Famous Theorems of Mathematics/Number Theory/Prime Numbers

This page will contain proofs relating to prime numbers. Because the definitions are quite similar, proofs relating to irreducible numbers will also go on this page.

A prime number p>1 is one whose only positive divisors are 1 and p.

Theorem: ${\displaystyle p}$ is prime and ${\displaystyle p|ab}$ implies that ${\displaystyle p|a}$ or ${\displaystyle p|b}$.

Proof: Let's assume that ${\displaystyle p}$ is prime and ${\displaystyle p|ab}$, and that ${\displaystyle p\nmid a}$. We must show that ${\displaystyle p|b}$.

Let's consider ${\displaystyle \gcd (p,a)}$. Because ${\displaystyle p}$ is prime, this can equal ${\displaystyle 1}$ or ${\displaystyle p}$. Since ${\displaystyle p\nmid a}$ we know that ${\displaystyle \gcd (p,a)=1}$.

By the gcd-identity, ${\displaystyle \gcd (p,a)=1=px+ay}$ for some ${\displaystyle x,y\in \mathbb{Z}}$.

When this is multiplied by ${\displaystyle b}$ we arrive at ${\displaystyle b=pbx+aby}$.

Because ${\displaystyle p|p}$ and ${\displaystyle p|ab}$ we know that ${\displaystyle p|(pbx+aby)}$, and that ${\displaystyle p|b}$, as desired.

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