Add to ORKGIn 1995, A, Wiles announced, using cyclic groups ( a subject area which was not available at the time of Fermat), a proof of Fermat’s Last Theorem, which is stated as follows: If π is an odd prime and x, y, z, are relatively prime positive integers, then z π 6= x π + y π . In this note, an elegant proof of this result is given. It is proved, using elementary algebra, that if π is an odd prime and x, y, z are positive integers satisfying z π = x π +y π , then z, x, are each divisible by π
In this paper, we show the Pythagorean triples and a short and plain Fermat’s Last Theorem proof. Fe...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
summary:We examine primitive roots modulo the Fermat number $F_m=2^{2^m}+1$. We show that an odd int...
In 1995, A, Wiles [2], [3], announced, using cyclic groups ( a subject area which was not available ...
In 1995, A, Wiles announced, using cyclic groups ( a subject area which was not available at the tim...
In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive i...
In 1995, A, Wiles announced, using cyclic groups, a proof of Fermat's Last Theorem, which is stated ...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
The project aims to deliver sufficient mathematical background to understand a partial proof, due to...
Beal's Conjecture : The equation za = xb+yc has no solution in relatively prime positive intege...
AbstractThis paper continues the search to determine for what exponents n Fermat's Last Theorem is t...
Fermat, Pierre de, is perhaps the most famous number theorist who ever lived. Fermat\u27s Last Theor...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
This note proves two theorems regarding Fermat-type equation $x^r + y^r = dz^p$ where $r \geq 5$ is ...
This article provides solutions to some divisibility problems using Fermat's little theorem. To have...
In this paper, we show the Pythagorean triples and a short and plain Fermat’s Last Theorem proof. Fe...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
summary:We examine primitive roots modulo the Fermat number $F_m=2^{2^m}+1$. We show that an odd int...
In 1995, A, Wiles [2], [3], announced, using cyclic groups ( a subject area which was not available ...
In 1995, A, Wiles announced, using cyclic groups ( a subject area which was not available at the tim...
In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive i...
In 1995, A, Wiles announced, using cyclic groups, a proof of Fermat's Last Theorem, which is stated ...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
The project aims to deliver sufficient mathematical background to understand a partial proof, due to...
Beal's Conjecture : The equation za = xb+yc has no solution in relatively prime positive intege...
AbstractThis paper continues the search to determine for what exponents n Fermat's Last Theorem is t...
Fermat, Pierre de, is perhaps the most famous number theorist who ever lived. Fermat\u27s Last Theor...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
This note proves two theorems regarding Fermat-type equation $x^r + y^r = dz^p$ where $r \geq 5$ is ...
This article provides solutions to some divisibility problems using Fermat's little theorem. To have...
In this paper, we show the Pythagorean triples and a short and plain Fermat’s Last Theorem proof. Fe...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
summary:We examine primitive roots modulo the Fermat number $F_m=2^{2^m}+1$. We show that an odd int...