Show that Rolle's theorem is not applicable fo rthe following functions: `f(x)=x^3,` interval `[-1,1]`

Show that Rolle's theorem is not applicable to the following functions in the specified intervals: f(x)=1-root(3)(x^(2))" in " -1 le x le 1

Show that Rolle's theorem is not applicable to the following functions in the specified intervals: f(x)=2+(x-2)^((2)/(3))" in " 1 le x le 3

Show that Rolle's theorem is not applicable to the following functions in the specified intervals: f(x)=|x-1|" in " 0 le x le 2

Show that Rolle's theorem is not applicable to the following functions in the specified intervals: f(x)={(x^(2)+1" when " 0 le x le 1),(3-x" when "1 lt x le 2):}

Show that Rolle's theorem is not applicable to the following functions in the specified intervals: f(x)=tan x " in " 0 le x le pi

Examine if Rolle's theorem is applicable to the following functions : f(x) = [x] on [-1,1]

Examine if Rolle's theorem is applicable to the following functions : f(x) = |x| on [-1,1]

Rolle's theorem is not applicable for the function f(x)=|x| in the intervel [-1,1] because