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Published online by Cambridge University Press:  01 August 2016

Abstract

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Copyright © The Mathematical Association 2009

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References

References

1. Macro, W.B., Pythagoras’s theorem and its extension, Math. Gaz. 57 (December 1973) pp. 339340.Google Scholar
2. Hoehn, L., A neglected Pythagorean-like formula, Math. Gaz. 84 (March 2000) pp. 7173.Google Scholar
3. Gilder, J., Integer-sided triangles with an angle of 60°, Math. Gaz. 66 (December 1982) pp. 261266.Google Scholar
4. Selkirk, K.E., Integer-sided triangles with an angle of 120°, Math. Gaz. 67 (December 1983) pp. 251255.Google Scholar
5. Willson, W.S. Wynne, A generalization of the property of the 4, 5, 6 triangle, Math. Gaz. 60 (June 1976) pp. 130131.Google Scholar
6. Lord, N.J., A striking property of the (2, 3, 4) triangle, Math. Gaz. 82 (March 1998) pp. 9394.Google Scholar
7. Barnard, A.D. and Silvester, J.R., Circle theorems and a property of the (2, 3,4) triangle, Math. Gaz. 85 (July 2001) pp. 312316.Google Scholar
8. Sutton, J.B., Yet another proof of Pythagoras’ theorem, Math. Gaz. 86 (March 2002) p. 72.Google Scholar
9. Burn, R.P., Triangles with 60° and sides of integer length, Math. Gaz. 87 (March 2003) pp. 148153.Google Scholar

References

1. Hall, A., Genealogy of Pythagorean triads, Math. Gaz. 54 (December 1970) pp. 377379.Google Scholar
2. Saunders, R. and Randall, T., The family tree of the Pythagorean triplets revisited, Math. Gaz. 78 (July 1994) pp. 190193.Google Scholar

References

1. Barnard, S. and Child, J.M., Higher algebra, Macmillan (1936) pp. 114115.Google Scholar
2. Vakil, Ravi, A mathematical mosaic, Brendan Kelly Publishing (1996) pp. 138139.Google Scholar

Reference

1. Hirschhorn, M.D., A note on partial fractions, Australian Math. Soc. Gazette, 30 (2003) p. 81.Google Scholar