Suppose g is the inverse fiunction of a diffdifferentiable finction fand `G(x)=(-4)/(g^2(x)).` If `f(5)=3 and f'(5)=1/125` then `g;(3)` is equal to

Suppose f^(-1) is the inverse function of a differentiable function f and let G(x)=(1)/(f^(-1)(x)) If f(3)=2 and f'(3)=(1)/(9), find G'(2)

Let g be the inverse function of a differentiable function f and G (x) =(1)/(g (x)). If f (4) =2 and f '(4) =(1)/(16), then the value of (G'(2))^(2) equals to:

Let g be the inverse function of a differentiable function f and G (x) =(1)/(g (x)). If f (4) =2 and f '(4) =(1)/(16), then the value of (G'(2))^(2) equals to:

If g is the inverse function of f an f'(x)=(x^(5))/(1+x^(4)). If g(2)=a, then f'(2) is equal to

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

If f(x)=x+tanx and f is inverse of g, then g ′(x) is equal to

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