The value of `x gt 1` satisfying the equation
`int_(1)^(x) tlnt dt=(1)/(4)` is

The smallest value of x satisfying the inequality ""^(10)C_(x-1)gt 2""^(10)C_x is :

Find the number of real values of x satisfying the equation. log_(2)(4^(x+1)+4)*log_(2)(4^(x)+1)=log_(1//sqrt(2)) sqrt((1)/(8))

Find the sum of all real values of X satisfying the equation (x^2-5x+5)^(x^2 + 4x -60) = 1 .

The solution for x of the equation : int_(sqrt2)^(x) (dt)/(tsqrt(t^2 - 1)) = pi/2 is :

The values of x satisfying tan ^(-1)(x+3)-tan ^(-1)(x-3)=sin ^(-1)((3)/(5)) are

Value of x, satisfying x^2 + 2x = -1 is :

The value of int_(-1)^(1)(x|x|)dx is equal to

The value of int_(-1)^(2) (|x|)/(x) dx is :