.56 485.00 53.80 107.59 161.39 53.89 107.78 161.67 53.98 107.96 161.94 215.93 269.91 323.89 377.87 .4 54.07 108.15 162.22 431.85 485.83 58.5 .6 .7 325.00 379.17 433.33 487.50 325.56 379.81 434.07 488.33 271.76 326.11 | 380.46 272.22 | 326.67 | 381.11 435.56 272.69 | 327.22 | 381.76436.30 434.81 489.17 490.00 54.54 490.83 54.63 109.26 163.89 491.67 216.30 | 270.37 324.44 378.52 432.59 486.67 54.17 108.33 162.50 216.67 270.83 54.26 108.52 162.78 217.04 271.30 54.35 108.70 163.06 217.41 .8 54.44 108.89 163.33 217.78 109.07 163.61 218.15 218.52 54.72 109.44 164.17 218.89 .254.81 109.63 164.44219.26 54.91 109.81 164.72 219.63 329.44 384.35 55.00 110.00 165.00 220.00 330.00 | 385.00 55.09 110.19 165.28 220.37 275.46 330.56 385.65 55.19 110.37 165.56 220.74 386.30 110.56 165.83 221.11 276.39 331.67 386.94 110.74 166.11 221.48 276.85 110.93 !66.39 221.85 277.31 492.50 383.70 438.52 493.33 274.07 328.89 274.54 439.26 494.17 440.00 495.00 275.00 .6 .7 55.28 .855.37 .955.46 440.74 495.83 441.48 496.67 442.22 497.50 332.22 387.59 442.96 498.33 332.78 388.24 443.70 499.17 273.61328.33 9 | 414.81 | 466.67 415.56 467.50 416.30 417.04 417.78 316.67 317.22 369.44 422.22 475.00 370.09 370.09 422.96 475.83 317.78 | 370.74 318.33 | 371.39 423.70 476.67 424.44 318.89 | 372.04 425.19 477.50 478.33 275.93331.11 268.52 322.22 268.98 322.78 375.93 429.63 376.57 | 430.37 269.44 323.33 377.22 431.11 454.17 455.00 455.83 456.67 457.50 470.83 419.26 471.67 420.00 | 472.50 420.74 473.33 421.48 | 474.17 372.69 | 425.93 373.33 426.67 373.98 427.41 374.63 428.15 375.28 428.89 273.15 327.78 382.41 437.04 383.06 437.78 468.33 469.17 470.00 479.17 480.00 480.83 481.67 482.50 458 TABLE XIX.-CUBIC YARDS PER 100-FOOT STATION YD ↓ ዐ ← በጋ 9.3 11.1 13.0 0 100 0.0 1.9 2 3.7 5.6 3 7.4 4 0-NMI NONOOD ON MONDO ONE ON ONE HUN ER NOG KONK ZAKA KOJOM 78858 ONZ~~ ZPPFO 28.** 188.8 88.** 12. 28000 ∞ a 5 6 14.8 8 7 16.7 9 22.2 12 46.3 48.1 11 27.8 15 77.8 37.0 20 18.5 10 64 20.4 54 55 56 25 26 58 55.6 30 57.4 59.3 32 61.1 33 63.0 34 57 111 112 69 29.6 16 70 31.5 17 33.3 18 35.2 19 71 72 73 60 61 66 24.1 13 67 121 25.9 14 59 113 62 63 81.5 44 83.3 45 65 24 78 68 74 50.0 27 81 51.9 28 53.7 29 79 128 182 236 290 38.9 21 75 129 183 237 291 40.7 22 42.6 23 44.4 76 130 184 238 77 131 185 239 132 186 240 83 84 64.8 35 89 66.7 36 68.5 37 91 70.4 38 92 72.2 39 93 74.1 40 94 41 75.9 42 200| 300 400 500 600 700 800 900 || 1 87 108 162 216 270 324 109 163 217 271 325 110 164 218 165 219 166 | 220 272 326 273 327 274 328 90 SUM OF END AREAS IN SQ FT 378 379 380 381 382 114 115 167 221 168 222 169 223 116 170 224 117 171 225 138 192 31 85 139 193 118 172 226 119 173 227 120 174 228 98 175 122 176 133 187 241 295 80 134 188 242 296 99 86 140 194 123 177 231 124 178 232 125 179 233 126 180 127 181 229 230 0 100 95 149 203 257 79.6 43 97 151 205 | 259 152 206 260 96 150 204 258 329 275 276 330 277 278 279 234 288 235 289 280 334 281 335 282 336 283 337 284 338 285 286 349 350 135 189 243 297 351 136 190 244 298 137 191 245 299 339 340 287 341 342 343 246 247 248 302 141 195 249 303 142 196 250 304 48 102 156 210 153 207 | 261 154 208 262 209 155 143 197 251 144 198 252 145 199 253 146 200 254 308 147 201 255 309 148 202 256 346 292 293 347 294 348 383 384 331 385 332 386 333 387 300 301 344 345 310 311 312 313 314 85.2 46 87.0 47 101 88.9 263 317 264 | 318 90.7 49 103 157 211 265 319 352 353 388 389 390 391 392 432 433 434 435 436 437 491 438 492 439 493 440 494 441 495 442 443 444 445 446 486 487 488 489 490 393 394 395 449 396 450 397 92.6 50 104 158 212 94.4 51 105 159 213 266 320 374 428 267 321 375 429 96.3 52 106 160 214 268 322 376 430 98.1 107 161 215 269 | 323 | 377 431 200 300 400 500 600 700 53 496 497 498 499 500 447 501 448 502 503 504 451 505 398 452 506 399 453 507 400 454 508 401 455 509 402 456 510 305 359 413 467 521 306 360 414 468 522 307 361 415 469 523 362 416 470 524 363 417 471 525 403 457 511 404 458 512 459 513 405 406 460 514 407 461 515 354 408 462 516 355 409 463 517 356 410 464 518 357 411 465 519 412 466 520 358 364 418 472 526 365 419 473 527 366 420 474 528 367 421 475 529 368 422 476 530 315 369 423 477 531 316 370 424 478 532 371 425 479 533 372 426 480 534 373 427 481 535 1000 540 594 541 595 542 596 543 544 545 546 547 548 549 552 553 554 1100 550 604 551 605 597 598 599 600 601 602 603 555 609 556 610 557 611 558 612 559 613 606 607 608 614 560 561 615 562 616 563 617 564 618 565 566 567 568 622 569 623 619 620 621 624 570 571 625 572 573 574 536 482 483 537 484 538 592 485 539 593 800 900 1000 590 591 575 629 576 630 577 631 578 632 579 633 626 627 628 580 634 581 635 582 636 583 637 584 638 585 639 586 640 587 641 588 642 589 643 644 645 646 647 1100 459 1200 1300 1400 648 702 756 649 703 757 650 704 758 651 705 759 652 706 760 653 707 761 654 708 762 6.55 709 656 710 657 711 763 764 765 658 712 659 713 660 714 661 662 715 716 663 717 771 664 718 772 665 719 773 666 720 667 721 668 722 669 723 670 724 671 725 672 726 766 767 768 769 770 678 732 679 733 680 734 681 735 682 736 FROM SUM OF END AREAS 673 727 781 674 728 782 675 729 783 676 730 784 677 731 785 1500 1600 1700 1800 1900 2000 SUM OF END AREAS IN SQ FT 810 811 812 813 814 815 816 817 818 819 820 821 822 823 824 825 826 827 774 828 775 829 830 776 777 831 778 832 779 833 780 834 835 836 864 865 866 867 868 869 870 871 872 873 874 875 876 877 878 879 880 881 882 883 884 885 886 887 888 889 890 837 891 838 892 839 893 786 840 894 787 841 895 788 842 789 843 790 844 683 737 791 845 684 738 792 846 685 739 793 847 686 740 794 848 902 687 741 795 849 903 918 972 1026 919 973 920 921 922 923 924 925 926 927 688 742 796 850 904 689 743 797 851 905 690 744 798 852 691 745 799 853 692 746 800 854 928 929 930 931 932 933 934 935 936 937 938 939 940 941 942 943 944 945 946 947 896 897 898 952 951 948 949 950 899 900 953 954 901 955 956 957 1080 1027 108-1 1028 1082 1029 1083 1030 1084 974 975 976 977 1031 978 1032 1086 979 1033 1087 1088 980 1034 981 1035 1089 1036 1037 1038 982 983 984 985 1039 986 1040 987 988 989 1043 1044 990 991 1045 992 993 994 995 1049 996 1050 1041 1042 1096 1002❘ 1056 1003❘ 1057 1004❘ 1058 1005 1059 1006 1060 1085 1139 9.3 1140 ||.| 1141 13.0 1142 14.8 1143 16.7 2100 Cu YD ↓ 997 1051 998 1052 999 1053 1000❘ 1054 1108 1001 1055 1109 1134 1135 1136 1137 1138 1090 1144 18.5 1091 1145 20.4 1092❘ 1146 22.2 1093 1147 24.1 1094 1148 25.9 1046 1100 1154 37.0 1047 1101 1155 38.9 1048 1102 1156 40.7 1103 1157 42.6 1104 1158 44.4 958 1012 959 1013 906 960 1014 907 961 1015 908 962 1016 963 1017 964 1018 693 747 801 855 909 694 748 802 856 910 911 695 749 803 857 965 1019 696 750 804 858 912 966 1020 697 751 805 859 913 967 1021 698 752 806 860 914 968 1022 1076 699 753 807 861 915 969 1023 1077 700 754 808 862 916 970 1024 1078 1079 863 917 701 755 809 1200 1300 1400 971❘ 1025 1500 1600 1700 1800 1900 0.0 1.9 3.7 5.6 7.4 1095 1149 27.8 1150 29.6 1097 1151 31.5 1098 1099 1152 33.3 1153 35.2 1105 1106 1107 1159 46.3 1160 48.1 1161 50.0 1162 51.9 1163 53.7 1110 |||| 1112 1165 1164 55.6 57.4 1166 59.3 1113 1167 61.1 1114 1168 63.0 1061 1115 1169 1008 1062 1116 1170 1007 64.8 66.7 1009❘ 1063| 1117 1010 1064 1118 1065 1119 1171 68.5 1172 70.4 1173 72.2 1011 1066 1120 1174 74.1 1067 1121 1175 75.9 1068 1122 1176 77.8 1069 1123 1177 79.6 1070 1124 1178 81.5 1073 1074 1075 1071 1125 1179 83.3 1072 1126 1180 85.2 1127 1181 87.0 1128 1182 88.9 1129 1183 90.7 1130 1184 92.6 1131 1185 94.4 1132 1186 96.3 1133 1187 98.1 2000 2100 460 TABLE XX.-NATURAL SINES, COSINES, Explanation This table is adapted to the rapid solution of route-survey- ing problems by computing machine. Its special advantages. are: (1) six significant figures; (2) most-frequently used func- tions in one table; (3) "streamline" interpolation for multiples of 10" and 15"; (4) chances for mistakes reduced by elimina- tion of column headings at bottom of page and by use of only one degree per page. Precise angle and distance measurements in route surveying justify one more figure than in the usual 5-place table, but hardly justify 7-place tables. In a large number of curve formulas the sine and versine of the same angle appear. Other combinations are sin-tan-cos and sin-cos-tan-vers. The appearance of these functions in the same table should save time. The omission of cotangents is of little consequence since they are rarely used in route sur- veying; if needed, they are equivalent to the tangent of the complement. G The most serious defect of most tables of natural functions is the absence of a convenient aid in interpolating for seconds. This defect is remedied in Table XX, largely through the use of sets of corrections for multiples of 10" and 15". These multiples are the ones most frequently needed when single or double angles are turned with a 20", 30", or 1' instrument. Example. Find the tangent of 28° 18′ 45″. Answer: 0.538444+281=0.538725. The foregoing is the quickest method and is sufficiently precise for most purposes. However, because the sets of corrections are exact at the middle of the indicated range, slightly greater precision would be obtained in this example by adding a correction of 282, since the 45" correction at 28° 30′ is 283. This method gives 0.538726. Many com- puters would prefer to subtract the 15" correction of 94 from the tangent of 28° 19′ (an excellent method), giving also 0.538726. Use of these more precise methods is recommended for finding exsecants of angles between 45° and 60°, and for tangents and exsecants of angles above 70°. Obviously, corrections for any number of seconds could be obtained speedily, if the field work justifies, by combining the tabulated corrections and shifting the decimal point. 461 0 Zero 1.000291 234 4 EETE O) 5.001454 1745 2036 2327 2618 6 7 8 9 10.002909 U 01234 56 12 13 14 16 222 22222 234 21 20.005818 22 23 24 15.004363 30 145.999990 4654 40 194 17 4945 45 218 18 523650 242 19 5527 26 27 25.007272 7563 7854 8145 8436 28 66L6G QUººº 55555 £55±5 wwwww wwwww Nig 29 32 33 34 30.008726 9017 9308 9599 9890 36 37 38 39 35.010181 0472 0763 1054 1344 41 42 SINE 43 44 40.011635 0582 0873 1164 46 47 48 49 51 3200 " Corr 3491 10 48 73 378215 4072 20 97 52 6109 6400 6690 6981 45.013090 30 145 3380 40 194 3671 45 218 3962 50 242 4253 53 54 50.014544 4835 5126 5416 5707 57 58 59 VERSINES, EXSECANTS, AND TANGENTS 55 015998 56 CORR. FOR SEC. + 1926 " Corr. 221710 48 250815 73 2799 20 97 6289 6580 6871 7162 60.017452 COSINE One One One One .999999 .999999 9998 9998 9997 By 9997 Inspec- tion .999996 9995 9994 9993 9992 9989 9988 9986 9985 .999983 9981 9980 9978 9976 .999974 9971 9969 9967 9964 999962 9959 9957 9954 9951 |.999948 9945 9942 9939 9936 .999932 9929 9925 9922 9918 .999914 9910 9906 9902 9898 .999894 9890 9886 9881 9877 CORR. FOR SEC. .999872 9867 9862 9858 9853 999848 0° VERSINE Zero Zero Zero Zero EXSEC .000001.00000! Zero Zero Zero Zero 100000 || 100000* 0005 0006 0007 0008 0002 0002 0003 By 0002 0003 0003 0003 Inspec- tion .000004.000004 0001 0005 0006 0007 0008 .0000 10.000010 0011 0012 0014 0015 0061 0064 0011 0012 0014 0015 .000017.000017 0019 0020 0022 0024 0019 0020 0022 0024 .000026.000026 0029 0031 0033 0036 0029 0031 0033 0036 .000038.000038 0041 0041 0043 0043 0046 0046 0049 0049 .000052.000052 0055 0055 0058 0058 0061 0064 .000068.000068 0071 0075 0078 0082 0071 0075 0078 0082 .000086.000086 0090 0090 0094 0094 0098 0098 0102 0102 .000106.000106 0110 0110 0114 0114 0119 0119 0123 0123 .000128.000128 0133 0138 0142 0147 0133 0138 0142 0147 CORR. FOR SEC. + 000152.000152 CORR. FOR SEC. + 11 Corr. 10 48 15 73 20 97 30 145 40 194 45 218 50 242 "Corr. 48 10 15 73 20 97 30 145 40 194 145 218 50 242 TANGENT Zero 000291 0582 0873 01234 .001454 2 3 1164 4 1745 6 2036 7 2327 8 2618 9 002909 10 3200 11 3491 12 3782 13 407214 004363 15 4654 16 4945 17 5236 18 5527 19 .005818 20 6109 21 6400 22 6690 23 6981 24 .007272 25 7563 26 7854 27 8145 28 8436 29 .008727 30 9018 31 9309 32 9600 33 989034 .010181 35 047236 0763 37 1054 38 1345 39 .011636 40 1927 41 2218 42 250943 2800 44 .01309145 3382 46 3673 47 3964 48 4254 49 .014545 50 483651 5127 52 5418 53 5709 54 016000 55 629156 6582 57 6873 58 7164 59 .017455 60 462 0.017452 7743 8034 8325 8616 1234 5.018907 9197 9488 9779 9.020070 10.020361 681OG 6 7 8 01234 56 11 12 13 14 16 17 18 19 15.02181530 145 2106 40 194 22222 234 21 20.023269 22 23 24 227** 8.ma 26 28 29 25.024723 5014 5305 5595 5886 31 32 33 34 30.026177 6468 6758 7049 7340 36 37 38 39 55±5 88! 35.027631 7922 8212 8503 8794 41 42 43 66966 20ººº 55555 SINE 46 40.029085 9376 " Corr. 9666 10 48 995715 73 44.030248 20 97 47 48 49 45.030538 30 145 0829 40 194 1120 45 218 1411 50 242 1701 51 0652" Corr. 0942 10 48 1233 15 73 1524 20 97 52 53 54 2396 45 218 2687 50 242 2978 3560 3851 4141 4432 50.031992 2283 2574 2864 3155 56 57 58 59 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 55.033446 3737 4027 4318 4609 60.034899 COSINE .999848 9843 9837 9832 9827 .999821 9816 9810 9804 9799 .999793 9787" Corr. 978110 977415 9768 20 .99976230 9756 40 9749 45 9743 50 9736 .999729 9722 9716 9709 9702 .999694 9687 9680 9672 9665 .999657 9650 9642 9634 9626 .999618 9610 9602 9594 9585 CORR. FOR SEC. .999488 9479 9469 9460 9450 I .999440 9431 9421 9411 9401 999391 22 MI55 2 3 4 5 " Corr. .999577 9568 9560 10 955115 9542 20 3 I 2 .999534 30 4 9525 40 6 9516 45 7 9507 50 7 9497 + 1° VERSINE .000152.000152 0157 0157 0163 0163 0168 0168 0173 0173 .000179.000179 0184 0184 0190 0190 0196 0196 0201 0201 EXSEC .000207.000207 0213 0219 0226 0232 0244 0251 0257 C264 11 0213 Corr. 0219 10 1 0226 15 2 0232 20 2 .000238.000238 30 3 0244 40 4 025145 0257 50 5 5 0264 .000271.000271 0278 0278 0284 0284 0291 0298 0291 0299 .000306.000306 0313 0320 0328 0335 0449 0458 0313 0320 0328 0335 .000343.000343 0350 0358 0366 0374 0350 0358 0366 0374 .000382.000382 0390 0390 0398 0398 0406 0406 0415 0415 .000423.000423 0432 0440 0432 " Corr. 0440 10 1 0449 15 2 0458 20 3 .000466.000467|30 CORR. FOR SEC. + 4 0476 40 6 0485 45 7 0494 50 7 0475 0484 0493 0503 0503 000512.000512 0521 0531 0540 0550 0521 0531 0540 0550 000559.000560 0569 0570 0579 0579 0589 0589 0599 0599 000609.000609 CORR. FOR SEC. + " Corr. 10 49 15 73 20 97 30 146 40 194 45 218 50 243 " Corr. 10 49 15 73 20 97 30 146 40 194 45 218 50 243 TANGENT .017455 7746 8037 01234 56789 8328 8619 4 .018910 9201 7 9492 9783 8 .020074 5 .020365 10 0656 11 0947 12 1238 13 1529 14 .021820 15 21| 1| 16 2402 17 2693 18 2984 19 .023275 20 3566 21 3857 22 4148 23 4439 24 .024730 25 5022 26 531327 5604 28 5895 29 .026186 30 6477 31 6768 32 7059 33 7350 34 .027641 35 7932 36 8224 37 8515 38 8806 39 .029097 40 9388 41 967942 9970 43 .030262 44 .030553 45 0844 46 1135 47 1426 48 1717 49 032009 50 2300 51 2591 52 2882 53 3173 54 .033465 55 3756 56 404757 4338 58 4629 59 .034921 60 463 1 0.034900 5190 5481 5772 6062 01234 KON7∞Q 5.036353 6 8 9 01234 10.037806 || 12 13 14 6678 σ 16 17 19 IEEE KON~~ ~~27 MOMMA DIRE BONO OGNOZ KANOO O 21 22 20.040713 1004 1294 1585 1876 23 24 26 27 25.042166 2457 2748 3038 3329 28 29 15.039260 30 145.999229 30 9550 40 194 9841 45 218 18.040132 50 242 0422 31 32 33 34 30.043619 3910 4201 4491 4782 36 37 35.045072 5363 5654 5944 6235 38 39 SINE 41 42 43 44 40.046525 46 6644 6934 7225 7516 47 48 49 45.047978 51 8097 " Corr. 8388 10 48 8678 15 73 8969 20 97 53 54 56 57 50.049431 9721 52.050012 0302 0593 58 59 VERSINES, EXSECANTS, AND TANGENTS 2° CORR. FOR SEC. + 6816 "Corr. 7106 10 48 7397 15 73 7688 20 97 55.050884 1174 1464 1755 2046 60.052336 30 145 8269 40 194 8559 45 218 8850 50 242 9140 COSINE .999391 9381 9370 9360 9350 .999339 9328 9318 9307 9296 .999285 9274 " Corr 9263 10 2 9252 15 3 9240 20 4 6 921840 8 9206 45 9 9194 50 10 9183 .999171 9159 9147 9135 9123 .999||| 9098 9086 9073 906 1 .999048 9036 9023 9010 8997 .998984 8971 8957 8944 8931 - 998917 8904 CORR. FOR SEC. 8890 10 2 8876 15 3 8862 20 5 998778 8763 8749 8734 8719 .998848 30 7 8834 40 9 8820 45 10 .998705 8690 8675 8660 8645 998630 " Corr. 8806 50 12 8792 + VERSINE 000609.000610 0619 C630 0640 0650 0672 199000199000* EXSEC 0682 0693 0620 0630 0640 0651 0683 0694 0704 0704 .000771 0782 0794 0806 0817 0672 .000715.000715 0726 0737 0748 0760 0726 " Corr. 0738 10 2 0749 15 3 0760 20 4 .000829.000830 0841 0853 0865 0877 .000772 30 6 0783 40 8 0795 45 9 0806 50 10 0818 1166 1180 1194 1208 0842 0854 0866 0878 .000889.000890 0902 0914 0927 0939 0902 0915 0927 0940 .000952.000953 0964 0965 0977 0978 0990 0991 1003 10041 .001016 .001017 1029 1030 1043 1044 1056 1057 1069 1070 .001083.001084 1096 1110 1124 1138 1098 " Corr. CORR. FOR SEC. + 1125 15 " Corr. 1111 10 2 10 49 15 73 20 97 .001152.001153 30 1167 40 1139 20 5 .001222.001224 1237 1251 1266 1281 1238 1253 1268 1282 .001295.001297 1310 1325 9 118145 10 1195 50 12 1210 1312 1327 1342 1357 ~MI MOON 1340 1355 .001370.001372 3 CORR. FOR SEC. + " Corr. 10 49 15 73 20 97 30 146 40 194 45 219 50 243 7 30 146 40 194 45 219 50 243 TANGENT 1 .034921 0 5212 5503 2 5794 3 6086 4 5 .036377 6668 6 6960 7 7251 8 7542 9 .037834 10 8125 11 8416 12 8707 13 8999 14 .039290 15 9581 16 9873 17 .040164 18 0456 19 .040747 20 1038 21 1330 22 1621 23 1912 24 .042204 25 2495 26 2787 27 3078 28 3370 29 .043661 30 3952 31 4244 32 4535 33 4827 34 .0451 18 35 5410 36 570137 5993 38 6284 39 .046576 40 6867 41 715942 7450 43 7742 44 .048033 45 8325 46 861747 8908 48 9200 49 .049491 50 9783 51 .050075 52 0366 53 0658 54 050950 55 1241 56 153357 182458 2116 59 .052408 60 464 0.052336 2626 2917 3207 3498 234 5.053788 6678σ 9 || 10.055241 234 12 13 14 16 17 18 19 2~222 2~~~~ ..~♡~ 66588 II 500 85007 HONG 21 23 24 7854 20.058145 8435 8726 9016 9306 26 28 29 25.059597 9887 27.060178 0468 0758 31 15.056693 30 145.998392 30 8 6983 40 194 8375 40 | 32 33 34 30.061048 1339 1629 1920 2210 36 38 SINE 35.062500 2790 3081 3371 3661 41 42 43 44 4079 4369 4660 4950 46 47 48 40.063952 4242 " Corr. 4532 10 48 482315 73 5113 20 97 49 5531 " Corr. 582210 48 611215 73 6402 20 97 51 45.065403 30 145 5693 40 194 5984 45 218 6274 50 242 6564 52 7274 45 218 7564 50 242 50.066854 7145 7435 53 7725 54 8015 56 57 58 59 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 55.068306 8596 8886 9176 9466 60.069756 COSINE 998630 8614 8599 8584 8568 .998552 8537 8521 8505 8489 .998473 8457 Corr. 8441110 3 8424 15 4 8408 20 5 998308 8291 8274 8257 8240 8358 45 12 8342 50 14 8325 .998222 8205 8188 8170 8152 .998135 8117 8099 8081 8063 998045 8027 8008 7990 7972 CORR. FOR SEC. 11 .997763 7743 7724 7704 7684 .997664 7644 7624 7604 7584 1.997564 + |.997953 11 7934 Corr. 7916 10 3 789715 5 7878 20 6 .997859 30 9 7840 40 13 7821 45 14 7802 50 16 7782 3° VERSINE .001370.001372 1386 1401 1416 1432 EXSEC .001448.001450 1463 1479 1495 1511 1388 1403 1418 1434 1625 1642 1658 1675 1466 1481 .001527.001.529 1.543 | 559 1576 1592 1497 1513 .001608.001611130 1545 "Corr. 156210 3 157815 4 1594 20 5 8 162840 11 1644 45 12 1661 50 14 1678 .001692.001695 1709 1726 1743 1760 2160 2179 2198 2218 1712 1729 1746 1763 .001778.001781 1795 1812 1830 1848 1798 1816 1833 1851 .001865.001869 1883 1901 1919 1937 1887 1904 1922 1941 .001955.001959 1973 1977 1992 1996 2010 2014 2028 2033 .002047.002051 2066 2084 2103 2122 " 3 2070 Corr. 2089 10 210815 5 2127 20 6 .002141.002146 30 9 2165 40 13 2184 45 14 2203 50 16 2223 CORR. FOR SEC. + .002237.002242 2257 2276 2296 2316 2262 2282 2301 2321 .002336.002341 2356 2376 2396 2416 .002436.002442 2361 2381 2401 2422 CORR. FOR SEC. + "Corr. 10 49 15 73 20 97 "Corr. 49 10 15 73 20 97 TANGENT 30 146 140 195 145 219 50 243 .052408 2700 2991 3283 3575 .053866 4158 4450 4742 5033 01234 56789 8 30 146.056784 15 40 195 7076 16 45 219 7368 17 50 243 7660 18 7952 19 .055325 10 5617 11 5909 12 6200 13 6492 14 .058243 20 8535 21 8827 22 911923 941 24 .059703 25 9995 26 .060287 27 0579 28 087 29 .061163 30 145531 1747 32 2039 33 2331 34 062623 35 291536 3207 37 3499 38 3791 39 .064083 40 4375 41 4667 42 4959 43 5251 44 .065544 45 5836 46 6128 47 6420 48 6712 49 .067004 50 7297 51 7589 52 788 53 8173 54 .068465 55 8758 56 9050 57 9342 58 9634 59 .069927 60 465 0.069756 0-234 567BD 0-234 DO 1.070047 8 5.071207 9 11 12 10.072658 13 14 16 22222 222~~ ~~~~~ 21 15.074108 30 145 4399 40 193 23 24 17 4689 45 218 18 19 20.075559 5849 6139 6429 6719 26 27 28 29 25.077009 7299 7589 7879 8169 31 32 33 34 SINE 30.078459 8749 9039 37 38 39 55555 0337 0627 0917 41 42 43 44 1497 1788 2078 2368 35.079909 36.080199 51 52 40.081359 3815 ༄གླགླུ 2948 "Corr. 3238 10 48 3528 15 73 3818 20 97 53 54 4979 50 242 5269 56 57 59 9329 9619 46 47 48 49 3968 50.084258 45.082808 30 145 3098 40 193 3388 45 217 3678 50 242 0489 0779 1069 VERSINES, EXSECANTS, AND TANGEnts 4° CORR. FOR SEC. + 11 1939 10 2228 15 2518 20 1649 Corr 48 72 97 55.085707 5997 6286 6576 6866 60.087156 4547 4837 5127 5417 COSINE .997564 7544 7523 7503 7482 997462 7441 7420 7399 7378 .997357 4 7336 " Corr. 7314 10 729315 5 7272 20 7 997250 30 11 7229 40 14 1.997141 7119 7097 7075 7053 7207 45 16 7185 50 18 7163 .997030 7008 6985 6963 6940 .996917 6894 6872 6848 6825 996802 6779 6756 6732 6708 CORR. FOR SEC. .996685 666 I " Corr. 6637 10 4 6614 15 6 6590 20 8 1.996444 6420 6395 457 .996566 30 12 6541 40 16 6517 45 18 6493 50 20 6468 6370 6345 .996320 6295 6270 6245 6220 |.996195 + VERSINE .002436.002442 2456 2477 2497 2518 .002538.002545 2559 2580 2601 2622 2771 2793 2815 2837 EXSEC 002643.002650 2664 2686 2707 2728 2462 2483 2504 2524 2671 " Corr. 2693 10 4 271415 5 2736 20 7 .002750.002757 30 11 2779 40 14 2801 45 16 2823 50 18 2845 3152 3175 2566 2587 .002859.002867 2881 2903 2925 2947 2608 2629 .002970.002979 2992 3015 3037 3060 3459 3483 3507 3532 2889 2911 .003083.003092 3106 3128 2934 2956 3630 3655 3001 3024 3046 3069 .003198.003208 3221 3244 3268 3292 3115 3138 3162 3185 .003315.003326 3339 3350 3363 3386 3410 3232 3255 3279 3302 .003434.003446 30 12 347140 16 3495 45 18 3520 50 20 3544 .003556.003569 3580 3605 337410 3398 15 6 3422 20 8 CORR. FOR SEC. + 3593 3618 3643 3668 .003680 1.003693 3705 3730 3755 3769 3780 3794 .003805 003820 " Corr. 4 3718 3744 CORR. FOR SEC. + 11 Corr. 10 49 15 73 20 97 30 146 40 195 45 219 150 244 " Corr. 10 49 15 73 20 98 30 146 40 195 45 220 50 244 TANGENT .069927 0 .070219 I 0512 2 0804 3 1096 44 .071388 1681 6 1973 2266 8 2558 9 .072850 10 314311 3435 12 3728 13 4020 14 .074313 15 4605 16 4898 17 5190 18 5483 19 .075776 20 6068 21 636122 6653 23 6946 24 .077238 25 75326 7824 27 8116 28 8409 29 078702 30 8994 31 9287 32 9580 33 9873 34 .08016535 0458 36 0751 37 1044 38 1336 39 .081629 40 1922 41 221542 2508 43 2801 44 .083094 45 3387 46 3679 47 3972 48 4265 49 .084558 50 4851 51 5144 52 5437 53 5730 54 .086023 55 631656 6609 57 690258 7196 59 .087489 60 466 0.087156 01234 6O76& 8 9 5.088605 11 234 567B9 12 10.090053 13 14 16 17 18 19 2222 7ºº 87287 COMO DE 9 85887 68788 8 21 23 24 20.092950 3240 3529 3819 4108 26 27 28 29 15.091502 30 145.99580530 13 577840 18 1791 40 193 2081 45 217 5752 45 20 2371 50 241 5725 50 22 2660 5698 25.094398 4688 4977 5267 5556 31 32 33 34 30.095846 6135 6425 6714 7004 36 37 38 39 41 42 43 44 SINE 35.097293 7583 7872 8162 8451 46 47 48 7446 7735 49 8025 8315 51 8894 9184 9474 9764 52 40.098741 9030 " Corr. 9320 10 48 9609 15 72 9899 20 96 45.100188 30 145 0478 40 193 0767 45 217 1056 50 241 1346 53 54 50.101635 1924 2214 2503 2792 56 57 0343 "Corr. 0633 10 48 0922 15 72 121220 97 58 59 55.103082 3371 3660 3950 4239 60.104528 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + COSINE .996195 6169 6144 6118 6093 996067 6041 6015 5989 5963 11 5937 5911 Corr. 5884 10 4 5858 15 7 5832 20 9 995671 5644 5616 5589 5562 .995534 5507 5480 5452 5424 .995396 5368 5340 5312 5284 .995256 5227 5199 5170 5142 CORR. FOR SEC. .995113 5084 " Corr. 5056 10 5 5027 15 7 4998 20 10 994968 30 15 4939 40 20 4910 45 22 488150 24 4851 994822 4792 4762 4733 4703 + 994673 4643 4613 4582 4552 .994522 5° VERSINE .003805.003820 3831 3856 3882 3907 EXSEC 4222 4248 4275 4302 3845 3871 .003933.003949 3959 3975 3985 4001 4011 4037 3897 3923 4411 4438 4027 4053 4063 4089 4133 10 4 4116 4142 4159 15 7 4168 4186 20 9 .004195||.004213 30 13 4240 40 18 4267 45 20 4294 50 22 4321 4080 4106 .004329.004348 4356 4384 4375 4403 4430 4458 .004466.004486 4493 4520 4548 4576 4513 4541 4569 4597 .004604.004625 4632 4660 4688 4716 4653 4682 4710 4738 .004744.004767 4773 4796 4801 4824 4853 4830 4858 4882 .004887.004911 4916 4944 4973 5002 .005178.005205 5208 5238 5267 5297 CORR. FOR SEC. + 4940 4969 10 5 4998 15 7 5028 20 10 .005032.005057 30 15 5061 5090 5086 40 20 511645 22 5146 50 24 5175 5119 5149 5235 5265 5295 5325 005327.005356 5357 5386 5387 5416 5418 5447 5448 5478 .005478.005508 " Corr. " Corr. CORR. FOR SEC. + "Corr. 10 49 15 73 20 98 30 147 40 196 45 220 50 244 " Corr. 10 49 15 73 20 98 30 147 40 196 45 220 50 245 TANGENT .087489 0 7782 I 8075 2 8368 3 8661 4 .088954 5 7 9248 6 9541 9834 8 .090127 9 0421 10 0714 11 1007 12 1300 13 1594 14 .091887 15 2180 16 2474 17 2767 18 3061 19 .093354 20 364721 3941 22 4234 23 452824 .09482125 511526 5408 27 5702 28 5996 29 .096289 30 6583 31 6876 32 7170 33 746434 .097757 35 8051 36 8345 37 8638 38 8932 39 099226 40 952041 981342 .100107 43 040144 .10069545 0989 46 1282 47 1576 48 1870 49 .102164 50 2458 51 2752 52 3046 53 334054 .103634 55 3928 56 4222 57 451658 4810 59 .105104 60 467 1 0.104528 4818 5107 01234 567∞σ 9 5.105975 TI -234 12 10.107421 13 14 16 17 18 22222 -234 21 22 23 24 15.108867 30 145 9156 40 193 9445 45 217 9734 50 241 19.110023 20.110313 2272 8~~♡~ ❤❤❤ 26 28 29 32 25.11758 2047 2336 2625 2914 37 SINE 41 42 43 44 5396 5686 30.113203 3492 3781 46 47 g ggg g 5ངྒོ 6264 6553 33 4070 34 4359 48 6842 7132 35.114648 4937 5226 5515 5804 49 56 57 " Corr. 48 7710 799910 828815 72 8578 20 96 0602 0891 40.116093 6382 " Corr. 667110 48 6960 15 72 7248 20 96 45.117537 30 144 7826 40 193 8115 45 217 8404 50 241 8693 58 59 1180 1469 50.1.18982 9270 51 52 9559 53 9848 54.120137 55.120426 VERSINES, EXSECANTS, AND TANGENTS CORR. FOR SEC. + 0714 1003 1292 1581 60.121869 COSINE .994522 4491 4461 4430 4400 .994369 4338 4307 4276 4245 .994214 4182 4151 TO 5 4120 15 8 4088 20 || .993897 3865 3833 3800 3768 .994056 30 16 4025 40 21 3993 45 24 3961 50 26 3929 .993736 3703 3670 3638 3605 .993572 3539 3506 3473 3440 .993406 3373 3339 3306 3272 CORR. FOR SEC. " Corr. .993238 3204 " Corr. 3171 10 6 3137 15 9 3103 20 | .992896 2862 2827 993069 30 17 3034 40 23 3000 45 26 2966 50 29 2931 2792 2757 992722 2687 2652 2617 2582 1.992546 6° VERSINE EXSEC .005478.005508 5509 5539 5539 5570 5570 5601 5600 5632 .005631.005663 5662 5693 5724 5755 5694 5726 5757 5788 .005786.005820 5818 5849 5880 5912 5852 Corr. 588310 5 5915 15 8 5947 20 11 .005944.005979 30 16 5975 60 40 21 6044 45 24 607650 27 6108 6007 6039 6071 .006103.006140 6135 6173 6167 6206 6238 6200 6232 6271 .006264.006304 6297 6330 6362 6395 6527 6560 6337 6370 6403 6436 .006428.006470 6461 6494 6503 6537 6570 6604 .006594.006638 6627 6661 6694 6728 6671 6705 6739 6774 .006762.006808 6796 6829 6863 6897 .007104.007154 7138 7173 7208 7243 .006931.006980 30 17 6966 7015 40 23 7049 45 26 7084 50 29 7000 7034 7069 7119 7190 7225 7260 7296 .007278.007331 7313 7348 7383 7418 .007454.007510 CORR. FOR SEC. + 11 6842 "Corr." Corr. 6876 10 6 10 49 69115 9 6945 20 12 15 74 20 98 7367 7402 7438 7474 CORR. FOR SEC. + " Corr. 10 49 15 74 20 98 30 147 40 196 45 221 50 245 130 147 40 197 45 221 50 246 TANGENT .105104 5398 5692 5987 6281 .106575 6869 01234 56789 7163 7 7458 7752 9 .108046 10 8340 11 8635 12 8929 13 922314 .109518 15 981216 .110107 17 0401 18 0696 19 . I 10990 20 1284 21 1579 22 1873 23 216824 .112462 25 2757 26 3052 27 3346 28 3641 29 .113936 30 423031 4525 32 482033 511434 .115409 35 5704 36 5999 37 6294 38 6588 39 .11688340 717841 7473 42 7768 43 8063 44 .118358 45 865346 8948 47 9243 48 9538 49 .19833 50 .1201285ĺ 0423 52 0718 53 101354 .121308 55 1604 56 1899 57 219458 2489 59 .122785 60 468 0.121869 2158 2447 01234 BONBO 6 7 5.123313 8 9 0123⇒ 10.124756 11 12 13 14 5045 "Corr. 5333 TO 48 562215 72 5910 20 96 15.126199 30 144 648840 192 17 6776 45 216 16 7065 50 241 7353 0 20 207** 87♡♡ 21 22 23 24 20.127642 7930 8219 8507 8796 26 28 25.129084 9372 9661 9949 31 32 29.130238 30.130526 33 34 F 41 42 43 44 SINE 35.131968 36 2256 37 2545 38 2833 39 3121 46 47 40.133410 48 2736 3024- g gགླ$ ༄གྲུཤྩg 5ཆོ 49 3602 3890 4179 4467 51 45.134851 30 144 5139 40 192 5427 45 216 5716 50 240 6004 52 53 54 56 0815 1103 50.136292 6580 6868 7156 7444 57 1391 1680 58 59 55.137733 8021 8309 8597 8885 3698 " Corr. 398610 48 4274 15 72 4563 20 96 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.139173 COSINE .992546 2511 2475 2439 2404 ||.992368 2332 2296 2260 2224 .992187 #1 2151 Corr. 2115 10 2078 15 2042 20 12 .991820 1783 1746 1709 1671 .992005 30 18 1968 40 25 1931 45 28 1894 50 31 1857 .991634 1596 1558 1521 1483 .991445 1407 1369 1331 1292 .991254 1216 1177 1138 1100 CORR. FOR SEC. .991061 1022 0983 10 7 094415 10 0905 20 13 990669 0629 0589 0549 0510 loon 990469 0429 0389 .990866 30 20 0827 40 26 0787 45 29 0748 50 33 0708 0349 0308 990268 + "Corr. 7༠ VERSINE .007454.007510 7489 7546 7525 7582 7561 7618 7596 7654 EXSEC .007632.007691 7668 7704 7740 7776 7922 7958 .007813.007874 7849 7885 7727 7764 7800 7837 .008180.008247 8217 8254 8291 8329 .007995.008060 30 19 8032 8097 40 25 8134 45 28 8172 50 31 8069 8106 8143 8209 7911 Corr. 794810 6 7985 15 9 8022 20 12 .008366.008437 8404 8442 8479 8517 9173 9213 8285 8323 8361 8399 9252 9292 8475 8514 .008555.008629 8593 8631 8669 8708 8552 8590 .008746.008823 8784 8823 8862 8900 8668 8706 8745 8784 8862 8902 8941 8980 .008939.009020 8978 9017 9059 " Corr. 9099 10 7 9056 913915 10 9095 9178 20 13 .009134.009218 30 20 9258 40 27 9298 45 30 9339 50 333 9379 .009331.009419 9371 9411 9451 9490 #1 " 9460 9500 9541 9582 CORR. FOR SEC. + .009531.009622 9571 9611 9651 9692 .009732.009828 9663 9704 9745 9786 CORR. FOR SEC. + Corr. 10 49 15 74 20 99 30 148 40 197 45 222 50 246 • TANGENT 122785 3080 3375 3670 3 3966 .124261 4557 4852 5147 0123➡ 5678σ 5443 9 .12573810 603411 6329 12 6625 13 69201 14 .127216 15 7512 16 7807 17 8103 18 8399 19 128694 20 8990 21 9286 22 9582 23 9877 24 .130173 25 0469 26 0765 27 1061 28 1357 29 .131652|30 1948 31 2244 32 2540 33 2836 34 .133132 35 3428 36 3725 37 4021 38 4317 39 .134613 40 " Corr. 4909 41 10 49 520542 15 74 5502 43 20 99 5798 44 30 148.136094 | 45 40 198 6390 46 45 222 50 247 6687 47 6983 48 7279 49 .137576 50 7872 51 816852 8465 53 8762 54 .139058 55 9354 56 965157 9948 58 .140244 59 140541 60 469 0.139173 9461 9749 3.140037 0325 1234 6O7Bσ 5.140613 0901 1189 1477 1765 8 9 10.142053 0-234 DONO || 12 13 14 16 17 18 22 22 15.143493 30 144 3780 40 192 4068 45 216 435650 240 4644 19 21 22 20.144932 5220 5508 23 24 26 27 28 29 25.146371 8 6686 UNDO 55555 £5555 wwwww wwwww 36 30.147809 8097 8385 8672 8960 37 39 35.149248 9535 9823 38.15011| 0398 SINE 42 43 44 40.150686 46 47 48 49 2341 " Corr. 2629 10 48 291715 72 3205 20 96 51 5795 6083 52 53 54 45.152123 30 144 2411 40 192 2698 45 216 2986 50 240 3273 6658 6946 7234 7522 56 50.15356| 3848 4136 4423 4710 57 58 59 55.154998 5285 5572 5860 6147 VERSINES, EXSECANTS, AND TANGENTS 8° CORR. FOR SEC. + # 0973 Corr. 1261 TO 48 1548 15 72 1836 20 96 60.156434 COSINE ------ .990268 0228 0187 0146 0106 .990065 0024 .989983 9942 9900 .989859 9818 " Corr. 9776 10 7 973515 10 9693 20 14 989651 30 21 9610 40 28 9568 45 31 9526 50 35 9484 .989442 9399 9357 9315 9272 .989230 9187 9144 9102 9059 .989016 8973 8930 8886 8843 .988800 8756 8713 8669 8626 .988582 CORR. FOR SEC. n 8538 Corr. 8494 10 7 8450 15 | 8406 20 15 .988362 30 22 8317 40 29 8273 45 33 8228 50 37 8184 .988139 8094 8050 8005 7960 .987915 7870 7824 7779 7734 .987688 + VERSINE .009732.009828 9772 9813 9854 9894 EXSEC 9869 9910 .009935.010035 9976 .010017 0058 0100 9952 9993 0898 0941 0077 0119 0161 0203 .010141.010245 0182 0287 "Corr. 0224 0329 10 7 0265 0372 15 11 0307 041420 14 .010349.010457 30 21 0390 050040 28 0542 45 32 058550 36 0432 0474 0516 0628 .010558.010671 0601 0643 0685 0728 .010770.010888 0813 0856 0714 0757 0801 0844 1683 1727 1772 1816 0931 0975 1018 1062 .010984.011106 1027 1070 1114 1157 | 150 1194 1238 1283 .011200.011327 1244 1287 1331 1374 1372 1416 1461 1505 .011418.011550 1462 1506 1550 1594 .011638.011776 30 23 1821 40 30 1866 45 34 1912 50 38 1958 .011861.012003 1906 1950 1995 2040 CORR. FOR SEC. + 2049 2095 2141 2187 " 1595 Corr." Corr. 1640 10 8 168515 1 1730 20 15 10 50 15 74 20 99 .012085.012233 2130 2176 2221 2266 .012312.012465 2279 2326 2372 2418 CORR. FOR SEC. + " Corr. 10 50 15 74 20 99 30 149 40 198 45 223 50 248 30 149 40 199 45 223 50 248 TANGENT 1 140541 I 0838 1134 2 1431 3 1728 4 .142024 5 2321 6 2618 7 2915 8 3212 9 .143508 10 3805 1 4102 12 439913 4696 14 .144993 15 5290 16 5587 17 5884 18 6181 19 .146478 20 6776 21 7073 22 7370 23 7667 24 .147964 25 8262 26 8559 27 8856 28 9154 29 .149451 30 9748 31 .150046 32 0343 33 0641 34 .150938 35 1236|36 1533 37 1831 38 2128 39 .152426 40 2724 41 3022 42 331943 3617 44 .15391545 4212 46 4510 47 480848 5106 49 .155404 50 570251 6000 52 6298 53 659654 .156894 55 719256 7490 57 7788 58 8086 59 .158384 60 470 0.156434 1234 5O769 5.157871 16 17 18 19 2222 10.159307 21 22 23 24 11 ││ 9594 Corr. 12 988 10 48 13.160168 15 72 14 0456 20 96 15.160743 30 144 103040 191 131745 215 1604 50 239 1891 20.162178 2465 2752 3039 3326 26 27 28 29 SINE wwwww wwwww 6722 7009 7296 7584 25.163613 3900 4187 4474 4761 41 42 43 4444 8158 8445 g gགླ་ྒུ༄གླུཤྩgČཆོ 8732 9020 35.166482 6769 7056 7342 7629 52 53 40.167916 54 56 57 58 165048 5334 5621 5908 6195 50.170783 1069 1356 1642 1929 45.169350 30 143 9636 40 191 9923 45 215 46 47 48.170210 50 239 49 0496 8203 8489 10 " Corr. 48 8776 15 72 9063 20 96 55.172216 2502 2789 3075 3362 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.173648 6255 COSINE 987688 7643 7597 7551 7506 987460 7414 7368 7322 7275 .987229 7183 7136 10 8 7090 15 12 7043 20 16 |.986996 30 23 6950 40 31 6903 45 35 6856 50 39 6809 986762 6714 6667 6620 6572 .986525 6477 6429 6382 6334 .986286 6238 6189 6141 6093 .986044 5996 5948 5899 5850 985309 5259 5209 CORR. FOR SEC. 5159 5109 .985801 5752 " Corr. 5704 10 8 565415 12 5605 20 16 985556 30 25 5507 40 33 5457 45 37 5408 50 41 5358 985059 5009 4959 4909 4858 .984808 + "Corr. 9° VERSINE .012312.012465 2357 2403 2449 2494 EXSEC .012540.012700 2586 2747 2632 2794 2678 2841 2725 2889 2512 2559 2606 2652 .012771.012936 " 2817 2864 2910 2984 Corr. 3031 10 8 307915 12 2957 3127 20 16 .013004 ||.013175 30 24 3050 3223 40 32 3271 45 36 3097 3144 3319 50 40 3191 3368 .013238.013416 3286 3333 3380 3428 4004 4052 4101 4150 .013475.013660 3523 3571 3618 3666 3465 3513 4493 4543 4592 4642 3562 3611 .013714.013905 3762 3811 3859 3907 4841 4891 3708 3757 3807 3856 |.013956 .014153 4203 4253 4303 4353 3954 4004 4054 4103 .014199.014403 4248 4296 4346 4395 .014444.014656 30 25 4706 40 34 4757 45 38 4808 50 42 4859 CORR. FOR SEC. + |.014691 ||.014910 4741 4962 4791 5013 5064 5116 4454 "Corr. 4504 10 8 455415 13 4605 20 17 .014941.015167 4991 5219 5041 5271 5091 5323 5142 5375 .015192 .015427 CORR. FOR SEC. + "Corr. 10 50 15 75 20 100 " Corr. 10 50 15 75 20 100 TANGENT .158384 8683 30 150 40 200 45 225 50 250 8981 9279 9577 .159876 .160174 0472 0771 1069 01234 56789 30 149.162860 15 40 199 3159 16 145 224 3458 17 50 249 3756 18 4055 19 161368 10 1666 11 1965 12 2263 13 2562 14 .164354 20 4652 21 495 22 5250 23 5549 24 .165848 25 6147 26 6446 27 6745 28 7044 29 167343 30 7642 31 7941 32 824033 8539 34 .168838 35 913736 9437 37 9736 38 .170035 39 170334 40 063441 0933 42 1232 43 153244 .171831 45 2131 46 2430 47 2730 48 303049 .173329 | 50 3629 51 3928 52 4228 53 4528 54 .17482855 512856 5427 57 5727 58 6027 59 176327 60 471 : 0.173648 01234 567∞M OI231 8 5.175080 9 II 12 10.176512 13 14 16 5878 ❤ 17 18 19 ~~ 15.177944 30 143 8230 40 191 8516 45 215 8802 50 239 9088 AUGE N°° 8.~♡~ 6888 23 99509 85õõõ kubog 8 21 22 24 20.179375 9661 9947 23.180233 0519 25.180805 1091 1377 1664 1950 26 27 29 31 32 34 30.182236 2522 2808 3094 3380 36 37 38 35.183665 3951 4237 SINE 41 42 44 3935 4221 4508 4794 46 5367 5653 5940 6226 40.185095 49 52 53 54 11 6798 Corr. 7085 10 48 737115 72 7657 20 95 56 57 4523 4809 45.18652430 143 681040 190 7096 45 214 738 50 238 7667 50.187953 8238 8524 8810 9095 55.189381 9667 9952 58.190238 0523 VERSINES, EXSECANTS, AND TANGENTS 10° CORR. FOR SEC. + 5381 " Corr. 5667 TO 48 595215 71 6238 20 95 60.190809 COSINE .984808 4757 4707 4656 4605 984554 4503 4452 4401 4350 .984298 11 4247 Corr. 4196 10 9 4144 15 13 4092 20 17 .984041 30 26 3989 40 35 3937 45 39 3885 50 43 3833 .983781 3729 3676 3624 3572 .983519 3466 3414 3361 3308 983255 3202 3149 3096 3042 .982989 2935 2882 2828 2774 982721 CORR. FOR SEC. 2667" Corr. 2613 10 9 2559 15 14 2505 20 18 .982450 30 27 2396 40 36 2342 45 41 2287 50 45 2233 982178 2123 2069 2014 1959 .981904 1848 1793 + 1738 1683 981627 VERSINE .015192.015427 5243 5293 5344 5395 EXSEC .015446.015688 5497 5548 5599 5650 5479 5531 5583 5636 6011 6063 6115 6167 .015702.015952 5753 5804 5856 5908 5741 5793 5846 5899 6005 " Corr. 6058 10 9 615 13 6165 20 18 .015959.016218 30 27 6272 40 36 6325 45 40 6379 50 45 6433 .016219.016486 6271 6324 6376 6649 6428 6703 7172 7226 6540 6595 .016481.016757 6534 6586 6639 6692 6812 6866 6921 6976 .016745.017030 6798 6851 6904 6958 7085 7140 7195 7250 .017011.017306 7065 7118 7361 7416 7472 7528 017279.017583 7333 7387 7441 7495 7639 " Corr. 7695 10 9 7751 15 14 7807 20 19 .017550.017863 30 28 7604 7658 7919 40 37 7976 45 42 803250 47 7713 7767 8089 .017822.018145 7877 7931 7986 8041 CORR. FOR SEC. + 8202 8259 8316 8373 .018096.018430 8152 8487 8207 8544 8262 8602 8317 8659 .018373 .018717 CORR. FOR SEC. + Corr. 10 50 15 75 20 100 30 150 40 200 45 225 50 250 " Corr. 10 50 15 75 20 100 30 151 40 201 45 226 50 251 TANGENT 1 .176327 6630 6927 7227 7527 .177827 0 1231 5 8127 6 8427 7 8727 8 9028 9 .179328 10 9628 11 9928 12 .180229 13 0529 14 .180830 15 1130 16 1430 17 1731 18 2031 19 . 182332 20 2632 21 2933 22 3234 23 3534 24 183835 25 4136 26 4436 27 4737 28 5038 29 . 185339 30 5640 31 5941 32 624233 6543 34 .186844 35 7145 36 7446 37 7747 38 8048 39 .18835040 865141 8952 42 9253 43 9555 44 .189856 45 .190157 46 0459 47 0760 48 1062 49 .191363 50 1665 51 1966 52 2268 53 2570 54 .192871 55 3173 56 3475 57 3777 58 4078 59 .194380 60 472 0.190809 0-23A BONBO 4 6 9 5.192236 || 12 13 14 10.193664 DONOR OU~~2 20702 87♡♡7 20788 222 17 18 " Corr. 3949 423410 48 4520 15 71 4805 20 95 15.195090 30 143 5376 40 190 5661 45 214 5946 50 238 6231 22 21 22 20.196517 6802 7087 7372 7657 23 24 26 28 29 25.197942 8228 8513 8798 9083 31 32 34 30.199368 9653 9938 33.200223 0508 36 37 38 35.200793 1078 1363 1648 1933 42 SINE 43 44 1094 1380 40.202218 46 47 48 49 1666 1951 85087 KONGO 8 2522 2807 3093 3378 51 52 53 54 56 50.205066 57 59 2502 " Corr. 278710 47 307215 71 3357 20 95 55.206489 4496 50 237 4781 5350 5635 5920 6204 TABLE XX.-NATURAL SINES, COSINEs, CORR. FOR SEC. + 45.203642 30 142.979046 30 3926 40 190 421 45 214 6773 7058 58 7343 7627 60.207912 COSINE .981627 1572 1516 1460 1404 980500 0443 0386 0329 0271 .981349 1293 1237 1180 π 1124 .981068 1012 Corr. 0955 10 9 0899 15 14 0842 20 19 .980785 30 28 0728 40 38 0672 45 43 0615 50 47 0558 .980214 0156 0098 0040 .979983 .979925 9867 9809 9750 9692 .979634 9575 9517 9458 9399 - CORR. FOR SEC. 978748 8689 8629 8569 8509 + .979341 9282 " Corr. 922310 10 9164 15 15 9105 20 20 978449 8389 8329 8268 8208 .978148 8986 40 40 8927 45 44 8867 50 49 8808 11° VERSINE .018373.018717 8428 8484 8540 8596 8820 8876 .018651.019006 8707 8763 9045 9101 9158 EXSEC .018932.019297 9272 9328 9385 9442 8774 8832 8890 8948 8988 9356 Corr. 9415 10 10 9473 15 15 9532 20 20 .019215.019591 30 9650 40 9709 45 976950 9828 9671 9729 9064 9122 9180 9239 .019500.019887 9557 9947 9614.020006 0483 0542 0601 .019786.020186 9844 9902 9960 .020017 0066 0126 1073 1133 | 192 .020075.020487 0133 0191 0250 0308 0246 0306 0366 0426 .020366.020790 0425 0851 0912 0973 1034 0547 0608 0668 0729 .020659.021095 0718 0777 0836 0895 30.020954.021403 30 31 1014 1465 40 41 CORR. FOR SEC. + 1157 " Corr. 121810 10 15 1341 | 20 21 1280 15 .021252.021713 1311 1371 1431 1491 29 39 44 49 1527 45 46 1589 50 51 1651 1776 1838 1900 1963 .021551.022026 1611 2088 1671 2151 1732 2214 1792 2277 .021852 .022341 CORR. FOR SEC. + π 10 50 15 76 20 101 Corr. 30 151 40 202 45 227 50 252 " Corr. 10 51 15 76 20 101 30 152 40 202 45 228 50 253 TANGENT .194380 4682 4984 5286 5588 1 01234 5678✪ .195890 6192 6494 6796 7099 9 8 .197401 10 7703 11 8005 12 8308 13 8610 14 .198912 15 9215 16 9517 17 9820 18 .200122 19 .200425 20 0727 21 1030 22 1333 23 1635 24 .201938 25 2241 26 2544 27 2846 28 3149 29 .203452 30 3755 31 405832 436133 4664 34 .204967 35 5270136 5574 37 5877 38 6180 39 .206483 40 6787 41 7090 42 7393 43 7697 44 .208000 45 8304 46 860747 8911 48 921449 .209518 50 9822 51 .210126152 0429 53 0733 54 .211037 55 134156 1645 57 1949 58 2252 59 .212557 60 473 0.207912 8196 8481 0-23= 4 10 66789 0-2MT DON 5.209334 9619 9903 8.210187 0472 || 10.210756 12 13 14 16 17 18 19 15.212178 30 142 2462 40 189 2746 45 213 3030 50 237 3315 ~~~~~ ~~~~~ ..~87 68 21 20.213599 3883 4167 4451 4735 22 23 24 34 50 26 27 25.215019 28 29 32 33 34 36 37 38 39 30.216440 6724 7008 བྲཱཎྜཱམྦྷཏྠ SINE 42 35.217859 8143 8427 8711 8995 44 8765 9050 46 47 48 49 40.219279 11 9562 Corr. 9846 10 47 43.220130 15 71 0414 20 95 51 234 OKZ KONA8 8 " Corr. 1040 1325 10 47 1609 15 71 1893 20 95 52 53 5304 5588 5872 6156 45.220697 30 142 0981 40 189 1265 45 213 1548 50 236 1832 50.222116 2399 2683 2967 3250 54 7292 7575 56 57 58 59 55.223534 VERSINES, EXSECANTS, AND TANGENTS 12° CORR. FOR SEC. + 3817 4101 4384 4668 60.224951 COSINE .978148 8087 8026 7966 7905 976922 6859 6797 .977844 7783 7722 7661 TT 7600 .977539 7477 Corr. 7416 10 10 7354 15 15 7293 20 21 .977231 30 31 7169 40 41 7108 45 46 7046 50 51 6984 6735 6672 .976610 6547 6484 6422 6359 .976296 6233 6170 6107 6044 .975980 5917 5853 5790 5726 CORR. FOR SEC. .975662 5598 5534 10 547115 5406 20 975020 4956 4891 4826 4761 .975342 30 5278 40 5214 45 5149 50 5085 .974696 4631 4566 4501 4436 974370 + " Corr. || 16 21 32 43 48 53 VERSINE EXSEC .021852.022341 1913 1974 2034 2095 2404 2467 2531 2594 .022156.022658 2217 2278 2339 2400 2722 · 2785 2849 2913 .022461.022977 2523 2584 2646 2707 " Corr. 3042 3106 10 3170 15 16 3235 20 21 .022769.023299 30 2831 336440 342945 3494 50 2892 2954 3016 3559 .023078.023624 3141 3203 3265 3328 3689 3754 3820 3885 .023390.023950 3453 3516 3578 3641 4722 4786 4851 4915 4016 4082 4148 4214 .023704.024280 3767 4346 3830 4412 3893 4478 3956 4544 .024020.02461| 4083 4147 4210 4274 4678 4744 4811 4878 .024338.024945 4402 4466 4529 4594 5012 " Corr. 5079 10 || 5146 15 17 5214 20 22 22 .024658.025281 30 34 5349 40 45 5416 45 51 5484 50 56 5552 .024980.025620 5044 5109 5174 5239 5688 5756 5824 5892 CORR. FOR SEC. + .025304.025961 5369 5434 5499 5564 025630.026304 6029 6098 6166 6235 32 43 49 54 CORR. FOR SEC. + " Corr. 10 51 15 76 20 102 30 152 40 203 45 228 50 254 " Corr. 10 51 15 76 20 102 30 153 40 204 45 229 50 255 TANGENT 1 .212557 0 2861 3165 3469 3773 .214077 01234 2 5 4381 6 4686 7 4990 8 5294 9 .215599 10 5903 1 6208 12 6512 13 6817 14 .217121 15 7426 16 7731 17 8035 18 8340 19 .218645 20 8950 21 9254 22 9559 23 9864 24 .220169 25 0474 26 0779 27 1084 28 1390 29 .221695 30 2000 31 2305 32 2610 33 2916 34 .223221 35 3526 36 3832 37 4137 38 4443 39 .224748 40 5054 41 5360 42 5665 43 597 44 .226277 45 6583 46 6888 47 719448 7500 49 .227806 50 8112 51 8418 52 8724 53 9031 54 .229337 55 9643 56 9949 57 .230256 58 0562 59 .230868 60 474 0.224951 01234 5678 O 5.226368 6 9 11 12 234 10.227784 13 14 16 17 19 22222 21 23 24 15.229200 30 142 948440 189 9767 45 212 18.230050 50 236 0333 20.230616 0899 1182 1465 1748 26 27 28 29 866466 100º 55555 £55±5 wwwww wwwww 25.232031 2314 2597 2880 3102 36 30.233445 3728 4011 4294 4577 37 38 39 35.234859 5142 5425 5708 5990 41 SINE 42 43 5234 5518 5801 6085 40.236273 46 6651 6935 7218 7501 47 48 49 51 52 8068 " Corr. 835110 47 863415 71 8917 20 94 53 45.237686 30 141 7968 40 188 8251 45 212 8534 50 235 8816 56 57 50.239098 9381 9663 9946 58 59 54.240228 55.240510 6556 " Corr. 6838 10 47 71215 71 7403 20 94 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 0793 1075 1357 1640 60.241922 COSINE .974370 4305 4239 4173 4108 974042 3976 3910 3844 3778 .973045 2978 2910 2843 2776 973712 3645 " Corr. 357910 11 3512 15 17 3446 20 22 973379 30 33 3312 40 44 3246 45 50 3179 50 56 3112 .972708 2641 2573 2506 2438 .972370 2302 2234 2166 2098 .972029 1961 1893 1824 1755 CORR. FOR SEC. .971342 30 .971687 1618 " Corr. 1549 10 12 1480 15 17 1411 20 23 970995 0926 0856 0786 0716 + 970647 0577 0506 1273 40 46 1204 45 52 1134 50 58 1065 0436 0366 970296 13° VERSINE .025630.026304 5695 6373 5761 6442 5827 6511 5892 6581 EXSEC .025958.026650 6024 6090 6156 6222 6719 6789 6859 6928 .026288.026998 6355 7068 " Corr. 7138 10 12 6421 6488 7208 15 18 6554 7278 20 23 23 .026621.027349 30 35 7419 40 47 7490 45 53 6821 7560 50 59 6888 7631 6688 6754 026955.027702 7022 7090 7157 7224 .027292.028057 7359 7427 17494 7562 8176 8245 7773 7844 7915 7986 .027630.028415 7698 7766 7834 7902 8129 8200 8272 8343 9214 9284 .027971.028776 8039 8107 8487 8559 8631 8703 .028313.029138 8382 8451 8520 8589 35.028658.029503 30 37 8727 8796 8866 8935 9797 9577 40 49 9650 45 55 9724 50 61 8848 8920 8993 9066 .029005.029871 9074 9945 9144.0300 1.9 0093 0167 CORR. FOR SEC. + 9211 " Corr. 9284 10 12 9357 15 18 9430 20 24 029353.030241 9423 9494 9564 9634 .029704.030614 0315 0390 0464 0539 CORR. FOR SEC. + "Corr. 10 51 15 77 20 102 30 153 40 205 45 230 50 256 "Corr. 10 51 15 77 20 103 30 154 40 206 45 231 50 257 TANGENT .230868 1175 1481 1788 2094 .232401 2707 1 0-231 Borg 0-234 567 5 6 7 30141 3321 8 3627 9 .233934 10 424111 4548 12 4855 13 5162 14 .235469 15 5776 16 6083 17 6390 18 6697 19 .237004 20 731221 7619 22 7926 23 8234 24 .23854 25 8848 26 9156 27 9464 28 9771 29 .240079 30 0386 31 0694 32 100233 1310 34 .24161835 1926 36 2233 37 2541 38 2849 39 243158 40 3466 41 3774 42 4082 43 4390 44 .244698 45 500746 5315 47 5624 48 5932 49 .246240 50 6549 51 6858 52 7166 53 747554 .247784 55 8092 56 840157 8710 58 9019 59 249328 60 475 0.241922 2204 2486 2768 3051 I2222 222 1231 0-231 DON00 0-2M² DONO ONEZ PON** OZ~m7 ❤❤♪❤. O 00 85887 HONOR 8 4 5.243333 3615 3897 4179 4461 6 8 9 10.244743 12 13 14 16 17 18 15.246153 30 141 6435 40 188 671745 211 6999 50 235 7281 19 21 20.247563 7844 8126 8408 8690 22 23 24 26 25.248972 27 28 31 32 29.250098 30.250380 0662 0943 1225 1506 33 34 36 37 35.251788 38 39 41 42 43 44 46 47 SINE 40.253195 48 49 51 52 45.254602 30 141 4883 40 188 5164 45 211 5446 50 234 5727 53 5025 " Corr. 5307 10 47 5589 15 70 5871 20 94 54 50.256008 9253 9535 9817 56 57 58 2069 2351 2632 2914 59 55.257414 " Corr. 3477 3758 0 47 4039 15 70 4321 20 94 6289 6570 6852 7133 VERSINES, EXSECANTS, AND TANGENTS 14° CORR. FOR SEC. + 7695 7976 8257 8538 60.258819 COSINE .970296 0225 0155 0084 0014 .969943 9872 9801 9730 9659 .969588 9517 " Corr. 9445 10 12 9374 15 18 9302 20 24 .969231 30 9159 40 968872 8800 8728 8656 8583 .968511 8438 8366 8293 8220 9088 45 54 9016 50 60 8944 .968148 8075 8002 7929 7856 .967782 7709 7636 7562 7489 CORR. FOR SEC. .967415 + 967046 30 7342 " Corr. 7268 10 7194 15 7120 20 966675 6600 6526 6451 6376 36 48 .966301 6226 6151 6076 600 I 965926 6972 40 49 6898 45 56 6823 50 62 6749 DREW VERSINE .029704.030614 9775 9845 9916 9986 EXSEC .030057.030989| 0128 0199 0270 0341 0841 0912 0688 0763 0838 0913 0984 1056 .030412.031366 0483 0555 0626 0698 1064 1139 1215 1290 .030769.031746 30 38 1822 40 51 1898 45 57 1975 50 64 2052 1442 "Corr. 1518 10 13 1594 15 19 1670 20 25 .031128.032128 1200 1272 1344 1417 3028 3102 3177 3251 2205 2282 2359 2436 .031489.032513 1562 1634 1707 1780 2590 2668 2745 2823 .031852.032900 1925 1998 2071 2144 2978 3056 3134 3212 .032218.033290 2291 2364 2438 2511 3368 3447 3525 3604 .032585.033682 2658 2732 2806 2880 Corr. 3761 3840 10 13 3919 15 20 3998 20 26 .032954.034077 30 40 4156 40 53 53 4236 45 59 4315 50 66 4395 .033325.034474 3400 3474 3549 3624 4554 4634 4714 4794 CORR. FOR SEC. + 033699.034874 3774 3849 3924 3999 034074.035276 = 4954 5035 5115 5196 CORR. FOR SEC. + " Corr. 10 52 15 77 20 103 30 155 40 206 45 232 50 258 " Corr. 10 52 15 78 20 104 30 156 40 207 45 233 50 259 1 TANGENT .249328 0 9637 T 9946 2 .250255 3 0564 4 .250873 5 1183 6 1492 7 1801 8 21119 .252420|10 2729 1 3039 12 3348 13 3658 14 .253968 15 4277 16 4587 17 4897 18 5207 19 .255516 20 5826 21 6136 22 6446 23 6756 24 .257066 25 7377 26 7687 27 7997 28 8307 29 .258618 30 8928 31 9238 32 9549 33 9859 34 .260170 35 0480 36 079 i 37 1102 38 1413 39 .26172340 2034 41 2345 42 2656 43 2967 44 263278 45 3589 46 390047 4211 48 4523 49 .264834 50 5145 51 5457 52 5768 53 6079 54 266391 55 6702 56 7014157 7326 58 7637 59 .26794960 476 · 0.258819 9100 9381 O-234 SOTHO 0-237 56 6 5.260224 8 9 12 13 :0.261628 14 16 17 18 19 21 22 23 24 22 ***** 8.♡♡~ 68788 GENRE BU90 85087 KAKAO 8 15.263031-130 140 3312 40 187 3592 45 210 3873 50 234 4154 20.264434 4715 4995 5276 5556 25.265837 6117 27 6397 26 6678 28 29 6958 31 32 33 34 30.267238 7519 7799 8079 8359 36 37 38 39 35.268640 8920 9200 9480 9760 41 SINE 42 43 444 9662 9943 40.270040 46 0504 0785 1066 1347 47 51 1908 " Corr. 2189 10 47 2470 15 70 2751 20 94 45.271440 53 54 56 58 59 50.272840 3120 52 3400 48 2280 150 233 49 2560 0320 " Corr. 060010 47 0880 15 70 1160 20 93 30 140 1720 40 187 2000 45 210 55.274239 4519 57 4798 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 3679 3959 5078 5358 60 .275637 COSINE .965926 5850 5775 5700 5624 .965548 5473 5397 5321 5245 .964404 4327 4250 4173 4095 .965169 13 5093 "Corr. 501610 494015 4864 20 .964787 30 19 25 38 4711 40 51 4634 45 57 4557 50 64 4481 .964018 3941 3863 3786 3708 .963630 3553 3475 3397 3319 .963241 3163 3084 3006 2928 CORR. FOR SEC. 962849 2770 " Corr. 269210 13 2613 15 20 2534 20 26 + .962455 30 40 2376 40 53 2297 45 59 2218 50 66 2139 .962059 1980 1900 1821 1741 .961662 1582 1502 1422 1342 .961262 15° VERSINE EXSEC .034074.035276 4150 4225 4300 4376 5357 5438 5519 5600 .034452.035681 4527 4603 4679 4755 5762 5844 5925 6006 .034831.036088 4907 4984 5060 5136 5827 5905 6170 Corr. 6252 10 14 6334 15 21 6416 20 27 .035213.036498 30 41 658040 55 6662 45 62 5443 6745 50 68 5519 6828 5289 5366 .035596.036910 5673 6993 5750 7076 7159 7242 .035982.037325 6059 7408 6137 7492 7575 6214 6292 7658 .036370.037742 6447 6525 6603 6681 7826 7910 7994 8078 .036759.038162 6837 6916 6994 7072 8246 8331 8415 8500 .037151.038584 7230 7308 7387 7466 .037545.039009 30 43 9095 40 57 9180 45 64 9266 50 71 9351 7624 7703 7782 786 I .037941.039437 8020 8100 8179 8259 9781 8669 "Corr. 875410 14 8839 15 21 8924 20 28 9523 9608 9694 CORR. FOR SEC. + 11 .038338.039867 8418 9953 8498 1.040040 8578 8658 .038738.040299 0126 0213 CORR. FOR SEC. + " Corr. 10 52 15 78 20 104 30 156 40 208 45 234 50 260 TANGENT "Corr. 10 52 15 79 20 105 1 .267949 8261 8573 8885 9197 4 .269509 9821 0-23♬ 6678σ 5 .270133 7 0445 0757 .271069 10 1382 11 169412 2006 13 231914 9 .27263 15 2944 16 3256 17 3569 18 3882 19 .274194 20 4507 21 4820 22 5133 23 5446 24 .275759 25 6072 26 6385 27 6698 28 701 29 .277324 30 7638 31 7951 32 8265 33 8578 34 .278892 35 9205 36 951937 9832 38 .280146 39 .280460 40 0774 41 1087 42 1401 43 1715 44 30 157.282029 45 40 209 45 235 50 262 2343 46 2657 47 2972 48 3286 49 .283600 50 391451 4229 52 454353 4858 54 .285172 55 5487 56 58057 611658 6431 59 .28674560 477 0.275637 5917 6197 6476 6756 0-231 DO700 O-NMI DONOR OU~~2 2070° 8~~67 4688 FINE B ~ ოოო 5.277035 7315 7594 7874 8153 6 8 9 10.278432 12 13 14 17 18 19 21 22 20.281225 23 24 26 28 29 15.279829 30 140.960050 30 41 16.280108 40 186.959968 40 54 9887 45 61 9805 50 68 9724 25.282620 31 32 33 34 30.284015 36 37 38 39 41 SINE 35.285410 42 43 44 46 47 48 g gg ༄གཤྩགཤྩ 65 8712 " Corr. 8991 10 47 9270 15 70 9550 20 93 40.286803 038845 209 0667 50 233 0946 1504 1783 2062 2342 51 2900 3178 3458 3736 56 58 59 4294 4573 4852 5131 45.288196 5688 5967 6246 6525 49 9310 50.289589 9867 52.290146 53 0424 0702 54 7082 " Corr. 7360 10 46 7639 15 70 7918 20 93 VERSINES, EXSECANTS, AND TANGENTS 16° CORR. FOR SEC. + 30 139 8475 40 186 8753 45 209 9032 50 232 55.290980 1259 1537 1815 2094 60.292372 COSINE 961262 1182 1101 1021 0940 960860 0779 0698 0618 0537 960456 0375 " Corr. 0294 10 14 0212 15 20 0131 20 27 .959642 9560 9478 9396 9314 .959232 9150 9067 8985 8902 958820 8737 8654 8572 8489 958406 8323 8239 8156 8073 957990 CORR. FOR SEC. 7906 " Corr. 7822 10 14 7739 15 21 7655 20 28 .957151 7067 6982 + .957571 30 42 7488 40 56 7404 45 63 7320 50 70 7235 6898 6814 .956729 6644 6560 6475 6390 .956305 VERSINE EXSEC 038738.040299 8818 8899 8979 9060 0386 0473 0560 0647 .039140.040735 9221 9302 9382 9463 .040032 0113 0195 0276 0822 0909 0997 1084 .039544.041172 9625 9706 9788 9869 .039950.04161330 .040358.042055 0440 2144 0522 2233 0604 2322 0686 2412 1260 " Corr. 1348 10 15 143615 22 1524120 29 44 1701 40 59 1789 45 66 45 237 1878 50 7450 263 1967 30 158 40 210 .040768.042501 0850 0933 1015 1098 2590 2680 2769 2859 .041180.042949 1263 1346 1428 1511 3039 3129 3219 3309 .041594.043400 1677 1761 1844 1927 3490 3580 3671 3762 .042010.043853 2094 2178 2261 3944 " Corr. 403510 15 412615 23 2345 4217 20 30 .042429.044309 30 46 2512 4400 40 61 4492 45 69 4583 50 2596 2680 2765 4675 .042849.044767 2933 3018 3102 3186 CORR. FOR SEC. + 4859 4951 5043 5136 .043271.045228 3356 5321 3440 5413 3525 5506 3610 5599 .043695 .045692 CORR. FOR SEC. 10 53 15 79 20 105 " Corr. 10 53 15 79 20 106 TANGENT .286745 7060 7375 7690 8005 30 159 140 212 45 238 7650 264 .288320 8950 9266 8 9581 9 289896 10 "Corr..29021111 0 1234 BO7Bσ · 5 8635 6 0527 12 0842 13 115814 |.29147315 1789 16 2105 17 2420 18 2736 19 293052 20 3368121 3684 22 4000 23 4316 24 .294632 25 4948 26 5264 27 5581 28 5897 29 .296214 30 653031 6846 32 7163 33 7480 34 .297796 35 8113 36 8430 37 8746 38 9063 39 .299380 40 9697 41 .30001442 0332 43 064944 30096645 128346 1600 47 1918 48 223549 .302553 50 287051 3188 52 3506 53 3823 54 .30414155 4459 56 4777 57 509558 5413 59 .30573160 478 0.292372 2650 2928 3206 3484 01234 56789 0-234 5.293762 12 13 14 10.295152 16 17 18 19 ~~~~~ 232 5430 " Corr. 570810 46 5986 15 69 6264 20 93 15.296542 30 139 6819 40 185 7097 45 208 7375 50 231 7653 21 20.297930 22 23 24 222 26 25.299318 27 29 ggggg 55555 £55±5 wwwww wwwww 9596 9873 28.300151 0428 32 33 30.300706 0983 1261 1538 1815 36 37 SINE 38 39 35.302093 2370 2647 2924 3202 42 4040 4318 43 44 4596 4874 40.303479 46 47 48 49 8208 8486 8763 9041 52 53 54 45.304864 30 138 514140 185 5418 45 208 5695 50 231 5972 56 57 58 59 50.306249 6526 6803 7080 7357 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 3756 " Corr. 4033 10 46 4310 15 69 4587 20 92 55.307633 7910 8187 8464 8740 60.309017 COSINE 956305 6220 6134 6049 5964 .955878 5793 5707 5622 5536 954588 4501 4414 .955450 5364 " Corr. 5278 10 14 519215 22 5106 20 29 955020 30 43 4934 40 58 4847 45 65 4761 50 72 4674 4327 4240 .954153 4066 3979 3892 3804 .953717 3629 3542 3454 3366 .953279 3191 3103 3015 2926 .952838 2750 CORR. FOR SEC. "Corr. 2662 10 15 2573 15 22 2484 20 30 |.952396 30 230740 2218 45 212950 2040 .951951 1862 1773 1684 1594 + .951505 1415 1326 1236 1146 951056 44 59 67 74 17° VERSINE 043695.045692 3780 3866 3951 4036 EXSEC .044122.046158 4207 4293 4378 4464 5066 5153 5239 5326 5785 5878 5971 6065 .044550.046627 4636 4722 4808 4894 5673 5760 6252 6345 6439 6533 " Corr. 10 53 6721 " Corr. 681510 16 6910 15 24 15 80 7004 20 32 20 106 .044980.047099 30 47 30 159 7193 40 63 40 213 7288 45 71 45 239 7383 50 79 50 266 7478 .045412.047573 5499 5586 7668 7763 7859 7954 .045847.048050 5934 6021 6108 6196 7427 7516 8145 8241 8337 8433 .046283.048529 6371 6458 6546 6634 8625 8722 8818 8915 046721 .049011 6809 9108 6897 9205 6985 9302 7074 9399 .047162.049496 7250 7338 9593 " Corr. 9691 10 16 978815 24 9886 20 33 .047604 .049984 30 7693.050082 40 7782 0179 45 0277 50 7871 7960 0376 .048049.050474 8138 8227 8316 8406 CORR. FOR SEC. + 0572 0671 0769 0868 .048495 .050967 8585 1066 8674 1165 8764 1264 8854 1363 .048944 .051462 22QE UNO 49 65 73 82 CORR. FOR SEC. + 11 Corr. 10 53 15 80 20 107 30 160 40 214 45 241 ||50 267 TANGENT .305731 6049 6367 1 .307322 7640 0123➡ 2 3 6685 7003 4 5678σ 7959 8277 8 8596 9 .30891410 9233 II 9552 12 9870 13 .310189 14 .310508 15 0827 16 146 17 1465 18 1784 19 .312104 20 2423 21 2742 22 3062 23 3381 24 .313700 25 4020 26 4340 27 4659 28 4979 29 .315299 30 5619 31 5938 32 6258 33 6578 34 .316899|35 721936 7539 37 7859 38 817939 31850040 882041 9141 42 9461 43 9782 44 .320102 45 0423 46 0744 47 1065 48 1386 49 .321707 50 2028 51 2349 52 2670 53 2991 54 .323312 55 363456 3955 57 4277 58 4598 59 324920 60 479 0.309017 9294 9570 9847 4.310123 5.310400 0676 0953 1231 6 789 || 12 13 14 10.311782 NMI DONDO 00002 2007°2 2~~~~ H☹♪88 === 17 18 19 21 22 261|15 69 2888 20 92 15.313164 30 138 3440 40 184 3716 45 207 3992 50 230 4269 20.314545 4821 5097 23 24 26 29 SINE 25.315925 6201 6477 6753 7029 31 33 1.229 1506 30.317305 7580 7856 37 38 42 43 44 5373 5649 35.318684 8959 9235 9511 9786 46 47 48 49 40.320062 51 52 53 54 8132 8408 2059 " Corr. 2335 10 46.949972 10 15 23 30 VERSINES, EXSECANTS, AND TANGENTS 18° CORR. FOR SEC. + 45.321440 30 138 1715 40 184 1990 45 207 2266 50 229 2541 50.322816 3092 3367 3642 3917 0337 " Corr. 061310 46 088815 69 1164 20 92 55.324193 56 4468 57 4743 58 5018 59 5293 60.325568 COSINE 951056 0967 0877 0786 0696 950606 0516 0425 0335 0244 .950154 0063 " Corr. 988115 9790 20 .949243 9151 9060 8968 8876 949699 30 46 9608 40 61 9517 45 68 9426 50 76 9334 948784 8692 8600 8508 8416 .948324 8231 8139 8046 7954 CORR. FOR SEC. 947861 7768 7676 7583 7490 .947397 + 7304 721010 711715 7024 20 .946462 6368 6274 6180 6085 .945991 5897 5802 5708 5613 945519 COMO COL " Corr. 946930 30 6837 40 6743 45 6649 50 78 6556 FORP 47 62 VERSINE .048944.051462 9033 9123 9214 9304 EXSEC .049394 .051960 9484 2060 9575 2160 9665 2261 9756 2361 1562 1661 1761 1861 .049846.052461 9937 .050028 0119 0210 0392 0483 0574 0666 2562 " Corr. 2662 10 276315 2864 20 .050757.053471 0849 0940 1032 1124 .050301.052965 30 51 3066 40 67 3167 45 76 3269 50 84 3370 3573 3675 3776 3878 051216.053980 1308 1400 1492 1584 3163 3257 3351 3444 4083 4185 4287 4390 .051676.054492 1769 1861 1954 2046 4595 4698 4801 4904 .052139.055007 2232 2324 2417 2510 5110 5213 5317 5420 .052603.055524 2696 2790 2883 2976 .053070.056044 30 5628 573210 583615 5940 20 053538.056567 3632 3726 3820 3915 CORR. FOR SEC. + 6672 6777 6882 6987 .054009.057092 4103 4198 7198 7303 7409 7515 2055600 52 6148 40 70 6253 45 78 6358 50 87 6462 4292 4387 .054481.057621 17 34 CORR. FOR SEC. + " Corr. " Corr. 17 10 54 26 15 81 35 3520 108 " Corr. 10 54 15 81 20 107 30 161 40 215 145 242 50 269 30 162 40 216 45 243 50 270 TANGENT 1 324920 5241 5563 5885 6207 .326528 6850 7172 7494 7816 0 1 232 56789 328139 10 846111 8783 12 91C6 13 9428 14 .32975015 330073 16 0396 17 0718 18 1041 19 .331364 20 1687 21 2010 22 2333 23 2656 24 332979 25 330226 3625 27 3948 28 4272 29 .334595| 30 491931 5242 32 5566 33 589034 .33621335 653736 686 37 7185 38 750939 .337833 40 8157 41 8481 42 8806 43 913044 .339454 45 9779 46 .340103 47 0428 48 0752 49 .341077 50 1402 51 1727 52 2052 53 2376 54 .342702 55 3027 56 3352 57 3677 58 400259 .344328 60 480 0.325568 01234 5O7BQ 0-234 5 6 8 5.326943 9 12 13 14 16 10.328317 18 19 27222 207°° 87~~~ 68788 2-RE 23 24 26 15.329691|30 137 9965 40 183 17.330240 45 206 0514 50 229 0789 28 29 20.331063 1338 1612 1887 2161 31 32 25.332436 2710 2984 3258 3533 33 34 36 30.333807 4081 4355 4629 4903 37 38 39 41 35.335178 5452 5726 6000 6274 42 SINE 43 44 5843 6118 46 47 48 6393 6668 40.336548 90 85087 KONAR 8 49 7218 7493 7768 8042 51 52 54 8592" Corr. 8867 10 46 914115 69 9416 20 92 45.337917 30 137 8190 40 183 846445 205 8738 50 228 9012 56 57 58 50.339285 59 9559 9832 53.340106 0380 55.340653 " Corr. 46 6821 709510 736915 68 7643 20 91 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 0926 1200 1473 1747 60.342020 • COSINE 945519 5424 5329 5234 5139 945044 4949 4854 4758 4663 944568 4472 " Corr. 437610 16 428115 24 4185 20 32 .944089 30 .943608 3512 3416 3319 3223 .943126 3029 2932 2836 2739 3993 40 64 3897 45 72 3801 50 80 3705 .942642 2544 2447 2350 2252 .942155 2058 1960 CORR. FOR SEC. 1862 1764 + |.941176|30 .941666 1569 " Corr. 147010 16 1372 15 25 1274 20 33 .940684 0585 0486 0387 0288 .940189 0090 939991 9891 9792 .939693 49 1078 40 66 0979 45 74 088 50 82 0782 19° VERSINE .054481.057621 4576 7727 4671 7833 7939 4766 4861 8045 .054956.058152 5051 5146 5242 5337 EXSEC .055432.058686 5528 5624 5719 5815 48.055911.059222 30 6007 6103 6199 6295 8258 8365 8472 8579 8793 " Corr. 8900 10 18 9007 15 27 9115 20 36 .056392.059762 6488 6584 6777 933040 9438 45 954550 9653 6681.060086 9870 9978 0195 .056874.060304 6971 7068 7164 7261 8922 9021 9119 9218 .057358.060849 7456 7553 7650 7748 9613 9712 0412 0521 0630 0740 .057845.061397 7942 8040 8138 8236 0958 1068 1177 1287 .058334.061947 8431 8530 8628 8726 1506 1616 1726 1837 CORR. FOR SEC. + .058824.062500 30 56 2612 40 74 2723 45 83 2834 50 93 2945 .059316.063057 9415 3168 9514 3280 3392 3504 2058 " Corr. 2168|10 19 2279 15 28 2390 20 37 .059811.063616 9910 .060009 0109 0208 060307.064178 3728 3840 3953 4065 CORR. FOR SEC. + " Corr. 10 54 15 82 20 109 TANGENT " Corr. 1 54 30 163 72 40 218 .349216 15 9542 16 81 45 245 9868 17 90 50 272.350195 18 0522 19 .350848 20 10 55 15 82 20 109 .344328 0 4653 T 4978 2 5304 3 5630 4 .345955 5 6281 6 6607 7 6933 8 7259 9 .347585 10 79||||| 8237 12 8563 13 888914 117521 1502 22 1829 23 2156 24 .352483 25 2810 26 3137 27 3464 28 3791 29 .35411930 4446 31 477332 510133 5429 34 357396 40 7724 41 8052 42 838043 8708 44 .35903745 9365 46 9694 47 50 274.36002248 30 164 40 219 45 246 .355756 35 6084 36 6412 37 6740 38 7068 39 0351 49 360680 50 1008 51 1337 52 1666 53 1995 54 362324 55 2653 56 2982 57 3312 58 3641 59 363970 60 481 0.342020 2294 2567 2840 3113 0-23⇒ 4 5.343386 3660 3933 4206 4479 5678 ∞ 9 10.344752 " 12 234 13 14 16 17 18 19 22222 15.346117 30 136 639040 182 666345 205 6936 50 227 7208 20.347481 21 7754 8027 8299 8572 25.348845 9117 9390 9662 9935 23 24 2070 87087 ❤❤♪❤. DER NO ONE 26 28 29 31 30.350207 0480 0752 32 SINE 33 34 36 37 38 39 35.351569 1842 2114 2386 2658 41 42 5025 " Corr. 5298 10 45 557115 68 5844 20 91 43 4444 40.352931 46 47 48 49 1025 1297 51 VERSINES, EXSECANTS, AND TANGENTS 20° CORR. FOR SEC. + 45.354291 30 136 4563 40 181 4835 45 204 5107 50 227 5379 50.355651 5923 52 6194 53 6466 54 6738 3203 " Corr. 3475 10 45 3747 15 68 4019 20 91 55.357010 56 7281 57 7553 58 7825 59 8096 60.358368 COSINE .939693 9593 9494 9394 9294 939194 9094 8994 8894 8794 .937687 7586 7485 7383 7282 .938694 8593 "Corr. 8493 10 17 839215 25 8292 20 34 .938191 30 50 8091 40 67 7990 45 76 7889 50 84 7788 .937181 7079 6977 6876 6774 .936672 6570 6468 6366 6264 .936162 6060 5957 5855 5752 .935650 CORR. FOR SEC. 5547 " Corr. 544410 17 534115 26 5238 20 34 .934619 4515 4412 + .935135 30 52 5032 40 69 4929 45 77 4826 50 86 4722 4308 4204 .934101 3997 3893 3789 3685 .933580 VERSINE .060307.064178 0407 0506 0606 0706 EXSEC 4290 4403 4516 4629 .060806.064742 0906 1006 I 106 1206 4856 4969 5083 5196 .061306.065310 1407 5424 Corr. 1507 5538 10 19 1608 1708 5652 15 29 5766 20 38 .061809.065881 | 30 1909 5995 40 6110 45 57 76 86 6224 50 95 2010 2111 2212 6339 .062313.066454 2414 2515 2617 2718 6569 6684 6799 6915 .062819.067030 2921 3023 3124 3226 4968 5071 5174 5278 7146 7262 7377 7493 .063328.067609 3430 3532 3634 3736 7726 7842 7958 8075 .063838.068191 3940 4043 4145 4248 8308 8425 8542 8659 064350.068776 4453 4556 4659 4762 .064865.069364 30 59 9482 40 79 9600 45 88 9718 50 98 9836 " Corr. 20 8894 901110 912915 29 9246 20 39 .065381.069955 5485.070073 CORR. FOR SEC. + 5588 0192 5692 0311 5796 0430 065899.070548 6003 6107 6211 6315 .066420.071145 0668 0787 0906 1025 CORR. FOR SEC. + "Corr. 10 55 15 83 20 10 30 165 40 220 45 248 50 275 " Corr. 10 55 15 83 20 111 30 166 40 222 45 250 50 277 TANGENT .363970 4300 1 .365618 5948 0 46291 2 4959 3 5288 =2Ò# 56789 6278 6608 8 6938 9 .367268 10 7598 11 7928 $2 825913 8589| ₪4 368920 15 9250 16 9581 17 991|| 18 .370242 19 .370573 20 0904 21 1235 22 1566) 23 1897 24 .372228 25 2559 26 2890 27 3222 28 3553 29 .373885 30 4216 31 454832 4880 33 521234 .37554335 5875 36 6207 37 6539 38 6872 39 .37720440 7536 41 7868 42 820143 8534 44 .37886645 9199 46 9532 47 9864 48 .380197 49 .380530 50 0863 51 I 196 52 1530 53 1863 54 .38219655 2530 56 2863 57 3197 58 353059 383864 60 482 0.358368 1234 6O7BO 5.359725 9997 7.360268 8 9 || 12 10.361082 23 13 14 22222 2 16 17 18 19 1353 " Corr. 1625 10 45 189615 68 2167 20 90 15.362438 30 136 2709 40 181 2980 45 203 3251 50 226 3522 21 20.363793 ~MA 22 23 24 26 27 28 29 wwwww 25.365148 32 33 34 SINE 36 37 38 39 8640 8911 9182 9454 30.366501 6772 7042 7313 7584 0540 0811 46 47 48 49 35.367854 8125 8395 བྲཱ་ྒུ ཀྱྰགཀླg55f; 51 4064 4335 4606 4877 52 53 54 5418 5689 5960 6231 40.369206 41 9476 " Corr. 42 9747 10 45 43.370017|15 68 0287 20 90 44 56 45.370557 30 135 0828 40 180 1098 45 203 1368 50 225 1638 57 58 59 50.371908 2178 2448 2718 2988 8665 8936 55.373258 3528 3797 4067 4337 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.374607 COSINE .933580 3476 3372 3267 3163 .933058 2954 2849 2744 2639 .931480 1374 1268 .932534 2429 " Corr. 2324 10 18 221915 26 2113 20 35 |.932008 30 53 1902 40 70 1797 45 79 1691 50 88 1586 1162 1056 930950 0843 0737 0631 0524 .930418 0311 0204 0097 .929990 .929884 9776 9669 9562 9455 .929348 9240 CORR. FOR SEC. + "Corr. 9133 10 18 9025 15 27 8917 20 36 |.928810 30 54 8702 40 72 928270 8161 8053 7945 7836 8594 45 81 8486 50 90 8378 .927728 7619 7510 7402 7293 .927184 .21° VERSINE .066420.071145 6524 6628 6733 6837 7256 7361 .066942.071744 7046 7151 7571 7676 7781 7887 EXSEC 1865 " Corr. 1985 10 20 2106 15 30 2226 20 40 .067466.072347 30 60 2468 40 81 2589 45 91 2710 50 101 2831 1265 1384 1504 1624 .067992.072952 8098 3074 8203 3195 3317 8309 8414 3439 .068520.073561 8626 8732 8838 8944 0438 0545 069050.074172 9157 9263 9369 9476 3683 3805 3927 4050 .070116.075404 0224 0331 1514 1622 1839 1947 2055 2164 4295 Corr. "Corr. 441710 21 10 56 454015 31 15 84 4663 20 41 20 112 .069582.074786 30 62 30 168 9689 491040 82 40 224 9796 5033 45 92 45 252 9903 5156 50 103 ||50 280 .070010 5280 .070652.076024 0760 6148 0867 6273 6397 6522 5527 5651 5775 5900 0975 1083 .071190.076647 1298 1406 CORR. FOR SEC. + # 6772 " Corr. 6897 10 21 7022 15 31 7148 20 42 .071730.077273 30 63 7399 40 84 7525 45 94 7650 50 105 7776 .072272.077902 2381 2490 2598 2707 .072816.078535 8029 8155 8282 8408 CORR. FOR SEC. + " Corr. 10 56 15 84 20 112 30 167 40 223 45 251 50 279 TANGENT 1 .383864 4198 4532 " Corr. 10 56 15 84 20 113 01234 4866 5200 4 .385534 5 5868 6202 6536 6871 9 .387205 10 75401 7874 12 8209 13 8544 14 5678✪ .388879 15 9214 16 9549 17 9884 18 .390219 19 .390554 20 0889 21 1225 22 1560 23 1896 24 392231 25 2567 26 2903 27 3239 28 3574 29 393910 30 424631 4583 32 4919 33 5255 34 .395592 35 5928 36 6264 37 6601 38 6938 39 .397275 40 761141 7948 42 8285 43 862244 398960 45 9297 46 9634 47 9972 48 400309 49 30 169.400646 | 50 40 225 0984 51 45 253 1322 52 ||50 281 1660 53 1997 | 54 .402335 55 267356 301257 3350 58 3688 59 404026 60 483 0.374607 01234 5678σ || 12 13 14 ~~~~~ 2222 5.375955 6224 6494 6763 7033 22222 10.377302 7571 " Corr. 784110 45 8110 15 67 8379 20 90 15.378649 30 135 16 891840 180 9187 45 202 9456 50 224 9725 17 18 19 20.379994 21.380263 23 24 26 27 28 25.381339 29 31 32 33 34 SINE 36 37 38 39 নননন 4876 5146 5416 5685 30.382683 2952 3221 3490 3758 41 42 43 44 35.384027 4295 4564 46 47 48 49 0532 080 I 1070 40.385369 51 52 53 54 1608 1877 2146 2415 56 57 59 4832 5101 45.38671130 134 6979 40 179 7247 45 201 VERSINES, EXSECANTS, AND TANgents 22° 50.388052 8320 8588 8856 9124 CORR. FOR SEC. + 5638 " Corr. 5906 10 45 617415 67 6443 20 89 55.389392 9660 9928 58.390196 0463 60.390731 7516 50 224 7784 COSINE .927184 7075 6966 6857 6747 .926638 6529 6419 6310 6200 .924989 4878 4768 4657 4546 926090 5980 " Corr. 587 10 18 576 15 28 565 20 37 .92554030 55 5430 40 73 532045 83 5210 50 92 5099 .924435 4324 4213 4102 3991 923880 3768 3657 3545 3434 923322 3210 3098 2986 2874 .922762 CORR. FOR SEC. "Corr. 2650 2538 10 19 2426 15 28 2313 20 37 + .922201 30 56 2088 40 75 .921638 1525 1412 1976 45 84 1863 50 94 1750 1299 1185 .921072 0959 0846 0732 0618 .920505 VERSINE .072816.078535 2925 3034 3143 3253 EXSEC 073362.079170 3471 3581 3690 3800 4239 4349 8662 8788 8916 9043 9298 " Corr. 9425 10 21 9553 15 32 9680 20 43 .073910.079808 30 64 9936 40 85 4129.08006545 96 0193 50 107 4020 0321 .074460.080450 4570 4680 4790 4901 .07501.081094 5122 5232 5343 5454 6232 6343 6455 6566 0578 0707 0836 0965 .075565.081742 5676 5787 5898 6009 1223 1353 1482 1612 .076120.082392 30 8475 8588 8701 8815 1872 " Corr. 2002 10 22 2132 15 33 2262 20 .076678.083046 6790 6902 7014 7126 3177 3308 3440 3571 .077238.083702 7350 7462 7574 7687 6530 170 87 40 227 9845 256 2784 50 109 | 50 284 252340 2653 45 2915 3834 3966 4098 4230 .077799.084362 7912 8024 8137 8250 CORR. FOR SEC. .078928.085691 9041 9154 9268 9382 .079495.086360 - .078362.085025 30 66 5158 40 89 5291 45 100 5424 50 || 5558 5825 5958 6092 6226 CORR. FOR SEC. + " Corr. 10 57 15 85 20 113 4495 Corr. Corr. 4627 10 22 10 57 15 86 4760 15 33 4892 20 44 20 114 30 170 40 226 45 254 50 283 " Corr. 10 57 15 85 43 20 114 Ja 30 171 40 228 45 257 50 285 TANGENT 1 404026 4365 4703 5042 3 5380 .405719 6058 0-234 5 6 6397 7 6736 8 7075 9 407414 10 7753 11 8092 12 8432 13 8771 14 .4091115 9450 16 9790 17 .410130 18 0470 19 .410810 20 115021 1490 22 1830 23 2170 24 .41251 25 2851 26 3192 27 3532 28 3873 29 .414214 30 4554 31 4895 32 5236 33 5577 34 .415919 35 6260 36 6601 37 6943 38 7284 39 .417626 40 7967 41 8309 42 865 43 8993 44 .419335 45 967746 .420019 47 0361 48 0704 49 .421046 50 1388 51 1731 52 207453 2416 54 422759 55 3102 56 3445 57 3788 58 4132 59 .42447560 484 0.390731 0999 1267 I 234 56789 5.392070 11 12 13 234 14 10.393407 6678σ) 16 17 18 19 22222 222 8 666 gа 55555 £55±5 @wwww wwww XNXG EN~~~ 15.394744 30 134 501 40 178 5278 45 200 5546 50 223 5813 21 22 20.396080 23 24 26 27 28 29 32 25.397415 33 34 36 37 38 39 40 41 30.398749 9016 9282 9549 9816 42 43 44 SINE 35.400082 0349 0616 0882 1149 46 1534 1802 47 48 49 2337 2605 2872 3140 51 52 53 54 3674 " Corr. 3942 10 45 4209 15 67 4477 20 89 56 6347 6614 6881 7148 57 7682 7949 8216 8482 50.404078 4344 4610 4876 5142 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 55.405408 5673 5939 6205 6471 60.406737 .401415 1681 " Corr. 1948 10 10 44 2214 15 67 2480 20 89 COSINE .920505 0391 0277 0164 0050 .919936 9822 9707 9593 9479 · .919364 9250 " Corr. 9135 10 19 9021 15 29 8906 20 38 .918791 30 867640 77 8561 45 86 8446 50 96 8331 918216 8101 7986 7870 7755 45.402747 30 133.915312 30 59 3013 40 178 3279 45 200 3545 50 222 3811 5194 40 78 5077 45 88 4960 50 98 4842 917639 7523 7408 7292 7176 .917060 6944 6828 6712 6596 .916479 6363 6246 6130 6013 CORR. FOR SEC. + .914725 4607 4490 4372 4254 .915896 5780 "Corr. 5663 10 20 5546 15 29 5429 20 39 914136 4018 3900 3782 3664 913546 23° VERSINE .079495.086360 9609 6495 9723 6629 6763 6898 9836 9950 .080064.087033 0178 0293 0407 0521 7168 " Corr. 7302 10 23 7438 15 34 7573 20 45 .080636.087708 30 68 7844 40 90 7979 45 102 EXSEC 0750 0865 0979 1094 8251 57.081209||.088387 1324 1439 1554 1669 .081784.089068 1899 9205 2014 9342 9479 2130 2245 9616 3056 3172 3288 3404 .082361.089753 2477 3870 3987 8523 8659 8795 8932 9890 "Corr. 2592.090028 10 23 2708 0166 15 34 28241 0303 20 46 .082940.090441 30 69 0579 40 92 0717 45 104 0855 50 115 0994 083521.091132 3637 3754 45 258 8115 50 113 || 50 287 5393 5510 5628 5746 1271 1410 .084104.091827 4220 4337 4454 4571 1548 1688 CORR. FOR SEC. + 1966 2105 2245 2384 " Corr. .084688.092524 4806 2664 4923 2804 10 23 5040 2944 15 35 5158 3085 20 47 .085275.093225 30 70 3366 40 94 3506 45 105 3647 50 17 3788 .085864.093929 5982 6100 6218 6336 086454.094636 4070 4212 4353 4495 CORR. FOR SEC. + " Corr. 10 57 15 86 20 115 30 172 40 230 " Corr. 10 58 15 86 20 115 30 173 40 231 45 259 50 288 "Corr. 10 58 15 87 20 116 || 30 174 40 232 45 261 50 290 TANGENT 1 424475 0 4818 5162 2 5505 3 5849 4 · .426192 5 6536 6 6880 7 7224 8 7568 9 • 427912 10 8256 || 429634 15 9978 16 .430323 17 8600 12 8945 13 9289 14 .431358 20 1703 21 0668 18 1013 19 · · 2048 22 2393 23 2739 24 .434812 30 5158 31 5504 32 5850 33 6197 34 433084 25 3430 26 3775 27 412128 4466 29 .436543 35 6889 36 7236 37 .43827640 862241 8969 42 931643 9663 44 7582 38 7929 39 440010 45 0358 46 070547 1053 48 1400 49 441748 50 2095 51 2443 52 2791 53 3139 54 4434871 65 3835 56 4183 57 4532 58 4880 59 445229 60 485 0.406737 7002 7268 7534 7799 0123# 4 56789 0-23= 5.408065 8330 8596 8862 9127 10.409392 11 12 9658 Corr. 992310 44 13.410188 15 66 0454 20 88 15.410719 30 133 0984 40 177 1249 45 199 1514 50 221 1780 14 16 17 18 19 20.412044 2310 2574 2840 3104 22222 22222 67887 1888 FIRE BONO 85 21 23 24 25.413369 3634 3899 4164 4428 26 27 28 29 30.414693 4958 5223 31 32 33 5487 34 5752 35.416016 6281 6545 6810 7074 36 SINE 37 38 39 41 42 43 44 40.417338 7603 " Corr. 7867|10 44 813115 66 8396 20 88 46 45.418660 47 48 49 85887 50.419980 51.420244 52 0508 53 0772 54 1036 56 57 55.421300 1563 1827 2091 2355 60.422618 58 59 VERSINES, EXSECANTS, AND TANGENTS 24° 11 CORR. FOR SEC. + 30 132 8924 40 176 9188 45 198 9452 50 220 9716 COSINE .913546 3427 3309 3190 3072 .912953 2834 2715 2596 2478 .911164 1044 0924 0804 0684 .912358 2239 Corr. 212010 20 200115 30 1882 20 40 .911762 30 60 1642 40 80 1523 45 90 1403 50 100 1284 1.910564 0443 0323 0202 0082 .909961 9841 9720 9599 9478 .909357 9236 9115 8994 8872 CORR. FOR SEC. IS + .908751 8630 " Corr. 850810 20 8387 15 30 8265 20 41 .907533 7411 7289 7166 7044 .908143 30 61 802140 81 1.906922 6799 6676 6554 6431 .906308 7900 45 91 7778 50 101 7655 VERSINE .086454.094636 6573 4778 6691 4920 6810 5062 6928 5204 7761 7880 .087047.095347 7166 "Corr. 7285 7404 5489 5632 10 24 5775 15 36 7522 5917 20 48 .087642.096060 30 72 6204 40 95 6347 45 107 6490 50 119 6634 7999 8118 EXSEC .088238.096777 8358 8477 8597 8716 6921 7065 .088836.097498 8956 9076 9196 9316 0159 0280 0401 0522 7209 7353 .089436.098221 9557 9677 9798 9918 7642 7787 7931 8076 2589 2711 2834 2956 .090039.09894830 8366 "Corr. 8510 8657 15 8802 20 .090643.099678 0764 9824 0885 9971 1006. 100118 1128 0264 .091249.100411 1370 1492 1613 1735 CORR. FOR SEC. + 0558 0706 0853 1000 30 176 140 234 909440 9240 45 109 45 263 9386 50 121 50 293 9532 .091857.101148 1979 2100 2222 2345 .092467.101888 30 74 2036 40 99 2185 45 11 2334 50 123 2482 .093078.102631 3201 3324 ន58ស 1296 " Corr. 1444110 25 159215 37 1740 20 49 2780 2930 3446 3079 3569 3228 .093692. 103378 CORR. FOR SEC. + "Corr. 10 58 15 87 20 116 " Corr. 10 59 15 88 120 117 TANGENT .445229 5577 5926 6275 "Corr. 10 59 15 88 20 118 30 177 40 235 45 265 50 294 ↑ 0123➡ 30 175.44871910 40 233 45 262 50 291 6624 4 5 .446973 7322 6 7671 7 8020 8 8369 9 906811 9418 12 9768 13 .45011714 .450467 15 0817 16 1167| 17 1517 18 1868 19 .452218 20 2568|21 291922 3269 23 3620 24 .453971 25 4322 26 4673 27 5024 28 5375 29 .455726 30 6078 31 6429 32 678133 713234 .457484 35 7836 36 8188 37 8540 38 8892 39 .459244 40 9596 41 9949 42 .46030143 065444 .46100645 1359 46 1712 47 2065 48 241849 .462771 50 3124 51 3478 52 3831 53 418454 .464538 55 4892 56 5246 57 5600 58 5954 59 .466308 60 486 1 0.422618 2882 3146 3409 3672 1234 5.423936 66789 0-~M➡ BO789 11 10.425253 12 13 14 16 17 18 19 15.426569 30 132 6832 40 175 7095 45 197 7358 50 219 7621 22222 2020≈ 87087 ❤ DE NON CONDO 23 20.427884 26 27 32 33 34 SINE 37 25.429198 9461 9723 9986 29.430248 30.430511 42 43 44 4199 4463 4726 4990 46 47 48 49 35.431823 2086 2348 2610 2873 51 52 5516 " Corr. 577910 44 6042 15 66 6306 20 88 40.433135 53 8147 8410 8672 8935 56 57 0774 1036 1299 1561 45.434445 30 131 4707 40 175 50.435755 6017 6278 6540 6802 3397 365910 " Corr. 44 3921 15 65 4183 20 87 55.437063 7325 7587 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 4969 45 196 5231 50 218 5493 58 7848 59 8110 60.438371 COSINE .906308 6185 6062 5939 5815 .905692 5569 5445 5322 5198 .903834 3709 3585 3460 3335 905075 4951 " Corr. 4827 10 21 470315 31 4579 20 41 .904455 30 62 433140 83 4207 45 93 4082 50 103 3958 .903210 3086 2961 2836 2710 .902585 2460 2335 2209 2084 .901958 1832 1707 1581 1455 .901329 1203 1077 10 095115 0825 20 CORR. FOR SEC. .900698 30 .900065 .899939 9812 9685 9558 + .899431 9304 9176 9049 8922 .898794 " Corr. 21 32 42 0572 40 84 0445 45 95 0319 50 105 0192 25° VERSINE EXSEC .093692. 103378 3815 3528 3938 3678 4061 3828 4185 3978 .094308.104128 4431 4555 4678 5049 5173 4278" Corr. 4429 10 25 4580 15 38 4802 4730 20 50 .094925.104881 30 76 5032 40 101 5184 45 113 5297 5335 50 126 5421 5486 .095545. 105638 5669 5790 5793 5942 5918 6094 6042 6246 .096166.106398 6291 6415 6540 6665 6551 6703 6856 7009 .096790.107162 6914 7039 7164 7290 21 7315 Corr. 7468 10 26 7621 15 38 7775 20 51 |.097415.107928|30 7540 7665 7791 7916 .098042.108699 8168 8293 8419 8545 8082 40 103 8236 45 115 839050 128 8544 8853 9008 9163 9318 .098671.109473 8797 8923 9049 CORR. FOR SEC. + 9628 9783 9938 9175.110094 63.099302. 110250 9428 0406 " Corr. 9555 0562 10 26 0718 15 39 0874 20 52 .099935. 111030 30 78 .100061 1187 40 104 0188 1344 45 117 0315 1500 50 130 0442 1657 9681 9808 . 100569. 111814 0696 0824 0951 1078 1972 2129 2286 2444 .101206 112602 CORR. FOR SEC. + " Corr. 10 59 15 89 20 118 77 || 30 179 40 238 45 268 50 298 " Corr. 10 60 15 89 20 119 " Corr. 10 60 15 90 20 120 TANGENT .466308 30 180 40 239 45 269 50 299 OI23 9499 0 6662 7016 2 7370 3 7725 4 468080 8434 6 8789 9144 30 178.469854| 10 40 236 470209 II 45 266 50 296 0564 12 0920 13 1275 14 5 5678 a 9 .471631 15 1986 16 2342 17 2698 18 3054 19 .47341020 3766 21 412222 4478 23 4835 24 475191 25 5548 26 5905 27 6262 28 6618 29 .476976 30 733331 7690 32 8047 33 8405 34 .478762 35 9120 36 9477 37 9835 38 .48019339 480551 40 090941 126842 1626 43 1984 44 482343 45 270146 306047 3419 48 377849 .484137 50 4496 51 4855 52 5214 53 5574 54 .48593355 6293 56 6653 57 701358 7373 | 59 .487733 60 487 0.438371 8633 8894 9155 9417 0123♬ 4 5.439678 9939 7.440200 0462 0723 6789σ || 234 5678 10.440984 1245 "Corr. 1506 10 43 1767 15 65 2028 20 87 15.442289 30 130 2550 40 174 2810 45 196 3071 50 217 3332 12 13 14 16 17 18 19 20 22222 234 23 24 15555 £55±5 wwwww www.BBBB 26 27 28 29 25.444896 5156 5417 5677 5938 31 32 33 34 30.446198 6458 6718 6979 7239 36 44 35.447499 7759 8019 8279 8539 46 40.448799 9509 8588Z DONOR 8 47 SINE 48 49 • 51 443593 3853 4114 52 4375 4635 53 54 50.451397 56 57 58 59 9059 " Corr. 9319 10 43 9579 15 65 9839 20 87 1656 1916 2175 2435 55.452694 VERSINES, EXSECANTS, AND TANGENTS 26° CORR. FOR SEC. + 2954 3213 3472 3731 60.453990 45.450098 30 130.892979 30 0358 40 173 061845 195 0878 50 216 1137 COSINE 896794 8666 8539 8411 8283 .898156 8028 7900 7772 7643 .897515 7387 " Corr. 7258 10 21 713015 32 7001 20 43 896228 6099 5970 .896873 30 64 6744 40 86 6615 45 97 6486 50 107 6358 5841 5712 .895582 5453 5323 5194 5064 .894934 4804 4675 4545 4415 .894284 4154 4024 3894 3763 .893633 CORR. FOR SEC. " Corr. 22 3502 337110 324115 33 3110 20 44 + .892323 2192 2061 1929 1798 2848 40 87 2717 45 98 2586 50 109 2455 891666 1534 1402 1270 1138 .891006 VERSINE 101206 1334 1461 1589 1717 2613 2742 2870 2999 .101844.113393 1972 2100 2228 2357 • .102485.114187 30 80 4347 40 106 4506 45 119 4666 50 133 4826 5196 5325 5455 5585 EXSEC .103127.114985 3256 3385 3514 3642 103772.115787 3901 4030 4159 4288 | 12602 2760 2918 3076 3234 6106 6237 .104418.116592 4547 4677 4806 4936 3552" Corr. 371010 27 3869 15 40 4028 20 53 6753 " Corr. 691510 27 7077 15 41 7238 20 54 105066.17400 30 81 7562 40 108 7725 45 122 788750 135 8050 5145 5306 5466 5626 .105716.118212 5846 5976 7808 7939 8071 8202 5948 6108 6269 6431 8730 8862 . 108994 .106367.119028 6498 6629 6759 6890 65.107021 ||.119847 ► 8375 8538 8701 8865 9192 9355 9519 9683 7152.120012 "Corr. 7283 0176 10 27 7414 0340 15 41 0505 20 55 7545 .107677.12067030 CORR. FOR SEC. 108334.121496 8466 8598 82 083540 110 1000 45 124 1165 50 137 1331 1662 1828 1994 2160 122326 CORR. FOR SEC. + " Corr. 10 60 15 90 20 120 30 181 40 241 45 271 50 301 " Corr. 10 61 15 91 20 121 30 182 40 242 45 272 50 303 " Corr. TANGENT 10 61 15 91 20 122 487733 8093 8453 8813 9174 I 01234 56789 .489534 9895 6 .490256 7 0617 0978 9 491339 10 1700 1 206112 2422113 2784 14 .493145 15 3507 16 3869 17 4231 18 4593 19 .494955 20 531721 5679 22 6042 23 6404 24 .496767 25 7130 26 7492 27 7855 28 8218 29 .504042 45 440646 4771 47 513648 5502 49 30 183.505867 50 40 244 6232 51 45 274 6598 52 50 304 6963 53 7329 54 498582 30 8945 31 9308 32 9672 33 .500035 34 .50039935 0763 36 | 127 37 149138 1855 39 .50221940 2583 41 2948 42 331243 3677 44 .507695 55 8061 56 8427 57 8793 58 9159 59 .509525 60 488 1 0.453990 4250 4509 4768 5027 01234 5.455286 5545 5804 6063 6322 000 Noo 6 8 9 || 12 23 10.456580 6839 " Corr. 7098 10 43 7357 15 65 7615 20 86 15.457874 30 129 8132 40 172 8391 45 194 8650 50 215 18 19 8908 13 14 16 17 20.459166 9425 9683 9942 24.460200 25.460458 21 22 23 2 2073 2m~m~ ❤❤♪❤8 2029 29700 8508Z DONDO O 26 28 29 32 33 34 30.461749 2007 2265 2522 2780 36 35.463038 3296 3554 3812 4069 37 38 39 41 40.464327 42 43 44 46 SINE 47 48 49 45.46561430 129 5872 40 172 612945 193 6387 50 214 6644 51 52 0716 0974 1232 1491 50.466901 7158 7416 7673 7930 53 54 56 57 55.468187 8444 8701 8958 9215 58 59 4584 " Corr. 4842 10 43 5100 15 64 5357 20 86 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.469472 COSINE .891006 0874 0742 0610 0478 .890345 0213 0080 .889948 9815 888350 8217 8083 7949 7815 .889682 9549 " Corr. 9416 10 22 928315 33 9150 20 44 |.889017 30 67 8884 40 89 8751 45 100 861750 111 8484 .887682 7548 7413 7279 7145 887011 6876 6742 6608 6473 .886338 6204 6069 5934 5799 CORR. FOR SEC. .884310 4174 4038 3902 3766 + 885664 5529 " Corr. 5394 10 23 5258 15 34 5123 20 45 .28498830 68 4852 40 90 4717 45 102 458150 13 4445 .883630 3493 3357 3221 3084 .882948 27° VERSINE .108994 9126 9258 9390 9522 EXSEC .122326 2493 2659 2826 2993 9920 .110052 .109655. 123160 9787 3327 " Corr. 3494 10 28 3662 15 42 0185 3829 20 56 .110318.123997 30 84 0451 4165 40 112 0584 4333 45 126 4501 50 140 0717 0850 4669 .110983.124838 1116 1249 1383 1516 5006 5175 5344 5513 .111650. 125682 1783 5851 1917 6021 2051 6190 2185 6360 .112318.126530 2452 2587 2721 2855 3124 3258 3392 3527 8066 .113662.128237 3796 8409 3931 8581 8752 4066 4201 8924 6700 "Corr. " Corr. 6870 10 28 10 62 704115 43 15 92 721120 57 20 123 .112989.127382 30 85 30 185 7553 40 114 40 246 7724 45 128 ||45 277 7895 50 142 50 308 .114336.129096 4471 4606 4742 4877 5283 5419 5555 9269 9441 9614 9786 .115012. 129959 5148.130132 "Corr. 0306 10 0479 15 43 0652 20 58 .115690.130826 30 87 5826 1000 40 116 1174 45 130 5962 6098 6234 CORR. FOR SEC. + .116370.131696 6507 6643 6779 6916 .117052.132570 1871 2045 CORR. FOR SEC. + 2220 2395 30 186 40 248 45 279 1348 50 145 150 310 1522 5 .511359 1726 2093 7 6 " Corr. 10 61 15 92 2460 8 20 122 2828 9 30 184.513195 10 40 245 3562 11 45 276 3930 12 50 306 4298 13 466614 " Corr. 10 62 15 93 20 124 TANGENT .509525 9892 .510258 2 0625 0992 4 0123‡ .515034 15 5402 16 5770 17 6138 18 6507 19 .516876 20 7244 21 7613 22 7982 23 8351 24 .518720 25 9089 26 9458 27 9828 28 .520197 29 .520567 30 0937 31 1307 32 1677 33 2047 34 .522417 35 2787 36 3158 37 3528 38 3899 39 .524270 40 4641 41 501242 5383 43 5754 44 526126 45 6497 46 6868 47 724048 7612 49 .527984 50 8356 51 8728 52 9100 53 9473 54 .529845 55 .530218 56 0591 57 096358 1336 59 .531709 60 489 0.469472 9728 9985 3.470242 0499 I 234 56789 5.470755 1012 1268 1525 1782 10.472038 11 12 234 13 14 16 17 18 19 22222 22 20.474600 4856 5112 5368 5624 21 23 24 26 15.473320 30 128.880891 30 3576 40 171 383245 192 4088 50 213 4344 25.475880 6136 27 6392 6647 6903 28 29 SINE 30.477159 7414 31 32 7670 33 7926 34 8181 36 37 38 39 35.478436 8692 8947 9203 9458 41 43 44 46 47 48 49 55 11 40.479713 9968 Corr. 42.480224 10 42 0479 15 15 64 0734 20 85 45.480989 30 127 1244 40 170 1499 45 191 1754 50 212 2009 51 52 11 " 2294 Corr. 2551 10 43 2807 15 15 64 3063 20 85 50.482263 2518 2773 3028 3282 53 54 58 59 55.483537 56 3792 4046 57 VERSINES, EXSECANTS, AND TANGENTS 28° CORR. FOR SEC. + 4301 4555 60.484810 COSINE .882948 2811 2674 2538 2401 .882264 2127 1990 1853 11 1716 .881578 1441 Corr. 1304 10 23 116615 34 1028 20 46 880201 0063 .879925 9787 9649 .879510 9372 9233 9095 8956 0753 40 92 0615 45 103 0477 50 115 0339 878817 8678 8539 8400 8261 CORR. FOR SEC. 878122 7983 7844 + .876026 5886 5746 5605 5464 7704 [1 7565 .877425 7286 Corr. 7146 TO 23 7006 15 35 6867 20 47 .876727 30 .875324 5183 5042 4902 4761 .874620 70 93 6587|40 6447 45 105 6307 50 117 6166 VERSINE 117052.132570 7189 2745 7326 2921 3096 7462 7599 3272 .117736.133448 7873 8010 8147 8284 88 4506 40 118 4683 45 133 4860 50 147 5037 69.119109 ||.135215 .118422.13432930 8559 8696 8834 8972 • EXSEC 9937 . 120075 9247 9385 9523 966 I .119799.136104 0213 0351 " Corr. " Corr. 10 62 To 3624 3800 10 29 3976 15 44 15 94 4153 20 59 20 125 5392 5570 5748 5926 . 120490.136996 0628 0767 0905 1044 .123273. 3413 3553 3693 3834 6282 6460 6639 6818 IT 7176 Corr. 7355 10 30 7534 15 45 7714 20 60 121183.137893 30 90 1322 1461 1600 1739 4114 4254 4395 4536 .121878.138794 2017 2156 2296 2435 122575.139698 2714 2854.140061 2994 3133 8974 9155 9336 9517 30 188 807340 120 40 251 8253 45 135 145 283 8433 50 150 50 314 8613 9879 0242 0424 CORR. FOR SEC. + 140606 0788 " Corr. 0971 10 30 115315 46 1336 20 61 .123974.14151830 91 1701 40 122 1884 45 137 206750 152 2251 .124676.142434 4817 4958 5098 5239 .125380.143354 CORR. FOR SEC. + 2618 2802 2986 3170 30 187 40 249 45 281 50 312 "Corr. 10 63 15 94 20 126 11 Corr. 10 63 15 95 20 126 TANGENT .531709 1 0 2083 1 2456 2829 3203 4 .533576 3950 4324 4698 5072 9 .535446 10 582111 6195 12 6570 13 694514 232 5678σ .537319 15 7694 16 8069 17 8444 18 8820 19 .53919520 9571 21 9946 22 .540322 23 0698 24 .541074 25 1450 26 1826 27 2203 28 2579 29 .542956 30 333231 3709 32 4086 33 446334 .544840 35 5218 36 5595 37 5973 38 6350 39 .546728 40 7106 41 7484 42 7862 43 824044 .548619 45 8997 46 9376 47 9755 48 .550134 49 30 190.550512 50 40 253 0892 51 45 284 1271 52 50 316 1650 53 2030 54 552409 55 2789 56 3169 57 3549 58 3929 59 .55430960 490 → 0.484810 01234 BONEK 6 8 5.486081 9 11 12 234 13 10.487352 14 16 17 18 19 27222 222~~ ~~~~~ ❤ 7606 " Corr. 7860 10 42 8114 15 63 8367 20 85 15.48862130 127 8875 40 169 9129 45 190 9382 50 211 9636 20.489890 21.490143 23 24 25 27 28 29 34 36 38 39 SINE 41 42 43 44 5064 5318 30.492424 2677 2930 3183 3436 46 47 48 49 5573 5827 35.493689 3942 4195 4448 4700 3.NOJ DONO 6335 6590 51 6844 7098 52 53 54 0397 0650 0904 17 40.494953 5206 Corr. 5459 10 42 571115 63 5964 20 84 45.496216 30 126 6469 40 168 6722 45 189 6974 50 210 7226 56 491 157 1410 1664 1917 2170 50.497479 7731 7983 8236 8488 55.498740 8992 57 9244 58 59 9496 9748 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.500000 COSINE .874620 4479 4338 4196 4055 .873914 3772 3631 3489 3348 .873206 3064 " Corr. 2922 10 24 278015 36 2638 20 47 .872496 30 71 2354 40 95 2212 45 107 2069 50 18 1927 .871784 1642 1499 1357 1214 .871071 0928 0785 0642 0499 .870356 0212 0069 .869926 9782 869639 9495 9351 9207 9064 CORR. FOR SEC. .868920 8776 "Corr. 8632 10 24 8487 15 36 8343 20 48 |.868199 30 72 8054 40 96 7910 45 108 7766 50 120 7621 867476 7331 7187 7042 6897 .866752 6607 6461 6316 6171 866025 29° VERSINE .125380.143354 5521 5662 5804 5945 6936 7078 7220 7362 EXSEC .126086. 144278 6228 6369 6511 4463 " Corr. 4648 10 31 483415 46 6652 5020 20 62 .126794.145206 30 93 5392 40 124 5578 45 140 5764 50 155 5950 3538 3723 3908 4093 .127504.146137 7646 7788 7931 8073 8501 8643 8786 .128216. 147073 8358 .129644 9788 9931 .130074 0218 6324 6511 6698 6885 7260 7448 7636 7824 .128929.148012 9072 9215 9358 9501 8200 Corr. 8389 10 32 8578 15 47 8766 20 63 148956 30 95 95 9145 40 126 9334 45 143 9524 50 158 9713 .130361.149903 0505. 150093 0649 0283 0473 0793 0936 0664 .131080. 150854 1224 1368 1513 1657 1045 1236 1427 1618 CORR. FOR SEC. + 31 .131801.151810 1946 2090 2234 2379 .132524.152769 30 96 2669 2962 40 128 3154 145 144 3347 50 160 2813 2958 3103 3540 .133248.153733 3393 3539 3684 3829 .133975.154700 11 2002 Corr. 2193 TO 32 2385 15 48 2577 20 64 3926 4120 4313 4507 CORR. FOR SEC. + 11 Corr. 10 64 15 95 20 127 30 191 40 254 45 286 50 318 Corr. 10 64 15 96 20 128 30 192 40 256 45 288 50 320 11 Corr. 10 64 15 97 20 129 30 193 40 258 45 290 50 322 TANGENT 554309 4689 5070 5450 5831 · 556212 • 01234 7736 6593 6 6974 7 7355 5878 σ .558118 10 84991 8881 12 9263 13 964514 9 .560027 15 04091 16 0791 17 174 18 1556 19 561939 20 232221 2705 22 3088 23 3471 24 .563854 25 423826 4621 27 5005 28 5389 29 565773 30 615731 6541 32 6925 33 7310 34 .567694 35 807936 8464 37 8849 38 9234 39 .56961940 .570004 41 0390 42 077643 1161 44 571547 45 1933 46 2319 47 2705 48 3092 49 573478 50 386551 425252 4638 53 5026 54 .57541355 5800 56 6187 57 6575 58 6962 59 577350 60 491 0.500000 0-23➡ 4 66789 0-234 56 5.501259 1511 1762 2014 2266 11 10.502517 12 13 14 16 17 18 19 ~~~~~ 234 15.503774 30 126 4025 40 167 4276 45 188 452850 209 4779 20.505030 21 22 5281 5532 5783 6034 25.506285 6536 6786 7037 7288 23 24 ~~~~2 67~8 ❤❤❤ 2 99 85087 DONOR O 26 27 32 33 34 30.507538 7789 8040 8290 8541 37 38 SINE 35.508791 9041 9292 9542 9792 41 0252 0504 0756 1007 42 43 44 40.510043 46 47 48 49 2768 " Corr. 3020 10 42 327115 63 3523 20 84 53 54 56 50.512542 2792 3042 3292 3541 57 58 55.513791 4040 4290 4539 4789 VERSINES, EXSECANTS, AND TANGENTS 30° CORR. FOR SEC. + 0293 0543 10 " Corr. 42 0793 15 62 1043 20 83 11220205 60.515038 COSINE 866025 5880 5734 5589 5443 .865297 5151 5006 4860 4713 .863102 2955 2808 2661 2514 45.511293 30 125.859406 30 74 1543 40 167 1793 45 187 204350 208 2293 9258 40 99 9109 45 112 8960 50 124 8811 .864567 4421 Corr. 427510 24 412815 37 3982 20 49 .863836 30 73 3689 40 98 3542 45 110 3396 50 122 3249 .862366 2219 2072 1924 1777 .861629 1482 1334 1186 1038 .860890 0742 0594 0446 0298 CORR. FOR SEC. + 11 " .860149 0001 " Corr. .859852 10 25 .858662 8513 8364 8214 8065 9704 15 37 9555 20 50 .857916 7766 7616 7467 7317 .857167 VERSINE .133975.154700 4120 4266 4411 4557 EXSEC .134703.155672 4849 4994 5140 5287 5579 5725 5872 6018 4894 5089 5283 5478 .135433.15664830 .136164.157628 6311 6458 6604 6751 8518 8666 8814 8962 " 5867 Corr. 6062 10 6257 15 49 15 97 6452 20 65 20 130 .136898.158612 7045 8809 7192 9006 9204 7339 7486 9402 98 6844 40 130 7039 45 147 7235 50 163 7432 7824 8021 8218 8415 .137634.159600 7781 7928 0742 0891 1040 1189 .139110.161588 9258 9406 9554 9702 CORR. FOR SEC. 1788 1988 2188 2389 .139851.162589 2790 2990 9999 .140148 0296 3191 0445 3392 .140594.163594 + 11 9798 Corr. Corr. 9996 10 33 10 65 8076. 16019515 50 15 98 8223 0393 20 66 20 131 .142084.165616 2234 2384 2533 2683 Corr. 3310 65 .138371.160592 30 100 || 30 196 0791 40 133 0990 45 149 1189 50 166 1389 40 261 45 294 50 327 " 3795 Corr. 3997 10 34 4199 15 51 4401 20 67 5819 6022 6226 6430 .142833 166633 = .141338.164603 30 101 1487 4805 40 135 1636 500845 152 1786 5210 50 169 1935 5413 rt CORR. FOR SEC. + 30 195 40 259 45 292 50 324 = 11 " Corr. 10 66 15 99 20 132 30 197 40 263 45 296 50 329 TANGENT .577350 7738 8126 8514 1 0-23= 8903 4 .579291 9620 6 580068 7 0457 0846 5678σ 9 .581235 10 1624 11 2014 12 2403 13 2793 14 .583183 15 3573 16 3963 17 4353 18 4743 19 .585134 20 5524 21 5915 22 6306 23 6696 24 .587088 25 7479 26 7870 27 8262 28 8653 29 .589045 30 9437 31 9829 32 .59022 33 061334 .591006 35 1398 36 1791 37 2184 38 2577 39 .592970 40 3363 41 3756 42 4150 43 4544 44 .594938 45 5331 46 5726 47 6120 48 6514 49 596908 50 7303 51 7698 52 8093 53 8488 54 598883 55 9278 56 9674 57 .600069 58 0465 59 .60086 60 492 1 0.515038 5287 5537 5786 6035 0-232 BOZOK O-2M4 WO789 5.516284 6 7 8 9 11 10.517529 12 13 14 16 17 19 15.518773 30 124 9022 40 166 9270 45 186 22222 222°~ 6.087 HOMO ERRE DONOR OF CON 23 24 18 9519 50 207 9768 20.520016 26 27 28 29 25.521258 1506 1754 2002 2250 31 32 33 34 SINE 30.522499 2747 2994 36 37 38 39 6533 6782 7031 7280 41 42 35.523738 3986 4234 4481 4729 43 44 II 7778 Corr. 8027 10 41 8276 15 62 8525 20 83 46 47 48 49 40.524977 0265 0513 0761 1010 51 52 53 54 56 3242 3490 57 58 59 45.526214 50.527450 7697 7944 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 11 5224 Corr. 5472 10 41 571915 62 5966 20 82 30 124 6461 40 165 6708 45 186 6956 50 206 7203 55.528685 8932 9179 9426 9673 60.529919 8191 8438 COSINE .857167 7017 6868 6718 6567 .856417 6267 6117 .854156 4005 3854 3702 3551 5966 11 5816 855666 5515 Corr. 5364 10 25 521415 38 5063 20 50 854912 30 76 4761 40 101 4610 45 113 4459 50 126 4308 .853399 3248 3096 2944 2792 .852640 2488 2336 2184 2032 CORR. FOR SEC. + .851879 1727 1574 1422 11 1269 .851117 0964 Corr. 0811 10 26 0658 15 38 0505 20 51 848818 8664 8510 8356 8202 848048 31° VERSINE 142833. 166633 2983 3132 3282 3433 EXSEC .143583.167655 3733 3883 4034 4184 5541 5692 6837 7042 7246 7450 7860 Corr. 8065 10 34 827015 51 8476 20 69 .144334.168681|30 103 8887 40 137 9093 45 154 4786 9299 50 171 4937 9505 4485 4636 .1450881.169711 5239 5390.170124 6146 6298 6449 9918 0331 0538 .145844.170746 5995 0953 1161 1368 1576 .850352 30 0199 40 102 0046 45 115 .849893 50 128.150107 9739 .849586 9432 9279 9125 8972 7664 7816 7968 3665 .148121.173875 8273 8426 8578 8731 4085 4295 4506 4716 .148883.174927 9036 9189 9342 9495 146601.171784 6752 1993 "Corr. 2201 10 35 6904 7056 2410 15 52 15 100 261920 70 120 133 7208 .608807 20 9205 21 9604 22 .610003 23 0403 24 .610802 25 1201 26 160127 2001128 2401 29 .147360.172828 30 10530 200.612801 30 7512 3037 40 139 ||40 267 3246 45 157 45 300 3201 31 3601 32 3456 50 174 50 333 5138 5349 5560 5772 77.149648.175983 9801 9954 CORR. FOR SEC. + = 11 6195 Corr. 6407 TO 35 6619 15 53 6831 20 71 .151 182.178109 1336 8322 8536 1490 1644 8750 1798 8964 .151952.179178 CORR. FOR SEC. + 0261 .150414.177044 30 106 0568 7257 40 142 0721 7469 45 160 7682 50 177 0875 1028 7896 IT Corr. 10 66 15 99 20 132 30 199 40 265 45 298 50 331 TANGENT 1 .600861 0 1257 1653 2 2049 3 2445 4 " Corr. 10 67 5 .602842 3239 6 3635 7 4032 8 4429 9 .604827 10 522411 5622 12 6019 13 641714 .606815 15 7213 16 7611 17 8010 18 8408 19 400233 4402 34 .614803 35 5204 36 5605 37 6006 38 6408 39 .61680940 721141 761342 801443 8417 44 " Corr. .618819 45 9221 46 10 67 9624 47 15 101.620026 48 20 134 0429 49 30 202.620832 50 40 269 1235 51 45 302 1638 52 50 336 2042 53 2445 54 .622849 55 3253 56 3657 57 406158 4465 59 .624869 60 493 1 01234 BO76G 0.529919 1.530166 8 5.531152 9 0-23➡ 10.532384 11 12 13 14 #1 2630 Corr. 2876 10 41 3122 15 61 3368 20 82 15.533614 30 123 3860 40 164 4106 45 185 4352 50 205 4598 16 5678DO 17 18 19 22222 234 21 20.534844 22 23 24 222 5GOI 26 25.536072 28 29 6318 27 6563 6809 7054 31 ოოო ოოო 32 30.537300 7545 7790 8035 8281 33 34 ===== 36 37 38 39 35.538526 41 43 SINE 44 0412 0659 0906 46 47 48 49 1399 1645 1891 2138 40.539751 9996 " Corr. 42.540240 TO 41 0485 15 61 0730 20 82 45.540974 30 122 121940 163 1464 45 183 1708150 204 1953 80 20000 52 87 BO788 8 5090 5336 5581 5827 53 50.542197 2442 2686 54 56 57 58 59 8771 9016 9261 9506 2930 3174 55.543419 VERSINES, EXSECANTS, AND TANGENTS 32° 3663 3907 4151 4395 CORR. FOR SEC. + 60.544639 COSINE .848048 7894 7740 7585 7431 .847276 7122 6967 6813 11 6658 846503 6348 Corr. 6193 10 26 6038 15 39 5883 20 52 .845728 30 78 5573 40 103 5417 45 116 526250 129 5106 .844951 4795 4640 4484 4328 .844172 4016 3860 3704 3548 .843391 3235 3079 2922 2766 CORR. FOR SEC. .842609 2452 2296 2139 11 1982 .841825 1668 Corr. 1511 10 26 135415 39 1196 20 52 .841039 30 79 0882 40 105 0724 45 118 0567 50 131 0409 .840251 0094 839936 9778 9620 .839462 9304 9146 8987 8829 .838671 VERSINE .151952.179178 2106 2260 9393 " Corr. 9607 TO 36 2415 9822 15 54 2569. 180037 20 72 2878 3033 3187 3342 .152724.18025230 108 0468 40 144 0683 45 162 0899 50 180 1115 .153497.181331 3652 3807 3962 4117 EXSEC .154272.182414 4427 4583 4738 4894 5205 5360 5516 5672 FT 2631 Corr. 2848 TO 36 3065 15 55 3283 20 73 .155049.183501|30 109 3719 40 146 3937 45 164 4155 50 182 4374 1547 1763 1980 2197 . 155828.184593 5984 6140 6296 6452 7548 7704 .156609.185689 6765 6921 7078 7234 7861 8018 4812 5031 5250 5469 .157391.186790 30 111 7011 40 147 723245 166 7453 50 184 7674 9906 .160064 0222 0380 CORR. FOR SEC. + 11 5909 Corr. 6129 10 37 6349 15 55 6569 20 74 .158175.187895 8332 8489 8646 8804 .159749.190120 30 112 0344 40 149 0567 45 168 0791 50 186 1015 .160538.191239 0696 0854 1013 1171 1464 1688 1913 2138 .161329.192363 CORR. FOR SEC. + " Corr. то 68 15 101 20 135 30 203 40 270 45 304 50 338 8117 8339 8561 It 13 8783 .158961. 189006 9228 Corr. Corr. 9451 10 37 10 69 967415 56 15 103 9897 20 75 9118 9276 9433 9591 20 137 " Corr. 10 68 15 102 20 136 30 204 40 272 45 306 50 340 11 Corr. 10 68 15 103 20 137 30 206 40 275 TANGENT 45 309 50 344 .624869 5274 5679 6083 6488 .626894 7299 7704 8110 8516 01234 56789 .62892210 9327 11 9734 12 63014013 0546 14 .630953 15 1360 16 1767 17 2174 18 2581 19 .632988 20 3396 21 3804 22 42123 461924 .635027 25 5436 26 5844 27 6253 28 666 29 30 205 40 273 45 308 .63911735 9527 36 9937 37 50 342.640347 38 0757 39 .641167 40 1578 41 1989 42 2399 43 2810 44 .637070 30 7479 31 7888 32 8298 33 8707 34 .643222 45 3633 46 4044 47 4456 48 486849 .645280 50 5692 51 6104 52 6516 53 6929 54 .647342 55 7755 56 8168 57 858 58 8994 59 649408 60 494 0.544639 01234 BOT∞ a 6 7 5.545858 8 9 || 1234 12 10.547076 13 14 56789 16 17 18 19 ~~~~~ ~~ 0123= 15.548293 30 122 8536 40 162 8780 45 182 9023 50 203 9266 21 22 20.549509 24 9752 9995 23.550238 0481 DONOR Oma ko♪❤. 26 27 28 29 25.550724 31 32 33 34 36 SINE 30.551937 2180 2422 2664 2907 37 38 4883 5127 41 5371 5614 42 43 44 35.553149 3392 3634 3876 4118 6102 6346 6589 6833 46 47 48 49 40.554360 g g⌘ཡཿཀྱཿg 51 | 52 7320" Corr. 7563 10 41 7807 15 61 8050 20 81 53 54 56 0966 1209 1452 1694 57 58 59 45.555570 30 121 581240 161 6054 45 181 6296 50 202 6537 50.556779 7021 7262 7504 7745 55.557986 8228 8469 8710 8952 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + " Corr. 4602 4844 10 40 5086 15 60 5328 20 81 60.559193 COSINE .838671 8512 8354 8195 8036 .837878 7719 7560 7401 7242 .837083 6924 Corr. 6764 10 27 6605 15 40 6446 20 53 .835488 5328 5168 .836286 30 80 6127 40 106 5967 45 120 5807 50 133 5648 5008 4848 .834688 4528 4367 4207 4046 .833886 3725 3565 3404 3243 .833082 2921 2760 2599 2438 CORR. FOR SEC. .832277 2116 1954 10 179315 1631 20 + .831470 30 .830661 0499 0337 0174 0012 .829850 9688 9525 9363 9200 .829038 " Corr. 27 40 54 1308 40 108 146 45 121 0984 50 135 0823 33° VERSINE .161329.192363 1488 1646 1805 1964 2281 2440 2599 2758 " 2589 Corr. 2814 10 38 3040 15 57 3266 20 76 .162122.193492 30 113 30 207 3718 40 151 40 276 3945 45 170 45 311 417150 189 ||50 346 4398 EXSEC .162917.194625 3076 3236 3395 3554 4852 5080 .163714.195763 3873 4033 4193 5991 " Corr. 6219 10 38 6448 15 57 4352 6677 20 77 .164512.196906 30 15 7135 40 153 7364 45 172 4992 7593 50 191 5152 7823 4672 4832 .165312.198053 5472 8283 5633 8513 5793 8744 5954 8974 5307 5535 .166114.199205 6275 6435 6596 .167723.201523 7884 8046 8207 8369 8692 8854 9016 9177 81.168530 ||.202690 9501 9663 9826 9988 1756 1989 To 9436 "Corr. Corr. 966710 39 10 70 9898 15 58 15 105 6757.200130 20 77 20 140 .166918.200362 30 116 30 210 7079 0594 40 155 ||40 280 0826 45 174 45 315 105850 194 50 350 1291 7240 7401 7562 2223 2456 2924 " Corr. 3158 10 39 339215 59 3626 20 78 .169339.203861 30 118 4096 40 157 433145 176 4566 50 196 4801 CORR. FOR SEC. + 170150.205037 0312 0475 0637 0800 .170962.206218 5273 5509 5745 5981 CORR. FOR SEC. + 11 Corr. 10 69 15 104 20 138 "Corr. 10 69 15 104 20 139 30 209 40 278 45 313 150 348 11 " Corr. 10 70 15 106 20 141 30 211 40 281 45 316 50 352 TANGENT .649408 9821 .650235 0649 1063 0 1 234 567Bσ .651477 1892 2306 2721 8 3136 9 .65355110 3966 1 4382 12 4797 13 521314 .655629 15 6045 16 6461 17 6877 18 7294 19 .657710 20 8127 21 8544 22 8961 23 9378 24 .659796 25 .660214 26 063 27 1049 28 1467 29 661886 30 2304 31 2722 32 314133 3560 34 .663979 35 4398 36 4818 37 5237 38 5657 39 .666077 40 6497 41 691742 7337 43 775844 .66817945 8600 46 902047 9442 48 9863 49 .670284 50 0706 51 1128 52 1550 53 1972 54 .672394 55 2817 56 3240 57 3662 58 4085 59 .674508 60 495 ↑ 0.559193 9434 9675 9916 4.560157 5.560398 0639 0880 1121 1361 I 234 5678 M 9 10.561602 11 -232 DONOσ 12 1843 "Corr. 20831040 2324 15 60 2564 20 80 15.562805 30 120 3045 40 159 3286 45 180 18 3526 50 200 16 17 19 3766 20.564007 4247 4487 4727 4967 25.565207 5447 5687 5927 6166 13 14 22222 22222 6.2 21 1234 23 24 26 27 28 29 567 30.566406 6646 32 6886 33 7125 34 7365 31 35.567604 7844 8083 55±5 @www. 36 37 38 39 41 40.568801 42 43 4444 55 SINE 51 52 47 48 49 0952 50.571191 1430 1669 1907 2146 53 8322 8562 54 gg⌘38 56 57 58 59 9040 Corr. 9280 10 39 9519 15 60 9758 20 80 55.572384 2623 2861 3100 3338 60.573576 VERSINES, exsecants, AND TANGents 34° 31 CORR. FOR SEC. + COSINE .829038 8875 8712 8549 8386 828223 8060 7897 7734 7571 " 827407 7244 Corr. 708110¯¯¯¯¯27 6917 15 41 6753 20 55 .825770 5606 5442 45.569997 30 119.821647 30 83 46.570236 40 159 1481 40 110 1315 45 124 0475 45 179 0714 50 199 149 150 138 .826590 30 82 6426 40 109 6262 45 123 6098 50 136 5934 5278 5114 .824949 4785 4620 4456 4291 1.824126 396 I 3796 3632 3467 1.823302 3136 2971 2806 2640 1.822475 CORR. FOR SEC. + 2310 " Corr. 2144 10 28 1978 15 41 181320 55 0983 .820817 0651 0485 0318 0152 .819985 9819 9652 9486 9319 1.819152 VERSINE 1125 1288 1451 1614 .170962 ||.206218 6455 " Corr. 669210 40 692915 60 7166 20 79 .171777.207404 30 119 7642 40 159 7879 45 179 8118 50 198 8356 1940 2103 2266 2429 .172593.208594 2756 2919 3083 3247 EXSEC .173410.209790 3574.210030 4722 4886 ** Corr. 3738 0270 10 40 3902 0510 15 60 4066 0750 |20 80 174230.210990 30 121 4394 123140 161 1472 45 181 1713 50 201 4558 1954 8833 9072 9311 9550 .175051.212196 5215 5380 5544 2922 5709 3164 6864 7029 7194 7360 .175874.213406 6039 6204 6368 6533 .178353 8519 8685 8851 9017 2438 2680 3649 Corr. 389210 41 413515 61 4378 20 81 .176698.214622 30 122 4866 40 163 5109 45 183 5354 50 203 5598 .177525.215842 7690 7856 8022 8187 9349 9515 9682 9848 6087 6332 6577 6822 CORR. FOR SEC. + " " Corr. 217068 7314 7559 10 41 780615 62 8052 20 81 .179183.218298 30 124 8545 40 165 8792 45 185 9039 50 206 9286 180015219534 0181 9782 0348.220030 0514 0278 0681 0526 180848.220775 CORR. FOR SEC. + " Corr. 10 71 15 106 20 141 " 10 71 15 107 20 142 30 212.676627 40 283 45 318 150 354 Corr. 30 213 40 285 45 320 50 356 TANGENT .674508 4932 5355 5779 6203 11 Corr. 10 72 15 108 20 144 0-23⇒ 5678σ 7051 7475 7900 8324 9 .678749 10 9174 11 9599 12 .680025 13 0450 14 .680876 15 130216 1728 17 2154 18 2580 19 683007 20 3433 21 3860 22 4287 23 4714 24 .685142 25 5569 26 5997 27 6425 28 6853 29 687281 30 7709 31 813832 8567 33 8996 34 " Corr. 10 72 15 107 20 143 30 215.689425 | 35 40 286 9854 36 45 322.690283 37 150 358 0713 38 | 14239 .691572 40 2003 41 2433 42 2863 43 3294 44 693725 45 4156 46 4587 47 501848 5450 49 30 216.695881 | 50 40 288 6313 51 45 324 6745 52 7177 53 7610 54 50 360 698042 55 8475 56 8908 57 934158 9774 59 700208 60 496 0.573576 3815 4053 4291 4529 0123♬ 4 5678 σ 5.574767 5005 5243 5481 5719 9 10.575957 34 13 " 11 11 6195 Corr. 12 6432 10 40 6670 15 59 6908 20 79 15.577145 30 119 7383 40 158 762045 178 785850 198 8095 14 16 17 18 19 20.578332 8570 8807 9044 9281 22222 U2 2 23 24 25.579518 9755 9992 28.580229 0466 30.580703 0940 1176 1413 1650 26 27 29 170m2 komm8 2 49700 85087 55 31 32 33 34 35.581886 36 37 38 39 441 42 43 44 SINE 40.583069 46 48 51 45.584250 30 118 4486 40 157 4722 45 177 4958 50 197 5194 52 50.585429 53 54 2123 2360 2596 2832 56 57 58 59 3305 Corr. 354110 39 3777 15 59 4014 20 79 55.586608 5665 5901 6137 6372 6844 7079 7314 7550 60.587785 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + COSINE .819152 8985 8818 8651 8484 .818317 8150 7982 7815 7648 .815801 5633 5465 5296 5128 .817480 7312 " Corr. 7145 TO 28 6977 15 42 6809 20 56 .816642 30 84 6474 40 12 6306 45 126 6138 50 140 5970 .814959 4791 4622 4453 4284 .814116 3947 3778 3608 3439 .813270 3101 2931 2762 2592 CORR. FOR SEC. .812423 2253 " Corr. 2084 TO 28 191415 42 1744/20 57 .811574 30 + .810723 0553 0383 0212 0042 1404 40 113 .809871 9700 9530 1234 45 127 1064 50 142 0894 9359 9188 809017 35° VERSINE EXSEC .180848.220775 11 1015 1182 1349 1023 Corr. 1272 10 42 1522 15 63. 1516 1771 20 83 .181683.222020 30 125 2270 40 167 2520 45 188 2770 50 208 2352 .3021 1850 2018 2185 .182520.223271 2688 2855 3023 3191 .183358.224527 3526 3694 3862 4030 3522 3773 4024 4276 .185041.227055 5209 5378 5547 5716 7309 7563 7818 8072 .185884.228327 6053 6222 6392 6561 187577.230886 7747 7916 8086 8256 85.188426||.232174 8596 8766 8936 9106 9447 9617 9788 9958 11431 1400 1658 1916 CORR. FOR SEC. + # I 8582 Corr. Corr. 8837 10 43 10 73 9092 15 64 15 110 9348 20 85 20 147 .186730.229604 30 128 30 220 6899 9860 40 171 40 293 7069.2301 16 45 192 7238 0372 50 214 7408 0629 45 330 50 367 2432 " Corr. 2690 10 43 2949 15 65 3207 20 87 CORR. FOR SEC. + " Corr. 10 73 .706730 15 7166 16 7603 17 8040 18 8476 19 4779 " Corr. 503110 42 5284 15 63 15 109 5536 20 8420 146 184199.225789 30 127 30 219.708913 20 4367 6042 40 169 40 292 9350 21 4535 6295 45 190 45 328 9788 22 50 365 .710225 23 066324 4704 6548 50 211 4872 6802 .190129.234764 0300 0470 0641 0812 .190983.236068 " Corr. 10 72 5025 5285 5546 5807 15 109 20 145 30.217 40 290 45 326 50 362 n Corr. то 74 15 111 20 148 .189277.23346630 130 30 222 3726 40 173 398545 195 4245 50 216 4504 40 295 45 332 50 369 TANGENT .700208 0641 1075 2 1509 1943 .702377 0123A BONBO 4 5 2812 6 3246 7 3681 8 4116 9 704552 10 4987 11 5422 12 5858 13 629414 .711101 25 1539 26 1977 27 2416 28 28541 29 .71329330 3732 31 4171 32 4611 33 5050 34 .715490 35 5930 36 6370 37 681038 7250 39 .717691|40 8132 41 8573 42 901443 9455 44 .719897 45 .720339 46 0781 47 1223 48 166549 .722108 50 2550 51 2993 52 3436 53 387954 .724323 55 4766 56 5210 57 5654 58 6098 59 .726542 60 497 0.587785 01234 3 5678σ 5.588961 9196 9431 9666 9901 6 9 || 10.590136 234 12 13 14 567 16 17 18 19 22222 ~~2 22~~2 .~~~~ ❤❤♪ FIRE 99700 85087 68788 21 20.592482 2716 2950 3185 3419 25.593653 3887 4121 4355 4589 23 24 15.591310 30 117 1544 40 156 1779 45 176 2013 50 195 2248 26 27 28 31 32 30.594823 5057 5290 5524 5758 33 34 36 37 38 35.595991 6225 6458 6692 6925 SINE 42 43 44 8021 8256 8491 8726 40.597159 46 47 48 49 45.598325 51 54 56 0371 Corr. 0606 10 39 0840 15 59 1075 20 78 50.599489 9722 9955 53.600188 0420 57 58 59 55.600653 0885 1118 1350 1583 60.601815 VERSINES, EXSECANTS, AND TANGENTS 36° CORR. FOR SEC. " 11 + 7392 "Corr. 7625 10 39 785815 58 8092 20 78 8558 40 155 8791 45 175 902450 194 9256 COSINE .809017 8846 8675 8504 8332 .808161 7990 7818 7647 7475 " .807304 7132 Corr. 6960 10 29 6788 15 43 6617 20 57 .806445 30 805584 5411 5239 5066 4894 .804721 4548 4376 4203 4030 6273 40 115 6100 45 129 5928 50 143 5756 .803857 3684 3511 3338 3164 .802991 2818 2644 2470 2297 CORR. FOR SEC. " .802123 1950 Corr. 1776 10 29 160215 44 1428 20 58 30 117.801254 30 87 1080 40 116 090645 131 0731 50 145 0557 .800383 0208 0034 799859 9685 + .799510 9335 9160 8986 8810 .798636 VERSINE 190983.236068 1154 1325 1496 1668 2010 2182 2353 2525 EXSEC 11 6329 Corr. 6591 10 44 685315 66 7115 20 86 .191839.237377 30 131 7639 40 175 7902 45 197 8165 50 219 8428 .192696.238691 2868 3040 3212 3383 86.193555||.240011 3727 3900 4072 4244 4589 4761 4934 5106 8955 9218 9482 9746 .194416.241336 30 133 1602 40 177 1868 45 200 2134 50 222 2400 It 0275 Corr. 0540 10 44 0805 15 67 1070 20 89 .195279.242666 5452 5624 5797 5970 7182 7356 7530 7703 2933 3200 3468 3735 .196143.244003 6316 6489 6662 6836 4270 " Corr 4538 10 45 4807 15 67 5075 20 90 .197009.245344 30 135 561340 180 5882 45 202 6152 50 225 6421 CORR. FOR SEC. + . 197877.246691 8050 8224 8398 8572 6961 7232 7502 7773 .198746.248044 8920 8315 Corr. 9094 858710 45 8858 15 68 9130 20 91 .199617.249402 30 136 9269 9443 9792 9675 40 182 9966 9947 45 205 .200141.250220 50 227 0315 0493 .200490.250766 0665 0840 1014 1190 .201364.252136 1040 1313 1587 1861 11 CORR. FOR SEC. + I Corr 74 10 15 11 20 149 30 223 40 297 45 334 50 372.730104 " Corr. 75 10 15 112 20 150 30 224 40 299 45 337 50 374 10 75 15 113 20 151 TANGENT .726542 6987 7432 7877 8322 30 226 40 301 45 339 50 376 .728767 9212 9658 "Corr. 10 76 15 114 20 152 0 1231 4 5678σ) 8 0550 9 730996 10 1443 11 1889 12 2336 13 2783 14 .733230 15 3678 16 4125 17 4573 18 5021 19 73996 30 "Corr..740411 31 0862 32 1312 33 1763 34 .735469 20 5917 21 6366 22 6815 23 7264 24 .737713 25 8162 26 8612 27 9061 28 951 29 .742214 35 2666 36 311737 3569 38 4020 39 744472 40 4925 41 5377 42 583043 628244 .746735 45 718946 7642 47 8096 48 8549 49 30 227 749003 50 140 303 9458 51 45 341 991252 50 379.750366 53 0821 54 751276 55 173156 2187 57 2642 58 3098 59 753554 60 498 1 0.601815 2047 2280 -232 567BG 0-23- 4 8 5.602976 11 12 10.604136 13 14 16 17 18 ~~~~~ 19 ∞ α 15.605294 30 116 5526 40 154 5757 45 174 5988 50 193 6220 21 22 20.606451 23 24 ~°~~* ommMZ HOMMA D 26 27 28 29 25.607607 7838 8069 8300 8531 32 34 37 SINE 38 30.608761 8992 9223 2512 2744 41 42 43 44 3208 3440 3672 3904 35.609915 36.610145 46 47 48 49 LOLOLOLO LO 51 " Corr. 39 4367 459910 483115 58 5062 20 77 40.611067: 52 6682 6914 7145 7376 53 54 56 57 58 59 9454 9684 45.612217 30 115 2447 40 153 2677 45 173 2907 50 192 3137 50.613367 0376 0606 0836 11 1297 Corr. 1527 10 38 1757 15 57 1987 20 77 3596 3826 4056 4285 55.614515 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 4744 4974 5203 5432 60.615662 COSINE .798636 8460 8285 8110 7935 .797759 7584 7408 7233 7057 .796882 6706 6530 10 635415 6178 20 796002 30 .795121 4944 4768 4591 4415 .794238 4061 3884 3707 3530 .793353 3176 2999 2822 2644 5826 40 117 5650 45 132 547450 147 5297 .792467 2290 2112 19341 1757 CORR. FOR SEC. .789798 9620 9441 + " Corr. 9263 9084 .791579 1401 "Corr. 1224 10 30 1046 15 45 0868 20 59 .788905 8727 8548 8369 8190 788011 BENE .790690 30 89 0512 40 119 0333 45 134 0155 50 148 .789977 37° VERSINE .201364.252136 1540 1715 1890 2065 11 2410 Corr. 2685 10 46 2960 15 69 3235 20 92 .202241.253511 30 138 3786 40 184 40621 45 207 433950 230 4615 2416 2592 2767 2943 .203118.254892 3294 3470 EXSEC 5168 5446 3646 5723 3822 6000 203998.256278 4174 4350 4526 6556 Corr. 6835 10 47 7113 15 70 4703 7392 20 93 .204879.257670 30 140 7950 40 186 8229 45 210 8509 50 233 8788 5056 5232 5409 5585 .205762.259069 5939 9349 6116 6293 • 6470.260191 .206647.260472 6824 7001 7178 7356 7710 7888 8066 8243 9629 99.0 .208421.263298 8599 8776 8954 9132 tt 0754 Corr. 1036 10 1318 15 1600 20 0559 0737 0916 .209310.264719 9488 9667 9845 .210023 CORR. FOR SEC. + 3581 3865 4150 44341 .207533.261882 30 14230 232 2165 40 189 40 309 2448 45 21245 348 273 50 236 50 386 3014 .211095.267579 1273 7866 1452 8154 8442 8730 IT 5004 Corr. 5289 10 5574 15 5860 20 1631 1810 .211989.269018 11 CORR. FOR SEC. + Corr. 10 76 32535 72 15 114 20 153 " Corr. 471077 71 15 116 9420 155 30 229 40 305 45 343 50 381 It Corr. 10 77 15 115 20 154 30 230 40 307 45 345 50 384 "Corr. 48 10 78 210202.266146 30 14330 233 0380 6432 40 191 6719 45 215 7005 50 239 7292 15 117 95 20 156 40 311 45 350 50 389 TANGENT 1 .753554 4010 4467 4923 5380 4 5 .755837 6294 6 6751 7 7209 8 7667 9 .758125 10 8583 11 9041 12 9500 13 995914 .760418 15 0877 16 1336 17 1796 18 2256 19 .762716 20 317621 3636 22 4097 23 4558 24 0-232 DOTOM O-23- .765019 25 5480 26 594 27 • 6403 28 6865 29 767327 30 7789 31 8252 32 8714 33 9177 34 .769640 35 .770104 36 0567 37 1031 38 1495 39 .771959 40 2423 41 2888 42 335343 3818 44 .774283 45 4748 46 521447 5680 48 6146 49 .776612 50 7078 51 7545 52 8012 53 8479 54 .778946 55 941456 9881 57 .780349 58 0817 59 .78128660 499 0.615662 0-232 57 0-231 DO 6 8 5.616807 9 14 16 17 18 10.617951 22222 222 21 234 23 24 15.619094 30 114 9322 40 152 9551 45 171 9779 50 190 19.620007 20.620236 26 27 28 29 0207 600MM DIE OOO OOG 31 32 33 34 25.621376 1604 1831 2059 2287 36 37 38 39 SINE 30.622515 2742 2970 3197 3425 41 42 43 44 5891 6120 6349 6578 46 47 48 49 35.623652 3880 4107 4334 4561 7036 7265 7494 7722 51 40.624788 52 53 54 8180 " Corr. 8408 10 38 8637 15 57 8866 20 76 0464 0692 0920 1148 45.625924 56 57 58 59 50.627057 7284 7510 7737 7963 VERSINES, EXSECANTS, AND TANGENTS 38° CORR. FOR SEC. + 5016 " Corr. 5243 10 38 5470 15 57 5697 20 76 55.628189 8416 8642 8868 9094 60.629320 6150 40 151 6377 45 170 6604 50 189 6830 COSINE .788011 7832 7652 7473 7294 .787114 6935 6756 6576 6396 .786216 6037 " Corr. 5857 TO 30 5677 15 45 5497 20 60 .784416 4235 4055 3874 3694 .785317 30 90 5137 40 120 4957 45 135 4776 50 150 4596 .783513 3332 3151 2970 2789 .782608 2427 2246 2065 1883 CORR. FOR SEC. .781702 1520 1339 1157 11 0976 .780794 0612 Corr. 0430 TO 30 0248 15 46 0066 20 61 30 113.779884 30 91 9702 40 121 +.211989.269018 2168 2348 2527 .778973 8791 8608 8426 8243 9520 45 137 9338 50 152 9156 .778060 7878 7695 7512 7329 .777146 VERSINE EXSEC 11 9307 Corr. 9596 10 48 9884 15 73 2706.270174 20 97 .212886.270463 30 145 3065 0753 40 193 1043 45 218 1333 50 242 1624 3244 3424 3604 .213784.271914 3963 4143 4323 4503 2205 2496 2788 3079 .214683.273371 4863 5043 5224 5404 5765 5945 6126 6306 11 3663 Corr. 3956 10 49 4248 15 73 4541 20 98 .215584.274834 30 147 5128 40 196 5421 45 220 5715 50 245 6009 .216487.276303 6668 6849 7030 7211 6598 6893 7188 7483 .217392.277779 7573 7754 7935 8117 8074 8370 10 Corr. 50 8667 15 74 8963 20 99 1046 1344 1643 1942 CORR. FOR SEC. + .220116.282241 0298 0480 0662 0844 = .218298.279260 30 149 8480 8661 9557 40 198 9854 45 223 8843.280152 50 248 9024 0450 .219206.280748 9388 9570 9752 9934 11 .221940.285247 2122 2305 2488 2671 .222854.286760 5549 5851 6154 6457 " 2541 Corr. 2840 10 50 3140 15 75 3441 20 100 .221027.283741 30 151 1209 1392 4042 40 201 4343 45 226 4644 50 251 1574 1757 4944 CORR. FOR SEC. + Corr. 10 78 15 117 20 157 30 235 40 313 45 352 50 392 11 Corr. 10 79 15 118 20 158 30 237 40 316 45 355 50 394 " Corr. то 79 15 119 20 159 30 238 40 318 45 357 50 397 Corr. 10 80 15 120 20 160 30 240 40 320 45 360 50 400 TANGENT 781286 1754 • 2692 1 0 2223 2 .783630 4100 D-232 507B α) 3161 4 6 4570 5040 8 5510 9 .78598110 645211 6922 12 739413 7865 14 788336 15 8808 16 9280 17 9752 18 .790225 19 .790698 20 1170 21 1643 22 2117 23 2590 24 793064 25 3538 26 401227 4486 28 496 29 .795436 30 591131 6386 32 6862 33 7337 34 .79781335 8290 36 8766 37 9242 38 971939 .800196 40 067441 1151 42 1629 43 210744 .802585 45 3063 46 3542 47 4021 48 4500 49 .804979 50 5458 51 5938 52 6418 53 6898 54 .807379 55 7859 56 8340 57 882158 9302 59 .809784 60 500 1 0.629320 9546 9772 9998 4.630224 5.630450 0676 0902 1127 1353 0-23+ DO7OO 0-234 FOTOσ 6 8 9 10.631578 16 If 1804 Corr. 2029 10 38 12 13 2255 15 56 2480 20 75 14 17 18 19 15.632705 30 113 2931 40 150 3156 45 169 3381 50 188 3606 22 20.633831 21 COA DONO 07~07 ❤❤♪❤ 22 23 24 26 25.634955 27 28 29 31 30.636078 33 6303 32 6527 34 36 37 38 SINE 35.637200 441 42 43 44 46 47 49 39 8096 4056 4281 4506 4730 OKOM KANOO O 51 5180 5405 5629 5854 40.638320 11 8544 Corr. 8768 10 37 899215 56 9215 20 75 45.639439 30 112 9663 40 149 9886 45 168 48.6401 10 50 186 0333 52 53 54 50.640557 6751 6976 56 57 58 59 7424 7648 7872 0780 1003 55.641673 1226 1450 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 1896 2119 2342 2565 60.642788 COSINE 777146 6963 6780 6596 6413 773472 3287 3103 2918 2734 .772549 2364 2179 1994 1810 .776230 6046 5863 5679 n 5496 .775312 5128 Corr. 4944 10 31 4761|15 46 4577 20 61 |.774393 30 92 4209 40 123 402445 138 3840 50 153 3656 771625 1440 1254 1069 0884 |.767911 7725 7538 — 7352 7165 CORR. FOR SEC. 770699 0513 0328 #1 0142 .769957 .769771 9585 Corr. 9400 TO 31 9214 15 46 9028 20 62 768842 30 93 8656 40 124 8470 45 139 8284 50 155 8097 .766978 6792 6605 6418 6231 1.766044 + 39° VERSINE .222854 3037 3220 3404 3587 3954 4137 4321 4504 .223770.288278 30 152 8583 40 203 8888 45 229 9192 50 254 9498 6713 6897 7082 7266 .224688 .289803 4872 .290109 5056 0415 5239 0721 " Corr. 51 6160 5423 1028 .225607 .291335 5791 1642 5976 1949 10 225615 77 2564 20 103 .226528.292872 30 154 3181 40 205 3489 45 231 3798 50 256 4107 6344 .227451.294416 7636 7821 8006 8190 8560 8746 8931 9116 EXSEC 11 .286760 7063 Corr. 7366 10 51 7670 15 76 7974 20 102 .228375.295967 30 155 6278 40 207 6589 45 233 6900 50 259 7212 .229301.297524 9487 9672 7836 8149 9858 8461 .230043 8774 1344 1530 1716 1903 CORR. FOR SEC. + 4726 " Corr. 503610 52 534615 78 5656 20 104 2648 2835 .232089.302234 2275 2462 3208 3395 3582 3769 .233956 11 2550 2867 TO "Corr. 53 3183 15 79 3500 20 106 .233022.303818 30 159 4135 40 211 4453 45 238 4771 50 264 5089 305407 CORR. FOR SEC. + TANGENT 11 809784 Corr..810266 10 80 0748 15 121 20 161 30 242 40 322 45 362 150 403 " Corr. 10 81 15 121 20 162 "Corr. 10 81 15 122 20 163 30 244 40 326 45 367 50 407 1230 1712 " Corr. 10 82 15 124 120 165 .812195 2678 3161 30 247 40 330 45 371 150 412 0-23 DO700 0-232 24 .230229.299088 0415 0600 .829234 40 9401 Corr. Corr. 9725 41 9715 10 52 10 82.830216 42 0786 .300029 15 78 15 123 0972 0343 20 105 120 164 .231158.300658 30 157 30 246 40 328 45 369 50 410 0708 43 199 44 0972 40 209 1288 45 235 1603 50 262 1918 5 6 3644 8 4128 30 243 819462 20 40 324 9949 21 45 364.820435|22 50 405 0922 23 1409 24 .821896 25 2384 26 2872 27 3360 28 3848 29 9 .814612 10 5096 11 5580 12 6065 13 654914 .817034 15 7520 16 8005 17 8490 18 8976 19 824336 30 482531 5314 32 5803 33 6292 34 .826782 35 7272 36 7762 37 8252 38 8743 39 .831691 45 2183 46 2676 47 3169 48 3662 49 .834155 50 4648 51 5142 52 563653 6130 54 836624 55 7119 56 7614 57 8109 58 8604 59 .839100 60 501 01234 567 8 9 5.643901 01234 56 10.645013 || 12 13 14 16 11 5236 Corr. 5458 10 37 5680 15 55 5902 20 74 15.646124 30 111 6346 40 148 6568 45 166 6790 50 185 7012 17 18 19 22222 2070 8~~♡~ 21 20.647233 7455 7677 23 24 26 28 29 25.648341 8563 8784 9006 9227 31 32 34 30.649448 9669 9890 33.650111 0332 36 37 38 39 SINE 642788 3010 3233 3456 3678 5555 35.650553 0774 0995 1216 1437 42 4124 4346 4568 4791 43 44 46 47 48 49 40.651657 1878 Corr. 2098 10 37 2319 15 55 2539 20 73 45.652760 30 110 2980 40 147 3200 45 165 3421 50 184 3641 JAKZ HONO8 8 7898 8120 51 52 53 54 50.653861 56 57 58 59 4081 4301 4521 4741 55.654961 VERSINES, EXSECANTS, AND TANGENTS 40° 5180 5400 5620 5840 CORR. FOR SEC. + 60.656059 COSINE .766044 5857 5670 5483 5296 .765109 4921 4734 4546 4359 762292 2104 1915 1727 1538 .764171 3984 " Corr. 3796 10 31 47 3608 15 3420 20 63 .763232 30 94 3044 40 125 2856 45 141 2668 50 157 2480 .761350 1161 0972 0784 0595 .760406 0217 0028 .759839 9650 CORR. FOR SEC. + .759461 9271 9082 8893 11 8703 .758514 8384 Corr. 8134 TO 32 7945 15 47 7755 20 63 .756615 6425 6234 6044 5854 .757565 30 95 7375 40 127 718545 142 6995 50 158 6805 .755663 5472 5282 5091 4900 .754710 VERSINE EXSEC л .233956 ||.305407 5726 Corr. Corr. 6045 10 5310 83 6364 15 80 15 124 6684 20 107 20 166 4143 4330 4517 4704 5079 5266 5454 5641 .235829.308607 6016 6204 6392 6580 .234891.307004 30 160 30 249 7324 40 21440 332 7644 45 240 45 373 7965 50 267 ||50 414 8286 236768|| .310217| 6956 7144 7332 7520 7896 8085 8273 8462 .238650.313457 8839 9028 9216 9405 9783 9972 .240161 0350 8928 9250 9572 9894 2055 2245 .237708.311833 30 162 30 250 2158 40 216 40 333 2482 45 24345 375 2807 50 270 ||50 417 3132 .240539.316724 0729 0918 1107 1297 2625 2815 3005 3195 11 0540 Corr. Corr. 0863 10 54 54 10 83 1186 15 81 15 125 1510 20 108 ||20 167 .241486.318368 1676 1866 CORR. FOR SEC. + .239594.315087 30 163 30 262 5414 40 218 40 335 5741 45 245 45 377 6068 50 272 50 419 6396 4528 4718 - 7052 7381 7710 8039 4909 5100 11 K πI 11 3782 Corr. Corr. 4108 10 54 TO TO 84 4434 15 82 15 126 4760 20 109 ||20 168 .242435.320019 30 165 0350 40 220 0681 45 248 1013 50 275 1344 CORR. FOR SEC. + π 11 8698 Corr. 9027 TO 55 9358 15 83 9688 20 110 245290.325013 .244337.32334130 167 3675 40 222 400945 250 4344 50 278 4678 .243385.321676 11 " Corr. 3575 2009 Corr. 3766 2342 10 5610 85 2674 15 83 3008 20 || 3956 4146 n Corr. TO 15 127 20 169 30 253 40 337 45 380 50 422 TANGENT 0 I .839100 9596 .840092 0588 3 2 1084 4 15 127 20 170 1 5 .841581 2078 6 2576 7 3073 8 3571 9 .844069 10 4567 11 5066 12 5564 13 6063 14 .846562 15 7062 16 7562 17 8062 18 8562 19 849062 20 9563 21 .850064 22 0565 23 1067 24 · .851568 25 2070 26 2573 27 3075 28 3578 29 859124 40 9630 41 84.860136| 42 0642 43 1148 44 .854081 30 4584 31 5087 32 5591 33 6095 34 .856599 35 7104 38 7608 37 8113 38 8618 39 .861655 45 2162 46 2669 47 3177 48 3685 49 .864193 50 470151 5209 52 5718 53 6227 54 30 255.866736 55 40 339 7246 56 45 382 7756 57 50 424 8266 58 2776 59 .869287 60 502 0.656059 OI234 BONBO 6 7 5.657156 8 9 || 12 234 10.658252 13 14 16 17 19 8471 " Corr. 8690 10 36 8908 15 55 9127 20 73 15.659346 30 109 9564 40 146 9783 45 164 18.660002 50 182 0220 PURE 700 80000 888 21 22 23 24 20.660439 0657 0875 1094 1312 26 27 28 29 25.661530 1748 1966 2184 2402 31 32 33 34 30.662620 2838 3056 3273 3491 36 37 38 39 5555 EDI 41 42 43 44 SINE 35.663709 3926 4144 4361 4578 46 47 48 49 6278 6498 6717 6937 40.664796 5013 " Corr. 523010 36 5448 15 54 5665 20 72 45.665882 30 108 6099 40 145 631645 163 6532 50 181 6749 51 52 53 7375 7594 7814 8033 GOVOG EN 50.666966 54 56 57 58 59 55.668049 7183 7399 7616 7833 8266 8482 8698 8914 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.669131 COSINE .754710 4519 4328 4137 3946 750880 0688 0496 0303 0111 .753755 3563 3372 3181 11 2989 .752798 2606 Corr. 2415 10 32 2223 15 48 2032 20 64 .751840 30 96 1648 40 128 145645 144 1264 50 160 1072 .749919 9726 9534 9341 9148 .748956 8763 8570 8377 8184 .747991 7798 7605 7412 7218 .745088 4894 4700 4506 4312 CORR. FOR SEC. #1 747025 6832 Corr. 6638 IC 32 644515 48 6251 20 65 .74605730 97 5864 40 129 5670 45 145 5476 50 161 5282 .744117 3923 3728 + 3534 3339 .743145 41° VERSINE 245290.325013 5481 5672 5863 6054 6437 6628 6819 7011 "I 11 5348 Corr. Corr. 5684 10 56 TO 85 601915 84 15 128 6355 20 112 20 171 .246245.326692 30 168 30 256 7028 40 225 40 342 7365 45 25345 384 7702 50 281 50 427 8040 .247202.328378 7394 7585 EXSEC 9312 9504 9697 9889 .250081.333478 0274 0466 0659 0852 1237 1430 8716 9054 1623 1816 .251044.335192 30 172 5536 40 229 5880 45 258 6225 50 286 6569 7777 9392 7968 9731 .248160.330071 " 8352 0410 Corr. " Corr. 8544 0750 10 5710 86 8736 1090 15 85 15 129 8928 1430 20 113 20 172 .249120.331771 30 170 30 258.879553 20 2112 40 227 40 343 .880069 21 2453 45 255 45 387 2794 50 284 50 429 3136 0585 22 1102 23 1619 24 .252009.336914 2202 2395 2588 2782 CORR. FOR SEC. + #1 3820 Corr. "Corr. 4163 10 5710 86 4506 15 86 15 130 4849 20 115 20 173 30 259 40 346 45 389 50 432 .255883 6077 6272 6466 6661 .256855 7259 7605 7951 8297 .252975.338643 3168 3362 3555 8990 "Corr. 9337 10 58 9684 15 87 3749.340032 20 116 .253943.340380 30 174 4136 4330 0728 40 232 1076 45 260 1425 50 289 1774 4524 4718 .254912.342123 5106 5300 5494 5688 CORR. FOR SEC. + 2473 Corr. 2823 10 58 3173 15 88 3523 20 117 343874 30 175 4225 40 234 4577 45 263 4928 50 292 5280 345633 30 261 40 348 45 391 50 435 TANGENT 1 .869287 0 9798 .870309 0820 1332 .871844 2356 6 5 2868 7 3381 8 3894 9 TO 10 " Corr. 87 15 131 20 175 0-23 ♬ 30 263 40 350 45 394 50 438 44 .874407 10 4920 1 5434 12 5948 13 646214 .876976 15 7491 16 8006 17 8522 18 9037 19 .882136 25 2653 26 3171 27 3689 28 4207 29 .884725 30 8882 38 9403 39 1J .889924 40 Corr..890446| 41 10 87 15 130 20 174 0968 42 1489 43 201244 .892534 45 3057 46 3580 47 410348 4627 49 524431 5763 32 6282 33 6802 34 .887322 35 7842 36 8362 37 .895151 50 5675 51 6199 52 6724 53 7249 54 .897774 55 8299 56 8825 57 935 58 9878 59 .90040460 503 0.669131 01234 5O7∞a 6 8 5.670211 9 OI23A BONBO || 10.671290 12 13 14 16 17 11 1505 Corr. 1721 10 36 1936 15 54 2152 20 72 15.672367 30 108 2582 40 144 2797 45 161 3012 50 179 3228 18 19 22222 222≈≈ 67~87 68788 2=22E CON UNAZ KONDA O 21 23 20.673443 3658 3873 4088 4302 32 33 34 SINE 25.674517 4732 27 4947 26 5161 5376 36 30.675590 5805 6019 6233 6448 9347 9563 41 9779 9995 35.676662 6876 7090 7304 7518 42 43 44 0427 0642 0858 1074 40.677732 46 47 48 49 56 57 45.678801 30 107 901440 142 9228 45 160 944150 178 9655 59 50.679868 51.680081 55.680934 1147 1360 1573 1786 n 7946 Corr. 8160 10 36 8373 15 53 8587 20 71 VERSINES, EXSECANTS, AND TANGENTS 42° 0295 0508 0721 CORR. FOR SEC. + 60.681998 COSINE .743145 2950 2755 2561 2366 .742171 1976 1781 I 586 1390 .739239 9044 8848 8652 8455 .738259 8063 7867 7670 7474 .737277 7081 6884 6688 6491 .741195 "Corr. 1000 0805 10 33 060915 49 0414 20 65 .740218 30 98 0022 40 130 .739827 45 147.260173 9631 50 163 9435 CORR. FOR SEC. .736294 6097 5900 5703 11 5506 .735309 5112 Corr. 4915 10 33 4717 15 49 4520 20 66 .734322 30 .733334 3137 2939 2741 2543 4125 40 132 3928 45 148 3730 50 165 3532 .732345 2147 1949 1750 1552 .731354 VERSINE .256855.345633 7050 7245 7439 7634 11 11 8024 8219 5985 Corr. Corr. 6338 10 59 TO 88 669115 89 15 132 7045 20 118 20 176 .257829.347399 30 177 7753 40 236 8107 45 266 8414 8462 50 295 8610 8817 .258805.349172 9000 9528 Corr. 9195 9884 10 59 9391.35024015 89 9586 0596 20 119 .259782.350953 30 179 9978 131040 238 1668 45 268 0369 2025 50 298 0565 2383 1] " 1348 1545 EXSEC .260761.352742 1152 0956 3100 " Corr. 3459 10 60 3818 15 90 417820 120 .261741.354538 30 180 4898 40 240 5258 45 270 561950 300 5980 1937 2133 2330 2526 .262723.356342 4297 4494 5875 6072 6270 6468 CORR. FOR SEC. + 99.265678 ||.36180030 183 2166 40 244 11 .266666.363634 6863 7061 7259 7457 = 7853 8051 8250 8448 .268646.367328 4002 Corr. 4370 10 62 4739 15 92 5108 20 123 CORR. FOR SEC. + 30 264 40 352 45 396 50 440 .264691.359972 11 4888.360337 Corr. Corr. 5085 070210 61 10 90 то 5283 1068 15 92 15 135 5480 143320 122 20 180 .267655.365477 30 185 5846 40 246 6216 45 277 6586 50 308 6957 11 Corr. TO 88 15 133 20 177 Corr. 10 89 15 133 20 178 30 267 40 356 45 400 50 445 - 11 11 3116 10 2919 6703 Corr 7065 10 61 7428 15 91 7790 20 121 3312 15 134 3509 20 179 .263706.358153 30 182 30 268.91901035 9547 36 3903 8516 40 24240 358 4100 8880 45 272 45 403.920084 37 9244 50 30350 447 062138 9608 1159 39 .92169740 223541 2773 42 3312 43 385144 2532 45 275 45 405 289950 305 ||50 450 3267 Corr. 89 TANGENT .900404 0931 1458 1985 2513 30 266.908336 15 40 354 8867 16 45 398 9398 17 50 443 9930 18 .910462 19 .903041 1 "Corr. 10 90 15 136 20 181 01234 5678✪ 3569 4098 4627 8 5156 9 .90568510 6215 11 6745 12 7275 13 780514 .910994 20 1526 21 2059 22 2592 23 312624 .913659 25 4193 26 4727 27 5262 28 5796 29 .916331 30 6866 31 7402 32 7938 33 8474 34 30 270.924390 45 40 360 493046 5470 47 601048 6551 49 .927091 50 7632 51 8174 52 8715 53 9257 54 30 271.929800 55 40 362 .930342 56 45 407 0885 57 50 452 1428 58 1971 59 .93251560 504 0.681998 2211 2424 2636 I 234 5E7BG 0-234 FOTO α 6 9 Il 12 10.684123 13 14 16 17 18 19 22222 22 0123➡ 21 15.685183 30 106 539540 141 56C7 45 159 5818 50 176 6030 22 20.686242 23 24 26 27 28 29 25.687299 + E55±5 wwwww wwwwg 6666 1650 55555 55 31 32 33 34 36 30.688355 8566 8776 8987 9198 37 39 SINE 41 42 2849 35.689409 9620 9830 38.690041 0251 43 44 .683061 3274 3486 3698 3911 52 40.690462 53 54 4335 Corr. 4547 10 35 4759 15 53 497 20 71 6453 6665 6876 7088 56 57 7510 7721 58 7932 8144 50.692563 2773 2982 3192 3402 - 45.69151330 105 1723 40 140 1933 45 158 2143 50 175 2353 55.693611 3821 4030 4240 4449 60.694658 TI TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + Corr. 11 0672 0882 TO 35 1093 15 53 1303 20 70 COSINE .731354 1155 0957 0758 0560 .730361 0162 .729964 9765 9566 .729367 11 9168 Corr. 8969 10 33 8770 15 50 8570 20 66 .728371 30 100 8172 40 133 7972 45 150 7773 50 166 7573 .727374 7174 6974 6774 6575 .726375 6175 5975 5775 5575 725374 5174 4974 4773 4573 724372 4172 3971 3770 3570 CORR. FOR SEC. 723369 3168 " Corr. 2967 10 34 2766 15 50 2565 20 67 .722364 30 101 2163 40 134 1962 45 151 1760 50 168 1559 .721357 I 156 0954 0753 0551 .720349 0148 .719946 9744 9542 .719340 43° VERSINE .268646.367328 8845 9043 9242 9440 1828 2028 2227 2427 EXSEC " 11 Corr. 10 91 7698 Corr. 8070 10 62 8442 15 93 15 136 8814 20 124 ||20 182 .269639.369186 30 186 30 273 9838 40 364 .270036 9559 40 248 9932 45 280 0235.370305 50 311 45 409 50 454 0434 0678 .270633.371052 0832 1031 1230 1430 .271629.372927 30 188 30 274 40 366 45 411 50 457 .272626.374809 2826 3026 3825 4025 4225 4425 1427 " Corr " Corr. 1801 10 63 10 91 2176 15 94 15 137 255 20 125 ||20 183 5187 " Corr. 5564 1063 5943 15 95 3425 6321 20 126 3226 CORR. FOR SEC. + 3303 40 250 3679 45 282 4055 50 313 4432 .273625.376700 30 190 7079 40 253 7458 45 284 7838 50 316 8218 5828 6029 6230 6430 274626.378598 4226 5026 5227 8240 8441 CORR. FOR SEC. + .276631.382420 6832 7033 7234 7435 .278643.386275 8844 9046 9247 9449 " Corr. TO 92 15 138 20 184 30 276 40 368 45 414 50 459 TANGENT .932515 3059 3603 40 372 45 418 50 465 20 187 6663 TI Corr. Corr. 7050 10 65 10 9.3 7438 15 97 15 140 7827 20 130 .279651.388215 30 194 9852 8604 40 259 280054 0256 8994 45 292 45 421 938350 32450 467 0458 9773 .280660.390164 4148 4693 .935238 5783 0 • .948965 30 8979 " Corr " Corr. 9518 31 9360 10 64 10 92 950071 32 9742 15 96 15 139 0624 33 5427.3801231 20 127 20 185 1178 34 .275628.380505 30 191 30 277.951733 35 0888 40 255 40 370 2287 36 127045 287 45 416 1653 50 31950 462 2037 2842 37 3397 38 3953 39 .954508 40 1234 5 6 6329 7 6875 8 7422 9 .937968 10 8515 11 9062 12 9610 13 .940158 14 .940706 15 1254 16 1803 17 2352 18 2902 19 !! 2804 Corr. "Corr. 3189 10 64 10 93 3573 15 9615 139 3958 20 129 20 186 .277636.384344 30 19330 279.95729245 7837 7849 46 840747 8966 48 9524 49 8038 4729 40 257 5115 45 289 5502 50 321 5888 .943451| 20 4001 21 4552 22 5102 23 5653 24 .946204 25 6756 26 7307 27 7860 28 8412 29 506441 5621 42 6177 43 6734 44 .960083 50 0642 51 1202 52 1761 53 2322 54 30 280.962882 55 40 374 3443 56 4004 57 4565 58 5127 59 965689 60 505 1 0.694658 4868 5077 5286 5495 1 234 5.695704 5913 6122 6330 6539 6 7 8 9 I~~~~ ~ 11 12 13 14 10.696748 6956 Corr. 7165 1055 35 7374 15 52 7582 20 69 15.697790 30 104 16 799940 139 17 8207 45 156 8415 50 174 8623 18 19 20.698832 21 9040 22 9248 9456 9663 25.699871 26.700079 23 24 27 28 29 ≈≈ 8.~m~ 68M08 200 31 30.700909 ||17 1324 1531 1739 32 33 34 35.701946 36 2153 37 2360 38 2567 39 2774 46 47 SINE 48 49 ggg8 ཀྱ8g 40.702981 41 42 43 3601 15 444 3188 "Corr. 3395 10 34 52 3808 20 69 45.704015 30 103 4221 40 138 4428 45 155 4634 50 172 4841 50.705047 5253 5459 51 52 53 54 0287 0494 0702 56 57 58 55.706078 6284 6489 6695 6901 60.707107 59 5666 5872 VERSINES, EXSECANTS, AND TANGENTS 44° ST CORR. FOR SEC. + COSINE 719340 9138 8936 8733 8531 .718329 8126 7924 7721 7519 .717316 " Corr. 7113 691110 34 6708 15 51 6505 20 68 |.716302 30 101 6099 40 135 5896 45 152 .715286 5083 4880 5693 50 169 5490 4676 4473 .714269 4066 3862 3658 3454 .713250 3046 2843 2638 2434 .712230 2026 1822 1617 1413 CORR. FOR SEC. + .70916! 8956 8750 8545 8340 " Corr. .711209 1004 0800 10 34 059515 51 0390 20 68 .710185 30 102 .709981 40 137 9776 45 154 9571 50 171 9366 .708134 7929 7724 7518 7312 707107 VERSINE " 280660 .390164 0862 0554 Corr. 0945 10 65 1337 15 98 1728 20 131 1064 1267 1469 1874 2076 2279 2481 .281671.392120 30 196 2513 40 262 2905 45 294 3298 50 327 3692 .282684.394086 2887 3089 3292 3495 3901 4104 4307 4510 EXSEC .283698.396059 30 198 6455 40 264 685145 297 7248 50 329 7644 .284714.398042 4917 5/20 5324 5527 5934 6138 6342 6546 8439 " Corr. 8837 10 67 9235 15 100 9634 20 133 .285731.400032 30 200 0432 40 266 0831 45 299 123150 333 1632 11 4480 Corr. 4874 10 66 5269 15 99 5664 20 132 .286750.402032 6954 7157 7362 7566 .289815 .290019 0224 0429 0634 CORR. FOR SEC. + .287770 7974 8178 8383 8587 5653 .290839 1044 1250 1455 1660 .291866 2071 2276 2482 2688 .292893 .288791.406057 8996 9200 9405 9610 #1 2433 Corr. 2834 10 67 3236 15 101 3638 20 134 404040 30 201 4443 40 268 4846 45 302 5249 50 336 6462 " Corr. 6866 10 68 7272 15 102 7677 20 135 .408083 30 203 8489 40 271 8896 45 305 9303 50 338 9710 410118 0526 " Corr. 0934 10 68 1343 15 102 1752 20 137 412161 30 205 2571 40 273 2981 45 307 3392 50 341 3802 414214 CORR. FOR SEC. + " Corr. 10 94 15 141 20 188 30 282 40 376 45 423 50 470 11 Corr. 10 94 15 142 20 189 130 284 40 378 45 425 50 473 " Corr. 10 95 15 143 20 190 11 Corr. 10 96 15 143 20 191 TANGENT 1 965689 6251 6814 7377 7940 11 Corr. 10 96 15 144 20 192 968504 " Corr. 10 97 15 145 20 193 0-234 56789 9067 6 9632 .970196 0761 30 285.979842 25 40 380 .980413 26 45 428 098327 50 475 1554 28 2126 29 .971326 10 1892 11 2458 12 302413 3590 14 .974157 15 4724 16 5291 17 5859 18 6427 19 .976996 20 756421 8133 22 8703 23 9272 24 30 287.985560 | 35 40 382 613436 45 430 6708 37 50 478 7282 38 7857 39 .982697 30 3269 31 3842 32 4414 33 4987 34 .988432 40 9007 41 9582 42 .990158 43 0735 44 30 288.99131145 40 385 45 433 50 481 188846 2465 47 3043 48 3621 49 .994199 | 50 4778 51 5357 52 5936 53 6515 54 30 290.997095 55 40 387 45 435 50 484 7676 56 8256 57 883758 9418 59 1.00000 60 506 0.707107 0-23➡ 56780 0-2MI 5O789 5.708134 9 || 10.709161 12 13 14 11 9366 Corr. 9571 10 34 9776 15 51 9981 20 68 15.710185 30 102 0390 40 137 0595 45 154 0800 50 171 1004 16 17 18 19 ~~~~~ 22~°2 2~~~~ 21 20.711209 234 22 23 24 26 27 28 29 25.712230 2434 2638 2843 3046 31 32 33 34 30.713250 3454 3658 3862 4066 36 37 8 66000 gggg 55555 £5555 www. 38 35.714269 4473 4676 4880 5083 39 41 42 43 SINE 40.715286 46 7312 7518 7724 7929 47 48 49 8340 8545 8750 8956 51 52 45.716302 30 101 6505 40 135 6708 45 152 6911 50 169 7113 53 54 1413 1617 1822 2026 50.717316 75191 7721 7924 8126 56 57 58 59 55.718329 8531 8733 8936 9138 60.719340 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + " 5490 Corr. 5693 10 34 5896 15 51 6099 20 68 COSINE .707107 6901 6695 6489 6284 .706078 5872 5666 5459 5253 .702981 2774 2567 2360 2153 .705047 4841 " Corr. 4634 10 34 4428 15 52 422 20 69 704015 30 103 3808 40 138 360145 155 3395 50 172 3188 701946 1739 1531 1324 1117 .700909 0702 0494 0287 0079 .696748 6539 6330 CORR. FOR SEC. .699871 9663 9456 9248 9040 .698832 " Corr. 8623 8415 1035 8207 15 52 7999 20 69 697790 30 104 7582 40 139 7374 45 156 7165 50 174 6956 6122 5913 + .695704 5495 5286 5077 4868 .694658 45° VERSINE .292893.414214 3099 3305 3511 3716 EXSEC " 4625 Corr. 5037 10 69 .293922.416275 30 207 6688 40 276 7102 45 310 7516 50 344 4128 4334 4541 4747 7931 5449 15 103 5862 20 138 8261 8469 8676 8883 .294953.418345 5366 5572 5159 8760 " Corr. 9176 TO 69 9592 15 104 5779.420008 20 139 .295985.420425 30 208 6192 0842 40 278 6399 1259 45 313 1677 50 347 2095 6605 6812 .297019.422513 7226 7433 7640 7847 CORR. FOR SEC. + .298054.424611 30 210 5032 40 280 5453 45 316 5874 50 351 6296 1: 2932 Corr. 3351 10 70 3771 15 105 4191 20 140 .299091.426718 9298 9506 9713 9921 3461 3670 3878 4087 #! 7141 Corr. 7564 10 71 7987 15 106 8410 20 141 .300129.428834 30 212 0337 9259 40 283 0544 9684 45 318 0752.430109 50 354 0960 0534 301168.430960 1377 1585 1793 2001 1386 Corr. #! 5669 Corr. 6100 10 72 6530 15 108 6962 20 144 .304296.437393 30 216 7825 40 288 4505 4714 4923 5132 .305342.439556 CORR. FOR SEC. + 8257 45 324 8690 50 360 9123 " Corr то то 15 15 20 20 = #1 1813 10 71 TO 10 2240 15 107 2667 20 143 .302210.433095 30 214 2418 3523 40 285 3952 45 321 45 45 2626 2835 4380 50 357 || 50 50 3044 4810 .303252.435239 30 40 45 50 " 29 39 44 49 20 242 8998 898 Corr. 15 15 20 30 40 30 40 TANGENT " I 1.00000 0 .00058 .00116 2 .00175 3 .00233 4 5 1.00291 .00350 6 .00408 7 .00467 8 .00525 9 1.00583 10 .00642 11 .00701 12 .00759 13 .00818 14 1.00876 15 .00935 16 .00994 17 .01053 18 .01112 19 1.01170 20 .01229 21 .01288 22 .01347 23 .01406 24 1.01465 25 .01524 26 .01583 27 .01642 28 .01702 29 1.01761 30 .01820 31 .01879 32 .01939 33 .01998 34 1.02057 35 .02117 36 .02176 37 .02236 38 .02295 39 1.02355 40 .02414 41 .02474 42 .02533 43 .02593 44 1.02653 45 .02713 46 .02772 47 .02832 48 .02892 49 1.02952 50 .03012 51 .03072 52 .03132 53 .0319254 1.03252 55 .03312 56 .03372 57 .03433 58 .0349359 1.0355360 507 0.719340 0-23A BONBO 6 4.720148 5.720349 0551 0753 0954 1156 8 9 10.721357 || K 12 I23# 13 1559 Corr. 1760 1034 1962 15 50 2163 20 67 15.722364 30 101 2565 40 134 2766 45 151 2967 50 168 3168 14 16: 5678σ 17 18 19 0-23A 20.723369 ~~~~~ ~~~~~ 8~~~7 21 22 23 24 26 27 28 29 25.724372 4573 4773 4974 5174 32 33 34 30.725374 5575 5775 5975 6175 36 37 38 SINE लवन ने ले ले ले 1234 39 9542 9744 9946 35.726375 6575 6774 41 42 43 44 3570 3770 40.727374 3971 4172 46 47 48 49 56 57 58 59 6974 7174 50.729367 51 9566 52 9765 53 9964 54.730162 55.730361 45.728371 30 100 8570 40 133 8770 45 50 8969 50 166 9168 VERSINES, EXSECANTS, AND TANGENTS 46° CORR. FOR SEC. + " ST 11 7573 Corr. 7773 10 33 797215 50 8172 20 66 0560 0758 0957 1155 60.731354 COSINE .694658 4449 4240 4030 3821 .69361! 3402 3192 2982 2773 11 " 692563 2353 Corr. 2143 10 35 193315 53 1723 20 70 691513 30 105 1303 40 140 1093 45 158 088250 175 0672 .690462 0251 0041 .689830 9620 .689409 9198 8987 8776 8566 1.688355 8144 7932 7721 7510 .687299 7088 6876 6665 6453 CORR. FOR SEC. Tr 1.686242 6030 Corr. 5818 10 35 5607 15 53 5395 20 71 .685183 30 106 497140 141 4759 45 159 4547 50 176 4335 .684123 3911 3698 3486 3274 .683061 2849 2636 2424 2211 1.681998 CORR. FOR VERSINE SEC. + " Corr. .305342 ||.439556 5551 9990 5760.4404251073 0859 15 109 1294 20 145 5970 6179 .306389.441730 30 218 2165 40 290 260145 327 3038 50 363 3475 6598 6808 7018 7227 .307437.443912 7647 7857 8067 8277 EXSEC #1 4350 Corr. 4788 10 73 522615 110 5665 20 147 446104 30 220 6544 40 293 8907 6984 45 330 9118 7424 50 366 9328 7865 .309538.448306 .308487 8697 11 8748 Corr. 9190 10 74 9632 15 111 0380.450075 20 148 9749 9959 .310170 .310591.450518 30 222 0802 0962 40 296 1013 1224 1406 45 333 1850 50 370 2295 1434 .311645.452740 1856 2068 2279 2490 2912 3124 3335 3547 .312701.454971 30 224 5419 40 298 5867 45 336 6315 50 373 3185 "Corr. 3631 10 75 4077 15 112 4524 20 149 5453 5665 .315877.461726 6089 6302 6514 6726 6764 .313758 .457213 3970 4182 1! 7662 Corr. Corr. 811210 75 10 10 8562 15 113 9013 20 150 .314817 ||.459464 30 226 5029 4393 4605 15 15 20 21 30 31 9916 40 301 140 41 5241.460368 45 339 45 46 0820 50 376 1273 50 52 It #! 2179 Corr. 2633 10 76 308815 114 3542 20 152 .316939.463997 30 228 445340 304 4909 45 342 5365 50 380 5822 7151 7364 7576 7789 .318002.466279 CORR. FOR SEC. + "Corr. ΤΟ TO 15 15 20 20 30 30 40 41 45 46 50 51 8558 Col TANGENT 1.03553 .03613 .03674 .03734 .03794 1.03855 .03915 1 0123 6 7 .03976 .04036 8 .04097 9 1.04158 10 .04218 11 .04279 12 .04340 13 .0440114 1.0446 15 .04522 16 .04583 17 .04644 18 .04705 19 1.04766 20 .04827 21 .04888 22 .04949 23 .050 10 24 1.05072 25 .05133 26 .05194 27 .05255 28 .05317 29 1.05378 30 .05439 31 .05501 32 .0556233 .05624 34 1.05685 35 .05747❘ 36 .05209 37 .05870 38 .05932 39 1.05994 40 .0605641 .0611742 .06179 43 .06241 44 1.0630345 .06365 | 46 .06427 47 .06489 48 .0655 49 1.06613 50 .06676 51 .06738 52 .06800 53 .06862 54 1.06925 55 .06987 56 .07049 57 .07112 58 .07174 59 1.07237 60 508 0.731354 01234 567BM OILMI BONEG 8 5.732345 9 12 13 10.733334 14 16 17 18 19 15.734322 30 22222 21 •234 5ØN 22 20.735309 23 24 8 88000 20000 55555 55±5 wwwww wwwww N N N N N 26 27 28 25.736294 36 37 38 39 41 30.737277 7474 7670 7867 8063 42 43 SINE 35.738259 8455 8652 8848 9044 46 1552 1750 1949 2147 47 48 49 2543 2741 2939 3137 51 52 40.739239 9435 "Corr. 96311033 9827 15 49 44.740022 20 65 53 54 11 3532 Corr. 3730 10 33 3928 15 49 4125 20 66 56 5506 5703 5900 6097 45.740218 30 98 041440 130 0609 45 147 0805 50 163 1000 57 4520 40 132 471745 148 491550 165 5112 50.741195 1390 1586 1781 1976 58 59 6491 6688 6884 708! 55.74217| 2366 256 I 2755 2950 CORR. FOR SEC. + TABLE XX.-NATURAL SINES, COSINES, 60.743145 COSINE .681998 1786 1573 1360 1147 99.67880130 107 8587 40 142 .680934 0721 0508 0295 11 0081 .679868 9655 Corr. 9441 10 36 9228 15 53 9014 20 71 .677732 7518 7304 7090 6876 8373 45 160 8160 50 178 7946 .676662 6448 6233 6019 5805 |.675590 5376 5161 4947 4732 .674517 4302 4088 3873 3658 .673443 CORR. FOR SEC. + "Corr 3228 301210 36 2797 15 54 2582 20 72 .672367 30 108 2152 40 144 .671290 1074 0858 0642 0427 193645 161 172150 179 1505 .670211 .669995 9779 9563 9347 .669131 47° VERSINE .318002.466279 8214 8427 8640 8853 9279 9492 9705 .319066.468571 30 230 9031 40 306 9491 45 345 995 50 383 0345 0559 0772 0986 9919.470412 320132.470874 EXSEC 1413 1627 1840 2054 11 6737 Corr. 7195 10 77 7653 15 115 8112 20 153 3552 3767 3981 4195 .322268.475510 2482 2696 2910 3124 11 1335 Corr. 1798 10 79 2260 15 116 2723 20 155 5698 5912 6127 6342 CORR. FOR SEC. + 323338.477843 30 234 831 40 312 40 .321199.473186 30 232 30 3650 40 309 4114 45 348 45 4579 50 386 5044 IT 5975 Corr. 6442 10 78 6908 15 117 7376 20 156 .324410.480187 4624 4839 5053 5268 7848 8064 8279 8495 8780 45 351 9248 50 390 9718 .325483.482542 30 236 301440 315 3487 45 354 3960 50 393 4433 15 0657 Corr. 1128 10 79 1599 15 118 2070 20 157 326557.484907 6772 6988 7203 7418 .327633.487283 30 238 CORR. FOR SEC. + .328710.489670 8926.490149 " Cor " Corr. off. 140 8990 #t Corr. 9142 0628 10 80 9358 1108 15 120 1588 20 160 9573 .329789.492068 30 240 330005 0221 2549 40 320 3030 45 361 3512 50 401 0437 0653 3994 .330869.494476 15 20 16 aa 21 7760 40 318 40 8237 45 357 45 8714 50 397 50 9192 445 #t JT 5382 Corr 5856 TO 79 10 6332 15 119 15 16 6807 20 159 20 21 227 321.08179 15 .08243 16 .08306 17 .08369 18 .08432 19 1.08496 20 .08559 21 .08622 22 .08686 23 .08749 24 42 50 53 47 Corr. π 30 32 32 5 45 53 43 TANGENT 1.07237 0 .07299 .07362 .07425 2 3 .07487 4 48 5 1.07550 .07613 6 .07676 7 .07738 .07801 9 8 1.07864 10 .07927 || .07990 12 .08053 13 .08116 14 1.08813 25 .08876 26 .08940 27 .09003 28 .09067 29 1.09131 30 .09195 31 .09258 32 .09322 33 .09386 34 1.09450 35 .09514 36 .09578 37 .09642 38 .09706 39 1.09770 40 .09834| 41 .0989942 .09963 43 .10027 44 1.1009145 .1015646 .1022047 .10285 48 . 10349 49 1.10414 50 .10478 51 .10543 52 .10608 53 .10672 54 1.10737 55 . 10802 56 .10867 57 .1093 58 .10996 59 1.11061 60 509 0.743145 3339 3534 3728 3923 I 234 5.744117 5678 ✪ 6 8 9 | 10.745088 234 12 13 14 DONDO ON22 20702 87~♡~ *❤~88 22 16 17 18 19 15.746057 30 6251 40 129 6445 45 145 6638 50 161 6832 21 20.747025 7218 7412 26 23 7605 24 7798 28 29 25.747991 8184 8377 8570 8763 31 32 30.748956 9148 9341 33 34 37 38 39 35.749919 36.75011| 441 42 SINE 43 4444 46 47 48 49 4312 4506 4700 4894 40.750880 9599 85887 BONGO 8 51 52 5282 " Corr. 5476 1032 5670 15 48 5864 20 65 53 54 56 50.752798 57 9534 9726 64 45.751840 30 96 2032 40 128 2223 45 144 2415 50 160 2606 58 59 0303 0496 0688 55.753755 VERSINES, EXSECANTS, AND TANGENTS 48° 2989 3181 3372 3563 CORR. FOR SEC. + 1072" Corr. 12641 10 32 1456 15 1648 20 3946 4137 4328 4519 60.754710 COSINE .669131 8914 8698 8482 8266 1.668049 7833 7616 7399 7183 97.665882 30 108 5665 40 145 5448 45 163 5230 50 181 5013 .666966 " Corr 6749 6532 10 36 6316 15 54 6099 20 72 .664796 4578 4361 4144 3926 .663709 3491 3273 3056 2838 .662620 2402 2184 1966 1748 .661530 1312 1094 0875 0657 .660439 0220 .658252 8033 7814 CORR. FOR SEC. 7594 7375 .657156 6937 6717 6498 6278 .656059 ม VERSINE 330869.494476 1086 1302 1518 1734 EXSEC .331951.496896 30 243 2167 2384 7381 40 323 7867 45 364 2601 8353 50 404 2817 8840 333034.499327 3251 It 9814 Corr. 3468.500302 10 82 3684 0790 15 122 3901 1279 20 163 8688 8906 9125 9343 .33956.514145 9780 9998 48.659783 15 55.340217 9564 20 73 Corr. 0002 10 36 .659346 30 109 9127 40 146 8908 45 164 8690 50 182 8471 " 4960 Corr. 5443 10 81 5927 15 121 641 20 162 .335204.504221 5422 5639 5856 6074 6509 6727 6944 7162 .334118.501768 30 245 4335 2258 40 326 2748 45 367 3239 50 408 | 50 3730 4552 45 4770 4987 .336291.506685 30 247 7179 40 329 7674 45 371 8169 50 412 8664 .337380.509160 7598 CORR. FOR SEC. + 4713 Corr. 5205 10 82 5698 15 124 6192 20 165 1310 1529 9657 " Corr. 7816.510154 TO 10 83 8034 0651 15 125 1149 20 166 .338470.511647 30 249 8252 2146 40 332 2645 45 374 3145 50 416 3645 2406 2625 n .341748.519176 1967 " Corr. 11 9682 Corr. 2186.520188 TO 85 0694 15 127 1201 20 169 3063 3283 3502 3722 .343941.524253 CORR. FOR SEC. + 4646 5148 10 10 84 5650 15 126 15 0436 6152 20 168 ||20 .340654.516655 30 252 0873 7158 40 336 7662 45 378 8166 50 419 8671 1092 .342844.521709 30 254 2217 40 339 2725 45 381 3234 50 423 3743 11 TO 15 20 Corr. "I 16 22 30 40 "Corr. IT 17 22 33 44 49 55 엉​태영 ​심히 ​30 33 40 45 45 50 50 56 TANGENT 1.11061 0 11126 1 .11191 2 · ? .11256 3 .11321 4 5 1.11387 .11452 6 .11517 7 .11582 8 .11648 9 1.11713 10 .11778 || .11844 12 .11909 13 .11975 14 1.1204115 .12106 16 .12172 17 . 12238 18 .12303 19 1.12369 20 .12435 21 .1250122 . 12567 23 .12633 24 1.12699 25 12765 26 ❤ . 12831 27 .12897 28 .12963 29 1.13029 30 .13096 31 .13162 32 . 13228 33 . 13295 34 1.13361 35 .13428-36 . 13494 37 .13561 38 .13627 39 1.1369440 . 13761 41 . 13828 42 .13894 43 .1396144 1.14028 45 .14095 46 .1416247 .14229 48 .14296 49 1.14363 50 .14430 51 .14498 52 .14565 53 .14632 54 1.1469955 .14767 56 14834 57 .14902 58 .14969 59 1. 15037 60 • 510 0.754710 4900 5091 -UMI BOZOK DIET CONDOM2 20702 87~~7 ❤❤♪❤. 234 2 3 4 6 5.755663 5854 6044 6234 6425 8 9 12 13 14 16 10.756615 6805 Corr. 6995 TO 32 718515 47 7375 20 63 17 18 19 15.757565 30 7755 40 127 7945 45 142 8134 50 158 8324 20.758514 21 8703 22 8893 23 24 26 25.75946 | 29 9650 9839 28.760028 0217 31 32 30.760406 33 34 36 37 38 35.761350 39 SINE 5282 5472 41 42 43 44 46 47 48 gགླ73་ྒུ གྲུཤྩསྒྱུ རྐྱོཆོ 40.762292 49 51 9082 9271 52 2480 " Corr. 2668 10 31 2856 15 47 3044 20 63 45.763232 30 94 3420 40 125 3608 45 141 3796 50 157 3984 53 54 50.764171 4359 4546 4734 4921 56 0595 0784 0972 1161 57 58 59 1538 1727 1915 2104 55.765109 5296 5483 5670 5857 60.766044 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + COSINE .656059 5840 5620 5400 5180 .654961 4741 4521 4301 4081 .653861 " Corr. 3641 3421 10 37 3200 15 55 2980 20 73 95.652760 30 110 2539 40 147 2319 45 165 2098 50 184 1878 .651657 1437 1216 0995 0774 .650553 0332 0111 .649890 9669 .649448 9227 9006 8784 8563 .648341 8120 7898 7677 7455 CORR. FOR SEC. 645013 4791 4568 4346 4124 + .647233 " Corr 7012 6790 10 37 656815 55 6346 20 74 .646124 30 111 5902 40 148 5680 45 166 5458 50 185 5236 .643901 3678 3456 3233 3010 642788 49° VERSINE .343941.524253 4160 4380 4600 4820 5259 5479 .345039.526809 30 256 7322 40 342 7835 45 384 8349 50 427 5919 8863 5699 6800 7020 EXSEC .346139.529377 4763 " Corr. 5274 10 85 9668 9889 .350110 0331 578515 128 6297 20 171 6359 9892 Corr. 6579.530408 1086 .348343.534549 8563 8784 9005 9226 .347240 ||.531957 30 259 7461 2475 40 345 2992 45 388 351 50 431 4030 7681 7902 8122 1216 1437 11 Corr. 10 π 092415 129 15 17 1440 20 172 20 23 1880 2102 2323 2545 CORR. FOR SEC. + 350552.539769 .349447.537153 30 261 7675 40 348 8198 45 392 8721 50 435 9245 11 6322 6544 5069 Corr. 5589 TO 87 6110 15 131 663 20 174 0773.540294 " Corr. 0994 0819 TO 88 " 11 .351659.542397 30 264 2924 40 351 3452 45 395 3980 50 439 4509 354987.550356 5209 5432 5654 5876 134415 132 1871 20 176 6767 6990 .357212.555724 .352767.545038 11 tt 2988 3210 5567 Corr. Corr. 6097 10 89 10 12 3432 662815 133 15 17 3654 7159 20 177 20 23 .353876.547691 30 266 8223 40 355 4320 8755 45 399 4542 9288 50 443 4764 9822 4098 #1 0890 Corr. 1425 10 89 196115 134 2497 20 179 .356099.553034 30 269 3571 40 358 4108 45 403 4646 50 448 5185 CORR. FOR SEC. + 30 34 40 46 45 50 30 40 45 50 51 57 35 46 52 58 TANGENT 1.15037 .15104 .15172 .15240 .15308 1.15375 .15443 .15511 .15579 .15647 01234 56789 4 1.1571510 .15783 .15851 12 .15919 13 .15987 14 1.1605615 .16124 16 . 16192 17 .16261 18 .16329 19 • 1.16398 20 .16466 21 .16535 22 . 16603 23 .16672 24 1.1674125 . 16809 26 .1687827 .16947 28 .17016 29 1.17085 30 .1715431 .17223 32 .17292 33 .17361 34 1.17430 35 .17500 36 .17569 37 .17638 38 .17708 39 1.17777 40 .17846 41 .17916 42 .17986 43 .18055 44 1.18125 45 .18194 46 .18264 47 .18334 48 .18404 49 1.18474 50 .18544 51 .18614 52 .1868453 .18754 54 1.18824 55 .18894 56 .1896457 .1903558 .19105 59 1.19175 60 511 0.766044 6231 6418 6605 6792 0-234 5.766978 66789 0-2M7 DO780 || 10.767911 12 13 141 16 17 18 19 15.768842 30 ~~~~~ 222 V37 21 23 24 20.769771 9957 22.770142 0328 0513 26 27 28 29 25 .770699 ommm2 6088 FIRE 29500 850MJ HONO 32 33 34 36 30.771625 1810 1994 2179 2364 37 38 39 SINE 41 35.772549 2734 2918 3103 3287 42 43 44 7165 7352 7538 7725 40.773472 46 47 48 49 8097 Corr. 8284 1031 8470 15 8656 20 62 51 52 53 54 0884 1069 1254 1440 45.774393 56 57 58 9028 40 124 921445 139 9400 50 155 9585 50.775312 5496 5679 5863 6046 11 VERSINES, EXSECANTS, AND TANGENTS 50° CORR. FOR SEC. + 55.776230 6413 6596 6780 6963 60.777146 11 3656 Corr. 3840 TO 31 4024 15 46 4209 20 61 30 4577 40 123 4761 45 138 4944 50 153 5128 COSINE .642788 2565 2342 2119 1896 .641673 1450 1226 1003 0780 .640557 46.63988615 0333 " Corr. 0110 TO 37 93.639439 30 112 921540 149 8992 45 168 8768 50 186 8544 56 9663 20 75 .638320 8096 7872 7648 7424 .637200 6976 6751 6527 6303 CORR. FOR SEC. .636078 5854 5629 5405 5180 .634955 4730 4506 4281 4056 +.357212.555724 7435 7658 " Corr. .633831 3606 3381 10 38 3156 15 56 293 20 75 92.632705 30 113 2480 40 150 2255 45 169 2029 50 188 1804 .631578 1353 1127 0902 0676 .630450 0224 .629998 9772 9546 .629320 VERSINE 11 6263 Corr. 6804 10 90 734415 136 7881 8104 7885 20 181 8550 8774 9220 .358327.558427 30 271 8969 40 361 9512 45 407 8997.560055 50 452 0598 EXSEC .359443.56|142 9667 9890 .360114 0337 .36056.563871 30 27430 0785 4418 40 365 4966 45 410 5514 50 456 6063 1008 1232 1456 .361680.566612 1904 2128 2352 2576 3473 3697 .362800.569366 30 276 3024 9919 40 368 3249.570472 45 414 1025 50 460 1579 CORR. FOR SEC. + .363922.572134 5270 5494 " 1687 Corr. 2232 TO 91 2778 15 137 15 3324 20 182 20 5719 5944 " 7162 Corr. 7712 10 92 8263 15 138 8814 20 184 " 4146 2689 Corr. 4371 3244 TO 93 4595 3800 15 139 4820 4357 20 186 365045.574914 30 279 5472 40 372 6030 45 418 6589 50 465 7148 7520 7745 7971 8196 .366169.577708 11 6394 8268 Corr. 6619 8829 10 94 6844 9390 15 141 7069 9952 20 188 .367295.580515 30 281 1078 40 375 1641 45 422 2205 50 469 2770 .368422.583335 11 8647 3900 Corr. 8873 4467 10 95 9098 5033 15 142 9324 5601 20 189 .369550.586168 30 284 6737 40 379 7306 45 426 7875 50 474 8445 9776 .370002 0228 0454 370680.589016 CORR. FOR SEC. + 11 Corr. 10 12 18 24 40 45 50 = 36 47 53 59 Corr. TO 12 15 18 20 24 30 36 40 48 45 55 50 61 TANGENT 1.19175 .19246 .19316 .19387 .19457 1 01234 1.19528 6 .19599 .19669 7 .19740 .19811 5878 O I 1.19882 10 .19953 1 .20024 12 .20095 13 .20166 14 1.20237 15 .20308 16 .20379 17 .2045 18 .20522 19 1.20593 20 .20665 21 .20736 22 .20808 23 .20879 24 1.20951 25 .21023 26 .21094 27 .21166 28 .21238 29 1.21310 30 .21382 31 .21454 32 .21526 33 .21598 34 1.21670 35 .21742 38 .21814 37 .21886 38 .21959 39 1.2203140 .22104 41 .22176 42 .22249 43 .2232141 1.22394 45 .22467 46 .2253947 .2261248 .22685 49 1.22758 50 .2283 51 .2290452 .22977 53 .23050 54 1.23123 55 .23196 56 .23270 57 .23343 58 .23416 59 1.23490 60 512 0.777146 7329 7512 7695 7878 0-234 BOZBO 5.778060 6 8 || 12 13 14 10.778973 234 17 18 19 22222 21 15.779884 30 91 16.780066 40 121 0248 45 137 043050 152 0612 20.780794 0976 1157 1339 1520 23 22 20700 Am❤❤7 ❤❤MMA DERE DE 24 26 28 29 25.781702 1883 2065 2246 2427 31 32 30.782608 2789 2970 3151 3332 33 34 36 37 38 39 35.783513 3694 3874 4055 4235 SINE 41 42 43 44 40.784416 8243 8426 8608 8791 46 47 48 49 g g⌘7 ཀྱྰཀྨng 51 JI 9156 Corr. 9338 10 30 9520 15 46 9702 20 61 45.785317 30 52 53 54 50.786216 6396 6576 6756 6935 56 57 58 59 CORR. FOR SEC. + 55.787114 7294 7473 7652 7832 TABLE XX.-NATURAL SINES, COSINES, 5497 40 120 5677 45 135 5857 50 150 6037 60.788011 COSINE .629320 9094 8868 8642 8416 .628189 7963 7737 7510 7284 .624788 456|| 4334 4107 3880 11 .627057 6830 Corr. 6604 10 38 6377 15 57 615020 76 .625924 30 113 5697 40 151 5470 45 170 5243 50 189 5016 .623652 3425 3197 2970 2742 .622515 2287 2059 1831 1604 .621376 1148 0920 0692 0464 4596 " Corr. " Corr. 4776 1030.619779 10 4957 15 45 955115 57 5137 20 60 9322 20 76 .620236 0007 C CORR. FOR SEC. .617951 7722 7494 7265 7036 + .616807 6578 6349 6120 5891 .615662 51° VERSINE .370680.589016 0906 1358 1584 9587 " Corr. 1132.590158 10 96 0731 15 143 1303 20 191 2037 2263 2490 2716 .371811.591877 30 287 2450 40 382 3025 45 430 3600 50 478 4175 EXSEC .375212.600542 5439 5666 5893 6120 .372943.594751 st 3170 3396 3623 19 20 25 5328 Corr. " Corr. 5905 TO 97 10 12 648215 145 15 3850 7061 20 193 .374076.597639 30 290 4303 8219 40 386 8799 45 434 9379 50 483 9960 4530 4757 4984 6575 6803 7030 7258 8169 8396 .376348.603458 30 292 4043 40 390 4628 45 439 5214 50 487 5801 .377485.606388 7713 7941 9308 9536 CORR. FOR SEC. + 1124 1706 TO 2290 15 146 2873 20 195 1592 1820 " Corr. 97 .378624.609332 30 295 8852 9923 40 394 9080.610514 45 443 1106 50 492 1698 .379764.612291 6976 " Corr. 7564 10 98 8153 15 148 8742 20 197 9993 38.380221 0449 0678 90.619094 30 114.380906.615264 30 298 8866 40 152 5860 40 397 1134 1363 8637 45 171 8408 50 190 6457 45 447 705450 497 7652 8180 .382049.618251 #1 2278 8850 Corr. 2506 9450 TO 100 2735.620050 15 151 2964 065 20 201 3422 3651 3880 4109 3665 .384338.624269 .383193.621253 30 301 1855 40 401 2458 45 452 30650 502 #1 Corr. 2884 Corr. 3478 10 99 10 13 4073 15 149 15 19 4668 20 199 ||20 25 CORR. FOR SEC. + 30 40 O 45 50 = #1 37 50 56 62 30 38 40 51 45 57 50 63 TANGENT T 1.23490 0 .23563 .23637 2 .23710 3 .23784 4 1.23858 5 .2393 .24005 7 6 .24079 8 .24153 9 1.24227 10 .2430|||| .24375 12 .24449 13 .24523 14 1.24597 15 .24672 16 .24746 17 .24820 18 .24895 19 1.24969 20 .25044 21 .25118 22 .25193 23 .25268 24 1.25343 25 .25417 26 .25492 27 .25567 28 .25642 29 1.2571730 .25792 31 .25867 32 .2594333 .2601834 1.26093 35 .26169 36 .26244 37 .26320 38 .26395 39 1.26471 40 .26546 41 .26622 42 .2669843 .26774 44 1.26849 45 .2692546 .27001 47 .27077 48 .27153 49 1.27230 50 .27306 51 .2738252 .27458 53 .27535 54 1.27611 55 .27688 56 .27764 57 .27841 58 .2791759 1.27994 60 513 1 0.788011 8190 8369 8548 8727 I 234 5.788905 9084 9263 9441 9620 5678 — 6 8 9 I 234 10.789798 9977 " Corr. 12.790155 10 30 033315 45 0512 20 59 15.790690 30 89 086840 119 1046 45 134 1224 50 148 1401 13 14 16 17 18 19 20.791579 1757 1934 2112 2290 22222 20722 87887 H8M88 222 21 23 24 25.792467 2644 2822 2999 3176 26 28 29 30.793353 3530 3707 3884 4061 31 32 33 34 35.794238 4415 4591 4768 4944 36 37 38 39 SINE 40.795121 41 42 43 44 46 47 48 49 45.796002 30 88 6178 40 117 6354 45 132 6530 50 147 6706 51 52 53 54 50.796882 7057 7233 7408 7584 56 57 58 ggགྨཐ8 55.797759 7935 8110 8285 8460 59 VERSINES, EXSECANTS, AND TANGENTS 52° #1 5297 Corr. 5474 10 29 565015 44 5826 20 59 CORR. FOR SEC. + 60.798636 COSINE .615662 5432 5203 4974 4744 .614515 4285 4056 3826 3596 .613367 " 3137 Corr. 2907 10 38 2677 15 57 2447 20 77 .611067 0836 0606 0376 0145 .612217 30 115 1987 40 153 1757 45 173 1527 50 192 1297 .609915 9684 9454 9223 8992 .608761 8531 8300 8069 7838 .607607 7376 7145 6914 6682 CORR. FOR SEC. + .604136 3904 3672 3440 3208 .606451 6220 " Corr. 5988 10 39 58 575715 5526 20 77 605294 30 116 5062 40 154 4831 45 174 4599 50 193 4367 602976 2744 2512 2280 2047 .601815 VERSINE .384338.624269 4568 4797 5026 5256 5715 5944 6174 6404 7323 7553 EXSEC .385485.627300 30 304 7908 40 405 8517 45 456 9126 50 507 9736 386633.630346 6863 7093 4874 " Corr. 5480 10 101 0546 0777 1008 6086 15 152 6693 20 203 .388933.636483 9164 9394 9624 9855 2624 2855 3086 3318 CORR. FOR SEC. + 0957 "Corr. 1569 10 102 218115 153 15 2794 20 205 20 .387783.633407 30 307 30 8013 4021 40 409 40 52 4636 45 460 45 525 50 512 50 65 5866 8243 8473 8703 390085.639574 30 310 0316.640194 40 413 0814 45 465 1435 50 517 2057 7100 " Corr. 7717 10 103 .391239.642680 1469 1700 1931 2162 4243 4474 8336 15 155 8954 20 207 3303 " Corr. 39261 10 104 392393.64580130 313 6427 40 417 705445 470 768 50 522 8309 455115 157 5175 20 209 .393549.648938 3780 " 9567 Corr. 4012.650197 10 105 0827 15 158 1458 20 211 394706.652090 30 316 4938 5169 5401 5633 .395864.655258 CORR. FOR SEC. + 6096 5893" Corr. 6328 6529 10 106 6560 7166 15 160 7803 20 213 6792 " Corr. 10 397024.65844130 319 7256 9080 40 426 7488 9719 45 479 7720.660359 50 532 7953 0999 .398185.661640 10 GEET BO " Corr. ២០០៥ ៩០។ 13 15 ជូនដ 20 30 2722 40 421 40 53 3355 45 474 45 60 3988 50 527 50 66 4623 20 TANGENT 1 1.27994 .28071 .28148 .28225 .28302 4 0123A 1.28379 5 .28456 6 .28533 7 .28610 8 .28687 9 1.2876410 .2884211 .28919 12 .28997 13 .29074 14 1.29152 15 .29229 16 .29307 17 .29385 18 .29463 19 1.29541 20 .29618 21 .29696 22 .29775 23 .29853 24 1.29931 25 30009 26 .30087 27 .30166 28 .30244 29 1.30323 30 30401131 .30480 32 .30558 33 .30637 34 1.30716 35 .30795 36 .30873 37 .30952 38 .31031 39 1.31110 40 .31190 41 .31269 42 .3134843 26 .31427 44 40 1.31507 45 .31586 46 .31666 47 .3174548 .31825 49 1.31904 50 .31984 51 .32064 52 .32144 53 .32224 54 1.32304 55 32384 56 .32464 57 .3254458 .32624 59 1.3270460 514 0.798636 01234 5 6 5.799510 9685 9859 8.800034 0208 789 9 O-NET DOM 222 D*7** 87~♡~ HMMMM DI 10.800383 12 13 14 16 17 21 15.801254|30 87 1428 40 116 1602 45 131 1776 50 145 1950 23 24 20.802123 2297 2470 2644 2818 26 27 25.802991 3164 3338 3511 3684 28 29 31 32 30.803857 4030 4203 4376 4548 33 34 SINE 36 38 39 8810 8986 9160 9335 35.804721 4894 5066 5239 5411 41 42 43 44 49 OGODZ KONO. 8 0557 " Corr. 0731 10 29 0906 15 44 1080 20 58 40.805584 5756 " Corr. 5928 10 29 610015 43 6273 20 57 51 46 45.806445 30 86 661740 115 47 6788 45 129 48 6960 50 143 7132 52 53 54 50.807304 56 57 58 59 7475 7647 7818 7990 55.808161 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 8332 8504 8675 8846 60.809017 COSINE .601815 1583 1350 1118 0885 .600653 0420 0188 .599955 9722 .597159 6925 6692 6458 6225 .595991 5758 5524 5290 5057 .594823 4589 4355 4121 3887 .593653 3419 3185 2950 2716 .590136 589901 CORR. FOR SEC. .592482 2248 " Corr. 2013 10 39 1779 15 59 1544 20 78 |.591310|30 117 107540 156 0840 45 176 0606 150 195 0371 9666 9431 9196 + .588961 8726 8491 8256 8021 587785 9580 .599489 9812 .400045 0278 .400511.668086 9256 " Corr. 0744 8734" Corr. 9024 10 39 0976 938310 108 879115 58 1209.670033 15 163 8558 20 78 1442 0683 20 217 1.598325 30 117.401675.671334 30 326 8092 40 155 1908 1985 40 434 2142 2637 45 489 2375 3290 50 543 2608 3943 7858 45 175 7625 50 194 7392 53° VERSINE .398185.661640 8417 8650 8882 9115 EXSEC .399347.66485530 322 5500 40 430 6146 45 484 6792 50 537 7439 " 2282 Corr. 2924 TO 107 3567 15 161 421 20 215 .402841.674597 3075 3308 3542 3775 6581 6815 7050 7284 CORR. FOR SEC. + 5252 " Corr. 590710 110 404009.677877 30 329 8535 40 438 4242 4476 4710 4943 .680512 6563 15 164 7220 20 219 .405177.681173 5411 5645 5879 6113 9193 45 493 9852 50 548 .406347.684486 30 332 5150 40 443 5816 45 498 648150 554 7148 1274 1509 1744 1834 " Corr. 2496 10 || 315915 166 382220 222 .407518.687815 7752 7987 8221 .408690 .691161 30 336 8925 1833 40 447 9160 2504 45 503 3177 50 559 3850 9394 9629 .409864.694524 410099 0334 5199 " Corr. 5874 10 113 655015 170 0569 0804 7227 20 226 411039.697904 30 339 8582 40 452 9261 45 509 9941 50 565 8483 " Corr. " Corr. 9152 10 112 10 14 982115 168 15 21 8456.69049120 224 20 28 1979.700621 .412215.701302 CORR. FOR SEC. + " Corr. 10 14 20 15 20 27 30 41 40 45 50 54 61 68 30 42 40 55 45 62 50 69 TANGENT 1 1.32704 .32785 .32865 .32946 .33026 0123♬ 4 1.33107 5 .33188 .33268 7 .33349 .33430 9 5678 1.3351110 .33592|11 .33673 12 .33754 13 .3383514 1.3391615 .33998 16 .34079 17 .34160 18 .34242 19 1.34323 20 .34405 21 .34487 22 .34568 23 .34650 24 1.34732 25 .3481426 .34896 27 .34978 28 .35060 29 1.35142 30 .3522431 .35307 32 .35389 33 .3547234 1.35554 35 .35637 36 .35719 37 .35802 38 .35885 39 1.35968 40 .3605141 .36134 42 .36217 43 .3630044 1.3638345 .36466 46 36549 47 .36633 48 .36716 49 50 1.36800 .3688351 36967 52 .3705053 .37134 54 1.37218 55 .37302 56 .37386 57 .37470 58 .37554 59 1.37638 60 515 0.809017 01234 56789 5.809871 6.810042 7 0212 0383 0553 10.810723 " 1234 12 0894 Corr. 1064 10 28 1234 15 42 1404 20 57 15.811574 30 85 1744 40 113 1914 45 127 2084 50 142 2253 13 14 16 17 18 19 22222 20.812423 2592 2762 2931 3101 25.813270 3439 3608 3778 3947 21 23 24 12 207°° 27~37 ❤❤♪88 22 26 28 29 31 30.814116 4284 4453 33 34 36 35.814959 5128 37 5296 الا 38 5465 39 5633 42 40.81580I 43 44 SINE 46 47 9188 9359 9530 9700 སྤྱ⌘གྲུ⌘སྒྱུ ༄3གྲུ རྐྱོཆོ; 48 49 52 45.816642 30 84 6809 40 112 6977 45 126 7145 150 140 7312 53 54 4622 4791 50.817480 7648 7815 7982 8150 56 57 58 55.818317 8484 8651 8818 8985 60.819152 VERSINES, EXSECANTS, AND TANGENTS 54° CORR. FOR SEC. + 5970 " Corr. 6138 10 28 630615 42 6474 20 56 COSINE 587785 7550 7314 7079 6844 586608 6372 6137 5901 5665 .585429 5194 "Corr. 4958 10 39 4722 15 59 4486 20 79 584250 30 118 401440 157 .583069 2832 2596 2360 2123 3777 45 177 3541 50 197 3305 .581886 1650 1413 1176 0940 580703 0466 0229 579992 9755 .579518 9281 9044 8807 8570 CORR. FOR SEC. .578332 8095 " Corr. 7858 10 40 7620 15 59 7383 20 79 .577145 30 119 6908 40 158 6670 45 178 6432 50 198 6195 575957 5719 5481 + 5243 5005 574767 4529 4291 4053 3815 1.573576 VERSINE 412215.701302 2450 2686 2921 3156 3628 3863 4099 4335 .413392.704716 30 342 5401 40 457 6087 45 514 6773 50 571 7460 7640 7877 EXSEC .414571.708148 4806 8836 " Corr. 5042 9525 10 15 5278.710215 15 173 5514 0906 20 231 .415750.711597 30 346 5986 2289 40 461 2982 45 519 3675 50 577 4369 6223 6459 6695 .416931.715064 7168 7404 1983 " Corr. 2665 10 14 334815 171 4032 20 228 0719 0956 1193 1430 418114.718548 30 350 9248 40 466 9947 45 524 8824.720648 50 583 1349 8350 8587 9060 .419297.722051 9534 9771 .420008 0245 CORR. FOR SEC. + 2380 2617 5759 " Corr. 645610 116 715215 175 7850 20 233 420482.725571 3C 353 6277 4C 471 6984 45 530 7692 50 588 8400 3092 3330 3568 3805 .421668.729110 1905 2753 "Corr. 3457 10 118 416115 177 4866 20 235 9820 " ff Corr. 2142.730530 10 119 1241 15 178 1954 2C 238 5709 5947 6185 .426424 .422855.732666 30 357 3380 40 476 4094 45 535 4809 50 595 5525 .424043 .736241 4281 4519 4757 4995 6958 " Corr. 7676 10 120 8395 15 180 9114 20 240 .425233739835 30 360 5471.740556 40 480 1277 45 541 2000 50 601 2723 743447 CORR. FOR SEC. + " Corr. 14 IC 15 21 20 28 30 43 40 57 45 64 50 71 " Corr. 10 15 15 22 120 29 44 30 40 45 66 58 50 73 TANGENT 1.37638 37722 .37807 .37891 .37976 1.38C6C 0-234 4 5878α .38145 6 .38229 .38314 8 .38399 1.38484 10 .38568 11 .3865312 .38738 13 .3882414 1.38909 15 .3899416 .39C79 17 .39165 18 .39250 19 9 1.39336 20 .39421 21 .39507 22 .39593 23 .39679 24 ་ 1.39764 25 .39850 26 .39936 27 .40022 28 .40109 29 1.4019530 .4028131 .40367 32 .40454 33 40540 34 1.40627 35 .40714 36 .40800 37 .40887 38 .40974 39 1.41061 40 .411484 .41235 42 .41322 43 .4140944 1.41497 45 .41584 46 .41672 47 .41759 48 .41847 49 • 1.41934 50 .42022 151 ,42110 52 .42198 53 .4228654 1.42374 55 .42462 56 .42550 57 .42638 58 42726 59 1.42815 60 516 0.819152 0-23 =† 4 6678 σ 9 5.819985 6.820152 0318 0485 0651 01234 5 10.820817 11 12 13 0983 " Corr. 1149 TO 28 131515 41 14 1481 20 55 16 17 -- OUNCE DO700 87087 98588 DIRE 15.821647 30 18 21 22 20.822475 2640 2806 2971 3136 23 24 26 27 25.823302 3467 3632 3796 3961 28 31 30.824126 4291 4456 4620 4785 SINE 44 35.824949 5114 5278 5442 5606 9319 9486 9652 9819 40.825770 46 47 48 8 66466 200g 55: 49 51 52 45.826590 30 82 6753 40 109 6917 45 123 7081 50 136 7244 53 54 50.827407 7571 7734 1813 40 110 1978 45 124 2144 50 138 2310 56 57 58 59 55.828223 8386 8549 CORR. FOR SEC. + 5934 " Corr. 6098 10 27 626215 41 6426 20 55 7897 8060 TABLE XX.-NATURAL SINES, COSINES, 8712 8875 60.829038 COSINE .573576 3338 3100 2861 2623 .572384 2146 1907 1669 1430 571191 83.569997 30 119 9758 40 159 9519 45 179 9280 50 199 9040 .568801 8562 8322 8083 7844 0952 " Corr. 0714 10 39 0475 15 60 0236 20 80 .567604 7365 7125 6886 6646 [] 566406 6166 5927 5687 5447 |.565207 4967 4727 4487 4247 564007 CORR. FOR SEC. + 3766 " Corr. 3526 10 40 3286 15 60 3045 20 80 .562805|30 120 2564 40 159 2324 45 180 2083 50 200 1843 561602 1361 1121 0880 0639 560398 0157 559916 9675 9434 .559193 55° VERSINE 426424.743447 6662 6900 EXSEC 7854 8093 8331 8570 7139 7377 6350 20 243 427616.747078 30 364 7806 40 486 8535 45 546 9265 50 607 9996 4172 " Corr. 4897 10 121 5623 15 182 .428809.750727 9048 9286 9525 9764 1460 " Corr. 2192 TO 123 292615 184 3661 20 245 .430003.754396 30 368 C242 5132 40 491 0481 5869 45 552 6606 50 613 7345 0720 0960 2635 2875 3114 3354 .431199.758084 1438 1678 2156 .432396.761791 30 372 2534 40 496 3279 45 558 4024 50 620 4770 CORR. FOR SEC. + 8824 "Corr. 9564 10 124 1917.760306 15 186 1048 20 248 .433594.765517 3834 4073 4313 4553 5273 5513 5753 6265" Corr. 7013 10 125 7762 15 188 8512 20 251 .434793.769263 30 376 5033.770015 40 501 0767 45 564 1520 50 626 2274 .435993.773029 6234 6474 6714 6955 3784 " Corr. 4541 10 127 529815 190 6056 20 253 .437195.776815 30 380 7436 7676 7574 40 506 8334 45 570 9096 50 633 9857 7917 8157 .438398.780620 8639 8879 9120 9361 1384 " Corr. 2148 10 128 2913 15 192 3679 20 256 439602.784446 30 384 521340 512 5982 45 576 675150 640 7521 9843 440084 0325 0566 .440807.788292 CORR. FOR SEC. + " Corr. 10 15 15 22 20 30 30 40 45 50 45 60 67 75 "Corr. 10 15 23 15 120 31 30 46 40 61 45 69 50 77 TANGENT 1.42815 .42903 .42992 .43080 .43169 · 1.43258 • 43347 6 43436 7 .43525 8 .43614 9 1.43703 10 • .43792 11 .43881 12 ► OI234 SOT@α 0-234 43970 13 44060 14 1.4414915 44239 16 .4432917 .44418 18 .44508 19 5 • 1 1.44598 20 44688 21 .44778 22 44868 23 .44958 24 1.45048 25 .45139 26 .4522927 45320 28 .45410 29 1.45501 30 45592 31 .45682 32 .45773 33 .4586434 1.45955 35 .46046 36 46137 37 .46229 38 .46320 39 1.46411 40 .46503 41 .46595 42 .46686 43 .4677844 1.4687045 .46962 46 47054 47 .47146 48 .47238 49 1.47330 50 .47422 51 .47514 52 .4760753 .47699 54 • 1.47792 55 47885 56 .47977 57 48070 58 .48163 59 1.48256 60 • 517 01234 0.829038 56789 0-234 5 5.829850 6.830012 0174 0337 0499 || 10.830661 12 13 14 16 17 18 19 22222 202~~ 67087 68788 25221 99509 OZAMI HONOR 15.831470|30 23 24 20.832277 2438 2599 2760 2921 26 28 25.833082 3243 3404 3565 3725 31 32 33 34 36 30.833886 4046 4207 4367 4528 37 SINE 35.834688 4848 5008 38 5168 5328 41 42 43 44 9200 9363 9525 9688 46 40.835488 47 49 0823 " Corr. 0984 10 27 114615 40 1308 20 52 45.836286 53 54 1631 40 108 1793 45 121 1954 150 135 2116 56 58 59 50.837083 7242 7401 VERSINES, EXSECANTS, AND TANGENTS 56° CORR. FOR SEC. + 11 5648 Corr. 5807 10 27 5967 15 40 6127 20 53 55.837878 8036 8195 8354 8512 30 80 6446 40 106 6605 45 120 6764 50 133 6924 7560 7719 WNO GENE 60.838671 .559193 8952 8710 8469 8228 COSINE .557986 7745 7504 7262 7021 .556779 6537 " Corr. 6296 10 40 605415 60 5812 20 81 .554360 4118 3876 3634 3392 .555570 30 121 5328 40 161 5086 45 181 4844 50 202 4602 .553149 2907 2664 2422 2180 1.551937 1694 1452 1209 0966 .550724 0481 0238 549995 9752 · · 549509 CORR. FOR SEC. 9266 "Corr. 9023 10 41 8780 15 61 8536 20 81 1.547076 6833 6589 + .548293 30 122 8050 40 162 7807 45 182 7563 50 203 7320 6346 6102 545858 5614 5371 5127 4883 .544639 VERSINE 2255 2496 2738 2979 1772 440807.788292 1048 9063 " Corr. 1290 983610 129 1531.790609 15 194 1383 20 259 442014.792158 30 388 2934 40 517 3710 45 582 4488 50 646 5266 EXSEC 3704 3946 .443221 ||.796045 3463 6825 " Corr. 7605 TO 31 8387 15 196 4188 9169 20 261 .444430 ||.799952 30 392 4672.800736 40 523 4914 152145 588 5156 2307 50 653 5398 3094 6366 6608 .445640 ||.803881 5882 4669 " Corr. 5458 TO 132. 6124 624815 198 7039 20 264 CORR. FOR SEC. + .446851.807830 30 396 8623 40 528 9416 45 594 7578.810210|50 660 1005 7C93 7336 7820 .448063.811801 8306 8548 8791 9034 9519 9762 .450005 0248 2598 "Corr. 3395 10 133 419415 200 4993 20 267 449276.815793 30 400 6594 40 534 739645 601 8198 50 667 9002 450491.819806 11 0734.820612 Corr. 0977 1418 10 135 1220 222515 202 1464 3033 20 270 .451707.823842 30 405 1950 4651 40 540 5462 45 607 6273 50 675 7085 2193 2437 2680 452924.827898" Corr. 3167 8712 10 136 3411 952715 205 3654.830343 20 273 3898 1160 454142.831977 30 409 2796 40 546 3615 45 614 4386 4629 4873 5117 .455361.836078 4435 50 682 5256 CORR. FOR SEC. + #1 Corr. то 16 15 24 20 31 30 47 63 40 45 71 50 79 " Corr. 10 16 15 24 20 32 30 40 45 50 50 48 66 73 81 TANGENT 1.48256 .48349 .48442 .48536 .48629 1 01234 1.48722 5 .48816 6 .48909 7 .49003 8 .49097 9 1.49190 10 .49284|||| 49378 12 .49472 13 49566 14 1.49661 15 .49755 16 49849 17 .49944 18 .50038 19 1.50133 20 .50228 21 .50322 22 .50417 23 .50512 24 1.50607 25 .50702 26 .50797 27 .50893 28 .50988 29 1.51084|30 .5117931 .51275 32 .51370 33 .51466 34 1.51562 35 .51658 36 .51754 37 .5185038 .51946 39 1.52043 40 .5213941 .52235 42 .5233243 .5242944 1.52525 45 .52622 46 .52719 47 .5281648 .52913 49 1.53010 50 .53107 51 .53205 52 .53302 53 .53400 54 1.53497 55 .53595 56 .53693 57 .5379158 .53888 59 1.53986 60 518 0.838671 OI232 BON∞O 6 5.839462 7 8 01234 9.840094 10.840251 II 12 13 14 " Corr. 0409 0567 10 26 072415 39 0882 20 52 15.841039 30 79 1196 40 105 1354 45 118 151150 131 1668 6678σ 16 17 18 19 OUR 00 87087 KOMM8 222 29700 65000 66 26 27 20.841825 1982 21 22 2139 23 2296 24 2452 28 25.842609 2766 2922 3079 3235 29 31 32 30.843391 3548 3704 3860 4016 33 34 36 37 35.844172 4328 4484 4640 4795 38 39 441 42 43 444 SINE 40.844951 46 47 48 49 8829 8987 9146 9304 0-23 9620 9778 9936 51 52 45.845728 30 78 5883 40 103 6038 45 116 6193 50 129 6348 50.846503 6658 6813 6967 7122 53 54 687888 56 57 58 55.847276 7431 7585 7740 7894 59 5106 " Corr. 5262 10 26 541715 39 5573 20 52 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.848048 COSINE .544639 4395 4151 3907 3663 1.543419 3174 2930 2686 2442 .539751 9506 9261 9016 8771 TE .542197 1953 Corr. 1708 10 41 146415 61 1219 20 82 540974 30 122 073040 163 0485 45 183 0240 50 204 .539996 .538526 8281 8035 7790 7545 .537300 7054 6809 6563 6318 536072 5827 5581 5336 5090 CORR. FOR SEC. .534844 4598 " Corr. 4352 10 41 4106 15 61 3860 20 82 ..532384 2138 1891 + 533614 30 123 3368 40 164 3122 45 185 2876 50 205 2630 1645 1399 .531152 0906 0659 0412 0166 1.529919 57° VERSINE .455361.836078 5605 5849 6093 6337 6826 7070 7314 7558 6901 Corr. 7725 10 138 855015 207 9375 20 276 456581.840202 30 414 1029 40 552 1857 45 621 2687 50 689 3517 .457803.844348 8047 8292 8536 8781 9760 .46C0C4 EXSEC 5180 "Corr. 6012 10 139 684615 209 768 20 279 459026 .848516 30 418 9270 9352 40 558 9515.850190 45 627 1028 50 697 1867 .460249.852707 0494 C739 0984 1229 1719 1965 2210 .461474.856922 30 423 7767 40 564 4173 4419 4664 491C CORR. FOR SEC. + 3548 " Corr. 4390 10 141 2455.860310 .462700 .861159 2946 3191 3437 3682 5648 5894 6140 5233 15 211 6077 20 282 8614 45 634 9461 50 705 .463928.865420 30 427 6275 40 570 7131 45 641 7988 50 712 8845 .468848 9094 9341 9588 9834 .470081 11 2009 Corr. 2860 10 142 371315 214 4566 20 285 .465156.869704 11 5402.870564 Corr. 1424 110 144 2286 15 216 3148 20 288 466386 .874012 30 432 6632 4876 40 576 6878 5742 45 648 7124 6608 50 720 7370 7476 .467616.878344 7862 8355 8601 9213 "Corr. 8109.880083 10145 C954 15 218 1827 20 291 882700 30 437 3574 40 583 4449 45 655 5325 50 728 6202 887080 10 15 20 CORR. FOR SEC. + " Corr. 17 25 30 40 45 150 50 66 75 83 TANGENT "Corr. 10 17 15 26 120 34 30 51 40 68 45 77 50 85 1.53986 .54085 .54183 .54281 .54379 1.54478 .54576 .54675 .54774 .54873 01234 4 6678 σ) 1.54972 10 .5507111 .55170 12 .55269 13 33.55368 14 5 9 234 1.5546715 .55567 16 .55666 17 .55766 18 .55866 19 567 1.55966 20 .56065 21 .56165 22 .56265 23 .56366 24 1.56466 25 .56566 26 .56667 27 .56767 28 .56868 29 1.56969 30 .57C69 31 .57170 32 .5727 33 .57372 34 1.57474 35 .57575 36 .57676 37 .57778 38 .5787939 1.57981 40 .5808341 .58184 42 .58286 43 .58388 44 1.5849045 .58593 46 58695 47 .58797 48 .5890049 1.59002 50 .5910551 .59208 52 .5931153 .5941454 1.5951755 .59620 56 .59723 57 .59826 58 .5993059 1.6003360 519 2222 0-231 DO7OK DIEME DOOR OM2 20702 87~m7 no♪❤. I 9º 85887 KANAA 0.848048 8202 8356 8510 8664 4 5.848818 8972 9125 9279 9432 6 8 9 10.849586 12 14 9739 " Corr. 9893 10 26 13.850046 15 38 0199 20 51 16 17 15.850352 30 77 0505 40 102 0658 45 15 081150 128 0964 18 19 20.851117 21 22 23 24 26 25.851879 28 29 31 32 30.852640 34 36 33 3096 3248 37 38 35.853399 39 41 42 43 44 SINE 46 47 40.854156 48 49 51 52 1269 1422 1574 1727 53 54 2032 2184 2336 2488 45.854912 30 76 5063 40 101 5214 45 113 5364 50 126 5515 56 2792 2944 50.855666 57 58 59 3551 3702 3854 4005 55.856417 4610 15 38 4761 20 50 VERSINES, EXSECAnts, and TANGENTS 58° 5816 5966 6117 6267 CORR. FOR SEC. + 6567 6718 6868 7017 60.857167 COSINE 529919 9673 9426 9179 8932 .528685 8438 8191 7944 7697 .527450 7203 " Corr. 6956 10 41 6708 15 62 6461 20 82 .524977 4729 4481 4234 3986 |.526214 30 124 5966 40 165 5719 45 186 5472 50 206 5224 .523738 3490 3242 2994 2747 .522499 2250 2002 1754 1506 .521258 1010 0761 0513 0265 .520016 CORR. FOR SEC. + 9519 10 41 9270 15 62 9022 20 83 .518773 30 124 8525 40 166 .517529 7280 7031 6782 6533 8276 45 186 8027 50 207 7778 .516284 6035 5786 5537 5287 .515038 VERSINE 4308 "Corr..519768 "Corr..480232 4459 TO 25 470C81 C327 0574 0821 887080 7959 " Corr. 883910 147 9720 15 221 1068.890602 20 295 1562 1809 2056 2303 .471315.891484 30 442 2368 40 589 3253 45 663 4139 50 737 5026 .472550.895914 2797 3044 3292 3539 EXSEC .473786.900368 30 447 4034 1262 40 596 2156 45 670 4528 3052 50 745 4776 3949 4281 .475023.904847 5271 5519 5766 6014 6758 7006 7253 8246 8494 .476262.909351 30 452 6510.910255 40 603 1160 45 678 2066 50 753 2973 6803 " Corr. 7692 10 149 8583 15 223 9475 20 298 .477501.913881 7750 7998 CORR. FOR SEC. + 0481 0730 0978 11 5746 Corr. 6646 10 151 754615 226 8448 20 301 1475 1724 2222 8990 .478742.918436 30 457 9350 40 609 9239.920266 45 686 9487 1182 50 762 9735 2099 .479984.923017 4790 " Corr. 5700 10 152 6615 229 7523 20 305 .482471.932258 2720 2969 3218 3467 3937 " Corr. " Corr. 4857 10 154 10 18 5778 15 231 15 27 670120 308 120 36 .481227.927624 30 462 130 CORR. FOR SEC. + 54 8549 40 616 40 72 9475 45 693 45 81 1973.93040150 770 50 90 1329 3188 " Corr. 411810 156 5050 15 234 5984 20 312 " Corr. 10 18 15 26 20 35 .483716.936918 30 468 3965 785340 623 4214 8789 45 701 9726 50 779 4463 4713.940665 .484962.941604 30 53 40 70 45 79 50 88 TANGENT -1 1.60033 0 .60137 .60241 60345 .60449 OI23➡ 6787 UI 5 1.60553 .60657 .60761 .60865 .60970 9 1.61074 10 .6117911 .61283 12 .61388 13 .61493 14 1.6159815 .61703 16 .61808 17 .61914 18 .62019 19 1.62125 20 .62230 21 .62336 22 .62442 23 .62548 24 1.62654 25 .62760 26 .62866 27 .62972 28 .63079 29 1.6318530 .63292 31 .63398 32 .63505 33 .6361234 1.63719 35 .63826 36 .63934 37 64041 38 .64148 39 1.64256 40 .6436341 .64471 42 .64579 43 .64687 44 1.64795 45 .64903 46 .65011 47 .65120 48 .65228 49 1.65337 50 .65445 51 .65554 52 .6566353 .6577254 1.65881 55 .65990 56 .66099 57 .66209 58 .66318 59 1.66428 60 520 0.857167 7317 7467 7616 I 234 5E7BQ 0-234 6 5.857916 8065 8214 8364 8513 8 9 11 10.858662 12 14 16 17 18 13 9109 15 37 9258 20 50 OUR DON~~ Am~m~ HOMMA 2=997 21 15.859406 30 74 9555 40 99 9704 45 112 9852 50 124 19.8600CI 20.860149 23 24 29 33 34 SINE 25.860890 IC38 1186 1334 1482 36 7766 30.861629 1777 1924 2072 2219 39 35.862366 2514 2661 2808 2955 42 44 LOLOLOL 8811 "Corr. 8960 10 25 40.863102 46 47 48 49 C298 C446 0594 0742 51 52 53 54 45.863836 30 73 3982 40 98 4128 45 110 4275 50 122 4421 50.864567 4713 4860 5006 5151 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 3249 " Corr. 3396 10 24 354215 37 3689 20 49 55.865297 56 5443 5589 5734 5880 57 58 59 60 1.866025 COSINE .515038 4789 4539 4290 4040 .513791 3541 3292 3042 2792 510043 .509792 .512542 42 2293 " Corr. 2043 10 179315 62 1543 20 83 .511293 30 125 1043 40 167 0793 45 187 0543 50 208 C293 9542 9292 9041 .5C8791 8541 8290 8040 7789 507538 7288 7037 6786 6536 .506285 6034 5783 5532 5281 5C5030 CORR. FOR SEC. 4779 " Corr. 4528 TC 42 427615 63 4025 20 84 .503774 30 126 3523 4C 167 3271 45 188 3020 50 209 2768 .502517 2266 2014 1762 1511 + .501259 1007 C756 0504 0252 5000CO 59° VERSINE .484962 5211 5461 5710 5960 .486209 6459 6708 6958 .490208 0458 0708 0959 EXSEC 7208.950108 .487458.951058 7707 7957 8207 8457 .491209 1459 1710 1960 2211 .941604 2544 "Corr. 348610 158 4429 15 236 5372 20 315 3966 4217 4468 4719 946317 30 473 7263 40 630 8210 45 709 9158 50 788 .488707.955825 30 478 8957 9207 9457 9707 .489957.960621 2009 " Corr. 2962 10 159 3915 15 239 4870 20 319 CORR. FOR SEC. + 30 6782 40 638 40 774045 718 8699 50 797 9659 45 50 8993 9244 .492462.970294 2712 2963 3214 3464 1583 " Corr. 254610 161 35115 242 4477 20 323 965444 30 484 6411 40 645 738045 726 8351 50 807 9322 .493715.975174 30 490 6153 40 653 7133 45 734 811550 816 9097 1268 " Corr. 2243 10 163 3218 15 245 4195 20 326 .494970.980081 5221 5472 5724 5975 .496226.985017 30 495 6477 6729 6980 7232 .497483.989982 7734.990979 30 6008 40 660 40 7000 45 743 45 7993 50 826 50 8987 7986 " Corr. 1976 10 167 297515 251 8489 3975 20 334 8238 .498741.994976 30 501 5979 40 668 " Corr 10 15 20 "Corr. 1066 Corr. 205210 165 10 19 3039 15 248 15 29 4028 20 330 20 38 6982 45 752 7987 50 835 8993 9496 9748 500000.00000 CORR. FOR SEC. + 19 28 37 56 74 83 93 57 76 86 96 TANGENT 1 1.66428 0 .66538 ..66647 .66757 .66867 OI232 BONBO 4 1.66978 .67088 .67198 .67309 8 .67419 9 6 1.67530 10 .67641 | .67752 12 .67863 13 .67974 14 1.68085 15 .68196 16 .68308 17 .6841918 .68531 19 1.68643 20 .68754 21 .68866 22 .68979 23 .69091 24 1.69203 25 .6931626 .69428 27 .69541 28 .69653 29 1.69766 30 .69879 31 .6999232 .70106 33 .7021934 1.70332 35 .7C446 36 .7056037 .70673 38 .70787 39 1.7090140 .7101541 .71129 42 .71244 43 .7135844 1.71473 45 .71588 46 .71702 47 .71817 48 .71932 49 1.72047 50 .72163 51 .72278 52 .72393 53 .72509 54 1.7262555 .72741 56 .72857 57 .72973 58 .73089 59 1.73205 60 521 0-234 BONBO 0.866025 6 8 5.866752 9 || 234 5ON 10.867476 12 13 14 16 17 7621" Corr. 7766 10 24 7910 15 36 8054 20 48 15.868199 30 18 19 22222 21 8 666 Fogg 55555 £55±5 wwwxx wwwww ~~~~~ 28 23 20.868920 9064 9207 9351 9495 24 26 27 29 25.869639 9782 9926 28.870069 0212 31 32 33 34 30.870356 0499 0642 0785 0928 36 37 38 39 35.871071 1214 1357 1499 1642 41 42 SINE 43 44 6171 6316 40.871784 46 6461 6607 47 48 49 6897 7042 7187 7331 52 53 54 45.872496 30 56 57 834340 96 8487 45 108 8632 50 120 8776 58 59 50.8732C6 3348 3489 3631 3772 VERSINES, EXSECANTS, AND TANGENTS CORR. FOR SEC. + 55.873914 4055 4196 4338 4479 60.874620 1927 " Corr. 2069 10 24 221215 36 2354 20 47 2638 40 95 2780 45 107 2922 50 118 3064 COSINE 500000 9748 9496 9244 8992 .498740 8488 8236 7983 7731 .497479 72.496216 30 126 5964 40 168 5711 45 189 5459 50 210 5206 7226 " Corr. 6974 10 42 6722 15 63 6469 20 84 .494953 4700 4448 4195 3942 .493689 3436 3183 2930 2677 .492424 2170 1917 1664 1410 .491157 0904 C650 0397 0143 489890 9636 CORR. FOR SEC. + " Corr. 9382 10 42 9129 15 63 8875 20 85 71.48862130 127 8367 40 169 8114 45 190 7860 50 211 7606 .487352 7098 6844 6590 6335 .486081 5827 5573 5318 5064 .484810 60° VERSINE EXSEC 5000001.OCCOC C252 .CC101 0504.00202 C756 .00303 1008|| .00404 .501260 1.00505 1512.00607 " Corr. 1764 .00708 TO T7 2017 .00810 15 25 .00912 20 34 34 .502521.0101430 2269 2774 .0111640 .0111640 3026 .01218 45 3278 .01320 50 3531 .01422 .5037841.01525 4036 .01628 4289 .01730 .01833 4541 4794 .01936 5050471.02039 5300 5552 5805 6058 .02143 .02246 .02349 .02453 • CORR. FOR SEC. + 5063111.02557 6564 .02661 11 Corr. 6817.02765 10 17 7070.0286915 26 7323 .02973 20 35 .507576 1.03077 30 52 7830 .03182 40 70 8083.0328645 78 8336 .03391 50 87 8590 03496 .508843 1.03601 9C96 .03706 9350 .038|| 9603.03916 9857 .04022 .5101101.04128 0364 .04233 0618 0871 .04339 .04445 1125 .C4551 .513919 1.05727 4173.05835 4427.05942 4682.06050 4936.06158 .515190.06267 .511379 1.04658 1633 .04764 " Corr. 1886 .04870 10 18 2140 .04977 15 27 2394 .05084 20 36 .512648 1.05191 30 53 2902.05298 40 71 3156 .05405 45 80 3410.05512 50 89 3665.05619 CORR. FOR SEC. + 51 30 59 6840 78 76 45 85 50 88 98 "Corr. 10 20 15 29 20 39 " Corr. 10 20 15 30 20 40 30 60 40 80 45 90 50 100 "Corr. TO 20 15 31 20 41 30 61 40 82 45 92 ||50 102 TANGENT 1.732C5 .73321 .73438 .73555 .73671 T 0-23# · 4 5 1.73788 .73905 6 .74022 7 .74140 8 .74257 9 1.74375 10 .74492 1 74610 12 .74728 13 .7484614 1.74964 15 .75082 16 .7520017 .75319 18 .75437 19 1.75556 20 .75675 21 .7579422 .75913 23 .76032 24 1.76151 25 .76271 26 .76390 27 .76510 28 .76630 29 1.76749 30 .76869 31 .76990 32 .7711033 .7723034 1.77351 35 .77471 36 .77592 37 .77713 38 .77834 39 1.77955 40 .7807741 .78198 42 .7831943 .78441 44 1.78563 45 .78685 46 .78807 47 .78929 48 .79051 49 1.79174 50 .79296 51 .79419 52 .7954253 .79665 54 1.79788 55 .79956 .80034 57 .80158 58 .8028 59 1.80405 60 522 0.87462C 0-234 BOT∞∞ 6 7 5.875324 8 9 0-231 BONOO ON 22222 14 16 10.876026 17 18 19 21 22 23 6166 " Corr. 6307 10 23 6447 15 35 6587 20 47 15.876727 30 70 6867 40 93 7006 45 105 7146 50 17 7286 ♡= 24 20.877425 7565 7704 7844 7983 597 26 27 28 29 31 32 33 34 25.878122 8261 8400 8539 8678 23. MA KAMA NE BODO 858 SINE 30.878817 8956 9095 9233 9372 36 37 4761 4902 42 43 44 5042 5183 117 48 49 35.879510 9649 9787 9925 39.880063 40.880201 5464 5605 51 5746 5886 52 0339 " Corr C477 10 23 061515 34 0753 20 46 45.880891 30 69 IC28 40 92 116645 103 1304 50 115 1441 50.881578 1716 1853 56 57 g g878 58 59 53 1990 54 2127 55.882264 2401 2538 2674 2811 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.882948 COSINE .484810 4555 4301 4C46 3792 .483537 3282 3028 2773 2518 482263 2009 " Corr. 1754 10 42 1499 15 64 1244 20 85 .479713 9458 9203 8947 8692 .480989 30 127 0734 40 170 0479 45 191 0224 50 212 .479968 .478436 8181 7926 7670 7414 .477159 6903 6647 6392 6136 CORR. FOR SEC. + .472038 1782 1525 1268 1012 .475880 5624 5368 5112 11 4856 .474600 4344 Corr. 4088 TO 43 383215 64 3576 20 85 .470755 0499 0242 .469985 9728 .469472 61° VERSINE EXSEC .515190 1.06267 5445.06375 5699.06483 5954.06592 6208.06701 .516463.06809 6718.06918 " Corr. 6972 .07027 10 18 7227.07137 15 27 7482.07246 20 37 37 .5177371.07356 30 7991.07465 40 .07575 45 .0768550 8246 8501 8756 .07795 .5190111.07905 9266.08015 9521.08126 9776.08236 .520032 .08347 .520287 1.08458 0542 .08569 C797 .C8680 1053.08791 1308.08903 .5215641.09014 .5228411.09574 30 56 3097 .09686 40 75 3353 .09799 45 84 3608.099|||50 94 386410024 4632 .5241201.10137. 4376.10250 .10363 4888.10477 5144 .10590 525400.10704 5656 .10817 5912.10931 6168.11045 6424 .11159 .473320 30 128.526680 ||1.11274 3063 40 171 2807 45 192 2551 50 213 2294 CORR. FOR SEC. + 1819.09126 " Corr. 2074 .0923810 19 2330.0935015 28 2586 .09462 20 37 • " Corr. 10 21 15 31 20 42 55 30 63 7340 83 82 ||45 94 9150 104 .5292451.12425 9501 .12540 9758.12657 .530015.12773 0272 .530528.13005 527962 1.11847 30 58 8218 .11963 40 77 8475.12078 45 86 8732 .12193 50 96 8988 .12309 .12889 CORR. FOR SEC. + 6937 .11388 " Corr. " Corr. 7193 1150310 19 10 22 11617 15 29 15 33 .11732 20 38 20 44 7449 7706 " Corr. 10 21 15 32 20 43 30 64 40 85 45 96 50 106 30 65 40 87 45 98 50 109 TANGENT 1.80405 8-231 .80529 .80653 2 .80777 .80901 4 1.81025 7 .81150 .81274 .81399 8 .81524 9 1.81649 10 .81774 11 .81899 12 .8202513 .82150 14 5678σ 1.82276 15 .82402 16 .82528 17 .82654 18 .82780 19 1.82906 20 .83033 21 .83159 22 .83286 23 .83413 24 1.83540 25 .83667 26 .83794 27 .83922 28 .84049 29 1.84177 30 .84305 31 .8443332 .8456133 .84689 34 1.84818 35 .84946 36 .85075 37 .85204 38 .85333 39 1.85462 40 .85591 41 .85720 42 .85850 43 .8597944 1.86109 45 .86239 46 .86369 47 .86499 48 .8663049 1.86760 | 50 .86891 51 .8702152 .87152 53 .87283 54 1.87415 55 .87546 56 .87677 57 .87809 58 .87941 59 1.88073 60 523 0.882948 3084 3221 3357 3493 1 ·~34 2 6787 UI 5.883630 3766 3902 4038 4174 9 10.884310 11 12 234 13 14 16 17 18 19 ~~~~~ ~~~~~ 8~~~~ ❤COMMO 15.88498830 68 5123 40 90 5258 45 102 5394 50 113 5529 20.885664 5799 5934 6069 6204 21 22 23 24 26 25.886338 6473 27 6608 28 29 36 SINE 30.887011 7145 32 7279 33 7413 34 7548 37 35.887682 7815 7949 41 42 43 44 38 8083 39 8217 5 £555 40.888350 Č 4445 Corr. 4581 10 23 4717 15 34 4852 20 45 3 གླ་ུགྨ་ྒུ གྱགཤྩ ངྒོ=ཪྐོ# 6742 6876 46 47 45.889017 30 67 9150 40 89 9283 45 100 9416 50 || 57 49 9549 VERSINES, EXSECANTS, AND TANGENTS 62° 8484 " Corr. 8617 10 22 8751 15 33 8884 20 44 50.889682 9815 52 9948 53.890080 54 0213 CORR. FOR SEC. + 55.890345 56 0478 0610 58 0742 59 0874 60.891006 COSINE 469472 9215 8958 8701 8444 .468187 7930 7673 7416 7158 "Corr. .466901 6644 6387 10 43 6129 15 64 5872 20 86 464327 4069 3812 3554 3296 .465614 30 129 5357 40 172 5100 45 193 4842 50 214 4584 463038 2780 2522 2265 2007 1.461749 1491 1232 0974 0716 460458 0200 459942 9683 9425 CORR. FOR SEC. + 456580 6322 6063 5804 5545 .459166 8908 Corr. 8650 10 43 839115 65 8132 20 86 457874 30 129 7615 40 172 7357 45 194 7098 50 215 6839 455286 5027 4768 4509 4250 .453990 VERSINE EXSEC .530528 ||| .13005 0785 .13122 1042.13239 1299 .13356 1556 .13473 .5318131.13590 2070 .13707 " Corr. 2327 .13825 10 20 2584 .13942 15 30 2842 .14060 20 39 .533099|||.14178 30 59 14296 40 79 .14414 45 89 3871 .14533 50 98 4128 .14651 .534386.14770 4643 .14889 4900 .15008 .15127 3356 3613 5158 5416 .15246 .535673.15366 5931 .15485 6188 .15605 6446 .15725 6704 .15845 536962.15965 CORR. FOR SEC. + 11 7478 7220 .16085 Corr. .16206 10 20 .16326 15 30 .16447 20 40 7735 7993 .538251 8509 1.16568 30 61 .16689 40 81 8768.16810 45 91 9026 .16932 50 101 9284 .17053 539542.17175 9800 .17297 .540058 .17419 0317 .17541 0575 .17663 .540834 1.17786 1092 .17909 1350 .18031 1609 .18154 1868 .18277 .542126.18401 2385 .18524 2643 2902 3161 "Corr. .18648 10 21 .18772 15 31 .18895 20 41 .543420 1.19019 30 62 3678 .1914440 83 3937 .19268 45 93 4196 .19393 50 104 4455 .19517 1.544714 1.19642 4973 5232 .19767 .19892 5491 .20018 5750.20143 |.546010 ||1.20269 CORR. FOR SEC. + " Corr. 10 22 15 33 20 44 30 67 40 89 45 100 50 11| " Corr. 10 23 " Corr. 10 23 15 35 120 47 TANGENT 30 70 40 93 45 105 50 116 1 01234 5O789 1.88073 .88205 .88337 .88469 .88602 Ц 1.88734 .88867 6 .89000 .89133 .89266 1.8940010 .89533 11 .89667 12 .89801 13 .89935 14 1.9006915 .90203 16 .90337 17 .90472 18 .90607 19 1.90741 20 .90876 21 .91012 22 .91147 23 .91282 24 15 34 20 45 30 68 1.92098|30 40 91.92235 31 45 102 .9237132 50 114 .92508 33 .92645 34 1.9141825 .91554 26 .91690 27 .91826 28 .91962 29 1.92782 35 .92920 36 .93057 37 .93195 38 .93332 39 1.93470 40 .9360841 .93746 42 .93885 43 .94023 44 1.9416245 .94301 46 .94440 47 .94579 48 .94718 49 1.94858 50 .94997 51 .95137 52 95277 53 .95417 54 1.95557 55 .95698 56 .95838 57 .95979 58 .96120 59 1.9626160 524 0-234 SON∞σ 0.891006 6 7 5.891666 8 9 π NMI DONDO OUNCE KON** 67~m7 ❤❤MMM DIE 99 12 10.892323 13 14 16 2455 " Corr. 2586 10 22 2717 15 33 2848 20 44 15.892979|30 65 3110 40 87 324145 98 3371 50 109 3502 17 18 19 21 22 23 24 20.893633 26 27 28 29 25.894284 31 32 33 34 36 30.894934 37 38 39 41 42 SINE 43 35.895582 44 1138 1270 1402 1534 46 47 48 49 1798 1929 2061 2192 51 52 53 54 40.896228 g gགླ⌘ 56 3763 3894 4024 4154 57 58 59 4415 4545 4675 4804 5064 5194 5323 5453 45.896873 30 64 7001 40 86 7130 45 97 725850 107 7387 50.897515 7643 7772 7900 8028 5712 5841 5970 6099 55.898156 8283 8411 8539 8666 " Corr. 6358 6486 10 21 661515 32 6744 20 43 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.898794 COSINE .452694 2435 2175 1916 1656 • 453990 3731 3472 3213 2954 • 448799 8539 8279 8019 7759 447499 7239 6979 6718 6458 446198 5938 5677 5417 5156 .444896 4635 4375 4114 3853 5473061.20900 .451397 7565 .21026 " Corr. 7825 .21153 10 21 8084 .21280 15 32 8344 .2140720 42 5486031.21535| 30 64 1137 " Corr. 8863 .21662 40 85 0878 10 43 9122 .21790 45 96 C618|15 65 9382.2191850 106 0358 20 87 9642 .22045 .450098 30 130.549902||1.22174 449839 40 173 550161 .22302 957945 195 042.22430 9319 50 216 0681 .22559 9059 0941 .22688 551201 1.22817 1461 .22946 1721 .23075 1981 .23205 2241 .23334 CORR. FOR SEC. .443593 3332 Corr. 307110 43 281015 65 2550 20 87 440984 0723 0462 0200 439939 + rt .439678 9417 9155 8894 8633 .438371 63° VERSINE 546010 1.20269 6269 .20395 6528 .20521 6787 .20647 7046 .20773 EXSEC .552501 1.23464 2761 3021 .23594 " Corr. .23724 10 22 .23855 15 33 3542 .23985) 20 44 3282 4062 4323 4583 4844 553802 1.24116 30 65 .24247 40 87 .24378 45 98 .24509 50 109 .24640 CORR. FOR SEC. + .5551041.24772 5365.24903 5625 .25035 5886 .25167 6147 .25300 .5564071.25432 6668 .25565 6929 .25697 7190 .25830 7450 .25963 442289 30 130.5577||||1.26097 2028 40 174 7972 .26230 " Corr. 176745 196 8233 .26364 10 22 1506 50 217 8494 .2649815 34 1245 8755 .26632 20 45 .559016 1.26766 30 9277 9538 9800 560061 67 .26900 40 90 .27035 45 101 .27169 50 112 .27304 560322 1.27439 0583 .27574 0845 .27710 1106 .27845 1367 .27981 561629 1.28117 CORR. FOR SEC. + 15 20 6 " Corr. 24 1.96969 5 .971 .97253 7 .97395 8 10 36 48 .97538 9 30 40 95 45 107 50 119 711.97680 10 .97823 | 30 73 40 97 45 110 50 122 TANGENT 1 "Corr. 10 25 15 37 20 50 1.96261 0 .96402 1 .96544 2 .96685 3 .96827 4 30 40 100 1.99841 25 "Corr. .99986 26 10 242.0013127 15 37 .00277 28 20 49 .004231 29 2.00569 30 .00715 31 .00862 32 .01008 33 .0115534 45 112 50 125 .97966 12 .98110 13 .98253 14 1.9839615 .98540 16 .98684 17 .98828 18 .98972 19 1.99116 20 .9926121 .99406 22 .99550 23 .99695 24 2.01302 35 .0144936 .01596 37 .C1743 38 .01891 39 2.0203940 .0218741 .02335 42 .0248343 .02631 44 752.03526 50 .03675 51 .0382552 .03975 53 .04125 54 2.02780 45 .0292946 .03078 47 .03227 48 .03376 49 2.04276 55 .04426 56 .04577 57 .04728 58 .04879 59 2.05030 60 525 0.898794 01234 567BQ 0-234 5 8 9 5.899431 12 13 14 16 17 18 19 10.900065 22222 202≈≈ 87087 2888 2=22E CON UNOZ PONAI N 23 24 15.900698 30 63 0825 40 84 0951 45 95 1077 50 105 1203 26 20.901329 1455 1581 1707 1832 SINE 32 8922 9049 25.901958 2084 2209 2335 2460 37 38 9176 9304 30.902585 2710 2836 2961 3086 41 42 9558 9685 9812 9939 43 4444 35.903210 3335 3460 3585 3709 46 .0192 "Corr. 031910 21 044515 32 0572 20 42 40.903834 3958 Corr. 408210 21 4207 15 31 4331 20 41 56 45.904455 57 58 59 30 62 4579 40 83 4703 45 47 93 48 4827 50 103 49 4951 50.905075 51 5198 52 5322 53 5445 54 5569 55.905692 5815 5939 VERSINES, EXSECANTS, AND TANGENTS 64° CORR. FOR SEC. + TI 6062 6185 60.906308 COSINE .438371 8110 7848 7587 7325 .437063 6802 6540 6278 6017 .435755 .433135 2873 2610 2348 2086 5493 " Corr. 5231 110 44 4969 15 65 4707 20 87 434445 30 131 4183 40 175 392145 196 3659 50 218 3397 .431823 1561 1299 1036 0774 .430511 0248 429986 9723 9461 429198 8935 8672 8410 8147 CORR. FOR SEC. + .427884 7621 " Corr. 7358 10 44 7095 15 66 6832 20 88 .425253 4990 4726 4463 4199 426569 30 132 6306 40 175 604245 197 5779 50 219 5516 423936 3672 3409 3146 2882 |.422618 CORR. FOR SEC. + .5616291.28117 1890.28253" Corr. .2839010 23 .2852615 34 .28663 20 46 .562937|||.28800 30 69 .28937 40 92 .29074 45 103 .2921150 114 .29349 VERSINE 2152 2413 2675 3198 3460 3722 3983 EXSEC .5642451.29487 4507.29625 4769.29763 5031.29901 5293.30040 .565555 1.30179 5817 .30318 6079.30457 IC 23 6341.30596 15 35 6603.30735 20 47 7127 7390 7652 7914 .5668651.30875 30 70 .31015 40 93 .31155 45 105 .31295 50 117 .31436 .5681771.31576 8439 8701 8964 .31999 9226 .32140 .31717 .31858 .572116.33708 2379 .33852 2642 2905 .33996 .34140 3168 .34284 .569489.32282 9752 .32424 "Corr. .570014 .32566 10 24 0277.3270815 36 0539 .32850 20 48 .5708021.32993 30 72 1065 .33135 40 95 1328 .33278 45 107 1590.33422 50 119 1853 .33565 # .574747 1.35154 30 73 5010 .353CC 40 97 5274 .35446 45 110 5537 .35592 50 122 5801 .35738 576064 1.35885 6328 .36031 6591 .36178 6854 .36325 7118 .36473 .5773821.36620 CORR. FOR SEC. + " 10 15 20 #1 " Corr 2.05030 .05182 .05333 .05485 51.C5637 Corr. 25 38 30 76 40 102 45 114 50 127 Corr. 10 26 15 39 20 52 30 78 40 104 45 117 150 130 It Corr. 10 26 15 40 20 53 5734311.34429 3694 3958 Corr. 4221 .34573 Corr. .34718 10 24 10 27 .34863|15 37 15 40 4484 .35009 20 49 120 54 30 81 140 108 45 121 50 134 30 79 40 106 45 119 50 132 TANGENT 1 0 I •234 56789 2.05790 .05942 6 .06094 .06247 .06400 9 2.06553 10 .06706 II .06860 12 .07014 13 .07167 14 2.07321 15 .07476 16 .07630 17 .07785 18 .07939 19 2.08094|20 .08250 21 .08405 22 .0856C 23 .08716 24 2.08872 25 .09028 26 .0918427 .09341 28 .09498 29 2.09654 30 .09811|31 .09969 32 .10126 33 .10284 34 2.10442 35 .10600 36 .10758 37 .10916 38 .11075 39 2.1123340 .11392 41 .11552 42 .11711 43 .11871 44 2.1203045 .12190 46 .12350 47 .12511 48 .12671 49 2.12832 50 .12993 51 .13154 52 .1331653 .1347754 2.13639 55 .138C1 56 .13963 57 .14125 58 .14288 59 2.14451 60 526 01234 BO766 0.906308 8 — 5.906922 9 ›INMA BONBO 10.907533 16 19 12 13 || 7655" Corr. 7778 10 20 7900 15 30 14 8021 20 41 15.908143 30 61 8265 40 81 8387 45 91 18 8508 50 101 17 8630 27222 227°* ..❤❤7 HOMMA DE 99599 8UNOZ PONO8 8 24 20.908751 26 28 25.909357 9478 9599 9720 984! 32 33 34 SINE 30.909961 31.910082 41 6431 6554 6676 6799 42 43 44 7044 7166 7289 7411 35.910564 0684 0804 0924 1044 47 48 49 " Corr. 40.911164 1284 140310 152315 30 1642 20 40 20 8872 8994 9115 9236 45.911762 56 57 0202 0323 0443 58 59 50.912358 2478 2596 2715 2834 55.912953 3072 3190 3309 3427 30 60 1882 40 80 2001 45 90 2120 50 100 2239 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 60.913546 COSINE 422618 2355 2091 1827 1563 .421300 1036 0772 0508 0244 .419980 .417338 7074 6810 9716" Corr. 9452 10 44 918815 66 8924 20 88 418660 30 132 8396 40 176 8131 45 198 7867 50 220 7603 6545 6281 416016 5752 5487 5223 4958 .414693 4428 4164 3899 3634 .413369 3104 2840 2574 2310 .412044 CORR. FOR SEC. + 1780 Corr. 1514 10 44 1249 15 66 0984 20 88 8596 8330 408065 7799 7534 7268 7002 406737 65° VERSINE EXSEC .5773821.36620 7645.36768 " Corr. 7909 .3691610 25 8173 .3706415 37 8437 .37212 20 50 .578700 1.37361 30 75 8964 .37509 40 99 9228.37658 45 112 9492 .37808 50 124 9756 .37957 .5800201.38106 0284.38256 0548 .38406 0812 .38556 1076 .38707 5813401.38857 11 1604 .39008 Corr. 1869.39159 10 25 2133.3931115 38 2397.39462 20 51 .582662.39614 30 76 2926.39766 40 102 3190.39918 45 114 3455.40070 50 127 3719.40222 .5839841.40375 4248 .40528 4513.40681 4777 .40835 5042 .40988 CORR. FOR SEC. + .5853071.41142 5572 5836 6101 .41296 "Corr. .4145010 26 .41605 15 39 6366 .41760 20 52 .5866311.41914 30 78 6896 42070 40 104 7160.42225 45 117 7426 .42380 50 130 7690 .42536 .5879561.42692 8220.42848 8486.43005 8751.43|62 9016 .43318 .410719 30 133.589281|1.43476 0454 140 177 9546 .43633 " Corr. 0188 45 199 9812.43790 10 26 .409923 50 221.590077.43948 | 15 40 9658 .409392 9127 0342 .44106 20 53 .590608.44264 30 79 0873 44423 40 106 1138 .44582 45 119 44741 50 132 8862 1404 1670 .44900 • 591935.45059 2201 .45219 2466.45378 2732 .45539 2998 .45699 .593263.45859 CORR. FOR SEC. + Corr. 10 27 .14777 15 41 20 55 30 82 40 110 45 123 50 137 " Corr. 10 28 15 42 20 56 30 84 40 112 45 126 50 140 #1 Corr. 10 28 15 43 20 57 30 85 40 114 45 128 50 142 " Corr. TO 29 15 44 20 58 130 87 40 116 145 131 50 145 TANGENT 2.14451 .14614 .14940 .15104 2.15268 .15432 .15596 .15760 1 0-23I DO70. 0-234 5 4 5 6 8 .15925 9 2.16090 10 .16255 11 .16420 12 .16585 13 .16751 14 2.16917 15 .17083 16 .17249 17 .17416 18 .17582 19 2.17749 20 .17916 21 .18084 22 .18251 23 .18419 24 2.18587 25 .18755 26 .18923 27 .19092 28 .19261|29 2.1943030 .19599 31 .19769 32 .19938 33 .20108 34 2.20278 35 .20449 36 .20619 37 .20790 38 .2096 39 2.21132 40 .21304 41 .21475 42 .21647 43 .21819 44 2.21992 45 .22164 46 .22337 47 .22510 48 .22683 49 2.22857 50 .23030 51 .23204 52 .23378 53 .23553 54 2.23727 55 .23902 56 .24077 57 .24252 58 .24428 59 2.24604 60 527 01234 5676K 0.913546 8 5.914136 9 DINBE DO 22 10.914725 || 12 13 14 2222 222 16 17 18 19 4842 "Corr. 4960 10 20 5077 15 29 5194 20 39 15.915312 30 5429 40 78 5546 45 88 5663 50 98 5780 21 20.915896 22 23 24 26 27 25.916479 6596 6712 28 6828 29 6944 41 42 30.917060 7176 31 32 7292 33 7408 34 7523 43 44 SINE 35.917639 36 7755 7870 37 38 7986 39 8101 40.918216 46 47 3664 3782 3900 4018 g ggགུ གgགྲུགg དྩོཆོ་ོ; 48 4254 4372 4490 4607 49 51 52 6013 6130 6246 6363 45.918791 30 57 8906 40 77 9021 45 86 9135 50 96 9250 53 54 50.919364 9479 9593 9707 9822 57 58 59 55.919936 56.92C050 VERSINES, EXSECANTS, AND TANGENTS 8331 " Corr. 844610 19 856115 29 8676 20 38 CORR. FOR SEC. + 0164 0277 C391 60.920505 COSINE .406737 6471 6205 5939. 5673 .405408 5142 4876 4610 4344 404078 3811 " Corr. 3545 10 44 327915 67 3013 20 89 401415 1149 0882 0616 0349 1.400082 .399816 9549 9282 9016 59.402747 30 133.597253 ||1.48295 2480 40 178 2214 45 200 1948 50 222 1681 .398749 8482 8216 7949 7682 .397415 7148 6881 6614 6347 CORR. FOR SEC. 396080 5813 " Corr. 5546 10 45 5278 15 67 50120 89 394744 30 134 4477 140 178 4209 45 200 3942 50 223 3674 .393407 3140 2872 2605 2337 .392070 1802 1534 1267 0999 390731 66° VERSINE EXSEC .593263 ||1.45859 3529 .46020 11 Corr. 3795.4618110 27 4061 .4634215 41 4327 .46504 20 54 .5945921.46665 30 81 .46827 40 108 5124 .46989 45 122 5390 .47152 50 135 5656 .47314 4858 .5959221.47477 6189 47640 6455 6721 .47804 .47967 6987 .48131 • 7520.48459 " Corr. 7786 .48624 10 27 8052 .4878915 41 8319 .48954 20 55 .598585.4911930 8851 9118 9384 82 .49284 40 110 .49450 45 124 .49616 50 137 9651.49782 CORR. FOR SEC. + 1.5999181.49948 .600184 0451 0718 0984 .50115 " Corr. .50282 10 28 .5044915 42 .50617 20 56 .6012511.50784 30 84 1518.50952 40 112 .51120 45 126 2051 .51289 50 140 2318 .51457 1784 .6025851.51626 2852 .51795 3119 .51965 3386 .52134 3653 .52304 .6052561.53329 30 85 5523.53500 40 114 5791.53672 45 128 6058 .53845 50 142 6326 .54017 606593 1.54190 6860.54363 "Corr. 7128.54536 |10 29 7395.54709|15 43 7663 .54883 20 58 CORR. FOR SEC. + 6C9269.55930 " Corr. 10 30 15 44 20 59 30 89 40 118 45 133 50 148 "Corr. IC 30 15 45 20 60 603920|1.52474 " Corr. 4187.52645 " Corr. 4454.52815 10 28 10 31 4722.52986||5 43 15 46 4989.53157 20 57 20 62 30 90 40 120 45 135 50 150 " Corr. 10 31 15 46 20 61 30 92 40 122 45 137 150 153 30 93 40 124 45 139 50 155 " Corr. 10 32 15 47 20 63 1.6079301.55057 30 87 30 95 40 126 8198.55231|40 116 8466 .55405 45 130 45 142 8733.55580 50 145 150 158 9001 .55755 TANGENT 2.24604 · 0123♬ .24780 .24956 .25132 .25309 4 5678 ❤ 2.25486 .25663 .25840 .26018 8 .26196 9 2.26374 10 .26552 11 .26730 12 .26909 13 .27088 14 2.27267 15 .27447 16 .27626 17 .27806 18 .27987 19 2.28167 20 .28348 21 .28528 22 .2871C 23 .28891 24 2.29073 25 .29254 26 .2943727 .29619 28 .29801 29 2.29984|30 .30167 31 .303532 .3053433 .30718 34 2.30902 35 .31086 36 .3127137 .31456 38 .31641 39 2.31826 40 .3201241 .3219742 .32383 43 .3257044 2.32756 45 .3294346 .33130 47 .33317 48 .3350549 2.33693 50 .3388151 .3406952 .34258 53 .34447 54 2.34636 55 .34825 56 .3501557 .35205 58 .35395 59 2.35585 60 528 0.920505 0618 0732 0846 0959 0123➡ 4 5.921072 1185 1299 1412 1525 6789 σ 8 9 10.921638 22 O-NIH BOMB 0702 87887 HMMMM DEIRE || 12 13 14 1750 " Corr. 186310 19 1976 15 28 2088 20 37 15.922201 | 30 56 2313 40 75 2426 45 84 2538 50 94 2650 16 17 18 19 20.922762 2874 2986 3098 3210 21 22 23 24 25.923322 26 28 29 31 32 30.923880 33 34 36 37 38 39 35.924435 41 SINE 42 43 44 40.924989 46 47 g gg8gཁྱུགཡུག Čཆོī་ 48 3434 3545 49 3657 3768 51 52 53 54 3991 4102 4213 4324 56 57 58 59 45.925540 30 55 5651 40 73 5761 45 83 5871 50 92 5980 4546 4657 4768 4878 50.926090 6200 6310 6419 6529 5099 " Corr. 521010 18 5320 15 28 5430 20 37 55.926638 6747 6857 6966 7075 TABLE XX.—NATURAL SINES, cosines, CORR. FOR SEC. + 60.927184 COSINE .390731 0463 0196 .389928 9660 .389392 9124 8856 8588 8320 .388052 7784 " Corr. 7516 10 45 7247 15 67 6979 20 89 .385369 5101 4832 4564 4295 384027 3758 3490 3221 2952 .38671130 134 6443 40 179 6174 45 201 5906 50 224 5638 382683 2415 2146 1877 1608 .381339 1070 0801 0532 0263 .379994 CORR. FOR SEC. + .377302 7033 6763 6494 6224 8 9725 " Corr. 9456 10 45 9187 15 67 8918 20 90 .375955 5685 5416 5146 4876 .374607 .378649 30 135 8379 40 180 8110 45 202 7841 50 224 7571 67° VERSINE 0876 1144 6092691.55930 9537.56106 " Corr. 9804 .5628210 30 .610072 .5645815 цц 0340 .56634 20 59 .6106081.56811 30 89 .56988|40 118 .57165 45 133 .57342 50 148 1680 .57520 .6119481.57698 2216 .57876 2484.58054 2753 .58233 3021.58412 .6132891.58591 3557 3826 .5877|| " Corr. .58950 TO 30 4094 .5913015 45 4362 .5931 20 60 .614631 ||1.59491|30 90 4899 .59672 40 120 5168 .59853 45 135 5436.60035 50 150 5705.60217 1412 EXSEC .615973 1.60399 CORR. FOR SEC. + 6242 .60581 " Corr. 6510 .60763|10 31 46 61 6779 .6094615 7046 .61129 20 61 .617317 1.61313 30 92 7585 .61496 40 122 7854.61680 45 138 8123 .61864 50 153 8392|| .62049 .6186611.62234 8930 .62419 9199 .62604 9468 .62790 9737 .62976 |.620006 ||1.63162 0275 .63348 " Corr. 0544 .6353510 31 0813 .63722 15 47 1082.63909|20 62 2159 2429 |.621351||1.64097 30 94 1621|| .64285 40 125 1890 .64473 45 140 .64662 50 156 .64851 .622698 1.65040 2967 .65229 " Corr. 3237.65419 10 32 3506 .6560915 3776 .65799 20 .6240451.65989 30 48 64 95 4315 .66180 40 127 4584.6637145 143 4854 .66563 50 159 5124 .66755 .625393 1.66947 CORR. FOR TANGENT SEC. + "Corr. 2.35585 .35776 10 32 .35967 .36158 15 48 20 64 .36349 30 96 40 129 45 145 50 161 " Corr. 10 33 15 49 20 20 65 30 98 40 130 45 147 50 163 " Corr. 10 33 15 50 20 20 65 30 99 40 133 45 149 50 166 " Corr. 10 34 15 51 20 67 30 101 40 135 145 152 50 168 " Corr. 10 34 15 51 20 69 30 103 40 137 45 154 50 171 2.36541 .36733 .36925 .37118 0123# 50780 6 7 .37311 9 2.3750410 .37697 11 .37891|12 .38084 13 .38279 14 2.38473 15 .38668 16 .38862 17 .39058 18 .39253 19 2.39449 20 .39645 21 .39841 22 .40038 23 .40235 24 2.40432 25 .40629 26 .40827 27 .41025 28 .4122329 2.41421 30 .4162031 .41819 32 .42019 33 .4221834 2.42418 35 .42618 36 .42819 37 .4301938 .43220 39 2.4342240 .4362341 .43825 42 .44027 43 .44230 44 2.44433 45 .4463646 .44839 47 .4504348 .45246 49 2.45451 50 .45655 51 .45860 52 .4606553 .4627054 2.46476 55 .4668256 .46888 57 .4709558 .4730259 2.47509 60 529 01234 0.927184 5678σ 9 5.927728 7836 7945 8053 8161 10.928270 || 234 12 13 14 16 17 18 19 333 27222 222≈≈ 87~~7 6888 E CONDO UNA CON 15.928810 30 54 8917 40 72 9025 45 81 9133 50 90 9240 20.929348 9455 9562 23 9669 24 9776 26 28 25.929884 9990 27.930097 0204 0311 31 33 34 30.930418 0524 32 0631 SINE 41 42 43 7293 7402 7510 7619 35.930950 1056 1162 1268 1374 44 40.931480 46 47 48 49 8378" Corr. 8486 10 18 859415 27 8702 20 36 51 52 0737 0843 56 45.932008 30 53 2113 40 70 2219 45 79 2324 50 88 2429 50.932534 2639 2744 2849 2954 57 58 59 VERSINES, EXSECANTS, AND TANGENTS 68° CORR. FOR SEC. + 55.933058 3163 3267 3372 3476 60.933580 1586 " Corr. 1691|10 18 1797 15 26 1902 20 35 COSINE .374607 4337 4067 3797 3528 .373258 2988 2718 2448 2178 .371908 1638 " Corr. 136810 45 109815 68 0828 20 90 8936 8665 8395 8125 .367854 7584 7313 7042 6772 .366501 6231 5960 5689 5418 .365148 4877 4606 4335 4064 .370557 30 135 0287 40 180 0017 45 203 .369747 50 225.630253 9476 .369206 .363793 CORR. FOR SEC. 3522 "Corr. 3251 10 45 2980 15 68 2709 20 90 .362438 30 136 2167 40 181 1896 45 203 1625 50 226 1353 .361082 0811 0540 0268 359997 359725 9454 9182 8911 8640 .358368 VERSINE 6253931.66947 5663 5933 6203 6472 EXSEC .628092 1.68884 8362.69079 " Corr. 8632 .6927510 33 8902 .69471 15 49 9172 .69667 20 66 .6294431.69864 30 98 9713.70061 40 131 .70258 45 148 .70455 50 164 0524 .70653 9983 2416 2687 2958 3228 CORR. FOR SEC. + 7012 .6267421.67911 30 9730 104 .68105 40 129 40 139 7282 .68299 45 145 7552 .68494 50 162 7822 .68689 45 157 50 174 .67139 " Corr. .6733210 32 .67525 15 48 15 .67718 20 65 20 .630794 1.70851 1064 1335 1605 1875 .71050 " Corr. " Corr. .71249 10 33 10 36 .71448 15 50 15 54 .71647 20 67 | 20 72 .6321461.71847 30 100 30 108 .72047 40 133 40 143 .72247 45 150 45 161 .72448 50 167 50 179 .72649 ย .6348521.73862 30 102 CORR. FOR SEC. + 2.47509 " Corr. 10 .47716 .47924 35 52 .48132 70 .48340 .633499||1.72850 3769 .73052 Corr. " Corr. .7325410 3410 36 .73456 15 51 15 55 4582 .73659 20 68 4040 4311 20 73 30 109 5123 .74065 40 136 40 146 5394 .7426945 152 45 164 5665 .74473 50 169 50 182 5936 .74677 6389181.76945 9189 9460 .637562.75909 30 103 7833 .76116 40 138 8104 .76323 45 155 8375 .76530 50 172 8647 .76737 .6362071.74881 6749 6478 .75086 " Corr. Corr. .75292 10 34 10 37 .7549715 52 15 55 .75703 20 69 7020 7291 120 74 = 2.49597 10 .49807 | .50018 12 .50229 13 20 71 .50440 14 30 1062.50652 15 40 141 .50864 16 11 Corr. 10 35 15 53 45 159 50 177 .51076 17 .51289 18 .51502 19 2.51715 20 .51929 21 .52142 22 .52357 23 .5257124 11 30 111 40 148 45 166 50 185 TANGENT " .77154 Corr. .77362 10 35 " Corr. 10 37 9732 .77571 15 52 15 56 .640003 .77780 20 70 20 75 .6402751.77990 30 10530 112 0546 .78200 40 140 40 150 0818.78410 45 157 45 169 1089 .78621 50 175 50 187 1360 .78832 .641632.79043 2.48549 .48758 .48967 .49177 .49386 01234 5O789 6 2.52786 25 .53001 26 .53217 27 .53432 28 .53648 29 2.5386530 .54082 31 .54299 32 .54516 33 .54734 34 2.54952 35 .55170 36 .55389 37 .55608 38 .55827 39 2.56046 40 .5626641 .56487 42 .56707 43 .56928 44 2.57150 45 .57371 46 .57593 47 .57815 48 .58038 49 2.5826 50 .58484 51 .58708 52 .58932 53 .59156 54 2.5938155 .59606 56 .5983 57 .60057 58 .60283 59 2.60509 60 530 0.933580 01234 5678 O 9 5.934101 || 234 12 13 10.934619 141 DONOR 20 16 18 22222 2000* 0.087 COMO DE BO 23 24 15.935135 30 52 5238 40 69 5341 45 77 5444 50 86 5547 26 27 20.935650 5752 5855 5957 6060 28 29 31 25.936162 6264 6366 6468 6570 32 33 34 SINE 36 3685 3789 30.936672 6774 6876 6977 7079 37 38 39 3893 3997 41 42 43 44 4204 4308 46 47 48 49 4412 4515 35.937181 7282 7383 7485 7586 40.937687 51 52 53 54 g gཀླ78 4722 Corr. 4826 10 17 4929 15 26 5032 20 34 56 57 58 45.938191 50.938694 8794 8894 8994 9094 7788" Corr. 7889 10 17 7990 15 25 8091 20 34 55.939194 9294 9394 9494 9593 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 30 50 8292 40 67 8392 45 76 8493 50 84 8593 60.939693 COSINE .358368 8096 7825 7553 7281 .357010 6738 6466 6194 5923 .355651 5379 " Corr. 5107 10 45 483515 68 4563 20 91 .352931 2658 2386 2114 1842 .354291 30 136 4019 40 181 3747 45 204 3475 50 227 3203 .351569 1297 1025 0752 0480 .350207 .349935 9662 9390 9117 .348845 8572 8299 8027 7754 .347481 CORR. FOR SEC. + 7208 " Corr. 6936 10 45 6663 15 68 6390 20 91 .344752 4479 4206 3933 3660 .346117 30 136 5844 40 182 5571 45 205 5298 50 227 5025 .343386 3113 2840 2567 2294 .342020 69° VERSINE EXSEC CORR. FOR SEC. + .641632 1.79043 1904.79254 " Corr. 2175.79466|10 36 2447.79679 15 53 2719.79891 20 71 .642990 ||| .80104 30 107 3262.80318 40 142 3534.80531 45 160 3806.80746 50 178 4077.80960 .645709 ||| .82254 30 108 5981.8247140 145 6253.82688 45 163 6525 .82906 50 181 6797.83124 .644349 1.81175 4621.81390 " Corr. " Corr. 4893.81605 10 36 10 39 5165.81821|15 54 15 58 5437.82037 20 72 20 77 .650065.85767 " Corr. 0338.85990 10 37 0610.86213 15 56 0883.86437 20 75 .651 155 1.86661 30 112 1428.86885 40 149 1701.87109 45 168 1973 .87334 50 187 2246 .87560 |.655248 ||1.90063 CORR. FOR SEC. + .647069 1.83342 7342 .83561 " Corr. "Corr. 7614.83780|10 37 10 39 7886 .8399915 55 15 59 8158.84219 20 73 20 78 .648431 1.84439|30 110 8703.84659 40 147 8975.84880 45 165 9248 .85102 50 184 9520 .85323 30 118 40 157 45 177 50 196 .649793 1.85545 11 Corr. 10 38 15 57 20 76 5521.90293 " Corr. 5794.90524 10 39 6067 .90754 15 58 6340.90986 20 77 30 114 40 152 45 171 50 190 .656614 1.91217 30 116 6887 .91449 40 156 7160.91681 45 174 7433.91914 50 193 7706 .92147 .6579801.92380 30 116 40 156 45 174 50 193 .652519 1.87785 2792 .88011 " Corr. " Corr. 3064.88238|10 38 10 40 3337.88465|15 57 15 61 3610.88692 20 76 20 81 30 121 4156.89148 40 152 40 162 4429.89376 45 171 4702 .89605 50 190 4975.89834 .653883.88920|30 114 45 182 50 202 " Corr. 10 40 15 60 20 80 " Corr. 10 41 15 62 20 82 TANGENT 30 123 40 165 45 185 50 206 2.60309 .60736 .60963 .61190 .61418 2.61646 .61874 OI234 DON»« 0-234 0 6 .62103 .62332 8 .62561 9 2.62791 10 .6302111 .63252 12 .6348313 .6371414 2.6394515 .64177 16 .64410 17 .64642 18 .64875 19 2.65109 20 .6534221 .65576 22 .6581 23 .66046 24 30 120 2.68653 35 40 160 .68892 36 45 179.69131 37 150 199 .6937 38 .69612 39 2.69853 40 .70094 41 .70335 42 .70577 43 .70819 44 2.6628|| 25 .66516 26 .66752 27 .66989 28 .67225 29 2.67462 30 .67700 31 .67937 32 .68175 33 .68414 34 2.71062 45 .71305 46 .71548 47 .71792 48 .72036 49 2.72281 50 .72526 51 .72771 52 .73017 53 .73263 54 2.73509 55 .73756 56 .74004 57 .7425 58 .74499 59 12.74748 60 531 0.939693 9792 9891 9991 234 -237 CO700 CODE COM 2 DO700 8.~m~ nom❤❤ 9 29509 85885 D8588 8 ოოოო 4.940090 5.940189 0288 0387 0486 0585 6 7 8 9 10.940684 12 13 14 21 20.941666 1764 1862 1960 2058 22 23 24 16 17 15.941176 30 49 1274 40 66 1372 45 74 18 1470 50 82 1569 19 26 25.942155 27 28 29 31 30.942642 2739 32 2836 34 33 2932 3029 36 37 35.943126 39 41 42 38 3416 3512 43 SINE 44 40.943608 46 47 48 49 0782 " Corr. C881 TC 16 097915 25 1078 20 33 2252 2350 2447 2544 45.944089 130 48 4185 40 64 428145 72 4376 50 80 4472 51 53 54 50.944568 3223 3319 4663 52 4758 56 57 59 3705 "Corr. 380110 16 3897 15 24 3993 20 32 55.945044 5139 5234 5329 5424 VERSINES, EXSECANTS, AND TANGENTS 70° CORR. FOR SEC. 4854 4949 60.945519 COSINE .342020 1747 1473 1200 0926 .340653 C380 0106 339832 9559 339285 9012 " Corr. 8738 IC 46 846415 68 8190 20 91 .337917 3C 137 7643 40 183 7369 45 205 7095 50 228 6821 .336548 6274 6000 5726 5452 1.335178 4903 4629 4355 4081 .333807 3533 3258 2984 271C .332436 2161 1887 1612 1338 CORR. FOR SEC. 331063 0789 " Corr. 0514 10 46 0240 15 69 329965 20 92 .329691 30 137 9416 40 183 9141 45 206 8867 50 229 8592 328317 8042 7768 7493 7218 .326943 6668 6393 6118 .5843 .325568 VERSINE EXSEC 9074 657980.92380 8253.92614 " Corr. 8527.92849 10 39 88CC.9308315 59 .93318 20 78 | 20 .6593471.93554 30 118 9620.93790 40 157 9894 .94026 45 177 660168 94263 50 196 0441 .94500 .66C7151.94737 0988.94975 " Corr. 1262.9521310 40 1536.95452 15 60 1810.95691 20 80 .6620831.95931 30 120 2357.96171 40 160 2631 .96411 45 180 2905.96652 50 200 3179.96893 .663452.97135 CORR. FOR SEC. + 3726 .97377 " Corr. 4000 .97619 10 41 .97862 15 61 4548.98106 20 81 4274 .6648221.98349 30 122 5097.98594 40 163 5371 .98838 45 183 5645 .99083 50 203 5919.99329 .6661931.99574 6467.99821 Corr. 6742 2.00067|10 41 7016 .00315 15 62 7290 .CC562 20 83 .667564 2.00810 30 124 7839 .CIC59 40 166 8113 .C1308 45 186 8388 .01557 50 207 8662 .01807 11 .671683 2.04584 .668937 2.02057 9211 .02308 " Corr. 9486.02559 10 42 9760 .02810 15 63 .670035 .03062 20 84 .670309 2.03315 30 126 0584 .03568 40 169 0859 .0382145 190 1133 .04075|50 211 1408 .04329 " 1958 .04839 Corr. 2232 .0509410 43 2507 .05350 15 64 2782 .05607 20 86 1.673057 2.05864 30 129 3332 .06121 40 172 3607 .0637945 193 3882 .06637 50 214 4157 .06896 .674432 2.07155 CORR. FOR SEC. + "Corr. 10 42 15 63 84 30 125 30 125 40 167 45 188 50 209 " Corr. 10 42 15 64 ||20 85 130 127 30 127 40 170 45 191 50 212 " Corr. 10 43 15 65 20 86 30 130 40 173 45 194 50 216 " Corr. 10 44 15 66 20 88 130 132 40 176 45 198 50 220 " Corr. 10 45 15 67 20 89 30 134 40 179 45 201 50 223 " Corr. 10 45 15 68 20 91 30 136 40 182 45 204 50 227 TANGENT 2.74748 .74997 .75246 .75496 .75746 2.75996 0-234 DONO O-232 5 7 .76247 .76498 .76750 8 .77CC2 9 6 2.77254 10 .77507 11 .7776 12 .7801413 78269 14 2.78523 15 .78778|16 .79033 17 .79289 18 .79545 19 2.79802 20 .8005921 .80316 22 .80574 23 .80833 24 2.8109125 .81350 26 .81610 27 .81870 28 .82130 29 2.82391 30 .8265331 .82914 32 .83176 33 .83439 34 2.83702 35 .83965 36 .84229 37 .84494 38 .84758 39 2.8502340 .85289 41 .85555 42 .8582243 .86089 44 2.86356 45 .86624 46 .86892 47 .8716148 .87430 49 2.87700 50 .87970 51 .88240 52 .88511 53 .8878354 2.89055 55 .89327 56 .89600 57 .89873 58 .9C147 59 2.90421 60 532 0.945519 5613 5708 5802 5897 OI234 KONWO 5.94599! 6 7 8 9 01234 5 10.946462 11 12 13 14 6556 "Corr. 6649 10 16 674315 23 6837 20 31 15.946930 30 47 7024 40 62 7117 45 70 7210 50 78 7304 16 17 18 19 22222 2070 200 23 20.947397 7490 7583 7676 7768 26 29 25.947861 7954 8046 8139 8231 31 32 33 34 30.948324 8416 8508 8600 8692 36 37 38 39 SINE 35.948784 8876 8968 9C60 9151 41 42 43 44 6085 6180 40.949243 6274 6368 3889 23ཀྲུགg 51 52 49.950063 50.950154 53 54 45.949699 30 46 46 9790 40 61 47 988 45 68 48 9972 50 76 56 57 58 59 55.950606 0696 0786 0877 0967 60.951056 9334 " Corr. 9426 10 15 9517 15 23 9608 20 30 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 0244 0335 0425 0516 COSINE .325568 5293 5018 4743 4468 .324193 3917 3642 3367 3092 320062 .319786 .322816 2541 " Corr. 2266 10 46 1990 15 69 1715 20 92 .321440 30 138 1164 40 184 0888 45 207 0613 50 229 0337 9511 9235 8959 .318684 8408 8132 7856 7580 .317305 7029 6753 6477 6201 .315925 5649 5373 5097 4821 CORR. FOR SEC. + .314545 4269 " Corr. 399210 46 371615 69 3440 20 92 .311782 1506 1229 0953 0676 .313164 30 138 2888 40 184 26145 207 2335 50 230 2059 .310400 C123 309847 957C 9294 .309017 71° VERSINE EXSEC .674432 2.07155 4707 .C7415 " Corr. 4982 .07675 10 44 5257 .0793615 66 5532 .08197 20 87 .675807 2.08459130 131 6083 .08721 40 175 6358.08983 45 197 6633 .09246 50 218 6908.0951C .677184 2.09774 CORR. FOR SEC. + 7459 .10038 " Corr. 7734 .1030310 44 8010 .1056815 67 82850834 20 89 .678560 2.11101 30 133 8836 .11367 40 178 9112 .11635 45 200 9387 1190350 222 9663 .12171 .679938 2.12440 .680214 .12709 " Corr. 0489 .12979 10 45 0765 .1324915 68 1041 .13520 20 91 681316 2.13791130 136 1592 .14063 40 181 1868 .14335 45 204 2144 .14608 50 226 21120 .!488! .682695 2.15155 11 CORR. FOR SEC. + " Corr. 10 46 15 69 20 92 .686836 2.19322 30 141 7112 .19604 40 188 7389 .19886 45 211 7665 .20169 50 235 7941 .20453 30 139 40 185 45 208 50 231 .688218 2.20737 8494 .21021 " Corr. .2130610 48 .2159215 72 .21878 20 96 8771 9047 9324 .689600 2.22165 30 144 9877 .22452 40 192 .690153 .22740 45 215 0430 .23028 50 239 0706 .23317 .690983 2.23607 " Corr. 10 47 15 70 20 94 30 141 40 188 45 211 50 235 " Corr. 10 48 15 72 20 96 2971 .15429 Corr. 3247 .157041046 "Corr. 10 49 3523 .1597915 69 15 73 3799 .16255 20 9220 97 30 143 40 191 45 215 50 239 .684075 2.16531 30 138 30 146 4351 .16808 40 185 40 194 4627 .17085 45 208 4903 .17363 50 231 5179 .17641 45 219 50 243 .685455 2.17920 5731 .18199 " Corr. " Corr. 6008 .1847910 47 10 49 .1875915 70 15 74 6560 .19040 20 94 20 99 6284 30 148 4C 198 45 223 50 247 " Corr. 10 50 15 76 20 101 30 151 40 201 45 227 50 252 TANGENT 2.90421 .90696 .90971 .91246 3 .91523 4 2.91799 .92076 .92354 .92632 .92910 9 2.93189 10 .93468 11 .93748 12 .94028 13 .94309 14 BENBO • QM= 2.94590 15 .94872 16 .95155 17 .95437 18 .95720 19 2.96004 20 .96288 21 .96573 22 .96858 23 .97144 24 2.97430 25 .97717 26 .98004 27 .98292 28 .98580 29 2.98868 30 .99158 31 .99447 32 .99738 33 3.00028 34 3.00319 35 .00611 36 .00903 37 .0119638 .01489 39 3.0178340 .02077 41 .02372 42 .02667 43 .0296344 3.0326045 .03556 46 .03854 47 .C4152 48 .04450 49 3.04749 50 .05049 51 .05349 52 .05649 53 .05950 54 3.06252 55 .06554 56 .06857 57 .07160 58 .07464 59 3.07768 60 533 0.951056 1146 1236 1326 1415 234 567BG 0-23- 1 5.951505 8 9 10.95195! 11 12 13 2040 " Corr. 2129 10 15 2218 15 22 2307 20 30 15.952396 30 44 2484 40 59 2573 45 67 2662 50 74 2750 14 16 17 18 19 22222 234 21 20.952838 22 222 $23 24 26 25.953279 27 28 29 31 +32 33 34 8 66L6G Fgggg 55555 £55±5 8www. 30.953717 3804 3892 3979 4066 36 37 38 35.954153 4240 4327 4414 4501 42 43 44 SINE 40.954588 46 47 48 49 1594 1684 1773 1862 51 555 52 45.955020 30 43 5106 40 58 5192 45 65 5278 50 72 5364 53 54 2926 3015 3103 3191 50.955450 5536 5622 5707 5793 3366 3454 3542 3629 56 57 58 59 55.955878 5964 6C49 6134 6220 60.956305 VERSINES, EXSECANTS, AND TANGENTS 72° CORR. FOR SEC. + 4674 " Corr. 476 IC 14 4847 15 22 4934 20 29 COSINE .309017 8740 8464 8187 7910 .307633 7357 7080 6803 6526 .306249 .303479 3202 2924 2647 2370 5972 " Corr. 5695 10 46 5418 15 69 5141 20 92 .302093 1815 1538 1261 0983 .300706 0428 0151 .299873 9596 .299318 9041 8763 8486 8208 CORR. FOR SEC. + 2920 3197 3474 .693751 2.26531 4028 .26827 " Corr. 4305 .27123 10 50 4582 .27420 15 75 .27717 20 99 .304864 30 138.695136 ||2.2801530 149 .28313 40 199 .28612 45 224 .28912 50 249 .29212 4859 4587 40 185 4310 45 208 4033 50 231 3756 .297930 7653 Corr. 7375 10 46 7097 15 69 6819 20 93 .295152 4874 4596 4318 4040 11 .293762 3484 3206 2928 2650 .292372 .296542 30 139 6264 40 185 5986 45 208 5708 50 231 5430 VERSINE .690983 2.23607 1260 1536 .23897 "Corr. .24187 10 49 1813 .24478 15 73 2090 24770 20 98 EXSEC 5413 5690 • 5967 6244 .692367 2.25062 30 146 30 154 2643 .25355 40 195 40 205 .25648 45 220 45 231 .25942 50 24450 256 .26237 CORR. FOR SEC. + .696521 2.29512 6798 .29814 "Corr. 7076 .30115 10 51 7353 .3041815 76 7630 .30721 20 101 .697907 2.31024|30 152 8185 .31328 40 203 8462 .31633 45 228 8739 .31939 50 253 9017 .32244 .702070 2.35649 2347 2625 2903 3181 .704848 2.38808 " Corr. 10 A A A 51 15 77 20 103 " 5126 5404 .39128 Corr. .39448 10 54 5682 .39768 15 81 5960.40089 20 107 .699294 2.32551 9572 .32858 " Corr. 9849 .33166 10 5210 .700127 .3347415 78 0404 .33783 20 103 .7C0682 2.34092 30 155 0959 .34403 40 207 1237 .34713 45 233 1514 .35025 50 258 1792 .35336 706238 2.40411 30 161 6516 .40734 40 215 6794 .41057 45 242 7072 41381 50 269 7350 .41705 .707628 2.42030 CORR. FOR SEC. + 10 52 15 78 20 104 30 157 40 209 45 235 50 261 Corr. " Corr. 10 53 15 80 20 106 30 159 40 213 45 239 50 266 .35962 " Corr. Corr. 15 83 20 110 .36276 10 53 10 55 .36590 15 79 .36905 20 105 703458 2.37221 30 158 3736 .37537 40 211 4C14 .37854 45 237 4292 .38171|50 263 4570 .38489 " Corr. 54 15 81 20 108 30 162 30 162 40 217 45 244 50 271 - 11 30 166 40 221 45 248 50 276 "Corr. 10 56 15 84 20 112 30 169 40 225 45 253 50 281 TANGENT 1 3.07768 .08073 .08379 .C8685 .C8991 4 01234 3.09298 .09606 .09914 7 .10223 .10532 6898σ ❤ 5 3.10842 10 .153 11 .11464 12 .11775 13 .1208714 3.12400 15 .12713 16 .13027 17 .13341 18 .13656 19 3.13972 20 .14288 21 .14605 22 .14922 23 .1524C) 24 3.15558 25 .15877 26 .16197 27 .16517 28 .16838 29 3.17159 30 .17481 31 .17804 32 .18127 33 .18451 34 3.18775 35 .191001 36 .19426 37 . 19752 38 .20079 39 3.20406 40 .2073441 .2106342 .21392 43 .21722 44 3.22053 45 .2238446 .22715 47 .23048 48 .23381 49 3.23714 50 .24049 51 .2438352 .2471953 .25055) 54 3.25392 55 .25729 56 .26067 57 .26406 58 .26745 59 3.2708560 534 0.956305 6390 6475 6560 6644 I 234 5E7BQ 0-2MI DON∞α 5.956729 6 8 9 "I 12 10.957151 13 14 16 17 18 19 15.957571 30 21 22 23 24 22 20222 87~M7 ❤❤♪❤ 26 2.7 20.957990 SINE 36 37 38 39 6814 6898 25.958406 8489 8572 8654 8737 6982 7067 30.958820 8902 8985 9067 9150 41 42 43 44 35.959232 9314 9396 9478 9560 46 47 48 49 gགླག༄གྲུཐརྐྱོ 7235 " Corr. 732010 14 740415 7488 20 21 28 40.959642 51 52 53 54 8073 8156 8239 8323 7655 40 56 7739 45 63 7822 50 70 7906 58 59 9724 " Corr. 9805 TO 14 9887 15 20 9968 20 27 45.960050130 50.960456 0537 0618 0698 0779 CORR. FOR SEC. + TABLE XX.-NATURAL SINES, COSINES, 55.960860 56 0940 57 1021 1101 1182 41 013140 54 0212 45 61 0294 50 68 0375 60.961262 COSINE .292372 2094 1815 1537 1259 289589 9310 " Corr. 903210 46 875315 70 8475 20 93 42.288196|30 139 7918 40 186 7639 45 209 7360 50 232 7082 .290980 0702 0424 0146 289867 .286803 6525 6246 5967 5688 .285410 5131 4852 4573 4294 .284015 3736 3458 3178 2900 .282620 2342 2062 1783 1504 CORR. FOR SEC. + .281225 0946 " Corr. 066710 47 0388 15 70 0108 20 93 .278432 8153 7874 7594 7315 .279829 30 140 9550 40 186 9270 45 209 8991 50 233 8712 .277035 6756 6476 6196 5917 .275637 73° VERSINE .707628 2.42030 7906 8185 8463 8741 EXSEC CORR. FOR SEC. + .709020 2.43666 30 164 9298 .43995 40 219 9576 .44324 45 247 9854 44655 50 274 .710133 .44986 .42356 " Corr. .4268310 55 .4301015 82 .43337 20 110 .7104112.45317 0690 .45650 " Corr. 0968 .45983 10 56 1247 .46316 15 84 1525.46651 20 112 .711804 2.46986 30 168 2082 .47321 40 224 .47658 45 252 .47995 50 280 .48333 2361 2640 2918 .713197 2.48671 3475 .49010 "Corr. 3754 .4935010 57 4033 4969115 86 4312.50032 20 114 .714590 2.50374 30 171 4869 .50716 40 228 5148 .51060 45 257 5427 .51404 50 285 5706 .51748 .715985 2.52094 6264.52440 " Corr. 6542 .52787 10 58 6822 .5313415 87 7100.53482 20 117 1009 1288 .717380 2.53831 30 175 7658 .54181 40 233 7938 .54531 45 262 8217 .54883 50 291 8496 .55234 718775 2.55587 9054.55940 Corr. 9333.56294 10 59 9612.56649 15 89 9892.57005 20 119 .720171 2.57361 30 178 0450 .57718 40 238 0730.58076 45 268 .58434 50 297 .58794 .721568 2.59154 3804 4083 1847.59514 " Corr. 2126.59876 10 61 2406.60238 15 91 2685 .60601 20 122 .722965 2.60965 30 182 3244 .61330 40 243 .61695 45 273 .6206150 304 .62428 3524 .724363 2.62796 CORR. FOR SEC. + " Corr. 10 57 15 86 20 115 30 172 40 229 45 258 50 287 " Corr. 10 15 20 117 58 88 30 175 40 234 45 263 50 292 " Corr. 10 59 15 89 20 119 30 179 40 236 45 268 50 298 " Corr. 10 61 15 91 20 122 30 182 40 243 45 273 50 304 " Corr. 10 62 15 93 20 124 30 186 140 248 45 279 50 310 " Corr. 10 63 15 95 20 126 30 190 40 253 45 285 50 316 TANGENT 3.27085 .27426 .27767 .28109 .28452 3.28795 0-231 DO7OK O-232 D 4 5 .29139 6 .29483 .29829 8 .30174 9 3.3052110 .30868 11 .31216 12 .31565 13 .3191414 3.32264 15 .3261416 .32965 17 .33317 18 .3367019 3.34023 20 34377 21 .34732 22 .35087 23 .35443 24 3.35800 25 .36158 26 .36516 27 .36875 28 .37234 29 3.37594 30 .3795531 .38317 32 .38679 33 .39042 34 3.39406 35 .39771 36 .40136 37 .4050238 .40869 39 3.41236 40 .4160441 .41973 42 .42343 43 .4271344 3.43084 45 .43456 46 .43829 47 .4420248 .44576 49 3.44951 50 .45327 51 .45703 52 .46080 53 .4645854 3.46837 55 .47216 56 .47596 57 .47977 58 .48359 59 3.48741 60 535 OU234 BO7BK OI2M4 Borwa 0-234 0.961262 6 8 5.961662 9 11 12 13 14 10.962059 16 17 19 ~~~~~ ~~~~~ ~~~ 15.962455 30 2534 40 2613 45 21 22 23 24 53 59 18 2692 50 66 2770 20.962849 2928 3006 3084 3163 567 26 27 28 29 SINE 25.963241 3319 3397 3475 3553 31 32 33 34 1342 1422 ოოო ოო 1502 1582 1741 1821 36 1900 1980 30.963630 3708 3786 3863 3941 OGNDA HONO. 8 35.964018 4095 4173 37 38 4250 39 4327 2139 " Corr. 2218 10 13 229715 20 2376 20 26 54 56 57 58 59 40.964404 11 41 42 4481 Corr. 4557 TO 13 4634 15 19 44 471 20 25 43 50.965169 5245 5321 45.964787 30 38 46 4864 40 51 47 4940 45 57 48 5016 50 64 49 5093 51 52 53 5397 5473 55.965548 VERSINES, EXSECANTS, AND TANGENTS 74° CORR. FOR SEC. + 5624 5700 5775 5850 60.965926 COSINE .275637 5358 5078 4798 4519 12.72840 2560 " Corr. 2280 TO 47 2000 15 70 172C 20 93 40.271440 30 140 1160 40 187 0880 45 210 0600 50 233 0320 .274239 3959 3679 340C 3120 .270040 269760 • 9480 9200 8920 .268640 8359 8079 7799 7519 1.267238 6958 6678 6397 6117 1.265837 5556 5276 4995 4715 .261628 1347 1066 0785 0504 CORR. FOR SEC. 264434 4154 " Corr. 3873 10 47 359215 70 3312 20 94 .263031 30 140 2751 40 187 2470 45 210 2189 50 234 1908 .260224 259943 + 9662 9381 9100 .258819 VERSINE EXSEC .724363 2.62796 4642 .63164 " Corr. 4922.63533 10 62 52C2 .63903 15 93 5481.64274 20 124 CORR. FOR SEC. + .725761 2.64645 30 186 6041 .65018 40 248 6321.65391 45 279 66CC .65765 50 310 6880.66140 11 .727160 2.66515 744C 7720 8000 .66892 Corr. .67269 10 63 .67647 15 95 8280.68025 20 127 .728560 2.684C5 30 190 8840 .68785 40 254 9120 .69167 45 285 9400 .69549 50 317 9680 .69931 .729960 2.70315 730240 .70700 Corr. 0520 .71085 10 65 0800 .7147115 97 1080 .71858 20 130 .731360 2.72246 30 194 1641 .72635 40 259 1921 .73024 45 292 2201 .73414 50 324 2481 .73806 .732762 2.74198 3603 3883 3C42 .74591 Corr. 3322.74984 10 66 .75379 15 99 .75775 20 132 .734163 2.76171 30 199 4444 .76568 40 265 4724 .76966 45 298 5005 .77365 50 331 5285 .77765 735566 2.78166 5846 .78568 " Corr. 6127 .78970 10 68 6408 .79374 15 102 6688 .79778 20 135 .736969 2.80183 30 203 7249.80589 4C 271 7530.80996 45 3C5 7811 .81404 50 338 8092 .81813 .738372 2.82223 8653.82633 " Corr. 8934 .83045 TO 69 9215 .8345715 104 9496.83871 20 138 .739776 2.84285 30 208 .74C057 .84700 40 277 0338 .85116 45 311 0619 0900 .85951 .85533 50 346 741181 2.86370 CORR. FOR SEC. + " Corr. 10 65 15 97 20 129 30 194 40 258 45 290 50 323 " Corr. IC 66 15 99 20 132 30 198 40 263 45 296 50 329 "Corr. 10 67 15 ICI 20 134 30 202 4C 269 45 303 50 336 "Corr. IG 69 15 103 20 137 30 206 40 275 45 309 150 343 " Corr. 10 70 15 105 20 140 30 210 40 281 45 316 50 351 " Corr. 10 72 15 107 20 143 30 215 40 287 45 322 50 358 TANGENT 3.48741 2 .49125 49509 .49894 3 .50279 Ц 3.50666 .51053 6 .51441 7 .51829 8 .52219 9 5 0-23= 3.5260910 .53COL .53393 12 .53785 13 .5417914 3.54573 15 .54968 16 .55364 17 .5576118 .56159 19 3.56557 20 .5695721 57357 22 .57758 23 .58160 24 3.58562 25 .58966 26 .59370 27 .59775 28 .6018129 3.60588 30 .60996 31 .6140532 .61814 33 .62224 34 3.62636 35 .63048 38 .63461 37 .6387438 .64289 39 3.64705 40 .6512141 .6553842 .65957 43 .66376 44 3.66796 45 .67217 46 .67638 47 .68061 48 .68485 49 3.68909 50 .6933551 .69761 52 .70188 53 .7061654 3.71046 55 .71476 56 .71907 57 • .72338 58 .72771 59 3.73205 60 536 0.965926 01234 5O7∞O 6 8 5.966301 9 OURED COM O DO7°) 8.~❤Z MOMMA DIE DOOD ODORO BONO88 11 12 14 10.966675 16 22 23 24 26 27 31 SINE 20.967415 7489 7562 7636 7709 32 33 34 6001 6076 37 49 15.967046 30 7120 40 719445 56 7268 50 62 7342 25.967782 7856 7929 8002 8075 36 6151 6226 38 30.968148 8220 8293 8366 8438 6376 6451 42 43 44 6526 6600 35.968511 8583 37 8656 46 49 6749 "Corr. 6823 10 6898 15 6972 20 25 53 54 40.968872 8728 8800 50.969588 9659 9730 9801 9872 TABLE XX. -NATURAL SINES, COSINES, 75° CORR. FOR SEC. + 45.969231 30 36 9302 40 48 9374 45 54 9445 50 60 9517 55.969943 56.970014 8944 " Corr. 9016 10 12 9088 15 18 9159 20 24 0084 0155 0225 12 60.970296 OGEN MON L COSINE .258819 8538 8257 7976 7695 .257414 7133 6852 6570 6289 .253195 2914 2632 2351 2069 .256008 5727 "Corr. 5446 10 47 51645 70 4883 20 94 .254602 30 141 4321 40 188 4039 45 211 3758 50 234 3477 251788 1506 1225 0943 0662 .250380 0098 .249817 9535 9253 .248972 8690 8408 8126 7844 CORR. FOR SEC. .244743 4461 4179 3897 3615 + .247563 7281 " Corr. 6999 10 47 671715 70 6435 20 94 246153 30 141 5871 40 188 5589 45 211 5307 50 235 5025 .243333 3051 2768 2486 2204 .241922 VERSINE EXSEC CORR. FOR SEC. + 741181 2.86370 1462.86790 " Corr. 1743 .87211 10 71 2024.87633 15 106 2305 .88056 20 142 .742586 ||2.88479 30 212 2867 .88904 40 283 3148.89330 45 319 3430.89756 50 354 3711.90184. = CORR. FOR SEC. + " Corr. 10 15 110 20 146 .743992 2.90612 4273 .91042 " Corr. 4554.91473 10 72 4836 .91904 15 109 5117.92337 20 145 .745398 2.92770 30 217 5679 5961 30 225 .93204 40 290 40 299 .93640 45 32645 337 6242.94076 50 362 6523.94514. 50 374 3.73205 .73640 73 .74075 .74512 .74950 4 ||30 220 40 293 45 330 ||50 366 11 .09063 Corr. 5821.09535 10 79 6103.1000915 119 6385 .10484 20 159 .756667 3.10960 30 239 6949 .11437 40 318 7232 .11915 45 358 .12394 50 398 7796.12875 7514 .7580783.13357 Corr. 746805 2.94952 7086.95392 31 Corr. 7368.95832 10 74 77 7649.96274| 15 ||| 15 115 7931.96716 20 148 20 153 10 " Corr. 10 75 15 112 20 150 = .748212 2.9716030 22230 230 8494 .97604 40 296 40 306 8775.98050 45 333 9057.98497 50 370 9338.98944| 45 344 50 383 " Corr. 10 82 15 123 20 164 TANGENT 30 246 40 328 45 369 50 410 01234 5 3.75388 .75828 6 .76268 7 .76709 8 .77152 9 3.77595 10 .78040 11 .78485 12 .78931 13 .79378 14 .749620 2.99393 #1 9902.99843 Corr. .750183 3.00293 10 76 0465.00745 15 114 " Corr. 10 78 15 117 45 352 50 391 3.91364 40 11 0747 .01198 20 152 20 157 .751028 3.0165230 22730 235 1310.02107 40 303 40 313 1592 .0256345 341 1874 .03020 50 379 2156 .03479 752437 3.03938 2719.04398 Corr. " Corr. .91839 41 3001.04860 TO 78 10 80.9231642 3283.0532215 116 15 120 .92793 43 3565 .05786 20 155 .9327 44 .753847 3.06251 30 233 3.93751 45 4129 .06717 40 310 .9423246 4411 .07184 45 349 94713 47 4693 .07652 50 388 .95196 48 4975 .08121 .95680 49 .755257 3.08591 5539 20 160 30 240 40 320 45 360 50 400 3.79827 15 .80276 16 .80726 17 .81177 18 .81630 19 3.82083 20 .82537 21 .82992 22 .83449 23 .83906 24 3.84364 25 .84824 26 .85284 27 .85745 28 .86208 29 3.86671 30 .87136 31 .87601 32 .88068 33 .88536 34 3.89004 35 .89474 36 89945 37 .90417 38 .90890 39 3.96165 50 .9665151 .97139 52 .97627 53 .9811754 3.98607 55 .99099 56 .99592 57 4.00086 58 .00582 59 4.01078 60 537 0.970296 1234 5O7OQ 0-234 5O 6 8 5.970647 9 12 13 14 10.970995 16 17 18 19 22222 222~~ ❤❤❤❤❤ mmmmm d=IRE BOND 5885 21 15.971342 30 35 1411 40 46 1480 45 52 1549 50 58 1618 23 234 20.971687 1755 1824 1893 1961 24 5678∞∞ 26 27 28 29 31 25.972029 (32 33 34 36 37 30.972370 2438 2506 38 39 SINE 42 0366 0436 0506 0577 35.972708 2776 2843 2910 2978 43 44 23. LOLOLO5 0716 0786 0856 0926 47 48 49 40.973045 52 53 54 1065 " Corr. 113410 12 120415 17 1273 20 23 2098 2166 2234 2302 56 2573 2641 50.973712 3778 3844 45.973379 30 33 3446 40 44 3512 45 50 3579 50 56 3645 VERSINES, EXSECANTS, AND TANGENTS 76° 55.974042 CORR. FOR SEC. + 3112 " Corr. 3179 10 324615 3312 20 22 3910 3976 4108 57 4173 58 4239 59 4305 60 .974370 • COSINE 241922 1640 1357 1075 0793 240510 0228 .239946 9663 9381 .239098 8816" Corr. 8534 10 47 825115 71 7968 20 94 .236273 5990 5708 5425 5142 .237686 30 141 7403 40 188 7121 45 212 6838 50 235 6556 .234859 4577 4294 4011 3728 .233445 3162 2880 2597 2314 .232031 1748 1465 1182 0899 CORR. FOR SEC. + .227784 7501 7218 6935 6651 .226368 6085 5801 5518 5234 .224951 VERSINE EXSEC 9207 758078 3.13357 8360 .13839 " Corr. 8643 .14323 10 81 8925.1480915 122 .15295 20 163 .759490 3.15782 30 244 .16271 40 326 .760054 .16761 45 367 0337 .17252 50 407 0619 .17744 CORR. FOR SEC. + 11 .760902 3.18238 1184 .18733 Corr. 1466 .19228 10 83 1749 .19725 15 125 2032 .20224 20 167 .762314 3.20723 30 250 2597 .21224 40 334 2879 .21726 45 376 3162 .22229 50 417 3444 .22734 .7637273.23239 4010 .23746 " Corr. 4292 .2425510 85 4575 .24764 15 128 4858 .25275 20 171 5423 5706 5989 .765141 3.25787 30 257 .26300 40 342 .26814 45 385 .27330 50 428 6272.27847 .766555 3.28366 6838 .28885 " Corr. 7120.29406 TO 88 7403 .29929 15 132 7686.30452 20 175 .767969 3.30977 30 263 8252 .31503 40 351 8535 .3203145 395 8818 .32560 50 438 9101.33090 CORR. FOR SEC. + " Corr. 10 84 15 126 20 168 .773632 3.41759 30 277 3915.4231240 369 4199.42867 45 415 4482 .43424 50 461 4766.43982 .775049 3.44541 30 252 40 336 45 378 50 420 " Corr. 10 86 15 129 20 172 30 258 40 344 45 387 50 430 " Corr. 10 88 15 132 20 176 .769384 3.33622 " Corr. .230616 0333 " Corr. 0050 10 47 17.229767 15 71 9667 .34154 " Corr. 9950 .3468910 90 110 92 |.770233 .3522415 135 15 139 9484 20 94 0516 .3576120 180 20 185 .229200 30 142.770800 3.36299 30 270 891740 189 1083 .36839 40 360 8634 45 212 1366 .37380 45 405 8351 50 236 1649 .37923 50 450 8068 1932 .38466 .772216 3.39012 30 264 40 352 45 396 50 440 " Corr. 10 90 15 135 ||20 180 30 270 40 361 45 406 50 451 30 277 40 370 45 416 50 462 2499.39558 "Corr." Corr. 2782 .40106 10 92 110 95 3065 .40656 15 138 15 142 3349 .41206 20 185 120 189 130 284 40 379 45 426 150 474 TANGENT 4.01078 0 .01576 .02074 .02574 .03076 4.03578 .04081 01234 5O789 6 .04586 .05092 8 .05599 4.06107 10 .06616 | .07127 12 .07639 13 .0815214 4.08666 15 .09182 16 .09699 17 .1021618 .10736 19 4.1125620 .11778 21 .12301 22 .12825 23 .13350 24 4.13877 25 .14405 26 .14934 27 .15465 28 .15997 29 4.16530 30 .17064 31 .17600132 ..18137 33 .18675 34 4.19215 35 .19756 38 .20298 37 .20842 38 .21387 39 4.21933 40 .22481 41 .23030 42 .23580 43 .24132 44 4.24685 45 .25239 46 .25795 47 .26352 48 .26911 49 4.27471 50 .28032 51 .28595 52 .29159 53 .2972454 4.30291 55 .30860 56 .31430 57 .32001 58 .32573 59 4.33148 60 538 0.974370 4436 4501 4566 4631 0-237 DONOM O-NMI NON * **70* 8.~♡~ -87.8 -20 222 5.974696 4761 4826 4891 4956 6 7 8 9 10.975020 12 13 14 16 17 18 19 15.975342 30 5406 40 43 5471 45 48 5534 50 53 5598 21 20.975662 5726 5790 5853 5917 22 23 24 26 25.975980 27 28 29 31 32 33 30.976296 34 36 37 38 39 35.976610 41 42 43 44 SINE 46 47 48 8739 23ཤྩg čརྴ 49 40.976922 51 52 5085 "Corr. 5149 10 || 5214 15 16 5278 20 21 53 54 6044 6107 6170 6233 56 45.977231 30 31 7293 40 41 7354 45 46 7416 50 51 7477 57 6359 6422 6484 6547 50.977539 7600 7661 58 59 6672 6735 6797 6859 55.977844 7905 7966 8026 8087 60.978148 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 6984 "Corr. 7046 10 10 7108 15 15 7169 20 21 7722 7783 COSINE .224951 4668 4384 4101 3817 .222116 1832 Corr. 1548 10 47 126515 71 098 20 95 32.22069730 142 0414 40 189 0130 45 213 .219846 50 236 9562 .223534 3250 2967 2683 2399 .219279 8995 8711 8427 8143 .217859 7575 7292 7008 6724 .216440 6156 5872 5588 5304 .215019 4735 4451 4167 3883 CORR. FOR SEC. .210756 0472 0187 .209903 9619 + .213599 33.15 Corr. 3030 10 47 2746 15 71 2462 20 95 .212178 30 142 1893 40 189 1609 45 213 1325 50 237 1040 .209334 9050 8765 8481 8196 .207912 77° VERSINE EXSEC .7750493.44541 5332 .45102 5616 .45664 .46228 5899 6183 46793 776466 3.47360 6750 .47928 .48498 7033 7317 .49069 7601 .49642 .50781 .777884 3.50216 8168 8452 8735 .51947 9019 .52527 .51368 .54863 .55451 .779303 3.53109 9586 .53692 9870 .54277 .780154 0438 .7807213.56041 1005 .56632 1289.57224 1573 .57819 1857 .58414 782141 3.59012 2425 .59611 2708 .60211 2992 .60813 3276 .61417| .783560 3.62023 3844 .62630 4128 .63238 4412 .63849 4696 .64461 784981 3.65074 5265 .65690 5549.66307 5833.66925 6117 .67545 .786401 3.68167 6685 .68791 6970 .69417 7254 || . 70044 7538.70673 .787822 3.71303 8107 .71935 8391.72569 8675 .73205 8960.73843 .789244 3.74482 9528 .75123 9813.75766 .76411 0381.77057 790097 790666 3.77705 0950 .78355 1235.79007 1519.7966| 1804.80316 .792088 3.80973 DIFF. 10" 93.5 93.7 94.0 94.2 94.5 94.7 95.0 95.2 95.5 95.7 95.8 96.2 96.5 96.7 97.0 97.2 97.5 97.7 98.0 98.3 98.5 98.7 99.2 99.2 99.7 99.8 100.0 100.3 100.7 101.0 101.2 101.3 101.8 102.0 102.2 102.7 102.8 103.0 103.3 103.7 104.0 104.3 104.5 104.8 105.0 105.3 105.7 106.0 106.3 106.5 106.8 107.2 107.5 107.7 108.0 108.3 108.7 109.0 109.2 109.3 95.8 96.2 96.5 96.7 96.8 97.2 97.3 97.7 98.0 98.0 98.5 98.7 98.8 99.2 99.3 99.7 100.0 100.2 100.5 100.7 101.0 101.2 101.5 101.7 102.0 102.3 102.5 102.8 103.2 103.3 103.7 103.8 104.2 104.5 104.7 105.0 105.3 105.5 105.8 106.2 106.3 106.7 107.0 107.3 107.5 107.8 108.2 108.3 108.8 109.0 109.2 109.7 109.8 110.2 110.5 110.8 111.0 111.5 11.7 112.0 TANGENT 4.33148 0 .33723 1 34300 2 :34879 3 .35459 · 4.36040 5 .36623 6 .37207 7 .37793 8 .38381 9 4.38969 10 .39560 11 .40152 12 • 4.41936 15 42534 16 43134 17 · 40745 13 41340 14 43735 18 .44338 19 · 4.44942 20 .45548 21 .46155 22 46764 23 .47374 24 · 4.47986 25 .48600 26 .49215 27 .49832 28 .5045! 29 4.51071 30 .5169331 .52316 32 .52941 33 .53568 34 4.54196 35 .54826 36 .55458 37 .5609 38 .56726 39 4.57363 40 .5800141 .58641 42 .59283 43 .59927 44 4.6057245 .6121946 .61868 47 .62518 48 .63171 49 4.63825 50 .64480 51 .65138 52 .6579753 .66458 54 4.6712155 .67786 56 .68452 57 .69121 58 .69791 59 4.70463 60 539 0.978148 8208 8268 8329 8389 1234 5.978449 6678σ 9 01234 10.978748 11 12 13 14 56789 0-234 16 17 18 15.97904630 30 9105 40 40 9164 45 44 9223 50 49 9282 19 22222 22~~~ ~~~~Õ HAMMA DE22 8700 20.979341 21 23 9399 9458 9517 9575 25.979634 9692 9750 9809 9867 24 5678 26 27 28 29 31 33 34 30.979925 9983 32.98C040 C098 0156 36 37 SINE 35.980214 0271 C329 0386 0443 38 39 41 42 43 44 8509 8569 8629 8689 55555 40.980500 0558 C615/10 0672 15 C728 20 46 47 8808 "Corr. 8867 10 10 8927 15 15 8986 20 20 48 49 45.980785 30 08421 40 0899 45 0955 50 1012 51 52 53 54 50.981068 1124 1180 1237 1293 56 57 58 59 CORR. FOR SEC. + 55.981349 1404 1460 1516 1572 VERSINES, EXSECANTS, AND TANGENTS 78° 60.981627 " Corr. 9 14 Corr 19 2333 28 38 43 47 COSINE .207912 7627 7343 7058 6773 .206489 6204 592C 5635 535C .205066 4781 " Corr. 4496 | 10 47 4211 15 71 3926 20 95 202218 1933 1648 1363 1078 .203642 30 142 3357 40 190 3072 45 214 2787 50 237 2502 .200793 0508 0223 .199938 9653 .199368 9083 8798 8513 8228 .197942 7657 7372 7C87 6802 .196517 CORR. FOR SEC. + 6231 " Corr. 5946 TC 48 5661 15 71 5376 20 95 .193664 3378 3093 2807 2522 .192236 1951 1666 1380 IC94 .190809 VERSINE 792088 3.80973 2373.81633 2657.82294 2942 .82956 3227.83621 793513.84288 3796 .84956 4080.85627 4365 .86299 4650.86973 EXSEC 794934 3.87649 5219.88327 5504.89007 5789 .89689 6074 .90373 .796358 3.91058 6643 .91746 6928 .92436 7213 .93128 7498.93821 .797782 3.94517 8067 .95215 2352.95914 8637.96616 8922.97320 .799207 3.98025 9492.98733 9777 .99443 .800062 4.00155 0347 .00869 .800632 4.01585 0917 .023C3 1202 .03024 1487 .03746 1772 .04471 8020584.05197 2343 .05926 2628 .06657 2913 .07390 3198 .08125 .195090 30 143.804910 4.12583 4805 40 190 4520 45 214 4234 50 238 3949 .8C3483 4.08863 3769 .09602 4054 .10344 4339 4624 .11835 .11088 5195 .13334 5480 .14087 5766 6051 6622 6907 7193 .14842 .15599 .806336 4.16359 .17121 .17886 .18652 7478.19421 .8077644.20193 8049 .20966 8334 .21742 8620 .22520 8906 .23301 .809191 4.24084 DIFF. 10" 110.0 112.3 110.2 112.7 110.3 112.8 110.8 111.2 111.3 111.8 112.0 112.3 112.7 113.0 113.3 113.7 114.C 114.2 114.7 115.0 115.3 115.5 116.0 118.0 118.3 118.7 119.0 119.3 119.7 120.2 120.3 120.8 121.C 121.5 121.8 116.3 116.5 117.0 119.5 122.2 122.5 123.0 117.3 119.7 117.5 120.0 123.2 123.7 124.0 124.5 124.7 125.2 125.5 125.8 126.2 126.7 127.0 127.5 113.3 113.5 127.7 128.2 128.7 113.8 114.2 114.5 114.8 115.2 128.8 129.3 129.7 130.2 130.5 115.3 115.8 116.2 116.3 116.8 117.0 117.3 117.8 118.0 118.3 118.8 119.0 120.5 120.8 121.0 121.5 121.8 122.2 122.5 122.8 123.2 123.5 124.0 124.2 124.7 125.0 125.3 125.8 126.0 126.5 126.8 127.2 127.5 128.0 128.3 128.7 129.2 129.3 129.8 130.3 130.5 131.0 131.5 131.7 132.2 132.7 132.8 肇 ​TANGENT 4.70463 .71137 .71813 2 .72490 .73170 4 01234 4.73851 5 .74534 6 75219 7 .75906 8 .76595 9 4.77226 10 .77978 11 .78673 12 .7937C 13 .80068 14 4.80769 15 .81471 16 .82175 17 .82882 18 .83590 19 4.84300 20 .85013 21 .85727 22 .86444 23 .87162 24 4.87882 25 .88605 26 .89330 27 .90056 28 .90785 29 4.91516 30 .92249 31 .92984 32 .93721 33 .94460 34 4.95201 35 .95945 36 .96690 37 .97438 38 .98188 39 4.98940 40 .99695 41 5.00451 42 .01210 43 .019744 5.0273445 .03499 46 .04267 47 .05037 48 .05809 49 5.06584 50 .07360 51 .08139 52 .08921 53 .0970454 5.10490 55 .11279 56 .12069 57 .12862 58 .13658 59 5.14455 60 540 01.981627 1234 5O7 6 8 9 5.981904 0-232 5O7ɑa || 12 13 124 10.982178 16 17 18 19 21 22 NA DANO0 870M2 CON DE 99700 850HZ HONOR 8 23 24 26 5.982450 30 27 2505 40 36 2559 45 2613 50 45 2667 20.982721 2774 2828 2882 2935 27 28 29 31 25.982989 3042 3096 3149 3202 32 33 34 36 30.983255 3308 3361 3414 3466 37 38 39 SINE 41 1683 1738 42 1793 1848 35.983519 3572 3624 3676 3729 43 44 1959 2014 46 2069 2123 40.983781 47 48 49 51 2233 228710 234215 2396 20 45.984041 58 50.984298 4350 4401 4452 4503 CORR. FOR SEC. + 55.984554 4605 4656 4707 4757 TABLE XX.-NATURAL SINES, COSINES, " Corr. " Corr. 3833 3885 TO 9 3937 15 13 3989 20 17 60.984808 FEWN TÕEL 30 26 4092 40 35 414445 39 4196 50 4247 43 14 COSINE .190809 0523 0238 .189952 9667 .189381 9095 8810 8524 8238 .185095 4809 4523 4237 3951 .187953 7667 " Corr. 738110 48 709615 71 6810 20 95 .186524 30 143 6238 40 190 5952 45 214 5667 50 238 5381 .183665 3380 3094 2808 2522 .182236 1950 1664 1377 1091 180805 0519 0233 CORR. FOR SEC. .176512 6226 5940 5653 5367 + .179947 9661 .179375 9088 " Corr. 8802 TO 48 8516 15 72 8230 20 95 .177944 30 143 7657 40 191 737145 215 7085 50 239 6798 .175080 4794 4508 4221 3935 .173648 79° VERSINE EXSEC .8091914.24084 9477 .24870 9762 .810048 .25658 .26448 0333 .27241 .810619 4.28036 0905 .28833 1190 .29634 1476.30436 1762 .31241 .812047 4.32049 2333 .32859 2619.33671 2904 .34486 3190 .35304 .813476 4.36124 3762 .36947 4048 .37772 4333 .38600 4619.39430 .8149054.40263 5191 .41099 5477.41937 5763 .42778 6049 .43622 .8163354.44468 6620 .45317 6906 .46169 7192 .47023 7478 .47881 .817764 4.48740 · 8050 49603 8336.50468 8623 .51337 8909.52208 .819195 4.53081 9481 .53958 9767.54837 .820053 .55720 0339 .56605 .820625 4.57493 0912.58383 1198.59277 1484.60174 1770 .61073 .62881 |.822056 4.61976 2343 2629 2915 .64701 3202.65616 .63790 .823488 4.66533 3774 .67454 4060 .68377 4347.69304 4633 .70234 .824920 4.71166 5206 .72102 5492 .73041 5779 .73983 6065 74929 .826352 4.75877 DIFF. 10" 131.0 133.5 131.3 133.7 131.7 134.2 132.2 134.7 132.5 134.8 132.8 133.5 133.7 134.2 134.7 135.0 135.3 135.8 136.3 136.7 139.3 139.7 140.2 140.7 141.0 141.5 142.0 142.3 143.0 143.2 137.2 139.7 140.0 140.3 137.5 138.0 138.3 140.8 138.8 141.3 146.2 146.5 147.2 147.5 148.0 148.3 149.0 149.5 149.8 150.5 150.8 151.5 151.8 152.5 152.8 135.5 135.7 136.3 153.5 153.8 154.5 155.0 155.3 136.5 137.0 143.8 146.2 144.2 146.7 144.8 147.2 145.2 147.7 145.5 148.0 156.0 156.5 157.0 157.7 158.0 137.5 137.8 138.3 138.7 139.2 141.7 142.2 142.7 143.0 143.5 144.0 144.3 144.8 145.3 145.8 148.5 149.0 149.5 150.0 150.5 150.8 151.3 152.0 152.3 152.8 153.3 154.0 154.3 154.8 155.3 155.8 156.3 156.8 157.5 157.8 158.5 158.8 159.5 160.0 160.5 TANGENT 5.14455 .15256 1 .16058 2 .16863 .1767! L བ-ས་པ་ 5.18480 F .19293 € .20107 .20925 8 .21744 9 5.22566 10 .2339111 .24218 12 .25048 13 .25880 14 BENB σ 5.2671515 .27553 16 .28393 17 .29235 18 .30080 19 5.30928 20 .31778 21 .32631 22 .33487 23 .34345 24 5.35206 25 .36070 26 .36936 27 .37805 28 .38677 29 5.39552 30 .4042931 .4130932 .42192 33 .43078 34 5.43966 35 .44857 36 .4575137 .46648 38 .47548 39 5.48451 40 .4935641 .5026442 .51176 43 .52090 44 5.53007 45 .53927 46 .5485147 .55777 48 .5670649 5.57638 50 .5857351 .5951 52 .60452 53 .61397 54 • 5.6234455 .63295 56 64248 57 .65205 58 .6616559 5.67128 60 541 0.984808 4858 4909 4959 5009 1 234 56789 5.985059 01234 DO789 O 10.985309 11 12 13 14 5358 " Corr. 5408 10 8 5457 15 12 5507 20 16 15.985556 30 25 5605 40 33 5654 45 37 5704 50 41 5752 16 17 18 ~~~~~ ~ 19 20.985801 21 22 5850 5899 5948 5996 25.986044 6093 6141 *** ***** 8~~♡~ 23 24 26 27 28 29 31 32 33 34 5 £5555 @www. 30.986286 6334 6382 6429 6477 36 37 38 39 35.986525 6572 6620 41 42 43 44 SINE 40.986762 46 47 go to 5: 5109 5159 48 49 5209 5259 52 53 54 45.986996 30 7043 40 7090 45 7136 50 7183 g g⌘ཐg¢ 6189 6238 56 50.987229 7275 7322 7368 7414 57 58 59 6667 6714 55.987460 7506 7551 7597 7643 6809 6856 10 6903 15 6950 20 CORR. FOR SEC. + VERSINES, EXSECANTS, AND TANGENTS 80° 60.987688 " Corr. 8 12 16 COSINE 31 35 .173648 3362 3075 2789 2502 .172216 1929 1642 1356 1069 .167916 7629 7342 7C56 6769 .166482 6195 5908 5621 5334 .17C783 0496 " Corr. 0210 10 48 .169923 15 72 9636 20 96 .169350 30 143 9C63 40 191 8776 45 215 8489 50 239 8203 .165048 4761 4474 4187 3900 .163613 3326 3039 2752 2465 - .162178 1891 " Corr. 16C4 TO 48 1317 15 72 1030 20 96 23.160743 30 144 0456 40 191 016845 215 39.15988150 239 9594 .159307 9020 8732 8445 8158 CORR. FOR SEC. .157871 7584 7296 7009 6722 .156434 + VERSINE EXSEC .826352 4.75877 6638.76829 6925 .77784 7211 .78742 7498.797C3 8931 .827784 4.80667 8C71 .81635 8358 .82606 8644.83581 .84558 .829217 4.85539 9504.86524 9790 .875|| .830077.88502| 0364.89497 .8306504.90495 0937.91496 1224.92501 1511.93509 1797.94521 .8320844.95536 2371.96555 2658 .97577 2944.98603 3231.99633 .833518 5.CC666 3805 .01702 4092 .02743 4379.03787 .04834 4666 .8392575.22113 9544 .23226 9832.24343 .840119 .25464 0406 .26590 .84C693 5.27719 0980 .28853 1268 .2999| 1555 .31133 1842 .32279 DIFF. 10" .842129 5.33429 2416 .34584 27C4 .35743 2991 .36906 3278 .38073 .843566 5.39245 158.7 161.0 159.2 161.7 159.7 162.2 160.2 162.7 160.7 163.2 161.3 161.8 162.5 162.8 163.5 .8349525.05886 5239.06941 5526 .08000 5813.09062 6100 .10128 .836387 5.11199 6674 .12273 6961.13350 7248 .14432 7535 .15517 182.2 .837822 5.16607 8109 .17700 8396.18797 8683 .19898 8970 .21004 184.3 182.8 183.7 184.8 164.2 164.5 167.7 165.2 165.8 168.2 166.3 168.8 172.7 173.5 174.0 174.5 175.3 166.8 169.3 167.5 169.8 168.0 170.5 168.7 171.2 169.3 171.5 169.8 170.3 171.0 171.7 174.2 172.2 174.5 175.8 176.5 177.0 177.7 178.5 179.0 179.5 180.3 180.8 181.7 185.5 186.2 163.7 164.3 186.8 187.7 188.2 164.8 165.3 166.0 189.0 189.7 190.3 191.0 191.7 166.5 167.0 192.5 193.2 193.8 194.5 195.3 172.3 172.8 173.3 175.3 175.8 176.3 177.0 177.7 178.3 179.0 179.5 180.2 180.7 181.5 182.0 182.8 183.3 184.0 184.7 185.3 185.8 186.7 187.3 188.0 188.7 189.3 190.0 190.7 191.3 192.0 192.8 193.5 194.2 194.8 195.7 196.3 197.0 197.7 TANGENT 5.67128 .68094 .69064 .70037 .71013 5.71992 01234 5 .72974 6 .73960 7 .74949 8 .75941 9 5.76937 10 .77936 IE .78938 12 .7994413 .80953 14 5.81966 15 .82982 16 .84001 17 .85024 18 .86051 19 5.8708020 .88114 21 .89151 22 .90191 23 .91236 24 5.92283 25 .93335 26 .9439027 .95448 28 .96510 29 5.9757630 98646 31 .99720 32 6.00797 33 .01878 34 6.02962 35 .0405136 .0514337 .06240 38 .07340 39 6.08444 40 .0955241 .1066442 .1177943 .1289944 6.1402345 .1515146 .16283 47 .17419 48 .18559 49 6.1970350 .20851 51 .22003 52 .23160 53 .2432154 6.2548655 .26655 56 .27829 57 .29007 58 .30189 59 6.31375 60 542 - 0.987688 7734 7779 7824 7870 OI23A BON89 6 7 1234 10.988139 || 12 13 14 16 17 18 19 22222 21 15.988362 30 8406 40 29 8450 45 33 8494 50 37 8538 20.988582 22 23 24 ~~~~~ AMM❤~ ❤❤♪❤. DIE OO9 85087 ONOO O 26 27 25.98880C 8843 8886 893C 8973 28 29 234 32 33 30.989016 9059 9102 9144 9187 34 36 37 38 39 35.989230 9272 9315 9357 9399 SINE 41 42 43 44 .987915 7960 8005 8050 8094 46 47 40.989442 48 49 51 52 8184 " 8228 10 Corr 8273 15 || 8317 20 15 8626 8669 8713 8756 53 45.989651 30 21 9693 40 28 9735 45 31 9776 50 35 9818 50.989859 9900 9942 9983 56 57 58 59 54.990024 55.990065 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 9484 " Corr. 9526 10 7 9568 15 10 9610 20 14 0106 0146 0187 0228 60.990268 COSINE .156434 6147 5860 5572 5285 11 .153561 3273 Corr. 2986 10 48 2698 15 72 2411 20 96 22.152123 30 144 1836 40 192 1548 45 216 1261 50 240 0973 .154998 4710 4423 4136 3848 .150686 0398 0111 .149823 9535 .149248 8960 8672 8385 8097 .147809 7522 7234 6946 6658 .146371 6083 5795 5508 5220 .144932 CORR. FOR SEC. 4644 " Corr. 4356 10 48 4068 15 72 3780 20 96 .143493 30 144 3205 40 192 2917 45 216 2629 50 240 2341 .142053 1765 1477 1189 0901 .140613 0325 0037 + .139749 9461 .139173 81° VERSINE 843566 5.39245 3853 .40422 4140 .41602 4428 .42787 4715.43977 845002 5.45171 5290.46369 5577 .47572 5864 .48779 6152 .49991 EXSEC .846439 5.51208 6727 7014 7302 .52429 .53655 54886 7589 .56121 .849314 5.63633 9602 .64902 .66176 9889 .850177 .850752 5.70027 .71321 .72620 .73924 .75233 1040 1328 207.5 .847877 5.57361 8164 .58606 8452 .59855 208.2 8739 9027 .61110 209.2 .62369 209.8 210.7 1615 1903 211.5 212.3 213.0 .67454 0465 .68738 214.0 214.8 .8521915.76547 2478 .77866 2766 .79191 3054 .80521 3342 .81856 .853629 5.83196 4492 .87250 4780 .88612 855068 5.89979 5356.91352 5644 5932 6220 .92731 .94115 .955C5 .856507 5.96900 6795 7083 .98301 .99708 7371 6.CI 120 7659 .02538 857947 6.03962 DIFF. 10" 9963 .860251 0539 196.2 198.5 196.7 199.2 197.5 200.0 198.3 200.7 199.0 201.5 3917 .84542 224.3 4205.85893 225.2 226.2 227.0 227.8 859387 6.11171 9675.12630 199.7 200.5 201.2 202.0 202.8 203.5 204.3 205.2 205.8 206.7 .14096 .15568 .17046 .860827 6.18530 215.7 216.9 217.3 218.2 219.0 219.8 220.8 221.7 222.5 223.3 8235 .05392 238.3 8523 .06828 239.3 8811 .08269 240.2 9099 .09717 241.3 242.3 228.8 229.8 230.7 231.7 232.5 233.5 234.5 235.3 236.3 237.3 243.2 244.3 245.3 246.3 247.3 2C2.2 202.8 203.7 204.5 205.2 206.0 206.8 207.5 208.4 209.0 210.0 210.7 211.5 212.3 213.0 2.4.0 214.7 215.7 216.3 217.3 218.0 218.8 219.8 220.7 221.5 222.3 223.2 224.0 225.0 225.8 226.8 227.5 228.7 229.3 230.3 231.3 232.2 233.2 234.0 235.0 236.0 236.8 237.8 238.8 239.7 240.8 241.7 242.7 243.8 244.7 245.7 246.7 247.8 248.7 249.8 TANGENT 1 6.31375 0 .32566 I .33761 2 .34961 3 .36165 4 6.37374 5 .38587 6 39804 7 .41026 8 .42253 9 6.43484 10 .44720 1 .4596 12 .47206 13 .48456 14 6.49710 15 .50970 16 .52234 17 .53503 18 .54777 19 6.56055 20 .57339 21 .58627 22 .59921 23 .61219 24 6.62523 25 .63831 26 .65144 27 .66463 28 .67787 29 6.6911630 .70450 31 .71789 32 .73133 33 .74483 34 6.75838 35 .77199 36 .78564 37 .7993638 .8131239 6.82694 40 .8408241 .85475 42 .86874 43 .88278 44 6.89688 45 .9110446 .92525 47 .93952 48 .9538549 6.96823 50 .98268 51 .99718 52 7.01174 53 .02637 54 7.04105 55 .05579 56 .07059 57 .08546 58 .10038 59 7.1153760 543 0.990268 0308 C349 0389 0429 0123→ 4 66700 01ZMI DODOO 20 5.990469 0510 0549 0589 0629 8 9 10.990669 12 13 14 16 17 15.990866 30 18 19 COME DONE0 87037 ❤❤ I DO 87 KONAX 8 20.991061 21 22 23 ~~~~ 24 26 25.991254 27 28 29 SINE 31 32 33 34 36 30.991445 1483 1521 1558 1596 37 38 39 " Corr. 0708 0748 10 7 0787 15 10 0827 20 13 20 0905 40 26 0944 45 29 0983 50 33 1022 35.991634) 1671 1709 1746 1783 441 42 43 44 1100 1138 1177 1216 49 1292 1331 1369 1407 40.991820 1857 1894 10 1931 15 1968 20 54 45.992005| 30 2042 40 207845 CORR. FOR SEC. + 50.992187 2224 226C VERSINES, EXSECANTS, AND TANGENTS 82° 2296 2332 55.992368 2404 2439 2475 2511 60.992546 " Corr. 6 28 2115 50 31 2151 DON 250. 12 COSINE .139173 8885 8597 8309 8021 137733 7444 7156 6868 6580 .133410 3121 2833 2545 2256 .136292 " Corr. 6004 48 5716 10 5427 15 72 5139 20 96 .13485130 144 4563 40 192 427445 216 3986 50 240 3698 .131968 1680 1391 1103 0815 .130526 0238 . 129949 9661 9372 127642 " Corr. 7353 7065 10 48 6776 15 72 6488 20 96 18.12619930 129084 8796 8507 8219 7930 CORR. FOR SEC. .124756 4467 4179 + 144 5910 40 192 5622 45 216 5333 50 241 5045 3890 3602 .123313 3024 2736 2447: 2158 .121869 VERSINE .860827 6.18530 1115 .20020 1403 .21517] 1691 .23019, 1979 .24529 EXSEC 862267 6.26044 2556 .27566 2844 .29095| 3132 .30630 3420 .32171 .863708 6.33719 3996 .35274 4284 .36835 4573 .38403 4861 .39978 865149 6.41560 5437 .43148 5726 .44743 6014 .46346 6302 .47955 .866590 6.49571 6879 .51194 7167 .52825 7455 .54462 7744 .56107 .868032 6.57759 8320 .59418 8609 .61085 8897 .62759 9185 .64441 .869474 6.66130| 9762 .67826 .69530 0339 .71242 0628 .72962 .870051 .8709166.74689 1204 .76424 1493 .78167 1781 .79918 2070 .81677 .872358 6.83443 2647 .85218 2935 .87001 3224 .88792| 3512 .90592 .873801 6.92400 4090 .94216 4378.96040 4667.97873 .99714 .875244 7.01564 5533 .03423 5821 .05291 4955 6110 .07167 6398 .09052 .876687 7.10946 DIFF. 10" 6976 7264 7553 .16681 7842 .18612 .878131 7.20551 248.3 249.5 250.3 251.7 252.5 253.7 254.8 255.8 256.8 258.0 259.2 260.2 261.3 262.5 263.7 264.7 265.8 267.2 268.2 269.3 270.5 271.8 272.8 274.2 275.3 276.5 277.8 279.0 280.3 281.5 282.7 284.0 285.3 286.7 287.8 289.2 290.5 291.8 293.2 294.3 295.8 297.2 298.5 300.0 301.3 302.7 304.0 305.5 306.8 308.3 309.8 311.3 312.7 314.2 315.7 .12849 317.2 .14760 318.5 320.2 321.8 323.2 250.8 251.8 253.0 253.8 255.2 256.0 257.2 258.3 259.3 260.5 261.5 262.7 263.7 265.0 266.0 267.2 268.3 269.5 270.7 271.8 273.0 274.2 275.3 276.5 277.8 279.0 280.2 281.5 282.8 283.8 285.3 286.3 287.8 289.0 290.3 291.2 293.0 294.2 295.7 296.8 298.3 299.5 301.0 302.3 303.7 205.2 306.5 308.0 309.3 310.7 312.3 313.7 315.0 316.7 318.0 319.7 321.0 322.7 324.2 325.7 TANGENT 7.11537 .13042 .14553 2 .16071 0123➡ .17594 4 7.19125 5 .20661 6 .22204 7 .23754 8 .25310 9 7.26873 10 28442 11 .30018 12 .31600 13 .3319014 7.34786 15 36389 16 .37999 17 .39616 18 .41240 19 7.42871 20 .44509 21 .46154 22 .47806 23 .49465 24 7.51132 25 .52806 26 .54487 27 .56176 28 .57872 29 7.5957530 .61287 31 .63005 32 .64732 33 .66466 34 7.68208 35 .69957 36 .71715 37 .73480 38 .75254 39 7.77035 40 .78825 41 80622 42 .82428 43 .84242 44 7.86064 45 .87895 46 .89734 47 .91582 48 .93438 49 7.95302 50 .97176 5! .99058 52 8.0094853 .02848 54 8.04756 55 .06674 56 .08600 57 .10536 58 .12481 59 8.14435 60 544 0.992546 01231 5O7BO 6 5.992722 8 9 || 12 13 14 233 10.992896 BOO CO2 PON** 8~~M7 HOMMA DIRE DE 85885 16 17 21 15.993068 30 22 23 24 20.993238 3272 3306 3339 3373 26 27 28 29 25.993406 3440 3473 3506 3539 31 32 33 34 SINE 30.993572 3605 3638 3670 3703 36 37 2582 2617 2652 2687 38 39 2757 2792 2827 2862 35.993736 3768 3800 3833 3865 241 42 43 44 46 47 48 49 1 2931 Corr. 2966. 10 3000 15 3034 20 11 40.993897 53 54 56 57 58 59 3103 40 23 3137 45 26 3171 50 29 3204 45.994056|30 50.994214 4245 4276 CORR. FOR SEC. + TABLE XX.-NATURAL SINES, COSINES, 4307 4338 55.994369 4400 4430 4461 4491 " Corr. 3929 396110 5 3993 15 8 4025 20 II 6 60.994522 9 16 4088140 21 4120 45 24 4151 50 26 4182 COSINE .121869 1581 1292 1003 0714 .120426 0137 .119848 9559 9270 .118982 " Corr. 8693 8404110 48 811515 72 7826 20 96 .116093 5804 5515 5226 4937 .114648 4359 4070 3781 3492 .113203 2914 2625 2336 2047 .111758 1469 1180 0891 C602 CORR. FOR SEC. 17.117537 30 144.882463 7.50793 7248 40 193 6960 45 217 6671 50 241 6382 944515 72 9156 20 96 .10886730 145 8578 40 193 8288 45 217 7999 50 241 7710 .107421 7132 6842 6553 6264 .105975 5686 5396 5107 4818 .104528 83° VERSINE EXSEC .878131 7.20551 8419 .22500 324.8 8708 .24457 8997 .26425 326.2 328.0 9286 .28402 .879574 7.30388 .32384 9863 .880152 .3439C 0441 .36405 0730 .38431 .881018 7.40466 1307 .42511 1596 .44566 1885 .46632 2174 .48707 2752.52889 3040 .54996 3329 .57113 3618.59241 .8839077.61379 4196 .63528 4485 .65688 4774 .67859 5063.70041 .885352 7.72234 5641 .74438 5930 .76653 6219 .78880 6508 .8!!!8 .886797 7.83367 7086 .85628 7375 .87901 .90186 7664 7953.92482 .8882427.94791 8531 .97111 8820.99444 9109 8.01788 9398 .04146 DIFF. 10" .891133 8.18553 1422 .20999 1712 .23459 2001 .25931 2290 .28417 .8925798.30917 2868 .33430 3158 .35957 3447 .38497 3736.41052 894025 8.43620 4314.46203 4604 .48800 4893 .51411 5182 .54037 895472 8.56677 329.5 331.0 332.7 334.3 335.8 337.7 339.2 340.8 342.5 344.3 345.8 347.7 349.3 351.2 352.8 354.7 256.3 358.2 360.C 361.8 363.7 365.5 367.3 369.2 371.2 373.0 374.8 .110313 .8896878.06515 399.2 0023 " Corr. 397.0 9977.08897 .109734 10 48.890266 .11292 .13699 0555 0844 .16120 376.8 378.8 380.8 386.7 388.8 401.2 403.5 405.5 4C7.7 410.0 412.0 414.3 416.7 327.2 328.7 330.3 332.0 333.5 418.8 421.2 423.3 425.8 428.0 335.0 336.8 430.5 432.8 435.2 437.7 440.0 338.3 340.0 341.7 343.2 345.0 379.2 381.3 383.2 382.7 385.2 384.8 387.2 346.7 348.3 350.2 389.2 391.2 390.7 393.3 395.2 393.0 394.8 397.5 351.8 353.5 355.2 357.2 358.8 360.5 362.5 364.2 366.2 367.8 369.8 371.7 373.5 375.5 371.3 399.3 401.7 403.7 405.8 407.8 410.2 412.3 414.7 416.7 419.0 421.3 423.5 425.8 428.3 430.5 432.8 435.2 437.7 440.0 442.5 TANGENT 0 8.14435 .16398 1 .18370 2 .20352 3 .22344 4 8.24345 5 .26355 6 .28376 7 .30406 8 .32446 9 8.34496 10 .36555 11 .38625 12 40705 13 .42795 14 8.44896 15 .4700716 .4912817 51259 18 .53402 19 8.55555 20 .5771821 .59893 22 .62078 23 .64275 24 8.66482 25 .68701 26 7C931 27 .73172 28 .75425 29 8.77689 30 .79964 31 .82252 32 .84551 33 .86862 34 8.89185 35 .9152036 .93867 37 .96227 38 .98598 39 9.00983 40 .0337941 .05789 42 .0821 43 .10646 44 9.13093 45 .15554 46 .18028 47 .20516 48 .2301649 9.25530 50 .28058 51 .30599 52 .33154 53 .35724 54 9.38307 55 .40904 56 .43515 57 .46141 58 .4878 59 9.51436 60 545 1 0.994522 1234 56700 0-234 5 8 9 5.994673 11 12 13 10.994822 14 16 17 6 666 6ººº 55555 £55±5 88*** wwwww ~*~*~ IN TOD 18 21 22 23 24 26 15.994968 30 4998 40 5027 45 22 5056 50 24 5084 20.995113 5142 5170 5199 5227 27 28 29 25.995256 5284 5312 5340 5368 31 32 33 34 30.995396 5424 5452 5480 5507 36 37 38 39 SINE 35.995534 5562 5589 5616 5644 41 4552 4582 42 4613 4643 43 44 4703 4733 4762 4792 40.99567! 46 47 48 49 4851 4881 10 4910 15 4939 20 52 54 59 50.995937 5963 5989 6015 6041 45.995805 30 13 5832 40 18 5858 45 20 5884 50 22 5911 ga 55.996067 6093 6118 6144 6169 VERSINES, EXSECANTS, AND TANGENTS 84° CORR. FOR SEC. + 60.996195 4 5698 " Corr. 5725 10 5752 15 7 5778 20 9 Corr. 5 7 10 15 COSINE .IC4528 4239 3950 3660 3371 .101635 1346 " Corr. 1056 10 48 0767 15 72 C478 20 96 .ICC188 30 145 20.099899 40 193 9609 45 217 9320 50 241 9030 .103082 2792 2503 2214 1924 .098741 8451 8162 7872 7583 .097293 7004 6714 6425 6135 .095846 5556 5267 4977 4688 .094398 4108 3819 3529 3240 .090053 .089764 CORR. FOR SEC. 092950 2660 " Corr. 2371 10 48 2081 15 72 1791 20 97 .091502 30 145 1212 40 193 0922 45 217 0633 50 241 0343 9474 9184 8894 + .088605 8315 8025 7735 7446 .087156 VERSINE EXSEC .8954728.56677 5761 .59332 6050 .62002 634C .64687 6629.67387 896918 8.70103 7208 .72833 7497 .75579 7786 .78341 8076 .81119 .8983658.83912 8654 .86722 8944.89547 9233 .92389 9522.95248 .899812 8.98123 900101 9.01015 0391 .03923 0680 .06849 0970 .09792 .9012599.12752 1549 .15730 1838 .18725 2128 .21739 2417.24770 .902707 9.27819 2996 .30887 3286 .33973 3575 .37077 3865 .40201 .9041549.43343 4444 .46505 4733 .49685 5023 .52886 5312.56106 905602 9.59346 5892 .62605 6181.65885 6471 .69186 6760 .72507 907050 9.75849 7340 .79212 7629 .82596 7919 .86001 8209 .89428 908498 9.92877 8788.96348 9078.99841 9367 10.0336 9657 .0689 90994710.1045 .910236 .1404 0526 .1765 C816 .2128 1106 .2493 .911395 10.2861 1685 .3231 1975 .3604 2265 .3979 2554 .4357 .912844 10.4737 DIFF. 10" 442.5 445.0 445.0 447.5 447.5 449.8 450.0 452.5 452.7 455.0 455.0 457.7 460.3 463.1 465.5 468.3 470.8 473.7 476.5 479.2 482.0 484.7 487.7 490.5 493.3 496.3 499.2 5C2.3 505.2 508.2 511.3 514.2 517.3 520.7 523.7 527.0 530.0 533.5 536.7 540.0 543.2 546.5 550.2 553.5 557.0 560.5 564.C 567.5 571.2 574.8 578.5 582.2 58.8 59.3 59.8 60.2 60.5 60.8 61.3 61.7 62.2 62.5 63.C 63.3 457.5 460.2 462.7 465.3 468.0 470.7 473.5 476.0 478.8 481.7 484.3 487.2 1 [ 49.3 49.5 50.0 50.2 50.3 50.8 51.0 51.3 51.8 51.8 52.3 52.7 53.0 53.2 53.7 53.8 54.3 54.5 54.8 55.3 55.5 56.0 56.3 56.7 57.0 57.3 57.7 58.2 58.3 59.0 59.2 59.5 60.0 60.3 60.8 61.2 61.5 62.0 62.3 62.8 63.2 63.7 TANGENT 9.51436 .54106 .56791 .59490 .62205 9.64935 .67680 .70441 .73217 .76009 01234 5678 σ 9 9.7881710 .81641 11 .8448212 .8733813 .9021114 9.93101 15 .96007 16 .98930 17 10.0187 18 .0483 19 10.0780 20 . 1080 21 .1381 22 . 1683 23 .1988 24 10.2294 25 .2602 26 .291327 .3224 28 .3538 29 10.3854 30 .4172 31 .4491132 .4813 33 .5136 34 10.5462 35 .5789 36 .6118 37 .6450 38 .6783 39 10.7119 40 .7457|41 .7797 42 .8139 43 .8483 44 10.882945 .917846 .952847 .9882 48 11.0237 49 11.0594 50 .095451 .1316 52 .1681 53 .2048 54 11.2417 55 .2789 56 .3163 57 .3540 58 .3919 59 11.4301 60 546 0-234 BON∞O 0.996195 6 7 5.996320 8 9 O-NMI DOM ONE 0700 om♡♡Z KOMMA DI 16 10.996444 17 19 21 TI 6468 Corr. 12 6493 10 4 13 6517 15 6 14 8 6541 20 15.996566 30 6590 40 16 6614 45 18 22 20.996685 23 18 6637 50 20 6661 24 26 27 28 25.996802 29 31 33 34 30.996917 36 6940 32 6963 37 38 SINE 39 *** ** 6220 6245 6270 6295 35.997030 41 6345 6370 6395 6420 42 43 44 46 47 6708 6732 6756 6779 40.997141 ggg238g 6825 6848 51 52 53 54 6872 6894 56 57 58 59 6985 7008 7053 7075 7097 7119 45.997250 30 50.997357 7378 7399 7420 7441 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + 11 7272 40 14 7293 45 48 7314 50 18 49 7336 7163 7185 10 55.997462 7482 7503 7523 7544 60.997564 7207 15 7229 20 " Corr. E57 4 -46∞ COSINE .087156 6866 6576 16 6286 5997 1.085707 5417 5127 4837 4547 .081359 1069 0779 0489 0199 12.082808 30 145.917192 11.0761 2518 40 193 2228 45 217 1938 50 242 1649 .079909 9619 9329 084258 " Corr. 3968 3678 10 48 3388 15 72 3098 20 97 9039 8749 078459 8169 7879 7589 7299 .077009 6719 6429 6139 5849 85° CORR. FOR SEC. 072658 2368 2078 1788 1497 + .071207 0917 0627 0337 0047 .069756 1.075559 5269 " Corr. 10 48 4979 10 468915 73 4399 20 97 .074108 30 145 3818 40 193 3528 45 218 3238 50 242 2948 VERSINE EXSEC .912844 10.4737 3134 .5120 3424 .5505 3714 .5893 4003 .6284 914293 10.6677 4583 .7073 4873 .7471 5163 .7873 5453 .8277 .9093 .915742 10.8684 6032 6322 6612 .9921 690211.0340 .9506 7482 .1185 7772 .1612 8062 .2043 8351 .2476 .9186411.2913 8931 .3352 9221 3795 9511 .4241 9801 .4690 92009111.5142 0381 .5598 .6057 .6520 .6986 0671 0961 1251 921541 1.7455 1831 .7928 2121 .8404 2411 .8884 2701 .9368 922991 11.9855 328112.0346 92444112.2347 4731 .2857 5021 .3371 5311 .3889 56CI .4411 .925892 12.4937 6182 .5468 6472 6762 7052 .7084 DIFF. 10" 927342 12.7631 7632 .8183 7922 .8739 8212 .9300 8503 .9865 63.9 64.3 928793 13.0435 9083 .1010 9373 .1589 9663 .2173 9953 .2762 .930244 13.3356 64.8 65.3 65.7 66.1 66.5 67.0 67.4 67.9 68.3 68.8 69.3 69.8 70.3 70.8 71.3 71.8 72.3 72.8 82.0 82.6 3571 .0840 3861 .1339 4151 .1841 83.9 83.3 84.5 73.3 73.9 74.5 75.0 75.5 76.1 76.6 77.2 77.8 78.3 78.9 79.5 80.2 80.8 81.4 88.5 89.2 .6002 .6541 89.9 90.6 91.3 85.1 85.8 86.4 87.1 87.8 92.1 92.8 93.6 94.4 95.2 95.9 96.6 97.5 98.3 99.2 TANGENT 11.4301 0 .4685 I .5072 2 .5461 3 .5853 4 11.6248 .6645 6 .7045 7 .7448 8 .7853 9 • 11.8262 10 .8673 11 .9087 12 .9504 13 .992314 12.0346 15 .0772 16 .1201 17 .1632 18 .2067 19 12.2505 20 .2946 21 .3390 22 .3838 23 4288 24 12.4742 25 .5199 26 .5660 27 .6124 28 .6591 29 12.7062 30 .7536 31 .801432 .8496 33 .8981 34 12.9469 35 .9962 36 13.045837 .0958 38 .1461 39 13.1969 40 .2480 41 .299642 .3515 43 .403944 13.4566 45 .5098 46 .5634 47 .6174 48 .6719 49 13.7267 50 .7821 51 .8378 52 .8940 53 .9507 54 14.0079 55 .0655 56 .1235 57 .182158 .241 59 14.3007 60 547 0.997564 01234 5678 σ 9 5.997664 11 12 234 10.997763 13 14 16 17 18 22 2~~~2 。z~m7 ❤❤♪❤ 34 24 20.997953 21 7972 22 7990 23 8008 8027 15.997859 30 7878 40 13 7897 45 14 7916 50 16 19 7934 26 27 25.998045 8063 8081 32 33 34 28 8099 29 8117 37 30.998135 8152 8170 8188 8205 SINE 35.998222 8240 8257 8274 8291 41 42 43 44 7584 7604 7624 7644 46 47 40.998308 8325 8 66986 gggg 55: 7684 7704 7724 7743 48 49 " 8342 10 Corr. 3 835815 4 8375 20 5 45.998392 30 8 8408 40 || 8424 45 12 844150 8457 14 51 52 53 54 7782 " Corr. 7802 10 782115 7840 20 6 50.998473 8489 8505 8521 8537 56 57 58 59 55.998552 8568 8584 8599 8614 60.998630 VERSINES, EXSECANTS, AND TANGENTS 86° CORR. FOR SEC. + COSINE .069756 9466 9176 8886 8596 .068306 8015 7725 7435 11 7145 066854 6564 Corr. 6274 10 48 598415 73 5693 20 97 9.06540330 145 5113 40 194 4823 45 218 4532 50 242 4242 .063952 3661 3371 3081 2790 .062500 2210 1920 1629 1339 .061048 0758 0468 0178 .059887 .059597 9306 9016 8726 8435 .055241 4950 4660 4369 4079 CORR. FOR SEC. .058145 7854 " Corr. 7564 10 48 7274 15 73 6983 20 97 056693 30 145 6402 40 194 6112 45 218 5822 50 242 5531 053788 3498 3207 + 2917 2626 .052336 VERSINE EXSEC .930244 ||13.3356 0534 .3955 0824 .4559 1114 .5168 1404 .5782 .931694 13.6401 1985 .7026 2275 .7656 2565 .8291 2855 .8932 .933146 13.9579 343614.0231 3726 .0889 4016 .1553 4307 .2222 .934597 14.2898 4887 .3579 5177 .4267 5468 .4961 5758 .5661 .936048 14.6368 6339 .7081 6629 .7801 6919 .8527 7210 .9260 .937500 14.9999 7790 15.0746 8080 .1500 8371 .2261 8661 .3029 .938952 15.3804 9242 .4587 9532 .5377 9822 .6175 .940113 .6981 .940403 15.7794 0694 .8616 0984 .9446 1274 16.0283 1565 .1130 .941855 16.1984 2146 .2848 2436 .3720 2726 .4600 3017 .5490 .94330716.6389 3598 .7298 3888 .8215 4178 .9142 4469 |17.0079 .944759 17.1026 5050 .1983 5340 .2950 5631 .3927 5921 .4915 .946212 17.5914 .6923 6502 6793 .7944 7083 .8975 737418.0019 947664 18.1073 DIFF. 10" 99.9 100.8 101.7 102.5 103.4 104.3 105.2 106.0 106.9 107.9 108.9 109.8 110.8 111.8 112.8 113.8 114.8 115.8 116.9 117.9 118.9 120.1 121.2 122.3 123.4 124.6 125.8 126.9 128.2 129.4 130.6 131.9 133.1 134.4 135.7 137.1 138.4 139.8 141.2 142.6 144.1 145.5 146.9 148.4 150.0 151.5 153.0 154.7 156.4 158.0 159.6 161.3 163.0 164.8 166.6 168.4 170.2 172.0 174.C 175.9 TANGENT 14.3007 .3607 4212 .4823 .5438 14.6059 .6685 .7317 .7954 .8596 1 0 1 234 56789 14.9244 10 .9898 1 15.0557 12 .1222 13 1893 14 15.2571 15 .3254 16 .3943 17 .4638 18 .5340 19 15.604820 .6762 21 .7483 22 .82 23 .8945 24 15.9687 25 16.043526 .1190 27 .1952 28 .2722 29 16.3499 30 .4283 31 .5075 32 .5874 33 .668134 16.7496 35 .8319 36 .9150 37 9990 38 17.0837 39 17.1693 40 .255841 .3432 42 431443 .520544 17.6106 45 .7015 46 .7934 47 .8863 48 .980249 18.0750 50 .1708 51 .2677 52 .3655 53 .4645 54 18.5645 55 .6656 56 .7678 57 .8711 58 .9755 59 19.081 60 548 0.99863C 01234 5O789 6 5.998705 11 1234 12 13 10.998778 14 16 17 18 19 2222 KON** 2.087 HOMMA DIE DOOD OKOON HONOR 8 21 23 24 26 15.998848 30 8862 40 27 20.998917 8931 8944 8957 8971 28 29 31 32 25.998984 8997 9010 9023 9036 36 37 38 39 30.999048 9061 9073 33 9086 34 9098 41 42 35.99911| 9123 9135 9147 9159 43 44 SINE 46 8645 8660 47 8675 8690 40.999171 48 49 8719 8734 51 8749 8763 52 53 45.999229 56 57 8792 8806 10 882015 8834 20 58 59 8876 45 10 889C50 12 8904 50.999285 9296 9307 9318 9328 TABLE XX.-NATURAL SINES, COSINES, CORR. FOR SEC. + "Corr. 55.999339 9350 9360 9370 9381 9183 9194 10 92C6 15 9218 20 30 9240 40 9252 45 60.999391 YUMI MOON " Corr. INMI 6000 9263 50 10 9274 8 COSINE 9 .052336 2046 1755 1464 1174 .050884 0593 0302 0012 .049721 .046525 6235 5944 5654 5363 .045072 4782 4491 4201 3910 .043619 3329 3038 2748 2457 6.039260 .049431 9140 JI Corr. 885C 10 48 855915 73 8269 20 97 .047978 30 145 7688 40 194 7397 45 218 7106 50 242 6816 .042166 1876 1585 1294 1004 .C40713 2 0422 " Corr. C132 10 48 3 .03984115 73 9550 20 97 87° CORR. FOR SEC. .037806 7516 7225 6934 6644 30 145 8969 40 194 8678 45 218 8388 50 242 8097 .036353 6062 5772 5481 5190 .034900 + VERSINE EXSEC 947664 18.1073 7954 .2140 8245 .3218 8536 .4309 8826 .5412 949116 18.6528 9407 .7656 9698 .8798 9988 .9952 .950279 19.1121 95056919.2303 0860 .3499 1150 .4709 1441 .5934 1731 .7174 .95202219.8428 2312 .9698 2603 20.0984 2894 .2285 3184 .3603 .953475 20.4937 3765 .6288 4056 .7656 4346 .9041 4637 21.0444 5218 5509 .954928 21.1865 .33C5 .4764 5799 .6241 6090 .7739 956381 21.9256 6671 22.0794 6962 .2352 7252 .3932 7543 .5533 .957834 22.7156 8124 .8802 8415 23.0471 8706 .2164 8996 .3880 .959287 23.5621 9578 .7387 9868 .9179 :960160 24.0997 0450 .2841 960740 24.4713 1031 .6613 1322 .8542 1612 25.0499 1903 .2487 .962194 25.4505 2484 .6555 2775 .8636 3066 26.0750 3356 .2898 .963647 26.5080 3938 .7298 4228 .9551 4519 27.1842 4810 .4170 .965100 27.6537 DIFF. 10" 177.9 179.9 181.9 184.0 186.1 188.2 190.4 192.6 194.9 197.2 199.4 201.8 204.3 206.8 209.4 211.9 214.4 216.9 219.7 222.4 225.3 228.2 231.0 233.9 237.0 240.I 243.2 246.3 249.7 253.0 256.4 259.8 263.4 267.0 270.6 274.5 278.3 282.3 286.2 290.3 294.3 298.7 303.2 307.5 312.1 316.8 321.6 326.3 331.4 336.5 341.7 347.0 352.5 358.1 363.8 369.7 375.7 381.9 388.2 394.7 TANGENT 19.0811 T 19.6273 .1879 .2959 2 .4051 .5156 4 0123- 5 .7403 6 .8546 7 .9702 8 20.0872 9 20.2056 10 3253 11 .4465 12 .56913 .6932 14 20.818815 .9460 16 21.0747 17 .2049 18 .3369 19 21.4704 20 .6056 21 .7426 22 .8813 23 22.0217 24 22.1640 25 .308126 .4541 27 ,6020 28 .7519 29 22.903830 23.057731 .2137 32 .3718 33 .5321 34 23.6945 35 .8593 36 24.0263 37 .1957 38 .3675 39 24.5418 40 .718541 .8978 42 25.0798 43 .2644 44 25.451745 .6418 46 .8348 47 26.0307 48 .2296 49 26.4316 50 .636751 .8450 52 27.055653 .2715 54 27.4899 55 .7117 56 .9372 57 28.1664 58 .3994 59 28.6363 60 549 0.999391 01234 56700 0-234 8 9 5.999440 || 12 13 14 10.999488 5678σ 16 17 19 ~~~~~ ~~~~~ ~m~m. ❤❤ 21 15.999534 30 9542 40 9551 45 234 22 23 24 26 27 28 29 18 9560 50 7 9568 20.999577 9585 9594 9602 9610 33 34 25.999618 9626 9634 9642 9650 SINE 41 43 44 9401 9411 30.999657 9665 9672 9680 9687 46 47 9421 9431 g878 238གཤྩ 55 35.999694 9702 9709 48 9450 9460 49 9469 9479 40.999729 52 53 54 9497 9507 10 9516 15 9525 20 56 57 45.999762❘ 30 58 59 9716 9722 50 .999793 51 VERSINES, EXSECANTS, AND TANGents 88° CORR. FOR SEC. + 55.999821 9827 9832 9837 9843 976840 9774 45 978150 9787 9799 9804 9810 9816 9736 " Corr. 9743 10 9749 15 9756|20 Corr. I 2 60.999848 23 1677 I 22 3I55 COSINE .034900 4609 4318 4C27 3737 .033446 3155 2864 2574 2283 .029085 8794 8503 8212 7922 C27631 7340 7049 6758 6468 .031992 1702 Corr. 141110 48 112015 73 0829 20 97 .C30538 30 145 C248 40 194 .029957 45 218 966650 242 9376 .026177 5886 5595 5305 5014 .024723 4432 4141 3851 3560 S .020361 0C70 .019779 9488 9197 .018907 8616 8325 8034 7743 .017452 - CORR. FOR SEC. .023269 2978 Corr. 2687 10 48 2396 15 73 2106 20 97 .021815 30 145 1524 40 194 1233 45 218 0942 50 242 0652 + - VERSINE EXSEC 965100 27.6537 5391 27.8944 5682 28.1392 5973 28.3881 6263 28.6414 .966554 28.8990 6845 29.1612 7136 29.4280 7426 29.6996 7717 29.9761 968C08 30.2576 8298 30.5442 8589 30.8362 8880 31.1337 9171 31.4367 .969462 31.7455 9752 32.0603 970043 32.3812 033432.7083 0624 33.0420 .970915 33.3823 1206 33.7295 1497 34.0838 1788 34.4454 2078 34.8145 .972369 35.1914 2660 35.5763 295135.9695 3242 36.3713 3532 36.7818 .973823 37.2016 411437.63C7 4405 38.0696 4695 38.5185 4986 38.9780 975277 39.4482 5568 39.9296 585940.4227 6149 40.9277 6440 41.4452 .976731 41.9757 7022 42.5196 731343.0775 7604 43.6498 7894 44.2372 .97818544.8403 8476 45.4596 8767 46.0960 9058 46.75CC 9348 47.4224 979639 48.1141 993048.8258 9802249.5584 0512 50.3129 0803 51.0903 .981C93 51.8916 1384 52.7179 1675 53.5705 1966 54.4505 2257 55.3595 .982548 56.2987 DIFF. 10" 401 408 415 422 429 478 487 496 505 515 525 535 545 556 567 445 453 461 29.8823 437 30.1446 6 30.4116 7 30.6833 8 469 30.9599 9 579 591 603 615 628 641 655 670 685 700 715 731 748 766 784 803 822 842 863 884 907 930 954 979 ICC5 1032 1061 1090 1121 1153 1186 1221 1258 1296 1336 TANGENT 1378 1421 1467 1515 1566 1 28.6363 0 28.8771 I 29.1220 2 29.3711 3 29.6245 4 31.2416 10 31.5284 || 31.8205 12 32.1181 13 32.4213 14 32.7303 15 33.0452 18 33.3662 17 33.6935 18 34.0273 19 34.3678 20 34.7151 21 35.0695 22 35.4313 23 35.8006 24 36.1776 25 36.5627|26 36.9560 27 37.3579 28 37.7686 29 38.1885 30 38.617731 39.0568 32 39.5059 33 39.9655 34 40.4358 35 40.917436 41.410637 41.9158 38 42.4335 39 42.9641 40 43.5081 41 44.0661 42 44.6386 43 45.2261 444 45.8294 45 46.448946 47.0853 47 47.7395 48 48.4121 49 49.1039 50 49.8157 51 50.5485 52 51.303253 52.0807 54 52.882 55 53.7086 56 54.561357 55.4415 58 56.3506 59 57.2900 60 550 : 0.999848 9853 9858 I ·234 5O7BC) 6 8 5.999872 9 01234 11 10.999894 12 6678α ~~~~~ 9898 By 9902 Inspec- 13 9906 tion 14 9910 16 17 18 15.999914 19 21 22 23 24 ~34 DONO mõ 20.999932 26 27 28 29 ოოო 3= 25.999948 32 33 34 ოოოოო 667 36 30.999962 37 38 39 441 42 43 44 TABLE XX.—NATURAL TRIGONOMETRIC FUNCTIONS SINE 35.999974 46 47 48 49 9862 9867 400 85887 HONOR 8 9877 9881 9886 9890 51 52 53 54 40.999983 56 9918 9922 9925 9929 57 58 9936 9939 45.999990 9992 9993 9994 9995 59 9942 9945 60 9951 9954 9957 9959 50.999996 9964 9967 9969 9971 9976 9978 9980 9981 9985 9986 9988 9989 55.999999 9997 9997 9998 9998 9999 One One One CORR. FOR SEC. + One COSINE .017452 7162 6871 6580 6289 .015998 57C7 5416 5126 4835 .CI 1635 1344 1054 0763 0472 .010181 .009890 .C14544 4253 " Corr. 3962 10 48 367115 73 3380 20 97 .013090 30 145 279940 194 250845 218 2217 50 242 1926 9599 9308 9017 .008726 8436 8145 7854 7563 .007272 6981 6690 6400 6109 .005818 CORR. FOR SEC. 5527 " Corr. 52360 48 494515 73 4654 20 97 3782 45 218 3491 50 242 3200 002909 2618 2327 2036 1745 .001454 1164 0873 0582 0291 89° Zero VERSINE EXSEC .982548 56.2987 2838 57.2698 3129 58.2743 3420 59.3141 37160.3910 .984002 61.5072 4293 62.6646 4584 63.8657 487465.1130 5165 66.4093 .985456 67.7574 5747 69.1605 6038 70.6221 632972.1458 6620 73.7359 .98691075.3966 7201 77.1327 7492 78.9497 778380.8532 8074 82.8495 988365 84.9456 8656 87.1492 8946 89.4689 9237 91.9139 9528 94.4947 .004363 30 145.995637 ||228.184 4072 40 194 5928 244.554 6218 263.443 6509285.479 6800 311.523 .98981997.2230 .990110100.112 0401103.176 0692 106.431 0983109.897 .991274 113.593 1564 17.544 1855121.778 2146126.325 2437 131.222 .992728136.511 3019142.241 3310148.468 3600155.262 3891162.703 .994182170.888 4473179.935 4764189.987 5055 201.221 5346 213.860 .997091342.775 7382 380.972 7673 428.719 7964 490.107 8255571.958 998546 686.550 8836 858.437 91271144.92 9418 1717.87 9709 3436.75 One Infin. DIFF. 10" 1619 1674 1733 1795 1860 1929 2002 2079 2161 2247 2339 2436 2540 2650 2768 2894 3028 3173 3327 3494 3673 3866 4075 4302 4547 482 511 543 578 616 659 706 758 816 881 955 1.038 1.132 1.240 1.364 1.508 1.675 1.872 2.107 2.387 2.728 3.148 3.673 4.341 5.209 6.366 7.958 10.231 13.642 19.099 26.648 47.75 95.49 286.48 TANGENT 1 57.290C 58.2612 1 59.2659 2 60.3058 61.3829 4 01234 DO78Q 62.4992 5 63.6567 6 64.8580 66.1055 7 67.4019 9 68.750110 70.1533 | 71.6151 12 73.1390 13 74.7292 14 76.3900 15 78.126316 79.9434 17 81.8470 18 83.8435 19 85.9398 20 88.1436 21 90.4633 22 92.9085 23 95.4895 24 98.2179 25 101.107 26 104.171 27 107.426 28 110.892 29 114.589 30 118.540 31 122.774 32 127.321|33 132.219 34 137.507 35 143.237 36 149.465 37 156.259 38 163.700 39 171.88540 180.93241 190.98442 202.219 43 214.858 44 229.182 45 245.552 46 264.44147 286.478 48 312.52149 343.774 50 381.971 51 429.718 52 491.106 53 572.957 54 687.549 55 859.436 56 145.92 57 1718.8758 3437.75 59 Infin. 60 551 No. 100 Log 000 N. 100 101 0 000000 4321 102 8600 103 C12837 104 7033 105 021189 106 107 9384 108 | 033424 109 5306 Diff. 434 433 432 431 430 429 428 427 426 425 424 423 422 421 420 419 418 417 416 415 414 413 412 411 410 409 408 407 406 405 404 403 402 401 400 399 398 397 396 395 394 393 392 391 390 389 388 TABLE XXI.—LOGARITHMS OF NUMBERS 1 AA AAAAAA 1 4 5 6 3891 432 8174❘ 428 3259 0434 0868 1301 1734 2166 2598 3029 3461 4751 5181 5609 6038 6466 6894 7321 7748 9026 9451 9876 *0300 *0724 *1147 | *1570 *1993 *2415| 424 3680 4100 4521 4940 5360 5779 6197 6616 420 8700 9116 9532 9947 *0361 | *0775 | 416 2428 2841 3252 3664 4075 4486 4896 412 6533 6942 7350 7757 8164 8571 8978 408 0195 | *0600 | *1004 | *1408 | *1812 *2216 | *2619 | *3021 404 4628 5029 5430 5830 8620 9017 9414 9811 *0207 *0602 *0998 397 7451 7868 8284 1603 2016 5715 6125 9789 4227 6230 6629 7028 400 3826 7426 7825 8223 43 43 43 43 43 43 43 43 43 43 42 42 42 22 222 42 42 42 42 42 42 42 41 4: 41 41 41 41 41 41 41 41 40 40 40 40 40 40 40 40 40 *****888** ** 40 39 39 39 39 39 39 39 2 00 00 00 00 00 87 87 86 86 86 86 86 85 84 84 83 8888889 80 85 85 85 85 127 84 127 84 126 84 126 80 79 79 79 79 00000000 00000 126 125 125 83 125 83 125 83 121 83 121 82 124 82 123 82 123 79 82 123 82 122 81 122 81 122 81 122 81 121 81 121 80 121 80 120 80 120 78 2 78 78 3 78 78 130 130 130 129 129 PROPORTIONAL PARTS 129 128 128 128 128 127 3 120 119 119 119 119 118 118 118 117 117 4 174 173 173 172 172 172 171 171 170 170 170 169 169 168 168 168 167 167 166 166 166 165 165 164 164 164 163 163 162 162 162 161 161 160 160 160 159 159 158 158 158 157 157 156 156 117 116 155 เค 5 217 217 216 216 215 215 214 214 213 213 212 212 211 211 210 210 209 209 208 208 207 207 206 206 205 205 204 204 203 203 202 202 201 201 200 200 199 199 198 198 197 197 196 196 195 156 195 194 6 260 260 259 259 258 257 257 256 256 255 254 254 253 253 252 251 251 250 250 249 248 248 247 247 246 245 245 244 244 243 2.12 242 241 241 240 239 239 238 238 237 236 236 235 235 234 233 233 7 304 303 302 302 301 300 300 299 298 298 297 296 295 295 294 293 293 292 291 291 290 289 288 288 287 286 286 285 234 284 283 282 281 281 280 279 279 278 277 277 276 275 274 274 273 No. 109 Log 040 7 | 8 | 9 89 347 346 346 345 344 343 342 342 341 340 339 338 338 337 336 335 334 33-4 333 332 331 330 330 329 328 327 326 326 325 324 323 322 322 321 320 319 318 318 317 316 315 314 314 313 312 272 311 272 310 391 390 389 388 387 386 385 384 383 383 382 381 380 379 378 377 376 375 374 374 373 372 371 370 369 368 367 366 365 365 364 363 362 361 360 359 358 357 356 356 355 354 353 352 351 Diff. 350 349 Diff. 434 433 432 431 430 429 428 427 426 425 424 423 422 421 420 419 418 417 416 415 414 413 412 411 410 409 408 407 406 405 404 403 402 401 400 399 398 397 396 395 394 393 392 391 390 389 388 552 No. 110 Log 041 N. 0 110 041393 111 No. 124 Log 096 1 2 3 4 5 Diff. 112 113 6 7 8 9 1 1787 2182 2576 2969 3362 3755 4148 4540 4932 393 5323 5714 6105 6495 6885 7275 7664 8053 8442 8830 390 9218 9606 9993 *0380 *0766 *1153 *1538 *1924 053078 3463 3846 4230 4613 4996 5378 5760 7286 7666 8046 8426 8805 9185 9563 1075 1452 1829 2206 2582 2958 3333 4832 5206 5580 5953 6326 6699 7071 8557 8928 9298 9668 0038 | *0407 | *0776 *1145 *1514 370 2250 2617 2985 3352 3718 4085 4451 4816 5182 366 5912 6276 6640 7004 7368 7731 8094 8457 *2309 *2694 386 6142 6524 383 9942 | *0320 379 3709 4083 376 7443 7815 373 114 6905 115 060698 116 4458 117 8186 118 071882 5547 119 8819 363 123 124 120 079181 121 082785 122 9543 9904 *0266 *0626 *0987 *1347 *1707 *2067 *2426 360 3144 3503 3861 4219 4576 4934 5291 5647 6004❘ 357 6360 6716 7071 7426 7781 8136 8490 8845 9198 9552❘ 355 9905 *0258 | *0611 | *0963 *1315 | *1667 | *2018 | *2370 *2721 *3071 | | 352 093422 3772 4122 4471 4820 5169 5518 5866 6215 6562 349 Diff. 387 386 385 384 383 382 381 380 379 378 377 376 375 374 373 372 371 370 369 368 367 366 365 364 363 362 361 360 359 358 357 356 355 354 353 352 351 350 349 348 347 TABLE XXI.-LOGARITHMS OF NUMBERS 1 80000 00000000 mm 39 39 39 38 38 38 38 38 38 38 38 38 38 37 37 37 37 37 37 37 37 37 37 36 36 8888888 36 36 36 36 36 36 36 36 35 35 35 35 es escriure ciuitatis 35 35 35 35 2 ZZ ZZZZZZZZ 77 77 77 77 77 76 76 76 76 74 HH~~~~~~~~ ~~ZZZZZORA 888 74 73 76 75 75 75 113 75 112 75 74 74 74 73 73 73 73 72 72 72 71 71 71 109 108 72 108 71 3 70 PROPORTIONAL PARTS 116 116 116 115 115 115 114 114 72 108 107 70 114 113 113 113 69 112 112 111 111 111 110 110 110 110 109 109 71 106 70 106 70 105 105 70 107 107 107 106 4 155 154 154 154 153 153 152 152 152 151 151 150 150 150 149 149 148 148 148 147 147 146 146 146 145 145 144 144 144 143 143 142 142 142 141 141 140 140 5 194 193 193 192 192 191 191 190 190 189 189 188 188 187 187 186 186 185 185 184 184 183 183 182 182 181 181 180 180 179 179 178 178 177 177 176 176 175 175 174 105 140 139 104 104 139 174 6 232 232 231 230 230 229 229 228 227 227 226 226 225 224 224 223 223 222 221 221 220 220 219 218 218 217 217 216 215 215 214 214 213 212 212 211 211 210 7 271 270 270 269 268 267 267 266 265 265 264 263 263 262 261 260 260 259 258 258 257 256 256 255 254 253 253 252 251 251 250 249 249 248 247 246 246 245 209 244 209 244 208 243 8 310 309 308 307 306 306 305 304 303 302 302 301 300 299 298 298 297 296 295 294 294 293 292 291 290 290 289 288 287 286 286 285 284 283 282 282 281 280 9 348 347 347 346 345 344 343 342 332 331 341 379 340 378 339 377 338 376 338 375 337 374 336 373 335 372 334 371 333 370 330 329 329 328 327 326 325 324 323 322 321 320 320 Diff. 387 386 385 384 383 382 381 380 279 314 278 313 278 312 369 368 367 366 365 364 363 362 361 360 359 358 357 356 355 319 354 318 353 317 352 316 351 315 350 349 348 347 553 No. 125 Log 097 N. 125096910 126 100371 127 3804 128 7210 129 110590 130 | 113943 131 7271 132120574 133 3852 134 7105 135130334 136 137 Diff. 347 346 345 344 343 342 341 340 339 338 337 336 335 334 333 332 331 330 329 328 327 326 325 324 323 322 321 320 319 318 317 316 315 314 313 312 311 310 0 1 4277 4611 6276 7603 7934 9586 6608 6940 333 9915 *0245| 330 3198 3525 328 6456 6781 325 0903 1231 1560 1888 2871 4504 4830 5156 6131 8399 2260 4178 7429 7753 8076 9045 9368 9690 *0012 323 0655 0977 1298 1619 2580 2900 3219 321 3539 3858 4177 4496 4814 5133 5769 6086 6403 318 6721 7037 7354 7671 7987 8303 8618 8934 9249 9564 316 138 9879 *0194 *0508 *0822 *1136 *1450*1763 *2076 *2389 *2702 314 139 | 143015 3327 3639 3951 4263 4574 4885 5196 5507 5818 311 5451 309 308 307 1 ♡♡ 10 10 35 35 35 34 34 34 HHHH HH 34 34 34 34 34 34 34 33 333333333~~~~~~~ ~~~~~~ 32 32 32 32 32 32 32 32 32 32 31 31 31 31 31 31 0 00 00 TABLE XXI.—LOGARITHMS OF NUMBERS 31 31 1234 4 5 6 7 8 7257 7604 7951 8298 0715 1059 1403 1747 4146 4487 5169 7549 7888 8565 0926 1263 1934 2 69 69 69 283 88*3****** *PPRRAGA88 88822222** **⠀⠀⠀⠀⠀⠀ 69 68 68 68 68 68 67 67 67 67 67 66 66 66 66 66 65 65 65 65 65 64 64 64 64 64 63 63 63 63 63 62 62 62 62 62 61 3 104 104 104 103 103 103 102 102 102 101 101 101 101 100 100 100 99 99 99 98 98 98 98 97 97 97 96 96 GGO 8809 95 95 95 95 94 94 94 93 183 322 4828 8227 1599 PROPORTIONAL PARTS 93 4944 8265 93 92 92 4 139 138 138 138 137 137 136 136 136 135 135 134 134 134 133 133 132 132 96 128 127 127 132 131 131 130 130 130 129 129 128 128 126 126 126 125 125 124 124 124 123 123 5278 8595 er 5 174 173 173 172 172 171 171 170 170 169 169 168 168 167 167 166 166 165 165 164 164 163 163 162 162 161 161 160 8644 2091 5510 8903 2270 160 159 159 158 158 157 157 156 156 155 5611 8926 2216 5481 8722 1939 6 8990 9335 9681 *0026 346 2434 2777 3119 3462 343 5851 6191 6531 6871 341 9241 9579 9916 *0253 338 2605 2940 3275 3609❘ 335 208 208 207 206 206 205 205 201 203 203 202 202 201 200 200 199 199 198 197 197 196 196 195 194 194 193 193 192 5943 9256 188 188 187 187 186 2544 5806 7 243 242 242 241 240 239 239 238 237 237 236 235 235 234 233 232 232 231 No. 139 Log 145 230 230 229 228 228 227 226 225 225 221 191 223 191 223 190 222 190 221 189 221 220 219 218 218 217 155 185 216 154 185 216 154 184 215 8 278 277 276 275 274 274 273 272 271 270 270 269 268 267 266 266 265 264 255 254 254 253 252 251 250 9 Diff. 250 249 248 9 247 246 246 312 311 311 310 309 308 263 296 262 295 262 294 261 293 260 293 259 292 258 291 258 290 257 289 256 288 307 306 305 304 303 302 302 301 300 299 298 297 287 286 285 284 284 283 282 281 280 279 278 277 276 Diff. 347 346 345 344 343 342 341 340 339 338 337 336 335 334 333 332 331 330 329 328 327 326 325 324 323 322 321 320 319 318 317 316 315 314 313 312 311 310 309 308 307 554 No. 140 Log 146 N. 140 141 142 143 144 145 146 147 148 149 Diff. 306 305 304 303 302 301 300 299 298 297 296 295 294 293 292 291 290 289 288 287 286 285 284 283 282 281 280 0 279 278 277 276 275 274 273 272 271 150 176091 6381 6670 151 8977 9264 9552 152 2129 2415 153 4975 5259 7803 154 8084 0612 0892 181844 4691 7521 155 190332 156 3125 157 5900 6453 6176 158 8657 8932 9206 201397 1670 1943 3403 3681 159 146128 9219 152288 152288 TABLE XXI.-LOGARITHMS OF NUMBERS 5336 8362 161368 4353 7317 170262 3186 1 2200808 2....22222 2222 31 31 30 30 30 30 30 30 30 30 30 30 29 29 29 29 29 29 29 29 29 29 28 28 28 28 28 28 2222~~~~ 28 28 8177∞ ∞ ( 28 28 27 27 27 1 27 6438 9527 2594 5640 5943 8664 1667 4650 7613 2 7777888 80........ CONDAD999 999 NO NO NO NO NO 61 61 6748 7058 7367 7676 7985 8603 8294 8911 309 *1982 307 9835 *0142 *0449 *0756*1063*1370*1676 *1982 2900 3205 3510 3815 4120 4424 4728 5032 305 6246 6549 6852 7154 8061 303 7457 7759 9266 9868 0168 *0469 *0769 *1068 301 3161 3460 3758 4055 299 9567 2266 2564 2863 4947 5244 5541 5838 6134 6430 6726 7022 297 7908 8497 8203 0555 0848 1141 3478 3769 4060 8792 9086 9380 1726 2019 2311 4641 4932 5222 9968❘ 295 2895| 293 1434 4351 5512 5802 291 61 60 60 58 58 58 57 57 57 57 57 56 56 56 56 56 2 55 55 55 55 54 54 8965 1967 3 92 92 91 91 91 90 90 88 88 88 87 15000 50000 88 3 87 86 90 120 89 119 89 119 89 118 89 118 86 86 86 85 85 85 84 84 118 117 117 116 87 116 83 6959 7248 9839 *0126 2700 2985 5542 8366 1171 3959 6729 9481 2216 4 122 122 122 121 121 120 120 PROPORTIONAL PARTS 116 115 115 114 114 4 5 6 114 113 113 112 112 84 112 111 111 110 110 7536 7825 8113 *0413 *0699 *0986 3270 3555 3839 6391 6674 9209 9490 2010 4514 4792 5 153 153 152 152 151 151 150 150 149 149 148 148 147 147 146 146 145 145 144 144 143 143 142 5825 6108 8647 8928 1451 1730 2289 2567 2846 279 5623 278 4237 5069 5346 7005 7281 7556 7832 8107 8382 276 9755 *0029 | *0303 | *0577 | *0850*1124 2488 2761 3033 274 3848 272 3305 3577 142 141 141 140 140 139 83 83 83 82 110 82 109 137 82 109 136 81 108 136 139 138 138 137 6 184 183 182 182 181 181 180 179 179 178 178 177 176 176 175 175 174 173 173 172 172 171 170 170 169 169 168 167 167 166 166 165 164 164 163 163 7 214 214 213 212 211 211 210 209 209 208 207 207 206 205 204 204 203 202 202 201 200 200 199 No. 159 Log 203 789 198 197 197 196 195 195 194 193 193 192 191 190 190 9674 2603 8401 *1272 8 4123 6956 9771 245 244 243 242 242 241 240 239 238 238 237 236 235 234 234 233 232 231 230 230 229 228 227 226 226 225 224 223 222 222 221 220 219 218 218 217 8689 289 *1558 287 *1558 4407 | 285 7239 283 *0051 | 281 0051 9 275 275 274 273 272 271 270 269 268 267 266 266 265 264 Diff 263 262 261 260 259 258 257 257 256 255 254 253 252 251 250 249 248 248 247 246 245 244 Diff. 306 305 304 303 302 301 300 299 298 297 296 295 294 293 292 291 290 289 288 287 286 285 284 283 282 281 280 279 278 277 276 275 274 273 272 271 555 No. 160 Log 204 N. ·|·| 160 204120 161 6826 162 9515 163 | 212188 164 4844 165217484 166 220108 167 2716 168 5309 169 7887 170230449 2996 5528 8046 Diff. 171 172 173 174 | 240549 175 | 243038 176 5513 177 7973 178 250420 179 272 271 270 269 268 267 266 265 264 263 262 261 260 259 258 257 256 255 254 253 252 251 250 TABLE XXI.—LOGARITHMS OF NUMBERS 249 248 247 246 245 244 243 242 241 240 1 ~~~ ~~~~722222 22290 27 27 0960 1215 1470 3501 3757 4011 6033 6285 6537 8297 8548 8799 9049 0799 1048 1297 1546 3286 3534 6499 3782 4030 6252 8464 8709 0664 0908 1151 2853 3096 3338 3580 5759 6005 8219 8954 1395 3822 27 26 26 26 26 26 26 26 26 26 25 25 25 112125 1 | 25 25 25 25 25 24 24 24 24 24 0704 3250 5781 2 HHH HUM 54 54 54 54 54 9247 269 *1921 | 267 4579 266 4391 4663 4934 5204 5475 5746 6016 6286 6556 271 7096 7365 7634 7904 8173 8441 8710 8979 9783 *0051*0319 *0586 | *0853 | *1121 *1388 *1654 2454 2720 2986 3252 3518 3783 4049 4314 5109 5373 5638 5902 6166 6430 6694 6957 7747 8010 8273 9060 9323 9585 0370 0631 1675 1936 2196 4792 7372 7630 258 9938 *0193 256 7221 264 9846 262 8536 8798 0892 1153 1414 2456| 261 2976 3236 3496 3755 4015 5051 259 5568 5826 6084 6342 4274 4533 6600 6858 7115 9170 8144 8400 8657 8913 9426 9682 53 53 53 ~~~~ ~~HHHHHOOD DO******oo oooo 52 52 52 52 52 51 51 51 51 51 50 50 50 50 50 49 2 49 49 49 49 48 48 48 3 FXR ZALIZZZZZZ ZIIII***** 00 00 00 00 82 81 80 80 80 79 79 78 77 106 105 79 105 78 101 78 101 7-t PROPORTIONAL PARTS 75 3 104 103 77 103 77 102 77 102 102 101 101 74 76 76 76 75 100 75 100 74 74 74 73 73 73 33322 4 72 109 108 108 72 108 107 107 106 106 100 99 99 98 98 98 97 4 97 96 5880 er 5 136 136 135 135 134 134 133 133 132 132 131 131 130 125 124 5 124 123 123 122 1724 4264 6789 9299 1795 4277 6745 9198 1638 4064 122 121 121 120 6 163 163 162 130 129 129 128 128 127 152 127 152 126 151 126 151 125 150 161 161 160 160 159 158 158 157 157 156 6 1979 4517 7011 9550 2044 4525 6991 9443 149 149 148 148 147 146 146 145 145 144 1881 4306 7 4772 7237 9687 2234 4770 2488 2742 255 5023 5276 253 7544 7795 252 7292 9800 *0050 | *0300] 250 2293 2541 2790 249 5019 5266| 248 246 9932 *0176| 245 7482 7728 2368 2610 243 4790 5031 242 2125 4548 190 190 189 188 188 187 186 186 155 181 155 181 154 180 151 179 153 179 178 177 176 176 175 185 184 183 183 182 789 No. 179 Log 255 174 174 173 172 172 171 170 169 169 168 8 218 217 216 215 214 214 213 212 211 210 210 209 208 207 206 206 205 201 203 202 202 201 200 199 198 198 197 196 195 194 194 193 192 9 245 244 243 242 241 210 239 239 238 237 236 235 234 233 232 Diff. 231 230 230 229 228 227 226 225 224 223 222 221 221 220 219 218 217 216 Diff. 272 271 270 269 268 267 266 265 264 263 262 261 260 259 258 257 256 255 254 253 252 251 250 249 248 247 246 245 244 243 242 241 240 556 No. 180 Log 255 N. 180 255273 181 7679 182 260071 183 2451 184 4818 185 267172 186 9513 187271842 188 4158 6462 189 190 278754 191 281033 192 3301 193 194 5557 7802 290035 195 196 197 0 2256 4466 198 6665 199 8853 Diff. 239 238 237 236 235 234 233 232 231 230 TABLE XXI.—LOGARITHMS OF NUMBERS 200 301030 201 202 203 204 229 228 227 226 225 224 223 222 221 220 219 218 217 216 215 214 213 212 1 24 24 24 24 24 23 ***** **~*~~~~~~ 22222227 23 23 23 23 23 23 23 23 23 22 22 22 22 22 1 21 21 21 9439 8982 9211 1261 1488 1715 3979 3527 3753 5782 6007 8026 8249 8473 6232 0702 0257 0480 2478 2699 2920 4687 4907 6884 7104 9071 9289 1247 3412 5566 2 48 48 47 47 47 47 47 46 46 AAA AA 46 46 46 45 45 45 45 45 44 6958 9355 1739 1976 4109 4346 6467 6702 5514 5755 5996 6237 6477 6718 7918 8158 8398 8637 8877 9116 0310 0548 0787 1025 1263 1501 2688 2925 3162 3399 3636 3873 5054 5290 5525 5761 5996 6232 7406 7641 7875 8110 8344 8578 8812 9046 9746 9980 *0213 *0446 *0679 *0912 *1144 *1377 2074 2306 2538 2770 3001 3233 3464 3696 4389 4620 4850 5081 5311 5542 5772 6002 6692 6921 7151 7380 7609 7838 8067 8296 ** ******** 44 44 44 44 43 2114 3196 4275 2764 2980 217 4921 5136 216 7068 7282 215 7924 8137 8351 9417 213 9204 8778 8991 212 9630 9843 *0056 *0268 *0481 *0693 *0906 *1118 *1330 *1542 2331 2547 4491 4706 6854 5351 5996 6211 6425 6639 7496 7710 8564 43 43 2 43 43 42 3 1464 1681 3628 3844 5781 PPPARGAO 8822228828 80IIIZZZZZ 3 72 71 71 71 71 70 70 70 69 69 69 68 5127 7323 9507 68 68 67 64 4 96 95 95 94 94 9.4 93 93 222 2228228*** ******* 92 92 PROPORTIONAL PARTS 92 91 90 90 89 89 4 88 87 87 86 85 85 9667 1942 4205 6456 8696 0925 3141 5347 7542 9725 1898 4059 5 120 119 119 118 118 117 117 116 116 115 115 114 114 113 113 112 112 10 111 111 110 5 110 109 109 108 108 107 107 106 4431 6681 8920 1147 3363 5567 7761 9943 9895 *0123 *0351 *0578 2169 2396 6 143 143 142 142 141 140 140 139 139 138 137 137 6 136 136 135 4656 6905 9143 1369 3584 9366 1591 3804 5787 6007 7979 8198 0161 *0378 | 134 134 133 133 132 131 131 130 130 129 128 128 127 7 7 167 167 166 2622 2849 4882 5107 7130 7354 9589 1813 4025 6226 8416 *0595 165 165 No. 204 Log 311 164 163 162 162 161 160 160 159 158 158 157 156 155 155 154 153 153 152 151 151 150 149 148 7439 241 7198 9594 9833 239 8 8 191 190 190 189 188 187 186 186 185 184 183 182 182 181 180 179 178 178 177 176 175 174 174 173 172 171 170 170 9 2214 238 4582 237 6937 235 9279❘ 234 | 233 *1609 3927| 232 6232 230 8525 229 *0806 228 3075 227 5332 226 7578| 225 9812 223 2034 222 4246 221 Diff. 6446 220 8635 219 *0813 218 | 9 215 214 213 212 212 211 210 209 208 207 206 205 204 203 203 202 201 200 199 198 197 196 195 194 194 193 192 191 Diff. 239 238 237 236 235 234 233 232 231 230 229 228 227 226 225 224 223 222 221 220 219 218 217 216 215 214 213 212 557 No. 205 Log 311 N. 205 311754 206 3867 207 5970 208 8063 209 320146 210 322219 211 212 213 214 215 216 4454 217 6460 218 8456 219 340444 230 231 232 233 234 Diff. 212 211 210 220 342423 221 222 209 208 207 206 205 204 203 202 201 200 TABLE XXI.-LOGARITHMS OF NUMBERS 199 198 197 196 195 194 193 192 191 190 • 1 2 3 4 5 6 7 8 0 189 188 4282 6336 8380 330414 332438 1 2817 3014 3212 4785 4981 5178 2620 4392 4589 6353 8305 8500 8694 6549 6744 6939 7135 223 8889 9083 224 350248 0442 0636 0829 1023 225 352183 2375 2568 2761 2954 226 4108 4493 4685 6408 6599 4876 6790 227 6026 4301 6217 7935 8125 8316 9076 9835 *0025 *0215 *0404 *0593 *0783 *0972 | | | | | | 228 8506 8696 8886 229 222 2222222222 2222------ ga 21 21 21 21 20 20 20 20 20 20 20 20 20 20 19 19 19 19 19 19 19 2426 2633 2839 4488 4694 4899 6541 6745 8583 8787 0617 6950 8991 0819 1022 2640 2842 3044 3246 4655 4856 5057 6660 6860 7060 8656 8855 9054 0642 0841 1039 4078 4289 6180 6390 8272 8481 0354 0562 1966 2177 2389 2600 2812 3023 3234 3445 3656 211 4710 4920 5130 5340 5551 5760 210 6809 7018 7227 7436 7646 7854 209 9106 9314 9522 9730 0977 1184 1391 1598 1805 8898 9938 208 2012 207 42 42 42 42 42 41 41 41 41 41 40 40 ** **888***** ** 40 1917 361728 2105 2294 2482 2671 2859 3048 3236 3424 188 3612 3800 3988 4176 4363 4551 4739 4926 5113 5301 188 5488 5675 5862 6049 6236 6423 6610 7169 6796 6983 187 7542 7729 7915 8101 8287 8473 8659 8845 9030 186 9216 9401 9587 9772 9958 *0143 *0328 *0513 *0698 *0883 | 7356 185 40 39 39 39 39 39 38 38 38 2 3 4 5 6 64 38 38 aa aaaaa☺☺☺uo 8822288888 *** 63 63 63 62 62 62 62 61 61 61 60 60 4499 6599 8689 0769 60 59 59 59 59 58 58 58 57 57 57 PROPORTIONAL PARTS 56 *** *88* 85 84 81 84 83 83 82 82 82 81 81 *88 800**OFFER OP 80 80 79 79 78 78 78 3046 5105 7155 9194 3252 5310 7359 9398 1225 1427 3447 5458 5257 7260 7459 9253 1237 77 77 76 76 76 75 106 106 105 105 104 101 103 103 102 102 101 101 9451 1435 1 ****** ** 100 3409 5374 100 99 98 98 97 7330 9278 1630 3649 5658 7659 9650 1632 4077 206 3458 3665 3871 5516 5721 5926 7563 7767 7972 6131 205 8176 204 *0211 203 2236 | 202 9601 9805 *0008 1832 2034 4051 4253 202 6059 6260❘ 201 7858 8058 8257❘ 200 9849 | *0047 | *0246 199 198 1830 2028 2225 3802 5766 7525 7720 1216 3999 4196 197 5962 6157 196 7915 8110 195 9472 9666 194 9860*0054 1410 1603 1796 1989 193 3339 3532 3724 3916 193 5068 5260 5452 5643 5834 192 6981 7172 7363 7554 7744 191 9266 9456 9646 190 *1161 *1350*1539 | 3147 189 3606 5570 127 127 126 125 125 124 124 123 122 122 121 121 120 119 119 118 118 117 116 116 115 115 114 3850 5859 113 113 7 No. 234 Log 370 148 148 147 146 146 145 144 144 143 142 141 141 140 139 139 138 137 137 136 135 134 134 133 132 132 8 170 169 168 9 167 166 166 165 164 163 162 162 161 160 159 158 158 157 156 155 154 154 153 152 151 150 9 Diff. 191 190 189 187 186 185 185 181 183 182 181 180 179 178 177 176 176 175 174 173 172 171 188 209 208 207 206 205 204 203 202 201 200 170 169 Diff. 212 211 210 199 198 197 196 195 194 193 192 191 190 189 188 558 No. 235 Log 371 N. 235 236 237 238 239 240 | 380211 241 242 243 5606 244 7390 245 389166 246 390935 247 Diff. 2697 248 4452 249 6199 187 186 185 184 183 182 181 180 371068 2912 1253 1437 3096 3280 4932 5115 €577 6759 6942 8580 8761 4748 8398 179 178 177 176 175 174 173 172 171 170 0123456789 169 168 167 166 165 164 2017 3815 250 397940 251 9674 252 401401 253 3121 254 4834 255 406540 256 8240 257 9933 258 411620 1788 1956 259 3300 1 야​야야 ​야야​야야​야야​야야 ​19 19 19 18 18 18 18 18 18 18 TABLE XXI.—LOGARITHMS OF NUMBERS 18 18 18 17 17 17 17 17 == 17 17 17 17 0392 2197 3995 5785 7568 9343 260 414973 5140 5307 5474 261 6641 6807 6973 7139 8301 8467 8633 8798 5641 5808 5974 6141 6308 6474 167 7306 7472 7638 7804 7970 8135 166 8964 9129 9295 9460 9625 9791 165 263 9956 *0121 | *0286 *0451 *0616 *0781 *0945 *1110 *1275 *1439 165 264 421604 1768 1933 2097 2261 2426 2590 2754 2918 3082 164 262 17 16 9520 1112 1288 2873 3048 4627 4802 6374 6548 6710 6881 8410 8579 *0102 *0271 2 co co co co co co co w w w wo 7051 8749 *0440 2124 3467 3635 3803 37 37 37 8114 8287 8461 8634 8808 8981 9847 *0020 0192 *0365 *0538 *0711 1573 1745 1917 2089 2261 2433 3292 3464 3807 3635 3978 5005 5176 5346 5517 5688 7221 7391 8918 9087 *0609 *0777 2293 2461 3970 4137 37 37 36 36 36 36 0573 2377 4174 36 5964 7746 35 35 35 35 35 34 34 ** **≈≈≈≈ 34 34 34 33 33 33 33 3 698555 HOBHHNNNHH HORADI 54 54 54 53 53 53 53 52 52 52 51 51 51 50 50 0754 2557 4353 50 50 49 1622 1806 1991 2175 2360 2544 2728 184 3464 3647 3831 4015 4198 4382 4565 184 5298 5481 5664 5846 6029 6212 6394 183 7124 7306 7488 7670 7852 8034 8943 8216❘ 182 9124 9306 9487 9668 9849 0030 181 0934 2737 4533 6142 6321 7923 8101 9698 9875 *0051 | *0228 1464 1641 3224 3400 3575 3751 4977 5152 5326 5501 6722 6896 7071 7245 4 *** 75 74 74 74 73 322 73 PROPORTIONAL PARTS 72 72 ****** *888JJJZIN 72 71 71 70 70 70 69 69 68 68 68 67 67 66 66 66 HIMNIECO 8888 94 93 93 92 5 | 6 92 91 91 90 1115 2917 588 6**8 86 4712 4891 5070 6499 6677 6856 8279 8456 86 85 85 84 84 83 83 82 89 106 88 106 88 105 87 104 87 104 7212 178 8634 8989 178 *0405 *0582 *0759 177 8811 1817 1993 2169 2345 2521 176 4277 176 3926 4101 5850 5676 6025 175 7766 7766 174 7419 7592 1296 1476 3097 3277 112 112 111 110 2605 2777 4492 4149 4320 5858 7561 6029 6199 7731 7901 9257 9426 9595 *0946 *1114 *1283 2629 2796 2964 4305 4472 4639 110 109 90 107 125 89 107 125 124 123 123 122 103 103 102 127 109 127 108 126 101 101 100 100 99 98 7 9154 9328 9501 173 *0883 *1056 *1228 173 131 130 130 129 128 No. 264 Log 423 121 120 120 119 118 118 1656 3456 5249 7034 117 116 116 115 8 150 149 148 147 146 146 145 144 143 142 142 141 140 139 138 138 137 136 1837 181 3636 180 5428❘ 179 135 134 134 133 132 131 2949 172 4663 171 6370 171 8070 170 9764 9764 169 *1451 169 3132 168 4806 167 9 168 167 167 166 165 Diff. 164 163 162 161 160 159 158 158 157 156 155 154 153 152 151 150 149 149 148 Diff. 187 186 185 184 183 182 181 180 179 178 177 176 175 174 173 172 171 170 169 168 167 166 165 164 559 No. 265 Log 423 N. 266 265 423246 3410 3574 3737 4882 5045 5208 5371 6511 6674 6836 6999 8135 8297 8459 8621 269 9752 9914 *0075 *0236 267 268 271 272 273 274 Diff. 01 164 163 162 161 160 159 158 157 156 155 154 153 152 151 150 TABLE XXI.-LOGARITHMS OF NUMBERS 149 148 147 146 145 144 143 1 7468 7623 7778 9015 9170 9324 280 447158 7313 281 8706 8861 282 450249 0403 283 1786 1940 3318 0557 0711 284 2093 2247 3471 3624 3777 285454845 4997 5150 5302 286 6366 6518 6670 287 7882 8033 8184 288 9392 9543 9694 289460898 6821 8336 9845 1048 1198 1348 00000 2997 290 462398 2548 2697 2847 291 3893 4042 4191 4340 4490 292 5383 5532 5680 5829 5977 293 6868 7016 7164 7312 7460 294 8347 8495 8643 8790 8938 295469822 9969 0116 0263 *0410 | 296 471292 1438 1585 1732 1878 297 2756 2903 3049 3195 3341 4216 4362 4508 4653 4799 5671 5816 5962 298 299 16 270431364 2007 3610 1525 1685 1846 2167 2328 2488 2649 2809 161 2969 3130 3290 3450 3770 3930 4090 4249 4409 160 4569 4729 4888 5048 5207 5367 5526 5685 5844 6004 159 6163 6322 6481 6640 6799 6957 7116 7275 7433 7592 159 7751 7909 8067 8226 8384 8542 8701 8859 9017 9175 158 275439333 9491 9648 9806 9964 *0122 | *0279 | *0437 | *0594 *0752 158 276 440909 1066 1224 1381 1538 1695 1852 2009 2166 277 2480 2637 2793 2950 3576 3732 4045 4201 4357 4981 5137 5293 5604 5760 2323 157 3106 3263 3419 3889 157 278 4669 4513 5915 6071 279 6226 6537 6692 6848 16 16 16 16 16 16 16 16 16 15 15 --- 15 10110 15 15 -- 10 10 10 10 10 HT 15 15 { port pod 1 15 15 15 14 14 2 32222 33 33 32 32 31 31 31 31 31 30 30 30 2 8822222 30 30 29 29 29 29 3 49 49 49 48 48 3 48 47 47 47 47 46 46 46 45 45 45 44 44 44 44 43 43 4 66 65 aaooooo 8822888:32 22338 PROPORTIONAL PARTS 65 64 64 64 63 63 62 62 4 3901 5534 62 61 61 60 60 60 59 59 58 3487 3633 2318 3779 4944 5090 5235 6107 6252 6397 6542 6687 6832 58 58 57 4065 4228 5697 5860 7324 7486 8944 9106 7161 8783 *0398 | *0559 | *0720 *0881 5 ***** 82O**NNOCP P**2222 7933 8242 8397 8552 155 9478 9787 9941 *0095 154 1479 1633 154 1326 0865 1018 2400 2553 2706 2859 3012 3165 153 3930 4082 4235 4387 4540 4692❘ 153 5454 5606 6973 7125 8487 5758 5910 6062 7276 7428 7579 8789 8940 9091 *0146 *0296 *0447 1948 8638 6214 152 7731 152 9242 151 *0597 *0748 151 2098 2248 150 9995 1499 1649 1799 81 81 80 4825 6382 3146 3296 3445 4639 4788 4936 6126 6274 6423 7608 7756 7904 8052 9085 9233 9380 *0557 *0704 *0851 *0998 *1145 2025 2171 80 79 79 78 78 77 77 76 76 75 8088 9633 1172 75 74 74 73 73 72 72 5 | 6 | 7 | 8 | 9 82 98 115 131 148 82 98 114 130 147 113 130 146 129 145 113 112 128 144 6 *ONNO BO 97 97 96 95 789 4392 4555 4718 164 6023 6186 6349 163 7648 7811 7973 162 9268 9429 9591 162 *1042 *1203 161 95 94 94 93 92 .92 91 No. 299 Log 476 **EEO 8888888 91 90 89 89 111 111 110 109 109 108 107 106 106 105 3594 3744 150 5085 5234 149 6571 6719 149 8200 148 9527 9675 148 147 146 2464 2610 3925 4071 146 5526 146 6976❘ 145 5381 5449 156 7003❘ 155 127 126 126 125 124 123 122 122 121 120 104 119 104 118 103 118 117 102 102 116 87 86 101 86 100 115 114 Diff. 143 142 141 140 140 139 138 137 136 135 134 133 132 131 131 130 129 Diff. 164 163 162 161 160 159 158 157 156 155 154 153 152 151 150 149 148 147 146 145 144 143 560 No. 300 Log 477 N. 307 308 309 314 315 316 310 | 491362 311 312 313 317 318 319 320 321 322 338 339 Diff. 330 518514 331 9828 332521138 142 141 140 0 300 477121 7266 7411 7555 7700 7844 8422 301 9863 8566 480007 302 1299 303 1443 7989 8133 8278 8711 8855 8999 9143 9287 9431 9575 9719 0151 0294 0438 0582 0725 0869 1012 1156 1586 1729 1872 2016 2159 2302 2445 2588 2731 304 2874 3016 3159 3302 3445 3587 3730 3872 305 | 484300 4442 4585 4727 4869 5011 5153 5295 306 6005 6147 5721 5863 6289 6430 6572 6997 6714 7138 7280 7421 7704 7845 7986 8127 8269 8410 8692 8551 8833 8974 9114 9255 9396 9537 9677 9818 141 9958 *0099 *0239 *0380*0520 *0661 *0801 *0941 *1081 *1222 140 | | | 4015 4157 5437 5579 6855 7563 139 138 137 136 135 134 133 TABLE XXI.-LOGARITHMS OF NUMBERS 132 131 130 2760 4155 5544 6930 498311 9687 501059 2427 3791 129 128 127 8646 8777 8909 9040 9171 9959 *0090 *0221 *0353 *0484 1269 1400 1530 1661 1792 2575 2705 2835 2966 3096 3876 4006 4136 4266 4396 5693 336 333 2444 334 3746 335 525045 5174 5304 5434 5563 6339 6469 6598 6727 6856 6985 7630 7759 7888 8016 8145 8274 8917 9045 9174 9302 9430 9559 530200 0328 0456 0584 0712 0840 337 1 HAT 14 505150 6370 136 7721 135 5286 5421 6505 6640 6776 7856 9203 324 | 510545 323 9740 5557 5693 5828 5964 6099 6234 6911 7046 7181 7316 7451 7586 7991 8126 8260 8395 8530 8664 8799 8934 9068 9337 9471 9606 9874 *0009 *0143 *0277 *0411 0679 0813 0947 1081 1215 1349 1482 1750 134 2017 2151 2284 2418 2551 2684 2818 3084 133 3218 3351 3484 3617 3750 3883 4016 4149 4548 4681 4813 4946 5079 5211 5344 5476 5874 6006 6139 6271 6403 6535 6668 6800 329 7196 7328 7460 7592 7724 7855 7987 8119 1616 2951 325 511883 326 4282 4415 133 327 328 5609 5741 133 6932 7064 132 8382 132 8251 14 14 1 14 14 14 14 14 13 13 13 13 13 333 2 *** ~~22222222 1502 1642 1782 1922 2062 2900 3040 3179 3319 3458 4294 4433 4572 4711 4850 5822 5960 6099 6238 7344 7483 7621 8724 8862 8999 9137 5683 7068 7206 8448 8586 9824 9962 1196 1333 1470 2564 2700 2837 3927 4063 4199 28 28 28 ∞ ∞ N N N N NO22 222 28 28 27 27 27 27 2 27 26 26 26 26 26 25 3 3223 43 42 42 3 42 41 41 41 41 40 40 40 39 39 8888888888 PROPORTIONAL PARTS 39 38 38 4 2201 3597 4989 6376 7759 7897 8035 9275 9412 0099 *0236 *0374 *0511 *0648 *0785 1607 2154 1744 3109 2973 1880 2017 3246 3382 4607 4743 3518 4335 4471 4878 57 56 56 56 55 55 54 4 54 54 53 53 ❤❤NN NH 52 52 52 51 51 10 5 *** RA*2288888 J22 71 71 70 70 69 69 68 68 56789 67 67 66 66 65 65 64 64 6 500 8888 85 85 84 83 83 82 $2 81 80 80 79 ZEN ZII**** 9303 9434 9566 9697 131 *0615 *0745 *0876 *1007 1922 2183 131 2314 131 3616 130 3226 3486 4785 4915 130 6210 129 4526 4656 5822 5951 7114 7243 8402 8531 9687 9815 1096 0968 79 78 77 77 76 7 2341 2481 2621 140 3737 3876 4015 139 5267 5406 139 6653 6791 139 5128 6515 8173 138 138 2053 3356 No. 339 Log *** NOKKIIIII 888 99 98 114 99 113 112 97 97 96 94 8 90 9550 *0922 2291 107 93 106 92 106 92 105 91 104 90 103 111 125 110 124 110 123 95 109 122 95 108 122 102 89 102 137 137 3655❘ 136 5014 136 6081 7372 7501 129 8660 8788 129 9943 *0072 128 1223 1351 128 Diff 9 145 144 144 143 143 142 142 141 128 127 126 531 121 120 119 118 117 116 115 114 135 134 Diff. 142 141 140 139 138 137 136 135 134 133 132 131 130 129 128 127 561 No. 340 Log 531 N. 347 348 349 340 531479 341 342 343 344 345 346 356 357 358 359 360 361 362 350 | 544068 351 352 363 364 365 366 0 Diff. 128 127 126 125 124 123 122 121 120 537819 9076 540329 119 118 117 116 1607 1734 1862 2754 2882 3009 4026 4153 4280 3136 4407 5294 5421 5547 5674 6685 6558 6811 6937 7945 8071 8197 9202 9327 0455 1579 1704 0580 1829 2825 2950 3074 3481 367 4666 368 5848 369 7026 TABLE XXI.-LOGARITHMS OF NUMBERS 4316 4440 4564 5678 5802 5555 6666 6789 7036 5307 6543 6913 353 7775 7898 8021 8144 354 9003 9126 9249 9371 355550228 0351 0473 0595 0717 8267 9494 1938 1450 1572 1694 1816 2668 3155 3883 4368 5094 5578 1 T 0000 13 556303 6423 6544 6664 7507 7627 7748 7868 13 13 13 22222 2222 1 12 12 12 12 12 12 12 4192 5431 8709 8829 8948 9068 9188 99070026 *0146 *0265 *0385 561101 1221 1340 1459 562293 2412 2531 3600 3718 2650 3837 1578 2769 3955 4784 4903 5021 5139 5966 6084 6202 6320 7262 7379 7497 7144 12 12 2790 2911 4004 4126 5215 5336 2 2222~~~~~ 10 10 LO LO LLLL 26 25 25 25 25 25 2 24 24 24 2222 4433 24 24 23 23 3 370 568202 371 9374 | 372 570543 1709 8788 8905 9023 9140 9257 117 9959 *0076 *0193 *0309 *0426 117 1126 1243 1359 1476 1592 117 2291 3336 3452 4494 4610 373 8319 8436 8554 8671 9491 9608 9725 9842 0660 0776 0893 1010 1825 1942 2058 2174 2988 3104 3220 4147 4263 4379 5303 5419 5534 5650 5765 6687 6802 6917 2407 2523 374 2872 3684 3568 4726 375 574031 4841 376 5188 5880 5996 377 7147 6341 6457 6572 7032 378 7492 7607 7722 8066 8181 379 8639 8754 8868 8983 9097 9212 9326 7836 7951 8295 9441 co co co co co co co wwwwww 38 38 38 38 37 37 37 36 3 36 36 9452 0705 1953 3199 35 35 3033 4247 5457 35 4 55000* 00 00 51 51 49 49 48 4 PROPORTIONAL PARTS 48 48 47 47 46 6785 7988 1990 2117 2245 2372 3391 3518 3264 3645 4534 4661 4787 4914 5800 5927 6053 6180 7063 7189 7315 7441 8322 8448 8574 9578 9703 9829 0830 0955 1080 2078 2203 2327 3323 3447 3571 LO 5 64 64 63 63 *“ug 82288232% 62 5 62 61 61 60 4688 5925 7159 8389 60 59 9616 0840 2060 3276 4489 5699 59 58 6905 7026 7146 8108 8228 8349 9308 9428 *0504 | *0624 1698 1817 9548 *0743 1936 2887 3006 3125 4074 5257 5376 5494 6437 6555 6673 7614 7732 7849 4192 4311 6 งงงงงงงง 77 76 76 75 74 74 73 73 72 FHOO 6 71 71 4812 6049 7282 8512 9739 0962 70 70 2181 3398 3519 4610 4731 5820 5940 7 8635 9861 1084 2303 2500 2627 128 3899❘ 127 3772 5041 5167❘ 127 6306 6432 126 7567 7693 126 8699 8825 8951 126 9954 *0079 | *0204 125 1205 1330 1454 125 2452 2576 2701 125 3944 124 3696 3820 4936 5060 6172 6296 7405 7 ********* 8888 90 89 87 86 85 85 84 No. 379 Log 579 83 83 82 81 8 8 5183 124 6419 124 7529 7652 123 8758 8881 123 123 9984 | *0106 1206 1328 122 2425 2547 122 3640 3762 121 4852 4973 121 6061 6182 121 7267 8469 9667 9787❘ 120 *0863 *0982 119 2055 2174 119 3244 3362 119 4429 4548 119 5730 118 6909 118 8084 118 5612 6791 7967 102 102 88 101 88 100 99 112 98 111 98 110 97 109 96 108 9 Diff. 7387 120 8589 120 8410 9555 2639 2755 116 3800 3915 116 4957 5072 116 6111 6226 115 7262 7377 115 8525 115 9669 114 95 94 94 93 9 115 114 113 113 Diff. 128 127 126 125 124 123 122 121 120 107 119 106 118 105 117 104 116 562 No. 380 Log 579 N. 387 388 389 396 397 0 400 | 602060 3144 4226 401 402 403 5305 404 6381 405 607455 406 407 8526 9594 408 610660 409 1723 Diff. 115 114 113 112 111 110 109 108 107 106 105 104 103 TABLE XXI.—LOGARITHMS OF NUMBERS 1176 2214 1 | 380 579784 381580925 382 2063 383 9898 *0012 *0126 1039 1153 1267 2177 2291 2404 *0241 *0355 *0469 *0583 *0697 *0811 | 114 1381 1495 1608 1722 1836 1950 114 2631 2745 2858 2972 3085 114 3879 3992 4105 5235 2518 3199 3312 3426 3539 3652 3765 4218 113 384 4331 4444 4557 4670 4783 4896 5009 5122 5348 113 385 585461 5574 5686 5799 5912 6024 6137 6362 6475 113 386 6587 6700 7037 7149 7262 7486 7599 112 7711 6812 6925 7823 7935 8047 8944 9056 8160 8272 8384 8496 8608 8832 9503 9167 9279 9391 9950 *0061 | *0173 | *0284 | *0396 | *0507 | *0619 8720 112 9615 9726 9838 112 *0730*0842 *0953| 112 12 11 11 11 11 11 11 11 11 1 391 2843 2954 3064 2510 3618 392 3729 3950 4061 393 4724 4834 4945 5055 5165 394 5827 5937 6047 6157 6267 6377 390 591065 1176 1287 1399 1510 1621 1732 2177 2288 2399 2621 2732 3286 3397 3508 3840 4393 4503 4614 5496 5606 5717 395596597 6707 6817 6927 7695 7805 7914 8024 8791 8900 9009 9119 9228 9883 9992 *0101 *0210] *0319 399 600973 1082 1191 1299 1408 7037 7146 7256 7366 7476 8572 9665 8134 8243 8353 8462 9337 9446 9556 *0428 *0537 *0646 *0755 1517 1625 1734 1843 398 11 11 10 10 2 23 23 23 22 22 22 ~~~~~~~ 2211ARA 2 22 22 3313 411 4370 3842 4897 412 413 5950 6055 6160 414 7734 410612784 2890 2996 3102 3419 3525 3630 3736❘ 106 3947 4053 4159 4475 4581 4686 4792 106 5003 510S 5213 5424 5529 5634 5740 5845 105 6265 6370 6476 6581 6686 6790 6895 105 7000 7105 7210 7315 7420 7525 7629 7839 7943 105 8153 8257 8362 8466 8571 8676 8884 8989 105 9198 9302 9406 9511 9615 9719 0240 0344 0448 0552 0656 0760 1280 1384 1488 1592 1695 1799 2318 2421 2525 2628 2732 2835 415 8780 618048 416 9093 417 | 620136 9928 *0032 104 104 0968 1072 9824 0864 1903 2939 418 2007 2110 104 30-12 3146 104 419 21 21 21 21 21 3 3 32H80 2~~~~~~ 35 34 34 34 33 33 2711 2819 2928 3036 108 2169 2277 2386 3253 3361 3469 3794 3902 4010 4118 108 4334 4.142 4550 4658 4766 4874 4982 5089 5197 108 5413 5521 5736 5844 5951 6059 6166 6274 108 6489 6596 5628 6704 6811 7777 7884 6919 7026 7133 7241 | 7348 107 7991 8098 8205 8312 8419 107 9381 9488 107 7562 7669 8633 8740 8847 8954 9061 9167 9274 9701 9808 9914 *0021 *0128 *0234 *0341 *0447 *0554 | | | 0767 0873 0979 1829 1936 2042 1086 1192 1298 1405 107 1511 1617 106 2572 2678❘ 106 2148 2254 2360 2466 33 32 32 32 32 31 31 4 AAABA 4 46 46 PROPORTIONAL PARTS 45 45 44 44 44 43 43 42 42 42 41 2494 3577 3207 4264 5319 5 BANGOR BIJ8888 58 57 57 5 56 56 55 55 54 54 53 2603 3686 53 52 52 6 8802233 822008 69 68 68 6 67 67 66 65 65 64 64 63 62 62 7 TOCOON PORNNI 81 80 79 78 78 77 76 76 75 7 74 74 No. 419 Log 623 6250 7374 73 72 1843 1955 2066 111 3175 111 4282 111 5386 110 6487 110 7586 110 110 109 109 1951 109 4171 5276 8 8 | 5 200000 788888 92 91 90 89 88 86 86 104 103 90 102 101 100 99 85 9 Diff. 8681 9774 *0864 84 83 9 98 97 96 95 95 94 93 Diff. 115 114 113 112 111 110 109 108 107 106 105 104 103 563 No. 420 Log 623 N. 420 623249 421 422 · 423 6340 424 7366 425 628389 426 9410 427 | 630428 428 429 448 449 TABLE XXI.-LOGARITHMS OF NUMBERS 4282 5312 Diff. 430 633468 3569 431 4477 4578 5484 5584 432 433 6488 434 7490 435 638489 436 9486 437 | 64048] 438 439 104 103 102 101 100 99 98 97 96 95 7468 8491 9512 0530 1444 1545 2457 2559 1474 2465 450 653213 451 4177 452 5138 453 6098 454 7056 455 658011 456 8965 457 9916 458 660865 459 1813 440 643453 3551 441 4439 4537 442 5422 5521 443 6404 6502 444 '7383 7481 8458 445 648360 446 9335❘ 9432 447650308 0405 1278 2246 12 ·· 3353 3456 4385 4488 5415 5518 6443 6546 7571 8593 9613 0631 1647 2660 1 10 10 10 10 10 10 10 10 10 10 9586 0581 1573 2563 2852 460 662758 2947 3041 461 3701 3795 3889 3983 462 4642 463 464 5685 5785 6688 6789 7790 6588 7590 7690 8589 8689 9686 9785 8789 8888 9885 0779 0879 0680 1672 1771 1871 2662 2761 2860 3670 4679 2 22222 222AA 3650 4636 21 21 20 20 20 20 20 5619 5717 6600 6698 7579 7676 8555 8653 8750 9530 9627 9724 0502 0599 0696 1375 1472 1569 1666 2343 2440 2536 2633 19 19 19 3 3771 4779 22222 22222 3230 3135 4078 4172 4736 4830 4924 5018 5112 5581 5675 5769 5862 5956 6050 6518 31 31 31 4 30 30 3559 3663 3766 3869 4591 4695 4798 4901 5621 5724 5827 5929 6648 6751 6853 7775 7878 7673 8695 8797 8900 9715 9817 0733 0835 1748 1849 2761 2862 3749 3847 4734 4832 30 29 29 29 29 3872 4880 5886 6889 7890 4 5815 6796 7774 42 41 41 40 40 40 39 39 38 38 LO 5 NNHHO 89**** 51 51 50 PROPORTIONAL PARTS 50 49 3973 5004 6032 6956 7058 7161 8185 7980 8082 9002 9104 9206 9919 *0021 *0123 *0224 0936 1038 1139 1241 1951 2052 2153 2255 2963 3064 3165 3266 49 48 48 3973 4074 4981 5081 5986 6989 7990 8090 8190 8988 9088 9188 9984 *0084 *0183 0978 1077 1970 2069 3058 2959 8848 9821 0793 1762 2730 3946 4044 4931 5029 5913 6894 7872 7969 3695 4658 5619 3309 3405 4273 4369 5235 4946 5906 3502 3598 3791 3888 3984 4465 4562 4754 4850 5331 5427 5523 5715 5810 6002 6290 6386 6482 6577 6673 6769 6864 6960 96 7247 7343 7438 7534 7629 7725 8107 8202 8298 8393 8488 8584 9060 9155 9250 9346 9441 6194 7152 7820 7916 96 8679 8774 8870 95 9631 9726 95 9821 *0581 *0676 *0771 | | 1529 1623 1718 95 9536 | | *0011 *0106 *0201 *0296 *0391 *0486 0960 1055 1150 1245 1339 1434 1907 2002 2096 2191 2286 2380 2475 2569 2663 6 46666 82233 6087 7089 61 6011 6992 61 60 59 59 3324 4266 5206 6143 z「。 7 8 58 58 57 4175 5182 6187 7189 6237 6331 6424 94 6612 6705 6799 6892 6986 7079 7173 7266 7360 94 No. 464 Log 667 4076 5107 6135 1177 1276 2168 2267 3156 3255 4276 5283 6287 7290 8290 9287 *0283 22688 JIZZZ 69 69 67 67 8067 8945 9043 9919 *0016 0890 0987 1084 1181 1859 1956 2053 2150 2826 2923 3019 3116 97 9 Diff. 4143 4242 4340 98 5127 5226 5324 98 6110 6208 7089 4179❘ 103 5210 103 6238 103 7263❘ 103 8287 102 9308 | 102 *0326❘ 102 1342 102 ***** **** 2356❘ 101 3367❘ 101 6306 98 7187 7285 98 8165 8262 98 9140 9237 0113 *0210 97 97 97 3418 3512 3607 4360 4454 4548 5299 5393 5487 5 | 6 | 7 | 8 | 91 Diff. 52 62 73 83 52 62 72 71 71 82 82 81 70 80 79 78 4376 101 5383 101 6388 100 7390 100 8389 100 9387❘ 100 *0382 99 1375 99 99 2366 3354 99 78 77 76 8888 4080 96 96 5042 96 94 93 92 91 90 9999 HONE 8888 97 89 87 86 86 AA LLLLL 95 95 94 94 94 104 103 102 101 100 99 98 97 96 95 564 No. 465 Log N. 465 466 123 3 7826 8759 667453 7546 7640 7733 8386 8479 467 9317 9410 468 670246 0339 469 1173 1265 8572 8665 9503 9596 9689 0431 0524 0617 1358 1451 1543 480 481 470 672098 471 3021 472 3942 473 4861 474 475 676694 476 7607 5778 5870 5962 6053 6785 6876 6968 7698 7789 7881 8609 8700 8791 9519 9610 0426 0517 477 8518 478 9700 9428 479 680336 0607 Diff. 482 483 484 485 486 6636 6726 487 7529 7618 488 8420 8509 489 9309 9398 ***HA 888 94 93 TABLE XXI.-LOGARITHMS OF NUMBERS Log 667 92 91 90 0 491 1081 492 490690196 0285 0373 0462 1170 1258 1347 2053 2142 2230 2935 3023 3111 3991 1965 493 2847 494 3727 495 694605 3815 3903 4693 5482 5569 5657 4781 4868 496 497 6356 6444 6531 498 7229 7317 7404 499 8101 8188 8275 89 87 86 85 681241 1332 1422 2145 2235 2326 3047 3137 3227 3947 4037 4127 4935 5025 5831 4845 685742 1 2190 2283 2375 2467 3113 3205 3297 3390 4034 4126 4218 4953 5045 5137 66666 9 ∞∞∞∞∞ ∞∞0777 aaaa O) 9 9 9 9 9 2775 3635 4494 5179 5265 5350 6035 6120 6206 6718 6803 6888 6974 7059 19 234 19 1513 2416 3317 4217 5114 5921 6010 6815 6904 7707 7796 8598 9486 8687 9575 18 18 9751 87 0617 87 500698970 501 9838 502 700704 503 1568 504 2431 505 703291 506 4151 4236 4322 4408 507 5008 5094 508 5864 5949 509 9057 9144 9231 9317 9404 9491 9578 9664 9924 0011 *0098 *0184 *0271 0358 *0444 *0531 0790 0877 0963 1136 1222 1309 1395 1482 86 1654 1741 1827 1999 2086 2172 2258 2344 86 2517 2603 2689 2861 2947 3033 3119 3205 86 3721❘ 3807 3893 3979 4065 86 4579 4665 4751 4837 4922 86 5436 5522 5607 5693 5778 86 6291 6376 6462 6547 6632 85 7144) 7229 7315 7400 7485 85 3377 3463 3549 18 18 18 17 17 17 OOOOOONN NOaaa 28 28 28 27 27 27 26 26 26 26 4 38 37 37 36 36 36 35 PROPORTIONAL PARTS 35 34 34 4310 5228 5320 6145 6236 7059 7151 7972 8063 8973 8882 9791 9882 0698 0789 1050 1913 5 7920 8852 5 9782 0710 1636 47 47 46 46 45 2560 3482 4402 45 44 44 43 43 2759 88 0550 0639 0728 0816 0905 0993 89 1435 1524 1612 1700 1789 1877 88 2318 2406 2494 2583 2671 3199 3287 3375 3463 3551 3639 88 4078 4166 4254 4342 4430 4517 88 4956 5044 5131 5219 5307 5394 88 5832 5919 6007 6094 6182 6269 87 6618 6706 6793 6880 6968 7055 7142 87 7491 7578 7665 7752 7839 7926 8014 87 8362 8449 8535 8622 8709 8796 8883 87 5744 2055 90 2957 90 3407 3857 90 4307 4396 1603 1693 1784 1874 1964 2506 2596 2686 2777 2867 3497 3587 3677 3767 4486 4576 4666 4756 90 5383 5473 5563 5652 90 6279 6368 6458 6547 89 7351 7440 89 8331 89 5204 5294 6100 6189 7083 7172 7261 6994 7886 8064 8153 8242 7975 8776 8865 9664 9753 8953 89 9841 6 8013 8945 9875 0802 0895 0988 1080 93 1728 1821 1913 2005 93 68051 MONNA 55 55 6 2652 2744 3574 3666 4494 4586 5412 5503 6419 2836 2929 92 3758 3850 92 4677 4769 92 5595 5687 92 6511 6328 7242 6602 92 7333 7424 7516 91 8154 8245 8336 8427 91 9064 9155 9246 9337 91 99730063 *0154 0879 0970 1060 0245 91 1151 91 54 53 53 52 52 51 8106 8199 8293 93 9038 9131 9224 93 9967 *0060 *0153 7 ***** **PRO 7 66 No. 509 Log 707 65 64 89 9012 9131 9220 9930 *0019 *0107 89 64 63 62 62 61 60 60 | 8 | 9 777 75 74 74 73 72 Diff. 71 70 70 69 68 **** 20ONE 85 **** 22222 84 83 82 81 93 80 79 78 77 77 8888 Diff. ***H* **0000000 94 93 92 91 90 89 88 87 86 85 565 No. 510 Log 707 N. 0 510 511 512 513 710117 514 0963 515 711807 516 517 518 519 552 553 554 Diff. ******* 2 86 85 520716003 6087 6170 521 6838 6921 7004 7671 7754 7837 7920 8502 8585 8668 8751 522 523 9331 9414 9497 9580 524 525 |720159 526 0986 0407 0242 1068 1811 1893 2634 528 2716 529 3456 3538 527 0325 1151 1233 1975 2058 2798 2881 3620 3702 84 TABLE XXI.-LOGARITHMS OF NUMBERS 707570 8421 9270 83 82 2650 3491 4330 5167 81 80 79 4522 4604 531 5176 5258 5340 5422 532 533 534 530 724276 4358 4440 5095 5912 5993 6075 6156 6238 6727 6809 6890 6972 7053 7541 7623 7704 7785 7866 535728354 8435 8516 8597 8678 536 9165 9246 9327 9408 9489 537 9974 *0055 | *0136 | *0217 *0298 | 538 730782 0863 0944 1024 1105 539 1589 1669 1750 1830 1911 540 732394 541 3197 2474 2555 2635 2715 3278 3358 3438 3518 4079 4160 4240 4320 542 3999 543 4800 4880 5599 5679 4960 5040 5120 5759 6556 5838 5918 6635 6715 7352 7431 7511 544 545 736397 6476 546 7193 7272 547 7987 8781 8860 8939 9018 9097 9572 9651 9731 9810 9889 8067 8146 8225 8305 548 549 1 ∞∞∞∞ ∞ ∞ ∞ 9 9 8 1 8 8 8 8 7655 7740 7826 8506 8591 8676 9355 9440 9524 0202 0287 0371 1048 1132 1217 1892 1976 2060 2734 2902 3575 3742 4414 4581 4665 5251 5418 5502 2 ZENE900 o 17 17 17 2 17 16 2818 3659 4497 5335 16 16 16 0836 551 550 | 740363 0442 0521 0600 0678 0757 0915 0994 1073 79 1152 1230 1309 1388 1467 1546 1624 1703 1782 1860 79 1939 2018 2096 2175 2254 2332 2411 2489 2568 2647 79 2725 2804 2882 2961 3039 3118 3196 3275 3353 3431 78 3510 3588 3667 3745 3823 3902 3980 4058 4136 4215 78 3 3 22****** 26 26 25 25 25 24 24 24 4 4 34 34 34 33 7911 8761 9609 0456 1301 6337 6254 7088 7171 8003 8834 9663 0490 1316 2140 2963 3045 3784 3866 1**≈≈≈≈ 32 33 32 32 2144 2986 3070 3826 3910 4749 5586 PROPORTIONAL PARTS 5 **22778 43 43 42 56 7 8 9 1 Diff. 8166 8251 8336 85 9015 9100 9185 85 9863 9948 *0033 85 0710 0794 0879 85 1639 1723 84 2481 2566 84 3323 3407 84 4162 4246 84 5000 5084 84 5836 5920 84 7996 8081 8846 8931 9694 9779 0540 0625 1385 1470 2229 2313 3154 3994 4833 5669 42 41 41 6320 6401 7134 7216 7948 8029 8759 8841 9570 9651 9732 9813 9893 *0378 *0459 | *0540 *0621 *0702 | | | | 40 40 4685 5503 6421 6504 6588 6671 7254 7338 7421 7504 8253 6754 83 7587 83 8419 83 9248 83 9994 *0077 83 8336 9165 8086 8169 8917 9000 9083 9745 9828 9911 0573 0655 0738 1398 1481 2222 2305 0903 83 1728 82 2552 82 3374 3127 82 4194 82 3948 2796 3598 4400 5200 5998 6795 7590 8384 9177 9256 9968 *0047 4767 4849 4931 5585 5667 5748 6 1186 1266 1347 1428 1508 1991 2072 2152 2233 2313 1554 2397 3238 2588*9* to the 4078 4916 5753 51 50 50 49 49 48 0821 1563 1646 2387 2469 3209 3291 4030 4112 47 80 2876 2956 3679 3759 4480 4560 5279 5359 3037 3117 3839 3919 80 4640 4720 80 5439 5519 80 6237 6317 80 7034 7113 6078 6157 6874 6954 7670 7749 7829 7908 79 8543 8622 8701 79 8463 7 No. 554 Log 744 7460 81 6483 6564 7297 7379 8110 8191 8273 81 8922 9003 9084 81 81 81 81 81 888MANY 1 60 60 59 58 9335 9414 9493 79 *0126 | *0205 | *0284 79 57 57 56 55 8 5013 82 5830 82 6646 82 2 p*8:208 69 68 67 66 66 65 64 63 9 **** 8888 2 ZZPISES 77 77 2222 76 75 74 73 72 71 888888*2** ****000 80 Diff. B*****8 2 86 85 84 83 82 81 80 79 566 No. 555 555 Log 744 N. 555 744293 556 557 558 6634 559 7412 0 564 1279 565 752048 566 2816 567 3583 568 569 TABLE XXI.-LOGARITHMS OF NUMBERS 570755875 6636 7396 596 597 598 599 Diff. 4371 4449 5075 5153 5231 5855 5933 6712 7489 78 77 76 NIZALEZ 6103 571 5951 6027 6712 6788 7472 7548 6864 572 573 8155 8230 8306 7624 8382 574 8912 8988 9063 9139 575759668 9743 9819 9894 576 760422 0498 0573 0649 577 1176 1251 1326 1402 1928 2003 2153 578 579 2078 2679 2754 2829 2904 75 580763428 3503 3578 581 582 4176 4251 4326 4923 4998 5072 5669 5743 5818 584 6413 6487 6562 583 585767156 7230 7304 7379 8860 586 7898 7972 8046 8120 587 8638 8712 8786 9377 $151 9525 589770115 0189 0263 588 9599 0336 74 73 72 8266 8343 9040 9118 560 748188 8421 8498 8576 561 8963 9195 9272 9350 562 9736 9814 9891 9968 *0045 *0123 563750508 0586 0663 0740 0817 0894 1356 1433 1510 1587 1664 2125 2202 2279 2356 2893 3660 2433 2970 3047 3123 3736 3813 3889 4578 4654 4348 4425 5112 5189 4501 5265 5341 5417 1 1 8 ∞∞∞∞777 8 2 590 | 770852 1073 1146 0926 0999 1587 1661 1734 591 1808 1881 592 2542 2615 593 2322 2395 2468 3055 3128 3201 3274 3348 594 3786 3860 3933 4006 4079 595774517 4590 4663 4736 4809 5246 5319 5392 5465 5538 5974 6047 6120 6193 6265 6701 6774 6846 6919 6992 7427 7499 7572 7644 7717 8 8 4528 5309 6089 6011 6790 6868 7567 7645 2 3 16 15 15 15 15 15 14 3 3653 4400 5147 23 23 23 23 22 22 22 5892 6636 *** 4 2222222 4 31 31 30 30 30 29 29 4606 4684 5387 5465 5543 6167 6245 6323 6945 7023 7101 7722 7800 7878 3727 4475 5221 5966 6710 7453 8194 8934 9673 0410 5 39 6180 6256 6332 6408 6940 7016 7092 7168 7700 7775 7851 7927 8609 8685 8458 8533 9214 9290 9366 9441 9970 *0045 0121 *0196 0724 0799 0875 0950 1477 1552 1627 1702 2228 2303 2378 2453 3053 3128 2978 3203 PROPORTIONAL PARTS wo wo wo wo wo wo co 5 39 38 38 37 37 36 4730 5494 8653 8731 8808 8885 77 9427 9504 9582 9659 77 *0200 | *0277 | *0354 | *0431 0971 1048 1125 1202 77 1895 1972 77 1741 1818 2509 2586 2663 3200 3277 3353 3430 4119 4195 3966 4042 4807 4883 4960 5722 5570 5646 7527 8268 9008 9082 9746 9820 0484 0557 7064 7789 6 ******* 6 47 46 5621 4762 4840 4919 4997 78 5699 5777 78 6479 6556 78 7256 7334 78 8033 8110 78 6401 7179 7955 46 45 3802 3877 4550 4624 3952 4699 5296 5370 5445 5520 6041 6115 6190 6264 6785 6859 6933 7007 7749 7082 74 7823 74 7675 8416 8490 8564 74 9156 9230 9303 74 9894 9968 | *0042 74 0705 0631 0778 74 44 44 43 7601 8342 7 1220 1293 1367 1440 1514 1955 2028 2102 2175 74 2248 73 2908 2981 73 2688 2762 2835 4298 4371 4444 5100 3421 3494 3567 3640 3713 73 4152 4225 4882 4955 5610 5683 6338 6411 6483 7137 7209 7282 7862 7934 8006 5028 5756 5173 5902 5829 73 73 73 73 73 72 6556 6629 No. 599 Log 778 89 Diff. 7 BAKKNES 55 54 53 53 52 51 50 6484 7244 8 6560 76 8003 76 76 76 7320 76 8079 8761 8836 9517 9592 *0272 *0347 | 75 1025 1101 75 1778 1853 75 2529 2604 75 3278 3353 75 62 62 61 4027 4101 4774 4848 ***8-88 2740 77 3506 77 4272 77 60 5036 76 59 58 58 5799 76 75 75 5594 75 6338 74 7354 8079 0000000000 EEEEEEEE88 29 9 2008785 77 69 68 68 67 66 65 ZZZZZZZZZZ Diff. ZIPRZEZ 78 77 76 75 74 73 72 567 No. 600 Log 778 N. 600 601 602 603780317 1037 604 605 | 781755 606 607 608 3904 609 4617 0 620 792392 3092 621 622 Diff. 88 2222 TABLE XXI.-LOGARITHMS OF NUMBERS 778151 8874 9596 73 72 2462 3162 3790 3860 623 4488 4558 5254 624 5185 625 795880 5949 626 6574 6644 627 7268 628 7960 629 8651 71 70 2473 3189 69 68 5401 5472 5543 5615 6893 6964 7035 7673 610 785330 611 6041 6112 6183 6254 6325 612 6751 6822 613 7460 7531 7602 614 8168 8239 8310 615|788875 8946 9016 9581 9651 9722 617790285 0988 7744 8381 8451 9087 9157 616 9792 9863 0426 0567 0356 1059 618 1129 619 1691 1761 1831 1901 1 1 8224 8296 8368 8947 9019 9091 9669 9741 9813 0389 0461 0533 1109 1181 1253 1827 1899 1971 2544 2616 2688 3260 3332 3403 3975 4046 4118 4689 4760 4831 7227 งง 630 799341 9409 9478 9547 631 800029 0098 0167 0236 632 0717 0786 0854 0923 633 1404 1472 1541 1609 634 2089 2158 2226 2295 2363 635 | 802774 2842 2910 2979 3047 3457 3525 3594 3662 3730 4139 4208 4276 4344 4821 4889 4957 5025 5501 5569 5637 636 637 638 639 5705 2 7337 7406 7475 8029 8098 8167 8720 8789 8858 640 806180 6248 6316 6384 6451 641 6858 6926 6994 7061 7129 642 7535 7603 7670 7738 7806 643 8211 8279 8346 8414 8481 644 8886 8953 9021 9088 9156 645809560 9627 9694 9762 9829 646810233 0300 0367 0434 0501 647 0904 0971 1039 1106 1173 648 1575 1642 1709 1776 1843 649 2 คง 15 14 14 LLL LL 14 14 14 3 3 0496 1199 2532 2602 2672 3231 3301 3371 3930 4000 4070 4627 4697 5324 5393 6019 6088 6158 4767 5463 6713 6782 6852 7545 8236 8927 2222 22 21 21 21 20 *** 4 4 22** *7 29 29 0605 1324 2042 2759 3475 4189 4902 2245 2312 2379 2445 2512 2579 2646 2713 28 28 28 8441 8513 8585 9163 9236 9308 9380 9957 *0029 *0101 | | 9885 27 5686 5757 5828 5899 5970 71 6680 71 6396 6467 6538 6609 7106 7177 7248 7319 8027 7815 7885 8522 8593 7390 71 7956 8098 71 8663 8734 8804 9228 9299 9369 9440 9510 71 9933 *0004 *0074 | *0144 *0215 70 0637 0707 1269 1340 0778 0848 0918 70 1480 1550 1620 2181 70 1971 2041 2252 2322 70 PROPORTIONAL PARTS 5 coco co co co como 5 9616 9685 9754 0305 0373 0442 37 36 36 35 2742 3441 4139 4836 5532 6227 6921 7614 8305 8996 35 34 8658 8730 8802 72 9452 9524 72 *0173 *0245 72 0677 0749 0821 0893 0965 72 1396 1468 1540 1612 1684 72 2258 2329 2401 72 2974 3046 3117 72 3689 3761 3832 71 4475 4546 71 5187 5259 2114 2186 2831 2902 3546 3618 4261 4332 4403 4974 5045 5116 6 6519 7197 6 1410 2111 9823 0511 0992 1061 1129 1198 1678 1747 1815 2500 1884 2568 2637 2705 2432 3116 3184 3252 3321 3389 3798 3867 4412 4480 4548 68 3935 4003 4071 68 4616 4685 5093 5161 5229 5297 5773 5365 4753 5433 6112 5841 5908 5976 6044 2812 2882 3511 3581 4209 4279 4906 4976 5672 6366 7060 44 43 43 42 !44 5602 6297 41 6990 7683 8374 9065 41 6587 7264 7 7752 8443 9134 7 6655 6723 7332 7400 6790 7467 7873 7941 8008 8076 8143 8549 8616 8684 8751 8818 9223 9290 9358 9425 9492 9896 9964 *0031 | *0098 | *0165 0569 0636 0703 0770 0837 1240 1307 1374 1441 1910 1977 2044 2111 500 000 000 51 No. 649 Log 812 49 48 48 8 2952 3022 70 3721 3651 4349 70 4418 70 5045 5115 70 5741 5811 7821 8513 9203 6436 6505 69 7129 7198 69 69 69 69 9892 0580 1266 9 Diff 9961 0648 1335 1952 2021 58 58 8 3 | 5 9 en er eenen en 7890 8582 9272 57 56 55 54 28 **** ?????22%** ***⠀⠀⠀⠀⠀⠀⠀ ⠀⠀⠀8822222 2222222222 22; 67 67 1508 67 2178 67 2780 2847 67 66 65 64 63 70 62 61 69 69 69 69 68 68 69 68 68 68 68 67 67 Diff. ** SENS 73 72 71 70 69 68 568 No. 650 Log 812 N. 650 812913 651 3581 652 4248 653 4913 654 5578 660819544 661820201 670826075 4314 4381 4980 5046 5644 5711 6308 6374 6970 7036 7102 7565 7631 7698 7764 658 8226 8292 8358 8424 659 8885 8951 9017 9083 655816241 656 6904 657 680832509 681 3147 682 662 0858 663 1514 664 2168 665 | 822822 3474 3539 3605 4126 4191 668 4776 4841 669 5426 5491 666 667 Diff. TABLE XXI.-LOGARITHMS OF NUMBERS 67 66 65 *22*62 64 63 12 1 7776 ∞ ∞ 6 6 9741 0399 9610 9676 0267 0333 0924 0989 1579 1645 2233 2299 1055 1710 2364 2887 2952 3018 6269 6917 671 6140 6204 6723 6787 6852 7369 7434 7499 8015 8080 8144 672 7563 673 674 8209 8853 9497 8660 8724 8789 675 829304 9368 9432 676 9947 *0011 *0075 *0139 *0204 677830589 0653 0717 0781 0845 678 1230 1294 1358 1422 679 1870 1934 1998 1486 2126 2062 2980 3047 4514 4048 4647 4714 5312 5378 5179 5246 3114 3648 3714 3781 4447 5113 5777 5843 6440 6506 7169 7830 7896 7962 8028 8490 8556 8622 8688 9149 9215 9281 9346 5910 5976 6042 6573 6639 6705 7235 7301 7367 3 3670 4256 4321 4906 4971 5556 5621 2 13 13 13 13 13 12 3 222-** 4 20 20 20 19 19 19 3181 3848 4 27 26 26 26 25 25 1775 2430 3083 3735 4386 5036 5686 9807 9873 0464 9939 0595 1120 1186 1251 0530 1841 1906 2495 2560 3148 3213 3800 3865 4451 4516 5101 5166 5751 5815 5 2573 2637 3211 3275 2700 3338 3975 2764 2828 3402 3466 2956 2892 3530 3020 3083 64 3593 3657 3721 64 3784 3848 3912 683 4484 4548 4039 4103 4166 4230 4294 4357 64 4611 4675 5120 5183 5247 5310 4739 4421 5056 685 835691 64 4802 5437 684 4866 4929 4993 5500 5564 5627 5373 5944 6071 6134 6197 6261 63 686 687 5754 5817 5881 6007 6514 6577 6641 7146 7210 7273 7778 7841 7904 7967 8030 689 8219 8282 8345 8408 8534 6324 6387 6451 6957 7020 7083 7588 7652 7715 6704 7336 688 8471 3247 3314 3914 3981 4581 PROPORTIONAL PARTS 233222 6 0909 1550 2189 9164 9227 63 693 694 690 838849 8912 8975 9038 9101 9289 9352 9415 63 691 9478 9541 9604 9667 9729 9792 9855 9918 9981 *0043 692 840106 0169 0232 0294 0357 0420 0482 0545 0608 0671 63 0733 0796 0859 0921 0984 1046 1109 1172 1234 1297 1359 1422 1485 1547 1610 1672 1735 1797 1860 1922 2172 2235 2297 2360 2422 2484 2547 2796 2859 2921 2983 3046 3108 3170 3420 3482 3544 3606 4042 4104 4166 4229 4664 4726 4788 4850 695 841985 2047 2609 2672 3233 3295 2110 2734 63 63 62 62 62 696 697 3357 698 3855 3918 3980 699 4477 4539 4601 3669 4291 4912 3731 3793 4353 4415 62 4974 5036 62 34 › | S 31 6 7 40 40 39 38 38 37 6334 6399 6464 6528 6981 7046 7111 7175 7628 7692 7757 7821 8273 8338 8402 8467 8918 8982 9046 9111 9561 9625 9690 9754 9818 9882 64 6593 6658 65 7240 7305 65 7886 7951 65 8531 8595 64 9175 9239 64 *0268 *0332 *0396 *0460 *0525 64 1037 1102 1166 64 No. 699 Log 845 7 3381 3448 3514 67 4114 4181 67 4780 4847 67 5445 5511 66 6109 6175 66 6771 6838 66 7433 7499 66 8094 8160 66 8754 8820 66 9412 9478 66 *0004 | *0070] *0136 66 0661 0727 3279 3930 4581 1317 1382 1448 66 1972 2037 2103 65 2626 2691 2756 65 3344 3409 65 3996 4061 65 4646 4711 65 5296 5361 65 5945 6010 65 5231 5880 0973 1614 1678 1742 1806 2253 2317 2381 2445 47 46 46 45 44 43 8 8 XANHAA 54 53 52 0792 51 9 Diff. 50 50 6767 6830 6894 63 7399 7462 7525 63 8093 8156 63 8597 8660 8723 8786 63 9 5578888888 888 646558 60 59 66 59 PPARA AA 57 FFF JEFF❤❤❤❤❤* *** 64 64 63 88885 Diff. 232*** 67 66 65 64 63 62 569 No. 700 Log 845 N. To│·· 700845098 701 702 703 704 705 706 8805 707 9419 708 850033 709 0646 710 851258 711 1870 2480 712 713 3090 714 3698 715 854306 4913 716 717 718 719 727 728 729 720 | 857332 7935 721 722 723 724 9739 725 | 860338 726 5160 5222 5284 5718 5780 5842 5901 6337 6399 6461 6523 6955 7017 7079 7573 848189 7634 7696 8251 8312 8866 8928 9481 9542 0095 0156 0707 0769 730 863323 731 Dia. ** 222 62 61 60 TABLE XXI.-LOGARITHMS OF NUMBERS 1320 1381 1931 1992 2541 2602 3150 3211 3759 3820 4367 4428 4974 5034 5519 5580 5640 6124 6185 6729 59 58 1 1 2 3 4 5 6 7 8 9 696 6245 6789 6850 6 6 732 3917 4511 5104 5696 733 734 735 866287 6465 6524 736 6878 6937 7055 7114 737 7467 7526 7585 7644 7703 738 8056 8115 8174 8233 8292 739 8644 8703 7393 7453 7995 8056 8657 8718 8537 8597 9138 9318 9918 9198 9258 9799 9859 0398 0458 0518 0937 0996 1056 1116 1176 1534 1594 1654 1714 1773 2131 2191 2251 2310 2370 2728 2787 2847 2906 2966 2 222 22 6405 6996 3382 3442 3501 3561 3977 4036 4096 4155 4570 4630 4689 4748 5163 5222 5282 5341 5755 5814 5874 5933 6346 3 0 00 00 00 m 19 6585 7819 8435 7141 7202 7758 8374 8989 9051 9604| 9665 0217 0279 0830 0891 18 7513 8116 18 5701 5761 6306 6366 6910 6970 18 17 1442 1503 1564 1625 2053 2114 2175 2236 2785 2663 2724 3272 3333 3881 3941 3394 4002 4063 4488 4549 4610 4670 5277 5095 5156 5216 5822 5882 6427 6487 7031 7091 5400 5992 6583 7173 7762 8350 8762 8821 8879 8938 5346 5408 5470 5532 5594 5656 62 5966 6028 6090 6151 6213 6275 62 6646 6708 6770 6832 6894 7264 7326 7388 8004 7449 7511 62 8066 8128 62 7881 7943 8497 8559 8743 62 9297 9358 61 9911 9972 61 0524 0585 61 1136 1197 61 4 *** ** 7574 8176 8778 9379 9978 0578 25 24 24 7821 8409 8997 9584 | 59 9290 9349 9408 9466 9525 9642 9701 9760 59 9877 9935 9994 *0053 *0111*0170 *0228 *0287 | *0345 | | 0462 0521 0579 0638 0696 0755 1047 1106 1164 1223 1281 1339 1631 0813 0872 0930 740 869232 741 9818 742 870404 743 0989 1573 745 872156 58 1398 1456 1515 58 1981 744 1690 1748 1806 1865 1923 2040 2098 58 2215 2273 2331 2389 2448 746 2739 2797 2855 2913 2972 3030 747 3321 3379 3437 3495 3553 3611 3902 3960 4018 4076 4134 4192 749 4482 4540 4598 4656 4714 4772 748 PROPORTIONAL PARTS 24 23 5 9112 9726 0340 0952 228 88 31 31 30 1833 2430 3025 30 29 7634 7694 7875 60 8236 8297 8477 60 8838 60 8898 8958 9018 9078 60 9439 9499| 9559| 9619| 9679 *0038 *0098 *0158 *0218 *0278 | 0637 0697 60 0757 0817 0877 60 1355 1415 1475 60 1236 1295 1952 2012 2072 60 1893 2489 3085 2549 2608 3144 3204 6 coco co was caused 9174 9788 8620 8682 9235 9849 0401 0462 1075 1014 6642 7232 36 37 37 35 59 3620 3680 3739 4214 4274 4333 4808 4926 3799 3858 4392 4452 4985 59 4867 5045 59 5459 5519 5578 5637 59 6051 6110 6169 6228 59 35 1686 2297 1747 1809 61 2419 61 2358 2846 2907 2968 3029 61 3455 3516 3577 3637 61 4124 4185 4245 61 4731 4792 4852 61 5337 5398 5459 61 5943 6003 6064 61 6548 6608 6668 60 7152 7212 7272 7755 7815 8357 8417 7 No. 749 Log 875 8468 9056 2564 3146 2506 2622 2681 58 3088 3669 3727 4250 4308 3204 3262 58 3785 3844 58 4366 4424 58 4830 4888 4945 5003 58 ***** 6701 6760 6819 59 43 43 42 7291 7350 7409 59 7880 41 41 Jand Jarak 8 Diff 999999998 88888 50 62 7939 7998 59 8527 8586 59 9114 9173 59 49 48 2668 60 3263 60 88 8888888888 **DAAAAAAA AAAAAI 47 46 60 9 56 55 54 53 52 Diff. STO AX 62 61 60 59 58 570 No. 750 Log 875 N. 750 875061 751 5640 752 6218 753 6795 754 7371 755 877947 756 757 758 759 767 768 0 787 788 789 TABLE XXI.—LOGARITHMS OF NUMBERS 780 892095 781 Diff. 8522 9096 9669 880242 7760700 57 56 55 54 782 783 2150 2206 2262 2651 2707 2762 2818 3207 3262 3318 3373 3762 3817 3873 3928 784 4316 4427 4482 785 894870 4980 5036 5588 6140 4371 4925 5423 5478 5533 786 5975 6030 6085 6526 6581 6636 7077 7132 7187 1 1 CO CO CO LO 6829 770 886491 6547 6604 771 7054 7111 7617 7674 7392 772 7730 7955 7898 8460 773 8179 8516 774 8236 8292 8797 8853 9358 8741 775 889302 8909 9414 9974 7786 7842 8348 8404 8965 9021 9077 9470 9526 9582 9638 *0030 | *0086 | *0141 | *0197 0533 0589 0645 0700 0756 1259 1314 1816 1872 776 9918 9862 890421 777 778 0980 1537 0477 1035 1091 1147 1593 1649 1705 779 6 6 6 5119 5177 5698 5756 6276 6333 6853 6910 6968 7429 7487 7544 8004 8062 8119 8579 8637 8694 9153 9211 9268 9841 9726 9784 0299 0356 0413 760 880814 761 1385 0871 1442 1955 2012 1042 1099 1156 1213 1271 1613 1670 1727 1784 1841 2183 2240 2297 2354 2411 2923 762 763 2525 2695 2752 2809 2866 3264 3321 3377 1328 57 1898 57 2468 57 2980 3037 57 3548 3605 57 4059 4115 4172 57 4625 5192 5700 5757 3434 3491 0928 0985 1499 1556 2069 2126 2581 2638 764 3093 3150 3207 765 883661 3718 3775 4229 4285 4342 4795 4852 4909 5361 5418 5474 769 5926 5983 6039 3945 4002 766 4739 57 3832 3888 4399 4455 4965 5022 5531 4512 4569 5078 5135 5644 4682 5248 5587 5813 5305 57 5870 57 6434 56 6096 6152 6209 6265 6321 6378 2 111 pol 2 11 Josh Janda Jatok, 792 793 790 897627 7682 7737 7792 7847 7902 7957 791 8176 8231 8286 8341 8396 8451 8506 8725 8780 8835 8890 8944 8999 9054 9273 9328 9383 9437 9492 9547 9602 794 9821 9875 9930 9985 | *0039 | *0094 | *0149 795 900367 0422 0476 0531 0586 0640 0695 796 0913 0968 1022 1077 1131 1186 1240 797 1458 1513 1567 1622 1676 1731 1785 798 2003 2057 2112 2166 2221 2275 2329 799 2547 2601 2655 2710 2764 2818 2873 11 3 11 11 3 17 17 17 16 4 6716 6773 6660 7167 7223 7280 7336 8752 9325 9898 0471 5466 5524 5582 58 5235 5293 5351 5409 5813 5871 5929 6391 6449 6507 5987 6045 6102 6680 6160 58 6737 58 6564 6622 7026 7083 7141 7199 7256 7602 7659 7717 7774 7314 58 7889 58 8407 8464 7832 8177 8234 8292 8981 9039 8349 8809 8866 8924 9383 9440 9956 *0013 9497 9555 9612 57 *0070 *0127 *0185 | 0528 0585 0642 0699 57 0756 57 4 2222 23 1203 1760 LO 5 PROPORTIONAL PARTS 5 2822 2317 2373 2873 2929 3429 3484 3984 4538 5091 5644 6195 3540 3595 4039 4094 4593 4648 5146 5201 5257 5699 5754 5809 6251 6306 6361 6802 6857 6912 7352 7407 7462 6692 6747 7242 7297 29 27 6 6 **** 34 34 33 32 7 6885 7449 7 8011 8573 2429 2484 2540 2985 3040 3096 3651 6942 6998 56 8067 7505 7561 56 8123 56 8629 8685 56 9190 9246 56 9694 9750 9806 *0253 | *0309 | *0365 9134 56 56 0812 0868 0924 56 1370 1426 1482 56 1928 1983 2039 No. 799 Log 903 988888888 8 40 39 4150 4205 4704 4759 39 38 8 2595 3151 3706 4261 4814 5312 5367 5864 5920 6416 6471 6967 7022 7517 7572 46 45 44 43 9 9 Diff. 5889 8012 8067 $122 55 8561 8615 8670 55 9109 9164 9218 55 9656 9711 9766 55 0203 | *0258 | *0312 55 0749 0804 0859 55 1295 1349 1404 55 1840 1894 1948 54 2384 2438 2492 54 2927 2981 3036 54 51 50 ཡུག་གཡུགཐག ཐགགགགཐགག 50 57 49 eer eeeeeggggg goods 56 56 56 56 55 55 55 55 55 55 55 Diff. 57 56 55 54 571 No. 800 Log 903 N. 800 801 802 903090 3633 4174 803 4716 804 5256 805 905796 806 6335 807 6874 808 7411 809 7949 811 812 813 814 815 816 817 818 819 0 827 828 829 TABLE XXI.—LOGARITHMS OF NUMBERS Diff. 55 54 53 52 3920 4449 820913814 3867 821 4343 4396 822 4872 4925 4977 5400 5453 5505 5927 5980 6033 823 824 825 916454 6507 6559 826 6980 7033 7085 7506 7558 7611 8083 8135 8607 8030 8555 8592 8646 9128 9181 810908485 8539 9021 9074 9556 9610 9663 9716 910091 0197 0251 0304 0144 0624 0678 911158 1211 1690 1743 2222 2275 0731 0784 0838 1264 1317 1371 1797 1850 1903 2328 2381 2435 2753 2806 2859 2913 3284 3337 3390 2966 3496 3443 1 1 6 5 CO LO LO LO 2 6927 6981 7465 7519 8002 8056 5 3144 3199 3253 3307 3687 3741 3795 3849 4229 4283 4337 4391 4770 4824 4878 4932 5310 5364 5418 5472 5850 5904 5958 6389 6443 6497 2 11 11 11 10 GO 7663 8188 8659 8712 3 3 700046 830919078 831 9601 832 920123 833 0645 834 1166 1374 835 921686 1738 1790 1842 1894 836 2310 2362 2414 837 2829 2881 2933 2206 2258 2725 2777 838 3244 3296 3348 3399 3451 3503 839 3762 3814 3865 3917 3969 4021 17 16 16 4 3361 3904 4445 4986 5526 6012 6066 6551 6604 7089 7143 7035 7573 7626 8110 7680 8163 8217 16 3973 4502 5030 5558 6085 6138 6612 6664 7138 7190 9287 9340 9130 9183 9235 9653 9706 9758 9810 9862 0176 0228 0280 0332 0384 0697 0749 0801 0853 0906 1426 1218 1270 1322 1946 8699 9235 9770 4 2222 21 21 4555 5083 5611 7716 8240 8764 5 8753 9289 5 82285 27 27 PROPORTIONAL PARTS 26 6 9823 0358 0891 1424 1956 2009 2488 2541 3019 3549 4499 5040 5580 6119 6 3416 3470 3958 4012 4553 6658 7196 7734 8270 52 5725 5776 52 6240 6188 840 924279 4331 4383 4434 4486 4538 4589 4641 4693 4744 52 841 4796 4848 4899 4951 5003 5054 5106 5157 5209 5261 842 5312 5364 5415 5467 5518 5570 5621 5673 843 5828 5879 5931 5982 6034 6085 6137 844 6342 6394 6445 6497 6548 6600 6651 6702 6754 845 926857 6908 6959 7011 7062 7114 846 7370 7422 7473 7524 7576 7627 847 7883 7935 7986 8037 8088 8140 848 8396 8447 8498 849 6291 51 6805 51 7216| 7268 7319 51 7165 7678 8191 7730 7781 7832 51 8293 8345 51 8549 8601 8652 8703 8959 9010 9061 9112 9163 9215 8242 8754 8805 8857 51 9266 9317 9368 51 8908 2222 8807 9342 9877 32 31 3072 3602 33 32 4026 4079 4132 53 4608 5136 53 4184 4660 4713 5189 5241 5664 5718 5769 6243 6296 4237 4290 4766 4819 5294 5347 53 5822 5875 53 6349 6401 53 6927 53 6191 6717 6770 6822 6875 7243 7295 7348 7768 7453 53 7400 7820 7873 7925 8293 7978 52 8345 8397 8450 8502 8921 8973 9026 52 8816 8869 52 7 5634 6173 6712 7250 7787 8324 3524 3578 54 4066 4120 54 4607 4661 54 5094 5148 5202 54 5688 5742 54 6227 6281 54 6766 6820 54 7304 7358 54 7841 7895 54 8378 8860 9396 9930 7 8914 8967 54 9449 9503 54 9984 *0037 53 0411 0464 0518 0571 53 0944 0998 1477 No. 849 Log 929 89 D 52 9392 9914 52 0436 0489 0541 0593 52 0958 1010 1062 1114 52 1582 1634 1478 1530 1998 2050 2518 2570 2985 3037 3089 2466 1051 1104 53 1530 1584 1637 53 2063 2116 2169 53 2594 2647 2700 53 3125 3178 3231 3655 3708 3761 8888888 9444 9496 9549 9967 *0019 | *0071 39 38 37 36 Diff. 8431 54 2622 2674 52 3140 3192 52 3555 3607 3658 3710 52 4072 4124 4176 4228 52 8 XJS XXXxx: 44 43 42 42 ❤x xxxxxXKONN N~~~~~~~~N NNI 53 9 53 2102 2154 52 50 49 48 47 52 Diff. 55 54 53 52 572 No. 850 Log 929 N. 858 859 861 862 863 864 865 866 850 929419 851 852 853 854 9470 9521 9572 9930 9981 *0032 *0083 930440 0491 0542 0592 0949 1000 1051 1102 1458 1509 1560 1610 855 931966 2017 2068 2474 2524 2575 2626 2981 3031 3082 3133 3487 3538 3589 3639 3993 4044 4094 4145 2118 856 857 0 890 891 Diff. 51 50 TABLE XXI.-LOGARITHMS OF NUMBERS 5003 5507 6011 6514 937016 49 48 1 4650 4700 4751 4852 860 934498 4549 4599 5054 5104 5154 5205 5255 5356 5558 5608 5658 5759 5809 5860 6061 6111 5709 6162 6212 6262 6313 6363 6665 6715 6765 6815 6865 7167 7217 7267 7317 7367 6564 6614 7066 7117 7518 7568 7618 7668 7718 8169 8219 867 8019 8069 8119 868 8520 8570 8620 869 9020 9070 9120 9170 9220 8670 8720 LOLO 1 5 5 LOLO 944483 4532 4581 4631 4680 880 881 4729 4976 5025 5074 5124 5173 5222 882 5469 5518 5567 5616 883 884 885 5665 5961 6010 6059 6108 6157 6452 6501 6551 6600 6649 946943 6992 7041 7090 7140 886 7434 7483 7532 7581 7630 7924 7973 8022 8070 8119 8413 8462 8511 8560 889 8902 8951 8999 9048 887 888 5 2 5 2 10 10 892 949390 9439 9488 9536 9585 9878 9926 9975 *0024 *0073 *0121 950365 0414 0462 0511 0560 0608 893 0851 0900 0949 0997 1046 1095 894 1338 1386 1435 1483 895951823 1872 1920 1969 2308 2356 2405 2453 2792 2841 2889 2938 1532 2017 1580 2066 896 2502 2550 2986 3034 3083 897 898 3276 3325 3373 3421 3470 3518 3566 899 3760 3808 3856 3905 3953 4001 4049 10 10 3 3 55 55 15 15 - 15 14 870 939519 9569 9619 9669 9719 9769 9819 9869 9918 9968 50 871 940018 873 1462 874 0068 0118 0168 0218 0267 0317 0367 0417 0467 50 872 0516 0566 0616 0666 0716 0765 0815 0865 0915 0964 1014 1064 1114 1163 1213 1263 1313 1362 1412 1511 1561 1611 1660 1710 1760 1809 1859 1909 1958 50 942008 2058 2107 2157 2207 2256 2306 2355 2405 2455 50 2504 2554 2603 2653| 2702 2752 2801 2851 2901 2950 50 3000 3049 3099 3148 3198 3247 3297 3346 3396 3445 49 878 3495 3544 3593 3643 3692 3742 3791 3841 3890 3939 49 879 3989 4038 4088 4137 4186 4236 4285 4335 4384 4433 49 875 876 877 4 4 22 22 20 20 20 19 2677 3183 3234 3285 3335 3740 3690 3791 3841 4296 4347 4195 4246 5 | 6 9623 9674 9725 9776 9827 9879 51 *0134 *0185 *0236 *0287 *0338 *0389 51 0643 0694 0745 0796 0847 0898 51 1153 1204 1254 1305 1356 1407 1661 1712 1763 1814 1865 1915 2220 2271 2322 2372 2423 51 51 2169 51 2727 2778 2829 2879 51 2930 3437 51 3386 3892 3943 51 4397 4448 51 8609 9097 PROPORTIONAL PARTS 5 224 225 8770 9270 26 25 24 7769 7819 7869 7919 8269 4801 5306 38 22 31 7 7 | 8 | 9 6 7 30 29 29 No. 899 Log 954 8320 8370 8420 8820 8870 8920 9320 9369 9419 1629 1677 2114 2163 2599 36 35 4902 5406 5910 6413 34 34 6305 4779 4828 4877 4927 49 5272 5321 5370 5419 49 5715 5764 5813 5862 5912 49 6207 6256 6698 6747 6796 7189 7238 7287 7336 7385 49 7679 7728 7777 7826 7875 49 8168 8217 8266 8315 8364 49 8657 8706 8755 8804 8853 9146 9195 9244 9292 9341 49 6354 6403 49 6845 6894 49 49 8 9634 9683 9731 9780 9829 49 *0170 *0219 *0267 *0316 49 0657 0706 1143 1192 0754 0803 49 1240 1289 49 1726 1775 49 2211 2260 48 2696 2744 48 2647 3131 3180 3228 48 3615 3663 3711 48 4098 4146 4194 48 6463 50 6916 6966 50 7418 7468 50 Diff. 4953 50 41 40 5457 50 39 38 5960 50 AAAAAAAADA A.... 7969 50 8470 50 8970 50 9469 50 9 46 45 44 43 50 50 G9 2005 Diff. 51 50 49 48 573 No. 900 Log 954 N. 0 923 924 TABLE XXI.-LOGARITHMS OF NUMBERS 900 954243 4291 4725 4773 901 4821 902 5207 5255 5303 903 5688 5736 5784 904 6216 6265 906 7224 6168 905 956649 7128 907 7607 908 8086 909 6697 6745 7176 7655 7703 8134 8181 8659 936 937 938 939 920 963788 3835 921 922 8564 8612 Diff. 910 959041 9089 9137 9185 911 9518 9566 9614 9661 912 9995 *0042 *0090 *0138 | | 913 960471 0518 0566 0613 914 0946 915961421 0994 1041 1469 1516 916 1895 1943 1990 917 2369 2417 2464 918 2843 2890 2937 919 3316 3363 3410 49 48 47 46 930 968483 931 8950 932 9416 933 9882 934 970347 935970812 1 4260 4307 4354 4731 4778 4825 5202 5249 5296 5672 1 2 3882 3929 4401 4872 5343 925966142 5719 5766 5813 6189 6236 6283 6658 6705 6752 7127 7173 7220 6799 7267 926 6611 927 7080 928 7548 7595 7642 7688 7735 929 8016 8062 8109 8156 8203 LO LO LO LO 5 4339 4387 4869 5 2 10 10 9 3 F 3 5351 5399 5832 5880 6313 6361 6793 6840 7272 7320 7751 7799 8229 8277 8707 8755 15 14 14 14 4 8716 9183 *0114 0579 8530 8576 8623 8670 8996 9043 9090 9136 9463 9509 9556 9602 9649 9928 9975 *0021 *0068 0393 0440 0486 0533 0858 0904 0951 1276 1322 1369 1415 1740 1786 1832 1879 2203 2249 2295 2342 2666 2712 2758 2804 0997 1044 1461 1508 1925 1971 2388 2851 0661 1089 1136 1563 1611 2038 2085 2511 2559 2985 3032 3457 3504 4435 4484 4918 4966 4 20 19 19 18 5 5860 6329 5447 5928 6409 6888 5 7368 7847 7894 8325 8373 8803 8850 25 24 24 23 9232 9280 9328 9375 9423 9471 9709 9757 9804 9852 9900 9947 *0185 *0233 *0280 *0328 *0376 *0423 | | | 0756 0804 0851 1231 1279 1326 1753 1801 0709 1184 1658 1706 2132 2180 2227 2275 2606 2653 2701 2748 3079 3126 3174 3221 3693 3552 3599 3646 6845 7314 7782 8249 PROPORTIONAL PARTS 2434 2897 6 6 7 4532 4580 5014 5062 4628 4677 48 5110 5158 48 5592 5640 48 5495 5543 5976 6024 6072 6120 48 6457 6505 6553 48 6601 6936 6984 7032 7080 48 7416 7464 7512 7990 7559 48 8038 48 8468 8946 940 | 973128 3497 3543 46 941 942 46 3174 3220 3266 3313 3359 3405 3451 3590 3636 3682 3728 3774 3820 3866 3913 3959 4005 46 4051 4143 4097 4189 4235 4281 4327 4374 4420 4466 943 4512 4558 4604 4650 4696 4742 4788 4834 4880 4926 46 944 4972 5018 5064 5110 5156 5202 5248 5294 5478 945975432 5524 5570 5616 5662 5707 5753 946 5891 5937 5983 6029 6075 6121 6167 6212 6350 6396 6442 6488 6533 6579 6625 6671 6808 6854 6900 6946 6992 7037 7083 7129 7266 7312 7358 7403 7449 7495 7541 7586 5340 46 5386 5799 5845 46 6258 6304 46 6717 6763 46 7175 7220 46 7632 46 7678 947 948 949 2288 7942 8421 8898 29 29 No. 949 Log 977 7 3977 4024 4071 4118 4165 4212 47 4448 4495 4542 4590 4637 4684 47 4919 5013 5061 5108 5155 47 5390 5484 5531 5578 5625 47 5954 6001 6048 6095 6423 6470 6517 4966 5437 5907 6376 6564 7033 6892 6939 6986 7361 7408 7454 7501 47 7829 7922 7969 47 8296 8390 8436 47 7875 8343 8 34 34 33 32 9 Diff. 8516 8 8994 39 38 38 37 000000000 8763 8810 8856 8903 4.7 9229 9276 9323 9369 47 9695 9742 9789 9835 47 *0161 0207 *0254 *0300 47 0626 0672 0719 0765 46 1090 1137 1183 1229 46 1554 1601 1647 1693 46 2018 2064 2110 2157 46 2481| 2527 2943 2989 2573 2619 46 3035 3082 46 20 00 00 00 00 00 00 00 00 48 9 48 48 48 0899 48 1374 48 1848 47 2322 47 44 43 42 41 48 2795 47 3268 47 3741 47 47 47 47 HAAHAHA HAHA Diff. 49 48 47 46 574 No. 950 Log 977 N. 950 951 952 953 9093 954 9548 955 980003 956 957 958 959 0 972 973 TABLE XXI.-LOGARITHMS OF NUMBERS 960 982271 961 977724 Diff. 7769 7815 8181 8226 8637 8683 9138 9594 9639 4443 0458 0912 1366 1819 46 45 970 986772 6817 971 2723 962 3175 963 3626 964 4077 965 984527 966 4617 5067 4122 4167 4572 4977 5022 967 5426 5471 5516 968 5875 5920 5965 969 6324 6369 6413 1 980 991226 981 1669 2111 1270 1315 1713 1758 2156 2200 982 983 2554 2598 2642 2995 985 | 993436 984 986 987 988 989 1 0049 0503 0957 1411 1456 1864 1909 LO LO THE 5 2 2316 2362 2407 2452 2769 2814 2859 2904 3220 3265 3310 3356 3671 3716 3762 3807 1359 1802 2244 2686 3039 3083 3127 3480 3524 3568 3921 3965 4009 4361 4405 4449 4757 4801 4845 4889 5196 5240 5284 3877 4317 5328 2 0094 0549 1003 6906 6951 6861 7219 7264 7309 6996 7040 7443 7488 7353 7398 7666 7711 7756 7800 7845 7890 7934 8113 8157 8202 8247 8291 974 8604 8648 8336 8381 8559 8693 8737 8782 8826 975 989005 9049 9094 9138 9183 9227 9272 976 9450 9494 9539 9583 9628 9672| 9717 977 9895) 9939 9983 *0028 *0072] *0117 0161 | | | 978 990339 0383 0428 0472 0516 979 0783 0827 0871 0916 0960 ---- 9 9 7861 7906 8272 8317 8363 8728 8774 8819 9184 9230 9275 9685 9730 9776 0231 0140 0185 0594 0640 0685 1139 1048 1093 1547 2000 9 9 3 3 1488 1501 1954 14 14 4212 4662 5112 5561 6010 6458 13 13 4 4 18 18 18 17 |||| 4257 4707 5157 5606 5651 6055 6100 6144 6503 6548 6593 PROPORTIONAL PARTS 2497 2543 2588 3040 2949 2994 3401 3446 3491 3852 3897 3942 4302 4392 4842 5292 5741 6189 6637 5 7952 7998 8043 8089 8135 46 8409 8454 8500 8546 8591 46 8865 8911 9321 9366 8956 9412 9002 9457 9912 9047 46 9503 46 9958 46 9821 9867 0276 0322 0730 0776 1184 1229 1592 1637 1683 2045 2090 2135 0367 0412 45 0821 0867 45 1275 1320 45 1728 1773 45 2181 2226 45 4347 4797 2222 4752 5202 5247 5696 23 23 2730 3172 3613 4053 4493 4933 4977 5021 5065 5372 5416 5460 5504 6 7085 7532 7979 990 | 995635 5898 5942 5986 6030 44 991 5679 5723 6074 6117 6161 6512 6555| 6599 6949 6993 7037 7080 7124 7168 7212 7255 7299 7343 44 7386 7430 7474 7517 5767 5811 5854 6205 6249 6293 6337 6380 6424 6468 44 6643 6687 6731 6774 6818 6862 6906 44 992 993 994 995 996 7561 7605 7648 7692 7736 7779 44 7998 8041 8085 8129 8172 8216 44 8434 8477 8521 8564 8608 8652 44 8869 8913 8956 9000 9043 9087 44 9131 9174 9218 9261 9305 9348 9392 9435 9479 9522 44 999 9565 9609 9652 9696 9739 9783 9826 9870 9913 9957 997823 7867 7910 7954 8259 8303 8347 8390 8695 8739 8782 8826 997 998 43 822808 27 No. 999 Log 999 26 26 7 8425 8871 9316 9761 9806 9850 *0206 | *0250 | *0294 0561 0605 0650 0694 0738 1004 1049 1093 1137 1182 22283 3987 4437 31 30 7130 7577 8024 8470 3536 2633 2678 45 3085 3130 45 3581 45 4032 45 4482 45 4887 4932 45 5337 5382 45 5786 6234 6682 8 9 5830 6279 1403 1448 1846 1890 2288 2333 1492 1536 1580 1625 44 1935 1979 2023 2067 44 2377 2421 2465 2509 44 2863 2907 2951 44 3392 44 3833 44 2774 2819 3216 3260 3304 3348 3657 3701 3745 3789 4097 4141 4185 4229 4273 4537 4581 4625 4669 4713 co co co co co co 6727 37 7175 7622 36 35 34 8068 8514 5108 5152 5547 5591 Diff. AAAA 9 AAA AAAA 41 41 40 39 S 10 10 10 10 10 10 1 8916 8960 45 9361 9405 45 44 44 44 44 45 45 45 45 45 45 45 44 44 44 ** **: 44 Dir. 46 45 44 43 575 TABLE XXI-A.—7-PLACE LOGARITHMS OF NUMBERS FROM 1 to 100 NO. -2MIS Cramo - 3 5 10 14 15 LOG. NO. LOG. NO. 0.0000000 26 1.4149733 51 0.3010300 27 1.4313638 52 0.4771213 28 1.4471580 53 0.6020600 29 1.4623980 0.6989700 30 1.4771213 0.7781513 0.8450980 0.9030900 0.9542425 1.0000000 12 1.0791812 13 1.0413927 ~~~~~ 12345 ~~~~M MMMMM M wwwww 36 37 1.1139434 38 1.1461280 39 1.1760913 40 31 1.4913617 56 32 1.5051500 57 33 1.5185139 58 34 1.5314789 59 35 1.5440680 60 5 FEES ין 200 GE 54 ii in inno CONSTANT 55 1.5563025 61 1.5682017 62 1.5797836 16 1.2041200 41 і 1.6127839 66 1.2304489 17 18 1.2552725 1.6232493 67 1.6334685 68 1.6434527 69 19 1.2787536 20 1.3010300 45 1.6532125 70 Ratio of circum. to diameter Ratio of dia. to circumference I radian. Deg. in arc = radius Minutes in arc equal to radius Length of 1° arc, unit radius ।。 Length of arc, unit radius Base of hyperbolic logarithms 63 1.5910646 64 1.6020600 65 MIS ~~ 71 2345 72 73 74 SYMBOL E-IF CONSTANTS ח LOG. 1.7075702 1.7160033 1.7242759 1.7323938 79 1.7403627 80 π πT 180° 1.7481880 ει 1.7558749 1.7634280 1.7708520 1.7781513 21 1.3222193 1.8512583 1.8573325 22 23 46 1.6627578 1.3424227 47 1.6720979 1.3617278 48 1.6812412 1.3802112 49 1.6901961 25 1.3979400 50 1.6989700 75 1.8750613 100 2.0000000 96 97 1.8633229 98 1.8692317 1.9822712 1.9867717 1.9912261 1.9956352 24 99 LOG. 1.8808136 1.8864907 78 1.8920946 76 77 1.8976271 1.9030900 180° π 10800° W NO. π 1 0800° 2345 82 1.7853298 86 1.7923917 87 1.7993405 88 1.8061800 89 1.8129134 90 NUMBER 83 92 1.8195439 91 1.8260748 1.8325089 1.8388491 1.8450980 TABLE XXI-B.—7-PLACE LOGARITHMS OF USEFUL 84 85 1.9294189 MIS 93 94 1.9084850 1.9138139 1.9190781 1.9242793 95 1.9344985 1.9395193 1.9444827 1.9493900 1.9542425 1.9590414 1.9637878 1.9684829 1.9731279 1.9777236 LOG. 3.1415927 0.4971499 0.3183099 9.5028501 57.295780 1.7581226 3437.7468 3.5362739 0.01745329 8.2418774 0.00029089 6.4637261 2.7182818 0.4342945 576 TABLE XXII.—LOGARITHMIC SIN, COS, TAN, AND COT Explanation of Use When Angles to Seconds Are Involved Angles Less Than 3°.-Owing to the rapid variation in sine, tangent, and cotangent of small angles, the usual straight- line method of interpolation for seconds may not be sufficiently precise. A closer method is based upon the fact that natural sines and tangents of small angles are closely proportional to the angles themselves. In this table, ƒ refers to a trigonometric function, and s refers to the number of seconds in an angle. Although log f varies rapidly, (log ƒ—log s) varies so slowly that it may be determined from values at 1' intervals. EXAMPLE.-Find log tan 0° 38′ 42″. tan 38'42″ 38′ 42″ tan 38' 38' 2322″ 2280" or log tan 38′ 42″=log 2322+(log tan 2280”—log 2280) log f=log s +(log f-logs) log-s=3.365862 or log ƒ-log s=4.685593 (−10) log tan 38′ 42″=8.051455 (−10) In the reverse process of finding an angle to seconds when its logarithmic sine, tangent, or cotangent is given, first determine by inspection the value of (log f-log s) or of (log f+log s). Then subtract the given log ƒ in such a way as to leave +logs, and find the required angle. Angles Greater Than 3°.-In the bulk of the table the use of the Diff. per 1" is replaced by a quicker method in the form of sets of corrections for multiples of 10" and 15". The num- ber of these sets varies so as to limit the maximum error for a 50" correction to one in the sixth place of the logarithm any- where within the indicated range. Thus, log sin 36° 18′ 50″ is found quickly to be 9.772331 +144-9.772475. Because the sets of corrections are exact at the middle of the indicated range, slightly greater precision would be obtained in this example by adding a correction of 143, since the 50″ correction at 36° 30′ is 142. This gives log sin 36° 18′ 50″-9.772474. Many computers subtract the 10" correction of 29 from log sin 36° 19′. Obviously, corrections for any number of seconds could be obtained speedily, if the field work justifies, by combining the corrections and shifting the decimal point. 577 0° 0-23 HA COM¤¬ 4 ======*=** ********** 8*88*88688 *=* 20 21 22 23 24 25 26 27 28 29 30 31 33 34 TABLE XXII.—LOGARITHMIC SIN, COS, TAN, AND COT 35 36 37 39 40 42 43 44 45 46 **** C**KKAHEKAO 47 48 49 50 31 52 53 54 55 56 57 58 90° 59 60 // S 0 60 120 180 240 300 360 420 480 540 600 660 720 780 840 900 960 1020 1080 1140 1200 1260 1320 1380 1440 1500 1560 1620 1680 1740 1800 1860 1920 1980 2040 2100 2160 2220 2280 2340 2400 2460 2520 2580 2640 2700 2760 2820 2880 2940 3000 3060 3120 3180 3240 3300 3360 34 20 3480 3540 3600 $ "/ Sin. log f -Inf. 6.463726 6.764756 6.940847 7.065786 7.162696 .241877 .308824 .366316 .417968 7.463 726 .505118 .542906 .577668 .609853 7.639816 .667845 .694173 .718997 .742478 7.764754 .785943 .806146 .825451 .843934 7.861662 .878695 .895085 .910879 .926119 7.940842 .955082 .968870 .982233 7.995198 8.007787 .020021 .031919 .043501 .054781 8.065776 .076500 .086965 .097183 .107167 8.116926 .126471 .135810 .144953 .153907 8.162681 .171280 .179713 .187985 .196102 8.204070 .211895 .219581 .227134 .234557 8.241855 log f Cos. log f 575 575 575 575 575 575 575 575 574 574 574 574 574 574 574 573 573 573 573 573 572 572 572 572 571 571 571 570 570 570 569 569 569 568 568 567 567 566 566 566 -log s 4.685 565 565 564 564 563 562 562 561 561 560 560 559 558 558 557 556 556 555 554 554 553 4.685 log f 575 575 575 575 575 575 575 575 576 576 576 576 577 577 577 578 578 578 579 579 580 580 581 581 582 583 583 584 584 585 586 587 587 588 589 590 591 592 593 593 594 595 596 598 599 600 601 602 603 604 605 607 608 609 611 612 613 615 616 618 619 -log s Tan. log f - Inf. 6.463726 6.764756 6.940847 7.065 786 7.162696 .241878 .308825 .366817 .417970 7.463727 .505120 .542909 .577672 .609857 7.639820 .667849 .694 179 .719003 .742484 7.764761 .785951 .806155 .825460 .843944 7.861674 .878708 .895099 .910891 .926134 7.940858 .955 100 .968889 .982253 7.995219 8.007809 .020044 .031945 .043527 .054809 8.065806 .076531 .086997 .097217 .107203 8.116963 .126510 .135851 .144996 .153952 8.162727 .171328 .179763 .188036 .196156 8.204 126 .211953 .219641 .227195 .234621 8.24 1921 log f Cot. Col. log f + Inf. 3.536274 3.235244 3.059153 2.934214 2.837304 .758122 .691175 .633183 .582030 2.536273 .494880 .457091 .422328 .390143 2.360180 .332151 .305821 .280997 .257516 2.235239 .214049 .193845 .174540 .15 605 6 2.138326 .121292 .104901 .089106 .073866 2.059142 .044900 .031111 .017747 2.004781 1.992191 .979956 .968055 .956473 .945 191 1.934194 .923469 .913003 .902783 .892797 1.883037 .873490 .864149 .855004 .84 6048 1.837273 .828672 .820237 .811964 .803844 1.795874 .788047 .780359 .772805 .765379 1.75 8079 log f Tan. log f +log s 5.314 425 425 425 425 425 425 425 425 4 24 424 424 424 423 423 423 422 422 422 421 421 420 420 419 419 418 417 417 416 416 415 414 413 413 412 411 4 10 409 408 407 407 406 405 404 402 401 400 399 398 397 396 395 393 392 391 389 398 387 385 384 382 381 5.314 log f +log s Cos. ten ten Len ten ten ten 9.999999 .999999 .999999 .999999 9.999998 .999998 .999997 .999997 .999996 9.999996 .999995 .999995 .999994 .999993 9.999993 .999992 .999991 .999990 .999989 9.999989 .999988 .999987 .999986 .999985 9.999983 .999982 .999981 .999980 .999979 9.999977 .999976 .999975 .999973 .999972 9.999971 .999969 .999968 .999966 .999964 9.999963 .999961 .999959 .999958 .999956 9.999954 .999952 .999950 .999948 .999946 9.999944 .999942 .999940 .999938 .999936 9.999934 Sin. 179° 60 59 58 57 56 55 54 53 52 33 88959****= =8*58*388= 88: 51 50 49 48 47 46 45 44 43 42 41 40 39 37 36 34 33 32 31 30 29 28 27 26 25 24 **** ***======= CROTON+~~HO 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 2 89° 578 1° 91° --23 EN LO CO 1 ∞ ∞ 0 1 4 5 6 7 8 9 RICCIELE** 22******** A*88*88583 7********* A****BAKE 10 11 12 14 15 16 17 18 19 20 21 23 24 25 26 27 28 29 30 31 32 33 34 36 37 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 "1 $ 3600 3660 3720 3780 3840 3900 3960 4020 4080 4140 4200 4260 4320 4380 4440 4500 4560 4620 4680 4740 4800 4860 4920 4980 5040 5100 5160 5220 5280 5340 5400 5460 5520 5580 5640 5700 5760 5820 5880 5940 6000 6060 6120 6180 6240 6300 63 60 6420 6480 6540 6600 6660 6720 6780 6840 6900 6960 7020 7080 7140 7200 S "I TABLE XXII.-LOGARITHMIC SINES, Sin. log f 8.24 1855 .249033 .256094 .263042 .269881 8.276614 .283243 .289773 .296207 .302546 8.308794 .314954 .321027 .327016 .332924 8.338753 .344504 .350181 .355 783 .361315 8.366777 .372171 .377499 .382762 .387962 8.393101 .398179 .403199 .408161 .413068 8.417919 .422717 .427462 .432156 .436800 8.441394 .445941 .450440 .454893 .459301 8.463665 .467985 .472263 .476498 .480693 8.484848 .488963 .493040 .497078 .501080 8.505045 .508974 .5 12867 .5 16726 .520551 8.524343 .528102 .531828 .535523 .539186 8.542819 log f Cos. log f - log s 4.685 553 552 551 551 550 549 548 547 547 546 545 544 543 542 541 540 539 539 538 537 536 535 534 533 532 531 530 529 527 526 525 524 523 522 521 520 518 517 516 5 15 514 512 511 510 509 507 506 505 503 502 501 499 498 497 495 494 492 491 490 488 487 log f 619 620 622 623 625 627 628 630 632 633 635 637 638 640 642 644 646 648 649 65 1 4.685 653 655 657 659 661 663 665 668 670 672 674 676 679 681 683 685 688 690 693 695 697 700 702 705 707 710 713 715 718 720 723 726 729 731 734 737 740 743 745 748 751 -log s Tan. log f 8.241921 .249102 .256165 .263115 .269956 8.276691 .283323 .289856 .296292 .302634 8.308884 .315046 .321122 .327114 .333025 8.338856 .344610 .350289 .355895 .361430 8.366895 .372292 .377622 .382889 .388092 8.393234 .398315 .403338 .408304 .413213 8.418068 .422869 .427618 .432315 .436962 8.441560 .446110 .450613 .455070 .459481 8.463849 .468172 .472454 .476693 .480892 8.485050 .489170 .493250 .497293 .501298 8.505267 .509200 .513098 .516961 .520790 8.524586 .528349 .532080 .535779 .539447 8.543084 log f Cot. Cot. log f 1.758079 .75 0898 .743835 .736885 .730044 1.723309 .716677 .710144 .703708 .697366 1.691116 .684954 .678878 .672886 .666975 1.661144 .655390 .649711 .644105 .638570 1.633105 .627708 .622378 .617111 .611908 1.606766 .601685 .596662 .591696 .586787 1.581932 .577131 .572382 .567685 .563038 1.558440 .553890 .549387 .544930 .540519 1.536151 .531828 .527546 .523307 .519108 1.5 14950 .510830 .506750 .502707 .498702 1.494733 .490800 .486902 .483039 .479210 1.475414 .471651 .467920 .464221 .460553 1.456916 log f Tan. log f +log s 5.314 381 380 378 377 375 373 372 370 368 367 365 363 362 360 358 356 354 352 351 349 347 345 343 341 339 337 334 332 330 328 326 324 321 319 317 315 312 310 307 305 303 300 298 295 293 290 287 285 282 280 277 274 271 269 266 263 260 257 255 252 249 5.314 log f +log s Cos. 9.999934 .999932 .999929 .999927 .999925 9.999922 .999920 .999918 .999915 .999913 9.999910 .999907 .999905 .999902 .999899 9.999897 .999894 .999891 .999888 .999885 9.999882 .999879 .999876 .999873 .999870 9.999867 .999864 .999861 .999858 .999854 9.999851. .999848 .999844 .999841 .999838 9.999834 .999831 .999827 .999824 .999820 9.999816 .999813 .999809 .999805 .999801 9.999797 .999794 .999790 .999786 .999782 9.999778 .999774 .999769 .999765 .999761 9.999757 .999 753. .999748 .999744 .999740 9.999735 Sin. 178° S***ANK A 60 59 58 57 56 55 54 53 52 51 50 49 48 47 46 45 44 43 42 ZEN NNNNNNNNN. ********** ** 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 99876 NEON - O 10 5 3 2 1 88° 579 2° O-~3 HAS TO EX9 1 2 4 92° 5 6 8 10 11 12 13 14 15 16 17 18 19 ********** ***8*88588 *** 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 AENCE 50 51 52 53 54 55 56 57 38 59 60 "1 $ 7200 7260 7320 7380 7440 7500 7560 7620 7680 7740 7800 7860 7920 7980 8040 8100 8160 8220 8280 8340 8400 8460 8520 8580 8640 8700 8760 8820 8880 8940 9000 9060 9120 9180 9240 9300 9360 9420 9480 9540 9600 9660 9720 9780 9840 9900 9960 10020 10080 10140 10200 10260 10320 10380 10440 10500 10560 10620 10680 10740 10800 S "/ COSINES, TANGENTS, AND COTANGENTS Sin. log f 8.542819 .546422 .549995 .553539 .557054 8.560540 .563999 .567431 .570836 .574214 8.577566 .580892 .584193 .587469 .590721 8.593948 .597152 .600332 .603489 .606623 8.609734 .612823 .615891 .618937 .621962 8.624965 .627948 .630911 .633854 .636776 8.639680 .642563 .645428 .648274 .651102 8.653911 .656702 .659475 .662230 .664968 8.667689 .670393 .673080 .675751 .678405 8.681043 .683 665 .686272 .688863 .691438 8.693998 .696543 .699073 .701589 .704090 8.706577 .709049 .711507 .713952 .716383 8.718800 log f Cos. log f 487 485 484 482 481 479 478 476 475 473 -log s 4.685 471 470 468 467 465 463 462 460 458 457 455 453 451 450 448 446 444 443 441 439 437 435 433 431 430 428 426 424 422 420 418 416 414 412 410 408 406 404 402 400 398 396 394 392 389 387 385 383 381 379 376 4.685 log f 751 754 757 760 763 766 769 773 776 779 782 785 788 792 795 798 802 805 808 812 815 818 822 825 829 833 836 840 843 847 851 854 858 862 866 869 873 877 881 885 889 893 897 900 905 909 913 917 921 925 929 933 937 942 946 950 955 959 963 968 972 -log s Tan. log f 8.543084 .546691 .550268 .553817 .557336 8.560828 .564291 .567727 .571137 .574520 8.577877 .581208 .584514 .587795 .591051 8.594283 .597492 .600677 .603839 .606978 8.610094 .613189 .616262 .619313 .622343 8.625352 .628340 .631308 .634256 .637184 8.640093 .642982 .645853 .648704 .65 1537 8.654352 .657149 .659928 .662689 .665433 8.668160 .670870 .673563 .676239 .678900 8.681544 .684172 .686784 .689381 .691963 8.694529 .697081 .699617 .702139 .704646 8.707140 .709618 .712083 .714534 .716972 8.719396 log f Cot. Col. log f 1.456916 .453309 .449732 .446183 .442664 1.439172 .435709 .432273 .428863 .425480 1.422123 .418792 .415486 .412205 .408949 1.405717 .402508 .399323 .396161 .393022 1.389906 .386811 .383738 .380687 .377657 1.374648 .371660 .368692 .365744 .362816 1.359907 .357018 .354 147 .351296 .348463 1.345648 .34 2851 .340072 .337311 .334567 1.331840 .329130 .326437 .323761 .321100 1.318456 .315828 .3 13216 .310619 .308037 1.305471 .302919 .300383 .297861 .295354 1.292860 .290382 .287917 .285466 .283028 1.280604 log f Tan. Jog f +log s 5.314 249 246 243 240 237 234 231 227 224 221 218 215 212 208 205 202 198 195 192 188 185 182 178 175 171 167 164 160 157 153 149 146 142 138 134 131 127 123 119 115 111 107 103 100 095 091 087 083 079 075 071 067 063 058 054 050 045 041 037 032 028 5.314 log f +log s Cos. 9.999735 .999731 .999726 .999722 .999717 9.999713 .999708 .999704 .999699 .999694 9.999689 .999685 .999680 .999675 .999670 9.999665 .999660 .999655 .999650 .999645 9.999640 .999635 .999629 .999624 .999619 9.999614 .999608 .999603 .999597 .999592 9.999586 .999581 .9995 75 .999570 .999564 9.999558 .999553 .999547 .999541 .999535 9.999529 .999524 .999518 .9995 12 .999506 9.999500 .999493 .999487 .999481 .999475 9.999469 .999463 .999456 .999450 .999443 9.999437 .999431 .999424 .9994 18 .999411 9.999404 Sin. 177° ********** 60 59 58 57 56 55 54 53 52 51 50 49 48 47 46 45 44 43 42 * =88F8***~~ 22*~****~~ 822094CCC. --~20 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 21 19 18 17 16 15 14 13 12 11 10 9 8 7 6 4 1 / 87° 580 3° 01234567∞om 8 9 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 ******** SENDIK 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 93° Sin. 8.718800 .721204 .723595 .725972 .728337 8.730688 .733027 .735354 .737667 .739969 8.742259 .744536 .746802 .749055 .751297 8.753528 .755747 .757955 .760151 .762337 8.764511 .766675 768828 .770970 .773101 8.775223 .777333 .779434 .781524 .783605 8.785675 .787736 .789787 .791828 .793859 8.795881 .797894 .799897 .801892 .803876 8.805852 .807819 .809777 .811726 .813667 8.815599 .817522 .819436 .821343 .823240 8.825130 .827011 .828884 .830749 .832607 8.834456 .836297 .838130 .839956 .841774 8.843585 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 40.07 39.85 39.62 39.42 39.18 38.98 38.78 38.55 38.37 38.17 37.95 37.77 37.55 37.37 37.18 36.98 36.80 36.60 36.43 36.23 36.07 35.88 35.70 35.52 35.37 35.17 35.02 34.83 34.68 34.50 34.35 34.18 34.02 33.85 33.70 33.55 33.38 33.25 33.07 32.93 32.78 32.63 32.48 32.35 32.20 32.05 31.90 31.78 31.62 31.50 31.35 31.22 31.08 30.97 30.82 30.68 30.55 30.43 30.30 30.18 D. 1". Cos. 9.999404 .999398 ,999391 .999384 .999378 9.999371 .999364 .999357 .999350 .999343 9.999336 .999329 " Corr. .999322 10 .999315 15 .999308 20 9.999301 30 .999294 40 .999287 45 .999279 50 .999272 9.999265 .999257 .999250 .999242 .999235 9.999227 .999220 .999212 .999205 .999197 9.999189 .999181 .999174 .999166 .999158 9.999150 .999142 .999134 .999126 .999118 9.999110 .999102 .999094 10 .999086 .999077 20 9.999069 30 .999061 40 .999053 45 .999044 50 .999036 9.999027 .999019 .999010 .999002 .998993 9.998984 .998976 .998967 Corr. for Sec. .998958 .998950 9.998941 Sin. - 1*18857 1 224 LOS CO 2 2 4 5 5 6 Corr. 1 2 3 4 to co t 6 6 7 Tan. D. 1". 8.719396 .721806 .724204 .726588 .728959 8.731317 .733663 .735996 .738317 .740626 8.742922 .745207 .747479 .749740 .751989 8.754227 .756453 .758668 .760872 .763065 8.765246 .767417 .769578 .771727 .773866 8.775995 .778114 .780222 .782320 .784408 8.786486 .788554 .790613 .792662 .794701 8.796731 .798752 .800763 .802765 .804758 8.806742 .808717 .810683 .812641 .814589 8.816529 .818461 .820384 .822298 .824205 8.826103 .827992 .829874 .831748 .833613 8.835471 .837321 .839163 .840998 842825 8.844644 Cot. 40.17 39.97 39.73 39.52 39.30 39.10 38.88 38.68 38.48 38.27 38.08 37.87 37.68 37.48 37.30 37.10 36.92 36.73 36.55 36.35 36.18 36.02 35.82 35.65 35.48 35.32 35.13 34.97 34.80 34.63 34.47 34.32 34.15 33.98 33.83 33.68 33.52 33.37 33.22 33.07 32.92 32.77 32.63 32.47 32.33 32.20 32.05 31.90 31.78 31.63 31.48 31.37 31.23 31.08 30.97 30.83 30.70 30.58 30.45 30.32 D. 1". Cot. 1.280604 278194 60 59 275793 58 273412 57 ,271041 56 1.268683 55 54 .266337 .264004 53 .261683 52 .259374 51 176° 1.257078 50 254793 49 .252521 48 .250260 47 .248011 46 1.245773 45 44 .243547 .241332 43 .239128 42 .236935 41 1.234754 40 .232583 39 .230422 38 .228273 37 226134 36 1.224005 35 34 .221886 .219778 33 .217680 32 215592 31 1.213514 30 .211446 29 .209387 28 .207338 27 .205299 26 1.203269 25 201248 .199237 24 23 .197235 22 .195242 21 ~*******2; 1.193258 20 19 .191283 .189317 18 .187359 17 1.173897 .172008 .170126 .168252 .166387 1.164529 .162679 .160837 .159002 .157175 1.155356 .185411 16 1.183471 15 .181539 14 .179616 13 .177702 12 .175795 11 Tan. 10 9 8 7 SOLO SEM NÍO 6 1 0 86° 581 4° 01234 19 6 1 00 – 5 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 94° 50 51 52 53 54 55 56 57 58 59 60 39993 COSINES, TANGENTS, AND COTANGENTS Sin. D. 1". 8.843585 .845387 .847183 .848971 .850751 8.852525 .854291 .856049 .857801 .859546 8.861283 .863014 .864738 .866455 .868165 8.869868 .871565 .873255 .874938 .876615 8.878285 .879949 .881607 .883258 .884903 8.886542 .888174 .889801 .891421 .893035 8.894643 .896246 .897842 .899432 .901017 8.902596 .904169 .905736 .907297 .908853 8.910404 .911949 .913488 .915022 .916550 8.918073 919591 .921103 .922610 .924112 8.925609 .927100 .928587 .930068 .931544 8.933015 .934481 .935942 .937398 .938850 8.940296 Cos. 30.03 29.93 29.80 29.67 29.57 29.43 29.30 29.20 29.08 28.95 28.85 28.73 28.62 28.50 28.38 28.28 28.17 28.05 27.95 27.83 27.73 27.63 27.52 27.42 27.32 27.20 27.12 27.00 26.90 26.80 26.72 26.60 26.50 26.42 26.32 26.22 26.12 26.02 25.93 25.85 25.75 25.65 25.57 25.47 25.38 25.30 25.20 25.12 25.03 24.95 24.85 24.78 24.68 24.60 24.52 24.43 24.35 24.27 24.20 24.10 D. 1". Cos. 9.998941 .998932 .998923 .998914 .998905 9.998896 .998887 998878 .998869 .998860 9.998804 .998795 .998785 .998776 .998766 9.998851 .998841 .998832 10 .998823 15 .998813 9.998757 .998747 .998738 .998728 .998718 9.998708 .998699 .998689 .998679 .998669 9.998659 .998649 .998639 .998629 .998619 9.998609 .998599 .998589 .998578 .998568 .998495 .998485 998474 .998464 9.998453 .998412 .998431 .998421 .998410 9.998399 Corr. for Sec. .998388 .998377 .998366 .998355 9.998344 Sin. # 20 30 9.998558 .998548 .998537 .998527 15 .998516 20 9.998506 30 40 5555 45 50 #1 10 40 45 50 Corr. IN 2 3 1 CO 2 ∞ 2 2 5 6 7 8 Corr. 1233 in t− ∞ σ 3 3 5 7 8 9 Tan. 8.844644 .846455 .848260 .850057 .851846 8.853628 .855403 .857171 .858932 ,860686 8.862433 .864173 .865906 .867632 .869351 8.871064 .872770 .874469 876162 .877819 8.879529 .881202 882869 .884530 .886185 S.887833 .889476 .891112 .892742 .894366 8.895984 .897596 .899203 .900803 .902398 8.903987 .905570 .907147 .908719 ,910285 8.911846 .913401 .914951 .916495 .918034 8.919568 .921096 .922619 .924136 .9256-19 8.927156 .928658 930155 931647 .933134 8.934616 .936093 .937565 939032 .940494 8.941952 Cot. ► D. 1". 30.18 30.08 29.95 29.82 29.70 29.58 29.47 29.35 29.23 29.12 29.00 28.88 28.77 28.65 28.55 28.43 28.32 28.22 28.12 28.00 27.88 27.78 27.68 27.58 27.47 27.38 27.27 27.17 27.07 26.97 26.87 26.78 26.67 26.58 26.48 26.38 26.28 26.20 26.10 26.02 25.92 25.83 25.73 25.65 25.57 25.47 25.38 25.28 25.22 25.12 25.03 24.95 24.87 24.78 24.70 24.62 24.53 24.45 24.37 24.30 D. 1". Cot. 1.155356 60 .153545 59 .151740 58 .149943 57 .148154 56 1.146372 55 .144597 54 .142829 53 .141068 52 .139314 51 175° 1.137567 50 .135827 49 .134094 48 .132368 47 .130649 46 1.128936 45 .127230 44 .125531 43 .123838 42 .122151 41 1.120471 40 .118798 39 .117131 38 .115170 37 .113815 36 35 1.112167 .110524 34 .108888 33 .107258 32 .105634 31 1.096013 .094430 .092853 .091281 .089715 5555555 1.104016 30 .102404 29 .100797 28 .099197 27 .097602 26 25 24 23 1.072844 .071342 .069845 .06$353 .066866 1.065384 .063907 .062435 1.088154 21 20 .086599 19 .085019 18 .083505 17 .081966 1.080432 16 15 .078904 14 .077381 13 .075864 12 .074351 11 .060968 .059506 1.058048 Tan. ********22 10 9 876543210 85° 582 5° 01234 LO CO 1 ∞ σ 5 6 7 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 95° Sin. 8.940296 .941738 .943174 .944606 .946034 8.947456 .948874 .950287 .951696 .953100 8.954499 .955894 .957284 .958670 .960052 8.961429 .962801 .964170 .965534 .966893 8.968249 .969600 .970947 .972289 .973628 8.974962 .976293 .977619 .978941 .980259 8.981573 .982883 .984189 .985491 .986789 8.988083 .989374 .990660 .991943 .993222 8.994497 .995768 .997036 .998299 .999560 9.000816 .002069 .003318 .004563 .005805 9.007044 .008278 .009510 .010737 .011962 9.013182 .014400 .015613 .016824 .018031 9.019235 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 24.03 23.93 23.87 23.80 23.70 23.63 23.55 23.48 23.40 23.32 23.25 23.17 23.10 23.03 22.95 22.87 22.82 22.73 22.65 22.60 22.52 22.45 22.37 22.32 22.23 22.18 22.10 22.03 21.97 21.90 21.83 21.77 21.70 21.63 21.57 21.52 21.43 21.38 21.32 21.25 21.18 21.13 21.05 21.02 20.93 20.88 20.82 20.75 20.70 20.65 20.57 20.53 20.45 20.42 20.33 20.30 20.22 20.18 20.12 20.07 D. 1". Cos. 9.998344 .998333 .998322 .998311 .998300 9.998289 .998277 .998266 ,998255 .998243 9.998232 .998220 .998209 10 Corr. 2 .998197 15 3 9.998116 .998104 .998092 .998080 .998068 9.998056 .998044 .998032 .998020 .998008 9.998174 30 .998163 40 .998151 45 .998139 50 .998128 9.997996 .997984 .997972 .997959 .997947 9.997935 ,997922 .997910 .997897 .997885 Corr. for Sec. 9.997872 .997860 I .960473 .998186 20 4 .961866 8.963255 .964639 .966019 .967394 .968766 .997822 9.997809 .997797 .997784 .997771 .997758 428948 9.997745 .997732 .997719 .997706 .997693 9.997680 .997847 10 .997667 .997654 .997641 .997628 9.997614 Sin. # .997835 15 428048 30 45 50 16890 Corr. 2 3 4 6 Tan. 8 10 11 8.941952 .943404 .944852 .946295 .947734 8.949168 .950597 .952021 .953441 .954856 8.956267 .957674 .959075 8.970133 .971496 .972855 .974209 .975560 8.976906 .978248 .979586 .980921 .982251 8.983577 .984899 .986217 ,987532 .988842 8.990149 .991451 .992750 .994045 .995337 8.996624 .997908 .999188 9.000465 .001738 9.003007 .004272 .005534 .006792 .008047 9.009298 .010546 .011790 .013031 .014268 9.015502 .016732 .017959 .019183 .020403 9.021620 Cot. D. 1". 24.20 24.13 24.05 23.98 23.90 23.82 23.73 23.67 23.58 23.52 23.45 23.35 23.30 23.22 23.15 23.07 23.00 22.92 22.87 22.78 22.72 22.65 22.57 22.52 22.43 22.37 22.30 22.25 22.17 22.10 22.03 21.97 21.92 21.83 21.78 21.70 21,65 21.58 21.53 21.45 21.40 21.33 21.28 21.22 21.15 21.08 21.03 20.97 20.92 20.85 20.80 20.73 20.68 20.62 20.57 20.50 20.45 20.40 20.33 20.28 D. 1". Cot. 174° 8885 1.058048 .056596 59 .055148 .053705 57 .052266 56 1.050832 55 .049403 54 .047979 53 .046559 52 .045144 51 50 1.043733 .042326 49 .040925 48 .039527 47 .038134 46 1.036745 45 60 .035361 44 .033981 43 ,032606 42 .031234 41 40 1.029867 .028504 39 .027145 38 .025791 37 .024440 1.023094 36 35 34 .021752 .020414 33 .019079 32 .017749 31 1.016423 30 .015101 29 .013783 28 .012468 27 .011158 26 1.009851 25 .008549 24 .007250 23 .005955 .004663 21 1.003376 20 .002092 19 .000812 18 0.999535 17 .998262 16 15 0.996993 .995728 14 .994466 13 .993208 12 .991953 11 ********22 0.990702 10 .989454 9 .988210 8 7 .986969 6 .985732 0.984498 .983268 .982041 .980817 .979597 0.978380 Tan. OLEST 5 1 0 84° 583 6° 0123410 CZ∞ σ 6 7 8 9 10 11 12 13 14 15 16 17 18 19 222222 20 21 23 24 25 26 27 28 29 96° 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 Sin. COSINES, TANGENTS, AND COTANGENTS 9.019235 .020435 .021632 .022825 .024016 9.025203 .026386 .027567 .028744 .029918 9.031089 .032257 .033421 .034582 .035741 9.036896 .038048 .039197 .040342 .041485 9.042625 .043762 .044895 .046026 .047154 9.048279 .049400 .050519 .051635 .052749 9.053859 .054966 .056071 .057172 .058271 9.059367 .060460 .061551 .062639 .063724 9.064806 .065885 .066962 .068036 .069107 9.070176 .071242 .072306 .073366 .074424 9.075480 .076533 .077583 .078631 .079676 9.080719 .081759 .082797 .083832 .084864 9.085894 Cos. D. 1". 20.00 19.95 19.88 19.85 19.78 19.72 19.68 19.62 19.57 19.52 19.47 19.40 19.35 19.32 19.25 19.20 19.15 19.08 19.05 19.00 18.95 18.88 18.85 18.80 18.75 18.68 18.65 18.60 18.57 18.50 18.45 18.42 18.35 18.32 18.27 18.22 18.18 18.13 18.08 18.03 17.98 17.95 17.90 17.85 17.82 17.77 17.73 17.67 17.63 17.60 17.55 17.50 17.47 17.42 17.38 17.33 17.30 17.25 17.20 17.17 D. 1". Cos. 9.997614 .997601 .997588 .997574 .997561 9.997547 .997534 .997520 .997507 .997493 9.997341 .997327 .997313 9.997480 tt .997466 .997452 10 ·.997439 15 .997425 20 9.997411 30 .997397 40 9 .997383 45 10 .997369 50 12 .997355 .997299 .997285 9.997271 .997257 .997242 .997228 .997214 9.997199 .997185 .997170 .997156 .997141 9.997127 .997112 .997098 .997083 .997068 9.996904 .996889 .996874 .996858 .996843 9.996828 .996812 .996797 .996782 .996766 9.996751 Corr. for Sec. Sin. 9.997053 W .997039 .997024 10 .997009 15 .996994 20 9.996979 30 .996964 40 7 10 .996949 45 11 .996934 50 12 .996919 Corr. 5ŏoJawNl Corr. 2 4 Tan. 9.021620 .022834 .024044 .025251 .026455 9.027655 .028852 .030046 .031237 .032425 9.033609 .034791 .035969 .037144 .038316 9.032185 .040651 .041813 .042973 .044130 9.045284 .046434 .047582 .048727 .049869 9.051008 .052141 .053277 .054407 .055535 9.056659 .057781 .058900 .060016 .061130 9.062210 .063348 .064453 065556 .066655 9.067752 .068816 .069938 .071027 .072113 9.073197 .074278 .075356 .076132 .077505 9.078576 .0796-44 .080710 .081773 .082833 9.083891 .0849.17 .086000 .087050 .088098 9.089144 Cot. D. 1". 20.23 20.17 20.12 20.07 20.00 19.95 19.90 19.85 19.80 19.73 19.70 19.63 19.58 19.53 19.48 19.43 19.37 19.33 19.28 19.23 19.17 19.13 19.08 19.03 18.98 18.93 18.88 18.83 18.80 18.73 18.70 18.65 18.60 18.57 18.50 18.47 18.42 18.38 18.32 18.28 18.23 18.20 18.15 18.10 18.07 18.02 17.97 17.93 17.88 17.85 17.80 17.77 17.72 17.67 17.63 17.60 17.55 17.50 17.47 17.43 D. 1". Cot. 0.978380 60 .977166 59 .975956 58 ,974749 57 .973545 56 0.972345 55 .971148 54 .969954 53 .968763 52 .967575 51 0.966391 .965209 .964031 48 .962856 47 .961684 173° 46 45 0.960515 .959349 44 .958187 43 .957027 42 .955870 41 50 49 0.954716 40 39 .953566 .952418 38 .951273 37 .950131 36 0.948992 35 .947856 34 .946723 33 .945593 32 .944465 31 0.943341 .942219 .941100 .939984 27 .938870 26 0.937760 25 .936652 24 .935547 23 0.921424 .920356 .919290 .918227 .917167 0.916109 .915053 .914000 .912950 .911902 0.910856 288888998 .934444 22 .933345 21 Tan. 0.932248 20 .931154 19 .930062 18 .928973 17 .927887 16 0.926803 15 .925722 14 .924644 13 .923568 12 .922495 11 30 10 9 8 6 DLO « BO-O 3 2 1 0 / 83° 584 7° 0123HELLO KO DO ∞∞ 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 97° 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 Sin. 9.085894 .086922 .087947 .088970 .089990 9.091008 .092024 .093037 .094047 .095056 9.096062 .097065 .098066 .099065 .100062 9.101056 .102048 .103037 .104025 .105010 9.105992 .106973 .107951 .108927 .109901 9.110873 .111842 .112809 .113774 .114737 9.115698 .116656 .117613 .118567 .119519 9.120469 .121417 .122362 .123306 .124248 9.125187 .126125 .127060 .127993 .128925 9.129854 .130781 .131706 .132630 .133551 9.134470 .135387 .136303 53 .137216 54 .138128 55 9.139037 56 .139944 57 .140850 58 .141754 59 .142655 60 9.143555 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 17.13 17.08 17.05 17.00 16.97 16.93 16.88 16.83 16.82 16.77 16.72 16.68 16.65 16.62 16.57 16.53 16.48 16.47 16.42 16.37 16.35 16.30 16.27 16.23 16.20 16.15 .16.12 16.08 16.05 16.02 15.97 15.95 15.90 15.87 15.83 15.80 15.75 15.73 15.70 15.65 15.63 15.58 15.55 15.53 15.48 15.45 15.42 15.40 15.35 15.32 15.28 15.27 15,22 15.20 15.15 15.12 15.10 15.07 15.02 15.00 D. 1". Cos. 9.996751 .996735 .996720 .996704 .996688 9.996673 .996657 .996641 .996625 .996610 9.996594 .996578 ม Corr. .996562 10 3 .996546 15 4 5 .996530 20 9.996514 30 .996498 40 11 8 .996482 45 12 .996465 50 13 .996449 9.996433 .996417 .996400 .996384 .996368 9.996351 .996335 .996318 .996302 .996285 9.996269 ..996252 .996235 .996219 .996202 9.996185 .996168 .996151 .996134 .996117 9.996100 .996083 Corr. .996066 10 3 .996049 15 4 .996032 20 9.996015 30 6 9 11 .995998 40 .995980 45 13 .995963 50 14 .995946 9.995928 .995911 .995894 .995876 .995859 9.995841 .995823 .995806 .995788 .995771 9.995753 Corr. for Sec. Sin. H Tan. 9.089144 .090187 .091228 .092266 .093302 9.094336 .095367 .096395 .097422 .098446 9.099468 .100487 .101504 .102519 .103532 9.104542 .105550 .106556 .107559 .108560 9.109559 .110556 .111551 .112543 .113533 9.114521 .115507 .116491 .117472 .118452 9.119429 .120404 .121377 .122348 .123317 9.124284 .125249 .126211 .127172 .128130 9.129087 .130041 .130994 .131944 .132893 9.133839 .134784 .135726 .136667 .137605 9.138542 .139476 .140409 .141340 .142269 9.143196 .144121 .145044 .145966 .146885 9.147803 Cot. D. 1". 17.38 17.35 17.30 17.27 17.23 17.18 17.13 17.12 17.07 17.03 16.98 16.95 16.92 16.88 16.83 16.80 16.77 16.72 16.68 16.65 16.62 16.58 16.53 16.50 16.47 16.43 16.40 16.35 16.33 16.28 16.25 16.22 16.18 16.15 16.12 16.08 16.03 16.02 15.97 15.95 15.90 15.88 15.83 15.82 15.77 15.75 15.70 15.68 15.63 15.62 15.57 15.55 15.52 15.48 15.45 15.42 15.38 15.37 15.32 15.30 D. 1". Cot. 172° 0.910856 .909813 60 59 .908772 58 .907734 57 .906698 0.905664 56 55 .904633 54 .903605 53 .902578 52 .901554 51 0.900532 50 .899513 49 .898496 48 .897481 47 .896468 0.895458 46 45 .894450 44 .893444 43 .892441 42 .891440 41 0.890441 40 39 .889444 .888449 38 .887457 37 .886467 36 0.885479 35 .884493 34 .883509 33 .882528 32 .881548 31 0.880571 30 .879596 29 .878623 28 .877652 .876683 26 0.875716 25 .874751 24 .873789 23 .872828 .871870 21 0.870913 20 .869959 19 .869006 18 .868056 17 .867107 16 0.866161 15 .865216 14 .864274 13 .863333 12 .862395 11 0.861458 .860524 .859591 .858660 .857731 0.856804 .855879 .854956 .854034 .853115 0.852197 Tan. 22*7****≈≈ 22*! 10 9 8 7 6 1043210 5 82° 585 8° 01234UCZBO 7 8 9 10 11 12 13 14 15 16 17 18 19 EO ES ES ED ES MO 20 21 22 23 24 25 26 27 28 29 * 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 7000000 48 49 50 51 52 53 54 55 56 57 58 888888 59 60 98° COSINES, TANGENTS, AND COTANGENTS Sin. D. 1" 9.143555 .144453 .145349 .146243 .147136 9.148026 .148915 .149802 .150686 .151569 9.152451 .153330 .154208 .155083 .155957 9.156830 .157700 .158569 .159435 .160301 9.161164 .162025 .162885 .163743 .164600 9.165454 .166307 .167159 .168008 .168856 9.169702 .170547 .171389 .172230 .173070 9.173908 .174744 .175578 .176411 .177242 9.178072 .178900 .179726 .180551 .181374 9.182196 .183016 .183834 .184651 .185466 9.186280 .187092 .187903 .188712 .189519 9.190325 .191130 .191933 .192734 .193534 9.194332 14.97 14.93 14.90 14.88 14.83 14.82 14.78 14.73 14.72 14.70 14.65 14.63 14.58 14.57 14.55 14.50 14.48 14.43 14.43 14,38 14.35 14.33 14.30 14.28 14.23 14.22 14.20 14.15 14.13 14.10 14.08 14.03 14.02 14.00 13.97 13.93 13.90 13.88 13.85 13.83 13.80 13.77 13.75 13.72 13.70 13.67 13.63 13.62 13.58 13.57 13.53 13.52 13.48 13.45 13.43 13.42 13.38 13.35 13.33 13.30 Cos. D. 1". Cos. 9.995753 .995735 .995717 .995699 .995681 9.995664 .995646 .995628 .995610 .995591 9.995390 .995372 .995353 .995334 .995316 9.995573 .995555 Corr. .995537 10 3 .995519 15 5 .995501 20 6 9.995482 30 9 .995464 40 12 .995446 45 14 .995427 50 15 .995409 9.995297 .995278 .995260 ,995241 .995222 9.995203 .995184 ,995165 .995146 .995127 9.995108 .995089 .995070 .995051 .995032 9.994818 ,994798 .994779 .994759 .994739 9.994720 .994700 .994680 Corr. for Sec. #1 9.995013 .994993 .994974 10 .994955 15 .994660 .994640 9.994620 Sin. Corr. 3 5 .994935 20 6 9.994916 30 10 .994896 40 13 .994877 45 15 16 .994857 50 .994838 M Tan. D. 1". 9.147803 .148718 .149632 .150544 .151454 9.152363 .153269 .154174 .155077 .155978 9.156877 .157775 .158671 .159565 .160457 9.161347 .162236 .163123 .164008 .164892 9.165774 .166654 .167532 .168409 .169284 9.170157 .171029 .171899 .172767 .173634 9.174499 .175362 .176224 .177084 .177942 9.178799 .179655 .180508 .181360 .182211 9.183059 .183907 .184752 .185597 .186439 9.187280 .188120 .188958 .189794 .190629 9.191462 .192294 .193124 .193953 .194780 9.195606 .196430 .197253 .198074 .198894 9.199713 Cot. 15.25 15.23 15.20 15.17 15.15 15.10 15.08 15.05 15.02 14.98 14.97 14.93 14.90 14.87 14.83 14.82 14.78 14.75 14.73 14.70 14.67 14.63 14.62 14.58 14.55 14.53 14.50 14.47 14.45 14.42 14.38 14.37 14.33 14.30 14.28 14.27 14.22 14.20 14.18 14.13 14.13 14.08 14.08 14.03 14.02 14.00 13.97 13.93 13.92 13.88 13.87 13.83 13.82 13.78 13.77 13.73 13.72 13.68 13.67 13.65 D. 1". Cot. 0.852197 60 .851282 59 .850368 58 .849456 57 .848546 56 0.847637 55 846731 54. .845826 53 .844923 52 .844022 51 171° 0.843123 50 .842225 49 .841329 48 .840435 47 .839543 46 0.838653 45 ,837764 44 .836877 43 .835992 42 .835108 41 0.834226 40 .833346 39 .832468 38 .831591 37 ..830716 36 0.829843 35 .828971 34 .828101 33 .827233 32 .826366 31 0.825501 30 .824638 29 .823776 28 .822916 27 .822058 26 0.821201 25 .820345 24 .819492 23 .818640 22 .817789 21 0.816941 20 .816093 19 .815248 18 .814403 17 .813561 16 0.812720 15 14 .811880 .811042 13 .810206 12 .809371 11 0.808538 .807706 .806876 .806047 .805220 0.804394 .803570 .802747 ,801926 .801106 0.800287 Tan. 10 9 8 78143210 6 2. 81° 586 9° 01234 LOCO DI ∞ σ 5 6 8 9 10 11 12 13 14 15 16 17 18 19 272****7 20 21 23 24 25 26 28 29 30 31 32 33 34 35 36 37 38 39 27234 99° 40 41 44 45 46 47 48 49 Sin. 9.194332 .195129 .195925 .196719 .197511 9.198302 .199091 .199879 .200666 .201451 9.202234 .203017 .203797 .204577 .205354 9.206131 .206906 .207679 .208452 .209222 9.209992 .210760 .211526 212291 .213055 9.213818 .214579 .215338 .216097 .216854 9.217609 .218363 .219116 .219868 .220618 9.221367 .222115 .222861 .223606 .224349 9.225092 ,225833 .226573 .227311 .228048 9.228784 .229518 .230252 .230984 .231715 50 9.232444 51 .233172 52 .233899 53 .234625 54 .235349 55 9.236073 56 .236795 57 ,237515 58 .238235 59 .238953 60 9.239670 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 13.28 13.27 13.23 13.20 13.18 13.15 13.13 13.12 13.08 13.05 13.05 13.00 13.00 12.95 12.95 12.92 12.88 12.88 12.83 12.83 12.80 12.77 12.75 12.73 12.72 12.68 12.65 12.65 12.62 12.58 12.57 12.55 12.53 12.50 12.48 12.47 12.43 12.42 12.38 12.38 12.35 12.33 12.30 12.28 12.27 12.23 12.23 12.20 12.18 12.15 12.13 12.12 12.10 12.07 12 07 12.03 12.00 12.00 11.97 11.95 D. 1". Cos. 9.994620 .994600 .994580 .994560 .994540 9.994519 .994499 .994479 .994459 .994438 9.994418 .994398 .994254 .994233 Corr. .994377 10 3 .994357 15 5 .994336 20 7 9.994316 30 10 .994295 40 .994274 45 14 15 17 50 9.994212 .994191 .994171 .994150 .994129 9.994108 .994087 .994066 .994045 .994024 9.994003 .993982 .993960 .993939 .993918 9.993897 .993875 .993854 .993832 .993811 " 9.993572 .993550 .993528 .993506 .993484 9.993462 .993440 Corr. for Sec. 9.993789 .993768 11 Corr. .993746 10 4 .993725 15 5 7 .993703 20 9.993681 30 11 .993660 40 14 .993638 45 16 .993616 50 18 .993594 .993418 .993396 .993374 9.993351 Sin. Tan. 9.199713 .200529 .201345 .202159 .202971 9.203782 .204592 .205400 .206207 .207013 9.207817 .208619 .209420 .210220 .211018 9.211815 .212611 .213405 .214198 .214989 9.215780 .216568 .217356 .218142 .218926 9.219710 .220492 .221272 .222052 .222830 9.223607 .224382 .225156 .225929 .226700 9.227471 .228239 .229007 .229773 .230539 9.231302 .232065 .232826 233586 .234345 9.235103 .235859 .236614 .237368 .238120 9.238872 .239622 .240371 .241118 .241865 9.242610 243354 .244097 .244839 .245579 9.246319 Cot. D. 1". 13.60 13.60 13.57 13.53 13.52 13.50 13.47 13.45 13.43 13.40 13.37 13.35 13.33 13.30 13.28 13.27 13.23 13.22 13.18 13.18 13.13 13.13 13.10 13.07 13.07 13.03 13.00 13.00 12.97 12.95 12.92 12.90 12.88 12.85 12.85 12.80 12.80 12.77 12.77 12.72 12.72 12.68 12.67 12.65 12.63 12.60 12.58 12.57 12.53 12.53 12.50 12.48 12.45 12.45 12.42 12.40 12.38 12.37 12.33 12.33 D. 1". Cot. 0.800287 60 .799471 59 .798655 58 .797841 57 .797029 56 0.796218 55 54 .795408 .794600 53 ..793793 52 .792987 51 0.792183 50 .791381 49 .790580 48 .789780 47 .788982 46 0.788185 45 .787389 44 .786595 43 .785802 42 .785011 41 0.784220 40 .783432 39 .782644 38 .781858 37 170° .781074 0.780290 36 35 .779508 34 .778728 33 777948 32 .777170 31 0.776393 30 .775618 29 .774844 28 .774071 27 0.772529 .773300 26 25 .771761 24 .770993 23 .770227 22 .769461 21 0.768698 20 .767935 19 .767174 18 .766414 17 .765655 16 0.764897 15 .764141 14 .763386 13 .762632 12 .761880 11 0.761128 ,760378 .759629 .758882 .758135 0.757390 .756646 .755903 .755161 .754421 0.753681 Tan. 10 9 · CO LO TE CONHO 2 80° 587 10° 0123 HIS CO Z-89 6 7 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 100° COSINES, TANGENTS, AND COTANGENTS Sin. 9.239670 .240386 .241101 241814 .242526 9.243237 ,243947 .244656 .245363 .246069 9.246775 .247478 .248181 .248883 .249583 9.250282 .250980 .251677 .252373 .253067 9.253761 .254453 .255144 .255834 .256523 9.257211 .257898 .258583 .259268 .259951 9.260633 .261314 .26 1994 .262673 .263351 9.264027 .264703 .265377 .266051 .266723 9.267395 .268065 .268734 .269402 .270069 9.270735 .271400 .272064 .272726 .273388 9.274049 .274708 .275367 .276025 .276681 9.277337 .277991 .278645 .279297 .279948 9.280599 Cos. D. 1". 11.93 11.92 11.88 11.87 11.85 11.83 11.82 11.78 11.77 11.77 11.72 11.72 11.70 11.67 11.65 11.63 11.62 11.60 11.57 11.57 11.53 11.52 11.50 11.48 11.47 11.45 11.42 11.42 11.38 11.37 11.35 11.33 11.32 11.30 11.27 11.27 11.23 11.23 11.20 11.20 11.17 11.15 11.13 11.12 11.10 11.08 11.07 11.03 11.03 11.02 10.98 10.98 10.97 10.93 10.93 10.90 10.90 10.87 10.85 10.85 D. 1". Cos. 9.993351 .993329 .993307 .993284 .993262 9.993240 .993217 .993195 .993172 .993149 9.992898 .992875 .992852 .992829 .992806 9.992783 .992759 .992736 9.993127 .993104 Corr. .993081 10 4 .993059 15 6 .993036 20 8 9.993013 30 11 .992990 1.40 15 17 .992967 45 .992944 50 19 .992921 .992713 .992690 9.992666 .992643 .992619 .992596 .992572 9.992549 .992525 ,992501 .992478 .992454 9.992190 .992166 .992142 .992118 .992093 9.992069 "1 9.992430 .992406 .992382 10 ,992359 15 .992335 20 8 9.992311 30 12 .992044 .992020 .991996 .991971 9.991947 Corr. for Sec. Sin. 11 Corr. 4 ∞ .992287 40 16 .992263 45 .992239 50 .992214 6 600080 18 20 Tan. 9.246319 .247057 .247794 .248530 .249264 9.249998 .250730 .251461 .252191 .252920 9.2536-18 254374 .255100 .255824 .256547 9.257269 .257990 .258710 .259429 .260146 9.260863 .261578 .262292 .263005 .263717 9.264428 .265138 .265847 .266555 .267261 9.267967 .268671 .269375 .270077 .270779 9.271479 .272178 .272876 .273573 .274269 9.274964 .275658 .276351 .277043 .277734 9.278424 .279113 .279801 .280488 .281174 9.281858 .282542 .283225 .283907 .284588 9.285268 .285947 .286624 .287301 .287977 9.288652 Cot. D. 1". 12.30 12.28 12.27 12.23 12.23 12.20 12.18 12.17 12.15 12.13 12.10 12.10 12.07 12.05 12.03 12.02 12.00 11.98 11.95 11.95 11.92 11.90 11.88 11.87 11.85 11.83 11.82 11.80 11.77 11.77 11.73 11.73 11.70 11.70 11.67 11.65 11.63 11.62 11.60 11.58 11.57 11.55 11.53 11.52 11.50 11.48 11.47 11.45 11.43 11.40 11.40 11.38 11.37 11.35 11.33 11.32 11.28 11.28 11.27 11.25 D. 1". Cot. 0.753681 .752943 60 59 .752206 58 .751470 57 .750736 56 0.750002 55 .749270 54 .748539 53 .747809 52 .747080 51 169° 0.746352 50 49 .745626 .744900 48 .744176 47 .743453 0.742731 46 45 .742010 44 .741290 43 .740571 42 .739854 41 0.739137 40 .738422 39 .737708 38 .736995 37 36 .736283 0.735572 35 .734862 34 .734153 33 .733445 32 .732739 31 0.732033 30 29 .731329 .730625 28 .729923 27 26 .729221 0.728521 228 25 .727822 24 .727124 23 .726427 22 .725731 21 0.718142 .717458 .716775 .716093 715412 0.714732 .714053 .713376 .712699 .712023 0.711348 0.725036 20 19 .723649 18 .724342 .722957 17 .722266 16 0.721576 15 .720887 14 .720199 13 .719512 12 .718826 11 Tan. A 098765432IO 10 1 79° 588 11° 01234BU7∞" OER 6 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 101° Sin. 9.280599 .281248 .281897 .282544 .283190 9.283836 .284480 .285124 .285766 .286108 9.287048 .287688 .288326 .288964 .289600 9.290236 .290870 .291504 .292137 .292768 9.293399 .294029 .294658 .295286 .295913 9.296539 .297164 297788 .298412 .299034 9.299655 .300276 .300895 .301514 .302132 9.302748 .303364 .303979 .304593 ..305207 9.305819 .306430 .307041 .307650 .308259 9.308867 .309474 .310080 .310685 .311289 9.311893 .312495 .313097 .313698 :314297 9.314897 .315495 .316092 .316689 .317284 9.317879 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 10.82 10.82 10.78 10.77 10.77 10.73 10.73 10.70 10.70 10.67 10.67 10.63 10.63 10.60 10.60 10.57 10.57 10.55 10.52 10.52 10.50 10.48 10.47 10.45 10.43 10.42 10.40 10.40 10.37 10.35 10.35 10.32 10.32 10.30 10.27 10.27 10.25 10.23 10.23 10.20 10.18 10.18 10.15 10.15 10.13 10.12 10.10 10.08 10.07 10.07 10.03 10.03 10.02 9.98 10.00 9.97 9.95 9.95 9.92 9.92 D. 1". Cos. 9.991947 .991922 .991897 .991873 .991848 9.991823 .991799 .991774 .991749 .991724 9.991699 .991674 .991649 10 .991624 15 .991599 20 9.991574 30 13 .991549 17 .991524 45 19 .991498 21 .991473 9.991448 .991422 .991397 .991372 .991346 9.991321 .991295 .991270 .991244 .991218 9.991193 .991167 .991141 .991115 .991090 9.991064 .991038 .991012 .990986 .990960 9.990803 11 88948 9.990671 .990645 .990618 .990591 .990565 40 9.990934 .990908 .990882 .990855 15 .990829 20 9.990538 .990511 .990485 .990458 .990431 9.990404 Sin. 50 Corr. for Sec. ་ Corr. 10 4 7 9 30 13 .990777 40 18 .990750 45 .990724 50 .990697 Corr. 468 22223 20 Tan. 9.288652 .289326 .289999 .290671 .291342 9.292013 .292682 .293350 .294017 ,294684 9.295349 .296013 .296677 .297339 .298001 9.298662 .299322 ,299980 .300638 .301295 9.301951 .302607 .303261 .303914 .304567 9.305218 .305869 .306519 .307168 .307816 9.308463 .309109 .309754 .310399 .311042 9.311685 .312327 .312968 .313608 .314247 9.314885 .315523 .316159 .316795 .317430 9.318064 .318697 .319330 .319961 .320592 9.321222 .321851 .322479 .323106 .323733 9.324358 .324983 .325607 .326231 .326853 9.327475 Cot. D. 1". 11.23 11.22 11.20 11.18 11.18 11.15 11.13 11.12 11.12 11.08 11.07 11.07 11.03 11.03 11.02 11.00 10.97 10.97 10.95 10.93 10.93 10.90 10.88 10.88 10.85 10.85 10.83 10.82 10.80 10.78 10.77 10.75 10.75 10.72 10.72 10.70 10.68 10.67 10.65 10.63 10.63 10.60 10.60 10.58 10.57 10.55 10.55 10.52 10.52 10.50 10.48 10.47 10.45 10.45 10.42 10.42 10.40 10.40 10.37 10.37 D. 1". Cot. 0.711348 60 .710674 59 .710001 .709329 .708658 0.707987 55 .707318 54 .706650 53 .705983 52 .705316 51 168° 1889156 0.704651 50 .703987 49 .703323 48 .702661 47 .701999 46 0.701338 45 .700678 44 .700020 43 .699362 42 .698705 41 57 0.698049 40 .697393 39 .696739 38 .696086 99999 37 .695433 36 0.694782 35 .694131 34 .693481 33 .692832 32 .692184 31 0.678778 .678149 .677521 .676894 .676267 0.675642 0.691537 30 .690891 29 .690246 28 .689601 27 .688958 26 0.688315 25 .687673 24 .687032 .686392 23 .685753 21 .675017 .674393 .673769 .673147 0:672525 Tan. 0.685115 20 .684477 19 .683841 18 .683205 17 .682570 16 0.681936 .681303 .680670 15 14 13 .680039 12 .679408 11 ********22 2-** 10 9 7 5 4 3210 78° 589 12° 01234 LE LO II 00 C 5 7 8 9 10 11 12 13 14 15 16 17 18 19 27222*27*2 ******BAR GERAI4-*** ADI 23 24 25 26 28 29 20 9.329599 21 .330176 .330753 .331329 .331903 9.332478 .333051 .333624 .334195 .334767 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 098998 102° COSINES, TANGENTS, AND COTANGENTS Sin. 9.317879 .318473 .319066 .319658 .320249 9.320840 .321430 .322019 .322607 .323194 9.323780 .324366 .324950 .325534 .326117 9.326700 .327281 .327862 .328442 .329021 9.335337 .335906 ,336475 .337043 .337610 9.338176 .338742 ,339307 .339871 .340434 9.340996 341558 .342119 .342679 .343239 9.343797 .344355 .344912 .345469 .346024 9.346579 .347134 .347687 .348240 .348792 9.349343 .349893 .350443 .350992 .351540 9.352088 Cos. D. 1". 9.90 9.88 9.87 9.85 9.85 9.83 9.82 9.80 9.78 9.77 9.77 9.73 9.73 9.72 9.72 9.68 9.68 9.67 9.65 9.63 9.62 9.62 9.60 9.57 9.58 9.55 9.55 9.52 9.53 9.50 9.48 9.48 9.47 9.45 9.43 9.43 9.42 9.40 9.38 9.37 9.37 9.35 9.33 9.33 9.30 9.30 9.28 9.28 9.25 9.25 9.25 9.22 9.22 9.20 9.18 9.17 9.17 9.15 9.13 9.13 D. 1". Cos. 9.990404 .990378 .990351 ,990324 .990297 9.990270 .990243 .990215 .990188 .990161 9.990134 .990107 .990079 10 .990052 15 .990025 20 9.989997 30 9.989860 .989832 .989804 .989777 .989749 9.989721 .989693 .989665 .989637 .989610 9.989582 .989553 .989525 .989497 .989469 9.989441 .989413 .989385 .989356 .989328 Corr. for Sec. .989970 .989942 45 21 .989915 50 23 .989887 9.989014 .988985 .988956 .988927 .988898 9.988869 .988840 .988811 .988782 .988753 9.988724 Sin. 11 Corr. 5 7 9 14 40 18 88948 9.989300 .989271 " Corr. .989243 10 5 .989214 15 7 .989186 20 9.989157 .989128 40 .989100 45 .989071 50 .989042 10 30 14 19 21 28948 24. Tan. 9.327475 .328095 .328715 .329334 .329953 9.330570 .331187 .331803 .332418 .333033 9.333646 .334259 .334871 .335482 .336093 9.336702 .337311 .337919 .338527 .339133 9.339739 .340344 .340948 .341552 .342155 9.342757 .343358 .343958 .344558 .345157 9.345755 .346353 .346949 .347545 .348141 9.348735 .349329 .349922 .350514 .351106 9.351697 .352287 .352876 .353465 .354053 9.354640 .355227 .355813 .356398 .356982 9.357566 .358149 .358731 .359313 .359893 9.360474 .361053 .361632 .362210 .362787 9.363364 Cot. D. 1". 10.33 10.33 10.32 10.32 10.28 10.28 10.27 10.25 10.25 10.22 10.22 10.20 10.18 10.18 10.15 10.15 10.13 10.13 10.10 10.10 10.08 10.07 10.07 10.05 10.03 10.02 10.00 10.00 9.98 9.97 9.97 9.93 9.93 9.93 9.90 9.90 9.88 9.87 9.87 9.85 9:83 9.82 9.82 9.80 9.78 9.78 9.77 9.75 9.73 9.73 9.72 9.70 9.70 9.67 9.68 9.65 9.65 9.63 9.62 9.62 D. 1". Cot. 0.672525 .671905 .671285 58 .670666 57 .670047 56 0.669430 55 .668813 54 .668197 53 .667582 52 .666967 51 167° 0.666354 50 .665741 49 .665129 48 .664518 47 .663907 46 0.663298 45 .662689 44 .662081 43 .661473 42 .660867 41 0.642434 .641851 .641269 .640687 5899 0.660261 40 39 .659656 .659052 38 .658448 37 .657845 36 0.657243 35 .656642 34 .656042 33 .655442 32 .654843 31 0.654245 30 .653647 29 .653051 28 .652455 27 .651859 26 0.651265 25 .650671 24 .650078 23 .649486 22 .648894 21 .640107 0.639526 60 0.648303 20 .647713 19 .647124 18 .646535 17 .645947 16 0.645360 15 .644773 14 .644187 13 .643602 12 .643018 11 .638947 .638368 .637790 .637213 0.636636 Tan. 10 9 7 6 LO * 2 / 77° 590 13° 0123 ALONG 8 9 10 11 12 13 14 15 16 17 *22222222222 19 20 21 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 103° Sin. 9.352088 .352635 .353181 .353726 .354271 9.354815 .355358 .355901 .356443 .356984 9.357524 .358064 .358603 .359141 .359678 9.360215 .360752 .361287 .361822 .362356 9.362889 .363422 .363954 ,364485 .365016 9.365546 .366075 .366604 .367131 .367659 9.368185 .368711 .369236 .369761 .370285 9.370808 .371330 .371852 .372373 .372894 9.373414 .373933 .374452 .374970 .375487 9.376003 .376519 .377035 .377549 .378063 9.378577 .379089 .379601 .380113 .380624 9.381134 .381643 .382152 .382661 .383168 9.383675 Cos. TABLE XXII.-LOGARITHMIC SINÈS, D. 1". 9.12 9.10 9.08 9.08 9.07 9.05. 9.05 9.03 9.02 9.00 9.00 8.98 8.97 8.95 8.95 8.95 8.92 8.92 8.90 8.88 8.88 8.87 8.85 8.85 8.83 8.82 8.82 8.78 8.80 8.77 8.77 8.75 8.75 8.73 8.72 8.70 8.70 8.68 8.68 8.67 8.65 8.65 8.63 8.62 8.60 8.60 8.60 8.57 8.57 8.57 8.53 8.53 8.53 8.52 8.50 8.48 8.48 8.48 8.45 8.45 D. 1". Cos. 9.988724 .988695 .988666 .988636 .988607 9.988578 .988548 .988519 .988489 .988460 9.988430 .988401 .988371 10 .988342 15 .988312 20 9.988282 30 .988252 40 .988223 45 .988193 50 25 .988163 9.988133 .988103 .988073 .988043 .988013 9.987983 .987953 .987922 .987892 .987862 9.987832 .987801 .987771 .987740 .987710 9.987679 .987649 .987618 .987588 .987557 9.987217 .987186 .987155 .987124 .987092 9.987061 .987030 .986998 .986967 .986936 9.986904 - Sin. 10 Corr. for Sec. $1 9.987526 .987496 Corr. .987465 10 5 .987434 15 8 .987403 20 10 9.987372 30 15 .987341 21 .987310 .987279 .987248 40 5555 45 Corr. 5 7 10 15 50 24823 20 23 26 Tan. 9.363364 .363940 .364515 .365090 .365664 9.366237 .366810 .367382 .367953 .368524 9.369094 .369663 .370232 .370799 .371367 9.371933 .372499 .373064 .373629 .374193 9.374756 .375319 .375881 .376442 .377003 9.377563 .378122 .378681 .379239 .379797 9.380354 .380910 .381466 .382020 .382575 9.383129 .383682 .384234 384786 .385337 9.385888 .386438 .386987 .387536 .388084 9.388631 .389178 .389724 .390270 .390815 9.391360 .391903 .392447 .392989 .393531 9.394073 .394614 .395154 .395694 .396233 9.396771 Cot. D. 1". 9.60 9.58 9.58 9.57 9.55 9.55 9.53 9.52 9.52 9.50 9.48 9.48 9.45 9.47 9.43 9.43 9.42 9.42 9.40 9.38 9.38 9.37 9.35 9.35 9.33 9.32 9.32 9.30 9.30 9.28 9.27 9.27 9.23 9.25 9.23 9.22 9.20 9.20 9.18 9.18 9.17 9.15 9.15 9.13 9.12 9.12 9.10 9.10 9.08 9.08 9.05 9.07 9.03 9.03 9.03 9.02 9.00 9.00 8.98 8.97 D. 1". Cot. 60 0.636636 .636060 59 .635485 58 .634910 57 .634336 56 55 0.633763 .633190 54 .632618 53 .632047 52 .631476 51 0.630906 50 .630337 49 .629768 48 .629201 47 .628633 46 45 0.628067 .627501 44 .626936 43 .626371 42 .625807 41 0.625244 40 .624681 39 .624119 38 .623558 37 .622997 36 0.622437 35 .621878 34 .621319 33 .620761 32 .620203 31 166° 30 0.619646 .619090 29 .618534 28 .617980 27 .617425 26 0.616871 25 .616318 24 .615766 23 .615214 22 .614663 21 0.608640 .608097 .607553 .607011 .606469 0.605927 .605386 .604846 .604306 .603767 0.603229 0.614112 20 .613562 19 .613013 18 .612464 17 .611916 16 0.611369 15 .610822 14 13 .610276 .609730 12 .609185 11 Tan. ********Z 10 9 8 7 ·CK 43210 5 76° 591 14° 0123 ELO CN89 7 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 104° COSINES, TANGENTS, AND COTANGENTS Sin. 9.383675 .384182 .384687 .385192 .385697 9.386201 .386704 .387207 ,387709 .388210 9.388711 .389211 .389711 .390210 .390708 9.391206 .391703 .392199 .392695 .393191 9.393685 .394179 .394673 .395166 .395658 9.396150 .396641 .397132 .397621 .398111 9.398600 .399088 .399575 .400062 400549 9.401035 .401520 .402005 .402489 .402972 9.403455 .403938 .404420 .404901 .405382 9.405862 .406341 .406820 .407299 .407777 9.408254 .408731 .409207 .409682 .410157 9.410632 .411106 .411579 .412052 .412524 9.412996 Cos. D. 1". 8.45 8.42 8.42 8.42 8.40 8.38 8.38 8.37 8.35 8.35 8.33 8.33 8.32 8.30 8.30 8.28 8.27 8.27 8.27 8.23 8.23 8.23 8.22 8.20 8.20 8.18 8.18 8.15 8.17 8.15 8.13 8.12 8.12 8.12 8.10 8.08 8.08 8.07 8.05 8.05 8.05 8.03 8.02 8.02 8.00 7.98 7.98 7.98 7.97 7.95 7.95 7.93 7.92 7.92 7.92 7.90 7.88 7.88 7.87 7.87 D. 1". Cos. 9.986904 .986873 .986841 .986809 .986778 9.986746 .986714 .986683 .986651 .986619 9.986587 9.986266 .986234 .986202 .986169 ་་ Corr. .986555 .986523 10 5 8 .986491 15 .986459 20 11 9.986427 30 16 .986395 40 21 .986363 45 24 .986331 50 27 .986299 .986137 9.986104 .986072 .986039 .986007 .985974 9.985942 .985909 .985876 .985843 .985811 9.985778 .985745 .985712 .985679 .985646 9.985280 .985247 .985213 .985180 .985146 9.985113 9.985613 .985580 Corr. .985547 10 6 .985514 15 8 .985480 20 11 9,985447 30 17 .985414 40 .985381 45 25 .985347 50 28 .985314 .985079 .985045 .985011 .984978 9.984944 Sin. Corr. for Sec. "J 222 Tan. 9.396771 .397309 .397846 .398383 .398919 9.399455 .399990 .400524 .401058 .401591 9.402124 .402656 .403187 .403718 .404249 9.404778 .405308 .405836 .406304 .406892 9.407419 .407945 .408471 .408996 .409521 9.410045 .410569 .411092 .411615 .412137 9.412658 .413179 .413699 .414219 .414738 9.415257 .415775 .416293 .416810 .417326 9.417842 .418358 .418873 .419387 .419901 9.420415 .420927 .421440 .421952 .422463 9.422974 .423484 .423993 .424503 .425011 9.425519 .426027 .426534 .427041 .427547 9.428052 Cot. D. 1". 8.97 8.95 8.95 8.93 8.93 8.92 8.90 8.90 8.88 8.88 8.87 8.85 8.85 8.85 8.82 8.83 8.80 8.80 8.80 8.78 8.77 8.77 8.75 8.75 8.73 8.73 8.72 8.72 8.70 8.68 8.68 8.67 8.67 8.65 8.65 8.63 8.63 8.62 8.60 8.60 8.60 8.58 8.57 8.57 8.57 8.53 8.55 8.53 8.52 8.52 8.50 8.48 8.50 8.47 8.47 8.47 8.45 8.45 8.43 8.42 D. 1″. Cot. 0.603229 .602691 60 59 .602154 58 .601617 57 .601081 56 55 .600010 54 0.600545 .599476 53 .598942 52 .598409 51 165° 0.597876 50 .597344 49 .596813 48 .596282 47 46 .595751 0.595222 45 .594692 44 .594164 43 .593636 42 .593108 41 0.592581 40 .592055 39 .591529 38 .591004 37 .590479 0.589955 36 35 34 .589431 .588908 33 .588385 32 .587863 31 0.587342 30 .586821 29 .586301 28 .585781 27 26 25 .584225 24 .583707 23 .583190 22 .582674 21 .585262 0.584743 0.582158 .581642 19 .581127 18 .580613 17 .580099 16 0.579585 15 0.577026 .576516 .576007 .575497 .574989 0.574481 .573973 .573466 .572959 .572453 0.571948 222 Tan. 20 .579073 14 .578560 13 .578048 12 .577537 11 10 9876543210 75° 592 15° 012341 618 5 9 10 11 12 13 14 15 16 17 18 19 2222 20 21 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 105° Sin. D. 1". 9.412996 .413467 .413938 .414408 .414878 9.415347 .415815 .416283 .416751 .417217 9.417684 .418150 .418615 .419079 .419544 9.420007 .420470 .420933 .421395 .421857 9.422318 .422778 .423238 .423697 .424156 9.424615 .425073 .425530 .425987 .426443 9.426899 .427354 .427809 .428263 .428717 9.429170 .429623 .430075 .430527 .430978 9.431429 .431879 .432329 .432778 .433226 9.433675 .434122 .434569 .435016 .435462 9.435908 .436353 .436798 .437242 .437686 9.438129 .438572 .439014 TABLE XXII.-LOGARITHMIC SINES, .439456 .439897 9.440338 Cos. 7.85 7.85 7.83 7.83 7.82 7.80 7.80 7.80 7.77 7.78 7.77 7.75 7.73 7.75 7.72 7.72 7.72 7.70 7.70 7.68 7.67 7.67 7.65 7.65 7.65 7.63 7.62 7.62 7.60 7.60 7.58 7.58 7.57 7.57 7.55 7.55 7.53 7.53 7.52 7.52 7.50 7.50 7.48 7.47 7.48 7.45 7.45 7.45 7.43 7.43 7.42 7.42 7.40 7.40 7.38 7.38 7.37 7.37 7.35 7.35 D. 1". Ccs. 9.984944 .984910 .984876 .984842 .984808 9.984774 .984740 .984706 .984672 .984638 9.984603 Corr. .984569 .984535 10 .984500 6 15 9 .984466 20 11 30 9.984432 17 .984397 40 23 .984363 45 26 .984328 50 29 .984294 9.984259 .984224 .984190 .984155 .984120 9.984085 .984050 .984015 .983981 .983946 9.983911 .983875 .983840 .983805 .983770 9.983735 .983700 .983664 .983629 .983594 Corr. for Sec. 9.983202 .983166 .983130 9.983558 .983523 .983487 10 .983452 15 .983416 20 12 9.983381 30 18 .983345 40 .983309 45 .983273 50 30 .983238 .983094 .983058 9.983022 .982986 .982950 .982914 .982878 9.982842 Sin. = IT Corr. 6 9 12220 24 27 Tan. D. 1". 9.428052 .428558 .429062 .429566 .430070 9.430573 .431075 .431577 .432079 .432580 9.433080 .433580 .434080 .434579 .435078 9.435576 .436073 .436570 .437067 .437563 9.438059 .438554 .439048 .439543 .440036 9.440529 441022 .441514 .442006 .442497 9.442988 .443479 .443968 .444458 .441947 9.445435 .445923 .446411 .446898 .447384 9.447870 .448356 .448841 .449326 .449810 9.450294 .450777 .451260 .451743 .452225 9.452706 .453187 .453668 .454148 .454628 9.455107 .455586 .456064 .456542 .457019 9.457496 Cot. 8.43 8.40 8.40 8.40 8.38 8.37 8.37 8.37 8.35 8.33 8.33 8.33 8.32 8.32 8.30 8.28 8.28 8.28 8.27 8.27 8.25 8.23 8.25 8.22 8.22 8.22 8.20 8.20 8.18 8.18 8.18 8.15 8.17 8.15 8.13 8.13 8.13 8.12 8.10 8.10 8.10 8.08 8.08 8.07 8.07 8.05 8.05 8.05 8.03 8.02 8.02 8.02 8.00 8.00 7.98 7.98 7.97 7.97 7.95 7.95 D. 1". Cot. 0.571948 60 59 .571442 .570938 58 .570434 57 .569930 56 0.569427 55 .568925 54 .568423 53 .567921 52 .567420 51 0.566920 .566420 .565920 .565421 .564922 0.564424 .563927 .563430 164 .562933 .562437 50 49 48 47 46 45 44 43 42 41 0.561941 40 39 .561446 .560952 38 .560457 37 .559964 36 35 0.559471 .558978 34 .558486 33 .557994 32 .557503 31 0.557012 30 29 .556521 .556032 28 .555542 27 0.554565 .555053 26 25 24 .554077 .553589 23 .553102 22 .552610 21 0.552130 20 .551644 19 .551159 18 .550674 17 .550190 16 0.549706 .549223 15 14 .548740 13 .548257 12 .547775 11 0.547294 10 .546813 .546332 .545852 .515372 0.544893 .544414 .543936 .543458 .542981 0.542504 Tan. 9 8 7 6 › LOTS & HO 4 3 2 1 0 74 593 16° 012341 CZ ∞ — 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 23 22242722 25 26 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 55 56 57 58 59 60 106° COSINES, TANGENTS, AND COTANGENTS Sin. 9.440338 .440778 .441218 .441658 .442096 9.442535 .442973 .443410 .443847 .414284 9.444720 445155 .445590 446025 .446459 9.446893 447326 4-47759 448191 .448623 9.449054 449485 449915 .450345 .450775 9.451204 .451632 .452060 452488 .452915 9.453342 .453768 .454194 .454619 .455044 9.455469 .455893 .456316 .456739 .457162 9.457584 .458006 .458427 .458848 .459268 9.459688 .460108 .460527 .460946 .461364 9.461782 .462199 .462616 .463032 .463448 9.463864 .464279 .464694 .465108 .465522 9.465935 Cos. D. 1". 7.33 7.33 7.33 7.30 7.32 7.30 7.28 7.28 7.28 7.27 7.25 7.25 7.25 7.23 7.23 7.22 7.22 7.20 7.20 7.18 7.18 7.17 7.17 7.17 7.15 7.13 7.13 7.13 7.12 7.12 7.10 7.10 7.08 7.08 7.08 7.07 7.05 7.05 7.05 7.03 7.03 7.02 7.02 7.00 7.00 7.00 6.98 6.98 6.97 6.97 6.95 6.95 6.93 6.93 6.93 6.92 6.92 6.90 6.90 6.88 D. 1". Cos. 9.982842 .982805 .982769 .982733 .982696 9.982660 .982624 .982587 .982551 .982514 9.982109 .982072 .982035 .981998 .981961 9.981924 .981886 .981849 .981812 .981774 9.982477 .982441 Corr. .982404 10 6 .982367 15 9 .982331 20 12 9.982294 .982257 .982220 982183 .982146 9.981737 .981700 .981662 ,981625 .981587 9.981549 .981512 .981474 .981436 .981399 Corr. for Sec. 9.980981 .980942 .980904 .980866 .980827 9.980789 .980750 .980712 .980673 .980635 9.980596 Sin. 11 89985 30 18 40 45 50 = 2225 28 9.981361 .981323 .981285 10 .981247 15 13 .981209 20 9.981171 30 19 .981133 40 25 .981095 45 29 .981057 50 .981019 31 Corr. 6 10 2322 Tan. 9.457496 .457973 .458449 .458925 .459400 9.459875 460349 .460823 .461297 .461770 9.462242 .462715 .463186 .463658 .464128 9.464599 .465069 .465539 .466008 .466477 9.466945 .467413 .467880 .468347 .468814 9.459280 .469746 .470211 .470676 .471141 9.471605 .472069 .472532 .472995 .473457 9.473919 .474381 474842 .475303 .475763 9.476223 .476683 .477142 .477601 .478059 9.478517 .478975 .479432 .479889 .480345 9.480801 .481257 .481712 .482167 .482621 9.483075 .483529 .483982 .484435 .484887 9.485339 Cot. D. 1". 7.95 7.93 7.93 7.92 7.92 7.90 7.90 7.90 7.88 7.87 7.88 7.85 7.87 7.83 7.85 7.83 7.83 7.82 7.82 7.80 7.80 7.78 7.78 7.78 7.77 7.77 7.75 7.75 7.75 7.73 7.73 7.72 7.72 7.70 7.70 7.70 7.68 7.68 7.67 7.67 7.67 7.65 7.65 7.63 7.63 7.63 7.62 7.62 7.60 7.60 7.60 7.58 7.58 7.57 7.57 7.57 7.55 7.55 7.53 7.53 D. 1". Cot. 60 0.542504 .542027 59 .541551 58 541075 57 .540600 56 0.540125 55 .539651 54 .539177 53 .538703 52 .538230 51 0.537758 50 .537285 49 .536814 48 .536342 47 .535872 46 0.535-101 45 .534931 44 .534461 43 42 .533523 41 .533992 163° 0.533055 40 .532587 39 .532120 38 .531653 37 .531186 36 0.530720 35 34 .530254 .529789 33 .529324 32 .528859 31 0.528395 30 .527931 29 .527468 28 .527005 27 .526543 26 0.526081 25 .525619 24 .525158 23 .524697 .524237 21 0.519199 .518743 .518288 .517833 .517379 0.523777 20 .523317 19 .522858 18 17 .522399 .521941 16 0.521483 15 .521025 14 .520568 13 .520111 12 .519655 11 0.516925 .516171 .516018 .515565 .515113 0.514661 Tan. ********22 10 9 8 7 6543210 73° 594 17° 01234167∞‹ 8 9 10 11 12 13 14 15 16 17 18 19 222******≈ 8-03-0688 20 21 23 24 25 26 27 28 29 31 32 33 34 35 37 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 99999 107° Sin. TABLE XXII.-LOGARITHMIC SINES, 9.465935 .466348 .466761 .467173 .467585 9.467996 .468407 .468817 .469227 .469637 9.470046 .470455 .470863 .471271 .471679 9.472086 .472492 .472898 .473304 .473710 9.474115 .474519 .474923 .475327 .475730 9.476133 .476536 .476938 .477340 .477741 9.478142 .478542 .478942 .479342 .479741 9.480140 .480539 .480937 .481334 .481731 9.482128 .482525 .482921 .483316 .483712 9.484107 .484501 .484895 .485289 .485682 9.486075 .486467 486860 .487251 .487643 9.488034 .488424 .488814 .489204 .489593 9.489982 Cos. D. 1". 6.88 6.88 6.87 6.87 6.85 6.85 6.83 6.83 6.83 6.82 6.82 6.80 6.80 6.80 6.78 6.77 6.77 6.77 6.77 6.75 6.73 6 73 6.73 6.72 6.72 6.72 6.70 6.70 6.68 6.68 6.67 6.67 6.67 6.65 6.65 6.65 6.63 6.62 6.62 6.62 6.62 6.60 6.58 6.60 6.58 6.57 6.57 6.57 6.55 6.55 6.53 6.55 6.52 6.53 6.52 6.50 6.50 6.50 6.48 6.48 D. 1". Cos. 9.980596 .980558 .980519 .980480 .980442 9.980403 .980364 .980325 .980286 .980247 9.980208 .980169 Corr. .980130 10 7 .980091 15 10 ,980052 20 9.980012 13 30 20 .979973 40 26 .979934 45 29 .979895 50 33 .979855 9.979816 .979776 .979737 .979697 .979658 9.979618 .979579 .979539 .979499 979459 9.979420 .979380 .979340 .979300 .979260 9.979220 .979180 .979140 .979100 .979059 Corr. for Sec. 9.978615 .978574 .978533 .978493 .978452 9.978411 .978370 .978329 .978288 .978247 9.978206 Sin. 11 9.979019 .978979 Corr, 7 .978939 10 .978898 15 10 .978858 20 13 9.978817 30 20 .978777 40 27 .978737 45 30 .97S696 50 34 .978655 222223 11 Tan. D. 1". 9.485339 .485791 .486242 .486693 .487143 9.487593 .488043 .488492 .488941 .489390 9.489838 .490286 .490733 .491180 .491627 9.492073 .492519 .492965 .493410 .493854 9.494299 .494743 .495186 495630 .496073 9.496515 .496957 .497399 .497811 .498282 9.498722 .499163 .499603 .500012 500481 9.500920 .501359 .501797 .502235 .502672 9.503109 .503546 .503982 .504418 .504854 9.505289 .505724 .506159 .506593 .507027 9.507460 .507893 .508326 .508759 .509191 9.509622 .510054 .510485 .510916 .511346 9.511776 Cot. 7.53 7.52 7.52 7.50 7.50 7.50 7.48 7.48 7.48 7.47 7.47 7.45 7.45 7.45 7.43 7.43 7.43 7.42 7.40 7.42 7.40 7.38 7.40 7.38 7.37 7.37 7.37 7.37 7.35 7.33 7.35 7.33 7.32 7.32 7.32 7.32 7.30 7.30 7.28 7.28 7.28 7.27 7.27 7.27 7.25 7.25 7.25 7.23 7.23 7.22 7.22 7.22 7.22 7.20 7.18 7.20 7.18 7.18 7.17 7.17 D. 1". Cot. .512857 0.512407 0.514661 .514209 .513758 58 .513307 57 56 55 .511957 54 .511508 53 .511059 52 .510610 51 162° 60 59 0.510162 50 .509714 49 .509267 48 .508820 47 .508373 46 0.507927 45 .507481 44 .507035 43 ,506590 42 .506146 41 9999 0.505701 40 39 .505257 .504814 38 .504370 37 .503927 0.503485 36 35 .503043 34 .502601 33 .502159 32 .501718 31 0.501278 30 .500837 29 .500397 28 .499958 27 .499519 26 0.499080 25 .498641 24 ******** 22 .498203 23 .497765 22 .497328 21 0.496891 20 0.492540 .492107 .491674 .491241 .490809 0.490378 .489946 .489515 .489084 .488654 0.488224 .496454 19 Tan. .496018 18 .495582 17 .495146 0.494711 16 15 .494276 14 .493841 13 .493407 12 .492973 11 10 9 8 76543210 72° 595 18° 0123D FLO ES t∞a 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 ******* 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 108° COSINES, TANGENTS, AND COTANGENTS Sin. D. 1". 9.489982 490371 .490759 .491147 .491535 9.491922 .492308 .492695 .493081 .493466 9.493851 .494236 .494621 .495005 495388 9.495772 .496154 .496537 .496919 .497301 9.497682 .498064 .498444 .498825 .499204 9.499584 .499963 .500342 .500721 .501099 9.501476 .501854 .502231 .502607 .502984 9.503360 .503735 .504110 .504485 .501860 9.505234 .505603 .505981 .506354 .506727 9.507099 .507471 .507843 .508214 .508585 9.508956 .509326 .509696 .510065 .510434 9.510803 .511172 .511540 511907 .512275 9.512642 Cos. 6.48 6.47 6.47 6.47 6.45 6.43 6.45 6.43 6.42 6.42 6.42 6.42 6.40 6.38 6.40 6.37 6.38 6.37 6.37 6.35 6.37 6.33 6.35 6.32 6.33 6.32 6.32 6.32 6.30 6.28 6.30 6.28 6.27 6.28 6.27 6.25 6.25 6.25 6.25 6.23 6.23 6.22 6.22 6.22 6.20 6.20 6.20 6.18 6.18 6.18 6.17 6.17 6.15. 6.15 6.15 6.15 6.13 6.12 6.13 6.12 D. 1". Cos. 9.978206 .978165 .978124 .978083 .978042 9.978001 .977959 .977918 .977877 .977835 9.977377 .977335 .977293 9.977794 .977752 .977711 10 Corr 7 .977669 15 10 .977628 20 14 9.977586 30 21 .977544 40 28 .977503 45 31 .977461 50 35 .977419 .977251 .977209 9.977167 .977125 .977083 .977041 .976999 9.976957 .976914 .976872 .976830 .976787 9.976745 .976702 .976660 .976617 .976571 9.976103 .976060 .976017 Corr. for Sec. .975974 .975930 9.975887 .975844 .975800 .975757 .975714 9.975670 Sin. " 9.976532 .976489 Corr. 7 .976446 10 .976404 15 11 .976361 20 14 9.976318 30 .21 .976275 40 29 .976232 45 32 .976189 50 36 .976146 Tan. 9.511776 .512206 .512635 .513064 .513493 9.513921 .514349 .514777 .515204 .515631 9.516057 .516481 .516910 .517335 .517761 9.518186 .518610 .519034 .519458 .519882 9.520305 .520728 .521151 .521573 .521995 9.522417 .522838 .523259 .5236.80 .524100 9.524520 .524940 .525359 .525778 .526197 9.526615 .527033 .527451 .527868 .528285 9.528702 .529119 .529535 .529951 .530366 9.530781 .531196 .531611 .532025 .532139 9.532853 .533266 .533679 .534092 .534504 9.534916 .535328 .535739 .536150 .536561 9.536972 Cot. D. 1". 7.17 7.15 7.15 7.15 7.13 7.13 7.13 7.12 7.12 7.10 7.12 7.10 7.08 7.10 7.08 7.07 7.07 7.07 7.07 7.05 7.05 7.05 7.03 7.03 7.03 7.02 7.02 7.02 7.00 7.00 7.00 6.98 6.98 6.98 6.97 6.97 6.97 6.95 6.95 6.95 6.95 6.93 6.93 6.92 6.92 6.92 6.92 6.90 6.90 6.90 6.88 6.88 6.88 6.87 6.87 6.87 6.85 6.85 6.85 6.85 D. 1". Cot. 0.488224 60 .487794 59 .487365 58 .486936 57 .486507 56 0.486079 55 .485651 54 .485223 53 .484796 52 .484369 51 -161° 0.483943 50 .483516 49 .483090 48 .482665 47 46 .482239 0.481814 45 .481390 44 .480966 43 .480542 42 .480118 41 0.479695 40 .479272 39 .478849 38 .478427 37 .478005 36 0.477583 35 .477162 34 .476741 33 .476320 32 .475900 31 0.475480 30 29 .475060 .474641 28 .474222 27 .473803 26 0.473385 25 .472967 24 .472549 .472132 .471715 21 0.471298 20 .470881 19 0.467147 .466734 .466321 .465908 .465496 0.165084 .464672 .464261 .463850 .463439 0.463028 ***22 22: .470465 18 .470049 17 .469634 16 0.469219 15 Tan. 23 .46SS04 14 .468389 13 .467975 12 .467561 11 10 9 8 CICLO A3210 7 6 71° 596 19° 0123E LA CD 2– 00 σ 5 6 8 9 10 11 12 13 14 15 16 17 18 19 228 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 109° Sin. 9.512642 .513009 .513375 .513741 .514107 9.514472 .514837 .515202 .515566 .515930 9.516294 .516657 .517020 .517382 .517745 9.518107 .518468 .518829 .519190 .519551 9.519911 .520271 .520631 ,520990 .521349 9.521707 .522066 .522424 .522781 .523138 9.523495 .523852 .524208 .524564 .524920 9.525275 .525630 .525984 .526339 .526693 9.527046 .527400 .527753 .528105 .528458 9.528810 .529161 .529513 .529864 .530215 9.530565 .530915 .531265 .531614 .531963 9.532312 .532661 .533009 .533357 .533704 9.534052 Cos. TABLE XXII.-LOGARITHMIC SINES, D. 1". 6.12 6.10 6.10 6.10 6.08 6.08 6.08 6.07 6.07 6.07 6.05 6.05 6.03 6.05 6.03 6.02 6.02 6.02 6.02 6.00 6.00 6.00 5.98 5.98 5.97 5.98 5.97 5.95 5.95 5.95 5.95 5.93 5.93 5.93 5.92 5.92 5.90 5.92 5.90 5.88 5.90 5.88 5.87 5.88 5.87 5.85 5.87 5.85 5.85 5.83 5.83 5.83 5.82 5.82 5.82 5.82 5.80 5.80 5.78 5,80 D. 1". Cos. 9.975670 .975627 .975583 .975539 .975496 9.975452 .975408 .975365 .975321 .975277 9,975233 .975189 9.974792 .974748 .974703 ,974659 .974614 9.974570 .974525 .974481 .974436 .974391 Corr. .975145 10 7 .975101 15 11. .975057 20 9.975013 30 15 .974969 40 29 .974925 45 33 .974880 50 37 .974836 9.974347 .974302 .974257 .974212 .974167 9.974122 .974077 .974032 .973987 .973942 H 9.973444 .973398 .973352 .973307 .973261 9.973215 .973169 .973124 .973078 .973032 9.972986 Sin. Corr. for Sec. 9.973897 .973852 .97380710 .973761 15 .973716 20 9.973671 30 Corr. 8 11 15 23 .973625 40 30 .97358045 34 .973535 50 38 .973489 " F42285 Tan. D. 1". 9.536972 .537382 .537792 .538202 .538611 9.539020 .539429 .539837 .540245 .540653 9.541061 .541468 .541875 .542281 .542688 9.543094 .543499 '.543905 .544310 .544715 9.545119 .545524 .545928 .546331 .546735 9.547138 .547540 .547943 .548345 .548747 9.549149 .549550 .549951 .550352 .550752 9.551153 .551552 .551952 .552351 .552750 9.553149 .553548 .553946 .554344 .554741 9.555139 .555536 .555933 .556329 .556725 9.557121 .557517 .557913 .558308 .558703 9.559097 .559491 .559885 .560279 .560673 9.561066 Cot. 6.83 6.83 6.83 6.82 6.82 6.82 6.80 6.80 6.80 6.80 6.78 6.78 6.77 6.78 6.77 6.75 6.77 6.75 6.75 6.73 6.75 6.73 6.72 6.73 6.72 6.70 6.72 6.70 6.70 6.70 6.68 6.68 6.68 6.67 6.68 6.65 6.67 6.65 6.65 6.65 6.65 6.63 6.63 6.62 6.63 6.62 6.62 6.60 6.60 6.60 6.60 6.60 6.58 6.58 6.57 6.57 6.57 6.57 6.57 6.55 D. 1". Cot. 0.463028 .462618 .462208 160° 8885 .461798 57 .461389 56 0.460980 55 .460571 54 .460163 53 .459755 52 .459347 51 60 0.458939 50 .458532 49 .458125 48 .457719 47 .457312 46 0.456906 45 .456501 44 .456095 43 .455690 42 .455285 41 0.442879 .442483 .442087 .441692 .441297 0.440903 59 0.454881 40 39 .454476 .454072 38 .453669 37 .453265 36 0.452862 35 .452460 34 .452057 33 .451655 32 .451253 31 .440509 .440115 .439721 .439327 0.438934 0.450851 30 .450450 29 .450049 28 .449648 27 .449248 26 0.448847 25 .448448 24 .448048 23 .447649 22 .447250 21 Tan. 0.446851 20 .446452 19 .446054 18 .445656 17 .445259 16 0.444861 15 .444464 14 .444067 13 .443671 12 .443275 11 10 9 8 7 6 LOTES ON TO 2 0 70° 597 20° 0123T LO CO 1 0σ 6 7 8 9 10 11 12 13 14 15 16 17 18 *1 222 223 19 21 24 25 26 27 28 29 20 9.540931 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 COSINES, TANGENTS, AND COTANGENTS Sin. 110° Corr. for Sec. 9.534052 .534399 * Corr. .534745 10 58 .535092 15 86 .535438 20 115 9.535783 30 173 .536129 40 230 .536474 45 259 .536818 50 288 .537163 9.537507 11 .537851 Corr. .538194 10 57 .538538 15 86 .538880 20 114 9.539223 30 171 .539565 40 228 .539907 45 257 .540249 50 285 .540590 .541272 Corr. .541613 10 57 ,541953 15 85 .542293 20 113 9.542632 30 170 .542971 40 226 .543310 45 255 .543649 50 283 .543987 " 9.544325 .544663 Corr. .545000 10 56 .545338 15 84 .545674 20 112 9.546011 30 168 .546347 40 224 .546683 45 252 .547019 50 280 .547354 Corr. 9.547689 .548024 ,548359 10 56 .548693 15 83 .549027 20 111 9.549360 30 167 .549693 40 222 .550026 45 250 .550359 50 278 .550692 9.551024 .551356 1 Corr. .551687 10 55 .552018 15 83 .552349 20 110 9.552680 30 165 .553010 40 220 57 .553341 45 248 58 .553670 50 275 59 .554000 60 9.554329 Cos. Г Cos. 9.972986 .972940 .972894 .972848 .972802 9.972755 .972709 .972663 .972617 .972570 9.972058 .972011 .971964 .971917 .971870 9.971823 .971776 .971729 .971682 .971635 1 9.972524 .972478 Corr. .972431 10 8 .972385 15 12 .972338 20 16 9.972291 30 23 .972245 40 31 .972198 45 35 .972151 50 39 .972105 9.971588 .971540 .971493 .971446 .971398 9.971351 .971303 .971256 .971208 .971161 9.970635 .970586 .970538 9.971113 .971066 Corr. .971018 10 8 .970970 15 12 .970922 20 16 9.970874 30 24 .970827 40 32 .970779 45 36 .970731 50 40 .970683 .970490 .970442 9.970394 .970345 .970297 .970249 .970200 9.970152 Sin. Corr. for Sec. n Tan. R 9.561066 .561459 Corr. .561851 10 65 .562244 15 98 .562636 20 131 9.563028 30 196 .563419 40 261 .563811 45 294 .564202 50 326 .564593 9.564983 .565373 Corr. .565763 10 65 .566153 15 97 .566542 20 130 9.566932 30 194 .567320 40 259 .567709 45 292 .568098 50 324 .568486 9.568873 .569261 Corr. .569648 10 64 .570035 15 97 570422 20 129 9.570809 30 193 .571195 40 258 17 .571581 45 290 .571967 50 322 .572352 W Corr. for Sec. 11 9.572738 .573123 Corr. .573507 10 64 .573892 15 96 320 n .574276 20 128 9.574660 30 192 .575044 40 256 .575427 45 288 50 .575810 .576193 9.576576 .576959 Corr. .577341 10 64 .577723 15 95 .578104 20 127 9.578486 30 191 .578867 40 254 .579248 45 286 .579629 50 318 .580009 9.580389 .580769 Corr. .581149 10 63 .581528 15 95 .581907 20 126 9.582286 30 189 .582665 40 252 .583044 45 284 50 316 .583422 .583800 9.584177 Cot. " Cot. 56 55 0.438934 60 .438541 59 .438149 58 .437756 57 .437364 0.436972 .436581 54 .430189 53 .435798 52 .435407 51 0.435017 50 .434627 49 .434237 48 .433847 47 .433458 46 0.433068 45 44 .432680 .432291 43 .431902 42 .431514 41 40 0.431127 39 .430739 .430352 38 .429965 37 .429578 36 0.429191 .428805 35 34 .428419 33 .428033 .427648 159° 0.419611 .419231 .418851 .418472 .418093 0.417714 .417335 .416956 .416578 .416200 0.415823 Tan. 32 0.427262 .426877 .426493 .426108 .425724 0.425340 25 21 20 .424956 24 .424573 23 .424190 .423807 0.423424 .423041 19 .422659 18 .422277 17 .421896 16 0.421514 15 .421133 14 .420752 13 .420371 12 .419991 11 27 82*7****22 31 30 29 26 10 98765 TE 2 HO 0 69° 598 21° 0123456789 222****7*2 10 9.557606 11 12 13 14 15 16 17 18 19 20 21 23 24 25 26 28 29 30 31 32 33 34 35 36 37 588 GILRINGE** 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 Sin. 111° 9.554329 .554658 Corr. .554987 10 55 .555315 15 82 .555643 20 109 9.555971 30 164 .556299 40 218 .556626 45 246 .556953 50 273 .557280 TABLE XXII.-LOGARITHMIC SINES, .557932 A Corr. .558258 10 54 .558583 15 81 .558909 20 108 9.559234 30 162 ,559558 40 217 .559883 45 244 .560207 50 271 .560531 9.560855 Corr. .561178 n .561501 10 54 .561824 15 80 .562146 20 107 9.562468 30 161 .562790 40 215 .563112 45 242 .563433 50 268 .563755 9.570435 .570751 Corr. for Sec. ה 9.564075 .564396 Corr. .564716 10 53 .565036 15 80 .565356 20 106 9.565676 30 160 .565995 40 213 .566314 45 240 .566632 50 266 .566951 .57 1066 .571380 .571695 9.57 2009 .572323 .572636 .572950 .573263 9.573575 Cos. 9.567269 Corr. .567587 .567904 10 53 .568222 15 79 .568539 20 106 9.568856 30 158 .569172 40 211 .569488 45 237 .569804 50 264 .570120 11 T " Corr. 10 52 15 78 20 105 30 157 40 209 45 235 50 262 Cos. 9.970152 .970103 .970055 .970006 .969957 9.969909 .969860 .969811 .969762 .969714 Corr. 8 9.969665 .969616 .969567 10 .969518 15 12 .969469 20 16 9.969420 30 25 .969370 40 33 .969321 45 37 .969272 50 41 .969223 9.969173 .969124 .969075 .969025 .968976 9.968926 .968877 .968827 .968777 .968728 9.968678 .968628 .968578 .968528 .968479 9.968429 .968379 .968329 .968278 .968228 Corr. 8 10 9.968178 .968128 .968078 .968027 15 13 .967977 20 17 9.967927 30 .967876 40 34 .967826 45 38 .967775 .967725 25 9.967674 .967624 .967573 .967522 .967471 9.967421 .967370 .967319 .967268 .967217 9.967166 Sin. Corr. for Sec. n 55555 50 42 Tan. 9.584177 .584555 Corr. .584932 10 63 .585309 15 94 .585686 20 125 9.586062 30 188 .586439 40 251 .586815 45 282 .587190 50 314 .587566 9.587941 .588316 Corr. .588691 10 62 .589066 15 94 .589440 20 125 9.589814 30 187 .590188 40 249 .590562 45 280 .590935 50 312 .591308 9.591681 n H P .592054 Corr. .592426 10 62 .592799 15 93 .593171 20 124 9.593542 30 186 .593914 40 248 .594285 45 279 .594656 50 310 .595027 " Corr. for Sec. 9.595398 .595768 Corr. .596138 10 62 .596508 15 92 .596878 20 123 9.597247 30 185 .597616 40 246 .597985 45 277 .598354 50 308 .598722 9.599091 .599459 Corr. .599827 10 61 .600194 15 92 .600562 20 122 9.600929 30 184 .601296 40 245 .601663 45 275 .602029 50 306 .602395 9.602761 .603127 Corr. .603493 10 61 .603858 15 91 .604223 20 122 9.604588 30 182 .604953 40 243 .605317 45 274 .605682 50 304 .606046 9.606410 Cot. W 1 Cot. 0.415823 60 .415445 59 .415068 58 .414691 57 .414314 56 0.413938 55 .413561 54 .413185 53 .412810 52 .412434 51 0.412059 50 .411684 49 .411309 48 .410934 47 .410560 46 0.410186 45 .409812 44 .409438 43 .409065 42 .408692 41 0.408319 40 .407946 39 .407574 38 .407201 37 .406829 36 0.406458 35 .406086 34 .405715 33 .405344 32 .404973 31 28 0.404602 30 .404232 29 .403862 .403492 .403122 0.402753 27 26 25 .402384 24 .402015 23 .401646 .401278 21 0.400909 20 .400541 19 .400173 18 .399806 17 .399438 16 0.399071 15 .398704 14 .398337 13 .397971 12 .397605 11 0.397239 .396873 .396507 158° .395777 0.395412 .395047 .394683 10 9 8 .396142 7 .394318 .393954 0.393590 Tan. ********22 CLO 4~10 6 68° 599 22° 0123 NË LA CO Z-89 6 7 10 11 12 13 14 15 16 17 18 19 272******* 23 24 25 26 20 9.579777 21 28 29 30 31 32 33 34 35 36 37 38 382=234 39 40 41 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 112° COSINES, Tangents, AND COTANGENTS Sin. 9.573575 .573888 Corr. .574200 10 52 .574512 15 78 .574824 20 104 9.575136 30 156 .575447 40 208 .575758 45 234 .576069 50 259 .576379 " 9.576689 .576999 Corr. .577309 10 51 .577618 15 77 .577927 20 103 9.578236 30 154 .578545 40 206 .578853 45 232 .579162 50 257 .579470 " Corr. for Sec. .580085 11 Corr. .580392 10 51 .580699 15 77 .581005 20 102 9.581312 30 153 .581618 40 204 .581924 45 230 .582229 50 255 ,582535 9.582840 .583145 1 Corr. .5834-49 10 51 .583754 15 76 .584058 20 101 9.584361 30 152 .584665 40 202 .584968 45 228 .585272 50 253 .585574 .591580 9.591878 Cos. 9.585877 .586179 Corr. .586482 10 50 .586783 15 75 .587085 20 100 9.587386 30 151 .587688 40 201 .587989 45 226 .588289 50 251 .588590 1 9.588890 .589190 Corr. .589489 10 30 .589789 15 75 .5900$8 20 100 9.590387 30 149 .590686 40 199 .590984 45 224 .591282 50 249 17 Cos. 9.967166 .967115 .967064 .967013 .966961 9.966910 .966859 .966808 .966756 .966705 9.966136 .966085 .966033 10 Corr. 9.966653 .966602 .966550 10 9 .966499 15 13 .966447 20 17 9.966395 30 26 .966344 40 34 .966292 45 39 .966240 50 43 .966188 .965981 .965929 9.965876 .965824 .965772 .965720 .965668 9.965615 .965563 .965511 .965458 .965406 9.965353 .965301 .965248 .965195 .965143 9.964560 .964507 .964454 Corr. 9 9.965090 .965037 .964984 10 .964931 15 13 .964879 20 18 9.964826 30 26 .964773 40 35 .964720 45 40 .964666 50 44 .964613 .964400 .964347 9.964294 .964240 .964187 .964133 964080 9.964026 Sin. Corr. for Sec. " Tan. 9.606410 .606773 Corr. .607137 10 60 .607500 15 91 .607863 20 121 9.608225 30 181 .608588 40 242 .608950 45 272 .609312 50 302 .609674 9.610036 .610397 Corr. .610759 10 60 .611120 15 90 .611480 20 120 9.611841 30 180 .612201 40 240 .612561 45 270 .612921 50 300 .613281 9.613641 .614000 Corr. .614359 10 60 .614718 15 90 .615077 20 119 9.615435 30 179 .615793 40 239 .616151 45 269 .616509 50 299 .616867 買 ​M 11 Cot. 9.617224 .617582 Corr. .617939 10 59 .618295 15 89 .618652 20 119 9.619008 30 178 .619364 40 238 .619720 45 267 .620076 50 297 .620432 9.620787 .621142 Corr. .621497 10 59 .621852 15 89 .622207 20 118 177 236 9.622561 30 .622915 40 .623269 45 266 295 .623623 50 .623976 11 Corr. for Sec. 1 55555 9.624330 .624683 Corr. .625036 10 59 .625388 15 88 .625741 20 117 n 9.626093 30 176 .626445 40 235 .626797 45 264 .627149 50 293 .627501 9.627852 Cot. 0.393590 60 .393227 59 .392863 58 .392500 57 .392137 56 0.391775 55 .391412 54 .391050 53 .390688 52 .390326 51 0.389964 50 .389603 49 .389241 48 .388880 47 .388520 46 0.388159 45 .387799 44 .387439 43 .387079 42 .386719 41 0.386359 40 .386000 39 .385641 38 .385282 37 .384923 36 0.384565 .384207 35 34 .383849 33 .383491 32 .383133 31 0.382776 30 .382418 29 .382061 28 .381705 27 .381348 26 0.380992 25 .380636 24 .380280 23 .379924 22 .379568 21 0.379213 20 .378858 19 .378503 18 .378148 17 .377793 16 0.377439 15 .377085 14 .376731 13 .376377 12 .376024 11 0.375670 .375317 .374964 .374612 .374259 157° 0.373907 .373555 .373203 .372851 .372499 0.372148 Tan. 896 10 7 6 4321O 67° 600 23° CH234LOLO 0 1 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 8838 28 29 30 31 32 33 34 35 36 37 BBGELRE 38 39 41 42 43 44 45 46 47 48 49 50 51 52 40 9.603594 53 54 55 56 57 58 59 60 Sin. 113° TABLE XXII.-LOGARITHMIC SINES, 9.591878 .592176 n Corr. ,592473 10 49 .592770 15 74 .593067 20 99 9.593363 30 148 .593659 40 198 .593955 45 222 .594251 50 247 .594547 9.594842 Corr. .595137 .595432 10 49 .595727 15 74 .596021 20 98 9.596315 30 147 .596609 40 196 .596903 45 221 .597196 50 245 .597490 Corr. for Sec. n 9.597783 Corr. .598075 .598368 10 49 .598660 15 73 n .598952 20 97 9.599244 30 146 .599536 40 194 .599827 45 219 .600118 50 243 .600409 9.600700 .600990 Corr. .601280 10 48 .601570 15 72 .601860 20 96 9.602150 30 145 .602439 40 193 .602728 45 217 50 .603017 241 .603305 = .603882 Corr. .604170 10 48 .604457 15 72 .604745 20 96 9.605032 30 144 .605319 40 191 .605606 45 215 .605892 50 239 .606179 1 9.606465 .606751 Corr. .607036 10 47 .607322 15 71 .607607 20 95 9.607892 30 142 .608177 40 190 .608461 45 214 .608745 50 237 .609029 9.609313 Cos. Cos. 9.964026 .963972 .963919 .963865 .963811 9.963757 ..963704 .963650 .963596 .963542 и 9.963488 .963434 .963379 10 .963325 15 Corr. 9 14 .963271 20 18 9.963217 30 27 .963163 40 36 .963108 45 41 .963054 50 45 .962999 9.962945 .962890 .962836 .962781 .962727 9.962672 .962617 .962562 .962508 .962453 9.962398 .962343 .962288 .962233 .962178 9.962123 .962067 .962012 .961957 .961902 9.961846 .961791 .961735 10 Corr. 9 .961680 15 14 .961624 20 19 9.961569 30 28 .961513 40 37 .961458 45 42 .961402 50 46 ,961346 9.961290 .961235 .961179 .961123 .961067 9.961011 .960955 .960899 .960843 .960786 9.960730 Corr. for Sec. Sin. Я Tan. 9.627852 .628203 Corr. .628554 10 58 .628905 15 88 .629255 20 117 9.629606 30 175 .629956 40 234 .630306 45 263 .630656 50 292 .631005 9.631355 .631704 Corr. .632053 10 58 .632402 15 87 .632750 20 116 9.633099 30 174 .633447 40 232 .633795 45 261 .634143 50 290 .634490 9.634838 .635185 Corr. .635532 10 58 .635879 15 87 .636226 20 115 9.636572 30 173 .636919 40 231 .637265 45 260 .637611 50 289 .637956 . Corr. for Sec. n E 9.638302 50 287 .638647 Corr. .638992 10 57 .639337 15 86 .639682 20 115 9.640027 30 172 .640371 40 230 .640716 45 258 .641060 .641404 9.641747 .642091 Corr. .642434 10 57 .6412777 15 86 .643120 20 114 9.643463 30 171 .643806 40 228 .644148 45 257 .644490 50 286 .644832 ה 1 9.645174 .645516 Corr. .645857 10 57 .646199 15 85 .646540 20 114 9.646881 30 170 .647222 40 227 .647562 45 256 .647903 50 284 .648243 9.648583 Cot. n • Cot. 156° 0.372148 .371797 .371446 58 .371095 57 .370745 56 0.370394 55 .370044 54 .369694 53 .369344 52 .368995 51 60 59 Tan. ****** 41 0.368645 50 .368296 49 .367947 48 .367598 47 .367250 46 0.366901 45 .366553 44 .366205 43 .365857 42 .365510 0.365162 40 .364815 39 .364468 38 .364121 37 .363774 36 0.363428 35 .363081 34 .362735 33 .362389 32 .362044 31 30 0.361698 .361353 29 .361008 28 .360663 27 .360318 26 0.359973 25 .359629 24 .359284 23 .358940 .358596 1222 0.358253 20 .357909 19 .357566 18 .357223 17 .356880 16 0.356537 15 .356194 14 .355852 13 .355510 12 .355168 11 0.354826 .354484 .354143 .353801 .353460 0.353119 .352778 .352438 .352097 .351757 0.351417 10 9 876543210 66° 601 24° 0123AL CZ Ca 7 HANN 8 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 114° COSINES, TANGENTS, AND COTANGENTS Sin. 9.609313 .609597 Corr. .609880 10 47 .610164 15 71 .610447 20 94 9.610729 30 141 .611012 40 188 .611294 45 212 50 236 .611576 .611858 Corr. for Sec. .616060 9.61633S .616616 9.612140 .612421 .612702 .612983 Corr. 10 47 15 70 .613264 20 93 30 9.613545 140 .613825 40 187 .614105 .614385 45 210 50 234 .614665 9.614944 .615223 Corr. .615502 10 46 .615781 15 70 93 20 30 139 40 186 45 209 50 232 .616894 .617172 .617450 H A 11 9.617727 .618004 Corr. .618281 10 46 .618558 15 69 .618834 20 92 9.619110 30 138 .619386 40 184 .619662 45 207 .619938 50 230 .620213 11 9.620488 .620763 Corr. .621038 10 46 .621313 15 69 .621587 20 91 9.621861 30 137 .622135 40 183 .622409 45 206 .622682 50 228 .622956 R 9.623229 .623502 Corr. .623774 10 45 .624047 15 68 M .624319 20 91 9.624591 30 136 .624863 40 181 .625135 45 204 .625406 50 227 .625677 9.625948 Cos. Cos. 9.960730 .960674 .960618 .960561 .960505 9.960448 .960392 .960335 .960279 .960222 9.959310 .959253 .959195 .959138 .959080 Corr. 9.960165 .960109 .960052 10 9 .95999515 14 .959938 20 19 9.959882 30 28 .959825 40 38 .959768 .959711 .959654 45 43 47 9.959596 .959539 .959482 .959425 .959368 9.959023 .958965 .958908 .958850 .958792 9.958734 .958677 .958619 .958561 .958503 9.957863 .957804 .957746 .957687 .957628 9.957570 .957511 .957452 .957393 .957335 9.957276 Sin. Corr. for Sec. 1 55595 9.958445 .958387 Corr. .958329 10 10 ,958271 15 15 .958213 20 19 9.958154 30 29 .958096 40 39 45 44 .958038 .957979 50 49 .957921 50 H Tan. 9.648583 .648923 Corr. .649263 10 56 .649602 15 85 .649942 20 113 9.650281 30 170 .650620 40 226 45 254 .650959 50 .651297 283 .651636 9.651974 .652312 Corr. .652650 10 56 .652988 15 84 .653326 20 112 30 9.653663 169 40 .654000 .654337 .654674 225 253 45 50 281 .655011 " 9.655348 .655684 Corr. .656020 10 56 15 .656356 84 112 .656692 20 9.657028 .657364 .657699 .658034 .658369 Corr. for Sec. Cot. 30 40 45 50 11 W 168 224 252 280 .667682 45 248 .668013 50 275 .668343 9.668673 Cot. 9.658704 . .659039 Corr. .659373 10 56 .659708 15 83 .660042 20 111 9.660376 30 167 .660710 40 223 .661043 45 250 .661377 50 278 .661710 9.662043 .662376 Corr. .662709 10 55 .663042 15 83 .663375 20 111 9.663707 30 166 .664039 40 222 45 .664371 249 .664703 50 277 .665035 9.665366 0.334634 .665698 Corr. .334302 .666029 10 55 .666360 15 83 .666691 20 110 9.667021 30 165 .667352 40 220 0.351417 60 .351077 59 .350737 58 .350398 57 .350058 56 0.349719 55 .349380 54 .349041 53 .348703 52 .348364 51 0.348026 50 .317688 49 347350 48 .347012 47 46 .346674 0.346337 45 .346000 44 .345663 43 42 41 ..345326 .344989 40 0.344652 39 .344316 38 .343980 .343644 37 .343308 0.342972 36 35 34 .342636 .342301 33 .341966 32 .341631 31 155° 0.341296 .340961 .340627 .340292 .339958 0.339624 26 25 .339290 24 .338957 23 .338623 .338290 .333971 .333640 .333309 0.332979 .332648 .332318 .331987 ,331657 0.331327 30 29 28 2227****** Tan. 21 0.337957 20 .337624 19 .337291 18 .336958 17 .336625 16 0.336293 15 .335961 14 .335629 13 .335297 12 .334965 11 10 9 8 6 5 L&&&1 - 4 3 2 0 65° 602 25° 0123HLO 6 7 ∞- 4 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 115° Sin. TABLE XXII.-LOGARITHMIC SINES, 9.625948 .626219 Corr. .626490 10 45 .626760 15 67 .627030 | 20 90 9.627300 30 135 .627570 40 180 .627840 45 202 .628109 50 225 .628378 9.628647 .628916 1 Corr. .629185 10 45 .629453 15 67 .629721 20 89 9.629989 30 134 .630257 40 179 .630524 45 201 .630792 50 223 .631059 9.633984 9.631326 .631593 Corr. .631859 10 44 .632125 15 66 .632392 20 89 9.632658 30 133 .632923 40 177 .633189 45 199 .633454 50 221 .633719 Corr. for Sec. A E .634249 .634514 10 Corr. 44 .634778 15 66 .635012 20 88 9.635306 30 132 .635570 40 176 .635834 45 198 .636097 50 220 .636360 11 9.636623 .636886 " Corr. .637148 10 44 .637411 15 65 .637673 20 87 9.637935 30 131 .638197 40 175 .638458 45 196 .638720 50 218 .638981 9.639242 .639503 M Corr. .639764 10 43 .640024 15 65 .640284 20 87 9.640544 30 130 .640804 40 173 .641064 45 195 .641324 50 217 .641583 9.641842 Cos. Cos. 9.957276 .957217 .957158 .957099 .957040 9.956981 .956921 .956862 .956803 .956744 " 9.956684 .956625 Corr. .956566 10 10 .956506 15 15 .956447 20 20 9.956387 30 30 .956327 40 40 .956268 45 45 .956208 50 50 .956148 9.956089 .956029 .955969 .955909 .955849 9.955789 .955729 .955669 .955609 .955518 9.955488 .955428 .955368 .955307 .955247 9.955186 .955126 .955065 .955005 .954944 Corr. for Sec. 9.954274 .954213 .954152 .954090 .954029 9.953968 W 9.954883 .954823 .954762 | To .954701 Corr. 10 15 15 .954640 20 20 9.954579 30 30 .954518 40 41 .954457 45 46 .954396 50 51 .954335 .953906 .953845 .953783 .953722 9.953660 Sin. ! Tan. 9.668673 .669002 Corr. .669332 10 55 .669661 15 82 .669991 20 110 9.670320 30 164 .670649 40 219 .670977 45 246 .671306 50 274 .671635 H .677194 .677520 .677846 .678171 9.671963 .672291 .672619 .672947 .673274 9.673602 .673929 Corr. .674257 10 54 .674584 15 82 .674911 20 109 9.675237 .675564 .675890 .676217 .676543 9.676869 " GABO NE Corr. for Sec. 30 163 40 218 45 245 50 272 9.678496 .678821 Corr. .679146 10 54 .679471 15 81 .679795 20 108 9.680120 30 162 .680144 40 216 .680768 45 243 .681092 50 270 .681416 Π 9.681740 .682063 .682387 .682710 .683033 9.683356 .683679 Corr. .684001 10 54 .684324 15 80 .684646 20 9.684968 .685290 .685612 .685934 .686255 107 9.686577 .686898 .687219 .687540 .687861 9.688182 Cot, 1 30 161 40 214 45 241 50 268 Cot. 154° 0.331327 60 .330998 59 .330668 58 .330339 57 .330009 56 0.329680 55 .329351 54 .329023 53 .328694 52 .328365 51 0.328037 50 .327709 49 .327381 48 .327053 47 .326726 46 0.326398 45 .326071 44 .325743 43 .325416 42 .325089 41 0.324763 40 .324436 39 .324110 38 .323783 37 .323457 36 0.323131 35 .322806 34 .322480 33 .322154 32 .321829 31 0.321504 30 .321179 29 .320854 28 .320529 27 .320205 26 0.319880 25 .319556 24 .319232 23 .318908 22 .318584 21 0.318260 20 .317937 19 .317613 18 .317290 17 .316967 16 0.316644 15 .316321 14 .315999 13 .315676 12 .315354 0.315032 .314710 .314388 .314066 .313745 0.313423 .313102 11 10 9 8 .312781 .312460 .312139 0.311818 Tan. 6 4432-0 1 64° 603 26° 01234 LE LO DI COσ 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 **2*70** 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 116° COSINES, TANGENTS, AND COTANGENTS Sin. 9.641842 Corr. for Sec. 10 .642101 . Corr. .642360 43 .642618 15 65 .642877 20 86 9.643135 30 129 .643393 40 172 .643650 45 194 .643908 50 215 .644165 9.644423 .644680 " Corr. .644936 10 43 .645193 15 64 .645450 20 85 9.645706 30 128 .645962 40 171 .646218 45 192 .616474 50 213 .646729 9.646984 .647240 Corr. .647494 10 42 .647749 15 64 .618001 20 85 9.648258 30 127 .648512 40 170 .648766 45 191 .649020 50 212 .649274 W 9.649527 .649781 Corr. .650034 10 42 .650287 15 63 .650539 20 84 9.650792 30 126 .651044 40 168 .651297 45 189 .651519 50 210 .651800 9.654558 .654808 .655058 . 9.652052 .652304 1 Corr. .652555 10 42 .652806 '15 63 .653057 20 84 9.653308 30 125 40 .653558 167 .653808 45 188 .651059 50 209 .654309 1 Corr. 10 41 .655307 15 62 .655556 20 83 9.655805 30 124 .656054 40 166 .656302 45 187 .656551 50 207 .656799 9.657017 Cos. Cos. 9.953660 .953599 .953537 .953475 .953413 9.953352 .953290 .953228 .953166 .953104 9.952419 .952356 .952294 .952231 .952168 9.952106 9.953042 .952980 Corr.. .952918 10 10 .952855 15 16 .952793 20 21 9,952731 30 31 40 .952669 42 .952606 45 47 .952544 50 52 .952481 .952043 .951980 .951917 .951854 9.951791 .951728 .951665 .951602 .951539 9.951476 .951412 .951349 .951286 .951222 9.950522 .950458 .950394 .950330 .950266 9.950202 .950138 .950074 .950010 .949945 9.949881 Sin. Corr. for Sec. 9.951159 .951096 Corr. .951032 10 11 .950968 15 16 .950905 20 21 9.950841 30 32 .950778 40 42 .950714 45 48 .950650 50 53 .950586 H Tan. 9.688182 .688502 Corr. .688823 10 53 .689143 15 80 .689463 20 106 9.689783 30 160 .690103 40 213 .690423 45 240 .690742 50 266 .691062 .696470 .696787 9.691381 .691700 .692019 .692338 .692656 9.692975 .693293 Corr. .693612 10 53 .693930 15 79 .694248 20 106 9.694566 .694883 .695201 45 .695518 50 264 .695836 30 159 40 212 238 9.696153 .697103 .697420 Corr. for Sec. R # 9.697736 .698053 " Corr. .698369 10 53 .698685 15 79 .699001 20 105 9.699316 30 158 .699632 40 210 .699947 45 236 .700263 50 263 .700578 A 9.700893 .701208 .701523 .701837 .702152 9.702466 .702781 Corr. .703095 10 52 .703409 15 78 .703722 20 104 9.70-1036 .704350 .704663 45 .704976 50 .705290 30 157 40 209 235 261 9.705603 .705916 .706228 .706541 706854 9.707166 Cot. Cot. 153° 0.311818 60 .311498 59 .311177 58 .310857 57 .310537 56 0.310217 55 .309897 54 .309577 53 .309258 52 .308938 51 0.308619 50 .308300 49 .307981 48 .307662 47 .307344 46 0.307025 45 .306707 44 .306388 43 .306070 42 .305752 41 0.305434 40 39 .305117 .304799 .304482 38 37 .304164 36 0.303847 35 .303530 34 .303213 33 .302897 32 .302580 31 Tan. 30 0.302264 .301947 29 .301631 28 .301315 27 .300999 0.300684 ********22 26 25 .300368 24 .300053 23 .299737 .299422 21 0.299107 20 19 .298792 .298477 18 .298163 17 .297848 16 0.297534 15 .297219 14 .296905 13 .296591 12 .296278 11 0.295964 10 .295650 9 8 .295337 .295024 .294710 0.294397 .294084 7 .293772 .293459 .293146 0.292834 654321O 0 63° 604 27° 01234 6789 5 10 11 12 13 14 15 16 17 18 19 222222 23 24 25 26 27 28 29 30 31 32 33 20 9.661970 21 34 35 36 37 38 39 2223 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 Sin. 117° TABLE XXII.-LOGARITHMIC SINES, 9.657047 .657295 Corr. .657542 10 41 .657790 15 62 .658037 20 82 9.658284 30 123 .658531 40 164 .658778 45 185 .659025 50 205 .659271 9.659517 .659763 .660009 .660255 .660501 9.660746 .660991 .661236 10 .662214 .662459 .662703 .662946 9.663190 " .663433 .663677 .663920 .664163 Corr. for Sec. R .661481 15 .661726 20 81 .671134 .671372 9.671609 Cos. Corr. 41 61 ៨៩៨ 122 30 40 163 45 183 50 203 9.664406 .664648 . Corr. .664891 10 40 .665133 '15 60 .665375 20 80 9.665617 30 121 .665859 40 161 .666100 45 181 .666342 50 201 .666583 9.666824 .667065 .667305 .667546 .667786 9.668027 .66$267 Corr. .668506 10 40 .668746 15 60 .668986 20 80 " 9.669225 30 119 .669464 .669703 40 159 45 179 .669942 50 199 .670181 9.670419 .670658 .670896 Cos. 9.949881 .949816 .949752 .949688 .949623 9.949558 .949494 .949429 .949364 .949300 9.949235 .949170 Corr. .949105 10 11 .949040 15 16 .948975 20 22 9.948910 30 33 .948845 40 43 45 49 ,948780 .948715 50 54 .948650 9.948584 .948519 .948454 .948388 .948323 9.948257 .948192 .948126 .948060 .947995 9.947929 .947863 .947797 .947731 .947665 9.947600 .947533 .947467 .947401 .947335 9.946604 .946538 .946471 .946404 .946337 9.946270 .946203 .946136 W 9.947269 .947203 Corr. .947136 10 11 .947070 15 17 .947004 20 22 9.946937 30 33 40 .946871 44 .946804 45 50 .946738 50 55 .946671 .916069 .946002 9.945935 Sin. Corr. for Sec. 曾 ​Tan. 9.707166 .707478 "Corr. .707790 10 52 .708102 15 78 .708414 20 104 9.708726 30 156 .709037 40 207 .709349 45 233 .70966050 259 .709971 9.710282 .710593 .710904 .711215 .711525 15 77 9.711836 .712146 Corr. .712456 10 51 712766 .713076 20 103 9.713386 30 155 .713696 40 206 .714005 45 232 .714314 50 258 .714624 9.714933 .715242 .715551 .715860 .716168 Corr. for Sec. 9.716477 716785 Corr. .717093 10 51 .717401 15 77 .717709 20 102 9.718017 30 154 .718325 40 205 .718633 45 231 .718940 50 256 .719248 9.719555 .719862 .720169 .720476 .720783 9.721089 .721396 Corr. .721702 10 51 .722009 15 76 .722315 20 102 9.722621 .722927 .723232 .723538 .723844 9.724149 .724454 .724760 .725065 .725370 9.725674 Cot. n 30 153 40 204 45 229 50 255 Cot. 152° 60 53 0.292834 .292522 59 .292210 58 .291898 57 .291586 56 0.291274 55 .290963 54 .290651 .290340 52 .290029 51 0.289718 50 289407 49 .289096 48 .288785 47 .288475 46 0.288164 45 .287854 44 .287544 43 42 .287234 .286924 41 40 0.286614 39 .286304 .285995 .285686 38 37 .285376 36 0.285067 35 ,284758 34 .284449 33 .284140 32 .283832 31 0.283523 30 .283215 29 .282907 28 .282599 27 .282291 26 0.281983 25 .281675 24 .281367 23 .281060 22 .280752 21 0.280445 20 .280138 19 .279831 18 .279524 17 .279217 16 0.278911 15 .278604 14 .278298 13 .277991 12 .277685 11 0.277379 .277073 .276768 .276462 .276156 0.275851 .275546 ,275240 .274935 ,274630 0.274326 Tan. 10 9 8 7 654321O 0 62° 605 28° 100 g 100 yol yand 0123456780-6 9 10 11 12 13 14 15 16 17 18 19 FAA 2~~~2227 20 21 23 24 25 26 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 118° COSINES, TANGENTS, AND COTANGENTS Sin. . 9.671609 .671847 Corr. .672084 10 39 .672321 15 59 .672558 20 79 9.672795 30 118 .673032 40 158 .673268 45 177 .673505 50 197 .673741 9.673977 .674213 .674448 .674684 .674919 9.675155 .675390 # Corr. .675624 10 39 .675859 .676094 9.676328 15 58 78 .676562 .676796 .677030 .677264 9.677498 .677731 .677964 .678197 .678430 9.680982 .681213 .681443 .681674 .681905 9.682135 Corr. for Sec. CAAU NEd 20 Cos. 9.678663 .678895 17 Corr. .679128 10 39 .679360 15 58 .679592 20 77 9.679824 30 116 .680056 40 154 .680288 45 174 .680519 50 193 .680750 2888888 30 117 40 156 45 175 50 195 " .682365 Corr. .682595 10 38 .682825 15 57 .683055 20 76 9.683284 30 115 .683514 40 153 .683743 45 172 .683972 50 191 .684201 9.684430 .684658 .684887 .685115 .685343 9.685571 Cos. 9.945935 .945868 .945800 .945733 .945666 9.945598 .945531 .945464 9.944582 .944514 944446 .944377 .944309 9.944241 .944172 .944104 .944036 .943967 .945396 .945328 9,945261 .945193 Corr. .945125 10 11 .945058 15 17 .944990 20 23 9.944922 30 34 40 .944854 45 .944786 45 51 .944718 50 57 .944650 9.943899 .943830 .943761 .943693 .943624 9.943555 .943486 .943417 .943348 .943279 9.942517 .942448 .942378 .942308 .942239 9.942169 .942099 .942029 .941959 .941889 9.941819 Corr. for Sec. Sin. " Tan. 9.725674 .725979 Corr. .726284 10 51 .726588 15 76 .726892 20 101 9.727197 30 152 .727501 40 203 .727805 45 228 .728100 50 253 .728412 .733558 .733860 .734162 .734463 9.728716 .729020 .729323 .729626 .729929 9.730233 .730535 Corr. .730838 10 50 .731141 15 76 .731444 20 101 9.731746 .732048 .732351 .732653 .732955 9.733257 Corr. for Sec. 9.737771 .738071 .738371 · 9.943210 .943141 R Corr. .943072 10 12 .943003 15 17 .942934 20 23 9.942864 30 35 .942795 40 46 Corr. .942726 45 52 .739870 10 50 .942656 50 58 .942587 .740169 15 75 .740468 20 100 9.740767 30 149 40 199 .741066 .741365 45 224 .741664 50 249 .741962 .738671 .738971 9.739271 *.739570 9.742261 .742559 .742858 .743156 .743454 9.743752 Cot. Ħ 9.734764 .735066 " Corr. .735367 10 50 .735668 15 75 .735969 20 100 9.736269 30 150 .736570 40 200 .736870 45 225 .737171 50 250 .737471 GRAW NE 30 151 40 201 45 227 50 252 C GAAO NHI Cot. 151° 0.274326 60 .274021 59 .273716 58 .273412 57 .273108 56 0.272803 55 .272499 54 .272195 53 .271891 52 .271588 51 0.271284 39 50 .270980 49 .270677 48 .270374 47 .270071 46 0.269767 45 .269465 44 .269162 43 .268859 42 .268556 41 0.268254 40 .267952 .267649 38 .267347 37 .267045 36 0.266743 35 .266442 34 .266140 33 .265838 32 .265537 31 0.265236 30 .264934 29 .264633 28 .264332 27 .264031 26 0.263731 25 .263430 24 .263130 23 .262829 22 .262529 21 0.262229 20 .261929 19 .261629 18 .261329 17 .261029 16 0.260729 15 .260430 14 .260130 13 .259831 12 .259532 11 0.259233 .258934 .258635 .258336 .258038 0.257739 .257441 .257142 .256844 .256546 0.256248 Tan. 10 9 876543210 61° 606 29° 01234L ON ∞a o gye 8 9 10 11 12 9.687843 .688069 .688295 .688521 .688747 9.688972 .689198 R Corr. .689423 10 37 .689648 15 56 .689873 20 9.690098 20 75 21 13 14 15 16 17 18 19 272 ******* *-*** 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 **2 www 40 41 42 43 44 45 46 47 48 49 588888888 Sin. 59 60 119° TABLE XXII.-LOGARITHMIC SINES, 9.685571 .685799 ก Corr. .686027 10 38 .686254 15 57 .686482 20 76 9.686709 30 113 .686936 40 151 .687163 45 170 .687389 50 189 .687616 .690323 .690548 .690772 .690996 9.691220 .691444 .691668 .691892 .692115 Corr. for Sec. CABO NI .698751 9.698970 Cos. 30 112 40 150 45 168 50 187 9.692339 .692562 Corr. .692785 10 37 .693008 15 56 .693231 20 74 9.693453 30 111 .693676 40 148 .693898 45 167 .694120 50 185 .694342 50 51 9.696775 30 110 .696995 40 147 .697215 45 165 52 53 .697435 50 183 54 .697654 55 9.697874 .698094 56 57 .698313 .698532 1 9.694564 .694786 .695007 .695229 .695450 9.695671 .695892 Corr. .696113 10 37 .696334 15 55 .69655-1 20 73 ה Cos. 9.941819 .941749 ,941679 .941609 .941539 9.941469 .941398 .941328 .941258 .941187 9.941117 .941046 Corr. .940975 10 12 .940905 15 18 .940834 20 24 9.940763 30 35 .940693 40 47 .940622 45 53 .940551 50 59 .940480 9.940409 .940338 .940267 .940196 .940125 9.940054 .939982 .939911 .939840 .939768 9.939697 .939625 .939554 .939482 .939410 9.939339 .939267 .939195 .939123 .939052 9.938258 .938185 .938113 .938040 .937967 9.937895 .937822 .937749 Corr. for Sec. 9.938980 .938908 Corr. .938836 10 12 .938763 15 18 .938691 20 24 9.938619 30 36 40 .938547 48 .938475 .938402 .938330 .937676 .937604 9.937531 Sin. 1 45 50 54 60 Tan. 9.743752 .744050 Corr. .744348 10 49 .744645 15 74 .744943 20 99 9.745240 30 149 .745538 40 198 .745835 45 223 .746132 50 248 .746429 9.746726 .747023 .747319 .747616 .747913 9.748209 .748505 .748801 .749097 .749393 9.749689 .749985 .750281 .750576 .750872 9.751167 .751462 .751757 .752052 .752347 9.755585 .755878 .756172 # Corr. for Sec. Cot. Corr. 49 74 20 98 UAAC NEW 9.752642 .752937 11 Corr. .753231 10 49 .753526 15 74 .753820 20 98 9.754115 30 147 .754409 40 196 .754703 45 220 .754997 50 245 .755291 148 197 45 222 50 246 .756465 .756759 9.757052 .757345 Corr. .757638 10 49 .757931 15 73 .758224 20 97 9.758517 30 146 .758810 40 195 .759102 45 219 .759395 50 244 .759687 9.759979 .760272 .760564 .760856 .761148 9.761439 ย Cot. 0.256248 60 .255950 59 .255652 58 .255355 57 .255057 56 0.254760 55 .254462 54 .254165 53 .253868 52 .253571 51 150° 0.253274 50 .252977 49 .252681 48 .252384 47 .252087 46 0.251791 45 ,251495 44 .251199 43 .250903 42 .250607 41 0.250311 .250015 .249719 38 .249424 37 .249128 36 0.248833 35 .248538 34 .248243 33 .247948 32 .247653 31 0.247358 30 .247063 29 .246769 28 .246474 27 .246180 26 0.245885 25 .245591 24 .245297 23 .245003 .214709 21 0.244415 20 .244122 19 .243828 18 .243535 17 .243241 16 0.242948 15 .242655 14 .242362 13 .242069 12 .241776 11 0.241483 .241190 .240898 .240605 .240313 0.240021 .239728 .239436 239144 .238852 0.238561 Tan. 40 39 2222 10 9 8 7 6 DL43210 5 60° 607 30° SANG là con 9 0 1 2 6 8 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 10 9.701151 11 30 31 32 33 34 35 36 37 38 39 50 51 52 53 54 55 56 57 58 59 60 COSINES, TANGENTS, AND COTANGENTS Sin. 120° 9.698970 .699189 " Corr. .699407 10 36 .699626 15 54 .699844 20 73 9.700062 30 109 .700280 40 145 .700498 45 163 .700716 50 181 .700933 .701368 .701585 .701802 .702019 9.702236 40 9.707606 41 42 43 44 45 46 47 48 49 .702452 .702669 10 .702885 15 54 .703101 20 72 .704610 .704825 .705040 .705254 9.703317 30 108 .703533 40 144 .703749 45 162 .703964 50 180 .704179 9.704395 Corr. for Sec. " 9.705469 .705683 Corr. .705898 10 36 .706112 15 53 706326 20 71 9.706539 30 107 .706753 40 142 .706967 45 160 .707180 50 178 .707393 9.709730 709941 .710153 .710364 .710575 9.710786 .710997 .711208 711419 .711629 9.711839 Cos. 11 .707819 .708032 .708245 .708458 9.708670 .708882 .709094 .709306 .709518 20 11 10 Corr. 35 15 53 70 1948 8948 Cos. .936357 Corr. .936284 36 30 106 40 141 45 158 50 176 9.937531 .937458 .937385 .937312 .937238 9.937165 .937092 .937019 .936946 .936872 9.936799 .936725 Corr. .936652 12 10 .936578 15 18 .936505 20 25 9.936431 30 37 40 49 45 55 .936210 50 61 .936136 9.936062 .935988 .935914 .935840 .935766 9.935692 .935618 .935543 .935469 .935395 1 9.933445 .933369 .933293 .933217 .933141 9.933066 Sin. Corr. for Sec. 9.935320 .935246 .935171 .935097 .935022 9.934948 .934873 .934798 .934723 .934649 9.934574 .934499 Corr. .934424 10 13 .934349 15 19 .934274 20 25 9.934199 30 38 .934123 40 50 .934048 56 45 .933973 .50 63 .933898 9.933822 .933747 .933671 .933596 .933520 " Tan. 9.761439 .761731 .762023 .762314 .762606 9.762897 .763188 Corr. 763479 10 48 .763770 15 73 .761061 20 97 9.764352 30 145 .764643 40 194 .764933 45 218 .765224 50 242 .765514 9.765805 .766095 .766385 766675 .766965 9.767255 .767545 .767834 .768124 .768414 9.768703 .768992 769281 .769571 .769860 9.770148 .770437 .770726 .771015 .771303 9.771592 .771880 772168 .772457 .772745 I n Corr. for Sec. 1040 2048 48 72 20 96 15 Corr, 30 144 n 45 217 50 241 9.773033 .773321 .773608 .773896 .774184 9.774471 .774759 Corr. .775046 10 48 .775333 15 72 .775621 20 96 9.775908 .776195 .776482 .776768 .777055 9.777342 .777628 .777915 .778201 .778488 9.778774 Cot. CAAW STU Cot. 30 144 40 191 45 215 50 239 0.238561 .238269 .237977 .237686 .237394 149° 0.229852 .229563 193 .229274 .228985 60 59 58 57 56 55 0.237103 .236812 54 .236521 53 .236230 52 .235939 51 0.235648 50 .235357 49 48 .235067 .234776 47 .234486 46 0.234195 45 44 .233905 .233615 43 42 .233325 .233035 41 0.232745 40 .232455 39 .232166 38 .231876 37 .231586 36 0.231297 35 .231008 34 .230719 33 .230429 32 .230140 31 30 29 28 27 .228697 26 0.228408 .228120 25 24 .227832 23 .227543 22 .227255 21 *********~ Tan. 0.226967 20 .226679 19 .226392 18 17 16 .226104 .225816 0.225529 15 .225241 14 .224954 13 ,224667 12 .224379 11 0.224092 10 9 .223805 .223518 8 ,223232 .222945 0.222658 .222372 7 6 5 .222085 .221799 .221512 0.221226 43210 59° 608 31° 01234B67∞ of 8 9 11 12 13 14 10 9.713935 15 16 17 18 ** 222******* AMABI38588 GEN 19 20 21 23 24 25 26 27 28 29 30 31 32 33 34 36 39 40 41 42 43 44 45 46 47 48 49 KIBONDO 54 Sin. 55 56 57 58 59 60 121° TABLE XXII.-LOGARITHMIC SINES, 9.711839 .712050 Corr. .712260 10 35 .712469 15 52 .712679 20 70 9.712889 .713098 30 105 40 140 .713308 45 157 .713517 50 174 .713726 .714144 714352 .714561 .714769 .716224 .716432 .716639 .716846 9.717053 9.714978 .715186 Corr. .715394 10 35 .715602 15 52 .715809 20 69 9.716017 .717259 .717466 .717673 .717879 50 9.722181 51 .722385 52 53 .722588 .722791 .722994 9.723197 9.720140 .720345 .720549 .720754 .720958 9.721162 11 Corr. for Sec. ה 9.718085 .718291 Corr. .718497 10 34 .718703 15 51 718909 20 68 9.719114 30 103 .719320 40 137 719525 45 154 719730 50 171 .719935 .723400 .723603 .723805 .724007 9.724210 Cos. 30 104 40 138 45 155 50 173 .721366 Corr. .721570 10 34 .721774 51 .721978 11 曾 ​AAU NE 15 20 68 30 102 40 135 45 152 50 169 Cos. 9.933066 .932990 .932914 .932838 .932762 9.932685 .932609 .932533 .932457 .932380 9.932304 .932228 Corr. .932151 10 13 .932075 15 19 .931998 20 26 9.931921 30 38 .931845 40 51 .931768 45 58 .931691 50 64 .931614 9.931537 .931460 .931383 .931306 .931229 9.931152 .931075 .930998 .930921 .930843 9.930766 ,930688 .930611 .930533 .930456 9.930378 Corr. for Sec. .930300 .930223 "1 .930145 .930067 9.929989 .929911 Corr. .929833 10 13 .929755 15 20 .929677 20 26 9.929599 .929521 30 39 40 52 .929442 45 59 65 .929364 .929286 9.929207 .929129 .929050 .928972 .928893 9.928815 .928736 .928657 .928578 .928499 9.928420 Sin. n 535999999 50 Tan. 9.778774 .779060 779346 .779632 .779918 9.780203 .780489 Corr. .780775 10 48 71 95 15 .781060 .781346 9.781631 .781916 .782201 .782486 .782771 9.783056 .783341 783626 .783910 .784195 9.784479 .784764 .785048 9.787319 .7876Q3 787886 .788170 .788453 9.788736 .789019 .789302 .789585 .789868 n 9.792974 .793256 793538 .793819 .794101 .785332 .785616 9.785900 .786184 Corr. .786468 10 47 .786752 15 71 9.794383 .794664 794946 Corr. for Sec. CABO 87 .795227 .795508 9.795789 Cot. 20 30 143 40 190 45 214 50 238 .787036 20 95 # 48 8848 9.790151 .790434 .790716 .790999 .791281 9.791563 .791846 .792128 .792410 15 70 .792692 20 94 Corr. 47 10 30 142 40 189 45 213 50 236 ה 30 141 40 188 45 211 50 235 Cot. 0.221226 60 .220940 59 .220654 58 .220368 57 .220082 56 0.219797 55 .219511 54 .219225 53 .218940 52 .218654 51 0.218369 50 .218084 49 .217799 48 47 .217514 .217229 46 0.216944 45 .216659 44 .216374 43 .216090 42 .215805 41 0.215521 40 .215236 39 .214952 38 .214668 37 .214384 36 0.214100 35 .213816 34 .213532 33 .213248 32 .212964 31 0.212681 30 .212397 29 .212114 28 .211830 27 .211547 26 0.211264 25 .210981 24 .210698 23 .210415 .210132 148° 0.205617 .205336 .205054 21 0.209849 20 .209566 19 .209284 18 .209001 17 .208719 16 0.208437 15 .208154 14 .207872 13 .207590 12 .207308 11 0.207026 .206744 .206462 .206181 205899 .204773 .204492 0.204211 Tan. *******22 10 9 8 •COLO HMOTO 6 5 3 0 58° 609 32° 01234 LO 5 7 ∞ 10 11 12 13 14 9 .726024 15 16 17 18 222******* 23 24 25 .726827 .727027 9.727228 .727428 .727628 10 33 .727828 15 50 19 .728027 20 66 21 20 9.728227 .728427 .728626 .728825 .729024 9.729223 26 27 28 29 30 31 32 33 34 35 36 37 8888888 38 39 40 41 42 43 44 45 46 47 48 49 COSINES, TANGENTS, AND COTANGENTS Sin. 50- 51 52 53 54 55 56 57 58 59 60 122° 9.724210 .724412 .724614 Corr. 10 34 .724816 15 50 .725017 20 67 9.725219 30 101 .725420 40 134 .725622 45 151 .725823 50 168 9.726225 .726426 .726626 .729422 .729621 .729820 .730018 9.732193 .732390 .732587 .732784 .732980 9.733177 9.734157 .734353 .734549 R .734744 .734939 9.735135 .735330 .735525 .735719 735914 9.736109 Corr. for Sec. 獎 ​Cos. 9.730217 .730415 Corr. .730613 10 33 .730811 15 49 731009 20 66 9.731206 30 99 .731404 40 132 .731602 45 148 .731799 50 164 .731996 1242 8048 30 100 45 50 Corr. П 11 .733373 Corr. .733569 10 33 .733765 15 49 .733961 20 65 133 149 166 30 98 40 130 45 50 147 163 Cos. 9.926831 .926751 .926671 .926591 .926511 9.926431 .926351 .926270 .926190 .926110 9.928420 .928342 .928263 .928183 .928104 9.928025 .927946 .927867 .927787 .927708 9.927629 .927549 Corr. .927470 10 13 .927390 15 20 .927310 20 27 9.927231 30 40 .927151 40 53 .927071 45 60 .926991 50 66 .926911 9.926029 .925949. .925868 .925788 .925707 9.925626 .925545 .925465 .925384 .925303 9.924409 .924328 .924246 . .924164 .924083 9.924001 .923919 .923837 .923755 .923673 9.923591 Sin. 9.925222 .925141 Corr. .925060 10 14 .924979 15 20 .924897 20 27 9.924816 30 41 .924735 40 54 .924654 45 61 .924572 50 68 .924491 Corr. for Sec. W Tan. 9.795789 .796070 .796351 .796632 .796913 9.797194 .797474 Corr. .797755 10 47 .798036 15 70 .798316 20 93 9.798596 .798877 .799157 .799437 .799717 9.799997 .800277 .800557 .800836 .801116 9.804187 .804466 .804745 .805023 .805302 9.805580 .805859 .806137 9.801396 .801675 .801955 .802234 .802513 9.802792 .803072 Corr. .803351 10 46 .803630 .803909 20 93 .806415 .806693 " 9.806971 .807249 Corr. for Sec. 30 140 40 187 45 210 50 234 1 19323 15 70 30 139 40 186 45 209 50 232 .807527 .807805 .808083 9.808361 Corr. .808638 .808916 10 46 .809193 .809471 9.809748 15 69 20 92 .810025 .810302 .810580 .810857 9.811134 .811410 .811687 .811964 .812241 9.812517 Cot. R 2 8948 30 139 40 185 45 208 50 231 Cot. 147° 0.204211 60 .203930 59 .203649 58 .203368 57 .203087 56 0.202806 55 .202526 54 .202245 53 .201964 52 .201684 51 0.201404 50 .201123 49 ,200843 48 .200563 47 46 .200283 0.200003 .199723 45 44 .199443 43 .199164 42 .198884 41 ཐ832 Tan. 0.198604 .198325 .198045 .197766 36 .197487 0.197208 35 .196928 34 .196649 33 .196370 32 .196091 31 0.195813 .195534 .195255 .194977 .194698 26 0.194420 .194141 25 24 .193863 23 .193585 22 0.193029 16 15 .193307 21 20 .192751 19 .192473 18 .192195 17 .191917 0.191639 .191362 14 .191084 13 .190807 12 .190529 11 0.190252 10 .189975 9 .189698 8 .189420 .189143 0.188866 .188590 7 .188313 .188036 .187759 0.187483 40 39 38 37 2207837 29 6543210 57° 610 33° 0123 4 7 •∞- DEN - 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22232322≈≈ 8-****UNADDING** 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58888888 59 60 123° Sin. TABLE XXII.—LOGARITHMIC SINES, 9.736109 .736303 Corr. .736498 10 32 .736692 15 48 .736886 20 65 9.737080 30 97 .737274 40 129 .737467 45 145 .737661 50 161 .737855 Corr. for Sec. 9.743792 .743982 .744171 .744361 .744550 9.744739 .744928 9.738048 .738241 .738434 .738627 .738820 9.739013 .739206 Corr. .739398 10 32 .739590 15 48 .739783 20 64 9.739975 .740167 .740359 .740550 .740742 9.740934 .741125 .741316 .741508 .741699 . 9.745683 .745871 .746060 .746248 .746436 9.746624 .746812 .746999 .747187 .747374 9.747562 Cos. " 9.741889 ,742080 M Corr. .742271 10 32 .742462 15 48 .742652 20 63 9.742842 30 95 .743033 40 127 .743223 45 142 .743413 50 158 .743602 30 96 40 128 45 144 50 160 " 745117 10 .745306 .745494 AAW NEO 20 Corr. 31 58 30 94 40 125 45 141 Cos. 9.923591 .923509 .923427 .923345 .923263 9.923181 .923098 .923016 .922933 .922851 9,922768 .922686 Corr. .922603 10 14 .922520 15 21 .922438 20 28 9.922355 30 41 .922272 40 55 .922189 45 62 .922106 50 69 .922023 9.921940 .921857 .921774 .921691 .921607 9.921524 .921441 .921357 .921274 .921190 9.921107 .921023 .920939 .920856 .920772 9.920688 ,920604 .920520 .920436 .920352 9.919424 .919339 .919254 .919169 .919085 9.920268 .920184 Corr. .920099 10 14 .920015 15 21 .919931 20 28 9.919846 30 42 .919762 40 56 .919677 45 63 .919593 50 70 .919508 9.919000 .918915 .918830 .918745 .918659 9.918574 # Sin. Corr. for Sec. M Tan. 9.812517 .812794 .813070 .813347 .813623 9.813899 .814176 .814452 .814728 .815004 9.815280 .815555 Corr. .815831 10 46 .816107 15 69 .816382 20 92 9.816658 30 138 .816933 40 184 .817209 45 207 .817484 50 230 .817759 9.818035 .818310 .818585 .818860 .819135 9.819410 .819684 .819959 .820234 .820508 9.820783 .821057 .821332 .821606 .821880 9.822154 .822429 822703 .822977 .823251 Corr. for Sec. 9.826259 .826532 .826805 .827078 .827351 9.827624 .827897 .828170 .828442 .828715 9.828987 Cot. W 9.823524 .823798 Corr. .824072 10 46 .824345 15 68 .82461920 91 9.824893 30 137 .825166 40 182 .825439 45 205 .825713 50 228 .825986 Cot. 146 0.187483 60 .187206 59 .186930 58 .186653 57 .186377 56 0.186101 55 .185824 54 .185548 53 .185272 52 .184996 51 0.184720 50 .184445 49 .184169 48 .183893 47 .183618 46 0.183342 45 .183067 44 .182791 43 .182516 42 .182241 41 40 0.181965 .181690 39 .181415 38 .181140 37 .180865 36 0.180590 35 .180316 34 180041 33 .179766 32 .179492 31 0.179217 30 .178943 29 .178668 28 .178394 27 .178120 26 0.177846 25 .177571 24 .177297 23 .177023 22 .176749 21 0.176476 20 .176202 19 .175928 18 .175655 17 .175381 16 0.175107 15 .174834 14 .174561 13 .174287 12 .174014 0.173741 .173468 .173195 11 10 9 8 .172922 7 .172649 6 0.172376 .172103 .171830 .171558 .171285 0.171013 Tan. 4~NI O 3 56° 611 34° 01234 20 40 2 0 0 7 8 9 10 11 12 13 14 15 16 17 18 19 20 2222 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 124° COSINES, TANGENTS, AND COTANGENTS Sin. 9.747562 .747749 .747936 .748123 .748310 9.7484197 .748683 Corr. .748870 31 .749056 15 47 .749243 20 62 9.749429 .749615 .749801 .749987 .750172 9.750358 .750513 .750729 .750914 .751099 9.751284 .751469 .751654 .751839 .752023 9.752208 .752392 .754229 .754412 .754595 .751778 9.754960 .755143 .755326 .755508 .755690 9.755872 Corr. for Sec. .756418 .756600 .752576 10 .752760 15 .752944 20 9.753128 .753312 .753495 .753679 .753862 9.754016 9.756782 .756963 .757144 .757326 .757507 9.757688 54 55 56 .757869 57 .758050 58 .758230 59 .758411 60 9.758591 Cos. 1 1940 000 30 93 40 124 45 140 155 50 n .756054 .756236 10 GAAU NEO 5558 30 40 50 11 Corr. 30 45 20 61 1992 090 15 30 40 Corr. 45 50 91 121 136 151 Cos. 9.918574 .918489 .918404 .918318 .918233 9.918147 .918062 .917976 .917891 ..917805 9.916859 .916773 .916687 9.917719 .917634 .917548 Corr. 10 14 15 22 .917462 .917376 20 29 9.917200 30 43 .917204 40 57 .917118 45 64 .917032 50 72 .916916 .916600 .916514 9.916427 .916341 .916254 .916167 .916081 9.915994 .915907 .915820 .915733 .915646 9.915559 .915472 .915385 .915297 .915210 9.914246 .914158 .914070 11 .913982 .913894 9.913806 .913718 .913630 .913541 .913453 9.913365 Sin. Corr. for Sec. 9.915123 .915035 Corr. .914948 10 15 .914860 15 22 .914773 20 29 9.914685 30 44 ,914598 40 58 .914510 45 66 .914422 50 73 .914334 11 NOC*N Tan. 9.828987 .829260 ,829532 .829805 .830077 9.830349 .830621 .830893 .831165 .831437 9.831709 .831981 Corr. .832253 10 45 .832525 15 68 .832796 20 91 9.833068 30 136 .833339 40 181 .833611 45 204 ,833882 50 226 .834154 9.834425 .834696 .834967 .835238 .835509 9.835780 .836051 .836322 .836593 .836864 9.837134 .837405 .837675 .837946 .838216 9.838487 .838757 .839027 .839297 .839568 9.842535 .842805 .843074 .843343 9.839838 .840108 Corr. .840378 10 45 .840648 15 67 .840917 20 90 9.841187 30 135 .841457 40 180 .841727 45 202 .841996 50 225 .842266 .843612 9.843882 .844151 .844420 .844689 .844958 9.845227 #1 Cot. Corr. for Sec. A Cot. 145° 0.171013 60 .170740 59 .170468 58 .170195 57 .169923 56 0.169651 55 .169379 54 .169107 53 .168835 52 .168563 51 0.168291 50 .168019 49 .167747 48 .167475 47 .167204 0.166932 46 45 44 43 .166661 .166389 .166118 42 .165846 41 0.165575 40 .165304 39 .165033 38 .164762 37 .164491 36 35 0.164220 .163949 34 .163678 33 .163407 32 .163136 31 0.162866 30 .162595 29 .162325 28 .162054 27 26 .161784 0.161513 25 .161243 24 .160973 23 .160703 22 .160432 21 0.160162 20 .159892 19 .159622 18 .159352 17 .159083 16 0.158813 15 .158543 14 .158273 13 .158004 12 .157734 11 0.157465 10 .157195 9 .156926 .156657 .15638S 0.156118 .155849 .155580 .155311 .155042 0.154773 Tan. 8765432IO 1 0 55° 612 35° 01234567∞ CF23, 8 9 11 10 9.760390 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 888 GENE- 36 37 38 39 40 41 42 43 Sin. 46 47 48 49 125° 9.758591 .758772 .758952 .759132 .759312 9.759492 .759672 Corr. .759852 10 30 .760031 15 .760211 '20 .760569 .760748 .760927 .761106 9.761285 .761464 .761642 .761821 .761999 9.765720 .765896 .766072 766247 44 .766423 45 9.766598 9.762177 .762356 .762534 .762712 .762889 9.763067 .763600 .763777 9.763954 .764131 .764308 .764485 .764662 9.764838 .765015 .765191 .765367 .765544 TABLE XXII.-LOGARITHMIC SINES, .763245 Corr. .763422 10 30 15 44 20 59 50 51 52 53 54 55 9.768348 56 57 58 59 60 9.767475 .767649 .767824 .767999 .768173 n .768522 .768697 .768871 .769045 9.769219 Cos. CANO NM W Corr. for Sec. 42 8948 30 40 45 50 1 .766774 .766919 .767124 .767300 20 120 134 149 GAAC NEW 89 118 133 148 Corr. 10 29 44 20 58 30 88 40 117 131 50 146 Cos. 9.913365 .913276 .913187 .913099 .913010 9.912922 .912833 .912744 .912655 .912566 9.912477 .912388 Corr. .912299 10 15 .912210 15 22 .912121 20 30 9.912031 30 45 .911942 40 60 .911853 45 67 .911763 50 74 .911674 9.911584 .911495 .911405 .911315 .911226 9.911136 .911046 .910956 .910866 .910776 9.910686 .910596 .910506 .910415 .910325 9.910235 .910144 .910054 .909963 .909873 • Corr. for Sec. n 1 9.909782 .909691 Corr. .909601 10 15 .909510 15 23 .909419 20 30 9.909328 30 45 .909237 40 61 .909146 45 68 .909055 50 76 .908964 9.908873 .908781 .908690 .908599 .908507 9.908416 .908324 .908233 .908141 .908049 9.907958 Sin. Tan. 9.845227 .845496 .845764 .846033 .846302 9.846570 .846839 .847108 .847376 .847644 9.847913 .848181 Corr. .848449 10 45 .848717 15 67 .848986 20 89 9.849254 30 134 .849522 40 179 .849790 45 201 .850057 50 223 .850325 9.850593 .850861 .851129 .851396 .851664 9.851931 .852199 .852466 .852733 .853001 9.853268 .853535 .853802 .854069 .854336 9.854603 .854870 .855137 .855404 .855671 Corr. for Sec. 9.855938 .856204 ក Corr. .856471 10 44 .856737 15 67 .857004 20 89 9.857270 30 133 .857537 40 178 .857803 45 200 .858069 50 222 .858336 9.858602 .858868 .859134 .859400 .859666 9.859932 .860198 .860464 .860730 .860995 9.861261 Cot. Cot. 0.154773 60 ,154504 59 .154236 58 .153967 57 .153698 56 144° 0.153430 55 .153161 54 .152892 53 .152624 52 .152356 51 0.152087 50 .151819 49 .151551 48 .151283 47 .151014 46 0.150746 45 .150478 44 .150210 43 .149943 42 .149675 41 0.149407 40 .149139 39 .148871 38 .148604 37 .148336 36 0.148069 35 .147801 34 .147534 33 32 31 .147267 .146999 0.146732 .146465 .146198 30 29 28 ********27 .145931 .145664 26 0.145397 25 .145130 24 .144863 23 .144596 22 .144329 21 0.144062 20 .143796 19 .143529 18 .143263 17 .142996 16 0.142730 15 .142463 14 .142197 13 .141931 12 .141664 0.141398 .141132 11 .140866 .140600 .140334 0.140068 .139802 .139536 .139270 .139005 0.138739 Tan. 10 9 8 7 6 U5432-O 54* 613 36° 01234 L ∞ Z ∞ ~ 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 126° COSINES, TANGENTS, AND COTANGENTS Sin. 9.769219 .769393 .769566 .769740 .769913 9.770087 .770260 Corr. .770433 10 29 .770606 15 43 .770779 20 58 9.770952 .771125 .771298 .771470 .771643 9.771815 .771987 .772159 .772331 .772503 9.772675 .772847 .773018 .773190 .773361 9.774388 .774558 .774729 .774899 ,775070 9.775240 .775410 775580 .775750 .775920 9.773533 .773704 Corr. .773875 10 28 .774046 15 43 .774217 20 57 9.776090 .776259 .776429 .776598 .776768 9.776937 .777106 .777275 .777444 .777613 9.777781 .777950 .778119 11 .778792 .778960 .779128 .779295 9.779463 Cos. Corr. for Sec. 30 86 40 115 45 130 50 144 M 3888-88 11 30 85 40 114 45 128 50 142 10520 Corr. 28 42 56 30 84 40 112 45 126 .778287 50 140 .778455 9.778624 Cos. 9.907958 .907866 .907774 .907682 .907590 9.907498 .907406 .907314 .907222 .907129 9.906111 .906018 .905925 .905832 .905739 9.907037 .906945 Corr. .906852 10 15 15 .906760 23 .906667 20 31 9.906575 30 46 .906482 40 62 .906389 45 69 .906296 50 77 .906201 9.905645 .905552 .905459 .905366 .905272 9.905179 .905085 .904992 .904898 .904804 9.904711 .904617 .904523 .904429 .904335 9.903298 .903203 .903108 .903014 .902919 9.902824 .902729 .902634 .902539 F 9.904241 .904147 Corr. .901053 10 16 .903959 15 24 .903864 20 31 9.903770 30 47 .903676 40 63 .903581 45 71 .903487 50 79 .903392 .902444 9.902349 Sin. Corr. for Sec. " Tan. 9.861261 .861527 .861792 .862058 .862323 9.862589 ,862854 .863119 .863385 .863650 9.866564 .866829 0.137411 0.138739 60 .138473 59 .138208 58 .137942 57 .137677 56 55 .137146 54 .136881 53 .136615 52 .136350 51 9.863915 0.136085 50 .864180 Corr. .135820 49 .864445 10 44 .135555 48 .864710 15 .135290 66 47 .864975 20 88 .135025 46 9.865240 30 132 0.134760 45 .865505 40 177 .134495 44 .865770 45 199 .134230 43 .866035 50 221 .133965 42 .866300 .133700 41 .867094 .867358 .867623 9.867887 .868152 .868416 .868680 .868945 9.869209 .869473 .869737 .870001 .870265 9.870529 .870793 .871057 .871321 .871585 9.874484 .874747 .875010 1 9.871849 .872112 Corr. .872376 10 44 ,872610 15 66 .872903 20 88 9.873167 30 132 .873430 40 176 .873694 45 198 .873957 50 220 .874220 .875273 .875537 9.875800 .876063 .876326 .876589 .876852 9.877114 Cot. Corr. for Sec. n Cot. 40 0.133436 .133171 39 .132906 38 .132642 37 .132377 36 0.132113 .131848 35 34 .131584 33 .131320 32 .131055 0.130791 31 30 .130527 29 .130263 28 .129999 27 .129735 26 0.129471 25 143° .129207 24 .128943 .128679 .128415 21 .123937 .123674 0.128151 .127888 127624 18 .127360 17 .127097 16 0.126833 15 .126570 14 .126306 13 .126043 12 .125780 0.125516 .125253 .124990 11 .124727 .124463 0.124200 .123411 .123148 0.122886 ***22 20 Tan. 23 19 09876O LA SED ON TO 10 3 0 53° 614 37° 0 OH~~ LO SE89 2 5 6 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 127° Sin. 9.781134 .781301 .781468 781634 .781800 9.781966 9.779463 .779631 .779798 .779966 .780133 9.780300 .780467 Corr. .780634 10 28 .780801 15 42 .780968 20 56 782132 .782298 .782464 .782630 9.782796 .782961 .783127 .783292 .783458 9.784447 .784612 .784776 784941 .785105 9.785269 785433 .785597 .785761 .785925 9.783623 .783788 Corr. .783953 10 27 784118 .784282 9.786089 .786252 786416 .786579 786742 9.786906 .787069 9.787720 .787883 .788045 TABLE XXII.-LOGARITHMIC SINES, .788208 .788370 9.788532 788694 .788856 .789018 .789180 9.789342 Ħ Cos. Corr. for Sec. 30 83 40 111 45 125 139 50 W 05205 15 .787232 10 Corr. 27 .787395 41 15 ,787557 20 54 FI 15535 41 30 82 40 110 45 123 50 137 30 81 40 108 45 122 50 135 Cos. 9.902349 .902253 .902158 .902063 .901967 9.901872 .901776 .901681 .901585 .901490 9.901394 .901298 Corr. .901202 16 10 .901106 15 24 .901010 20 32 9.900914 30 48 .900818 40 64 .900722 45 72 .900626 50 80 .900529 9.900433 .900337 .900240 .900144 .900047 9.899951 .899854 .899757 .899660 .899564 9.899467 .899370 .899273 .899176 .899078 9.898981 .898884 .898787 .898689 :898592 9.897516 .897418 .897320 .897222 .897123 9.897025 .896926 .896828 Corr. for Sec. 17 9.898494 .898397 " Corr. .898299 10 16 .898202 15 24 .898104 20 33 9.898006 30 49 .897908 40 65 .897810 45 73 .897712 50 82 .897614 .896729 .896631 9.896532 Sin. Tan. 9.877114 .877377 .877640 .877903 .878165 9.878428 .878691 .878953 .879216 .879478 9.879741 .880003 Corr. .880265 10 44 .880528 15 66 .880790 20 87 9.881052 30 131 .881314 40 175 45 .881577 197 .881839 50 218 .882101 9.882363 .882625 .882887 .883148 .883410 9.883672 883934 .884196 .884457 .884719 9.884980 .885242 .885504 .885765 .886026 9.886288 .886549 .886811 .887072 .887333 9.890204 .890165 .890725 9.887594 .887855 Corr. .888116 10 43 .888378 15 65 .888639 20 87 9.888900 30 130 .889161 40 174 889421 45 196 .889682 50 217 S89943 ,890986 .891247 M 9.891507 .891768 .892028 .892289 .892549 9.892810 Cot. Corr. for Sec. π Cot. 142° 0.122886 60 122623 59 .122360 58 .122097 57 .121835 56 55 0.121572 .121309 54 .121047 53 .120784 52 .120522 51 0.120259 50 .119997 49 .119735 48 .119472 47 .119210 46 0.118948 45 .118686 44 .118423 43 .118161 42 .117899 41 0.117637 40 .117375 39 .117113 38 .116852 37 .116590 36 0.116328 35 .116066 34 .115804 33 .115543 32 .115281 31 0.115020 30 .114758 29 .114496 28 .114235 27 .113974 .108232 .107972 .107711 .107451 0.107190 Tan. 26 25 24 23 0.113712 .113451 21 .113189 .112928 .112667 0.112406 20 .112145 19 .111884 18 .111622 17 .111361 16 0.111100 15 .110839 14 .110579 13 .110318 12 .110057 11 0.109796 .109535 .109275 .109014 .108753 0.108493 2222 10 9 8 7 COLD 43 21O 0 52° 615 38° 0123TELO SO Z Ca 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 22222 20 21 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 TOOOO DAAAAPZADƏ w 40 41 42 43 44 45 46 47 43 43 50 51 52 53 54 55 56 57 58 59 60 88888 128° COSINES, TANGENTS, AND COTANGENTS Sin. 9.789342 .789504 .789665 .789827 .789988 9.790149 .790310 Corr. .790471 10 27 .790632 15 40 .790793 20 54 9.790954 .791115 .791275 .791436 .791596 9.791757 .791917 .792077 .792237 .792397 .793832 .793991 9.794150 .794308 .794467 .794626 .794781 9.794942 .795101 .795259 .795417 .795575 9.792557 .792716 .792876 793035 .793195 9.793354 11 .793514 Corr. .793673 10 26 15 40 20 53 9.795733 .795891 .796049 .796206 .796364 9.796521 .796679 .796836 .796993 .797150 9.797307 .797464 .797621 .797777 .797934 9.798091 Corr. for Sec. " .798247 .798403 .798560 .798716 9.798872 Cos. 30 80 40 107 45 121 50 134 142 8048 30 79 106 119 132 45 50 11 Corr. 26 39 52 10 1033 102 2008 15 78 30 40 105 118 45 50 131 Cos. 9.896532 .896433 .896335 .896236 .896137 9.896038 .895939 .895840 .895741 .895641 .89494145 .894846 .894746 .894646 9.895542 .895443 Corr. .895343 10 17 .895244 15 25 895145 20 33 9.895045 30 50 40 66 45 75 50 83 9.894546 .894446 .894346 .894246 .894146 9.894046 .893946 :893846 .893745 .893645 9.893544 .893444 .893343 .893243 .893142 9.893041 .892940 .892839 .892739 ..892638 9.891523 .891421 .891319 .891217 .891115 9.892536 .892435 Corr. .892334 10 17 .892233 15 25 .892132 20 34 9.892030 30 51 .891929 40 68 891827 45 76 50 .891726 .891624 84 9.891013 .890911 .890809 .890707 .$90605 9.890503 Sin. Corr. for Sec. H Tan. 9.892810 .893070 .893331 .893591 .893851 9.894111 .894372 .894632 .894892 .895152 9.895412 .895672 Corr. .895932 10 43 .896192 15 65 .896-452 20 87 30 9.896712 130 40 173 .896971 45 195 .897231 50 216 .897491 .897751 9.898010 .898270 .898530 .898789 .899049 9.899308 .899568 .899827 .900087 .900346 9.900605 .900864 .901124 .901383 .901642 9.901901 .902160 .902420 .902679 .902938 9.905785 .906043 .906302 .906560 .906819 1 9.903197 .903456 Corr. .903714 10 43 .903973 15 65 20 .904232 86 30 129 9.904491 40 173 .904750 194 45 216 50 .905008 .905267 .905526 9.907077 .907336 .907594 .907853 .908111 9.908369 Cot. Corr. for Sec. 11 Cot. 0.107190 60 .106930 59 .106669 58 .106409 57 .106149 56 55 0.105889 .105628 54 .105368 53 .105108 52 .104848 51 0.104588 50 .104328 49 .104068 48 .103808 47 .103548 46 45 0.103288 .103029 44 .102769 43 .102509 42 .102249 41 0.101990 40 .101730 39 .101470 38 .101211 37 .100951 36 0.100692 35 .100432 .100173 0.094215 .093957 .093698 .093440 .093181 0.092923 .092664 .092406 .092147 141° .091889 0.091631 .099913 32 .099654 31 30 0.099395 .099136 29 .098876 28 .098617 27 .098358 26 0.098099 25 24 .097840 .097580 23 20 19 22 .097321 .097062 21 0.096803 .096544 18 .096286 17 .096027 .095768 16 15 0.095509 .095250 14 .094992 13 12 .094733 .094474 11 Tan. 6330 34 33 10 9 P 0781843210 5 51° 616 39° 0123456789 10 11 12 13 14 15 16 17 18 19 222****** 20 21 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 BGE-RIKON** 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 129° Sin. 9.798872 .799028 .799184 .799339 .799495 9.799651 .799806 Corr. .799962 10 26 .800117 15 .800272 20 9.801201 .801356 .801511 .801665 .801819 9.801973 .802128 .802282 .802436 .802589 9.802743 .802897 • 30 40 78 103 9.800427 .800582 .800737 45 116 .800892 50 129 .801047 .803050 .803204 .803357 9.803511 .803664 ,803817 .803970 ,804123 9.804276 .804428 .804581 .804734 .804886 TABLE XXII.—LOGARITHMIC SINEs, 9.806557 .806709 .806860 .807011 .807163 9.807314 .807465 .807615 .807766 59 .807917 60 9.808067 Cos. Corr. for Sec. Q CABU NE Corr. 10 26 15 38 20 51 22 894 9.805039 .805191 .805343 .805495 .805647 9.805799 .805951 n Corr. .806103 .806254 25 38 .806106 20 50 22 30 77 40 102 45 115 128 50 10 15 8*38 85 30 76 40 101 45 114 126 50 Cos. 9.890503 .890400 .890298 .890195 .890093 9.889990 .889888 .889785 .889682 .$89579 9.889477 " Corr. .889374 .889271 10 17 .889168 15 26 889064 20 34 9.888961 30 52 .888858 40 69 .888755 45 77 .888651 50 86 .888548 9.888414 .888341 .888237 .888134 .888030 9.887926 .887822 .887718 .887614 .887510 9.887406 .887302 .887198 .887093 .886989 9.886885 .886780 .886676 .886571 .886466 9.886362 .886257 Corr. .886152 10 18 .886047 15 26 .885942 20 35 9.885837 30 53 .885732 40 70 45 79 .885627 .885522 50 88 .SS5416 9.885311 .885205 .885100 .884994 .884889 9.884783 .884677 .884572 .884466 .884360 9.884254 Corr. for Sec. Sin. " Tan. 9.908369 .908628 .908886 ,909144 .909402 9.909660 .909918 .910177 .910435 .910693 9.910951 .911209 Corr. .911467 10 43 .911725 15 64 .911982 20 86 9.912240 30 129 .912498 40 172 .912756 45 193 .913014 50 215 .913271 9.913529 .913787 .914044 .914302 .914560 9.914817 .915075 .915332 .915590 .915817 9.916104 .916362 .916619 .916S77 .917134 9.917391 .917648 .917906 .918163 .918420 9.921247 .921503 .921760 .922017 .922274 W 9.918677 .918934 Corr. .919191 10 43 .919448 15 64 .919705 20 86 9.919962 30 128 .920219 40 171 45 193 .920476 .920733 50 214 .920990 9.922530 .922787 .923044 .923300 .923557 9.923814 Cot. Corr. for Sec. A Cot. 0.091631 60 .091372 59 .091114 58 .090856 57 .090598 56 0.090340 55 .090082 54 .089823 53 .089565 52 .089307 51 50 0.089049 49 .088791 .088533 48 .088275 47 .088018 46 0.087760 45 .087502 44 .087244 43 .086986 42 .086729 41 0.086471 40 .086213 39 .085956 38 .085698 37 .085440 0.085183 .084925 34 36 35 .084668 33 .084410 32 .081153 31 0.083896 .083638 .083381 .083123 .0$2866 0.082609 .082352 .082094 .081837 ,081580 140° 0.078753 .078497 .078240 .077983 .077726 0.077470 .077213 .076956 .076700 .076443 0.076186 Tan. 30 29 28 27 26 25 24 222222 21 20 0.081323 .081066 .080809 19 18 17 16 .080552 080295 0.080038 15 .079781 14 .079524 13 .079267 12 .079010 11 23 10 9 8 5 4 3210 50° 617 40° 01234 LO ∞ 1− ∞✪ 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 130° COSINES, TANGENTS, AND COTANGENTS Sin. 9.808067 .808218 .808368 .808519 .808669 9.808819 .808969 .809119 .809269 .809419 9.809569 .809718 " Corr. .809868 10 25 .810017 15 37 .810167 20 50 9.810316 30 75 .810465 40 99 .810614 45 112 .810763 50 124 .810912 9.811061 .811210 .811358 ,811507 .811655 9.811801 .811952 .812100 .812248 .812396 9.812544 .812692 .812840 .812988 .$13135 9 813283 .813430 .813578 .813725 .813872 50 9.815485 51 .815632 52 .815778 53 .815924 54 .816069 55 56 57 58 59 60 9.814019 .814166 Corr. .S14313 10 24 .814460 15 37 .814607 20 49 9.814753 30 73 .814900 40 98 .815046 45 110 .815193 50 122 .815339 9.816215 .816361 .816507 Corr. for Sec. .816652 .816798 9.816943 Cos. " Cos. 9.884254 .884148 .884012 .$83936 .883829 9.883723 .883617 .883510 .883404 .883297 9.882121 .882014 .881907 .881799 .881692 9.881584 9.883191 .883084 Corr.. .882977 10 18 .882871 15 27 882764 20 36 9.882657 30 53 .882550 40 71 .882443 45 80 .8S2336 50 89 .882229 .881477 .881369 .SS1261 .881153 9.881016 .880938 .880830 .880722 .880613 9.880505 .880397 .880289 .880180 .SS0072 9.878875 .878766 .S78656 .878547 .878438 9.878328 .878219 .878109 .S77999 .877890 9.877780 9.879963 .879855 Corr. .879746 10 18 .879637 15 27 .879529 20 36 9.879420 30 54 .879311 40 73 .879202 45 82 .879093 50 91 .878984 Sin. Corr. for Sec. " Tan. 9.923814 .924070 .924327 .924583 .924840 9.925096 .925352 .925609 .925865 .926122 9.926378 .926634 Corr. .926890 10 43 .927147 15 64 .927403 20 85 9.927659 30 128 .927915 40 171 .928171 45 192 .928427 50 213 .928684 9.928940 .929196 .929452 .929708 .929964 9.930220 .930175 .930731 .930987 .931243 9.931499 .931755 .932010 .932266 .932522 9.932778 .933033 .933289 .933545 .933800 9.934056 .934311 Corr. .934567 10 43 .934822 15 64 .935078 20 85 9.935333 30 128 .935589 40 170 .935844 45 192 .936100 50 213 .936355 9.936611 .936866 .937121 .937377 .937632 9.937887 .938142 .938398 Corr. for Sec. .938653 .938908 9.939163 Cot. A Cot. 0.076186 60 .075930 59 .075673 58 .075417 57 .075160 56 0.074904 55 .074648 54 .074391 53 .074135 52 .073878 51 0.073622 .073366 50 49 .073110 48 .072853 47 .072597 46 0.072341 45 .072085 44 .071829 43 .071573 42 .071316 41 0.071060 40 .070804 39 .070548 38 37 .070292 .070036 36 0.069780 35 .069525 34 .069269 33 .069013 32 .068757 31 139° 0.068501 .068245 .067990 .067734 .067478 0.067222 25 .066967 24 .066711 23 .066455 .066200 21 0.065944 20 .065689 19 .065433 18 .065178 17 .064922 16 0.064667 15 .064411 14 .064156 13 .063900 12 .063645 11 .061858 .061602 82*7****27 22: .061347 .061092 0.060837 Tan. 30 29 0.063389 10 .063134 9 .062879 8 .062623 7 .062368 0.062113 26 6 5 4 3210 0 49° 618 41° 01234 LO CON CO σ 6 7 8 9 DI234 10 11 12 13 14 15 16 17 18 19 ********** 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 20 9.819832 21 .819976 22 .820120 23 .820263 24 .820406 9.820550 .820693 .820836 .820979 .821122 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 88888 Sin. 131° 9.816943 .817088 .817233 .817379 .817524 9.817668 .817813 .817958 .818103 .818247 9.818392 .818536 Corr. .818681 10 24 .818825 15 36 .818969 20 48 9.819113 30 72 .819257 40 96 .819401 45 108 .819545 50 120 .819689 9.821265 .821407 .821550 .821693 .821835 9.821977 .822120 .822262 .822404 .822546 TABLE XXII.-LOGARITHMIC SINES, 9.824104 .824245 .824386 .824527 .824668 9.824808 .824949 .825090 .825230 .825371 9.825511 Cos. A 9.822688 .822830 Corr. .822972 10 24 .823114 15 35 .823255 20 47 9.823397 30 71 .823539 40 94 .823680 45 106 .823821 50 118 .823963 Corr. for Sec. " Cos. 9.877780 .877670 .877560 .877450 .877340 9.877230 .877120 .877010 .876899 .876789 9.876678 .876568 Corr. .876457 10 18 .876347 15 28 .876236 20 37 9.876125 30 55 .876014 40 74 .875904 45 83 .875793 50 92 .875682 9.875571 .875459 .875348 .875237 .875126 9.875014 .874903 .874791 .874680 .874568 9.874456 .874344 .874232 .874121 .874009 9.873896 .873784 .873672 .873560 .873448 Corr. for Sec. " 9.872208 .872095 .871981 .871868 .871755 9.871641 .871528 .871414 .871301 .871187 9.871073 Sin. 9.873335 .873223 17 Corr. .873110 10 19 .872998 15 28 .872885 20 38 9.872772 30 56 .872659 40 75 .872547 45 85 .872434 50 94 .872321 Tan. 9.939163 .939418 .939673 .939928 .940183 9.940439 .940694 .940949 .941204 .941459 9.941713 .941968 Corr. .942223 10 42 .942478 15 64 .942733 20 85 9.942988 30 127 .943243 40 170 .943498 45 191 .943752 50 212 .944007 9.944262 .944517 .944771 .945026 .945281 9.945535 .945790 .946045 .946299 .946554 9.946808 .947063 .947318 .947572 .947827 9.948081 .948335 .948590 .948844 .949099 11 9.951896 .952150 .952405 .952659 .952913 9.953167 .953421 .953675 .953929 .954183 9.954437 Cot. Corr. for Sec. 9.949353 .949608 Corr. .949862 10 42 950116 15 64 .950371 20 85 9.950625 30 127 .950879 40 170 .951133 45 191 .951388 50 212 .951642 n Cot. 0.060837 60 .060582 59 .060327 58 .060072 57 .059817 56 55 0.059561 .059306 54 .059051 53 .058796 52 .058541 51 0.058287 50 .058032 49 .057777 48 .057522 47 .057267 46 0.057012 45 .056757 44 .056502 43 .056248 42 .055993 41 0.055738 40 .055483 39 .055229 38 .054974 37 .054719 36 35 0.054465 .054210 34 .053955 33 .053701 32 .053446 31 0.053192 30 29 .052937 .052682 28 .052428 27 26 .052173 0.051919 25 .051665 24 .051410 23 .051156 22 .050901 21 0.050647 20 .050392 19 .050138 18 .049884 17 .049629 16 0.049375 15 .049121 14 .048867 13 .048612 12 .048358 11 138° 0.048104 10 .047850 .047595 9 8 .047341 7 .047087 0.046833 .046579 .046325 .046071 .045817 0.045563 Tan. 6 • LO CONIO 4 3 2 0 48° 619 42° 0123 TE LO LO DI ∞ m 4 5 6 7 8 10 11 12 13 14 15 16 17 18 19 222*******♬ 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 20 9.828301 .828439 21 .828578 .828716 .828855 9.828993 38 39 40 41 42 43 44 45 46 47 48 49 COSINES, TANGENTS, AND COTANGENTS Sin. 132° 9.825511 .825651 .825791 825931 .826071 9.826211 .826351 .826491 .826631 .826770 9.826910 .827049 Corr. .827189 10 23 .827328 15 35 .827467 20 46 9.827606 30 70 .827745 40 93 .827884 45 104 .828023 50 116 .828162 .829131 .829269 .829407 .829545 9.829683 .829821 .829959 .830097 .830234 9.830372 .830509 .830646 .830784 .830921 50 9.832425 51 .832561 52 .832697 53 .832833 54 .832969 55 9.833105 56 .833241 57 .833377 58 59 60 n 9.831058 .831195 Corr. .831332 10 23 .831469 15 34 .831606 20 46 9.831742 30 68 .831879 40 91 .832015 45 103 .832152 50 114 .832288 .833512 .833648 9.833783 Cos. Corr. for Sec. 11 Cog. 9.871073 .870960 .870846 .870732 .870618 9.870504 .870390 .870276 .870161 9.868785 .868670 .868555 .868440 .868324 9.868209 .868093 .867978 .867862 .867747 .870047 9.869933 .869818 Corr. .869704 10 19 .869589 15 29 .869474 20 38 9.869360 30 57 .869245 40 76 .869130 45 86 96 .869015 50 .868900 9.867631 .867515 .867399 .867283 .867167 9.867051 .866935 .866819 .866703 .866586 9.865302 .865185 .865068 .864950 S64833 9.861716 .864598 .864481 .864363 .864245 9.864127 Sin. n Corr. for Sec. 9.866470 866353 Corr. .866237 10 19 .866120 15 29 .866004 20 39 9.865887 30 58 .865770 40 78 .865653 45 .865536 50 97 .865419 N 88855 Tan. 9.954437 .954691 .954946 .955200 .955454 9.955708 .955961 .956215 .956469 .956723 9.956977 .957231 Corr. .957485 10 42 .957739 15 63 .957993 20 85 9.958247 30 127 .958500 40 169 .958754 45 190 .959008 50 211 .959262 9.959516 .959769 .960023 .960277 ,960530 9.960784 .961038 .961292 .961545 .961799 9.962052 .962306 .962560 .962813 .963067 9.963320 .963574 .963828 .964081 .95-1335 9.967123 .967376 .967629 .967883 .968136 9.964588 .964842 " Corr. .965095 10 42 .965349 15 63 .965602 20 84 9.965855 30 127 .966109 40 169 .966362 45 190 .966616 50 211 .966869 9.968389 .968643 Corr. for Sec. n .968896 .969149 .969403 9.969656 Cot. Cot. 137° 0.045563 60 .045309 59 .045054 58 .044800 57 .044546 56 0.044292 55 .044039 54 .013785 53 .043531 52 .043277 51 0.043023 50 .042769 49 .042515 48 .042261 .042007 0.041753 47 46 45 .041500 44 .041246 43 .040992 42 .040738 41 0.040484 40 39 .040231 .039977 38 37 .039723 .039470 36 0.039216 35 .038962 34 33 .038708 .038455 32 .038201 31 CAGEUKIANG AJ: Tan. www.** 30 0.037948 .037694 29 .037440 28 .037187 .036933 0.036680 26 25 .036426 24 .036172 23 .035919 22 .035665 21 0.035412 20 .035158 19 .034905 18 17 16 .034651 .034398 0.034145 15 .033891 14 .033638 13 .033384 12 .033131 0.032877 .032624 11 .032371 .032117 .031864 0.031611 .031357 .031104 .030851 .030597 0.030344 AR******27 22 10 · 9 6 1 8 ·CO LO SE ES 0 47° 620 43° 01234 10 6 1 00¬ 7 8 9 10 11 12 13 14 15 16 17 18 19 2228 20 21 22 23 24 25 I****** A 26 27 28 29 30 31 32 33 34 35 36 5888 37 38 39 40 41 42 43 44 45 46 47 48 49 58 59 60 Sin. 133° 9.833783 .833919 .834054 .834189 .834325 9.834460 .834595 .834730 .834865 .834999 9.836477 .836611 .836745 9.835134 .835269 Corr. .835403 10 22 .835538 15 34 .835672 20 45 9.835807 30 67 40 90 45 101 50 112 .835941 .836075 .836209 .836343 .836878 .837012 9.837146 .837279 .837412 .837546 .837679 9.837812 .837945 .838078 .838211 .838344 9.838477 .838610 .838742 .838875 .839007 50 51 52 53 54 55 9.841116 56 .841247 57 .841378 .841509 .841640 9.841771 9.840459 .840591 .840722 .840854 .840985 TABLE XXII.—LOGARITHMIC SINES, 9.839140 #T .839272 Corr. .839404 10 22 .839536 15 33 .839668 20 44 9.839800 .839932 40 30 66 88 99 45 .840064 .840196 50 110 .840328 Cos. Corr. for Sec. " Cos. 9.864127 .864010 .863892 .863774 .863656 9.863538 .863419 .863301 .863183 .863064 Corr. 20 9.862946 .862827 .862709 10 .862590 15 30 .862471 20 40 9.862353 30 59 .862234 40 79 .862115 45 89 50 .861996 99 .861877 9.861758 .861638 .861519 .861400 .861280 9.861161 .861041 .860922 .860802 .860682 9.860562 .860442 .860322 .860202 .860082 9.859962 " 9.858151 .858029 .857908 .857786 .857665 9.857543 .857422 .857300 .857178 .857056 9.856934 Sin. Corr. for Sec. .859842 .859721 .859601 .859480 9.859360 .859239 Corr. .859119 10 20 .858998 15 30 .858877 20 40 9.858756 30 60 .858635 40 81 45 .858514 91 50 .858393 101 .858272 "I Tan. 9.969656 .969909 .970162 .970416 ,970669 9.970922 .971175 .971429 .971682 .971935 9.972188 .972441 Corr. .972695 10 42 .972948 15 63 .973201 20 84 9.973454 30 127 .973707 40 169 45 190 .973960 50 211 .974213 .974466 9.974720 .974973 .975226 .975479 .975732 9.975985 .976238 .976491 .976744 .976997 9.977250 .977503 .977756 .978009 .978262 9.978515 .978768 .979021 .979274 .979527 B 9.982309 .982562 .982814 .983067 .983320 9.983573 .983826 .984079 .984332 .984584 9.984837 Cot. Corг. for Sec. 9.979780 .980033 Corr. .980286 10 42 .980538 15 63 .980791 20 84 9.981044 30 126 169 .981297 40 45 190 .981550 50 211 .981803 .982056 ย Cot. 0.030344 60 .030091 59 .029838 .029584 58 57 .029331 56 0.029078 55 54 .028825 .028571 53 .028318 52 .028065 51 0.027812 .027559 .027305 .027052 .026799 0.026546 .026293 .026040 .025787 .023534 0.025280 .025027 .024774 .024521 .024268 0.024015 .023762 .023509 .023256 .023003 136° 0.017691 .017438 .017186 .016933 .016680 0.016427 .016174 .015921 .015668 .015416 0.015163 Tan. 50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 0.022750 .022497 .022244 .021991 .021738 0.021485 24 .021232 .020979 .020726 23 22 20 .020473 21 0.020220 .019967 19 .019714 18 .019462 17 .019209 16 0.018956 15 .018703 14 .018450 13 .018197 12 .017944 11 ********Z 25 10 9 8 7854~NIO 6 2 1 46° 621 44° 01234567"" OFN 8 9 10 11 12 13 14 15 16 17 18 ** 272******* SAN 19 20 21 23 24 25 26 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 57 58 59 60 8888888 134° COSINES, TANGENTS, AND COTANGENTS Sin. 9.841771 .841902 .842033 .842163 .812294 9.842424 .842555 .842685 .842815 .842946 10 Corr. 22 32 9.843076 .843206 .843336 .843466 15 .843595 20 43 9.843725 30 65 .843855 40 86 .843984 45 97 .844114 50 108 .844243 9.844372 .844502 .844631 .844760 .844889 9.845018 .845147 .845276 .845405 .845533 9.845662 .815790 .845919 .846017 .846175 9.846304 .846432 .846560 .846688 .846816 55 9.818852 56 .848979 .849106 .849232 .849359 9.849485 Cos. 9.848218 .848345 .848472 .848599 .818726 Ħ 9.846944 Corr. .847071 .847199 10 21 .847327 15 32 .847454 20 42 9.847582 30 64 .847709 40 85 .847836 45 96 .847964 50 106 .848091 Corr. for Sec. P Cos. 9.856934 .856812 .856690 .856568 .856446 9.856323 .856201 .856078 .855956 .855833 9.854480 .854356 .854233 " 9.855711 .855588 Corr. .855465 10 21 .855342 15 31 .855219 20 41 9.855096 30 62 .854973 40 82 .854850 45 92 .854727 50 103 .854603 .854109 .853986 9.853862 .853738 .853614 .853490 .853366 9.853242 .853118 .852994 .852869 .852745 9.852620 .852496 .852371 .852247 .852122 9.850745 .850619 .850493 .850368 .850242 9.851997 .851872 Corr. .851747 10 21 .851622 15 31 .851497 20 42 9.851372 30 63 .851246 40 83 .851121 45 94 .850996 50 104 .850870 9.850116 .849990 .849864 .849738 .849611 9.849485 Sin. Corr. for Sec. " Tan. 9.984837 .985090 .985343 .985596 .985848 9.986101 .986354 .986607 .986860 .987112 9.987365 .987618 Corr. .987871 10 42 .988123 15 63 .988376 20 84 9.988629 30 126 .988882 40 169 .989134 45 190 .989387 50 211 .989640 9.989893 .990145 .990398 .990651 .990903 9.991156 .991409 .991662 .991914 .992167 9.992420 .992672 .992925 .993178 .993431 9.997473 .997726 .997979 .998231 .998484 W 9.993683 .993936 .994189 .994441 .994694 9.994947 .995199 Corr. .995452 10 42 .995705 15 63 .995957 20 84 9.996210 30 126 .996463 40 168 .996715 45 190 50 211 .996968 .997221 9.998737 .998989 .999242 .999495 .999747 0.000000 Cot. Corr. for Sec. = Cot. 0.015163 60 .014910 59 .014657 58 .014404 57 .014152 56 0.013899 55 .013646 54 50 .013393 53 .013140 52 .012888 51 0.012635 .012382 49 .012129 48 .011877 47 .011624 46 0.011371 45 .011118 44 .010866 43 .010613 42 .010360 41 135° 0.007580 .007328 0.010107 .009855 .009602 38 .009349 37 .009097 36 0.008844 35 .008591 34 .008338 33 .008086 32 .007833 31 .007075 .006822 .006569 0.006317 INH 80** 40 39 222782 30 29 26 25 ,006064 24 .005811 23 .005559 22 .005306 21 0.005053 20 .004801 19 .004548 18 .004295 17 .001043 16 0.003790 15 .003537 14 .003285 13 .003032 12 .002779 11 0.002527 10 .002274 9 .002021 8 .001769 .001516 0.001263 .001011 .000758 .000505 .000253 0.000000 Tan. 76543210 45° 622 Minutes 024 8 10 12 14 16 18 20 22 24 26 28 ♡♡♡♡♡♡♡♡♡♡♡♡ ****~ ~* 30 32 34 36 38 40 42 44 46 48 50 52 C = .75 C= 1.00 TABLE XXIII.-STADIA REDUCTIONS 0° Hor. Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. Dist. 1.74 1.80 100.00 .00 99.97 100.00 .06 99.97 100.00 .12 99.97 1.86 100.00 .17 99.96 1.92 100.00 .23 99.96 1.98 100.00 .29 99.96 2.04 100.00 .35 99.96 100.00 .41 99.95 100.00 100.00 100.00 100.00 100.00 99.99 99.99 99.99 1° .52 99.95 .58 99.95 2.09 2.15 .47 99.95 2.2I 99.99 .93 99.93 99.99 .99 99.93 99.99 1.05 99.92 99.99 1.11 99.92 99.99 1.16 99.92 2.97 99.99 1.22 99.91 99.98 1.28 99.91 3.02 99.98 1.34 99.90 3.08 99.98 1.40 99.90 3.14 99.98 1.45 99.90 3.20 99.98 1.51 99.89 3.26 54 99.98 1.57 99.89 | 3.31 99.97 1.63 99.89 3.37 99.97 1.69 99.88 3.43 99.971.74 99.88 3.49 56 58 60 .64 99.94 .70 99.94 .76 99.94 2.50 .81 99.93 2.56 .87 99.93 2.62 .75 ,ΟΙ .75 1.00 .ΟΙ 1.00 C = 1.25 1.25 .02 1.25 2.27 2.33 2.38 2.44 2.67 2.73 2.79 2.85 2.91 2.91 .02 .03 .03 99.88 3.49 99.87 99.87 3.55 99.87 3.60 99.87 3.66 99.86 3.72 99.86 3.78 2° 99.83 99.83 99.82 99.82 3° 99.82 4.24 99.81 4.30 99.81 4.30 99.81 4.36 Hor. Vert. Dist. Dist. 99.85 3.84 99.85 3.84 99.69 5.57 99.85 3.89 99.68 5.63 99.84 3.95 99.68 5.69 99.84 4.01 99.67 5.75 99.83 4.07 99.83 4.07 99.66 5.80 99.80 4.42 99.80 4.42 99.80 4.47 .75 1.00 1.25 99.73 5.23 99.72 5.28 99.71 99.71 5.34 99.71 99.71 5.40 99.70 5.46 99.69 5.52 4.13 99.66 5.86 4.13 4.18 4.18 99.65 5.92 99.64 || 5.98 99.63 | 6.04 99.63|| 6.09 99.62 6.15 99.61 | 6.21 99.79 4.53 99.61 6.27 99.79 4.59 4.59 99.78 4.65 99.78 4.65 99.59 6.38 99.60 | 6.32 99.78 4.71 99.58 6.44 99.77 4.76|99.58 | 6.50 99.77 4.82 99.57 6.56 99.76 4.88 99.56 6.61 99.76 4.94 99.55 6.67 99.75 4.99 99.55 6.73 99.74 5.05 99.54 6.79 99.74 5.II 99.53 6.84 99.73 5.17 99.52 6.90 99.73 5.23 99.51 6.96 .03 .75 .05 .04 1.00 .06 .05 1.25 .08 623 Minutes 10 N N N N 0246∞ 0 12 14 16 18 20 22 99.51 6.96 99.24 99.5I 7.02 99.23 99.50 7.07 99.22 99.49 7.13 99.21 8 99.48 7.19 99.20 99.47 7.25 99.19 24 26 28 30 www.y GAAAA Aw 32 34 36 38 40 42 44 46 48 LO LO LO 101 52 54 56 TABLE XXIII.—STADIA REDUCTIONS 4° 58 Hor. Vert. Dist. Dist. 60 Hor. Dist. 9.60 98.71 11.30 98.28 13.00 9.65 98.69 11.36 98.27 13.05 9.71 98.68 11.42 98.25 13.11 9.77 98.67 11.47 98.24 13.17 9.83 98.65 11.53 98.22 13.22 99.33 8.17 99.01 9.88 98.64 11.59 98.20 13.28 99.32 8.22 99.00 9.94 98.63 11.64 98.19 13.33 99.31 8.28 98.99 10.00 98.61 11.70 98.17 13.39 99.30 8.34 98.98 10.05 98.60 11.76 98.16 13.45 50 99.29 8.40 98.97 10.11 98.58 11.81 98.14 13.50 99.46 7.30 99.18 99.46 7.36 99.17 99.45 7.42 99.16 99.44 7.4899.15 99.43 7.53 99.14 99.42 7.59 99.13 99.41 7.65 99.11 99.40 7.71 99.10 99.39 7.76 99.09 99.38 7.8299.08 5° 99.38 7.88 99.07 99.37 7.9499.06 99.36 7.99 99.05 99.35 8.05 99.04 99.34 8.11 99.03 6° go 99.28 8.45 98.96 10.17 98.57 11.87 98.13 13.56 99.27 8.51 98.94 10.22 98.56 11.93 98.11 13.61 99.26 8.57 98.93 10.28 98.54 11.98 98.10 13.67 99.25 8.63 98.92 10.34 98.53 12.04 98.08 13.73 99.24 8.68 98.91 10.40 98.51 12.10 98.06 13.78 .75 .75 .06 .75 .07 .75 .08 .74 C = = 1.00 1.00 .08 1.00 C = 1.25 1.25 .10 1.24 с .10 .99 .II .99 .12 1.24 .14 I.24 Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. 8.68 98.91 10.40 98.51 12.10 8.74 98.90 10.45 98.50 12.15 8.80 98.88 10.51 98.49 12.21 8.85 98.87 10.57 98.47 12.27 8.91 98.86 10.62 98.46 12.32 8.97 98.85 10.68 98.44 12.38 9.03 98.83 10.74 98.43 12.43 9.08 98.82 10.79 98.41 12.49 9.14 98.81 10.85 98.40 12.55 9.20 98.80 10.91 98.39 12.60 9.25 98.78 10.96 98.37 12.66 9.31 98.77 11.02 98.36 12.72 9.37 98.76 11.08 98.34 | 12.77 9.43 98.74 11.13 98.33 12.83 9.48 98.73 11.19 98.31 12.88 9.54 98.72 11.25 98.30 12.94 .10 .13 .16 624 Minutes 12 14 16 18 20 222 02 46∞ 30 A w w w w w 32 17.10 17.16 96.36 18.73 96.34 | 18.78 98.06 13.78 97.55 15.45 96.98 98.05 13.84 97.53 15.51 96.96 98.03 13.89 97.52 15.56 96.94 98.01 13.95 97.50 15.62 96.92 17.26 96.29 18.89 8 98.00 14.01 97.48 15.67 96.90 17.32 96.27 18.95 97.98 14.06 97.46 15.73 96.88 17.37 96.25 19.00 17.21 96.32 | 18.84 | 10 | 34 36 28 97.97 14.12 97.44 15.78 96.86 17.43 96.23 | 19.05 97.95 14.17 97.43 15.84 96.84 17.48 | 96.21 | 19.11 97.93 14.23 97.41 15.89 96.82 17.54 96.18 19.16 97.92 14.28 97.39 15.95 96.80 17.59 96.16 19.21 97.90 14.34 97.37 16.00 96.78 17.65 96.14 19.27 22 97.88 14.40 97.35 16.06 96.76 17.70 96.12 19.32 24 97.87 14.45 97.33 16.11 96.74 17.76 96.09 19.38 26 97.85 14.51 97.31 16.17 96.72 17.81 96.07 19.43 97.83 14.56 97.29 16.22 96.70 17.86 96.05 19.48 97.82 14.62 97.28 16.28 96.68 17.92 96.03 19.54 97.80 14.67 97.26 16.33 96.66 17.97 96.00 19.59 97.78 14.73 97.24 16.39 96.64 18.03 95.98 19.64 | | 97.76 14.79 97.22 16.44 96.62 18.08 95.96 19.70 97.75 14.84 97.20 16.50 96.60 18.14 95.93 19.75 97.73 14.90 97.18 16.55 96.57 18.19 95.91 | 19.80 97.7114.9597.16| 16.61 | 96.55 18.24 95.89 19.86 97.69 15.01 97.14 16.66 96.53 18.30 95.86| 19.91 97.68 15.06 97.12 16.72 96.51 18.35 95.84 19.96 97.66 15.12 97.10 16.77 96.49 18.41 95.82 20.02 97.64 15.17 97.08 16.83 96.47|18.46 95.79 20.07 | | 97.62 15.23 97.06 16.8896.45 18.51 95.77 20.12 97.61 15.28 97.04 16.94 96.42 | 18.57 95.75 20.18 97.59 15.34 97.02 | 16.99 | 96.40 18.62 95.72 20.23 | 97.57 15.40 97.00 17.05 96.38 18.68 95.70 20.28 97.55 15.45 96.98 | 17.10|96.36|18.73|95.68 20.34 | 38 40 42 44 46 48 45 50 555 52 Our cry o 54 TABLE XXIII.—STADIA REDUCTIONS 8° 56 9° 10° Hor. Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. Dist. II° Hor. Vert. Dist. Dist. C = .75 .74 .II .74 .12 .74 .14 .73 .15 C = 1,00 .99 .15 .99 .17 .98 1.23 .18 .98 .20 C = 1.25 1.24 .18 1.23 .2I .23 1.22 .25 625 Minutes 02 46∞ рассаду росту рослинни 2 46 ∞ o 12 14 16 95.68 20.34 94.94 21.92 94.15 23.47 93.30 25.00 | 95.65 20.39 94.91 21.97 94.12 23.52 93.27 25.05 95.63 20.44 94.89 22.02 94.09 23.58 93.24 25.10 95.61 20.50 94.86 22.08 94.07 23.63 93.21 | 25.15 8 95.58 20.55 94.84 22.13 94.04 23.68 93.18 25.20 10 95.56 20.60 94.81 22.18 94.01 23.73 93.16 | 25.25 | 18 20 22 24 26 Over en en en in A☆ ☆ ☆ Awwww ww. 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 TABLE XXIII.—STADÍA RÉDUCTIONS 12° 60 с C C = 1.00 .75 = C = 1.25 13° 14° Hor. Vert. Hor. Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. Dist. Dist. Dist. .73 .16 .98 .22 I.22 .27 | 95.53 20.66 94.79 22.23 93.98 23.78 93.13 25.30 95.51 20.71 94.76 22.28 93.95 23.83 93.10 25.35 95.49 20.76 94.73 22.34 93.93 23.88 93.07 25.40 95.46 20.81 94.71 22.39 93.90 23.93 93.04 25.45 95.44 20.87 94.68 22.44 93.87 23.99 93.01 | 25.50 95.41 20.92 94.66 22.49 93.84 24.04 92.98 25.55 95.39 20.97 94.6322.54 93.82 24.09 92.95 25.60 – 95.36 21.03 94.60 22.60 93.79 24.14 92.92 | 25.65 95.34 21.08 94.58 22.65 93.76 24.19 92.89 25.70 95.32 21.13 94.55 22.70 93.73 24.24 92.86 25.75 95.29 21.18 94.52 22.75 93.70 24.29 92.83 25.80 95.27 21.24 94.50 22.80 93.67 24.34 92.80 25.85 95.24 21.29 94.47 22.85 93.65 24.39 92.77 | 25.90. 95.22 21.34 94.44 22.91 93.62 | 24.44 | 92.74 25.95 95.19 21.39 94.42 22.96 93.59 24.49 92.71 26.00 95.17 21.45 94.39 23.01 93.56 24.55 92.68 26.05 95.14 21.50 94.36 23.06 93.53 24.60 92.65 26.10 95.12 21.55 94.34 23.11 93.50 24.65 92.62 26.15 95.09 21.60 94.31 23.16 93.47 24.70 92.59 26.20 95.07 21.66 94.28 23.22 93.45 24.75 92.56 | 26.25 95.04 21.71 94.26 23.27 93.42 24.80 92.53 26.30 95.02 21.76 94.23 23.32 93.39 24.85 92.49 26.35 94.99 21.81 94.20 23.37 93.36 24.90 | 92.46 | 26.40 94.97 21.87 94.17 23.42 93.33 24.95 92.43 26.45 94.94 21.92 | 94.15 23.47 93.30 25.00 92.40 26.50 | | | 15° .73 .97 1.22 .18 .73 .23 .97 .29 1.21 .19 .72 .20 .25 .96 .27 •31 1.20 .33 626 Minutes 02 46∞ jong pang pH 22 24 26 28 30 ♡ ♡ ♡ M4 2 46∞ O 92.40 26.50 91.45 27.96 90.45 29.39 89.40 30.78 92.37 26.55 91.42 28.01 90.42 29.44 89.36 30.83 92.34 26.59 91.39 28.06 90.38 29.48 89.33 30.87 | 92.31 26.64 91.35 28.10 90.35 29.53 89.29 30.92 8 92.28 26.69 91.32 28.15 90.31 29.58 89.26 30.97 10 92.25 26.74 91.29 28.20 90.28 29.62 89.22 31.01 32 34 36 38 20 12 92.22 26.79 91.26 28.25 90.24 29.67 89.18 31.06 14 92.19 26.84 91.22 28.30 90.21 29.72 89.15 31.10 16 92.15 26.89 91.19 28.34 90.18 29.76 89.11 31.15 18 92.12 26.94 91.16 28.39 90.14 29.81 89.08 31.19 92.09 26.99 91.12 28.44 90.11 29.86 89.04 31.24 92.06 27.04 91.09 28.49 90.07 29.90 89.00 31.28 92.03 27.09 91.06 28.54 90.04 29.95 88.97 31.33 92.00 27.13 91.02 | 28.58 | 90.00 30.00 88.93 31.38 91.97 27.18 90.99 28.63 89.97 30.04 88.89 31.42 91.93 27.23 90.96| 28.68 | 89.93 30.09 | 88.86 31.47 91.90 27.28 90.92 28.73 89.90 30.14 88.82 31.51 91.87 27.33 90.89 28.77 89.86 30.18 88.78 31.56 91.84 27.38 90.86 28.82 89.83 30.23 88.75 31.60 91.81 27.43 90.82 28.87 89.79 30.28 88.71 31.65 91.77 27.48 90.79 28.92 89.76 30.32 88.67 31.69 91.74 27.52 90.76 28.96 89.72 30.37 88.64 31.74 91.71 27.57 90.72 29.01 89.69 30.41 88.60 | 31.78 91.68 27.62 90.69 29.06 89.65 30.46 88.56 31.83 91.65 27.67 90.66 29.11 89.61 30.51 88.53 31.87 91.61 27.72 90.62 29.15 89.58 30.55 88.49 31.92 91.58 27.77 90.59 29.20 | 89.54 30.60 88.45 31.96 91.55 27.81 90.55 29.25 89.51 30.65 88.41 32.01 91.52 27.86 90.52 29.30 89.47 30.69 88.38 32.05 91.48 27.91 90.49 29.34 89.44 30.74 88.34 32.09 91.45 27.9690.45 29.39 89.40 30.78 88.30 32.14 .72 .23 .7I .24 .7I .25 40 42 44 46 48 50 TABLE XXIII.-STADIA REDUCTIONS 16° 52 54 56 58 бо 17° 18° 19° Hor. Vert. Hor. Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. Dist. Dist. Dist. C = .75 .72 .21 C = 1.00 .96 .28 .95 ⚫30 .95 .32 C = 1.25 1.20 .36 1.19 .38 1.19 .40 •94 .33 .42 1.18 627 Minutes 0246∞ 12 14 16 1.18 20 J 22 24 26 28 genereren er A ☆ ☆ ☆ â wwww w 30 88.30 32.14 87.16 33.46 85.97 34.73 84.73 35.97 88.26 32.18 87.12 33.50 85.93 34.77 84.69 36.01 88.23 32.23 87.08 33.54 85.89 34.82 84.65 36.05 88.19 32.27 87.04 33.59 85.85 34.86 84.61 36.09 8 88.15 32.32 87.00 33.63 85.80 34.90 84.57 36.13 10 88.11 32.36 86.96 33.67 85.76 34.94 84.52 36.17 36 38 40 42 56 58 бо TABLE XXIII.—STADIA REDUCTIONS 20° 21° 22° 23° Hor. Vert. Hor. Vert. Hor. Vert. Hor. Vert. Dist. Dist. Dist. Dist. Dist. Dist. Dist. Dist. C = .75 C= 1.00 .94 .35 .93 C = 1.25 1.17 .44 1.16 88.08 32.41 86.92 33.72 85.72 34.98 84.48 36.21 88.04 32.45 86.88 33.76 85.68 35.02 84.44 36.25 88.00 32.49 86.84 33.80 85.64 35.07 84.40 36.29 87.96 32.54 86.80 33.84 85.60 35.11 84.35 36.33 87.93 32.58 86.77 33.89 85.56 35.15 84.31 36.37 87.89 32.63 86.73 33.93 85.52 35.19 84.27 36.41 87.85 32.67 86.69 33.97 85.48 35.23 84.23 36.45 87.81 32.72 86.65 34.01 85.44 35.27 84.18 36.49 87.77 32.76 86.61 34.06 85.40 35.31 84.14 36.53 87.74 32.80 86.57 34.10 85.36 35.36 | 84.10 36.57 87.70 32.85 86.53 34.14 85.31 35.40 84.06 36.61 87.66 32.89 86.49 34.18 85.27 35.44 84.01 36.65 87.62 32.93 86.45 34.23 85.23 35.48 83.97 36.69 87.58 32.98 86.41 34.27 85.19 35.52 83.93 36.73 87.54 33.02 86.37 34.31 85.15 35.56 83.89 36.77 87.51 33.07 86.33 34.35 85.11 35.60 83.84 36.80 87.47 33.11 86.29 34.40 85.07 35.64 83.80 36.84 87.43 33.15 86.25 34.44 85.02 35.68 83.76 36.88 87.39 33.20 86.21 34.48 84.98 35.72 83.72 36.92 87.35 33.24 86.17 34.52 84.94 35.76 83.67 36.96 87.31 33.28 86.13 34.57 84.90 35.80 83.63 37.00 87.27 33.33 86.09 34.61 84.86 35.85 83.59 37.04 87.24 33.37 86.05 34.65 84.82 35.89 83.54 37.08 87.20 33.41 86.01 34.69 84.77 35.93 83.50 37.12 87.16 33.46 85.97 34.73 84.73 35.97 83.46 37.16 .26 .70 .70 .27 .69 .29 .69 .37 .92 .38 .92 .46 1.15 .48 .30 .40 1.15 .50 628 Minutes 12 14 16 18 20 02 46∞ 28 2 3 32 34 36 38 83.46 37.16 82.14 38.30 80.78 39.40 79.39 40.45 83.41 37.20 82.09 38.34 80.74 39.44 79.34 | 40.49 83.37 37.23 82.05 38.38 80.69 39.47 79.30 40.52 83.33 37.27 82.01 38.41 80.65 39.51 | 79.25 | 40.55 8 83.28 37.31 81.96 38.45 80.60 83.24 37.35 81.92 38.49 80.55 83.20 37.39 81.87 38.53 80.51 83.15 37.43 81.83 38.56 80.46 10 39.58 39.54 79.20 | 40.59 79.15 | 40.62 79.11 40.66 39.65 79.06 | 40.69 39.61 22 83.11 37.47 81.78 38.60 80.41 39.69 | 79.01 | 40.72 83.07 37.51 81.74 38.64 80.37 39.72 78.96| 40.76 83.02 37.54 81.69 38.67 80.32 39.76 78.92 40.79 82.98 37.58 81.65 38.71 80.28 39.79 78.87 40.82 82.93 37.62 81.60 38.75 80.23 39.83 78.82 40.86 26 82.89 37.66 81.56 38.78 80.18 39.86 78.77 40.89 82.85 37.70 81.51 38.82 80.14 39.90 78.73 40.92 30 82.80 37.74 81.47 38.86 80.09 39.93 78.68 40.96 24 40 42 FOOD AT000 48 50 46 82.76 37.77 81.42 38.89 80.04 39.97 78.63 40.99 82.72 37.81 81.38 38.93 80.00 40.00 78.58 41.02 82.67 37.85 81.33 38.97 79.95 40.04 78.54 41.06 82.63 37.89 81.28 39.00 79.90 40.07 78.49 41.09 82.58 37.93 81.24 39.04 79.86| 40.11 78.44 41.12 82.54 37.96 81.19 39.08 79.81 40.14 78.39 41.16 44 82.49 38.00 81.15 39.11 79.76 40.18 78.34 41.19 82.45 38.04 81.10 39.15 79.72 40.21 78.30 41.22 82.41 38.08 81.06 39.18 79.67 40.24 78.25 41.26 82.36 38.11 81.01 39.22 79.62 40.28 78.20 41.29 82.32 38.15 80.97 39.26 79.58 40.31 78.15 41.32 82.27 38.19 80.92 39.29 79.53 40.35 78.10 41.35 82.23 38.23 80.87 39.33 79.48 40.38 78.06 41.39 82.18 38.26 80.83 39.36 79.44 40.42 78.01 41.42 82.14 38.30 80.78 39.40 79.39 40.45 77.96 41.45 .68 .3I .68 .32 .67 .33 .67 .35 .4I .90 .43 .89 .45 .89 .52 1.13 .54 I.12 .46 .56 I.II .58 52 gur er en in 54 56 58 бо TABLE XXIII.-STADIA REDUCTIONS C = .75 C = 1.00 C = 1.25 24° 25° .91 1.14 26° 27° Vert. Hor. Vert. Hor. Vert. Hor. Vert. Hor. Dist. Dist. Dist. Dist. Dist. Dist. Dist. Dist. 629 Minutes 02 46∞ 8 10 12 £2 24 26 28 30 32 34 36 34 38 40 42 44 gen er en en in A☆☆ 46 48 50 52 56 58 60 C= .75 C = 1.00 C = 1.25 TABLE XXIII.-STADIA REDUCTIONS 28° Vert. Hor. Dist. Dist. 77.96 41.45 77.91 41.48 77.86 41.52 77.81 77.77 77.72 41.55 41.58 41.61 77.33 41.87 77.28 41.90 77.23 41.93 76.20 77.67 41.65 77.62 41.68 76.15 77.57 41.71 76.10 77.52 41.74 76.05 77.48 41.77 76.00 77.42 41.81 75.95 77.38 41.84 Hor. Vert. Dist. Dist. 76.50 76.45 76.40 76 35 76.30 76.25 29° .88 .48 I.10 .60 42.40 42.43 42.46 42.37 75.05 42.40 75.00 .36 .65 .87 1.09 42.49 42.53 42.56 | 74.75 42.68 42.71 43.04 43.07 76.94 42.12 75.45 76.89 42.15 75.40 76.84 42.19 75.35 43.10 76.79 42.22 75.30 43.13 76.74 76.69 76.64 42.31 75.15 42.34 75.10 76.59 76.55 76.50 .66 30° Hor. Vert. Dist. Dist. 42.59 74.70 42.62 74.65 42.65 74.60 75.00 43.30 74.95 43.33 74.90 74.90 43.36 74.85 43.39 74.80 43.42 43.45 42.74 42.77 75.90 75.85 74.34 43.67 42.80 75.80 42.83 74.29 43.70 75.75 42.86 | 74.24 43.73 77.18 75.70 42.89 41.97 77.13 42.00 75.65 74.19 43.76 42.92 74.14 43.79 77.09 42.03 75.60 42.95 42.06 75.55 76.99❘ 42.09 75.50 77.04 74.09 43.82 42.98 74.04 43.84 43.01 73.99 43.87 .37 .49 .62 43.47 43.50 43.53 74.55 43.56 74.49 43.59 73.93 43.90 73.88 43.93 73.83 43.95 73.78 43.98 42.25 75.25 43.16 73.73 42.28 75.20 43.18 44.01 43.2I 43.24 73.68 44.04 73.63 44.07 73.58 44.09 43.27 73.52 44.12 43.30 73.47 44.15 74.44 43.62 74.39 43.65 .65 .38 .86 .5I 1.08 .63 630 American Railway Engineering Association PLAN NO. 910-41 Properties of Switches Col. Col. Col. Col 2 (3) 4 Frog Number Length of 5 Switch Rail TABLE XXIV.-TURNOUT AND CROSSOVER DATA Ft In Switch Angle Actual Lead Closure Distance Col. 5 Straight Closure Rail TURNOUT AND CROSSOVER DATA FOR STRAIGHT SPLIT SWITCHES Adopted March, 1941. Supersedes Plan No. 900, Revised March, 1934. Col. 6 Curved Closure Rail Ft In 28-4 33-0 Lead Curve Col. 7 Radius of Center Line Col. 8 Degree of Curve Col. 9 Gage Line Offsets Col. 10 Col. Θ Col. Col (11) (12) (13) Col. Col. Col. (14) (15) 16 Tangent adjacent to Switch Rail Tangent adjacent to toe of Frog 0 / 11 Ft In Ft In Feet 0 / 11 Ft In Ft In Inches Inches Ft In Feet Feet 28-0 177,80 32-39-56 18-0 5 11-0 2-39-34 42-6 611-02-39-34 47-6 Ft In 25-0 32-0 | 11 11202-8 0.00 0.78 32-9 258.57 22-17-58 19-2 27-4 35-62 12 21 2-10 0.00 1.75 7 16-6 1-46-22 62-1 40-102 41-136559 15-43-16| 26-21|35-10 45-6 11 19 2-6 0.01 0.00 8 16-6 1-46-22 68-0 46-5 46-72 487.2811-46-44 27-738-8 49-9 11 20 2-8 916-6 1-46-22 72-3½ 49-5 49-74 615.12 9-19-30 28-1041-253-62 12 212-9, 0.00 0.17 ΤΟ 16-6 1-46-22] 78-9 55-10 56-0 779.39 7-21-24 29-1 12 43-556-111211 21 2-8 2.08 0.00 | 0.64 0.00 B 3 II 22-01-19-46 91-10 12 7 62-1063-0 92 7.27 6-10-56 37-853-5 69-112212-93 0.00 0.1 3 22-01-19-461 96-8 66-102 67-0 1104.63 5-11-20 38-855-5 72-1글 ​12급 ​21층 ​2-9급 ​0.00 0.50 14 22-01-19-46 107-076-576-63158 1.20 3-37-28 41-1460-279-32 12 22 2-10 0.24 0.00 15 | 30-00-58–30 126-4½ 86-11 87-01720.77 3-19-48 51-9 73-6 95-3 12 212-93 1.56 0.00 30-0 0-58-30 131-4 91-11 30-0 0-58-30 140-11299-11 20 30-0 0-58-30 151-11½ 110-11 16 18 92-0 2007.12 2-51-18] 53-0 100-0 2578.79 2-13-201 55-0 111-0 3289.29 1-44-32 57-9 76-0 99-0 80-0 105-0 85-6 113-3 12 21 2-10 0.66 0.00 121222-10 0.57 0.00 13% 222-11 2.47 0.00 631 Frog Number 557 Properties of Frogs Col. 17 0 / 11 5 11-25-16| 6 18 20 Frog Angle TABLE XXIV.-TURNOUT AND CROSSOVER DATA Col. 18 Overall Length Col. 19 Ft Toe Length Ft Col. Col. Col. (20 (21) (22) In. 3-6 1/2 3-9 4-8/2/2 5-1 꼬 ​Heel Length In. Inches Inches Ft 9-0 5-571316-10 9-31-38 10-0 6-3 8-10-16 12-0 7 13 20-52/2 7-3 7/13 24-0큽 ​7-11 7급 ​12층 ​27-7ㅎ ​9-72 8 13/631-13/ 8 7-09-10 13-0 9 6-21-35 16-0 5-43-29 16-6 5-12-18 18-822 6-42 6-5 10-1 10 7층 ​12층 ​34-8ㅎ ​│ 7ㅎ ​13 38-2늘 ​7-01 11-8 7-9글 ​12-6일 ​12 4-46-19 20-4 7 13 41-8층 ​14 1348-94 7 15 18 15 4-05-27 23-7 8-7글​14-11호 ​6급 ​3-49-06 24-49-5 14-11/2/27 12/6 52-3/7/20 163-34-47 26-0 9-5 16-7 6% 12 55-9홉 ​3-10-56 29-3 | 11-01/ 11-0호 ​18-2호 ​6급 ​12동 ​62-9 급 ​30-10½|| 11—0—2 6급 ​12층 ​69-10 16 2-51-51 19-10 Toe Spread Heel Spread F+ In. 13-0" Track Centers Col. (24) Col. (23 Data for Crossovers Straight Crossover Track Track In. Ft In. 18-1 3/23 For change of 1-0 in Track Centers 6 Straight Crossover Track Track Ft In. 4-1116 21-62 5-11호 ​24-11층 ​6-1116 28-4급 ​7-1195/55 31-103/ 8-11 35-3급 ​9-11 16 10-11 3/4 38-9호 ​42-34 11-1144 49-21 13-11 52-8 14-1116 56-21/2/2 15-1118 63-217-1 | 13 16 70-2 19-11 금 ​20-01/1 6 FI In. TO 13 5-02 8 6-01/2 7-06 8-03-2 9-08 10-016 11-01/1/00 12-04/ 14-04 15-03 16-0 18-0 632 1/8" POINT OF SWITCH LENGTH OF SWITCH RAIL SWITCH ANGLE 3 2 9 TABLE XXIV.-TURNOUT AND CROSSOVER DATA HEEL SPREAD 6-1/4" C. (12) STRAIGHT CLOSURE RAIL TANGENT ADJACENT TO SWITCH RAIL (10) 15 13 NOTES ACTUAL LEAD IT CURVED CLOSURE RAIL RAD. RADIUS OF CENTER LINE (7) 1. TURNOUTS AND CROSSOVERS RECOMMENDED For main line high speed movements, No. 16 or No. 20. For main line slow speed movements, No. 12 or No. 10. For yards and sidings, to meet general con- ditions, No. 8. TANGENT ADJACENT TO TOE OF FROG TOE SPREAD 2. The data shown are computed for turnouts out of straight standard 4' 8½" gage track. If the wheel base of the equipment used requires wider gage for the switch alinement or curvature shown, the lead and alinement of curved closure rail shall be maintained, and inside stock and curved rails shall be moved out the necessary amount. The gage of straight track through switch will then be increased and the straight (14) (21) P. T. TOE LENGTH 19 ~1/2" POINT OF FROG HEEL LENGTH 29 OVERALL LENGTH( STRAIGHT (18) 23 HEEL SPREAD 22 17 FROG ANGLE 29. 1/2" POINT OF FROG closure rail shall be bent to true alinement in advance of toe of frog. 3. FROG DESIGNS For short spring rail type frogs, the straight closure, and for solid manganese frogs, the straight and curved closures, shall be lengthened to conform. 4. MODIFICATION OF ALINEMENT The alinement specified may be used without appreci- able wear for switch points made in accordance either with Detail 4000 (thickness of point-14"), or with Detail 5000 (thickness of point-0"). 5. For length of closure rails, see Plan Basic No. 911. 6. For bills of timber for various turnouts and crossovers see Plan Basic No. 912. TRACK CENTERS 633 American Railway Engineering Association LOCATION OF JOINTS FOR TURNOUTS WITH STRAIGHT SPLIT SWITCHES PLAN NO. 911-41 Adopted March, 1941. Supersedes in part Plans No. 901 to 908 Incl., Revised March, 1934. Frog Number Length of Switch Rail 5111-0 6 7 8 9 10 # Toe Length to ½ Pt. T TABLE XXIV.-TURNOUT AND CROSSOVER DATA # Lead PS.to Pt Straight Rail Curved Rail Rail "A" Rail "B" | Rail "C" Rail"D" Rail "E" Rail"F" 11'-0": 16-6" 16′6″ 5'-1" 19-6" 8-98 19'-6" 13-5 27-0″ | 14-0}" | 27-019-7 27-0" 22-6" 25-11 30-0" 39-0″ 123-117″. 39-0" 27-113 16-6" 6-47″ 16-6" 6-5" 78-9 39-0" 27′10″ | TE 22:0" 7:0* 91-10 12 22-0* 7-9 96-8" 14 22-0 8-7" 107-02″ 30-0″ 16-5″ 30-0″ 30-0" 19-62 7-0″ 15 30-0" 9-5 16 30-0 39-0″ 9-5* 126-439-0" 33-0" 14-11-133-0" 24-030-0′ 33-0" 30-01 131-433-0"|33-0" 125-11" 133-0" 19-1139-0" 33-0" 33-0" 18 | | 30-0″ 11-0½″ 140-11" 39-033-0" 27-11″ 39-0″ 33-0″ |27-1137_39-0″ 39-0′ 20 30-0 1 1-0 2" || 15 1-11" 39-0" 39-0" 32-11" 39-0" 39-0" 32-11"_30-0" 30-0 30-0" " 3-6 42-6" 28-01 32-97 3-9" 47-6″ 4-8 62-1" 27-013-102″ 68-0" 30-0 16-5" 72-3″ 30-0"| 19-5" 33′ 0″ 22-10 39-0 23-10 " NOTES 1. Type "L" turnouts are for general use, except for No. 5 and 6 turnouts. 2. Alternate Type "S" turnouts are for use with No. 5 and 6 turnouts, and where limited space requires location of joints ahead of switch nearer to switch point. 3. Insulated joints shown thus on plans are located to conform to AAR Signal Section Plans No. 1634-B, 1635-B and 1637-B, approved in July, 1937, and if other rail lengths are used, the stagger of the joints must not exceed 4'6". Closure Rails Length in Feet and Inches CLOSURE RAILS AND JOINT LOCATION FOR RIGHT HAND TURNOUT TYPE "L" 30 Turnout Rails Length in Feet and Inches # 4. Rail lengths provide for 8" end posts at insu- lated joints. 5. For additional turnout data see Plan Basic No. 910. $ 6. For bills of timber for various turnouts see Plan Basic No. 912. * Distances from stock rail joints to point of switch are 13′11″ on curved stock rail; 12′3″ on straight stock rail. These distances are reversed for left hand turnouts. (See sketch on next page.) Straight Rail Curved Rail Rail"G" Rail"H" Rail "J" Rail"K" Rail"M" Rail N° 15-01 15-0 19-6* 15-01 27-01 16-0' 30-01 19-6" 33-0' 16′-0″] 19-6" 39-0 16-0" 27-0" 33'-0" 33-0" 16-6″ 19-6' 16-6" 19-6" 27-019-6" 19-6" 39-0" 33-033-0" 19-6" 27-0" 19-630-0" 33-0" 39-0″ Straight Stock Rail Curved Stock Rail Plus Stagger 30′-0″| 30′0″|_1-3; 30-0" 30-0" 1 - 17″ 39-0″ 39-0″| 39-0″ 39-0″| 1-5 39-0 39-0" 39-0 39-0*| 60-0″ 60-0″ 1-10 60-0" 60′-0″| 1-10 60-0" 60-0" 1-9 60-0"| 60-0″| 2-9 60-0" 60-0" 60-0" 60-0″ 60-0″| 60-0″| " Minus Slogger Lap"X" Lap*Y* 10-107.1 9-94″ 15-1087|10-3° 1-11 20-6 8-4″ 23-07 11-3″ 2-0211-44" 12÷6+1 1-1" 10-4" | 13-0″] 9'-5" 11-1"] 14-315-11" 14-2 20-3 21-615-7 3-81119-0117-7″ | 3-315-2″ 15-2-″ 3-319-214-27 634 12-3- Point of Switch- 13-11- Frog Number Length of Switch Rail Toe Length · td 201 Curved Stock Rail Type "L" Switch Rail Switch Rail Straight Stock Rail Type L' Lead PS. to Pt # 3-9* 47-6 32-9″ TABLE XXIV.-TURNOUT AND CROSSOVER DATA Plus Stagger · • 140-11 151-117" Rail K Rail 'A' Minus Stagger; · Rail D' Closure Rails Length in Feet and Inches Rail "G" " Straight Rail Curved Rail Straight Rail Curved Rail 5 11-0° 3-6 42-6 Rail A Rail "B" Rail"C" Rail"D" Rail E Rail "F" Rail G Rail H Rail J Rail K Rail"M" Rail"N"] 28-0″ 19-6° 15-07 6 11-0 19-6 15-0* 7 16-6 27-0" 16-0 8 4-84" 16-6 5-1" 6-4 19-6" 8-9 19-613-5 25-01″ 16-0" 27-0" 19-75″ 27-022-677 25-1130-0' 23-11139-0" 33-0" 9 62-1" | 27-0″ | 1340 | 68-0 27-0" 19-5" 72-3+ 30-0″ 19-5 78-9″ | 30′0″ |25-10″ 91-101″ 39-0″ |23-101 16-6" 33-0" 16-0″ 16-019-6" 10 16-6* 6-5" 39-0″ 11 22:0" 7-0° 7-9 16-6" 27-0" 33-0" 33-0" 12 22-0 1422-0" 39-0* 96-8* 39-0 27-101 39-0" 27-11" 8-7" 107-07 30-0″ 30-0" 16-5" 16-627-0" 33-0" 9-5° | 126-41 15 30-0" 19-6" 30-0″. 33-0° 33′0″ 20-11" 30-0" 18-0" 39-0 33-0" 33-0" | 9-5131-4" 33-0" 33-0" 25-11" 33-0" 19-11 39'0" 16 18 30-0* 39′0″ 30-0* 30-0″ | | 11-0 39-0" 33-0" 27-11" 39-0" 33-0" 27-11" 39′-0″ 39-0" | | | | 30-011-0 30-0" 30-0" 30-0" 20 39-0" 32-11" 39-0" 39-0" 39-0" 32-11 Rail M 事​馨 ​Rail *B* " Lead Rail E Rail*H* Turnout Rails Length in Feet and Inches Rail "N · CLOSURE RAILS AND JOINT LOCATION FOR LEFT HAND TURNOUT TYPE L Rail *C* N Rail 'F' Rail J |_ Lap "X" 16-6" 19-6" 19-6" 27-0" 33-0" 30-0" 33-0" 33'-0" 19-6° 27-0" 33-0″| 60-0″|| 60-0″ 19-6" 30-0" 39-0"| 60-0" 60-0" Lapy 30-0″ | 30-0″ 30-0"|30-0" 39-039-0" 39-039-0" 39-0" 39-0" 39-0" 39-0″ 1-00 60-0" 60-0". 2-0 60-0" 60-0") 3-6 60-0″ 60-0" 1-11-27 60-0" 60-0" 2-11 60-0″ | 60-0* 3″ 2-17 2-97 1-7 "Point of Frog 9-2 6-11 14-21-17 18-10 10-0° 4 24-10 9-11" 421 9:814-2 8-214-8" 10-912-91 12-71-7" 12-61-571 15-4814-371 2-0 17-416-3′ 1-713-616-10 1-73" 17-6" 15-10" 635 American Railway Engineering Association LOCATION OF JOINTS FOR TURNOUTS WITH STRAIGHT SPLIT SWITCHES Frog Number Length of 56 PLAN NO. 911-41 Adopted March, 1941. Supersedes in part Plans No. 901 to 908 Incl., Revised March, 1934. 14 15 16 18 20 | 1'-0" 11-0"| 16-6" 16-6" 16-6" 7 8 9 10 || 12 22-0" to ½" Pt. 普遍 ​5'-1 6-45 6-5" 16-6" 22:0″ 7-0" W TABLE XXIV.-TURNOUT AND CROSSOVER DATA W Lead PS.to "Pt. # 11 3-6 42-6" 28'-0" 3'-9" 47-6" 32-9" 16-0" 4-83" 62-1" 27-0″ 13-10-2 19-6″ 19-6″ 27-0" 68-0" 27-0" | 19-5" 72-3" 30-0" 19-5" 78-933-0" 22-10" 91-1023-1039-0" 33-0" 27-0″ 7-9 30-0" 39'-0" 22-0" 30-0* 30-0" 27-0" 96-8" 39-0" 12 7-10-2 8-7 107-0 30-0" 16-530-0" 22-63" 27-0" 27-0 126-439-0″ |33-0" |14-11-139-0" 18-0" 30-0" 9'-5 9-5131-4" 133-0" 33-0" 25-11" 39-0" 19-11 33-0" 30-0" 30-0" 30-0" | 1'-0"|40-11" 39-0" |27-11″ 33-0" 39-0" 33-01 27-11 33-0"| 39-0" 30-0″| |1′04″ 15 1-114″ 39-0″ 39′0″ |32-11″ | 39′0″ |39-0″ |32-11" 30-0* KAJ NOTES 1. Type "L" turnouts are for general use, except for No. 5 and 6 turnouts. 2. Alternate Type "S" turnouts are for use with No. 5 and 6 turnouts, and where limited space requires location of joints ahead of switch nearer to switch point. 3. Insulated joints shown thus on plans are located to conform to AAR Signal Section Plans No. 1634-B, 1635-B and 1637-B, approved in July, 1937, and if other rail lengths are used, the stagger of the joints must not exceed 4′6″. CLOSURE RAILS AND JOINT LOCATION FOR RIGHT HAND TURNOUT TYPE "S" Closure Rails Length in Feet and Inches 13-315-0" 13-519-6" 18-0123-0* 30-0" 16-7 30-0" 19-6 5/ Straight Rail Curved Rail Straight Rail Curved Rail • Rail "A" Rail "B" | Rail"C" | Rail "D′| Rail "E′| Rail"F" | Rail"G″| Rail"H"] Rail "J' Rail"K" | Rail"M" | Rail"N" 30-0 25-11 29-11 33-0" 27-11 39-0"| Turnout Rails Length in Feet and Inches # # 4. Rail lengths provide for 38" end posts at insu- lated joints. 5. For additional turnout data see Plan Basic No. 910. 16-0" 19-6*| 16-0″] 16-0″ 16-0"| 19-6″ 27-0° 6. For bills of timber for various turnouts see Plan Basic No. 912. 33-0" 19-6″| 19-6′ 33-0 27-0″. * Distances from stock rail joints to point of switch are 7′3″ on curved stock rail; 5′7″ on straight stock rail. These distances are reversed for left hand turnouts. (See sketch on next page.) Straight Stock Rail Han 30-0" 30-0" 30-0"|30-0"| 39-0" 39-0"| 39-0″ 39-0″ 39-0"|39-0" 39-039-0" 60-060-0" 60-0" 60-0" | 60-060-0" 60°0*160-0" 60-0" 60'-0" 19-6" 39-0" 3-5" 19-6" 33-0" 19-6″ 60-0" 160-0"| 3-4 30-0″| 30-0″ 19-6 19-6" 27-0" 39-0" 60-0" | 60-0" 3-4 Curved Stock Rail Plus Stagger 1'-8" 1-72/" 1-63 1-0 3-0" 1173 [12]] Minus Stagger Lap*x* . 1119-218-17] 1'-3' 8-2 2-5″ 10-4" Lap*y* 7-1" 9-2″ 19-107 15-1" 2. 24-2211-10 ✔ 1-2 12-4 11-910-5-1 10-712-3" 15-013-7 1·0%" 13-4714-1131 19-10" 16-11 16-014-6 13-618-01 U 636 Frog Number Length of Switch Rail Point of Switch- 7-3" 18 20 5-7″- " Toe Length to ½ Pt. 3'-6" 3-9" 4-8" # T Curved Stock Rail Type "S" Switch Rail TABLE XXIV.-TURNOUT AND CROSSOVER DATA Switch Rail Straight Stock Rail Type "S' Lead PS to Pt Minus Stagger 42-628-0″ 47-6" 132-9″ 62-1" 27-0″ 13-102″ 68-0" 27-0" 19-5″ 72-330-0" | 19-5" 78-9" 133-0" 22-10" 91-1023-1039-0" Rail K Rail "A" Rail "D" Rail *G* Closure Rails Length in Feet and Inches Straight Rail Curved Rail Rail"A" Rail "B" | Rail "C" | Rail "D" Rail *E' S 11-0″] 6 1 1'-0" 16-0" 7 16-6" 13-3 15-0 13-5119-6" 16-0" 25-07″ 30-0" 16-7 33′-0″ 16-6 19-6" 8 16-6″| 5-1 19-6″ 9 16-6" 6-4 27:0" 10 16-6" 6-5" 33-0" || 22-0"1 7'-0" 30-0" 25-113" 29-11 33-0" 30-019-6" 19-6" 12 22-0" 7-9½" 96-8" 39-0″ |27-10½) 14 22'-0" 22-627-0' 8-7½″ | 107-03″ 30-0″ | 16-530-0" |22′6″| 27-0″ |27-0″ 15 30-0" 9:5" 17-5" 30-0" 39-0" 30-0"| 27′-0″ · 30-0" 9'-5" 131-4" 33-0" 33-01 33-0° 25-11" 39-0" 19-1133-0 33-0" 39-0" 126-439-0" 33'-0" | 14-11" 39-0" 18-030-0" 16 30-0" 11-01" 140-112″ 39′-0″ |27-11″ 33-0"|39-0" 33-0" 27-11" 33-0" | 39-0″ 30-0 11-02 151-11" 39-0″ 39-0" 32-11" 39-0"|39-032411 30-0" 30-0" 5/1 Plus Stagger Rail M Rail "F" Rail "B" Rail E Rail *H* Lead CLOSURE RAILS AND JOINT LOCATION FOR LEFT HAND TURNOUT TYPE "S C Turnout Rails Length in Feet and Inches Rail "N" # 15-0″ 19-6" 16-0" 16-6" 16′-0″| 16-6″ 27-0 Straight Rail Curved Rail Rail "G" | Rail"H" Rail "J" | Rail "K" || Rail"M" | Rail "N" 30-0* 19'-6" 1 9-6″ 33-0" 19-6" 16-6″ 39-0" 16-6 " Rail C Rail "F* 19-6′ 16-6" 28-0" Rail *J* Lap"X" + 33-0" 19-6"] 60-0″ | 60-0″ 28-0″ 39-0″| 60-0″ | 60-0″ Lapy" 30-0" 30-0"i 30-0" 30-0" 39-0" 39-0"| 93 39-0″ | 39-0″ 3-4 39-0" 39-0" 39-0" 39'-0" 3-22 60-0" 60'-0" 2-8 60-060-0" 60-0" 60'-0" 60-0" 60-0″ | 60'-0" 60-0" 2-76 2-71 78 F 87 GIB 5" 2'-1" 2:0 2-0 *Point of Frog 17-6119-9 9" 7-6 8-9 1-3" 8-8 10-10″ | 18-216-9" 22-013-6 12-6" 14'-0" 10-112-1 11-1113-11" | 13-415-3 19-216-7½" 21-218-7" 1 7-4″ | 16-2+ 13-10% 19-8 +″ 637 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. 22. 23. 24. 25. 26. 27. L sin A = cos A = tan A = cot A = sec A = TABLE XXV.-TRIGONOMETRIC FORMULAS A csc A = H = a b с a b ام b a vers A 1 tan A = с b с a General Formulas covers A = coexsec A = exsec A = sec A - vers A = C B- る ​1 In the right-angled triangle ABC, let AB = c, BC= a, CA = b. O sin A COS A cos A cot A = sin A cos A - a a C a = a cos A = 2 cos² 1 A 2 K 1 sin A = 2 sin 1A cos 2 D 1 = = - חח E C - b vers B ព G 2 b = exsec B b = covers B sin 2A 1 + cos 2A sin 2A cos 2A cos Asin A tan A = V 1 = 21. coexsec B 1 = 1 - 2 sin² 1 2 2 vers 2A sin 2A sin 2A vers 2A Let A = angle BAC = AF = AB = AH = 1. exsec A = sec A 1 = tan A tan 2 sin A = BC A cos A = AC tan A = DF A = vers A = CF = BE exsec A = BD Area = chord A = BF 11. 12. 13. 14. 15. 16. 17. 18. 19. 20. 1 ab 2 = 2 sin² 1A 2 vers A cos A tan 1 A 2 b = C = a = c sin A = C = a = arc BF, and let radius Then, C = = a cos B cos² A = tan A cos A A = cos² 1A 2 b = √ c² c cos A = b = c sin B = and If a b sin A cos A a = c cos B = b cot B - coexsec A = BG Va + covers A = BK = LH chord 2 A = BI = 2 BC CF vers A BC sin A c² b2 csc A = AG sec A = AD cot A = HG a² sin² 1A 2 - b tan A b sin B a cot A = = C = 90° = A + B Then, a tan B vic - b) (c + b) √(c − a) (c + a) 638 No. 28. 29. 30. 31. 32. 33. 34. 35. 36. 37. 38. 39. Given A, B, a A, a, b TABLE XXV.-TRIGONOMETRIC FORMULAS C, a, b a, b, c Sought C, b, c 1 2 Area B, C, c Area с (A + B) 1 (A - B) 2 A, B O Area A Area A C = 180° b = Area = sin B = Area = A = C = C = H2H sin 1 B = 2 COS tan C = 1 Area = 2 sin A a C = 180° 1 tan (A B) 2 Let s = 1 2 c =Va² b2 1 (A + B) = 90° - 2 - B b (A + B) 1ab sin C 2 a sin A sin A = A = cos A = (a + b) x A = 1 A = 2 a (A + B) a × sin (A + B) = sin A sin A (A + B) + 1ab sin C 2 x b G × sin B #1 Area = V S(S 2ab cos C 1c × sin C 1ab sin C 2 a + b + C 2 (S (A + B) S(S (s COS 2 Vs(s « 12 1 2 a a + b C 11 09 2 - M bc (A COS (A + B) a2 sin B sin C 2 sin A b (A b² + c² a2 2bc } s(s www Formula b) (s bc a) C x tan // (A - B) - B) B) - b) (s c) a) a) (s bc - C) 2 a sin A (A + B) = (a - b) × b) (s S a) (s - b) (8 - c) × sin C c) sin (A + B) sin(A - B) 639 No. Squares. HOM➡UW N∞ a o I 2 3 8 9 II 12 13 Generen en een eug Ab±ˆˆ±**** wwwwwwwwww.BxNŏ…I☹NNU EXILAI 20 21 22 23 25 26 27 28 30 31 32 33 34 58 TABLE XXVI.—SQUARES, cubes, square roots, CUBE ROOTS AND RECIPROCALS ∞OWN DAS 100 121 144 169 196 225 256 272 GEHAANDAA 225 676 729 784 841 900 1024 1089 1156 1225 1296 1369 1444 1521 1600 1681 1764 1849 1936 2025 2116 2209 2304 2401 2500 2601 2704 2809 2916 3025 3136 3249 3354 3481 Cubes. 18 27 64 125 216 343 512 729 1000 1331 1728 2197 2744 3375 4096 4913 5832 6859 8000 9261 10648 12167 13824 15625 17576 19683 21952 24389 27000 29791 32768 35937 39304 42875 46656 50653 54872 59319 64000 68921 74088 79507 85184 91125 97336 103823 110592 117649 125000 132651 140608 148877 157464 166375 175616 185193 195112 205379 Square Roots. 1.0000000 .4142136 .7320508 2.0000000 2.2360680 .4494897 .6457513 .8284271 3.0000000 3.1622777 .3166248 .4641016 6055513 7416574 3.8729833 4.0000000 • • 1231056 .2425407 .3588989 • 4.4721360 .5825757 .6904158 .7958315 .8989795 5.0000000 .0990195 1961524 .2915026 .3851648 • 5.4772256 •5677644 .6568542 .7445626 .8309519 5.9160798 6.0000000 .0827625 .1644140 .2449980 6.3245553 .4031242 .4807407 • 5574385 6332496 6.7082039 7823300 .8556546 .9282032 7.0000000 • 7.0710678 .1414284 2111026 • 2801099 .3484692 7.4161985 .4833148 5498344 .6157731 ,6811457 Cube Roots. 1.0000000 2599210 4422496 5874011 I.7099759 8171206 9129312 2.0000000 .0800837 · • · • 2. 1544347 2239801 2894286 • .3513347 .4101422 2.4662121 .5198421 5712816 6207414 .6684016 • 2.7144177 .7589243 .8020393 2.9240177 9624960 · 3.0000000 .0365889 .0723168 8438670 8844991 3.1072325 1413806 .1748021 .2075343 2396118 3.2710663 .3019272 • 3322218 3619754 .3912114 .. • 3.4199519 .4482172 .4760266 .5033981 .5303483 3.5568933 5830479 .6088261 • .6342411 .6593057 3.6840314 7084298 .7325111 .7562858 7797631 3.8029525 .8258624 .8485011 .8708766 .8929965 Recipro- cals. 1.000000000 500000000 .333333333 250000000 .200000000 166666667 .142857143 125000000 .IIIIIIIII • • • • • 2500000 .058823529 5555556 2631579 .050000000 .047619048 100000000 10 090909091 11 083333333 12 .076923077 1428571 13 14 .066666667 5454545 3478261 1666667 040000000 .038461538 • 7037037 5714286 4482759 .033333333 1250000 0303030 .029411765 .028571429 7777778 No. 12345O 70 σ 1739130 1276600 0833333 0408163 I .020000000 .019607843 9230769 8867925 8518519 .018181818 8 7857143 7543860 7241379 6949153 9 15 16 17 18 19 20 21 30 2258065 31 32 22 23 24 25 26 27 28 29 33 34 35 ვნ 7027027 37 6315789 38 5641026 39 ♡~♡♡♡♡♡♡♡♡ ****: .025000000 4390244 3809524 42 3255814 43 2727273 .022222222 44 45 46 40 41 49 50 CCCCCCCCCC 53 57 58 59 1 640 No. Squares. 85SSYKOAX8 ANNNNKO Too of 777 бо 62 63 64 65 66 67 68 69 70 72 73 74 75 76 77 78 79 80 81 82 83 84 15855 82akinana: go 91 93 94 200 IOI 102 103 104 105 106 107 108 Iog IIO III 112 113 114 115 116 117 118 119 TABLE XXVI.—SQUARES, CUBES, SQUARE ROOTS, 3600 3721 3844 3969 4096 4225 4356 4489 4624 4761 4900 5041 5184 5329 5476 5625 5776 5929 6084 6241 6400 6561 6724 6889 7056 7225 7396 7569 7744 7921 8100 8281 8464 8649 8836 9025 9216 9409 9604 9801 10000 10201 10404 10609 10816 11025 11236 11449 11664 11881 12:00 12321 12544 12769 12996 13225 13456 13689 13924 14161 Cubes. 216000 226981 238328 250047 262144 274625 287496 300763 314432 328509 343000 357911 373248 389017 405224 421875 438976 456533 474552 493039 512000 531441 551368 571787 592704 614125 636056 658503 681472 704969 729000 753571 778688 804357 830584 857375 884736 912673 941192 970299 1000000 1030301 1061208 1092727 II24864 1157625 1191016 1225043 1259712 1295029 1331000 1367631 1404928 1442897 1481544 1520875 1560896 1601613 1643032 1685159 Square Roots. 7.7459667 .8102497 .8740079 .9372539 8.0000000 8.0622577 .1240384 .1853528 .2462113 .3066239 8.3666003 .4261498 .4852814 5440037 6023253 8.6602540 • .7177979 .7749644 .8317609 .8881944 8.9442719 9.0000000 .0553851 .1104336 .1651514 9.2195445 2736185 .3273791 •3808315 •4339811 9.4868330 • 5393920 .5916630 .6436508 .6953597 9.7467943 · .7979590 .8488578 • • · • 8994949 9498744 10.0000000 .0498756 .0995049 1488916 .1980390 10.2469508 .2956301 •3440804 •3923048 •4403065 10.4880885 .5356538 .5830052 .6301458 .6770783 10.7238053 .7703296 .8166538 .8627805 .9087121 Cube Roots. 3.9148676 .9364972 9578915 .979057I 4.0000000 4.0207256 0412401 .0615480 .0816551 1015661 • 4.1212853 1408178 1601676 • .1793392 1983364 4.2171633 2358236 • .2543210 .2726586 .2908404 4.3088695 .3267487 .3444815 .3620707 .3795191 4.3968296 .4140049 .4310476 .4479602 .464745I 4.4814047 .4979414 .5143574 .5306549 .5468359 4.5629026 .5788570 5947009 .6104363 .6260650 · 4.6415888 6570095 .6723287 6875482 7026694 • • • 4.7176940 .7326235 .7474594 .7622032 .7768562 4.7914199 .8058955 .8202845 .834588I 8488076 4.8629442 .8769990 • .8909732 .9048681 .9186847 Recipro- cals. .016666667 60 6393443 61 6129032 62 5873016 63 5625000 64 .015384615 65 5151515 66 4925373 67 4705882 4492754 .012500000 2345679 2195122 2048193 1904762 No. .014285714 4084507 71 3888889 72 3698630 73 3513514 74 .013333333 75 3157895 76 2987013 77 2820513 78 2658228 79 8588*KU♪08 UNNSIDE 0416667 0309278 0204082 ΟΙΟΙΟΙΟ 68 010000000 .009900990 70 80 81 82 83 84 .011764706 1627907 1494253 1363636 88 1235955 89 .OIIIIIIII go 0989011 91 0869565 92 0752688 0638298 .010526316 93 JD6585 Lääkäkohõa 94 95 97 98 99 100 ΙΟΙ 9803922 102 9708738 9615385 103 104 .009523810 105 106 9433962 9345794 107 9259259 108 9174312 109 .009090909 IIO III 9009009 8928571 112 8849558 113 8771930 114 .008695652 115 8620690 116 8547009 117 8474576 118 8403361 119 641 No. 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 155 156 157 158 159 тбо 161 162 163 164 165 166 167 168 169 170 171 172 173 174 175 176 177 178 179 Squares. 14400 14641 14884 15129 15376 15625 15876 16129 16384 16641 16900 17161 17424 17689 17956 18225 18496 18769 19044 19321 19600 19S81 20164 20449 20736 21025 21316 21609 21904 22201 22500 22801 23104 23409 23716 24025 24336 24649 24964 25281 25600 25921 26244 26569 26896 27225 27556 27889 28224 28561 28900 29241 29584 29929 30276 30625 30976 31329 31684 32041 CUBE ROOTS AND RECIPROCALS Cubes. 1728000 1771561 1815848 1860867 1906624 1953125 2000376 2048383 2007152 2146689 2197000 2248091 2299968 2352637 2406104 2460375 2515456 2571353 2628072 2685619 2744000 2803221 2863288 2924207 2985984 3048625 3112136 3176523 3241792 3307949 3375000 3442951 3511808 3581577 3652264 3723875 3796416 3869893 3944312 4019679 4096000 4173281 4251528 4330747 4410944 4492125 4574296 4657463 4741632 4826809 4913000 5000211 5088448 5177717 5268024 5359375 5451776 5545233 5639752 5735339 Square Roots. 10.9544512 II.0000000 0453610 0905365 .1355287 II. 1803399 • .2249722 .2694277 .3137085 .3578167 II.4017543 4455231 .4891253 5325626 .5758369 II.6189500 .6619038 7046999 • 7473401 .7898261 11.8321596 .8743421 .9163753 .9582607 12.0000000 12.0415946 0830460 .1243557 1655251 .2065556 • 12.2474487 2882057 3288280 .3693169 .4096736 12.4498996 • .4899960 5299641 .5698051 .6095202 12.6491106 .6885775 .7279221 .7671453 .8062485 12.8452326 .8840987 .9228480 .9614814 13.0000000 13.0384048 0766968 1148770 1529464 1909060 • • • 13.2287566 .2664992 .3041347 3416641 .3790882 Cube Roots. 4.9324242 9460874 .9596757 .9731898 .9866310 5.0000000 • 0132979 .0265257 .0396842 .0527743 • 5.0657970 .0787531 .0916434 1044687 .1172299 5.1299278 .1425632 1551367 1676493 1801015 • • 5. 1924941 204S279 .2171034 .2293215 .2414828 5.2535879 2656374 .2776321 2895725 • 3014592 • 5.3132928 • 3250740 • 3368033 •3484812 .3601084 5.3716854 .3832126 3946907 4061202 .4175015 • 5.4288352 • 4401218 •4513618 4625556 • 4737037 5.4848066 •4958647 •5068784 •5178484 .5287748 • 5.5396583 •5504991 •5612978 •5720546 .5827702 5.5934447 .6040787 .6146724 .6252263 .6357408 Recipro- cals. 120 121 008333333 8264463 8196721 8130081 123 8064516 124 122 .008000000 125 7936508 126 7874016 127 7812500 128 7751938 129 .007692308 7633588 7575758 7518797 7462687 .007407407 7352941 No. .007142857 006896552 6849315 130 131 132 7299270 137 7246377 138 7194245 139 133 134 135 136 140 7092199 141 7042254 142 6993007 143 6944444 144 .006250000 6211180 6172840 6134969 6097561 .006060606 145 146 6802721 147 6756757 148 6711409 149 150 151 006666667 6622517 6578947 152 6535948 153 6493506 154 155 6410256 156 6369427 157 6329114 158 6289308 .006451613 159 160 161 162 163 164 165 166 6024096 5988024 167 5952381 168 5917160 169 170 171 172 .005882353 5847953 5813953 5780347 5747126 174 .005714286 175 5681818 176 173 5649718 177 5617978 178 55S6592 179 642 No. Squares. Cubes. 180 181 182 183 184 185 186 187 188 189 190 191 192 193 194 195 196 197 198 199 200 201 202 203 204 205 206 207 208 209 210 211 212 213 214 215 216 217 218 219 220 221 222 223 224 225 226 227 228 229 230 231 232 233 234 235 236 237 238 239 TABLE XXVI.-SQUARES, CUBES, SQUARE ROOTS, 32400 32761 33124 33489 33856 34225 34596 34969 35344 35721 36100 36481 36864 37249 37636 38025 38416 38809 39204 39601 40000 40401 40804 41209 41616 42025 42436 42849 43264 43681 44100 44521 44944 45369 45796 46225 46656 47089 47524 47961 48400 48841 49284 49729 50176 50625 51076 51529 51984 5244I 52900 53361 53824 54289 54756 55225 55696 56169 56644 57121 5832000 592974! 6028568 6128487 6229504 6331625 6434856 6539203 6644672 6751269 6859000 6967871 7077888 7189057 7301394 7414875 7529536 7645373 7762392 7880599 8000000 8120601 8242408 8365427 84S9664 8615125 8741816 8869743 8998912 9129329 9261000 9393931 9528128 9663597 9800344 9938375 10077696 10218313 10360232 10503459 10648000 10793861 10941048 11089567 11239424 11390625 11543176 11697083 11852352 12008989 12167000 12326391 12487168 12649337 12812904 12977875 13144256 13312053 13481272 13651919 Square Roots. 13.4164079 .4536240 4907376 • 5277493 5646600 13.6014705 .6381817 .6747943 .7113092 .7477271 • 13.7840488 .8202750 .8564065 .8924440 .9283883 13.9642400 14.0000000 0356688 .0712473 .1067360 • 14.1421356 1774469 2126704 2478068 .2828569 14.3178211 • • • 3527001 .3874946 4222051 .4568323 • 14.4913767 .5258390 .5602198 5945195 .6287388 14.6628783 .6969385 .7309199 7648231 .7986486 14.8323970 8660687 .8996644 .9331845 .9666295 15.0000000 .0332964 .0665192 .0996689 1327460 • 15.1657509 1986842 2315462 .2643375 .2970585 15.3297097 .3622915 .3948043 .4272486 .4596248 Cube Roots. 5.6462162 6566528 6670511 6774114 6877340 5.69S0192 7082675 .7184791 .7286543 .7387936 • • · 5.7488971 7589652 .7689982 7789966 7889604 5.7988900 8087857 .8186479 .8284767 .8382725 • • 5.8480355 .8577660 .8674643 .8771307 .8867653 5.8963685 9059406 .9154817 .9249921 .9344721 • 5.9439220 .9533418 9627320 9720926 9814240 5.9907264 6.0000000 • • · 0092450 .0184617 .0276502 • 6.0368107 .0459435 .0550489 0641270 • .0731779 6.0822020 .0911994 .1001702 .1091147 1180332 • 6. 1269257 .1357924 1446337 .1534495 .1622401 6.1710058 1797466 1884628 .1971544 .2058218 Recipro- cals. .005555556 5524862 5494505 182 5464481 183 5434783 184 .005405405 185 5376344 186 5347594 187 5319149 188 5291005 189 7 .005263158 190 5235602 191 5208333 192 5181347 193 5154639 194 005128205 No. 180 181 .005000000 4975124 4950495 4926108 4901961 .004878049 4854369 4830918 4807692 4784689 197 5102041 5076142 5050505 198 5025126 199 195 196 .004545455 200 201 202 203 204 205 206 207 208 209 210 .004761905 4739336 211 212 4716981 4694836 213 4672897 214 .004651163 215 4629630 216 4608295 217 4587156 218 4566210 219 220 4524887 221 4504505 222 4484305 4464286 223 224 225 226 .004444444 4424779 440528€ 4385965 4366812 229 227 228 .004347826230 231 4329004 4310345 232 4291845 233 4273504 234 235 .004255319 4237288 236 4219409 237 4201681 238 4184100 239 643 No. Squares. 240 241 242 243 244 245 246 247 248 249 250 251 252 253 254 255 256 257 258 259 260 261 262 263 264 265 266 267 268 269 270 271 272 273 274 275 276 277 278 279 280 281 282 283 284 285 286 287 288 289 299 29 292 293 294 295 296 297 298 299 57600 58081 58564 59049 59536 60025 60516 61009 61504 62001 62500 63001 63504 64009 64516 65025 65536 66049 66564 67081 67600 68121 68644 69169 69696 70225 70756 71289 71824 72361 72900 7344I 73984 74529 75076 75625 76176 76729 77284 77841 78400 78961 79524 80089 80656 81225 81796 82369 82944 83521 84100 84681 85264 85849 86436 87025 87616 88209 88804 89401 CUBE ROOTS AND RECIPROCALS Cubes. 13824000 13997521 14172488 14348907 14526784 14706125 14886936 15069223 15252992 15438249 15625000 15813251 16003008 16194277 16387064 16581375 16777216 16974593 17173512 17373979 17576000 17779581 17984728 18191447 18399744 18609625 18821096 19034163 19248832 19465109 19683000 19902511 20123648 20346417 20570824 20796875 21024576 21253933 21484952 21717639 21952000 22188041 22425768 22665187 22906304 23149125 23393656 23639903 23887872 24137569 24389000 24642171 248970S8 25153757 25412184 25672375 25934336 26198073 26463592 26730899 Square Roots. 15.4919334 .5241747 5563492 5584573 6204994 15.6524758 6843871 7162336 7480157 .7797338 • • • • 15.8113883 8429795 8745079 .9059737 • 9373775 15.9687194 16.0000000 • • .0312195 ·0623784 .0934769 16. 1245155 1554944 1864141 2172747 2480768 16.2788206 · • • • • 3707055 • 4012195 16.4316767 4620776 • 4924225 • 5227116 • 5529454 16.5831240 .6132477 .6433170 .6733320 • 7032931 • 3095064 3401346 16.7332005 7630546 7928556 8226038 8522995 16.8819430 · • .9115345 .9410743 .9705627 17.0000000 17.0293864 0587221 .0880075 1172428 1464282 17.1755640 2046505 .2336879 • 2626765 .2916165 · Cube Roots. 6.2144650 2230843 .2316797 .2402515 .2487998 6.2573248 .2658266 .2743054 .2827613 .2911946 6.2996053 .3079935 .3163596 .3247035 3330256 6.3413257 3496042 • 3578611 .3660968 • 3743111 • 6.3825043 .3906765 .3988279 .4069585 .4150687 6.4231583 •4312276 • 4392767 .4473057 .4553148 6.4633041 .4712736 .4792236 .4871541 •4950653 6.5029572 .5108300 .5186839 .5265189 5343351 • 6.5421326 5499116 .5576722 .5654144 5731385 6.5808443 .5885323 5962023 .6038545 .6114890 • • 6.6191060 6267054 .6342874 .6418522 .6493998 6.6569302 .6644437 .6719403 .6794200 .6868831 Recipro- cals. .004166667 4149378 240 241 4132231 242 4115226 243 4098361 244 .004081633 245 4065041 246 4048583 247 4032258 248 4016064 249 004000000 250 3984064 251 3968254 252 3952569 3937008 •003921569 253 254 255 3906250 256 3991051 257 3875969 258 3861004 259 .003846154 260 3831418 261 3816794 262 3S02281 263 3787879 264 003773585 265 3759398 266 3745318 267 3731343 268 3717472 269 .003703704 270 271 272 273 274 3690037 3676471 3653004 3649635 No. .003636364 3623188 3610108 277 3597122 278 3584229 279 .003571429 3558719 3546099 280 281 282 3533569 283 3521127 284 .003508772 275 276 .003448276 285 286 287 3496503 3484321 3472222 288 3460208 289 290 3436426 291 3424658 292 3412969 293 3401361 294 .003389831 295 3378378 296 3367003 297 3355705 298 3344482 299 644 No. Squares. 300 301 302 303 304 305 306 307 308 309 310 3II 312 313 314 315 316 317 318 319 320 321 322 323 324 325 326 327 328 329 330 331 332 337 338 339 340 341 342 343 344 345 346 347 348 349 TABLE XXVI.—SQUARES, CUBES, SQUARE ROOTS, 90000 90601 357 358 359 91204 91809 92416 93025 93636 94249 94864 95481 96100 96721 97344 97969 98596 99225 99856 100489 101124 101761 102400 103041 103684 333 110889 334 111556 335 336 104329 104976 105625 106276 106929 107584 108241 108900 109561 II0224 112225 112896 113569 114244 114921 115600 116281 116964 117649 118336 119025 119716 120409 121104 121801 350 351 352 353 354 125316 355 126025 356 126736 122500 123201 123904 124609 127449 128164 128881 Cubes. 27000000 27270901 27543608 27818127 28094464 28372625 28652616 28934443 29218112 29503629 29791000 30080231 30371328 30664297 30959144 31255875 31554496 31855013 32157432 32461759 32768000 33076161 33386248 33698267 34012224 34328125 34645976 34965783 35287552 35611289 35937000 36264691 36594368 36926037 37259704 37595375 37933056 38272753 38614472 38958219 39304000 39651821 40001688 40353607 40707584 41063625 41421736 41781923 42144192 42508549 4287.5000 4324355I 43614208 43986977 44361864 44738875 45118016 45499293 45882712 46268279 Square Roots. 17.3205081 3493516 .3781472 .4068952 .4355958 17.4642492 .4928557 • 17.6068169 .6351921 .6635217 .6918060 .720045I 17.7482393 .7763888 .8044938 .8325545 .8605711 • 17.8885438 .9164729 .9443584 9722008 18.0000000 18.0277564 · .0554701 .0831413 • · • 5214155 5499288 5783958 18.1659021 .1934054 2208672 2482876 2756669 18.3030052 • 3303028 • 3575598 3847763 .4119526 • • • 18.4390889 4661853 .4932420 .5202592 .5472370 18.5741756 • 1107703 1383571 6010752 .6279360 .654758I .6815417 18.7082869 .7349940 7616630 • .7882942 8148877 • 18.8414437 8679623 .8944436 9208879 .9472953 Cube Roots. 6.6943295 .7017593 .7091729 .7165700 .7239508 6.7313155 .7386641 7459967 .7533134 7606143 • • 6.7678995 7751690 .7824229 7896613 •7968844 6.8040921 • • .8112847 .8184620 .8256242 .8327714 6.8399037 .8470213 .8541240 .8612120 .8682855 6.8753443 .8823888 8894188 .8964345 ⚫9034359 6.9104232 .9173964 .9243556 9313008 •9382321 6.9451496 .9520533 •9589434 .9658198 • 9726826 • 6.9795321 .9863681 •9931906 7.0000000 .0067962 7.0135791 .0203490 .0271058 .0338497 0405806 7.0472987 .0540041 0606967 0673767 • .0740440 7.0806988 .0873411 .0939709 1005885 .1071937 Recipro- cals. .003333333 300 3322259 301 3311258 302 3300330 303 3289474 304 003278689 • 305 3267974 306 .003225806 310 3215434 311 3205128 312 3194888 313 3184713 314 .003174603 315 316 3257329 307 3246753 308 3236246 309 • No. .003125000 3164557 3154574 317 3144654 318 3134796 319 320 3115265 321 3105590 322 3095975 323 3086420 324 003076923 3067485 3058104 327 3048780 328 3039514 329 .003030303 330 3021148 331 3012048 332 3003003 333 2994012 334 .002985075 2976190 325 326 2906977 002898551 2967359 337 2958580 338 2949853 339 .002857143 335 336 002941176 2932551 2923977 2915452 343 344 345 2890173 346 2881844 347 2873563 348 2865330 349 340 341 342 350 2849003 351 2840909 2832861 352 353 2824859 354 .002816901 355 356 2808989 2801120 357 2793296 358 2785515 359 645 No. Squares. ვნი 361 362 363 364 365 366 367 368 36g 370 371 372 373 374 375 376 377 378 379 333 389 397 398 399 380 381 382 145924 383 146689 384 147456 129600 130321 131044 131769 132496 407 408 409 133225 133956 134689 385 148225 386 148996 387 149769 388 410 411 412 413 414 135424 136161 415 416 136900 137641 138384 417 418 139129 139876 439 140625 141376 390 152100 391 152881 153664 142129 142884 143641 392 393 154449 394 155236 395 156025 396 156816 144400 145161 150544 151321 400 401 402 403 404 405 406 164836 165649 166464 167281 157609 158404 159201 160000 160801 161604 162409 163216 164025 168100 168921 169744 170569 171396 172225 173056 173889 174724 175561 CUBE ROOTS AND RECIPROCALS Cubes. 46656000 47045881 47437928 47832147 48228544 48627125 49027896 49430863 49836032 50243409 50653000 51064811 51478848 51895117 52313624 52734375 53157376 53582633 54010152 54439939 54872000 55306341 55742968 56181887 56623104 57066625 57512456 57960603 58411072 58863869 59319000 59776471 60236288 60698457 61162984 61629875 62099136 62570773 63044792 63521199 64000000 64481201 64964808 65450827 65939264 66430125 66923416 67419143 67917312 68417929 68921000 69426531 69934528 70444997 70957944 71473375 71991296 72511713 73034632 73560059 Square Roots. 18.9736660 19.0000000 0262976 .0525589 .0787840 • 19. 1049732 1311265 • .1572441 1833261 .2093727 • • 19.2353841 .2613603 .2873015 .3132079 • 3390796 19.3649167 •3907194 4164878 • 4422221 .4679223 • 19.4935887 .5192213 •5448203 .5703858 • 5959179 19.6214169 .6468827 .6723156 .6977156 .7230829 19.7484177 .7737199 •7989899 .8242276 .8494332 19.8746069 .8997487 .9248588 9499373 •9749844 • 20.0000000 .0249844 0499377 .0748599 • .0997512 20. 1246118 1494417 .1742410 .1990099 .2237484 • 20.2484567 .2731349 • 2977831 .3224014 • 3469899 20.3715488 • 3960781 .4205779 • 4450483 •4694895 Cube Roots. 7.1137866 1203674 .1269360 1334925 1400370 7.1465695 .1530901 1595988 1660957 .1725809 • · • 7.1790544 .1855162 1919663 .1984050 2048322 7.2112479 .2176522 • • .2240450 .2304268 2367972 • 7.2431565 .2495045 2558415 .2621675 2684824 7.2747864 .2810794 2873617 2936339 .2998936 • 7.3061436 3123828 .3186114 3248295 ·3310369 7.3372339 •3434205 3495966 3557624 .3619178 · • 7.3680630 .3741979 3803227 3864373 •3925418 7.3986363 4047206 • • • .4107950 .4168595 .4229142 7.4289589 •4349938 .4410189 .4470342 .4530399 7.4590359 .4650223 .4709991 .4769664 .4829242 Recipro- cals. .002777778 2770083 2762431 2754S21 2747253 .002739726 2732240 2724796 2717391 2710027 • No. .002702703 370 2695418 371 2688172 372 2680965 373 2673797 .002666667 374 360 361 362 363 364 365 366 367 002531646 368 369 2659574 2652520 377 2645503 378 2638522 379 .002631579 380 2624672 381 2617801 382 2610966 383 2604167 384 .002597403 385 2590674 386 2583979 387 2577320 388 2570694 389 .002564103 390 2557545 391 .002500000 375 376 2551020 392 2544529 393 2538071 394 395 396 .002439024 2433090 2427184 2421308 2525253 2518892 397 2512563 398 2506266 399 400 2493766 401 2487562 402 2481390 403 2475248 .002469136 2463054 404 405 406 2457002 407 2450980 408 2444988 409 410 411 412 413 2415459 414 415 .002409639 2403846 416 2398082 417 2392344 418 2356635 419 646 No. Squares. 420 421 422 423 424 425 426 427 428 429 430 431 432 433 434 435 436 437 438 439 440 44I 442 443 444 445 446 447 448 449 450 451 452 457 458 459 4888888 TABLE XXVI.-SQUARES, CUBES, SQUARE ROOTS, 469 176400 177241 178084 178929 179776 180625 181476 477 478 479 182329 183184 184041 184900 185761 186624 187489 188356 189225 190096 190969 191844 192721 193600 194481 195364 196249 453 454 455 207025 456 207936 208849 197136 198025 198916 199809 200704 201601 202500 203401 204304 205209 206115 460 461 462 463 464 215296 465 466 467 209764 210681 211600 212521 213444 214369 216225 217156 218089 219024 219961 470 471 472 222784 473 474 224676 475 225625 476 226576 Cubes. 220900 221841 74088000 74618461 75151448 75686967 76225024 76765625 77308776 77854483 78402752 78953589 79507000 80062991 80621568 81182737 81746504 82312875 82881856 83453453 84027672 84604519 85184000 85766121 86350888 86938307 87528384 88121125 88716536 89314623 89915392 90518849 91125000 91733851 92345408 92959677 93576664 94196375 94818816 95443993 96071912 96702579 97336000 97972181 98611128 99252847 99897344 100544625 101194696 101847563 103823000 104487111 105154048 223729 105823817 102503232 103161709 106496424 107171875 107850176 227529 108531333 228484 229441 109215352 109902239 Square Roots. 20.4939015 .5182845 .5426386 .5669638 5912603 20.6155281 .6397674 .6639783 .6881609 .7123152 ► 20.7364414 .7605395 .7846097 .8086520 .8326667 20.8566536 .8806130 9045450 .9284495 •9523268 • 20.9761770 21.0000000 .0237960 .0475652 .0713075 21.0950231 .1187121 .1423745 .1660105 .1896201 21.2132034 .2367606 .2602916 .2837967 • 3072758 21.3307290 3541565 •3775583 4009346 .4242853 · 21.4476106 4709106 .4941853 •5174348 5406592 21.5638587 .5870331 .6101828 • • .6333077 .6564078 21.6794834 .7025344 .7255610 7485632 .7715411 21.7944947 8174242 8403297 .8632111 8860686 Cube Roots. 7.4888724 .4948113 5007406 5066607 • 5125715 7.5184730 5243652 5302482 • · • 5361221 •5419867 • 7.5478423 •5536888 5595263 5653548 • 5711743 7.5769849 .5827865 5885793 • 5943633 .6001385 · 7.6059049 .6116626 .6174116 .6231519 .6288837 7.6346067 .6403213 .6460272 .6517247 .6574138 7.6630943 .6687665 .6744303 .6800857 .6857328 7.6913717 6970023 ⚫7026246 7082388 .7138448 • 7.7194426 • 7250325 • 7306141 .7361877 .7417532 7.7473109 .7528606 7584023 7639361 .7694620 7.7749801 7804904 .7859928 7914875 7969745 7.8024538 .8079254 .8133892 .8188456 .8242942 • • Recipro- cals. No. .002380952 420 421 2375297 2369668 422 2364066 423 2358491 424 .002352941 425 2347418 426 2341920 2336449 2331002 429 427 428 430 431 .002325581 2320186 2314815 2309469 433 2304147 434 432 .002298851 2293578 2288330 2283105 2277904 439 435 436 437 438 .002272727 2267574 2262443 442 440 441 2257336 443 444 2252252 .002247191 445 2242152 446 2237136 447 2232143 448 2227171 449 .002222222 450 2217295 45I 2212389 452 2207506 453 2202643 454 .002197802 455 2192982 456 2188184 457 2183406 458 2178649 459 .002173913 460 2169197 461 2164502 462 2159827 463 464 2155172 .002150538 465 2145923 466 2141328 467 2136752 468 2132196 469 .002127660 470 2123142 471 2118644 472 2114165 473 474 2109705 .002105263 475 2100840 476 2096436 477 2092050 478 2087683 479 647 No. Squares. 482 483 484 485 86 480 230400 110592000 481 231361 111284641 111980168 112678587 488 489 490 491 492 493 494 495 496 497 498 499 500 501 502 503 504 505 506 507 508 509 510 511 232324 233289 234256 515 516 235225 236196 237169 238144 239121 240100 241081 242064 243049 244036 245025 246016 247009 248004 249001 250000 251001 252004 253009 254016 255025 256036 265225 266256 267289 517 518 268324 519 269361 520 521 522 523 524 274576 525 275625 526 276676 270400 271441 272484 CUBE ROOTS AND RECIPROCALS Cubes. 527 277729 528 278784 529 279841 260100 132651000 261121 133432831 512 262144 134217728 513 263169 135005697 514 264196 135796744 280900 281961 113379904 114084125 114791256 257949 25S064 259081 131872229 115501303 116214272 116930169 287296 288369 537 538 289444 539 290521 117649000 118370771 119095488 119823157 120553784 121287375 122023936 122763473 123505992 124251499 125000000 125751501 126506008 127263527 128024064 128787625 129554216 130323843 131096512 136590875 137388096 138188413 273529 143055667 143877824 138991832 139798359 140608000 141420761 142236648 144703125 145531576 146363183 147197952 148035889 530 531 532 283024 533 284089 534 285156 535 286225 153130375 536 153990656 154854153 155720872 156590819 148877000 149721291 150568768 151419437 152273304 Square Roots. 21.9089023 .9317122 •9544984 .9772610 22.0000000 22.0227155 .0454077 .0630765 .0907220 .1133444 22.1359436 .1585198 1810730 .2036033 2261108 22.2485955 2710575 2934968 · • 3159136 .3383079 • 22.3606798 .3830293 .4053565 .4270615 ⚫4499443 22.4722051 •4944438 5166605 .5388553 .5610283 • 22.5831796 .6053091 .6274170 .6495033 .6715681 22.6936114 .7156334 7376340 7596134 .7815715 • • 22.8035085 .8254244 .8473193 .8691933 .8910463 22.9128785 •9346899 •9564806 9782506 23.0000000 • • 23.0217289 .0434372 .0651252 .0867928 1084400 23.1300670 .1516738 1732605 1948270 .2163735 • • Cube Roots, 7.8297353 .8351688 .8405949 .8460134 .8514244 7.8568281 .8622242 .8676130 .8729944 .8783684 7.8837352 .8890946 .8944468 8997917 9051294 • 7.9104599 .9157832 .9210994 .9264085 9317104 • 7.9370053 9422931 .9475739 .9528477 .9581144 • 7.9633743 .9686271 •9738731 .9791122 •9843444 7.9895697 9947886 8.0000000 • .0052049 .0104032 8.0155946 .0207794 .0259574 .0311287 .0362935 8.0414515 .0466030 .0517479 .0568862 0620180 8.0671432 .0722620 .0773743 0824800 .0875794 8.0926723 .0977589 1028390 1079128 1129803 8.1180414 .1230962 1281447 • .1331870 1382230 • Recipro- cals. .002083333 2079002 2074689 2070393 2066116 .002061856 2057613 2053388 2049180 2044990 .002040816 490 2036660 491 2032520 492 2028398 493 2024291 494 .002020202 .001980198 No. 480 481 482 483 484 2016129 2012072 497 2008032 498 2004008 499 485 486 487 488 489 .002000000 500 1996008 501 1992032 502 1988072 503 1984127 504 1945525 .001941748 495 496 1976285 1972387 507 1968504 508 1964637 509 .001923077 .001960784 510 1956947 511 1953125 512 1949318 513 514 001904762 505 506 515 1937984 516 1934236 517 1930502 518 1926782 519 520 1919386 521 1915709 522 1912046 523 1908397 524 525 1901141 526 1897533 527 1893939 528 1890359 529 .001886792 530 1883239 531 1879699 532 1876173 533 1872659 534 .001869159 535 1865672 536 1862197 537 1858736 538 1855288 539 648 No. Squares. 540 54I 542 543 544 545 546 547 548 549 550 551 552 553 554 ANA BESOJOO 588 RENANI 559 565 566 555 308025 556 557 309136 558 567 569 570 571 TABLE XXVI.-SQUARES, CUBES, SQUARE ROOTS, 291600 292681 293764 294849 295936 573 297025 298116 574 299209 300304 301401 302500 303601 587 588 304704 305809 306916 560 56x 313600 175616000 314721 176558481 562 315844 563 316969 177504328 178453547 564 318096 179406144 310249 311364 312481 319225 320356 321489 332929 334084 335241 580 581 336400 337561 582 338724 583 339889 584 341056 585 586 Cubes. 324900 185193000 326041 572 327184 187149248 186169411 157464000 158340421 159220088 160103007 160989184 161878625 162771336 342225 343396 344569 163667323 164566592 165469149 345744 589 346921 166375000 167284151 168196608 328329 188132517 329476 189119224 575 330625 190109375 576 577 331776 191102976 578 579 590 348100 591 349281 592 350464 593 351649 594 352836 595 596 354025 355216 597 356409 598 357604 599 358801 169112377 170031464 322624 183250432 323761 184220009 170953875 171879616 172808693 173741112 174676879 180362125 181321496 182284263 192100033 193100552 194104539 195112000 196122941 197137368 198155287 199176704 200201625 201230056 202262003 203297472 204336469 205379000 206425071 207474688 208527857 209584584 210644875 211708736 212776173 213847192 214921799 Square Roots. 23.2379001 2594067 .2808935 3023604 •3238076 23.3452351 3666429 3880311 .4093998 .4307490 • 23.4520788 ⚫4733892 ⚫4946802 .5159520 •5372046 23.5584380 5796522 .6008474 .6220236 .6431808 • · 23.6643191 .6854386 7065392 7276210 7486842 23.7697286 • • • 7907545 .8117618 .8327506 .8537209 23.8746728 .8956063 .9165215 9374184 .9582971 23.9791576 24.0000000 .0208243 •0416306 .0624188 24.0831891 1039416 .1246762 1453929 1660919 24.1867732 2074369 .2280829 • .2487113 •2693222 24.2899156 3104916 • 3310501 • 3515913 3721152 24.3926218 • • 4131112 •4335834 •4540385 .4744765 • • • Cube Roots. 8. 1432529 1482765 1532939 1583051 1633102 8.1683092 • • 1733020 .1782888 .1832695 .1882441 • 8.1932127 1981753 .2031319 2080825 • 2130271 8.2179657 .2228985 2278254 2327463 .2376614 • · • 8.2425706 .2474740 .2523715 .2572633 .2621492 8.2670294 • .2719039 .2767726 .2816355 .2864928 8.2913444 2961903 • .3010304 3058651 3106941 8.3155175 .3203353 .3251475 .3299542 .3347553 • • 8.3395509 .3443410 .3491256 .3539047 3586784 8.3634466 3682095 .3729668 • • 3777188 .3824653 • 8.3872065 .3919423 3966729 .4013981 4061180 8.4108326 • .4155419 .4202460 .4249448 .4296383 Recipro- cals. 543 .001851852 1848429 1845018 1841621 1838235 544 .001834862 545 1831502 546 1828154 547 1824818 548 1821494 549 .001818182 550 1814882 551 1811594 552 1808318 553 1805054 .001801802 554 .001754386 No. 1798561 1795332 557 1792115 558 1788909 559 .001785714 560 1782531 561 1779359 562 1776199 563 564 1773050 .001769912 565 1766784 566 1763668 567 1760563 568 1757469 569 .001724138 1721170 1718213 1715266 1712329 .001709402 1706485 1703578 1700680 1697793 540 54I 542 .001694915 555 556 570 1751313 571 1748252 572 1745201 573 1742160 574 .001739130 575 1736111 576 1733102 577 1730104 578 1727116 579 .001680672 1677852 580 8 0 0 0 0 0 0 0 0 58x 583 584 585 586 587 589 590 1692047 591 1689189 592 1686341 593 1683502 594 595 596 1675042 597 1672241 598 1669449 599 649 No. Squares. 600 601 602 603 604 605 606 607 608 бод 610 ότι 612 613 614 615 616 617 618 619 627 628 629 360000 361201 362404 363609 364816 366025 367236 368449 369664 370881 372100 373321 374544 375769 376996 378225 379456 380689 620 384400 621 385641 622 386884 388129 623 624 389376 625 390625 391876 626 381924 383161 $59959 630 396900 631 398161 632 399424 633 400689 634 401956 635 403225 404496 405769 636 637 638 407044 639 408321 640 409600 410881 641 642 412164 643 644 413449 414736 416025 645 646 417316 647 418609 648 419904 649 421201 650 422500 651 652 423801 425104 653 426409 654 427716 655 429025 656 657 658 430336 431649 432964 43428I CUBE ROOTS AND RECIPROCALS Cubes. 216000000 217081801 218167208 219256227 220348864 221445125 222545016 223648543 224755712 225866529 226981000 228099131 229220928 230346397 393129 394384 247673152 395641 248858189 231475544 232608375 233744896 234885113 236029032 237176659 238328000 239483061 240641848 241804367 242970624 244140625 245314376 246491883 250047000 251239591 252435968 253636137 254840104 256047875 257259456 258474853 259694072 260917119 262144000 263374721 264609288 265847707 267089984 268336125 269586136 270840023 272097792 273359449 274625000 275894451 277167808 278445077 279726264 281011375 282300416 283593393 284890312 286191179 Square Roots. 24.4948974 5153013 .5356883 5560583 5764115 24.5967478 .6170673 .6373700 .6576560 .6779254 • 24.6981781 7184142 7386338 7588368 .7790234 24. 7991935 .8193473 .8394847 .8596058 .8797106 24.8997992 .9198716 9399278 .9599679 .9799920 25.0000000 .0199920 .0399681 .0599282 .0798724 25.0998008 .1197134 .1396102 .1594913 1793566 25. 1992063 .2190404 2388589 .2586619 2784493 25.2982213 .3179778 .3377189 • 3574447 • 3771551 25.3968502 .4165301 •4361947 •4558441 .4754784 25.4950976 .5147016 • 5342907 5538647 • • 5734237 25.5929678 .6124969 .6320112 .6515107 .6709953 Cube Roots. 8.4343267 4390098 .4436877 .4483605 .4530281 8.4576906 .4623479 4670001 • .4716471 .4762892 8.4809261 .4855579 •4901848 .4948065 4994233 8.5040350 5086417 .5132435 .5178403 5224321 • • 8.5270189 5316009 .5361780 5407501 .5453173 8.5498797 .5544372 5589899 5635377 •5680807 • 8.5726189 •5771523 5816809 5862047 5907238 8.5952380 • 5997476 .6042525 .6087526 .6132480 • 8.6177388 .6222248 .6267063 .6311830 .6356551 8.6401226 •6445855 .6490437 .6534974 .6579465 8.6623911 •6668310 .6712665 .6756974 .6801237 8.6845456 .6889630 .6933759 .6977843 .7021882 Recipro- cals. 600 601 .001666667 1663894 1661130 602 1658375 603 1655629 604 .001652893 605 1650165 606 1647446 607 1644737 608 1642036 бод .01639344 610 1636661 611 1633987 612 1631321 613 1628664 614 .001626016 No. .001612903 1610306 1607717 1605136 1602564 .001600000 617 1623377 1620746 1618123 618 1615509 619 615 616 .001587302 1579779 1577287 620 621 622 1597444 627 1594896 1592357 628 1589825 629 623 624 625 626 630 1584786 631 1582278 632 633 634 .001574803 1572327 1569859 637 1567398 638 1564945 639 640 PASAN JOS88 .001562500 1560062 1557632 1555210 1552795 .001550388 645 1547988 646 1545595 647 1543210 648 644 1540832 649 .001538462 650 651 1536098 1533742 652 1531394 653 1529052 654 .001526718 655 1524390 656 1522070 657 658 1519757 1517451 66 TENGA 789 659 650 No. 660 661 662 663 664 665 666 667 668 669 670 671 672 673 674 675 676 9999 677 678 78 681 682 683 684 685 686 687 688 68g 697 698 699 700 701 702 703 704 705 706 TABLE XXVI.-SQUARES, CUBES, SQUARE ROOTS, Squares. Cubes. 458329 459684 679 461041 707 708 70g 435600 436921 438244 439569 440896 680 462400 463761 465124 466489 467856 717 718 719 442225 443556 444889 446224 447561 448900 450241 451584 452929 454276 455625 456976 690 691 692 693 694 695 483025 484416 696 469225 470596 471969 473344 474721 490000 491401 492804 494209 495616 497025 498436 287496000 288804781 290117528 291434247 499849 501264 502681 710 504100 711 505521 712 506944 713 508369 714 509796 715 511225 716 512656 514089 515524 516961 292754944 294079625 295408296 296740963 298077632 299418309 300763000 302111711 303464448 304821217 306182024 476100 328509000 477481 478864 480249 481636 307546875 308915776 310288733 311665752 313046839 314432000 315821241 317214568 318611987 320013504 335702375 485809 337153536 338608873 487204 340068392 488601 341532099 321419125 322828856 324242703 325660672 327082769 329939371 331373888 332812557 334255384 343000000 344472101 345948408 347428927 348913664 350402625 351895816 353393243 354894912 356400829 357911000 359425431 360944128 362467097 363994344 365525875 367061696 368601813 370146232 371694959 Square Roots. 25.6904652 .7099203 7293607 7487864 7681975 25.7875939 .8069758 .8263431 .8456960 .8650343 • • • 25.8843582 .9036677 9229628 • • · 25.9807621 26.0000000 • .0192237 0384331 .0576284 26.0768096 .0959767 .1151297 .1342687 • • · 1533937 26.1725047 .1916017 2106848 • · • 26.2678511 2868789 3058929 3248932 3438797 • • 9422435 9615100 26.3628527 .3818119 4007576 .4196896 .438608I • 26.4575131 .4764046 .4952826 .5141472 5329983 26.5518361 5706605 5894716 .6082694 6270539 · 2297541 2488095 • 26.6458252 6645833 6833281 · .7020598 7207784 • 26.7394839 7581763 7768557 .7955220 .8141754 Cube Roots. 8.7065877 .7109827 .7153734 7197596 · 7241414 8.7285187 7328918 • .7372604 .7416246 .7459846 8.7503401 .7546913 7590383 7633809 .7677192 8.7720532 7763830 7807084 · 7850296 .7893466 8.7936593 7979679 .8022721 .8065722 .8108681 8.8151598 .8194474 .8237307 • .8280099 .8322850 8.8365559 .8408227 .8450854 .8493440 .8535985 8.8578489 .8620952 .8663375 .8705757 .8748099 8.8790400 8832661 .8874882 • .8917063 .8959204 8.9001304 .9043366 .9085387 .9127369 .9169311 8.9211214 .9253078 •9294902 .9336687 .9378433 8.9420140 9461809 .9503438 .9545029 .9586581 Recipro- cals. 660 661 .001515152 1512859 1510574 662 1508296 663 1506024 664 665 001503759 1501502 666 • .001492537 1490313 1488095 1485884 1483680 .001481481 1479290 1477105 1499250 667 1497006 668 1494768 66g .001470588 1468429 1466276 1464129 1461988 • No. 670 671 677 1474926 678 1472754 679 .001449275 1447178 672 673 .001438849 674 675 676 .001459854 1457726 1455604 687 1453488 1451379 680 681 682 683 684 685 686 690 6gr 1445087 692 1443001 693 1440922 694 695 1436782 696 1434720 697 1432665 698 1430615 699 88898989 .001428571 700 1426534 701 1424501 702 1422475 703 1420455 704 705 .001418440 1416431 706 1414427 707 1412429 708 1410437 709 .001408451 710 1406470 711 1404494 712 1402525 713 1400560 714 .001398601 715 1396648 716 1394700 717 1392758 718 1390821 719 651 No. Squares. 720 721 722 521284 723 724 725 726 727 728 729 730 731 732 733 734 735 736 737 738 739 740 741 742 743 750 751 752 753 754 755 756 518400 519841 374805361 373248000 376367048 377933067 552049 744 553536 757 758 759 532900 534361 535824 537289 538756 745 746 747 748 5.59504 749 561001 522729 524176 379503424 525625 381078125 527076 382657176 528529 529984 531441 540225 541696 543169 544644 546121 547600 549081 550564 555025 556516 558009 CUBE ROOTS AND RECIPROCALS Cubes. 573049 574564 576081 760 577600 761 579121 762 580644 763 764 582169 583696 765 585225 766 586756 767 588289 768 589824 769 591361 384240583 385828352 387420489 389017000 390617891 392223168 393832837 395446904 397065375 398688256 400315553 401947272 403583419 405224000 406869021 408518488 410172407 411830784 413493625 415160936 562500 421875000 564001 565504 423564751 425259008 567009 426957777 568516 428661064 416832723 418508992 420189749 570025 430368875 571536 432081216 433798093 435519512 437245479 438976000 440711081 442450728 444194947 445943744 447697125 449455096 451217663 452984832 454756609 770 592900 456533000 771 59444I 458314011 772 595984 597529 460099648 773 461889917 774 599076 463684824 775 600625 465484375 776 602176 467288576 777 603729 469097433 778 605284 470910952 779 606841 472729139 Square Roots. 26.8328157 .8514432 8700577 .8886593 .9072481 26.9258240 .9443872 9629375 .9814751 27.0000000 • • 27.0185122 .0370117 .0554985 .0739727 .0924344 27.1108834 1293199 .1477439 1661554 .1845544 • 27.2029410 .2213152 .2396769 .2580263 .2763634 27.2946881 3130006 •3313007 3495887 .3678644 • 27.3861279 .4043792 .4226184 •4408455 .4590604 27.4772633 .4954542 5136330 • • 5317998 • 5499546 27.5680975 5862284 .6043475 .6224546 .6405499 27.6586334 .6767050 .6947648 • .7128129 .7308492 27.7488739 7668868 7848880 .8028775 .8208555 27.8388218 .8567766 .8747197 .8926514 .9105715 Cube Roots. 8.9628095 9669570 · .9711007 .9752406 9793766 8.9835089 9876373 .9917620 .9958829 9.0000000 9.0041134 0082229 0123288 •0164309 .0205293 9.0246239 .0287149 .0328021 .0368857 .0409655 9.0450417 .0491142 .0531831 .0572482 .0613098 9.0653677 .0694220 0734726 .0775197 .0815631 9.0856030 .0896392 .0936719 .0977010 1017265 9. 1057485 .1097669 .1137818 .1177931 .1218010 9.1258053 .1298061 .1338034 .1377971 .1417874 9. 1457742 .1497576 .1537375 .1577139 .1616869 • 9. 1656565 1696225 .1735852 .1775445 .1815003 9. 1854527 1894018 • 1933474 .1972897 .2012286 • Recipro- cals. No. 720 721 .001388889 1386963 1385042 1383126 723 1381215 724 722 .001379310 725 1377410 725 1375516 727 1373626 728 1371742 729 .001369863 1367989 1366120 730 731 732 1364256 733 1362398 .001360544 734 735 736 1358696 1356852 737 1355014 738 1353180 739 .001351351 740 1349528 741 1347709 742 1345895 743 1344086 744 .001342282 745 1340483 746 1338688 747 1336898 748 1335113 749 .001333333 750 1331558 751 1329787 752 1328021 753 1326260 754 .001324503 1322751 757 1321004 1319261 758 1317523 759 755 756 .001315789 760 1314060 761 1312336 762 1310616 763 1308901 764 001307190 1305483 765 766 1303781 767 1302083 768 1300390 769 .001298701 770 771 1297017 1295337 772 1293661 773 1291990 774 775 776 .001290323 1288660 1287001 1285347 1283697 779 777 778 652 No. 780 781 782 783 784 00000000000 งงงง 787 788 789 790 791 792 793 794 795 796 797 798 799 807 808 80g 815 816 817 818 819 820 821 800 640000 801 641601 802 643204 644809 803 804 646416 648025 805 806 649636 822 823 824 825 826 TABLE XXVI.—SQUARES, CUBES, SQUARE ROOTS, Squares. Cubes. 608400 609961 611524 613089 614656 616225 617796 619369 620944 622521 833 834 835 836 624100 625681 627264 628849 837 838 839 630436 632025 633616 635209 636804 638401 651249 652864 65448I 677329 678976 680625 682276 827 683929 828 685584 829 687241 810 656100 531441000 811 812 535387328 657721 533411731 659344 813 660969 814 662596 537367797 664225 665856 667489 669124 670761 672400 67404 I 675684 474552000 476379541 478211768 480048687 481890304 483736625 485587656 487443403 489303872 491169069 493039000 494913671 496793088 498677257 500566184 502459875 504358336 506261573 508169592 510082399 512000000 513922401 515849608 517781627 519718464 521660125 523606616 525557943 527514112 529475129 539353144 541343375 543338496 545338513 547343432 549353259 830 688900 571787000 831 573856191 832 575930368 578009537 551368000 553387661 555412248 557441767 559476224 561515625 563559976 565609283 567663552 569722789 690561 692224 693889 695556 580093704 582182875 697225 698896 584277056 700569 586376253 702244 588480472 703921 590589719 Square Roots. 27.9284801 9463772 9642629 .9821372 28.0000000 28.0178515 .0356915 .0535203 · • 0713377 .0891438 28.1069386 .1247222 1424946 1602557 .1780056 28. 1957444 · · 2134720 .2311884 .2488938 .2665881 • 28.2842712 .3019434 3196045 .3372546 3548938 28.3725219 .3901391 .4077454 .4253408 4429253 • · • 28.4604989 .4780617 .4956137 .5131549 5306852 28.5482048 5657137 .5832119 .6006993 .6181760 • 28.6356421 .6530976 .6705424 .6879766 .7054002 28.7228132 .7402157 7576077 7749891 .7923601 28.8097206 8270706 8444102 8617394 8790582 28.8963666 .9136646 • • • • 9309523 9482297 •9654967 Cube Roots. 9.2051641 2090962 • .2130250 2169505 .2208726 9.2247914 2287068 2326189 .2365277 .2404333 9.2443355 2482344 • • .2599114 9.2637973 2676798 2715592 .2754352 .2793081 • 9.2831777 2870440 • 2521300 2560224 .2909072 2947671 .2986239 9.3024775 .3063278 .3101750 .3140190 .3178599 9.3216975 .3255320 .3293634 • 3331916 • 3370167 9.3408386 .3446575 .3484731 3522857 .3560952 • 9.3599016 .3637049 .3675051 .3713022 .3750963 9.3788873 3826752 .3864600 .3902419 .3940206 9.3977964 .4015691 4053387 • 4091054 .4128690 9.4166297 .4203873 .4241420 .4278936 .4316423 • Recipre- cals. .001282051 1280410 1278772 1277139 1275510 .001265823 1264223 1262626 .001273885 785 1272265 786 1270648 787 1269036 788 1267427 789 No. 780 781 792 1261034 793 1259446 794 .001257862 795 796 .001234568 1233046 1231527 782 783 784 1256281 1254705 797 1253133 798 1251564 799 1230012 1228501 .001226994 1225490 .001250000 800 1248439 801 802 1246883 1245330 803 1243781 804 001242236 805 1240695 806 790 791 1239157 807 1237624 808 1236094 80g .001219512 1218027 1216545 1215067 1213592 .001212121 .001204819 1203369 810 811 812 813 814 1223990 817 1222494 818 1221001 819 815 816 820 821 822 823 824 825 1210654 826 1209190 827 1207729 828 1206273 829 830 831 832 1201923 I200480 1199041 834 833 .001197605 835 1196172 836 1194743 837 1193317 838 1191895 839 653 No. Squares 840 841 842 843 844 845 846 847 848 849 850 851 852 853 854 855 856 857 858 859 860 861 862 863 864 865 866 867 868 869 870 871 872 873 874 875 876 877 878 00.00! 78 879 880 881 882 883 884 885 887 888 889 705600 707281 708964 710649 712336 890 891 714025 715716 717409 719104 720801 722500 724201 725904 727609 *729316 731025 732736 734449 736164 737881 748225 749956 751689 753424 755161 756900 758641 760384 762129 763876 765625 767376 769129 774400 776161 886 784996 CUBE ROOTS AND RECIPROCALS 739600 741321 743044 744769 746496 644972544 647214625 649461896 651714363 653972032 656234909 Cubes. 592704000 594823321 596947688 599077107 601211584 603351125 605495736 607645423 609800192 611960049 792100 793881 614125000 616295051 618470208 892 795664 893 797449 894 799236 895 801025 896 802816 897 804609 898 806404 808201 899 620650477 622835864 625026375 627222016 629422793 631628712 633839779 674526133 770884 676836152 772641 679151439 636056000 638277381 640503928 642735647 658503000 660776311 663054848 665338617 667627624 669921875 672221376 777924 779689 688465387 781456 690807104 783225 693154125 695506456 697864103 681472000 683797841 686128968 786769 788544 700227072 790321 702595369 707347971 709732288 712121957 714516984 716917375 719323136 721734273 Square Roots. 724150792 726572699 28.9827535 29.0000000 .0172363 .0344623 0516781 29.0688837 .0860791 .1032644 • .1204396 .1376046 29.1547595 .1719043 1890390 .2061637 2232784 29.2403830 • · .2574777 2745623 .2916370 .3087018 • 29.3257566 .3428015 .3598365 .3768616 .3938769 29.4108823 .4278779 4448637 .4618397 .4788059 • 29.4957624 .5127091 .5296461 5465734 5634910 29.5803989 • 5972972 .6141858 .6310648 .6479342 29.6647939 .6816442 .6984848 704969000 29.8328678 .8496231 .8663690 .8831056 .8998328 29.9165506 .7153159 .7321375 29.7489496 7657521 7825452 .7993289 .8161030 • · 9332591 •9499583 .9666481 .9833287 • Cube Roots. 9.4353880 .4391307 .4428704 .4466072 .4503410 9.4540719 .4577999 4615249 .4652470 4689661 • 9.4726824 .4763957 4801061 .4838136 .4875182 • 9.4912200 .4949188 4986147 .5023078 5059980 • • 9.5096854 5133699 .5170515 .5207303 5244063 9.5280794 • 5317497 .5354172 • 5390818 • 5427437 9.5464027 •5500589 .5537123 •5573630 5610108 9.5646559 5682982 .5719377 • • 5755745 •5792085 9.5828397 .5864682 • 5900939 •5937169 • 5973373 9.6009548 6045696 6081817 • • .6117911 .6153977 9.6190017 .6226030 .6262016 .6297975 .6333907 9.6369812 .6405690 6441542 .6477367 .6513166 • Recipro- cals. 840 841 .001190476 1189061 1187648 1186240 843 1184834 842 844 845 .001183432 1182033 846 1180638 847 1179245 848 1177856 849 No. 850 .001176471 1175088 851 1173709 852 853 854 1172333 1170960 .001169591 1168224 1166861 1165501 1164144 860 .001162791 1161440 861 1160093 862 1158749 1157407 863 864 001156069 1154734 1153403 867 1152074 868 1150748 869 855 856 857 858 859 .001149425 870 1148106 1146789 I145475 1144165 871 872 873 874 875 .001142857 1138952 1137656 865 866 1141553 876 .001129944 1128668 1127396 1126126 1124859 26 78 1140251 877 878 879 880 .001136364 1135074 1133787 882 881 1132503 883 1131222 884 885 886 887 888 889 .001123596 890 1122334 891 1121076 892 1119821 893 1118568 894 .001117318 895 1116071 896 1114827 897 1113586 898 1112347 899 654 No. Squares. Cubes. goo gor 902 903 904 905 906 907 908 gog 910 911 912 913 914 915 916 917 918 919 920 921 922 923 924 925 926 927 928 929 937 938 939 TABLE XXVI.—SQUARES, CUBES, SQUARE ROOTS, 945 946 810000 811801 813604 815409 817216 947 948 949 819025 820836 822649 824464 826281 828100 829921 831744 833569 835396 837225 839056 840889 842724 844561 846400 848241 850084 851929 853776 930 864900 931 866761 932 868624 933 870489 934 872356 935 874225 936 876096 877969 855625 857476 859329 861184 863041 940 883600 941 885481 942 887364 943 889249 944 891136 879844 881721 893025 894916 896809 898704 950 951 952 906304 953 908209 954 910116 902500 904401 729000000 731432701 733870808 736314327 738763264 955 912025 956 913936 957 915849 958 917764 959 919681 741217625 743677416 746142643 748613312 751089429 *753571000 756058031 758550528 761048497 763551944 766060875 768575296 771095213 773620632 776151559 778688000 781229061 783777448 786330467 788889024 791453125 794022776 796597983 799178752 801765089 804357000 806954491 809557568 812166237 814780504 843908625 846590536 849278123 851971392 900601 854670349 817400375 820025856 822656953 825293672 827936019 830584000 833237621 835896888 838561807 841232384 857375000 860085351 862801408 865523177 868250664 870983875 873722816 876467493 879217912 881974079 Square Roots. 30.0000000 .0166620 .0333148 0499584 0665928 30.0832179 .0998339 .1164407 1330383 1496269 · • • • 30.1662063 .1827765 1993377 .2158899 • .2324329 30.2489669 2654919 2820079 2985148 .3150128 • · • 30, 3315018 .3479818 .3644529 3809151 .3973683 30.4138127 .4302481 4466747 .4630924 .4795013 · 30.4959014 5122926 5286750 5450487 .5614136 30.5777697 • • .5941171 .6104557 .6267857 .6431069 30.6594194 .6757233 .6920185 .7083051 7245830 • 30.7408523 .7571130 7733651 .7896086 .8058436 30.8220700 .8382879 8544972 8706981 .8868904 • • 30.9030743 .9192497 .9354166 •9515751 .9677251 Cube Roots. 9.6548938 .6584684 .6620403 .6656096 6691762 9.6727403 .6763017 • 9.6905211 6940694 .6976151 .7011583 7046989 9.7082369 .7117723 • • .7153051 7188354 .7223631 9.7258883 .7294109 6798604 6834166 6869701 .7329309 •7364484 .7399634 9.7434758 7469857 .7504930 • .7539979 .7575002 9.7610001 .7644974 .7679922 .7714845 • .7749743 9.7784616 7819466 .7854288 7889087 7923861 • 9.7958611 .7993336 8028036 8062711 • .8097362 9.8131989 .8166591 .8201169 .8235723 .8270252 9.8304757 .8339238 .8373695 .8408127 .8442536 9.8476920 .8511280 .8545617 .8579929 .8614218 Recipro- cals. IIIIII100° goo 1109878 901 1108647 902 1107420 903 1106195 904 905 1103753 906 1102536 907 908 1101322 I100110 gog .001104972 .001098901 1097695 1096491 910 911 912 1095290 913 914 1094092 .001092896 1091703 1090513 1089325 1088139 001081081 No. 920 .001086957 1085776 1084599 1083424 923 921 922 1082251 924 .001063830 1062699 1061571 915 916 917 918 919 1079914 1078749 927 1077586 928 1076426 929 .001058201 .001075269 930 1074114 931 1072961 932 1071811 933 934 935 1070664 .001069519 1068376 1067236 937 936 1066098 938 1064963 939 925 926 .001047120 942 1060445 943 1059322 944 945 1057082 946 1055966 947 1054852 948 1053741 949 940 941 .001052632 950 1051525 951 1050420 952 1049318 953 1048218 954 955 1046025 956 1044932 957 1043841 958 1042753 959 655 No. Squares. ៩៩៩៩៩៩៦៩៩ ៩៩៩ 960 962 963 964 970 933156 968 935089 937024 969 938961 972 973 974 975 976 977 978 Foto 1 of 10 of oo oo 980 983 984 985 986 988 979 958441 989 995 996 997 998 921600 923521 925444 890277128 927369 929296 893056347 895841344 931225 898632125 954529 956484 1005 1006 990 991 992 984064 993 986049 994 988036 IOIO IOII 1012 976144 978121 940900 912673000 942841 915498611 944784 918330048 946729 948676 921167317 950625 952576 980100 982081 994009 996004 999 998001 990025 992016 1000 1001 1002 1004004 1003 1006009 1004 1008016 1010025 1012036 1014049 1007 1008 1016064 1009 Ιοιδοδι 950400 941192000 962361 944076141 964324 946966168 966289 949862087 968256 952763904 970225 955671625 972196 974169 1000000 1002001 CUBE ROOTS AND RECIPROCALS Cubes. 1020100 1022121 884736000 887503681 1013 1024 144 1026169 1028196 1014 1015 1030225 1016 1032256 1017 1018 1036324 1019 1038361 901428696 904231063 907039232 909853209 924010424 926859375 929714176 932574833 935441352 938313739 958585256 961504803 964430272 967361669 970299000 973242271 976191488 979146657 982107784 985074875 988047936 991026973 994011992 997002999 1000000000 1003003001 100601 2008 1009027027 1012048064 1015075125 1018108216 1021147343 1024192512 1027243729 1030301000 1033364331 1036433728 1039509197 1042590744 1045678375 1048772095 1034289 1051871913 1054977832 1053089859 Square Roots. 30.9838668 31.0000000 .0161248 .0322413 0483494 • 31.0644491 .0805405 0966236 1126984 .1287648 • · 31.1448230 1608729 .1769145 .1929479 2089731 • • 31. 2249900 2409987 .2569992 • 2729915 .2889757 • 31.3049517 • 3209195 3368792 •3528308 .3687743 31.3847097 ·4006369 .4165561 · .4324673 •4483704 31.4642654 •4801525 .4960315 .5119025 • 5277655 31.5436206 •5594677 • 5753068 5911380 6069613 • 31.6227766 .6385840 .6543836 .6701752 .6859590 31.7017349 • 7175030 •7332633 .7490157 7647603 • 31.7804972 .7962262 .8119474 .8276609 8433666 31.8590646 .8747549 .8904374 9061123 .9217794 • • Cube Roots. 9.8648483 .8682724 .8716941 .8751135 .8785305 9.8819451 .8853574 .8887673 .8921749 .8955801 9.8989830 •9023835 .9057817 .9091776 .9125712 9.9159624 .9193513 .9227379 .9261222 .9295042 9.9328839 .9362613 .9396363 .9430092 · 9463797 • 9.9497479 9531138 9564775 .9598389 .9631981 • 9. 9665549 .9699095 .9732619 .9766120 .9799599 9.9833055 .9866488 .9899900 9933289 .9966656 • 10. 0000000 0033322 0066622 .0099899 .0133155 10.0166389 .0199601 • • .0232791 .0265958 .0299104 10.0332228 .0365330 .0398410 .0431469 .0464506 10.0497521 .0530514 .0563485 .0596435 0629364 Recipro- cals. 960 .001041667 1040583 961 1039501 962 1038422 963 964 1037344 .001036269 1035197 1034126 1033058 1031992 .001030928 1029866 .001025641 No. 970 971 1028807 972 1027749 973 1026694 974 975 976 .001020408 1019368 1018330 1017294 1016260 .001015228 1014199 1013171 1012146 1011122 965 966 967 968 969 1024590 1023541 977 1022495 978 1021450 979 ΙΟΙΟΙΟΙ00 980 981 982 983 foot of 60 60 00 00 984 985 986 987 988 989 990 1009082 991 1008065 992 1007049 993 1006036 994 .001005025 995 1004016 996 1003009 997 1002004 998 1001001 999 .001000000 1000 1001 0999001 0998004 1002 0997009 1003 0996016 1004 .000995025 1005 0994036 1006 0993049 1007 0992063 1008 0991080 1009 .000990099 1010 0989120 IOII 0988142 1012 0987167 1013 0986193 1014 .000985222 1015 0984252 1016 0983284 1017 0982318 1018 0981354 1019 APPENDIX PARTIAL THEORY OF THE SPIRAL PARTIAL THEORY OF THE SPIRAL Derivation of Coordinates X and Y.-From Fig. 5-3, When the cosine and the sine dx=dl cos 8 and dy=dl sin 8. are expressed as infinite series, and But dô=dl, p integrating gives: and and dx=dl[1–2171 + Therefore, dx=dl 1 APPENDIX But dy = d[ 3 - 1 1 + 5,729.58 d dy=dl a l2 M k l2 1,145,916 x=i[1– [ 2 = 1 [3/3 tan a= 2!' 4! dx=di[1- + 87 3!' 5! 7! 83 3 7(3!) = and d= 84 86 6! 85 a³ 16 8371803 3! (for simplicity) a 12 a² 14. a4 18 a6 (12 2! 4! + i+...] ...] a5 710 5! 82 84 + 5(2!) 9(4!) The result obtained by integrating and substituting & for a l² is kl 100' 85 + 11(5!) Substituting and a01² + ...] 6! a7 714 7! 86 13(6!) ....] + s+...] +...] 87 15(7!)+ (A-2) Equations A–1 and A-2, in which ▲ is substituted for 8, are used in calculating X and Y for insertion in spiral tables, such as Tables XI and XII in Part III. Derivation of Correction C in a = 38 — C.—Dividing equa- tion A-2 by equation A-1 gives: y d 83 26 85 ;+: + X 3 105 155,925 a=tan a- tan³ a+ tan³ a- ... (A-1) 17 87 3,378,375 (A-3) (A-4) 659 660 APPENDIX When the value of tan a from equation A-3 is substituted in equation A-4 and like terms are collected, the result is 32 85 128 87 83,284,288 δ 883 (A-5) 3 or a 2,835 467,775 a= 8-a small correction C 3/3/3 Radians being converted to minutes, the value of the correc- tion C is: C (in minutes)=516 (10)-7 8³+381 (10)−12 85+ . . . (A-6) The corrections in Table XVI-C were computed from equation A-6. Source of the Corrections Marked * for Conversion to A.R.E.A. Spiral.-In the case of a spiraled curve, changing the definition of the degree of the simple curve from Da to De affects only the coordinates of the offset T.C. In Table XI the * corrections to be subtracted from the coordinates of the offset T.C. based upon De, in order to obtain those based upon Dc, are: (X−Ra sin A)−(X− Rc sin A)=(R – Ra) sin A (A-7) and (Y-Ra vers ▲) — (Y - Re vers A) = (R. - Ra) vers ▲ (A-8) In Table XII the coefficients come from the following relations: Total correction to X。 = (R.- Rɑ) sin ▲=* times D Total correction to o= (R. - Ra) vers ▲ (Rc-Ra) vers A=* times D INDEX Aerial photography; see also Photogrammetry advantages of, 339, 340 in canal surveys, 318, 339 in highway location, 309-11 miscellaneous uses of, 337, 338 in pipe-line surveys, 317 in route surveying, 321-42 Aerotriangulation INDEX analytic, 362, 363 instrumental, by bridging, 362 Alignment design horizontal, on highways, 193-243, 252 by paper-location, 271-73 vertical, on highways, 243- 254 American Association of State Highway Officials, 298, 351 design policies of, 187, 306 American Railway Engineer- ing Association formula for track superele- vation of, 278, 280 recommendation for spiral length by, 218, 280 recommendation for ver- tical curves by, 69 ten-chord spiral of, 109, 660 trackwork plans of, 291 American Road Builders' Association, 298 Analytic geometry, solution of curve problems by, 179-81, 353 Areas of cross-sections; Cross-sections see of pavement on curves, 240 Auscor; see Stereomat Automation in field 343-48 in location and design, 343-65 in plotting, 357-59 in recording field data, 355 terminology in, 348 measurements, Balance lines on mass dia- gram, 145-52 Balance points, 143, 144, 152 Ball bank indicator, 200–203 Balplex plotter, 325 Base line, 266, 302 Binary numbers, 350 Body roll, 199–203 Borrow pits, 138-41 Broken-back curve, 171-73, 252 Bureau of Public Roads, 297, 299, 300, 305, 351-55 Canal surveys, 318, 339 Central angle of circular curve, 14 of spiral, 86, 87, 102 Change-of-location problems. examples of, 165–70 hints for solving, 165-67 Checking of computations, 40, 41 of curve by middle ordi- nate, 27 of field work on curves, 21. 26, 27 Chord; see also Subchords long (L.C.), of simple curve, 14 Chord-gradient method of calculating vertical curves, 69-72 663 664 INDEX Chord lengths on circular curves, 27, 28 Chord offsets, 32-36 Circular curve; see Simple curve Clothoid, 85 Compound curve calculation of, 58, 59 completely-spiraled, 103-5 definition of, 50 location of, by trial, 61, 62 notation for, 50, 51 notes and field work for, 61. 62 with P.I. inaccessible, 160, 161 problems on, 63, 64 rigid solution of, 50 solution of by construction, 52, 53 by traverse, 53-57 vertex triangle, 51, 52 summary of methods of solving, 57, 58 three-centered, 59 use of, 50 Computation methods of, 39-41 rounding off numbers in, 42-45 significant figures in, 42-45 Construction survey methods for location, in highway 307, 308 in railroad location, 276- 278 relation of, to other sur- veys, 6 Contour map field sketches for, 269, 270 by photogrammetry, 327- 330 purpose and limitations of, 8,9 Contours; see Topography Controlling points, 3, 4, 264 Controls for horizontal alignment, 252 for vertical alignment, 254 Coordinatograph, 357 Cross-section leveling, 124, 125, 301, 303 Cross-sectioning on highways, 301, 303 methods of, 124–29 on Pennsylvania Turnpike, 320 Cross-sections areas of by calculating machine, 121 by formulas, 119-121 by graphic methods, 124 digital, 361 location of, 117–19 types of, 116, 117, 123 Crown adverse, 196, 197 favorable, 196, 197 Curvature aesthetic importance of, 3 correction for, in earth- work, 136-38 use of, in route location, 3 Curve broken-back, 171–73, 252 by-passing obstacles on, 30, 31, 37 circular, length of, 19 compound; see Compound curve degree of, 15-17 easement, 83-85 even-radius, 31, 107, 108 highway; see Highway horizontal; Simple curve with inaccessible P. I. or T.C., 160-63 measurements along, 17, 18, 26-30 metric, 31, 32 see INDEX 665 Curve (Cont.) parabolic; see Parabolic curves, Vertical curve parallel to simple curve, 37-39 parallel to spiral, 111, 238– 240 primary purpose of, 12 reverse; see Reverse curve simple; see Simple curve spiraled; see Spiraled curve stakes on, 28-30 staking by deflection angles, 22- 24 by offsets, 32–37 stationing on, 18 through fixed point, 175- 177 transit set-ups on, 24-26 vertical; see Vertical curve Curve problems in highway design, 185–261 special examples of, 159–184 methods of solving, 159, 160 Curve tables [see tables in Part III of book] Data plotter, 357 presentation, 348, 362 processing, 348 procurement, 348 recording, 348, 355, 356 reduction, 348 transmission, 348, 356, 357 Deflection angle from set-up on spiral, 97- 101 to spiral, 89-93 Deflection-angle method for circular curves, 22-24 Degree of curve arc definition of, 16 chord definition of, 16 Degree of curve (Cont.) formulas for, 16 selection of, 21 Design; see Office studies Development, 3, 5 Digital computer; see Electronic computer terrain data, 359-62 terrain model, 359–62 Distribution of earthwork, 142-52 Earthwork analysis of by mass diagram, 145–52 by station-to-station method, 144 balance lines in, 145–52 balance points in, 143, 144, 152 basis of payment for, 115, 123 calculation of, 131-34 classification of, 115, 123 correction of, for curva- ture, 136-38 cross-sections of; see Cross-sections estimate of, 271, 272, 334 from aerial photographs, 334 operations included under, 115 practice problems in, 152- 155 shrinkage, swell, and set- tlement of, 141, 142 slope staking for, 126-29 tables for computation of, 131-34 volume of; see Volume of earthwork Easement curves, 83-85; see also Spirals Edge lengths on highway curves, 236-38 666 INDEX Electronic computer advantages of, 352, 353 earthwork quantities by, 354 fundamentals of, 349-51 horizontal alignment by, 354, 355 programs in route loca- tion, 351-55 traverse computation by, 354 vertical alignment by, 355 Electroplotter, 357 Electrotape, 347 Elevations; see Leveling Excavation; see Earthwork External distance of simple curve, 14 of spiral, 91 Field notes for by-passing obstacles, 275, 276 for compound curves, 61 for cross-section leveling, 124, 125 for simple curve, 23, 24 for slope staking, 127, 130 for spiraled curve, 94, 95 Field work [see type of sur- vey desired] Floating mark, 325–27 Free haul, 142-44, 147-51 Galileo-Santoni Stereocarto- graph, 325 General Motors Proving Ground, 197, 199, 203, 206 Geodimeter, 343–45 Grade balance between curvature and, 3 Grade contour, 271, 318 Grade rod, 128, 129 Ground control by bridging, 327, 362 in photogrammetric map- ping, 323-27, 337, 362 by radar, 324 Hand level in cross-sectioning, 125 topography by, 268-70 Headlight sight distances, 247-49, 251 Highway cross-sectioning on, 301, 303 curves in edge lengths on, 236-38 pavement areas on, 240 vehicle operation on, 215-21, 197-99, 213, 227, 228 design elements of, in re- lation to speed, 186, 187 design speed on, 187 location of, examples of, 308, 309 over-all travel speed on, 187 preparation of plans for, 298-301, 305–7 relocation of, survey meth- ods in, 301-303 running speed on, 187 side friction factor on; see Side friction factor sight distances on; see Sight distance speed signs on, 203 superelevation of; see Su- perelevation surveys for, 297-312 test track design, 199 widening, on curves; see Widening of highway Highway projects, magni- tude of, 11 Highway Research Board, 298, 312, 341, 342, 363– 365 INDEX 667 Inaccessible points on curves, 160-63 Integrated mapping system, 359 Integration of photogramme- try and computer, 359– 363 Intersection of line and curve, 177, 178 point of, for horizontal curve, 13 Kelsh plotter, 325, 360 L-line, 273, 274 Length of curve, definition of on horizontal curve, 19 on vertical curve, 66 Leveling bench, 266, 267 on on location survey, 274 preliminary surveys, 266, 267 profile, 267, 274 Limit of economic haul, 143, 149 Location controls, 3, 4, 264 Location survey function of, 9 methods of, in railroad lo- cation, 273–75 relation of, to other sur- veys, 5, 6 Maps accuracy of, 328, 337, 340 base, 322 photogrammetric, costs of, 335, 336 planimetric, 322, 324, 333 scales of, in photogram- metry, 328-30, 333, 334, 336 topographic, by photo- grammetric methods, 322, 327-30 Mark sense cards, 348, 355 Mass diagram, 145–152 Merritt Parkway, 253 Metric curves, 31, 32 Middle-ordinate method of staking curve, 32, 36 Middle ordinate of simple curve, 14 Mosaic controlled, 322, 323 uncontrolled, 322, 323 Multiplex plotter, 325, 326 National map-accuracy standards, 328, 329 Nistri Photocartograph, 325 Photostereograph, 325 Notes; see Field notes Obstacles, by-passing on curves, 30, 31, 37, 162-65 on tangents, 274-76 Office studies in highway design, 305–307 in paper location, 271–73 relation of, to field work, 5 Offset curve parallel to simple curve, 37-39 parallel to spiral, 111, 238- 240 Offset T. C., 87 Offsets formulas for, 33, 34 staking curves by, 32-37 Ordinates from a long chord, 32, 37 Orthophotography, 330 Osculating circle, 95–97 Overhaul, 142-44, 147-52 Oversteering, 198, 199 P-line, 266, 273, 274 668 INDEX Paper location procedure, 271-73 Parabolic curves laying out, by taping, 79, 80 uses of, 65 Parallel curve; see Offset curve Pennsylvania Turnpike aerial surveys on, 329 cross-sectioning on, 320 high-speed tests on, 199, 204, 219, 228 run-off design on, 225, 226 sight distances on, 248 spirals on, 219, 226 Photo-contour map, 330 Photogrammetry; see also Aerial photography definitions in, 321, 322 for detailed location studies, 309-11, 333, 334 integration of, with com- puter, 359-63 limitations of, 338, 339 plotting instruments in, 325 for reconnaissance, 310, 330-33 Photographs, aerial, types of, 321 Photronix, Inc., 359, 360 Pipe-line surveys, 316, 317, 333 Point of intersection, 13 Preliminary survey earthwork estimate from, 272, 273 leveling on, 266, 267 plotting map of, 270 purposes of, 7, 8 in railroad location, 266-70 relation of, to other sur- veys, 5 topography on, 267–70 traverses on, 265, 266 Prismoidal formulas, 134-36 Property surveys, 278 Radar altimetry, 348 Radius of circular arc, 13-16 Railroad location, economics of, 294 Railroad relocations, 293-95 Railroad surveys, 262-96 Railroad track layouts for, 290-93 realignment problems with, 289, 290 string lining of, 281-88 superelevation of, 278-80 Railroad turnout and cross- over, 291 [see also Table XXIV in Part III of book] Railway; see Railroad Reaction time, 188–90 Reconnaissance aerial, 301, 302, 310, 330, 331 for highway location, 302, 310, 311 importance of, 6, 7 instruments for, 262 for railroad location, 262, 264 relation of, to other sur- veys, 5 by stadia method, 265 Relocation by field location method, 8 problems on, examples of, 170-75 railroad, 293-95 Reverse curve definition of, 50 limitations and use of, 59, 60 non-parallel-tangent, 61 notes and field work for, 61 parallel-tangent, 60 practice problems on, 63, 64 INDEX 669 Reverse curve (Cont.) replacement of, 173, 174 Rounding off, 42–45 Route location; see Route surveying controlling points in, 3, 4, 264 also cross-drainage line in, 5 importance of curves and grades in. 3 influence of terrain on, 4, 5 influence of type of project on, 4 proper use of topography in, 8, 9 ridge line in, 4 side-hill line in, 4 use of development in, 3, 5 valley line in, 4 Route surveying; see also Route location accuracies required in, 10, 11 aerial photography in, 321– 342 definition and purposes of, 1 and design, 2 and economics, 2 and engineering, 9 sequence of field and office work in, 5, 6 Rule of offsets, 67 Runoff; see Superelevation Runout, 226 Seismic studies, 304 Semi-final location, 9 Settlement of embankment, 142 Shrinkage of earthwork, 141, 142 Side friction factor, 197 recommended values of, 205 research on, 199–206 Sight distance headlight, 247, 248–51 on horizontal curves, 240- 243 at interchanges, 251, 252 passing, 188, 190-94 stopping, 188-90 at underpass, 251, 252 on vertical curves, 243-51 Significant figures, 39-45 Simple curve; see also Curve computations for, 20, 23 field work in staking, 21–31 formulas for, 32–34 methods of superelevating, 226-28 methods of widening, 228- 235 notation for, 13, 14 parallel offset to, 37-39 practice problems on, 45-49 with spirals, 90-94 Slip angles, 198, 199 Slope-staking, 126-29 Soil surveys, 303-305 Special curve problems examples of, 159-84 methods of solving, 159, 160 Speed on highways; Highway Spiral; see Curve see also Spiraled A.R.E.A. ten-chord, 109, 660 between arcs of compound curve, 101-103 calculation of, 91-93, 95 without special tables, 109 central angle of, 86, 87, 102 with compound curve, 103– 105 deflection angles to, 89, 90. 92, 93 double, 108 Euler, 85 external distance of, 91 670 INDEX Spiral (Cont.) field work for, 91, 92, 110 geometry of the, 85-90 importance of the, 228 laying out, by taping, 110, 111 length of, 213-21, 280 locating any point on, 93, 94 long chord for, 90 long tangent for, 90 minimum cuvature for use of, 221, 222 notation for, 83, 87-91 offsets to, 89, 110 osculating circle to, 95-97 parallel offset to, 111, 238- 244 on Pennsylvania Turn- pike, 219, 226 problems on, 111–14 on railroad track, 280, 281 short tangent for, 90 with simple curve, 90-94 tables on [see tables in Part III of book] tangent distance of, 90, 91 theory of the, 659, 660 throw of, 88 transit set-ups on, 97-101 types of, 85 Spiral angle, 86 Spiraled curve to fit given Es or Ts, 105– 107 formulas for, with radius as parameter, 107, 108 methods of superelevating, 223-26 methods of widening, 230- 233 with unequal spirals, 91 Stadia, topography by, 267, 268 Stadia traverse, 265, 266 Stakes construction, 277, 307 slope, 126–29, 307 Stakes (Cont.) station, 29, 266, 277, 302, 307 Station equation, 165 Station-to-station method of earthwork analysis, 144 Station-yard, 142 Stationing on curves, 17, 18 of tangent points, 21 Stereomat, 348, 358 Stereomodel, 323, 326 Stereoscopic fusion, 323, 325 overlap, 322 pairs, 321, 323, 325, 327, 331, 335 plotting instruments, 325 vision, importance of, 323 String lining of railroad track, 281-288 Subchords formulas for, 19, 34 nominal, 18 subdeflections for, 22 true, 18 Subdeflections for subchords, 22 Superelevation effect of, on spiral length, 217-19 maximum rates of, 206-11 methods of attaining, 223- 228 railroad-track, 278–80 rate of, over range of curvature, 211 rates of, for design, 211–13 theory of, 193–97 Superelevation runoff, length of, 222, 223 Survey [see type of survey desired] relation of, to engineering, 9, 11 swell of earthwork, 141 INDEX 671 Tables, use of, 19, 20 [see also tables in Part III of book] Tangent back (initial), forward, 14 Tangent distance 14 of simple curve, 14 of spiral, 90, 91 Tangent offsets for horizontal curve, 32, 36 to spiral, 89 for vertical curve, 72, 74 Tangent points on simple curve, 14, 21 on spiraled curve, 83 Tellurometer, 344, 346, 347 Terrain influence of, on route loca- tion, 4, 5 types of, 4, 5 Throw of spiral, 88 Ties between P-line and L- line, 273, 274 Topography by field-sketch method, 269, 270 by hand level, 268, 269 in highway relocation, 303 by photogrammetry, 327, 333 plotting, 268, 270 proper use of, 8, 9 by stadia, 267, 268 Transit set-ups rule for, on circular curve, 25 on spiral, 97-101 Transmission lines location of, 4 surveys for, 314–16, 333 Traverse solution of curve problems, 53-57, 161, 167, 168 stadia, 265, 266 transit-and-tape, 266 Trilateration, 344 Tunnel surveys, 319, 320 Underpass, sight distances at, 251, 252 Understeering, 198 Vertex of horizontal curve, 13 Vertical curve by chord gradients, 69–72 drainage requirements on, 247, 251 equal-tangent, 65–68 length of, 66, 243–251 lowest or highest point (turning point) 75, 76 on, to pass through fixed point, 76-79 problems, 80-82 reversed, 79 sight distances on, 243-51 by tangent offsets, 73, 74 at underpass, 251 unequal-tangent, 73, 75, 353 Volume of earthwork by average end areas, 129- 131 from borrow pits, 138-41 corrected for curvature, 136-38 by prismoidal formula, 134-36 by tables, 131–34 Wellington, A.M., 6 Widening of highway formulas for, 229 methods of attaining, 230- 235 reasons for, 228, 229 Wild Autograph, 325 Zeiss Stereoplanigraph, 325 2 200 Patt 400 i UNIVERSITY OF MICHIGAN 3 9015 00457 5091 tr $ Meme 7640413 कर : ----- *