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105.39 The Eureka theorem of Gauss

Published online by Cambridge University Press:  13 October 2021

Stan Dolan
Stan Dolan*
Affiliation:
4 Orchard Close, Charmouth DT6 6RS, e-mail: stan@standolan.co.uk
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The Mathematical Gazette , Volume 105 , Issue 564 , November 2021 , pp. 512 - 514
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Copyright
© The Mathematical Association 2021

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References

Gauss, C. F., Disquisitiones arithmeticae, Yale Univ. Press, New Haven, Conn., and London (1966).Google Scholar
Pollack, P. and Schorn, P., Dirichlet's proof of the three-square theorem, http://pollack.uga.edu/finding3squares-6.pdfGoogle Scholar
Ankeny, N. C., Sums of three squares, Proc. Amer. Math. Soc. 8 (1957) pp. 316-319.CrossRefGoogle Scholar
Dolan, S. W., Nint reciprocity, Math. Gaz. 98 (July 2014), pp. 317-319.CrossRefGoogle Scholar
Dolan, S. W., Primes of the form , Math. Gaz. 101 (November 2017) p. 465.Google Scholar
Dolan, S. W., A very simple proof of the two-squares theorem, Math. Gaz. 105 (November 2021) p. 511.Google Scholar
Davenport, H., The geometry of numbers, Math. Gaz. 31 (October 1947) pp. 206-210.CrossRefGoogle Scholar