While evaluating $$\lim_{n \to \infty}\left(\frac{n!}{n}\right)^{1/n} $$
The integral turns out to be
$$\int_0^1 \log x = \big[x\log x\big]_0^1 - \big[x \big]_0^1 $$
The second term will -1 how ever the first term will be
$$I_1=1\times\log 1 -0\times \log 0$$
My text book has taken the value of $0\log 0$ as $0$. However isn't $\log0$ undefined?