State Rolle's Theorem.

If the function f(x) = x^(3)-6x^(2) + ax + b defined on [1,3] satisfies the Rolle's Theorem for C = ( 2 sqrt(3) + 1)/( sqrt(3)) then find the values of a and b.

If f(x)={{:(x,olexle1),(2-x,1lexle2'):} then Rolle's theorem is not applicable to f(x) because

If the Rolle's theorem holds for the function f(x) = 2x^(3) + ax^(2) + bx in the interval [-1,1] for the point c =1/2 , then the value of 2a + b is

It is given that Rolle’s theorem holds for the function f(x)=x^(3)+bx^(2)+ax on [1,3] with C = 2+(1)/sqrt(3) . Find the values a and b

For m gt1, n gt 1 the value of c for which the Rolle's theorem is applicable for the function f(x)=x^(2m-1)(a-x)^(2n) in (0,a) is

Statement -1 : If f(x) = x ( x+ 3) e^(-x//2) , then Rolle's theorem applies for f(x) in [-3,0] . Statement-2 : LMVT is applied in f(x) = x ( x+3) e^(-x//2) in any interval.

Verify Rolle's theorem for the function sinx-sin2x on [0,pi]

The value of 'c' by Rolle's Theorem for which f(x) =1-root(3)(x^(4) in [-1,1] is

Verify Rolle's theorem for the function f(x)=x(x+3)e^(-x/2) in [-3,0].