ALGEBRAIC PROOFS FERMAT'S LAST THEOREM, BEAL'S CONJECTURE

Authors

  • James E Joseph Retired Professor, Department of Mathematics Howard University

DOI:

https://doi.org/10.24297/jam.v12i9.130

Keywords:

Fermat.

Abstract

In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive integers, _ is an odd prime and z_ = x_ + y_; then x; y; z are all even. Also, in this paper, is proved Beal's conjecture; the equation z_ = x_ + y_ has no solution in relatively prime positive integers x; y; z; with _; _; _ primes at least 3:

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Published

2016-09-27

How to Cite

Joseph, J. E. (2016). ALGEBRAIC PROOFS FERMAT’S LAST THEOREM, BEAL’S CONJECTURE. JOURNAL OF ADVANCES IN MATHEMATICS, 12(9), 6576–6577. https://doi.org/10.24297/jam.v12i9.130

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Articles