Difference between revisions of "Mock AIME I 2015 Problems/Problem 3"
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==Solution== | ==Solution== | ||
| + | First note that <math>\triangle APB</math> is a 3-4-5 scaled right triangle with <math>\overline{B P}=15</math> and <math>\triangle APC</math> is a 20-21-29 right triangle with <math>\overline{P C}=21</math> since <math>\angle APB</math> and <math>\angle APC</math> are inscribed in semicircles, and thus right angles. Also, since <math>\angle APB</math> and <math>\angle APC</math> are right, points B, P and C are collinear and <math>BC=BP+PC=15+21=\boxed{036}.</math> | ||
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| + | Solution by D. Adrian Tanner | ||
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| + | ==Original Solution== | ||
First note that <math>\triangle APB</math> is a 3-4-5 right triangle and <math>\triangle APC</math> is a 20-21-29 right triangle. Thus we have <math>\cos \angle BAP = \dfrac{20}{25}=\dfrac{4}{5}</math> and <math>\cos \angle PAC = \dfrac{20}{29}</math>. Similarly, we have <math>\sin \angle BAP = \dfrac{15}{25}=\dfrac{3}{5}</math> and <math>\sin \angle PAC = \dfrac{21}{29}</math>. Applying the Law of Cosines on <math>\angle BAC</math> gives us <cmath>BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\cos (\angle BAP+\angle PAC)}.</cmath> We also know that <cmath>\cos (\angle BAP+\angle PAC)=\cos\angle BAP\cos\angle PAC - \sin \angle BAP \sin \angle PAC=\dfrac{20}{25}\cdot\dfrac{20}{29}-\dfrac{15}{25}\cdot\dfrac{21}{29}=\dfrac{17}{145}.</cmath> Hence, we have <cmath>BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\dfrac{17}{145}}=\sqrt{1296}=\boxed{036}.</cmath> | First note that <math>\triangle APB</math> is a 3-4-5 right triangle and <math>\triangle APC</math> is a 20-21-29 right triangle. Thus we have <math>\cos \angle BAP = \dfrac{20}{25}=\dfrac{4}{5}</math> and <math>\cos \angle PAC = \dfrac{20}{29}</math>. Similarly, we have <math>\sin \angle BAP = \dfrac{15}{25}=\dfrac{3}{5}</math> and <math>\sin \angle PAC = \dfrac{21}{29}</math>. Applying the Law of Cosines on <math>\angle BAC</math> gives us <cmath>BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\cos (\angle BAP+\angle PAC)}.</cmath> We also know that <cmath>\cos (\angle BAP+\angle PAC)=\cos\angle BAP\cos\angle PAC - \sin \angle BAP \sin \angle PAC=\dfrac{20}{25}\cdot\dfrac{20}{29}-\dfrac{15}{25}\cdot\dfrac{21}{29}=\dfrac{17}{145}.</cmath> Hence, we have <cmath>BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\dfrac{17}{145}}=\sqrt{1296}=\boxed{036}.</cmath> | ||
Latest revision as of 23:31, 10 June 2015
Problem 3
Let 
be points in the plane such that 
, 
, and 
. Semicircles with diameters 
and 
intersect at a point 
with 
. Find the length of line segment 
.
Solution
First note that 
is a 3-4-5 scaled right triangle with 
and 
is a 20-21-29 right triangle with 
since 
and 
are inscribed in semicircles, and thus right angles. Also, since and are right, points B, P and C are collinear and 
Solution by D. Adrian Tanner
Original Solution
First note that is a 3-4-5 right triangle and is a 20-21-29 right triangle. Thus we have 
and 
. Similarly, we have 
and 
. Applying the Law of Cosines on 
gives us ![\[BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\cos (\angle BAP+\angle PAC)}.\]](http://latex.artofproblemsolving.com/f/4/7/f47780d4c9dcc1e0386e2da89a8e058636d73964.png)
We also know that ![\[\cos (\angle BAP+\angle PAC)=\cos\angle BAP\cos\angle PAC - \sin \angle BAP \sin \angle PAC=\dfrac{20}{25}\cdot\dfrac{20}{29}-\dfrac{15}{25}\cdot\dfrac{21}{29}=\dfrac{17}{145}.\]](http://latex.artofproblemsolving.com/6/e/f/6ef3829bae63580c52de0a1d7cad98200677caa0.png)
Hence, we have ![\[BC=\sqrt{25^2+29^2-2\cdot25\cdot29\cdot\dfrac{17}{145}}=\sqrt{1296}=\boxed{036}.\]](http://latex.artofproblemsolving.com/1/d/5/1d5252970f6101aa0a448539b4ec39904dcda3c1.png)
