How do I find 14^20 mod 33 ?
I tried writing 14^20 as 14^(2+4+8+6) but still no simplification.
Should I just check all the power of 14 mod 33 and hope that some of them give nice numbers (1 or 2)
What is a good method ?
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You should LaTeX your question. – Culver Kwan Aug 31 '19 at 10:40
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Consider successive multiplication and reduction. – Wuestenfux Aug 31 '19 at 10:41
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@José should we just get rid of modular arithmetic then ? – Aug 31 '19 at 11:20
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@RoddyMacPhee Are you sure that this is a comment concerning this question? – José Carlos Santos Aug 31 '19 at 11:34
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it's regarding your own comments so hopefully... – Aug 31 '19 at 12:03
2 Answers
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By Euler's Theorem, as $(14,33)=1$, and $\phi(33)=20$, so $14^{20}\equiv1\pmod{33}$.
Culver Kwan
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