Mock AIME 5 2005-2006 Problems/Problem 14
Problem
Let be a triangle such that , , and . Let be the orthocenter of (intersection of the altitudes). Let be the midpoint of , be the midpoint of , and be the midpoint of . Points , , and are constructed on , , and , respectively, such that is the midpoint of , is the midpoint of , and is the midpoint of . Find .
Solution
Notice that is the reflection of through the midpoint of . So by reflecting the orthocenter lemma we know that is a diametre of . [ means circumcircle of ]. Simillarly and also diametre of . So we need to find where is the radius of
Now by cosine rule we get,
So
Now by sine rule we get,
So required answer is
By NOOBMASTER_M
See also
Mock AIME 5 2005-2006 (Problems, Source) | ||
Preceded by Problem 13 |
Followed by Problem 15 | |
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