Let f be differentiable for all x. If `f(1)= -2, f'(x) ge 2` for all `x in [1, 6]`, then :

Let f(x) satisfy the requirements of Largrange's Mean Value Theorem in [0, 2]. If f(0) = 0 and |f'(x)| le (1)/(2) , for all x in [0, 2], then :

Let f be a function defined for all x in R . If f is differentiable and f(x^(3)) = x^(5) for all x in R (x ne 0) , then the value of f^(')(27) is

Let f be a function satisfying f(x+y)=f(x) + f(y) for all x,y in R . If f (1)= k then f(n), n in N is equal to

If f(x) is continuos and differentiable function such that f(1/n) = 0 for all n in N , then

Let f : R to R be a differentiable function and f(1) = 4 , then the value of lim_(x to 1) int_4^(f(x)) (2t)/(x - 1) dt is :

Let F : R to R be a differentiable function having : f(2) = 6, f'(2) = 1/48 Then lim_(x to 2) int_(6)^(f(x)) (4 t^3)/(x-2) dt equals :

Let f(x), g(x) be differentiable functions and f(1) = g(1) = 2, then : lim_(x rarr 1) (f(1) g(x) - f(x) g(1) - f(1) + g(1))/(g(x) - f(x)) equals :

There exists a function f(x) satisfying f(0)=1, f'(0)=-1, f(x) gt 0 , for all x, then :

Let f(x) be a function satisfying f(x+y) = f(x) f(y) for all x,y in N such that f(1) = 3 and sum_(x=1)^(n) f(x) = 120 . Then the vlaue of n is :