Add to ORKG{ Beal's Conjecture :} The equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively prime positive integers $x, y, z $ with $\mu, \xi $ and $ \nu$ odd primes at least $3$. A proof of this longstanding conjecture is given
Beal's Conjecture : The equation za = xb+yc has no solution in relatively prime positive intege...
In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive i...
The Beal conjecture is an unsolved number problem. It was formulated in 1993 by Andrew Beal ,A Banke...
The equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively prime positive integers $x, y, z $ wi...
It is proved in this paper t that the equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively pri...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
It is proved in this paper that (1){ \bf Fermat's Last Theorem:} If $\pi$ is an odd prime, there are...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
It is proved in this paper that (1){ \bf Fermat's Last Theorem:} If $\pi$ is an odd prime, there are...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
The Beal's conjecture states if $A^{x} + B^{y} = C^{z}$, where $A$, $B$, $C$, $x$, $y$ and $z$ are p...
We prove if $A^{x} + B^{y} = C^{z}$, where $A$, $B$, $C$, $x$, $y$ and $z$ are positive integers, $x...
BEAL'S CONJECTURE: If Ax +By = Cz, where A, B, C, x, y and z are positive integers and x, y and...
In this paper we give a proof of Beal's conjecture . Since the discovery of the proof of the last th...
Beal's Conjecture : The equation za = xb+yc has no solution in relatively prime positive intege...
In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive i...
The Beal conjecture is an unsolved number problem. It was formulated in 1993 by Andrew Beal ,A Banke...
The equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively prime positive integers $x, y, z $ wi...
It is proved in this paper t that the equation $z^\xi=x^\mu+y^\nu$ has no solution in relatively pri...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
It is proved in this paper that (1){ \bf Fermat's Last Theorem:} If $\pi$ is an odd prime, there are...
If $\pi$ is an odd prime and $x, y, z,$ are relatively prime positive integers, then $z^\pi\not=x^\p...
It is proved in this paper that (1){ \bf Fermat's Last Theorem:} If $\pi$ is an odd prime, there are...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
In this paper the following statememt of Fermat\rq{}s Last Theorem is proved. If $x, y, z$ are pos...
The Beal's conjecture states if $A^{x} + B^{y} = C^{z}$, where $A$, $B$, $C$, $x$, $y$ and $z$ are p...
We prove if $A^{x} + B^{y} = C^{z}$, where $A$, $B$, $C$, $x$, $y$ and $z$ are positive integers, $x...
BEAL'S CONJECTURE: If Ax +By = Cz, where A, B, C, x, y and z are positive integers and x, y and...
In this paper we give a proof of Beal's conjecture . Since the discovery of the proof of the last th...
Beal's Conjecture : The equation za = xb+yc has no solution in relatively prime positive intege...
In this paper, the following statememt of Fermat's Last Theorem is proved. If x; y; z are positive i...
The Beal conjecture is an unsolved number problem. It was formulated in 1993 by Andrew Beal ,A Banke...