The function `f(x) =x^(3) - 6x^(2)+ax + b` satisfy the conditions of Rolle's theorem on [1,3] which of these are correct ?

The function f(x)=x(x+3)e^(-(1/2)x) satisfies the conditions of Rolle's theorem in (-3,0). The value of c, is

If the function f(x)=a x^3+b x^2+11 x-6 satisfies conditions of Rolles theorem in [1,3] and f'(2+1/(sqrt(3)))=0, then values of a and b , respectively, are (A) -3,2 (B) 2,-4 (C) 1,-6 (D) none of these

The fucntion f(x)=x^(3)-6ax^(2)+5x satisfies the conditions of Lagrange's mean value theorem over the interval [1,2] and the value of c (that of LMVT) is 7/4, then find the value of a.

A Function y=f(x) is defined on [0,6] as f(x)= { underset(2 " ", " "4le x le6)underset((x-3)^(3)" "," "1ltxlt4)(-8x " ", " "0lexle1). Show that for the function y=f(x) all the three conditions of Rolle's theorem are violated on [0,6] but still f(x) vanishes at a point in (0,6)

If the function f(x)= x^(3)-6x^(2)+ax+b satisfies Rolle's theorem in the interval [1,3] and f'((2sqrt(3)+1)/(sqrt(3)))=0 , then

If f(x) satisfies the condition for Rolle's heorem on [3,5] then int_(3)^(5) f(x) dx equals

If y=f(x) satisfies has conditions of Rolle's theorem in [2, 6], then int_(2)^(6)f'(x)dx is equal to

If the function f(x)=x^3-6x^2+a x+b defined on [1,3] satisfies Rolles theorem for c=(2sqrt(3)+1)/(sqrt(3) then find the value of aa n db

If the function f(x)=x^3-6x^2+a x+b defined on [1,3] satisfies Rolles theorem for c=(2sqrt(3)+1)/(sqrt(3) then find the value of aa n db

Consider a function f(x) = ln ((x^2 + alpha)/(7x)) . If for the given function, Rolle's theorem is applicable in [3,4] at a point C then find f'' (C)