A Proof of Beal's conjecture
Keywords:
Beal, conjecture
Abstract
It is proved in this paper t that the equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively prime positive integers $x, y, z,$ with $\xi, \mu, \nu$ odd primes at least $3.$ This is equivalent to Fermat\rq{}s Last Theorem which is stated as follows: If $x.y, z$ are positive integers, and $\pi$ is an odd prime satisfying $z^\pi=x^\pi+y^\pi,$ then $x, y, z$ are not relatively prime.Downloads
Download data is not yet available.
References
A. Wiles, {it Modular ellipic eurves and Fermat's Last
Theorem/}, Ann. Math. 141 (1995), 443-551.
A. Wiles and R. Taylor, {it Ring-theoretic properties of
certain Heche algebras/}, Ann. Math. 141 (1995), 553-573.
Published
2016-10-18
How to Cite
Joseph, J. (2016). A Proof of Beal’s conjecture. Journal of Progressive Research in Mathematics, 9(3), 1411-1412. Retrieved from http://scitecresearch.com/journals/index.php/jprm/article/view/907
Issue
Section
Articles
Copyright (c) 2016 Journal of Progressive Research in Mathematics
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.
