Gauss's Lemma (number Theory)
Gauss's lemma in number theory gives a condition for an integer to be a quadratic residue. Although it is not useful computationally, it has theoretical significance, being involved in some proofs of quadratic reciprocity.
It made its first appearance in Carl Friedrich Gauss's third proof (1808) of quadratic reciprocity and he proved it again in his fifth proof (1818).
Read more about Gauss's Lemma (number Theory): Statement of The Lemma, Example, Proof, Applications, Higher Powers, Relation To The Transfer in Group Theory