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`

If f(x)={(x^(alpha)logx , x > 0),(0, x=0):} and Rolle's theorem is applicable to f(x) for x in [0, 1] then alpha may equal to (A) -2 (B) -1 (C) 0 (D) 1/2

Rolle's theorem is applicable for the function f(x) = |x-1| in [0,2] .

The value of c in Rolle's theorem for the function f (x) =(x(x+1))/e^x defined on [-1,0] is

Find the value of c in Rolle’s theorem for the function f(x) = x^3– 3x in [–sqrt3, 0] .

The value of c in Rolle's theorem for the function f(x) = x^(3) - 3x in the interval [0,sqrt(3)] is

The value of c in Rolle's theorem for the function f(x) = x^(3) - 3x in the interval [0,sqrt(3)] is

If f(x)=inte^(x)(tan^(-1)x+(2x)/((1+x^(2))^(2)))dx,f(0)=0 then the value of f(1) is

If f(x)={(ax^2+b ,0lex<1),(4,x=1),(x+3,1ltxge2)) then the value of (a ,b) for which f(x) cannot be continuous at x=1, is (a) (2,2) (b) (3,1) (c) (4,0) (d) (5,2)

Let f(x)=(1+b^2)x^2+2b x+1 and let m(b) the minimum value of f(x) as b varies, the range of m(b) is (A) [0,1] (B) (0,1/2] (C) [1/2,1] (D) (0,1]

Verify Rolles theorem for function f(x)=x(x-1)^2 on [0,\ 1]