The set of real values of x for which `f(x)=(x)/(Logx)` is increasing is

the set of real values of x for which f(x ) = (x ) /( log x) is increasing is :

Let, f: R rarr R be given by f(x)=(x+1)^(2)-1 , x ge-1 . Then the set of values of x for which f(x)=f^(-1)(x) is given by

The set of all real numbers x for which x^(2)-|x+2|+x>0 is

Let (sin a) x^(2)+(sin a) x+(1-cos a)=0 . The set of values of a for which roots of this equation are real and distinct is

If for real values of x, cos theta=x+(1)/(x), then

Find the interval for which f(x)=x-sinx is increasing or decreasing.

The integral value of real x for which : (5x-1) lt (x+1)^(2) lt (7x-3) is :

The real values of x for which 3^(72) ((1)/(3))^(x) ((1)/(3))^(sqrt(x)) lt 1, are :

The set of real values of x satisfying | x -1 | le 3 and |x - 1| ge 1 is :

The real values of x for which : 3^(72) ((1)/(3))^(x) ((1)/(3))^(sqrt(x)) gt 1 are :