An Elementary Treatise on Plane & Spherical Trigonometry: With Their Applications to Navigation, Surveying, Heights, and Distances, and Spherical Astronomy, and Particularly Adapted to Explaining the Construction of Bowditch's Navigator, and the Nautical Almanac |
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Page 176
... ( 307 ) which is one of the fundamental equations of Spherical Trigonometry . 48. Corollary . We have , by ( 55 ) , cos . C1 + 2 ( cos . C ) 2 , Column of Log . Rising of Table XXIII . which 176 [ CH . III . SPHERICAL TRIGONOMETRY .
... ( 307 ) which is one of the fundamental equations of Spherical Trigonometry . 48. Corollary . We have , by ( 55 ) , cos . C1 + 2 ( cos . C ) 2 , Column of Log . Rising of Table XXIII . which 176 [ CH . III . SPHERICAL TRIGONOMETRY .
Page 177
... Table XXIII of the Navigator . This column contains the values of log . 2 ( sin . C ) 2 = 2 log . sin . C + log . 2 - 2 log . sin . C + 0.30103 . ( 310 ) But the decimal point is supposed to be changed so as to correspond to the table ...
... Table XXIII of the Navigator . This column contains the values of log . 2 ( sin . C ) 2 = 2 log . sin . C + log . 2 - 2 log . sin . C + 0.30103 . ( 310 ) But the decimal point is supposed to be changed so as to correspond to the table ...
Page 178
... table XXIII , the following rule is ob- tained for finding the third side , when two sides and the included angle are given . Add together the log . Rising of the given angle , and the log . sines of the two given sides . The sum is the ...
... table XXIII , the following rule is ob- tained for finding the third side , when two sides and the included angle are given . Add together the log . Rising of the given angle , and the log . sines of the two given sides . The sum is the ...
Page 183
... Table XXIII . 58. Corollary . In the same way ( 309 ) becomes by ( 99 ) , cos . A cos . ( BC ) +2 sin . B sin . C ( cos . a ) 2 , ( 319 ) from which the value of the third side may be found , 59. EXAMPLES . 1. Given in a spherical ...
... Table XXIII . 58. Corollary . In the same way ( 309 ) becomes by ( 99 ) , cos . A cos . ( BC ) +2 sin . B sin . C ( cos . a ) 2 , ( 319 ) from which the value of the third side may be found , 59. EXAMPLES . 1. Given in a spherical ...
Page 193
... Table XXIII , 72. Corollary . If , in ( 42 ) , we make M = ( ab + c ) = s — b z ( a + b + c ) = s — a , N = 2 we have The three sides given . and ( 42 17 § 72.1 SPHERICAL OBLIQUE TRIANGLES . 193.
... Table XXIII , 72. Corollary . If , in ( 42 ) , we make M = ( ab + c ) = s — b z ( a + b + c ) = s — a , N = 2 we have The three sides given . and ( 42 17 § 72.1 SPHERICAL OBLIQUE TRIANGLES . 193.
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A₁ aberration altitude and azimuth angle given ascension and declination azimuth celestial equator celestial sphere centre circle computed Corollary corr correct central altitude corresponding cosec cosine cotan diff difference of latitude difference of longitude dist earth eclipse of April equal to 90 formula gives Greenwich Hence horizon horizontal parallax hour angle hypothenuse included angle interval latitude and longitude lunar distance mean meridian altitude method middle latitude moon's motion N₁ Napier's Rules Nautical Almanac Navigator Nutation obliquity obtuse perpendicular plane polar triangle prime vertical Problem R₁ radius reduced right ascension sailing Scholium second member semidiameter sideral sideral day solar eclipse Solution solve the triangle spherical right triangle spherical triangle star's sun's Table XXIII tang tangent Theorem transit triangle ABC Trig true latitude tude vernal equinox whence
Popular passages
Page 156 - I. The sine of the middle part is equal to the product of the tangents of the adjacent parts.
Page 145 - A spherical triangle is a portion of the surface of a sphere, bounded by three arcs of great circles.
Page 48 - As the sine of the angle opposite the given side is to the sine of the angle opposite the required side, so is the given side to the required side. Thus, if a (fig.
Page 50 - The third side is found by the proportion. As the sine of the given angle is to the sine of the angle opposite the required side, so is the side opposite the given angle to the required side.
Page 41 - Since, when an angle is acute its supplement is obtuse, it follows from the preceding proposition, that the sine and cosecant of an obtuse angle are positive, while its cosine, tangent, cotangent, and secant, are negative.
Page 53 - The sum of any two sides of a triangle is to their difference, as the tangent of half the sum of the angles opposite to those sides, to the tangent of half their difference.
Page 182 - But a' = 180° - A, b' = 180° - ß, c' = 180° - C. and A' = 180° - a. Therefore, — cos A = (— cos B)(— cos C) + sin B sin C(— cos a...