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90.07 Interesting finite and infinite products from simple algebraic identities

Published online by Cambridge University Press:  01 August 2016

Thomas J. Osler
Thomas J. Osler*
Affiliation:
Mathematics Department, Rowan University, Glassboro NJ 08028USA email: Osler@rowan.edu
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Information
The Mathematical Gazette , Volume 90 , Issue 517 , March 2006 , pp. 90 - 93
Copyright
Copyright © The Mathematical Association 2006

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References

1. Carlson, B. C., The logarithmic mean, Amer. Math. Monthly, 79 (1972), pp. 615618.Google Scholar
2. Levin, A., A new class of infinite products generalizing Viete’s product formula for π, preprint.Google Scholar
3. Osier, T. J., The union of Vieta’s and Wallis’s products for pi, Amer. Math. Monthly, 106 (1999), pp. 774776.Google Scholar
4. Osier, T. J. and Wilhelm, M., Variations on Vieta’s and Wallis’s products for pi, Mathematics and Computer Education, 35(2001), pp. 225232.Google Scholar
5. Osier, T. J., The general Vieta-Wallis product for pi, Math. Gaz. 89 (November 2005) pp. 371377.Google Scholar
6. Stolarsky, K. B., Mapping properties, growth, uniqueness of Vieta (infinite cosine) products, Pacific J. Math. 89 (1980) pp. 209227.Google Scholar
7. Berggren, L., Borwein, J. and Borwein, P., Pi, A source book, Springer (1997) pp. 5367.Google Scholar
8. Hansen, E. R., A Table of series and products, Prentice-Hall (1975) pp. 503504.Google Scholar