Abstract
Beal Conjecture was formulated in 1997 and presented as a generalization of Fermat's Last Theorem, within the field of number theory.
Highlights
The aim of this paper is to provide proof of Beal Conjecture with the use of basic mathematics
Based on the equations (1) and (2) and Beal Conjecture if: A, B, C, x, y and z are positive integers, and x, y, z > 2 we have proved that the factors of A, B
C and N1 and N2 are common prime factors RETRA We have: If the exponents x, y and z are positive integers, all greater than 2, we can express them as: If we substitute the expression for A, B, C, x, y and z in Beal conjecture we obtain the following form of the Beal conjecture
Summary
The aim of this paper is to provide proof of Beal Conjecture with the use of basic mathematics. Based on the equations (1) and (2) and Beal Conjecture if: A, B, C, x, y and z are positive integers, and x, y, z > 2 we have proved that the factors of A, B
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