The complex numbers `sin x + i cos 2x` and `cos x - i sin 2x` are conjugate to each other, for

Find real value of x and y for which the complex numbers -3+i x^2y and x^2+y+4i are conjugate of each other.

Solve 2 sin^(2) x-5 sin x cos x -8 cos^(2) x=-2 .

Prove the following: cos^2 2x - cos^2 6x = sin 4x sin 8x

Prove that (sin 4x + sin 3x + sin 2x)/(cos 4x + cos 3x + cos 2x) = tan 3x

Solve the equation sin x + cos x -2sqrt2 sin x cos x =0

Find all the number 'a' for which any root of the equation sin 3x =a sin x +(4-2|a|)sin^(2) x is a root of the equation sin 3x + cos 2 x =1+2 sinx cos 2x and any root of the latter equation is a root of the former .

int (sin^2 x - cos^2 x)/(sin^2 x cos^2 x) dx is equal to :

Prove that: (sin 3x + sin x) sin x + (cos 3x -cos x) cos x = 0

Prove the following: sin2 x + 2 sin 4x + sin 6x = 4 cos^2 x sin 4x

Prove that : cos^-1 (cos^2x - sin^2x) = 2x