OF THE CIRCULAR PARTS. Fig. 15. IN any right angled spherical triangle ABC, the complement of the hypothenuse, the complements of the angles, and the two sides are called The circular parts of the triangle, as if it were following each other in a circular order, from whatever part we begin : thus, if we begin at the complement of the hypothenuse, and proceed towards the side BA, the parts following in order will be the complement of the hypothenuse, the complement of the angle B, the side BA, the side AC, (for the right angle at A is not reckoned among the parts), and, lastly, the complement of the angle C. And thus at whatever part we begin, if any three of these five be taken, they either will be all contiguous or adjacent, or one of them will not be contie guous to either of the other two: in the first case, the part which is between the other two is called the Middle part, and the other two are called Adjacent extremes. In the second case, the part which is not contiguous to either of the other two is called the Middle part, and the other two Opposite extremes. For example, if the three parts be the complement of the hypothenuse BC, the complement of the angle B, and the side BA; since these three are contiguous to each other, the complement of the angle B will be the middle part, and the complement of the hypothenuse BC and the side BA will be adjacent extremes : but if the complement of the hypothenuse BC, and the sides BA, AC be taken ; since the complement of the hypo. thenuse is not adjacent to either of the sides, viz. on account of the complements of the two angles B and C intervening between it and the sides, the complement of the hypothenuse BC will be the middle part, and the sides, BA, AC opposite ex. tremes. The most acute and ingenious Baron Napier, the inventor of Logarithms, contrived the two following rules concerning these parts, by means of which all the cases of right angled spherical triangles are resolved with the greatest ease. RULE I. The rectangle contained by the radius and the sine of the mid dle part, is equal to the rectangle contained by the tangents of the adjacent parts. RULE II. The rectangle contained by the radius, and the sine of the mid dle part is equal to the rectangle contained by the co-sines of First, Let either of the sides, as BA, be the middle part, and Fig. 16. therefore the complement of the angle B, and the side AC will be adjacent extremes. And by Cor. 2. prop. 17. of this, S, BA is to the Co-T, B as T, AC is to the radius, and therefore RxS, BA=Co-T, BAT, AC. The same side BA being the middle part, the complement of the hypothenuse, and the complement of the angle C, are opposite extremes; and by prop. 18. S, BC is to the radius, as S, BA to S, C; therefore RxS, BA=S, BCS, C. Secondly, Let the complement of one of the angles, as B, be the middle part, and the complement of the hypothenuse, and the side BA will be adjacent extremes: and by Cor. prop. 20. Co-S, B is to Co-T, BC, as T, BA is to the radius, and therefore RxCo-S, B=CO-T, BCXT, BA. Again, Let the complement of the angle B be the middle part, and the complement of the angle C, and the side AC will be opposite extremes: and by prop. 22. Co-S, AC is to the radius, as Co-S, B is to S, C: and therefore RxCo-S, B=Co-S ACXS, C. Thirdly, Let the complement of the hypothenuse be the middle part, and the complements of the angles B, C, will be adjacent extremes: but by Cor. 2. prop. 19. Co-S, BC is to Co-T, B as Co-T, B to the radius: therefore RxCo-S, BC=CO-T CxCo-T, C. Again, Let the complement of the hypothenuse be the middle part, and the sides AB, AC will be opposite extremes: but by prap. 21. Co-S, AC is to the radius, Co-S, BC to Co-S, BA; therefore RxCo-S, BC=CO-S, BAXCO-S, AC. Q. E. D. SOLUTION OF THE SIXTEEN GASES OF RIGHT ANGLED SPHE RICAL TRIANGLES. GENERAL PROPOSITION. IN a right angled spherical triangle, of the three sides and three angles, any two being given, besides the right angle, the other three may be found. In the following Table the solutions are derived from the pre ceding propositions. It is obvious that the same solutions may be derived from Baron Napier's two rules above demonstrated, which, as they are easily remembered, are commonly used in practice. Case) Given So'll R: Co-S, AC::S, C:Co-S, B: and B is 1 AC,C B of the same species with CA, by 22. and 13. 2 AC, B C Co-S, AC:R:: Co-S, B:S, C : by 22. 3 B, C AC S, C: Co-S, B::R: Co-S, AC : by 22. and AC is of the same species with B. 13. R: Co-S, BA :: Co-S, AC : Co-S, BC. 21. and if both BA, AC be greater or less 4 BA, AC BC than a quadrant, BC will be less than a quadrant. But if they be of different affection, BC will be greater than a quadrant. 14. Co-S, BA :R:: Co-S, BC : Co-S, AC. 21. 5 BA, BC AC and if BC be greater or less than a quad rant, BA, AC will be of different or the same affection : by 15. S, BA :R::T, CA: T, B. 17. and B is 6 BA, AC B lof the same affection with AC. 13. 8 Case Given So't R:S, BA :: T, B: T, AC, 17. And AC 7 BA, B AC is of the same affection with B. 13. AC, B BA T, B: R: T, CA: S, BA. 17. R: Co-S, C :: T, BC:T, CA. 20. If BC 9 BC, CAC be less or greater than a quadrant, C and B' will be of the same or different affec. liion. 15. 13. Co-S, C:R::T, AC : T, BC. 20. And 10 AC, C BC BC is less or greater than a quadrant, ac cording as C and AC or C and B are of the same or different affection. 14. 1. 1, BC:R::T, CA : Co-S, C. 20. If BC 11 BC, CA C be less or greater than a quadrant, CA and AB, and therefore CA and C, are of the same or different affection. 15. 12 R:S, BC :: S, B: S, AC. 18. And AC BC, BAC lis of the same affection with B. 13 AC, B BCS, B:S, AC::R:S, BC: 18. 14 BC, AC B S; BC : R :: S, AC: S, B : 18. And B is of the same affe on with AC. T,C:R:: Co-T, B: Co-S, BC. 19. And 15 B, C | BC according as the angles B and Care of dif ferent or the same affection, BC will be greater or less than a quadrant. 14. R: Co-S, BC::T,C: Co-T ,B. 19. If BC 16 BC, C B be less or greater than a quadrant, C and B The second, eighth, and thirteenth cases, which are common. ly called ambiguous, admit of two solutions : for in these it is not determined whether the side or measure of the angle sought be greater or less than a quadrant. will be of the same or different affection. 15. PROP. XXIII. FIG. 16. IN spherical triangles, whether right angled or oblique angled, the sines of the sides are proportional to the sines of the angles opposite to them. First, let ABC be a right angled triangle, having a right angle at Å; therefore by prop. 18. the sine of the hypothenuse BC is to the radius (or the sine of the right angle at A) as the sine of the side AC to the sine of the angle B. And in like manner, the sine of BC is to the sine of the angle A, as the sine of AB 10 the sine of the angle C; wherefore (11. 5.) the sine of the side AC is to the sine of the angle B, as the sine of AB to the sine of the angle C. Secondly, let BCD be an oblique angled triangle, the sine of either of the sides BC, will be to the sine of either of the other two CD, as the sine of the angle D opposite to BC is to the sine of the angle B opposite to the side CD. Through the point C, let there be drawn an arch of a great circle CA perpendicular upon BD; and in the right angled triangle ABC (18. of this, the sine of BC is to the radius, as the sine of AC to the sine of the angle B; and in the triangle ADC (by 18. of this): and, by inversion, the radius is to the sine of DC as the sine of the angle D to the sine of AC: therefore ex æquo perturbate, the sine of BC is to the sine of DC, as the sine of the angle D to the sine of the angle B. Q. E. D. PROP. XXIV. FIG. 17, 18. IN oblique angled spherical triangles having drawn á perpendicular arch from any of the angles upon the opposite side, the co-sines of the angles at the base are proportional to the sines of the vertical angles. Let BCD be a triangle, and the arch CA perpendicular to the base BD; the co-sine of the angle B will be to the co-sine of the angle D, as the sine of the angle BCA to the sine of the angle DCA. |