1
$\begingroup$

Possible Duplicate:
prove equality with integral and series

This integral was my homework question with $p=2$ and $n=1$. I am wondering if one can get the general formula for p, or at least approximate this integral for any $p$, $n=1$? $$ \int_{0}^{\infty}\left(\frac{2^n}{t^n}\left(\frac{t^n}{2^nn!}-\frac{1}{2^{n+2}}\frac{t^{n+2}}{1!(n+1)!}+\frac{1}{2^{n+4}}\frac{t^{n+4}}{2!(n+2)!}-\ldots\right)\right)^ptdt $$

Thank you.

  • 0
    This already have been asked, but I can't find that answer...2012-06-23
  • 0
    @Norbert Above is the link to the duplicate.2012-06-23
  • 0
    @MArvis, thanks. This question must be closed.2012-06-23
  • 2
    it is a generalization for $p>2$ of the question linked.2012-06-23

0 Answers 0