" (iv) "f(x)=(x^(2)-1)(x-2)" on "[-1,2]

Verify Rolles theorem for function f(x)=(x^(2)-1)(x-2) on [-1,2]

f(x) = (x^(2) - 1 ) (x - 2) in [-1, 2]

Verify Rolles theorem for function f(x)=(x^2-1)(x-2) on [-1,\ 2]

Verify Rolle's theorem for the following functions in the given intervals and find a point (or point) in the interval where the derivative vanishes : f(x) = (x^2-1)(x-2) in [-1,2]

Verify Rolle's Theorem for the following functions : f(x) = (x^2 - 1) (x - 2) in [- 1, 2]

Verify Rolles theorem for function f(x)=(x-1)(x-2)^(2) on [1,2]

Verify Rolles theorem for function f(x)=(x-1)(x-2)^2 on [1,\ 2]

Verify Rolle's theorem for each of the following functions : f(x) = (x -1) (x -2)^(2) " in " [1, 2]

Find the greatest and the least values of the following functions on the indicated intervals : f(x) = sqrt((1-x)^(2)(1+2x^(2)))" on"[-1,1]

A function f(x) is defined by, implies f(x)=f(x)={(([x^2]-1)/(x^2-1) "for" x^2ne1),(0 "for"x^2=1):} Discuss the continuity of f(x) at x=1.