Making the Leg AB Radius, the Proportion to find the Angle BAC will be: As Leg AB, 78.7 1.89597 10.00000 1.94939 The Angle ACB is consequently 41° 30'. Making the Leg BC Radius, the Proportion to find the Angle BCA will be the same as the above, mutatis mutandis. The Angles being found, the Hypothenuse may be found by CASE II. It is nearest 119, By the Square Root. In this Case the Hypothenuse may be found by the Square Root, without finding the Angles; according to the following ProPOSITION. In every Right Angled Triangle, the Sum of the Squares of the two Legs is equal to the Square of the Hypothenuse. In the above EXAMPLE, the Square of AB 78.7 is 6193.69, the Square of BC 89 is 7921; these added make 14114.69 the Square Root of which is nearest 119. By Natural Sines. The Hypothenuse being found by the Square Root, the Angles may be found by Nat. Sines, according to Hyp. Leg. BC. Nat. Sine 119) 89.00000 (.74789 83 3:... 570 940 833 The nearest Degrees and Minutes corresponding to the above Nat. Sine are 48° 24, for the Angle BAC. The difference between this and the Angle as found by Logarithms is occasioned by dividing by 119, which is not the exact length of the Hypothenuse, it being Fraction too much, 1070 a 1180 109 PART II. OBLIQUE TRIGONOMETRY. The solution of the two first Cases of Oblique Trigonometry depends on the following PROPOSITION. In all Plane Triangles, the Sides are in proportion to each other as the Sines of their opposite Angles. That is, As the Sine of one Angle ; Is to its opposite Side; So is the Sine of another Angle; To its opposite Side. Or, As one Side; Is to the Sine of its opposite Angle ; So is another Side; To the Sine of its opposite Angle. Note. When an Angle exceeds 90° make use of its Supplement, which is what it wants of 180°. As the Sine of 90° is the greatest possible Sine, the Sine of any greater number of Degrees will be as much less as that number of Degrees exceeds 90 ; and will be the same as the Sine of the Supplement of that number of Degrees : Thus the Sine of 100° is the same as the Sine of 80°, and the Sine of 130° the same as the Sine of 50°, CASE I. The Angles and one Side given, to find the other Sides, Plate II. Figure 47. In the Triangle ABC, given the Angle at B 48°, the Angle at C 72°, consequently the Angle at A 60°, and the Side AB 200; to find the Sides AC and BC. To find the Side AC. To find the Side BC. As Sine ACB, 720 9.97821 As Sine ACB, 720 9.97821 : Side AB, 200 2.30103 : Side AB, 200 2.30103 : ; Sine ABC, 48° 9.87107 :: Sine BAC, 60° 9.93753 By Natural Sines As the Nat. Sine of the Angle opposite the given Side ; Is to the given Side ; So is the Nat. Sine of the Angle opposite either of the required Sides; To that required Side. Given Side 200; Nat. Sine of 72°, its opposite Angle, 0.95115; Nat. Sine of ABC 48°, 0.74334; Nat. Sine of BAC 60°, 0.86617. As 0.95115: 200 :: 0.74334 : 156 CASE II. Two Sides and an Angle opposite to 011e of them given, to find the other Angles and Side. I'ïg. 48. In the Triangle ABC, given the Side AB 240, the Side BC 200, and the Angle at A 46° 30'; to find the To find the Angle ACB. 46° 30' : Sine BAC, 46° 30' 9.86056 C 60 30 ; : Side AB, 240 2.38021 107.00 12.2407 2.30103 Sum of the three Angles 180°. Sum of two 107 : Sine ACB, 60° 30' 9.93974 Angle at B 73 The Side AC will be found by Case I. to be nearest 263. Note. If the given Angle be Obtuse the Angle sought will be Acute; but if the given Angle be Acute, and opposite a given lesser Side, then the required Angle is doubtful. It will not however be difficult to determine whether it be Obtuse or Acute. If Obtuse, its Supplement must be used. By Natural Sines. As the Side opposite the given Angle; Is to the Nat. Sine of that Angle; So is the other given Side ; To the Nat. Sine of its opposite Angle. One given Side 200 ; Nat. Sine of 46° 30', its opposite Angle, 0.72537 ; the other given Side 240. As 200 : 0.72537 : : 240 : 0.87044= 60° 30'. : CASE III. Two Sides and their contained Angle given, to find the other Angles and Side. Fig. 49. The solution of this CASE depends on the following PROPOSITION. In every Plane Triangle, As the Sum of any two Sides; Is to their Difference ; So is the Tangent of half the Sum of the two opposite Angles ; To the Tangent of half the Difference between them. Add this half difference to half the Sum of the Angles and you will have the greater Angle; and subtract the half Difference In the Triangle ABC, given the Side AB 240, the Side AC 180, and the Angle at A 36° 40' to find the other Angles and Side. Side AB 240 AB 240 AC 180 AC 180 Sum of the two Sides 420 Difference . 60 The given Angle BAC 36° 40', subtracted from 180°, leaves 143° 20' the Sum of the other two Angles; the half of which is 71° 40'. As the Sum of two Sides, 420 2.62325 : their Difference, 60 1.77815 :: Tangent half unknown Ang. 71° 40' 10.47969 12.25784 2.62325 : Tangent half Difference, 23° 20' 9.63459 The half sum of the two unknown Angles, 71° 40' 23 20 Add, gives the greater Angle ACB 95 00 Subtract, gives the lesser Angle ABC 48 20 The Side BC may be found by Case I or II. CASE IV. The three Sides given to find the Angles. Fig. 50. The solution of this Case depends on the following PROPOSITION. In every Plane Triangle, As the longest side ; Is to the Sum of the other two Sides; So is the Difference between those two Sides; To the Difference between the Segments of the longest Side, made by a Perpendicular let fall from the Angle opposite that Side. Half the Difference between these Segments, added |