The solution set of inequality `( cot^(-1) x) (tan^(-1) x) + (2 - pi/2) cot^(-1) x - 3 tan^(-1) x - 3 ( 2 - pi/2) gt 0 `, is

Solution set of the inequality ( cot^(-1) x)^(2) - ( 5 cot^(-1) x) + 6 gt 0 is

If tan^-1 x + tan^-1 y = (4pi)/5 , then cot^-1 x + cot^-1 y equals

Find the solution of the equation: tan^-1x - cot^-1 x = tan^-1(1/sqrt3)

Solve the following 5 tan^(-1) x + 3 cot^(-1) x = 2 pi

Solve (tan^(-1) x)^(2) + (cot^(-1) x)^(2) = (5pi^(2))/(8)

cot^-1(-x) = pi - cot^-1x , x in R

The value of int_(-2pi)^(5pi) cot^(-1)(tan x) dx is equal to

Number of values of x satisfying simultaneously sin^(-1) x = 2 tan^(-1) x " and " tan^(-1) sqrt(x(x-1)) + cosec^(-1) sqrt(1 + x - x^(2)) = pi/2 , is

Solve the following equations. cot^-1 x - cot^-1 (x+2) = pi/12, x > 0

Let x_(1) , x_(2) , x_(3) be the solution of tan^(-1) ((2x + 1)/(x +1 )) + tan ^(-1) ((2x - 1)/( x -1 )) = 2 tan ^(-1) ( x + 1) " where x_1 2x_(1) + x_(2) + x_(3)^(2) is equal to