If `f(x)={(x^(alpha)logx , x > 0),(0, x=0):}` and Rolle's theorem is applicable to `f(x)` for `x in [0, 1]` then `alpha` may equal to (A) -2 (B) -1 (C) 0 (D) `1/2`

The value of 'c' for which Lagrange's Mean value Theorem is applicable to f (x) = x^(1//2) in [0,4] is

Verify Rolle's Theorem for the function: f(x) = sin x+cos x in [0,pi/2]

If f(x) = {:{(xsin(1/x),xne0),(0,x=0):} Show that 'f' is not differentiable at x =0

Let f(x) = Max. {x^2, (1 - x)^2, 2x(1 - x)} where x in [0, 1] If Rolle's theorem is applicable for f(x) on largest possible interval [a, b] then the value of 2(a+b+c) when c in [a, b] such that f'(c) = 0, is

Verify Rolle's theorem for f(x)= x, x in [1,2]

Verify Rolle's theorem for function f(x) = sin x + cos x - 1 in the interval [0,pi/2] .

Verify Rolle's theorem for function f(x) = sin x + cos x in the interval [0,2pi] .

Fill in the blanks: Rolle's Theorem is not applicable to the function f(x) = (x-1)^(2//3) on [0,2] as f is not derivable at ………… .

Verify Rolle's Theorem for the following functions : f(x) = x(x - 1)^2 in [0, 1]

Verify Rolle's Theorem for the function: f(x) = sin x + cos x -1 in [0,pi/2]