Prove: The integer p-1 is a quadratic residue of an odd prime p if and only if p congruent 1 ( mod4). enter image description here That’s right?!
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But I didn't know, can you help me with simple prove, thank you. – Noor Nov 22 '18 at 09:58
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what have you tried? can you show some work you did? – jimjim Nov 22 '18 at 10:05
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If you tried solving it using Euler's criterion, then you are basically looking for an answer to "When is $\frac{p-1}2$ even?" That happens exactly when $p-1$ is divisible by $4$, which is to say $p\equiv 1\pmod4$.
Arthur
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