Solve the equation on the interval [0, 360°). (43 each) 1) 5 sin 0+1 = 3...
Solve the equation in the interval [0°, 360°). 4 sin^2θ = 3 csc θ = 1 + cot θ 3 sin^2θ - sin θ - 4 = 0 2 cos^3θ = cos θ
Solve the equation for exact solutions over the interval [0°360°). 2 sin 20 = -1 Solve the equation on the interval [0.21). sin 2x = - 3 sin x
Solve the equation in the interval [0°, 360°). sin^2θ - sin θ - 12 = 0 sin 2θ = -sin θ 2 cos2θ + 7 sin θ = 5
pls solve all! thanks! Solve the equation on the interval 10,360"). (3 each) 1) 5 sin 0.1-sino 2) 2 cos20.3 cos 0 1 - 0 3) 4 tan2o. 7 tan 0-2 - 0 4] 3 sin x + sin = 0 Solve the right triangle shown in the figure. Round lengths to one decimal place and express angles to the nearest tenth of a degree. (+5) B с 5) B-35, b 572
please show calculations Solve the equation on the interval 0 s < 2t. 1) 2 cos 0+32 2) tan2 = 3 3) 2 sin2 = sino show calculation please 4) 2 cos2 - 3 cos 0+1=0 5) sin2 - Cos2 0 = 0 Simplify the expression 6) + tan e 1+ sin e cose 7) (1 + cot e)(1-cote) -sce Establish the identity. 8) (sin x)(tan x cos x - cotx cos x) = 1 - 2 cos2x 9) (1...
Solve the equation on the interval [0, 2π). 14) sin2 x cos2 x-o Solve the equation on the interval [0, 2r) 15) sin x 2 sin x cos x =0
Solve the following equations for x if 0° < 0 < 360°. 36. 2 cos 20 + sin 0 = 1 35. 1 - 4 cos 0 = -2 cos2 37. sin (30 – 45) = -V3 38. cos 30 = -2
Solve the following equation on the interval [0, 27). 4 sin 5 cos 2 - 5 = 0
6 & 7 5 points. Solve the equation for solutions in the interval (0,271). 1 6) sin x cos X= 5 points. Solve the equation in the interval [0°, 360°). Give solutions to the nearest tenth, if necessary. 7) sin2e - sin 0 - 12 = 0 7
4. Solve the following for 0° 50 360°. (3 marks each) sin + - = 0 a) 3 4 b) cos 0 = 0.276