If f and g are two decreasing functions such that fog exists then fog is

Let f: R rarr R and g: R rarr R be two given functions such that f is inective and g is surjective. Then which of the following is injective

If f(x) and g(x) are two functions such that f(x)+g(x)=e^(x) and f(x)-g(x)=e^(-x) then I: f(x) is an even function II : g(x) is an odd function III : Both f(x) and g(x) are neigher even nor odd.

If f(x) and g(x) are two positive and increasing function , then

Let f and g be two diffrentiable functions on R such that f'(x) gt 0 and g'(x) lt 0 for all x in R . Then for all x

If f(x) and g(x) are two functions with g(x) = x -1/x and fog (x) = x^3 -x/x^3 then f^(1)(x)=

Statement -I: f: A to B is one -one and g: B to C is a one-one function, then gof : A to C is one-one Statement-II: If f: A to B, g : B to A are two functions such that gof =I_(A) and fog=I_(B) , then f=g^(-1) . Statement-III: f(x) =sec^(2)x- tan^(2)x, g(x) ="cosec"^(2)x-cot^(2)x , then f=g. Which of the above statements is/are true:

If f(x) and g(x) are be two functions with all real numbers as their domains, then h(x) =[f(x) + f(-x)][g(x)-g(-x)] is:

If composite function f_(1)(f_(2)(f_(3)(...((f_(n))))n times is an increasing function and if r of f_(1) s are decreasing function while rest are increasing , then the maximum value of r(n-r) is