This is a homework question. I'm not expecting an answer, just some guidance, possibly :) I am to show that **log( n!) = Θ(n·log(n))**.

A hint was given that I should show the upper bound with ** n^{n}** and show the lower bound with

**(**. This does not seem all that intuitive to me. Why would that be the case? I can definitely see how to convert

*n*/2)^{(n/2)}**to**

*n*^{n}**[log both sides of an equation], but that's kind of working backwards. What would be the correct approach to tackle this problem? Should I draw the recursion tree? There is nothing recursive about this, so that doesn't seem like a likely approach..**

*n*·log(*n*)
`O(log(n!))`

? I guess you want to have the upper run-time complexity. – Georg Schölly Jan 19 '10 at 17:53