# Fermat's Little Theorem

How do you compute the following using Fermat's Little Theorem?

``````2^1,000,006 mod 101
2^-1,000,005 mod 11
``````
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You could add some more info how you tried to solve this and where your problems are, instead of just posting the plain homework question... –  sth May 19 '09 at 23:42
Upvoted for the validity of the question. If you don't understand the core process, there's no way to "begin" this problem. It's two steps roughly, so explain how we was supposed to "start." –  Stefan Kendall May 19 '09 at 23:44
Why is there a negative sign in the second equation? Someone please explain, it doesn't make sense to me. –  Unknown May 20 '09 at 0:29
Division is well-defined in finite fields, and arithmetic modulo a prime is a finite field. 2^-1 is the integer which, when multiplied by 2 mod 11, gives the result 1. Which is to say, 2^-1 is 6 mod 11. –  Steve Jessop May 20 '09 at 0:36

You know that a^(p-1) === 1 mod p, so...

2^10 === 1 mod 11
2^(-1,000,005) = 2^(-1,000,000)*2^(-5) = 1 * 2^(-5) = 2^(-5)*2^(10) = 32 mod 11 = -1 = 10

From this, can you see how to work the larger number? The process is the same.

It's FLT all the way. I messed up.

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I don't think 2^-5 === 2^6 (mod 11). –  Steve Jessop May 19 '09 at 23:49
Yeah, there's definitely some errors in this (or at least bad notation). Needs to be corrected, but I'm not sure where to begin. –  Noldorin May 19 '09 at 23:51
so then 2^1,000,006 mod 101... 2^1,000,000 * 2^6 = 1 * 32 = 32 mod 101 = -5? –  jinsungy May 20 '09 at 1:14