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2019 Mock AMC 10B Problems/Problem 15

Revision as of 13:01, 11 August 2024 by Renoatlantis2 (talk | contribs)
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The area of the larger square is 144, so each side length is 12. $m + n = 12$. Also, each of the smaller 4 triangles are right triangles, so $m^2+n^2= 108$.

$n=12-m$

$m^2+(12-m)^2=108$

$m^2+144-24m+m^2=108$.

Solving for $m$ gives $m= 12+\frac{\sqrt72}{2}$

$m = 6+3\sqrt{2}$

$a=6$, $b=3$, $c=2$. $a+b+c=11$. (A)

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