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AoPS Wiki talk:Problem of the Day/July 25, 2011

Revision as of 18:55, 25 July 2011 by Williamhu888 (talk | contribs)
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Find the remainder when $2^{2011}$ is divided by 11.

Solution 1

Let's find a pattern for remainders when this number is divided by 11.

  • $2^1$ has a remainder of 2.
  • $2^2$ has a remainder of 4.
  • $2^3$ has a remainder of 8.
  • $2^4$ has a remainder of 5.
  • $2^5$ has a remainder of 10.
  • $2^6$ has a remainder of 9.
  • $2^7$ has a remainder of 7.
  • $2^8$ has a remainder of 3.
  • $2^9$ has a remainder of 6.
  • Finally, $2^{10}$ has a remainder of 1.

Starting from now on, this pattern will keep repeating. Every positive integer power of $2^{10}$ will have a remainder of 1 once divided by 11. This includes $2^{2010}$. So, $2^{2011}$ has a remainder of $\boxed{2}$ when divided by 11.

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