Revision as of 14:19, 16 June 2015 edit 71.224.56.93 (talk) Undid revision 667199572 by 71.224.56.93 (talk) -- already known Raabe's formula ← Previous edit		Revision as of 14:19, 16 June 2015 edit undo 71.224.56.93 (talk) Undid revision 667179485 by 71.224.56.93 (talk) --- ditto Next edit →
Line 20: for integer ''k'' ≥ 1, and is sometimes called '''Gauss's multiplication formula''', in honour of [[Carl Friedrich Gauss]]. The multiplication theorem for the gamma functions can be understood to be a special case, for the [[trivial character]], of the [[Chowla–Selberg formula]]. ~~By sending <math>k\to\infty</math> and using Riemann sums, this~~This implies a variation of [[Stirling's approximation]] that is exact --- a '''Stirling identity''' --- :<math> \exp\left(\int_z^{z+1}\log\Gamma(x)\,dx\right) = \sqrt{2\pi} z^ze^{-z}.

Multiplication theorem: Difference between revisions