A function f is differentiable in the interval `0 le x le 5` such that f(0) = 4 and f(5) = - 1. If `g(x) = (f(x))/(x+1)`, then there exists some `c in (0,5)` such that g'(c) =

Let f (x) and g (x) be two differentiable functions for 0 le x le 1 such that f (0) = 2, g (0) = 0,f (1) = 6. If there exists a real number c in (0,1) such that f'(c ) = 2 g '(c ) , then g (1) is equal to

Let f(x) and g(x) be differentiable for 0 le x le 2 such that f(0) = 2, g(0) = 1, and f(2) = 8. Let there exist a real number c in [0, 2] such that f'(c) = 3g'(c) . Then find the value of g(2).

Given f'(1) = 1 and f(2x) = f(x) AA x gt 0 . If f'(x) is differentiable then prove that there exists a number c in (2, 4) such that f''(c) = - 1/8

Let f(x)=(5)/(2)x^(2)-e^(x) . Then the value of c such that f''(c )=0 is s

If f is a function such that f(0) = 2, f(1) = 3 and f(x + 2) = 2f(x) - f(x + 1) for every real x then f(5) is a)7 b)13 c)1 d)5

Let f be twice differentiable function such that f''(x)=-f(x) and f'(x)=g(x), h(x)={f(x)}^(2)+{g(x)}^(2) . If h(5) = 11, then h(10) is equal to :

Find f o g and g o f f(x) = |x| and g(x) = |5x -2|