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The most elementary proof that ?

Published online by Cambridge University Press:  17 October 2016

Nick Lord
Nick Lord*
Affiliation:
Tonbridge School, Kent TN9 1JP
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Extract

Here we present a simplification of one of the standard proofs that . We then look at extensions of the new approach, and add comments on the nature of the simplification (which relates to Step 1 below) and finally on the literature.

As in most proofs of the result, we shall actually prove that ; because

this is equivalent to the result sought.

Type
Articles
Information
The Mathematical Gazette , Volume 100 , Issue 549 , November 2016 , pp. 429 - 434
Copyright
Copyright © Mathematical Association 2016 

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References

1. Durell, C. V. & Robson, A., Advanced trigonometry, G. Bell & Sons (1930).Google Scholar
2. Yaglom, A. M. & Yaglom, I. M., An elementary derivation of the formulas of Wallis, Leibniz and Euler for the number π, Uspekhi Mat. Nauk. 57 (1953) pp.181187 [also available at http://www.mathnet.ru ]Google Scholar
3. Yaglom, A. M. & Yaglom, I. M., Challenging mathematical problems with elementary solutions, Volume 2, Dover (2003), Problem 145.Google Scholar
4. Papadimitriou, I., A simple proof of the formula , Amer. Math. Monthly 80 (1973) pp. 424425.Google Scholar
5. Apostol, T. M., Mathematical analysis (2nd edn.), Addison-Wesley (1974) p. 30, pp. 216-217.Google Scholar
6. Chapman, R., Evaluating ζ (2), accessed June 2016 at http://empslocal.ex.ac.uk/people/staff/rjchapma/etc/zeta2.pdf Google Scholar
7. Bromwich, T. J. I'A., An introduction to the theory of infinite series (2nd edn.), Macmillan (1959).Google Scholar
8. Berndt, B. C. & Yeap, B. P., Explicit evaluations and reciprocity theorems for finite trigonometric sums, Advances in Applied Math. 29 (2002) pp. 358385.CrossRefGoogle Scholar
9. Stark, E. L., The series , once more, Math. Mag. 47 (1974) pp. 197202.Google Scholar
10. Cauchy, A-L., Cours d'analyse de l'École Royale Polytechnique (Volume 1) (1821), pp. 556559: available in many printings such as the Cambridge Library Collection, Cambridge University Press (2009).CrossRefGoogle Scholar
11. Apostol, T. M., Another elementary proof of Euler's formula for ζ (2n), Amer. Math. Monthly 80 (1973) pp. 425431.Google Scholar