f(x)=log x" on "[1,e]

Find the greatest and least values of f(x)=x^(2)log x in [1,e]

Difference between the greatest and the least values of the function f(x)=x(ln x-2) on [1,e^2] is

If the function f(x) =log x, x in (1, e) , satisfies all the conditions of LMVT, then the value of c is..... A) 1 B) e C) 1/e D) e-1

Find the greatest and the least values of the following functions on the indicated intervals : f(x)=x^(3) " ln x on" [1,e]

f(x)=log x, interval [1,e]

If f(x)=|log x|,x>0, find f'(1/e) and f'(e).

If f(x)=|log x|,x>0, find f'((1)/(e)) andf '(e)

If f(x) = log x satisfies Lagrange's theorem on [1,e] then value of c in (1,e) such that the tangent at c is parallel to line joining (1,f(1)) and (e,f(e )) is

A: int e^(x)((1+x log x)/(x))=e^(x)log x+c R: int e^(x)[f(x)+f'(x)]dx=e^(x)f(x)+c