# Pages that link to "Every integer that is not a perfect square is a quadratic nonresidue for infinitely many primes"

The following pages link to **Every integer that is not a perfect square is a quadratic nonresidue for infinitely many primes**:

- Every number that is not a perfect square is a quadratic nonresidue for infinitely many primes (redirect page) (← links)
- Every integer is a quadratic residue for infinitely many primes (← links)
- Congruence condition for two to be a quadratic residue (← links)
- Smallest quadratic nonresidue (← links)
- Every prime is the smallest quadratic nonresidue for infinitely many primes (← links)
- Every prime p is a p-adic nonresidue for some prime (← links)
- Quadratic Diophantine equation in one variable that has a solution modulo every prime has an integer solution (← links)