If g is the inverse of a function f and `f'(x)=(1)/(1+x^(5))`, then `g'(x)` is equal to :

If g is the inverse function of f and f^(')(x) = 1/(1+x^(n)) , then g^(')(x) eauals

If g is the inverse function of f and f'(x) = sin x then g'(x) =

Let g(x) be the inverse of f(x) and f'(x)=1/(1+x^(3)) .Find g'(x) in terms of g(x).

The domain of the function f defined by : f(x)=sqrt(4-x)+(1)/(sqrt(x^(2)-1)) is equal to :

Let f:R to R, g: R to R be two functions given by f(x)=2x-3,g(x)=x^(3)+5 . Then (fog)^(-1) is equal to

Let f be a real valued function defined on the interval (-1,1) such that e^(-x) f(x) = 2 + int_0^x sqrt(t^4 + 1) dt , for all x in (-1, 0) and let f^(-1) be the inverse function of f. Then (f^(-1))'(2) is equal to :

If f(x)=log((1+x)/(1-x))andg(x)=(3x+x^(3))/(1+3x^(2)) , then f(g(x)) is equal to :

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

For x in R , the functions f(x) satisfies 2f(x)+f(1-x)=x^(2) . The value of f(4) is equal to