A function f, defined for all positive real numbers, satisfies the equation `f(x^(2))=x^(3)=x^(3)` for every `gt0.` Then the value of f'(4) is

A function f, defined for all positive real numbers,satisfies the equation f(x^(2))=x^(3) for every x>0. Then the value of f'(4) is (a) 12(b)3(c)3/2(d) cannot be determined

A function f, defined for all positive real numbers, satisfies the equation f(x^2)=x^3 for every x >0 . Then the value of f^(prime)(4) is (a) 12 (b) 3 (c) 3//2 (d) cannot be determined

A function f, defined for all positive real numbers, satisfies the equation f(x^2)=x^3 for every x >0 . Then the value of f^(prime)(4) is (a) 12 (b) 3 (c) 3//2 (d) cannot be determined

A function f, defined for all positive real numbers, satisfies the equation f(x^2)=x^3 for every x >0 . Then the value of f^(prime)(4) is (a) 12 (b) 3 (c) 3//2 (d) cannot be determined

A function f, defined for all positive real numbers, satisfies the equation f(x^2)=x^3 for every x >0 . Then the value of f^(prime)(4) is 12 (b) 3 (c) 3//2 (d) cannot be determined

If a differentiable function f defined for x gt0 satisfies the relation f(x^(2))=x^(3),x gt 0 , then what is the value of f'(4)?

If a differentiable function f defined for x gt0 satisfies the relation f(x^(2))=x^(3),x gt 0 , then what is the value of f'(4)?

Let f(x) be a continuous function defined from [0,2]rarr R and satisfying the equation int_(0)^(2)f(x)(x-f(x))dx=(2)/(3) then the value of 2f(1)

A differentiable function f(x) is defined for all x gt 0 and satisfies f(x^(3))=4x^(4) for all x gt 0 . The valuue of f'(8) is : a) 16/3 b) 32/3 c) (16sqrt(2))/3 d) (32sqrt(2))/3

A differentiable function f defined for all x>0 satisfies f(x^(2)) = x^(3) for all x>0. what is f'(b)?