Spherical Trigonometry, for the Use of Colleges and Schools: With Numerous Examples |
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Page 126
... cos TU = cos TA cos UA + cos TB cos UB + cos TC cos UC . B ༤༤ T and A By Art . 37 we have COS TU = = cos TA cos UA + sin TA sin UA cos TAU , cos TAU = cos ( BAU – BAT ) therefore and therefore = cos BAU cos BAT + sin BAU sin BAT = cos ...
... cos TU = cos TA cos UA + cos TB cos UB + cos TC cos UC . B ༤༤ T and A By Art . 37 we have COS TU = = cos TA cos UA + sin TA sin UA cos TAU , cos TAU = cos ( BAU – BAT ) therefore and therefore = cos BAU cos BAT + sin BAU sin BAT = cos ...
Page 128
... cos TU = λ cos a + μ cos ß + v cos y ; Σ = G cos TU . Thus , whatever may be the position of T , the sum of the cosines of the arcs which join T to the fixed points varies as the cosine of the single arc which joins T to a certain fixed ...
... cos TU = λ cos a + μ cos ß + v cos y ; Σ = G cos TU . Thus , whatever may be the position of T , the sum of the cosines of the arcs which join T to the fixed points varies as the cosine of the single arc which joins T to a certain fixed ...
Page 134
... cos TU . 3 ( λX ' + μμ ' + vv ' ) Thus the sum of the products of the cosines is equal to the product of the cosine of TU into a third of the number of the solid angles of the regular polyhedron . 182. The result obtained in Art . 177 ...
... cos TU . 3 ( λX ' + μμ ' + vv ' ) Thus the sum of the products of the cosines is equal to the product of the cosine of TU into a third of the number of the solid angles of the regular polyhedron . 182. The result obtained in Art . 177 ...
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Common terms and phrases
2pµv a+b+c ambiguity angular points approximately arcs drawn arcs which join bcos bisecting centre circular measure cos b cos cos TU cos² cos³ cosines Crown 8vo deduce denote equation equilateral escribed circles example expression faces fixed points formulæ formulæ in Art greater Hence inscribed Legendre's Theorem less Let ABC lune meet middle point Napier's analogies Napier's Rules obtain octahedron opposite sides parallelepiped Plane Geometry plane triangle Plane Trigonometry polar triangle pole polygon position preceding Article primitive triangle quadrant r₁ regular polyhedron respectively result right angles right-angled triangles shew shewn Similarly sin b cos sin b sin sin² sin³ sine small circle described solid angles solution sphere spherical excess spherical triangle Spherical Trigonometry straight lines subtended suppose surface tangent tetrahedron
Popular passages
Page 28 - If two triangles have two sides of the one equal to two sides of the...
Page 49 - B . sin c = sin b . sin C cos a = cos b . cos c + sin b . sin c cos b = cos a . cos c + sin a . sin c cos A cos B cos c = cos a . cos b + sin a . sin b . cos C ..2), cotg b . sin c = cos G.
Page 12 - Any two sides of a spherical triangle are together greater than the third side.
Page 19 - Thus the sines of the angles of a spherical triangle are proportional to the sines of the opposite sides.
Page 30 - From this proposition, it is obvious that if one angle of a triangle be equal to the sum of the other two angles, that angle is a right angle, as is shewn in Euc.
Page 1 - A sphere is a solid bounded by a surface, every point of which is equally distant from a fixed point called the centre.
Page 62 - A circle which touches one side of a triangle and the other two sides produced, is called an escribed circle of the triangle.
Page 15 - If one angle of a spherical triangle be greater than another, the side opposite the greater angle is greater than the side opposite the less angle.