If `f(x)= tan x - x` then
The least +ve value of 'x' for which `f(x)=0` lies in the quadrant

If f(x) =(alphax)/(x+1), x ne 1 , then the value of alpha for which f(f(x))=x is:

Let f:R rarr [0, pi//2) defined by f(x)=Tan^(-1)(x^(2)+x+a) , then the set of value of a for which f is onto is

f(x)=sin{cot^(-1)(x+1)}-cos(tan^(-1)x), The value of x for which f(x) = 0 is

The least positive value of x, satisfying tan x = x + 1, lies in the interval is

The least and the greatest values of f(x)=x^(2)logx in [1,e] are

Solution of x-y=2,x+y=0 lies in…..quadrant.

If f(x) =x^4 tan(x^3)-x1n(1+x^2) , then the value of (d^4(f(x)))/(dx^4) at x = 0 is

IF f(x)=log(tan e^x) , then find f'(x).