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https://doi.org/10.4169/amer.math.monthly.118.04.316
| Title: | A cubic analogue of the jacobsthal identity | Authors: | Chan, H.H. Long, L. Yang, Y. |
Issue Date: | Apr-2011 | Citation: | Chan, H.H., Long, L., Yang, Y. (2011-04). A cubic analogue of the jacobsthal identity. American Mathematical Monthly 118 (4) : 316-326. ScholarBank@NUS Repository. https://doi.org/10.4169/amer.math.monthly.118.04.316 | Abstract: | It is well known that if p is a prime such that p = 1 (mod 4), then p can be expressed as a sum of two squares. Several proofs of this fact are known and one of them, due to E. Jacobsthal, involves the identity p = x2 + y2, with x and y expressed explicitly in terms of sums involving the Legendre symbol. These sums are now known as the Jacobsthal sums. In this short note, we prove that if p = 1 (mod 6), then 3p = u2 + uv + v 2 for some integers u and v using an analogue of Jacobsthal 's identity. © THE MATHEMATICAL ASSOCIATION OF AMERICA. | Source Title: | American Mathematical Monthly | URI: | http://scholarbank.nus.edu.sg/handle/10635/102629 | ISSN: | 00029890 | DOI: | 10.4169/amer.math.monthly.118.04.316 |
| Appears in Collections: | Staff Publications |
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