Tables of Logarithms of Numbers and of Sines and Tangents for Every Ten Seconds of the Quadrant: With Other Useful Tables |
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Page 5
... Circle and its Parts . Mensuration of Solids . Rail - way Excavations or Embankments Regular Polyedrons ... The three Round Bodies .. Area of a Spherical Triangle .. Definitions f - 4 7 9 14 10 17 17 18 288 20 23 29 32 36 42 46 48 52 57 ...
... Circle and its Parts . Mensuration of Solids . Rail - way Excavations or Embankments Regular Polyedrons ... The three Round Bodies .. Area of a Spherical Triangle .. Definitions f - 4 7 9 14 10 17 17 18 288 20 23 29 32 36 42 46 48 52 57 ...
Page 6
... - angled Spherical Triangles . Examples of Oblique - angled Triangles Trigonometrical Formulæ Sailing on an Arc of a Great Circle 155 158 160 163 165 171 176 TRIGONOMETRY . BOOK I. THE NATURE AND PROPERTIES OF LOGARITHMS vi CONTENTS .
... - angled Spherical Triangles . Examples of Oblique - angled Triangles Trigonometrical Formulæ Sailing on an Arc of a Great Circle 155 158 160 163 165 171 176 TRIGONOMETRY . BOOK I. THE NATURE AND PROPERTIES OF LOGARITHMS vi CONTENTS .
Page 20
... circle is supposed to be divided into 360 equal parts , called degrees ; each degree into 60 minutes , and each minute into 60 seconds . Degrees , min- utes , and seconds are designated by the characters , ' , " . Thus 23 ° 14 ′ 35 ...
... circle is supposed to be divided into 360 equal parts , called degrees ; each degree into 60 minutes , and each minute into 60 seconds . Degrees , min- utes , and seconds are designated by the characters , ' , " . Thus 23 ° 14 ′ 35 ...
Page 21
... circle through one extremity of the arc , and is lim ited by the tangent drawn through the other extremity . Thus CI is the secant of the arc AF , or of the angle ACF . ( 26. ) The cosine of an arc is the sine of the complement of that ...
... circle through one extremity of the arc , and is lim ited by the tangent drawn through the other extremity . Thus CI is the secant of the arc AF , or of the angle ACF . ( 26. ) The cosine of an arc is the sine of the complement of that ...
Page 22
... circle by R , cos . A : sin . A :: R : tang . A. R sin . A cos . A Whence tang . A = 2. CG :: CF : CA : CI ; that is , cos . A : R :: R : sec . A. Whence sec . A : R2 cos . A ' 3 GF : CG :: CD : DL ; that is , sin . A : cos . A :: R ...
... circle by R , cos . A : sin . A :: R : tang . A. R sin . A cos . A Whence tang . A = 2. CG :: CF : CA : CI ; that is , cos . A : R :: R : sec . A. Whence sec . A : R2 cos . A ' 3 GF : CG :: CD : DL ; that is , sin . A : cos . A :: R ...
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Common terms and phrases
9 I I altitude angle of elevation arithm base chains circle Co-sine Co-tangent complement computed correction cosecant course and distance decimal diameter diff difference of latitude difference of longitude Dist divided equal equator fifth figure find the angles find the area find the Logarithm frustum given number given the angle height Hence horizontal plane hypothenuse inches latitude and departure length LO LO LO logarithmic sine measured meridian middle latitude miles minutes Multiply natural number nautical miles parallel parallel sailing perpendicular places plane sailing Prob Prop proportional quadrant radius Required the logarithmic right-angled spherical triangle right-angled triangle Sandy Hook secant ship sails side AC spherical triangle ABC SPHERICAL TRIGONOMETRY station subtract surface tabular number tang Tangent telescope theodolite Theorem vernier vertical Vulgar Fraction wyll yards zoids ΙΙ ΙΟ
Popular passages
Page 20 - The circumference of every circle is supposed to be divided into 360 equal parts, • called degrees, each degree into 60 minutes, and each minute into 60 seconds, etc.
Page 163 - In any spherical triangle, the sines of the sides are proportional to the sines of the opposite angles. In the case of right-angled spherical triangles, this proposition has already been demonstrated.
Page 69 - FIND the area of the sector having the same arc with the segment, by the last problem. Find also the area of the triangle, formed by the chord of the segment and the two radii of the sector.
Page 54 - C' (89) (90) (91) (92) (93) 112. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference.
Page 69 - TO THE NUMBER OF DEGREES IN THE ARC ; So IS THE AREA OF THE CIRCLE, TO THE AREA OF THE SECTOR.
Page 73 - To find the solidity of a pyramid. RULE. Multiply the area of the base by one third of the altitude.
Page vi - The characteristic of the logarithm of ANY NUMBER GREATER THAN UNITY, is one less than the number of integral figures in the given number.
Page 184 - If a heavy sphere, whose diameter is 4 inches, be let fall into a conical glass, full of water, whose diameter is 5, and altitude 6 inches ; it is required to determine how much water will run over ? AHS.