Let g(x) be the inverse of an invertible function f(x), which is differentiable for all x, then `g''f(x)` is equal to

Let g(x) be the inverse of an invertible function f(x), which is differentiable for all real x. Then g''(f(x)) equals

Let g(x) be the inverse of an invertible function f(x), which is differentiable for all real xdot Then g^('')(f(x)) equals. (a) -(f^('')(x))/((f^'(x))^3) (b) (f^(prime)(x)f^('')(x)-(f^(prime)(x))^3)/(f^(prime)(x)) (c) (f^(prime)(x)f^('')(x)-(f^(prime)(x))^2)/((f^(prime)(x))^2) (d) none of these

Let g(x) be the inverse of an invertible function f(x) which is differentiable at x=c . Then g'(f(x)) equal.(a) f'(c)( b) (1)/(f'(c)) (c) f(c) (d) none of these

Let g(x) be the inverse of an invertible function f(x) which is derivable at x=3. If f(3)=9 and f'(3)=9, write the value of g'(9).

Let g(x) be the inverse of the function f(x) ,and f'(x) 1/(1+ x^(3)) then g(x) equals

Let g(x) be the inverse of the function f(x) and f'(x)=(1)/(1+x^(3)) then g'(x) equals

Let f(x) be differentiable function and g(x) be twice differentiable function.Zeros of f(x),g'(x) be a,b, respectively,(a

Let g(x) be the inverse of the function f(x)=ln x^(2),x>0 . If a,b,c in R ,then g(a+b+c) is equal to

A function f(x) is differentiable at x=c(c in R). Let g(x)=|f(x)|,f(c)=0 then