PROP. XIX. FIG. 14. IN right-angled spherical triangles, the co-fine of the hypothenufe is to the radius as the co-tangent of either of the angles is to the tangent of the remain. ing angle. Let ABC be a fpherical triangle, having a right angle at A, the co-fine of the hypothenufe BC will be to the radius as the co-tangent of the angle ABC to the tangent of the angle ACB, Defcribe the circle DE, of which B is the pole, and let it mect AC in F and the circle BC in E; and fince the circle BD paffes through the pole B of the circle DF, DF will also pafs through the pole of BD. (13. 18. 1. Theod. Sph.) And fince AC is perpendicular to BD, AC will alfo pass through the pole of BD; wherefore the pole of the circle BD will be found in the point where the circles AC, DE meet, that is, in the point F: The arches FA, FD are therefore quadrants, and likewise the arches BD, BE: In the triangle CEF, right-angled at the point E, CE is the complement of the hypothcnufe BC of the triangle ABC, EF is the complement of the arch ED, which is the measure of the angle ABC, and FC the hypothenuse of the triangle CEF, is the complement of AC, and the arch AD, which is the meafure of the angle CFE, is the complement of AB. But (17. of this) in the triangle CEF, the fine of the fide CE is to the radius, as the tangent of the other fide is to the tangent of the angle ECF oppofite to it, that is, in the triangle ABC, the co-fine of the hypothenufe BC is to the radius, as the co-tangent of the angle ABC is to the tangent of the angle ACB. Q. E. D. COR. 1. Of these three, viz. the hypothenufe and the two angles, any two being given, the third will also be given. COR. 2. And fince by this propofition the co-fine of the hypothenufe BC is to the radius, as the co-tangent of the angle ABC to the tangent of the angle ACB. But as the radius is to the co-tangent of the angle ACB, fo is the tangent of the fame to the radius; (Cor. 2. def. Pl. Tr.) and, ex quo, the co-fine of the hypothenufe BC is to the cp-tangent of of the angle ACB, as the co-tangent of the angle ABC to the radius. Ν PROP. XX. FIG. 14. IN right angled spherical triangles, the co-fine of an angle is to the radius, as the tangent of the fide adjacent to that angle is to the tangent of the hypothe nufe. The fame conftruction remaining; in the triangle CEF, (17. of this) the fine of the fide EF is to the radius, as the tangent of the other fide CE is to the tangent of the angle CFE oppofite to it; that is, in the triangle ABC, the co-fine of the angle ABC is to the radius as (the co-tangent of the hypothenufe BC to the co-tangent of the fide AB, adjacent to ABC or as) the tangent of the fide AB to the tangent of the hypothenufe, fince the tangents of two arches are reciprocally proportional to their co-tangents. (Cor. 1. def. Pl. Tr.) COR. And fince by this propofition the co-fine of the angle ABC is to the radius, as the tangent of the fide AB is to the tangent of the hypothenufe BC; and as the radius is to the cotangent of BC, fo is the tangent of BC to the radius; by equality, the co-fine of the angle ABC will be to the co-tangent of the hypothenufe BC, as the tangent of the fide AB, adjacent to the angle ABC, to the radius. PROP. XXI. FIG. 14. IN right-angled spherical triangles, the co-fine of ei ther of the fides is to the radius, as the co-fine of the hypothenuse is to the co-fine of the other side. · The same construction remaining; in the triangle CEF, the fine of the hypothenuse CF is to the radius, as the fine of the fide CE to the fine of the oppofite angle CFE; (18. of this) that is, in the triangle ABC the co-fine of the fide CA is to the radius as the co-fine of the hypothenufe BC to the co-fine of the other fide BA. Q. E. D. PROP. PROP. XXII. FIG. 14. IN fphericale radius, as the co-fine of right-angled spherical triangles, the co-fine of ei the angle oppofite to that fide is to the fine of the other angle. The fame conftruction remaining; in the triangle CEF, the fine of the hypothenufe CF is to the radius as the fine of the fide EF is to the fine of the angle ECF oppofite to it; that is in the triangle ABC, the co-fine of the fide CA is to the radius, as the co-fine of the angle ABC opposite to it, is to the fine of the other angle. Q. E. D. Of IN Of the CIRCULAR PARTS. N any right-angled spherical triangle ABC, the complement Fig. 15. of the hypothenufe, the complements of the angles and the two fides 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 hypothenufe, and proceed towards the fide BA, the parts following in order will be the complement of the hypothenuse, the complement of the angle B, the fide BA the fide AC, (for the right angle at A is not reckoned among the parts), and, laftly, the complement of the angle C. And thus at whatever part we begin, if any three of thete five be taken, they either will be all contiguous or adjacent, or one of them will not be conti❤ 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 fecond cafe, the part which is not contiguous to either of the other two is called the Middle part, and the other two Oppofite extremes. For example, if the three parts be the complement of the hypothenufe BC, the complement of the angle B, and the fide BA; fince these three are contiguous to each other, the complement of the angle B will be the middle part, and the com plement of the hypothenufe BC and the fide BA will be adjacent extremes: But if the complement of the hypothenufe BC, and the fides BA, AC be taken; fince the complement of the hypothenuse is not adjacent to either of the fides, viz. on account of the complements of the two angles B and C intervening be tween it and the fides, the complement of the hypothenufe BC will be the middle part, and the fides, BA, AC oppofite extremes. The most acute and ingenious Baron Napier, the inventor of Logarithims, contrived the two following rules concerning thefe parts, by means of which all the cafes of rightangled fpherical triangles are refolved with the greatest ease. RULE I. The rectangle contained by the radius and the fine of the middle part, is equal to the rectangle contained by the tangents of the adjacent parts. RULE Fig. 16. RULE II. The rectangle contained by the radius, and the fine of the middle part is equal to the rectangle contained by the cofines of the opposite parts. These rules are demonstrated in the following manner : First, Let either of the fides, as BA, be the middle part, and therefore the complement of the angle B, and the fide 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, BXT, AC. The fame fide BA being the middle part, the complement of the hypothenufe, and the complement of the angle C, are oppofite extremes; and by prop. 18. S. BC is to the radius, as S, BA to S, C; therefore RXS, BA=S, BC×S, C. Secondly, Let the complement of one of the angles, as B, be the middle part, and the complement of the hypothenufe, and the fide 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, BC×T, BA. Again, Let the complement of the angle B be the middle part, and the complement of the angle C, and the fide AC will be oppofite extremes: And by prop. 22. Co-S, AC is to the radius, as Co-S, B is to S, C: And therefore Rx Co-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 R x Co BC= Co-T, CxCo-T, C. , Again, Let the complement of the hypothenuse be the middle part, and the fides AB, AC will be oppofite extremes: But by prop. 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. 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