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83.50 Recent formulae for π: arctan revisited!

Published online by Cambridge University Press:  01 August 2016

Nick Lord
Nick Lord*
Affiliation:
Tonbridge School, Kent TN9 1JP
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Information
The Mathematical Gazette , Volume 83 , Issue 498 , November 1999 , pp. 479 - 483
Copyright
Copyright © The Mathematical Association 1999

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References

1. Bailey, D. Borwein, P. and Plouffe, S. On the rapid computation of various polylogarithmic constants, included in [8], pp. 663–76.Google Scholar
2. Adamchik, V. and Wagon, S. A simple formula for π , Amer. Math. Monthly 104:9 (1997) pp. 852855.Google Scholar
3. Adamchik, V. and Wagon, S., π: a 2000-year search changes direction, Mathematica in Ed. and Res. 5:1 (1996) pp. 1119.Google Scholar
4. Blatner, D. The joy of π, Allen Lane (1997).Google Scholar
5. Chien-Lih, H. More Machin-type identities, Math. Gaz. 81 (March 1997) pp. 120121.Google Scholar
6. Wetherfield, M. Machin revisited, Math. Gaz. 81 (March 1997) pp. 121123.CrossRefGoogle Scholar
7. Lord, N. Recent calculations of π: the Gauss-Salamin algorithm, Math. Gaz. 76 (July 1992) pp. 231242.CrossRefGoogle Scholar
8. Berggren, L. Borwein, J. Borwein, P. Pi: a source book, Springer (1997).Google Scholar
9. Delahaye, J-P. Le fascinant nombre π, Belin (1997).Google Scholar