Verify Rolle's theorem for the following functions in the given intervals. f(x) = x(x-4)^(2) in the interval [0,4].

Verify Rolle's theorem for the following functions in the given intervals. f(x) = sin^(2) x in the interval [0,pi] .

Verify Rolle's theorem for the following functions in the given intervals. f(x) = x^(2) - 6x + 8 in the interval [2,4].

Verify Rolle's theorem for the following functions in the given intervals. f(x) = x^(2) - 5x - 6 in the interval [-1,6] .

Verify Rolle's theorem for the following functions in the given intervals. f(x) = e^(x) cos x in the interval [-pi//2 , pi//2] .

Verify Rolle's theorem for the following functions in the given intervals. f(x) sin x in the interval [ 0, pi] .

Verify Rolle's theorem for the following functions in the given intervals. f(x) = sin 3x in the interval [0,pi] .

Verify Rolle's theorem for the following functions in the given intervals. (i) f(x) = (x-2) (x-3)^(2) in the interval [2,3] . (ii) f(x) = x^(3) (x-1)^(2) in the interval [0,1].

Discuss the applicability of the Rolle's theorem for the following functions in the given intervals. (i) f(x) = (x-2) (2x-1) in the interval [1,2]. (ii) f(x) = tan x in the interval [0, pi] . (iii) f(x) = sin (1)/(x) in the interval [-2,2] . (iv) f(x) = |x| in the interval [-2,2] . (v) f(x) = x^(1//3) in the interval [-2,2].

Verify Rolle's theorem for the following functions in the given intervals. f(x) = sinx + cos x in the interval [0 , pi//2] .