# A Treatise on Plane Trigonometry (Google eBook)

University Press, 1891 - Exponential functions - 356 pages

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### Contents

 CHAPTER II 10 AltTS PAGES 18 CHAPTER IV 34 CHAPTER V 61 CHAPTER VII 102 CHAPTER VIII 122 TRIGONOMETRICAL TABLES 136 CHAPTER X 152
 Introduction 164 CHAPTER XIII 221 CHAPTER XIV 243 CHAPTER XV 273 CHAPTER XVI 303 INFINITE PRODUCTS 318 CHAPTER XVIII 351

### Popular passages

Page 285 - Show that the perimeter p of a regular polygon of n sides inscribed in a circle of radius R...
Page 182 - The angular elevation of a tower at a place A due south of it is 30° ; and at a place B due west of A, and at a distance...
Page 192 - The three perpendiculars from the vertices of a triangle to the opposite sides (produced if necessary) are called the altitudes...
Page v - These definitions appear to the author to be " those from which the fundamental properties of the functions may be most easily deduced in such a way that the proofs may be quite general, in that they apply to angles of all magnitudes. It will be seen that this method...
Page 237 - N turns is in the foim of a regular polygon of n sides inscribed in a circle of radius R meters.
Page 139 - We have, then, that the sine of an angle is equal to the cosine of its complement, and conversely.
Page 216 - Pro.ve that the equilateral triangle described on the hypotenuse of a right.angled triangle is equal to the sum of the equilateral triangles described on the sides containing the right angle.
Page 182 - ... from another station due west of the former and distant a mile from it is 45° : find the height of the balloon. Ans. 6468 feet. 69. Find the height of a hill, the angle of elevation at its foot being 60°, and at a point 500 yards from the foot along a horizontal plane 30°. Ans. 250V3 yards. 70. A tower 51 feet high has a mark at a height of 25 feet from the ground : find at what distance from the foot the two parts subtend equal angles. Ans. 25V51 feet 71. The angles of a triangle are as 1:2:3,...
Page 40 - The sum of the sines of two angles is equal to twice the product of the sine of half the sum of the given angles into the cosine of half the difference of the given angles.
Page 153 - Law of Sines — In any triangle, the sides are proportional to the sines of the opposite angles. That is, sin A = sin B...