If `f` is an odd continuous function in `[-1,1]` and differentiable in `(-1,1)` then

If f be a continuous function on [0,1] differentiable in (0,1) such that f(1)=0, then there exists some c in(0,1) such that

If f be a continuous function on [0,1], differentiable in (0,1) such that f(1)=0, then there exists some c in(0,1) such that

If f(x)=sqrt(1-sqrt(1-x^(2))), then f(x) is (a) continuous on [-1,1] and differentiable on (-1, 1) (b) continuous on [-1,1] and differentiable on (-1,0)uu varphi(0,1)(c) continuous and differentiable on [-1,1](d) none of these

If f(x)=sqrt(1-(sqrt(1)-x^(2))), then f(x) is (a)continuous on [-1,1] and differentiable on (-1,1)(b) continuous on [-1,1] and differentiable on (-1,0)uu(0,1)(C) continuous and differentiable on [-1,1](d) none of these

Let f be any continuous function on [0, 2] and twice differentiable on (0, 2). If f(0) = 0, f(1) = 1 and f(2) = 2, then :

If f is continuous on [a,b] and differentiable in (a,b) then there exists c in(a,b) such that (f(b)-f(a))/((1)/(b)-(1)/(a)) is

A function f(x) is, continuous in the closed interval [0,1] and differentiable in the open interval [0,1] prove that f'(x_(1))=f(1) -f(0), 0 lt x_(1) lt 1

Let the set of all function f: [0,1]toR, which are continuous on [0,1] and differentiable on (0,1). Then for every f in S, there exists a c in (0,1) depending on f, such that :

Let f(x), be a function which is continuous in closed interval [0,1] and differentiable in open interval 10,1[ Show that EE a point c in]0,1[ such that f'(c)=f(1)-f(0)

Let f: [1,3] to R be a continuous function that is differentiable in (1,3) and f '(x) = |f(x) |^(2) + 4 for all x in (1,3). Then,