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Difference between revisions of "2005 AIME I Problems/Problem 14"

 
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== Problem ==
 
== Problem ==
Consider the points <math> A(0,12), B(10,9), C(8,0), and D(-4,7). </math> There is a unique square <math> S </math> such that each of the four points is on a different side of <math> S. </math> Let <math> K </math> be the area of <math> S. </math> Find the remainder when <math> 10K </math> is divided by 1000.
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Consider the points <math> A(0,12), B(10,9), C(8,0),</math> and <math> D(-4,7). </math> There is a unique square <math> S </math> such that each of the four points is on a different side of <math> S. </math> Let <math> K </math> be the area of <math> S. </math> Find the remainder when <math> 10K </math> is divided by 1000.
  
 
== Solution ==
 
== Solution ==

Revision as of 22:10, 8 July 2006

Problem

Consider the points $A(0,12), B(10,9), C(8,0),$ and $D(-4,7).$ There is a unique square $S$ such that each of the four points is on a different side of $S.$ Let $K$ be the area of $S.$ Find the remainder when $10K$ is divided by 1000.

Solution

See also

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