Rolle's theorem is not applicable to the function `f(x)=|x|"for"-2 le x le2` because

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

Rolle's theorem holds for the function f(x) =(x-2) log x , x in [1,2], show that the equation xlog x = 2-x is satisfied by at least one value of x in (1,2)

The Rolle's theorem is applicable in the interval -1le x le1 for the function

Check the validity of the Rolle's theorem for the following functions: f(x) = x^2 if 0 le x le 2, = 6-x, if 2 le x le 6

Verify Rolle's theorem for each of the following functions : f(x) = e^(-x) (sin x - cos x) " in " [(pi)/(4), (5pi)/(4)]

Verify Rolle's theorem for the function: f(x) = frac {2}{e^x + e^(-x) on [-1,1]

Verify Rolle's theorem for the function: f(x) = x^2 -4x +10 on (0,4)

Check whether conditions of Rolle's theorem are satisfied by the following functions: f(x) = x^2 - 2x + 3, x in (1,4)