neliöresidut

Neliöresidut, or square residues in English, are integers that are congruent to perfect squares modulo some given integer n. In mathematical terms, a number a is a quadratic residue modulo n if there exists an integer x such that x² ≡ a (mod n). This concept is fundamental in number theory and has applications in cryptography and primality testing.

The study of quadratic residues dates back to the works of Euler and Gauss, who established many

For example, modulo 7, the quadratic residues are 0, 1, 2, and 4, as these are the

Quadratic residues exhibit interesting distribution patterns that have been extensively researched. Their properties form the foundation