Gauss's Expression

\Gamma(s)=\lim_{n\rightarrow\infty}\frac{n!}{s(s+1)(s+2)\cdots(s+n)}n^s

Gauss’s Expression was one of the first definitions of the Gamma Function. It serves as a basis for investigating various properties; for example, Euler’s Infinite Product can be derived as a corollary.

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Gauss's Expression

\Gamma(s)=\lim_{n\rightarrow\infty}\frac{n!}{s(s+1)(s+2)\cdots(s+n)}n^s

Any questions? Feel free to contact our authors at: [email protected], you will be put directly in touch with the person who wrote the text.

Any questions?

Feel free to contact our authors at: [email protected], you will be put directly in touch with the person who wrote the text.