Question: ) Let A >1 be an odd integer and let P1, P2, P be all the primes A. Put n = 8pip2 Pn. Let

) Let A >1 be an odd integer and let P1, P2,

) Let A >1 be an odd integer and let P1, P2, P be all the primes A. Put n = 8pip2 Pn. Let q be a prim such that q = 1 mod n. (As q is a prime, q has a primitive root). Let r be the smallest positive primitive ro of q. (i) Find the Legendre symbols (4), (4) and (P).

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