: opposite side AC, we must have employed the following propor. tion : R: sin AB :: tang B : tang AC 9.991947 9.882101 9.874048 Therefore we conclude that the value of A-36° 48', as we had before found it, 95. Let us now seek for the hypothenuse BC, supposing that we know the same quantities AB and B. Neither the first nor the second of the proportions announced above (92) can be immediately applied to the triangle ABC; but in the complemental triangle CDE, we know D and DE, we have therefore R: sin DE :: tang D: tang CE, or by substitution, R: cos B :: cot AB: cot BC. 9.900529 9.288652 log cot BC 9.189181 Therefore BC is 81° 13', since B and AB are of the same species. To obtain the value of the angle C upon the same suppositions, we must have recourse to the complemental triangle BFG, in which R: sin BF:; sin B : sin FG, which by substitution gives R: cos AB :: sin B: cos C. log cos AB (790) = 9.280509 9.782630 9.063139 Hence the angle C is 83° 22', or calculating as far as seconds, 83° 21' 33". This small difference arises from our supposing the side AB only 79°, whereas we have already found its value to be 790 ( 20". 96. After having in two different cases determined the three unknown parts of the right-angled triangle ABC, it remains for us to examine the case in which this determination is impossible. And first, if we suppose the side AB and the opposite angle C to be known, it is evident that we cannot know of what species the hypothenuse is; for then the first proportion gives sin C; sin AB :: Ř : sin BC But this last sine belongs indifferently to an hypothenuse less than 90°, or to its supplement, and to determine us in our choice we ought to know of what species the two oblique angles are. For want of this knowledge the case is doubtful; and therefore it is marked as such in the fourth column of the table. We fall into the same dilemma, if we desire to find the side AC, the same things being given. For, by the second proportion (92) we have tang C : tang AB :: R: sin AC, but nothing in this case determines of what species the side AC is. The same difficulty respects the angle B, of which the value is deduced from the first 'proportion (92) applied first to the triangle BFG, and afterwards transported to the triangle ABC. For in the triangle BFG, we have sin BF:R:: sin FG : sin B, which in the triangle ABC gives cos AB:R:: cos C: sin B, from which we cannot ascertain of what species is the angle B. This is the first case of which the varieties offer three ambiguous solutions. Another case perfectly similar, is that in which we suppose the side AC, and the opposite angle B to be known. This case also presents three other ambiguous solutions. Generally, when in a right-angled spherical triangle we only know one of the oblique angles, and the side opposite to it, the value of the three other parts cannot be determined. 97. Hence there are six imperfect solutions among the thirty problems which any right-angled spherical triangle offers for solution: We might reduce these thirty to sixteen questions, by suppressing those which are absolutely similar. But it is desirable to find in a table, the proportion for which we have occasion, without being under the necessity of making any change. EXAMPLES OF RIGHT-ANGLED SPHERICAL TRIANGLES. 1. In the right-angled spherical triangle C ABC, given the hypothenuse BC=64° 40', and the base AB-42° 10', required the remaining side and the angles ? Anster, C=47° 57' 47', B=64° 36' 40', AC=54° 44' 23". B 2. In the right-angled spherical triangle ABC, given the hypothenuse BC=50", and the base AB=44° 20'; required the rest ? Answer, C=65° 49' 10", B=34° 56' 8", AC=26° 1' 10". 3. In the right-angled spherical triangle ABC, given the hypothenuse BC=63° 56, and the angle C=45° 41 ; required the other sides and angles. Answer, AC=55° 0' 1", AB=39' 59' 39", B=64° 46' 15". 4. In the right-angled spherical triangle ABC, given the side AC=55*, and the opposite angle B=65° 46 ; required the remaining parts? Answer, C=45° 41' 33", AB=40° V 12", BC=689 56 IZ 5. In the right-angled spherical triangle ABC, given the base AB=12° 30', and the opposite angle C=24° 45'; required the other parts of the triangle? Answer, AB=28° 44' 37", BC=314 7' 48", C=68° 27' 53. 6. In the right-angled spherical triangle ABC, given AC=45° 15', and the angle C=63° 20'; required the rest ? Answer, AB=54° 44', B-51° 0'50", BC=66° 0 56". 7. In the right-angled spherical triangle ABC, given the leg AB=54° 30', and the adjacent angle B=44° 50'? required the rest? Answer, LC=650 49' 53", AC=38° 59' 11", BC=63° 10' 4'. 8. In the right-angled spherical triangle ABC, given the sides about the right-angle respectively 55° 28', and 63° 15'; required the hypothenuse and angles ? Answer, BC=75° 13' 2", C=67° 27' 1", B=58° 25' 46". 9. Given the two legs of a right-angled spherical triangle respectively 15° 20', and 31° 57 ; required the hypothenuse BC, and the angles B and C. Answer, C=67° 1' 22", B=27° 23' 27", BC=35° 5' 3". 10. In the right-angled spherical triangle ABC, given the angle B=64° 40', and the angle C=46° 15; required the sides ? Answer, AC=40° 5'6", AB=530 40' 36", BC=63. 3' 5". Jl. In the spherical triangle ABC, right-angled at A, given the angles B and C respectively 72° 20', and 24° 50'; required the sides? Answer, BC=46° 30' 31", AC=17° 44' 21", AB=13° 43' 48". 12. In the spherical triangle ABC, right-angled at A, given AB=10° 39' 40", and the adjacent angle B=23° 27' 42" ; required the remaining angle C, and the sides AC and BC? Answer, BC=11° 35' 40", AC=4° 35' 26", C=66° 58' 1". SOLUTION OF THE DIFFERENT CASES OF OBLIQUE-ANGLED SPHERICAL TRIANGLES. 98. Here there are as many varieties, as there are different combinations among the six parts of a triangle, taken four by four. But there are fifteen of these combinations (Page 111), and each admits of three different cases. Consequently there are 45 problems to solve relating to oblique-angled triangles. But as the resolution of one frequently includes that of several others, they may be reduced to the twelve following cases: I. 99. In an oblique-angled spherical triangle ABC, given the angles B and A, and the side opposite to the angle A, to find the side AC opposite to the other angle. Let A=61° 25', B=82° 36', BC=59° 40'. C sin A : sin B::sin BC: sin AC. log sin B (82° 36') = 9.996368 B 9.988875 Whence AC=77° 5', or 102, 55'. Nor can we decide between these two results, unless we previously know of what species the side we seek for must be. II. : 100. Given the two angles A and B, with the side BC, opposite to the angle A, to A find the third an B D gle. Let fall the perpendicular arc CD, and in the triangle BCD we shall have (90) R: cos BC :; tang B : cot BCD and then (86) cos B: cos A:: sin BCD: sin ACD. Adding these two angles, or subtracting one from the other, according as the given angles A and B are of the same or of different species, we shall have the angle C required. Let A=610 25', B=82° 36', BC= 59° 40', and we shall have neg. log radius log cos BC (59° 40') 9.703317 = 10.886467 = 10.589784 log cos A (61° 25') 9.679824 9.396150 9.966073 Consequently the angle ACD=670 39', or 112. 21; which gives 820' 4', or 1260 46', for the required angle ACB; and nothing in the question enables us to determine which value is to be preferred. III. 101. Given two angles A and B, with the opposite side BC, as in the preceding case, to find the side contained between these two angles (see preceding figure). = 10. The perpendicular arc CD forms the two right-angled triangles ACD and DCB, the last of which gives (87) R: cos B :: tang BC : tang BD tang A : tang B :: sin BD : sin AD. Consequently we shall have AB=AD+DB, according as the angles given are of the same or of different species. Preserving the same data as in the preceding case, neg. log radius log cos B (82° 36') 9.109901 = 9.342646 log tang B (82° 36') = 10.886467 9.955214 Hence the side AD=640 25', or 11.50 35'; and as in this exarple the angles A and B are of the same species, we must add the two segments BD and AD; consequently the side AB must be either 76° 50', or 128o. = IV. 102. Given the two angles A and C, with the side on which these angles are formed, to find the third angle B (see preceding figure.) First, (90) R: cos AC:: tang A : cot ACD The angle BCD is found by subtracting ACD from ACB, when the arc falls perpendicularly within the triangle ; but when this arc falls without, we must subtract the angle ACB from the angle ACD, in order to find BCD. V. 103. Given as before, the two angles A and C, with the contained side AC, to find the two other sides, BC for example. • The log taug. 61° 25'=10.263731, subtracting each figure from 9. except the first on the right, as before explained, we obtain 89.736269; and prefixing the negative unit as usual, the arithmetical equivalent becomes as above, 189.736269. The arithmetical equivalent for negative numbers is of considera. ble use in many arithmetical operations. See Nicholson's Treatise op Invo lution and Evolution. |