Euclid's Lemma
Euclid's Lemma is a result in number theory attributed to Euclid. It states that:
A positive integer is a prime number if and only if implies that or , for all integers and .
Proof of Euclid's Lemma
Without loss of generality, suppose (otherwise we are done). By Bezout's Lemma, there exist integers such that such that . Hence and . Since and (by hypothesis), , as desired.
On the other hand, if is not prime, then it must be composite, i.e., , for integers both greater than 1. Then, and . This completes the proof.