On [1,e] the greatest value of `x^(2) log x` is

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

On [1,e], then least and greatest vlaues of f (x) = x^(2)ln x are m and M respectively, then [ sqrt(M +m)] is : (where [] denotes greatest integer function)

If the greatest value of y= x/log x on [e, e^(3)] is u then u is equal to (given e= 2.71)

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

The greatest value of the function log_(x) 1//9 - log_(3) x^(2) (x gt 1) is

Find the greatest & least value of f(x)=sin^(-1).(x)/(sqrt(x^(2)+1))-ln x in [(1)/(sqrt(3)), sqrt(3)] .

If f(x) = (x)/(1+(log x)(log x)....oo), AA x in [1, 3] is non-differentiable at x = k. Then, the value of [k^(2)] , is (where [*] denotes greatest integer function).

Write a value of int e^(2)x^(2+ln x)dx