Open AccessALGEBRAIC PROOF IV FERMATS LAST THEOREM
Author(s) -
James E. Joseph
Publication year - 2015
Publication title -
journal of advances in mathematics
Language(s) - English
Resource type - Journals
ISSN - 2347-1921
DOI - 10.24297/jam.v11i7.1223
Subject(s) - mathematics , prime (order theory) , algebraic number , prime number , discrete mathematics , algebraic number theory , pure mathematics , combinatorics , algebra over a field , mathematical analysis
The special case z4 = x4 + y4 is impossible [1]. In view of this fact, it is only necessary to prove, if x, y, z, are relatively prime positive integers, π is an odd prime, zπ = xπ +yπ (In this article, the symbol π will represent an odd prime). Also, a new proof is given that z4 = x4 + y4 is impossible.
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