## The Elements of Plane TrigonometryGinn & Heath, 1876 |

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a+ß acute angle Answers base bearing becomes called centre chord circle circular measure colog complement computation cosine cotangent denote determine direction distance draw equal equation Example expression feet figures find the functions formed formulas geometry Given greater height Hence hypothenuse increase initial line length less letter log csc logarithmic manner meas method miles negative numerically observer obtained opposite perp perpendicular plane positive possible problem proportional Prove Putting quad quadrant radius ratios regard represent respectively right angle right triangle rotation secant sides sine solution solve straight line student Substituting tangent terminal line third tions tower triangle of reference trigonometric functions unit unity

### Popular passages

Page 4 - The COMPLEMENT OF AN ANGLE, or arc, is the remainder obtained by subtracting the angle or arc from 90°. Thus the complement of 45° is 45°, and the complement of 31° is 59°. When an angle, or arc, is greater than 90°, its complement is negative. Thus the complement of 127° is — 37°. Since the two acute angles of a right-angled triangle are together equal to a right angle, they are complements...

Page 73 - In any triangle, the square of the side opposite an acute angle is equal to the sum of the squares of the other two sides, minus twice the product of one of these sides and the projection of the other side upon it.

Page 73 - In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference.

Page 72 - TRIANGLES. §71. The sides of any triangle are proportional to the sines of the opposite angles §72.

Page 15 - ... greater than the third side. h. Two angles are equal when their sides are respectively perpendicular ; but we must be careful to take the sides of the respective angles in the same order, and to measure the angles in the same direction, (v. § 14.) In Fig. 21, for example, FIG.

Page 15 - If two right triangles have an acute angle of the one equal to an acute angle of the other, the other acute angles will be equal.

Page 93 - From a window on a level with the bottom of a steeple the angle of elevation of the steeple is 40°, and from a second window 18 feet higher the angle of elevation is 37° 30'.

Page 82 - Example II. Given a = 0.3578, B = 32° 41', C = 47° 54'. Answers. 0 = 4:7° 54', 6=0.1959, c = 0.2691. § 85. CASE II. Given two sides and an angle opposite one of them, — a, b, and A: find c, B, and C.

Page 93 - From a station, B, at the base of a mountain, its summit A is seen at an elevation of 60° ; after walking one mile towards the summit, up a plane making an angle of 30° with the horizon, to another station, C, the angle . .BCA is observed to be 135° : find the height of the mountain in yards.

Page 69 - Having measured a distance of 200 feet, in a direct horizontal line, from the bottom of a steeple, the angle of elevation of its top, taken at that distance, was found to be 47° 30'; from hence it is required to find the height of the steeple.