If f(x) satifies of conditiohns of Rolle's theorem in [1,2] and
f(x) is continuous in [1,2] then `:.underset(1)overset(2)intf'(x)dx` is equal to

If f(x) satisfies the condition for Rolle's theorem on [3,5] then underset(3) overset(5)int f(x) dx equals

For the function f(x)=e^cosx , Rolle's theorem is

If intf(x)dx=f(x), then int{f(x)}^2dx is equal to

If the function f(x) = ax^3 + b x^2+11x - 6 satisfies conditions of Rolle's theorem in [1, 3] and f’(2+ (frac{1}{sqrt 3})) = 0, then values of a and b are respectively

The value of the integral overset(2a)underset(0)int (f(x))/(f(x)+f(2a-x))dx is equal to

If f(2)=2 and f'(2)=1, and then underset(x to 2) lim (2x^(2)-4f(x))/(x-2) is equal to

Rolle's theorem is true for the function f(x)=x^2-4 in the interval

If g(1)=g(2), then int_(1)^(2)[f{g(x)}]^(-1)f'{g(x)}g'(x)dx is equal to

Check whether the condition of Rolle's theorem are satisfied by the following functions or not: f(x) = (x-1)(x-2)(x-3) , x in (1,3)