Modular Arithmetic/Sophie Germain's Theorem

Let ${\displaystyle p}$ be a prime number. Then, for the equation,

${\displaystyle x^{p}+y^{p}=z^{p}}$

it is true that at least one of the numbers ${\displaystyle x,y,z}$ must be divisible by ${\displaystyle p^{2}}$, if and only if there exists a prime ${\displaystyle q}$, such that:

1. No two nonzero ${\displaystyle p^{th}}$ powers differ by one modulo ${\displaystyle q}$;
2. ${\displaystyle p}$ is itself not a ${\displaystyle p^{th}}$ power modulo ${\displaystyle q}$.

Corollary: The first case of Fermat's Last Theorem (the case in which ${\displaystyle p}$ does not divide ${\displaystyle xyz}$) must hold for every prime ${\displaystyle p}$ if there exists a prime ${\displaystyle q}$ for which (1) and (2) hold.