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On integer solutions to x^5 - (x+1)^5 -(x+2)^5 +(x+3)^5 = 5^m + 5^n

Published 2016-02-29Version 1

We give an infinite number of integer solutions to the Diophantine equation x^5 - (x+1)^5 -(x+2)^5 +(x+3)^5 = 5^m + 5^n, and some solutions to some similar equations.

Comments: 3 pages

Categories: math.NT

Subjects: 11D45, 11D41

Keywords: integer solutions, infinite number, similar equations

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arXiv:1603.00080 [math.NT]Abstract References Reviews Resources

On integer solutions to x^5 - (x+1)^5 -(x+2)^5 +(x+3)^5 = 5^m + 5^n

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On integer solutions to x^5 - (x+1)^5 -(x+2)^5 +(x+3)^5 = 5^m + 5^n

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arXiv:1603.00080 [math.NT]Abstract References Reviews Resources