The values of `c` for which LMVT holds true for `f(x) = (x-1)/(x-3), AA x in [4,5]` is/are:

Find c, if LMVT is applicable for f(x)=(x-3)(x-6)(x-9), x in [3, 5] .

Find c if LMVT is applicable for f(x)=x(x-1)(x-2),x in[0,(1)/(2)]

The value of c in Rolles theorem when f(x)=2x^3-5x^2-4x+3 , is x in [1//3,\ 3]

If mean value theorem holds for the function f(x)=(x-1)(x-2)(x-3), x in [0,4], then c=

Verify LMVT for the following function f(x)=x+(1)/(x),x in[1,3]

If LMVT is applicable for f(x)=x(x+4)^(2), x in [0,4], then c=

The value of c in Rolle's theorem when f(x)=2x^(3)-5x^(2)-4x+3, x in [1//2,3] is

Verify LMVT for the following functions: f(x)=x(2-x),x in[0,1]

If mean value theorem holds good for the function f(x)=(x-1)/(x) on the interval [1,3] then the value of 'c' is 2 (b) (1)/(sqrt(3))( c) (2)/(sqrt(3))(d)sqrt(3)