The trigonometric equation `sin^(-1) x = 2 sin^(-1) a` has a solution for

The trigonometric equation sin^(-1)x=2sin^(-1)a has a solution for all real values (b) |a|<1/a |a|lt=1/(sqrt(2)) (d) 1/2<|a|<1/(sqrt(2))

The trigonometric equation sin^(-1)x=2sin^(-1)a has a solution for all real values (b) |a|<1/a |a|lt=1/(sqrt(2)) (d) 1/2<|a|<1/(sqrt(2))

If the trigonometric equation tan^(-1)x=2sin^(-1)a has a solution, then the complete set of values of a is

The equation "sin"^(6) x + "cos"^(6) x = lambda , has a solution if

The solution set of the equation sin^(-1)x=2 tan^(-1)x is

Find the general solution of the trigonometric equation: sin 2x - sin 4x + sin 6x = 0

Solve the trigonometric equation : sin 2theta = 1/2

Solve the trigonometric equation : sin 3x + cos 2x = 0

The number of integral values of k for which the equation sin^(-1)x+tan^(-1)x=2k+1 has a solution is

The range of the values of p for which the equation sin cos^(-1) ( cos (tan^(-1) x)) = p has a solution is