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

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

The equation sin^6x + cos^6x = a^2 has real solution then find the values of a

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

The number of integer values of k for which the equation sin^(-1)x+tan^(-1)x=2k+1 has a solution is (a)1 (b) 2 (c) 3 (d) 4

The number of real solution of the equation sin^(-1) (sum_(i=1)^(oo) x^(i +1) -x sum_(i=1)^(oo) ((x)/(2))^(i)) = (pi)/(2) - cos^(-1) (sum_(i=1)^(oo) (-(x)/(2))^(i) - sum_(i=1)^(oo) (-x)^(i)) lying in the interval (-(1)/(2), (1)/(2)) is ______. (Here, the inverse trigonometric function sin^(-1) x and cos^(-1) x assume values in [-(pi)/(2), (pi)/(2)] and [0, pi] respectively)

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

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

Number of solutions of the equation 2(sin^(-1)x)^2-sin^(-1)x-6=0 is