Proof Of Fermat’s Last Theorem By Choosing Two Unknowns in the Integer Solution Are Prime Exponents

Authors

  • SRINIVAS
  • Dr.BRAOU
  • Mr. THIRUCHINARPALLI SRINIVAS

DOI:

https://doi.org/10.55014/pij.v3i4.108

Keywords:

number theory, proof of Fermat’s last theorem, Diophantine equations

Abstract

In this paper we are revisits well known problem in number theory ‘ proof of Fermat’s last theorem ‘ with different perspective .Also we are presented for n greater than 2, Diophantine equations K(xn+yn)=zn and xn+yn=L zn are satisfied by some positive prime exponents of x,y,z with some sufficient values of K and L. But it is not possible to find positive integers x,y and z, which are satisfies above equations with exactly K=1 and L=1. Clearly it proves Fermat’s last theorem, which states that No positive integers of x, y, z are satisfies the equation xn+yn=zn for n greater than 2.

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Published

2020-12-31

How to Cite

SRINIVAS, Dr.BRAOU, & Mr. THIRUCHINARPALLI SRINIVAS. (2020). Proof Of Fermat’s Last Theorem By Choosing Two Unknowns in the Integer Solution Are Prime Exponents. Pacific International Journal, 3(4), 147–151. https://doi.org/10.55014/pij.v3i4.108

Issue

Section

Regular