If f(x) satisfying the conditions of Rolle's theorem in [1,2] and f(x) is continuous in [1,2] then `int_(1)^(2) f'(x) dx`=

If f(x) satifies of conditiohns of Rolle's theorem in [1,2] and f(x) is continuous in [1,2] then :.int_(1)^(2)f'(x)dx is equal to

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 f(x) satisfies the condition of Rollel's theorem in [1,2], then int_(1)^(2)f'(x)dx is equal to (a) 1 (b) 3 (c) 0 (d) none of these

if f(x)=|x-1| then int_(0)^(2)f(x)dx is

If f(x)=x^(3)+bx^(2)+ax satisfies the conditions on Rolle's theorem on [1,3] with c=2+(1)/(sqrt(3))

The polynomial f(x)=x^3-bx^2+cx-4 satisfies the conditions of Rolle's theorem for x in [1,2] , f'(4/3) = 0 the order pair (b,c) is

Verify the Rolle's theorem for f(x)=(x-1)^(2) in [1,2].