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80.23 A simple approach to the factorial function

Published online by Cambridge University Press:  01 August 2016

David Fowler*
Affiliation:
Mathematics Institute, University of Warwick, Coventry CV4 7AL

Abstract

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Type
Notes
Copyright
Copyright © The Mathematical Association 1996

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References

1. Fowler, D.H., The binomial coefficient function, The American Mathematical Monthly 103 (1) (1996) pp. 117. (For a more clearly reproduced set of graphics, see the www directory http:// www.maths.warwick.ac.uk/maths/papers/, or the ftp directory ftp:// ftp.maths.warwick.ac.uk/pub/papers/dhf, or contact the author.)CrossRefGoogle Scholar
2. Artin, E., Einführung in die Theorie die Gammafunktion, Teubner, Leipzig (1931): tr. Butler, M., The Gamma Function, Holt, Rinehart and Winston, New York (1964).Google Scholar
3. Bourbaki, N., Éléments de Mathématique, Livre IV: Fonctions d’une variable réelle, Chapitre 7, La fonction Gamma, Paris: Hermann, 1951, rev. ed. 1961.Google Scholar
4. Graham, R.L., Knuth, D.E. and Patashnik, O., Concrete mathematics, Addison-Wesley, Reading, Mass. (1988).Google Scholar
5. Davis, P.J., Leonhard Euler’s integral: A historical profile of the Gamma Function, American Mathematical Monthly 66 (1959) pp. 849869.Google Scholar