| viXra.org > Number Theory > viXra:1510.0372 |
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| viXra.org > Number Theory > viXra:1510.0372 |
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Number Theory |
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Authors: Alfredo Olmos Hernández
Beal's conjecture is studied, which arises from investigations Andrew Beal, on Fermat's Last Theorem in 1993. Beal's conjecture, proposed to the equation a^x+b^y=c^z where A, B, C, x, y, z positive integers x, y, z> 2 so that the equation has a solution A, B, and C must have a common prime factor. Given the vain attempts to find a counterexample to the conjecture (which has been proven by the help of modular arithmetic, for all values of the six variables to a value of 1000) values for the six variables. To advance the theory of numbers. Given the relationship that has Beal's conjecture with Fermat's last theorem; it is considered important to number theory, demonstration of this conjecture. To solve Beal's conjecture, using Fermat's last theorem and the remainder theorem is proposed.
Comments: 7 Pages.
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[v1] 2015-10-23 19:12:53
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