| Benjamin Martin - 1736
...Sides, Is to the Sine of their Difference, ( So is the Sine of the Sum of the Angles, to the Sine of **their Difference ; ) So is the Tangent of half the Sum of the Angles,** To the Tangent of halt their Différence. 14. That is, IK : IH: : AP :AO. Therefore IK+IH m IK-IH .... | |
| John Potter - 1753 - 395 páginas
...To the Sine of its oppofite Angle. Rule 2. When any two Sides with the Angle between them are given. **As the Sum of any two Sides Is to their Difference, So is the Tangent of** the Half-Sum of the two oppofite Angles " To the Tangent of Half the Difference of thofe two Angles.... | |
| 1801 - 426 páginas
...JROSLEM It. Given tiua sides and the angle included by them ; to find the rest. In a plane triangle, **As the sum of any two sides : Is to their difference : : So is the tangent of half the sum of** their opposite angles : • To the tangent of half their difference.* Then * DEMONSTRATION. By the... | |
| Abel Flint - 1804 - 168 páginas
...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... | |
| Robert Gibson - 1806 - 452 páginas
...wholes are as their halves, ie AH : IH : : CE : ED, that is .as the sum of the two sides AB and BC, **is to their difference ; so is the tangent of half the sum of the** two unknown angles A and C, to the tangent of half their difference. QED 104 PLANE TRIGONOMETRY. Plate... | |
| John Bonnycastle - 1806 - 419 páginas
...included angle are given, to find the rest. SR.ULE. As the sum of any two sides of a plane triangle, **is to their difference, so is the tangent of half the sum of** their opposite angles, to the tangent of half their difference. Then the half difference of these angles,... | |
| Isaac Dalby - 1807
...triangles DRA, DGB will be similar; whence we have, DG : DR :: GB : RA; That is, as the sum of the **sides, is to their difference, so is the tangent of half the sum of the** unknown or opposite angles, to the tangent of half the difference of those angles. Examp. 1. Let CD... | |
| Abel Flint - 1808 - 168 páginas
...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... | |
| Robert Gibson - 1808 - 440 páginas
...wholes areas their halves, ie AH : IH : : CE : ED, that is, as the sum of the two sides AB and BC, **is to their difference ; so is the tangent of half the sum of the** two unknown angles A and C, to the tangent of half their difference. QED Plate V. THEO. III. In any... | |
| Samuel Webber - 1808
...and the angle include^ by them; to fmd the rest. In a plane triangle, As the sum of any two sifts : **Is to their difference " : : So is the tangent of half the sum of** their opposite angles : To the tangent of half their difference.* * DEM0NSTRATI0N. By the first problem,... | |
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