The '''Gamma function''' is a generalization of the notion of a [[factorial]] to [[complex number]]s.

For <math>\Re(z)>0</math>, we define <math>\Gamma(z)=\int_0^\infty e^{-t}t^{z-1}\; dz</math>. It is easy to check with [[integration by parts]] that <math>\Gamma(z+1)=z\Gamma(z)</math>. This is almost the same as the factorial identity <math>(n+1)!=(n+1)n!</math>, but it is off by one. Since <math>\Gamma(1)=1</math>, we therefore have <math>\Gamma(n+1)=n!</math> for nonnegative integers <math>n</math>. But with the integral, we can define the <math>\Gamma</math> function for other complex numbers. We can then use the identity to extend the Gamma function to a [[meromorphic]] function on the full [[complex plane]], with simple poles at the nonpositive integers.