" 9."11.1(x)-x^(4)log x" and "f(0)=0," then value of "alpha" for which Rolle's theorem can be applied in "[0,1]" is "

If f(x) = x^(a) log x and f(0) = 0 then the value of alpha for which Rolle's theorem can be applied in [0,1] is

If f(x) = x^(a) log x and f(0) = 0 then the value of alpha for which Rolle's theorem can be applied in [0,1] is

If f(x)=x^alphalogx and f(0)=0 , then the value of alpha for which Rolle's theorem can be applied in [0,1] is

If f(x)=x^(alpha) logx and f(0)=0 , then the value of alpha for which Roll's theorem can be applied in [0, 1] is :

If f(x) = x^αlogx and f(0) = 0 , then the value of ′α′ for which Rolle's theorem can be applied in [0,1] is (A) -2 (B) -1 (C) 0 (D) 1/2

Value of 'c' of Rolle's theorem for f(x) = |x| in [-1,1] is

The value of c in Rolle's Theorem for the function f(x) = e^x sin x , x in [0,pi] is

The value of c in Rolle's theorem for the function f(x) = e^(x).sin x, x in [0, pi] is