Let `f(x)=2 sqrt(x)` and `g(x)=3-1/x, x gt 1`.
Statement - I : `f(x) gt g(x) (x gt 1)`.
Statement - II : `f(x)-g(x)` increases on `(1, oo)`.

Let f(x)=x((1)/(x-1)+(1)/(x)+(1)/(x+1)), x gt 1 . Then

Let f(x) = x^(3) e^(-3x) , x gt 0 . Then the maximum value of f(x) is:

Let f(x) =(xe^(x))/((1+x^(2))^(2)), x ne 1 Statement-I: The antiderivative F of f(x) satisfying F(0)=1 is (e^(x))/(1+x) Statement-II: f(x) is of the form {g(x)+g'(x)}e^(x) , for same g(x).

Let f(x)=(1)/(1+x^(2)) and g(x) is the inverse of f(x) ,then find g(x)

Let f(x)=x^(x),x in (0,oo) and let g(x) be inverse of f(x), then g'(x) must be

Let f:[-1,oo] in [-1,oo] be a function given f(x)=(x+1)^(2)-1, x ge -1 Statement-1: The set [x:f(x)=f^(-1)(x)]={0,1} Statement-2: f is a bijection.

Let f(x)= sin+ cos x, g(x)=(sin x)/(1- cos x) Statement-I: f is neither an odd function nor an even function Statement -II: g is an odd function.