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I'm studying for a first year Discrete Mathematics course, I found this question on a previous paper and am lost on how to solve:

Let $n$ be a fixed arbitrary integer, prove that there are infinitely many integers $m$ s.t.: $m^3 \equiv n^6 \pmod{19}$

Thank you

rtybase
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Seb Leach
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  • If there is any $m^3 \equiv n^6 \pmod {19}$ then $m + 19k$ for all integers $k$ so there are infinitely many solutions. So 2) Prove that the is at least one solution. 3) Don't worry about proving this for $n^6$. Prove it for any integer $M$.
  • – fleablood Nov 11 '18 at 07:32