Open Accessalgebraic proofs of Fermats last theorem and Beals conjecture
Author(s) -
James E. Joseph
Publication year - 2016
Publication title -
journal of advances in mathematics
Language(s) - English
Resource type - Journals
ISSN - 2347-1921
DOI - 10.24297/jam.v12i9.132
Subject(s) - mathematics , conjecture , prime (order theory) , algebraic number , mathematical proof , prime number , discrete mathematics , prime number theorem , pure mathematics , combinatorics , mathematical analysis , geometry
In this paper, the following statememt of Fermats Last Theorem is proved. If x, y, z are positive integersï° is an odd prime and z = x y , x, y, z ï° ï° ï° ï€« are all even. Also, in this paper, is proved (Beals conjecture) The equationï¸ ï ï® z = x  y has no solution in relatively prime positive integers x, y, z, with ï¸ ,ï,ï® primes at least .
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