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any nonzero integer is quadratic residue
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(Theorem)
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Theorem. For every nonzero integer $a$ there exists an odd prime number $p$ such that $a$ is a quadratic residue modulo $p$ .
Proof. $1^\circ.$ $a = 2$ . We see that $3^2 \equiv 2 \pmod7$ and $7 \nmid 2$ , whence 2 is a quadratic residue modulo $7$ .
$2^\circ.$ $2 \mid a$ but $a \neq 2$ . The number $1^2-a = 1-a$ (which is odd and $\neq \pm1$ ) has an odd prime factor $p$ which does not divide $a$ . Thus $a$ is a quadratic residue modulo $p$ .
$3^\circ.$ $a = 3$ . We state that $4^2-3 = 13 \equiv 0 \pmod{13}$ and $13 \nmid 3$ . Therefore 3 is a quadratic residue modulo 13.
$4^\circ.$ $a = 5$ . We see that $4^2-5 = 11 \equiv 0 \pmod{11}$ and $11 \nmid 5$ , i.e. 5 is a quadratic residue modulo 11.
$5^\circ.$ $2 \nmid a$ but $a \neq 3$ , $a \neq 5$ . Now the number $2^2-a = 4-a$ (which is odd and $\neq \pm1$ ) has an odd prime factor $p$ . Moreover, $p \nmid a$ since $p \nmid 4$ . Accordingly, $a$ is a quadratic residue modulo $p$ .
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"any nonzero integer is quadratic residue" is owned by pahio.
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Cross-references: divide, prime factor, number, proof, quadratic residue, prime number, odd, integer, theorem
This is version 3 of any nonzero integer is quadratic residue, born on 2008-04-22, modified 2009-08-07.
Object id is 10533, canonical name is AnyNonzeroIntegerIsQuadraticResidue.
Accessed 855 times total.
Classification:
| AMS MSC: | 11A15 (Number theory :: Elementary number theory :: Power residues, reciprocity) |
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Pending Errata and Addenda
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