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On a variant of the Lucas’ square pyramid problem
NSERC
Kebli, Salima; Kihel, Omar;
Kebli, Salima; Kihel, Omar;
On a variant of the Lucas’ square pyramid problem
Hungary
- Brock University Canada
- Eszterhazy Karoly University Hungary
[1] L. Beeckmans, Squares expressible as sum of consecutive squares, Amer. Math. Monthly 101 (1994), no. 5, 437-442. [OpenAIRE]
[2] A. Bremner, R. J. Stroeker, N. Tzanakis, n sums of consecutive squares, J. Number Theory 62 (1997), no. 1, 39-70.
[3] E. Lucas, Question 1180, Nouvelles Annales de Mathématiques, ser. 2, 14 (1875), 336.
[4] R. J. Stroeker, On the sum of consecutive cubes being a perfect square. Special issue in honour of Frans Oort. Compositio Math. 97 (1995), no. 1-2, 295-307. [OpenAIRE]
[5] G. N. Watson, The Problem of the Square Pyramid, Messenger of Mathematics 48 (1918-19), 1-22.
- Brock University Canada
- Eszterhazy Karoly University Hungary