Difference between revisions of "2012 AIME II Problems/Problem 15"
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− | ==Solution | + | ==Quick Solution In Terms of Olympiad Terms (Similar to above)== |
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+ | Take a <math>\sqrt{bc}</math>-inversion about <math>A</math> and note <math>D</math> and <math>E</math> map to each other. As <math>DE</math> was originally the diameter of <math>\gamma</math>, <math>DE</math> is still the diameter of <math>\gamma</math>. Thus <math>\gamma</math> is preserved. Note that the midpoint <math>M</math> of <math>BC</math> lies on <math>\gamma</math>, and <math>BC</math> and <math>\omega</math> are swapped. Thus points <math>F</math> and <math>M</math> map to each other, and are isogonal. It follows that <math>AF</math> is a symmedian of <math>\triangle{ABC}</math>, or that <math>ABFC</math> is harmonic. Then <math>(AB)(FC)=(BF)(CA)</math>, and thus we can let <math>BF=5x, CF=3x</math> for some <math>x</math>. By the LoC, it is easy to see <math>\angl{BAC}=120^\circ</math> so <math>(5x)^2+(3x)^2-2\cos{60^\circ}(5x)(3x)=49</math>. Solving gives <math>x^2=\frac{49}{19}</math>, from which by Ptomtely's we see <math>AF=\frac{30}{\sqrt{19}}</math>. We conclude the answer is <math>900+19=\box{919}</math>, as desired. | ||
== Solution 1== | == Solution 1== |
Revision as of 13:33, 11 November 2019
Contents
Problem 15
Triangle is inscribed in circle with , , and . The bisector of angle meets side at and circle at a second point . Let be the circle with diameter . Circles and meet at and a second point . Then , where and are relatively prime positive integers. Find .
Solution Using Only Elementary Geometry Methods
Let be the unique point on circle such that is equilateral. Point must be the point on such that is right. We extend line to hit circle again at .
Claim 1: is the midpoint of minor arc . Proof: Notice that and are subtended by the same arc, thus they are both equal to 90 degrees.
Now it is obvious that . After this, we length chase with similar triangles and Pythag, which yields , , , , and . We can tie this all together with Ptolemy's theorem for cyclic quadrilaterals, and we find that . Thus, , and the answer is -jj_ca888
Quick Solution In Terms of Olympiad Terms (Similar to above)
Take a -inversion about and note and map to each other. As was originally the diameter of , is still the diameter of . Thus is preserved. Note that the midpoint of lies on , and and are swapped. Thus points and map to each other, and are isogonal. It follows that is a symmedian of , or that is harmonic. Then , and thus we can let for some . By the LoC, it is easy to see $\angl{BAC}=120^\circ$ (Error compiling LaTeX. Unknown error_msg) so . Solving gives , from which by Ptomtely's we see . We conclude the answer is $900+19=\box{919}$ (Error compiling LaTeX. Unknown error_msg), as desired.
Solution 1
Use the angle bisector theorem to find , , and use Stewart's Theorem to find . Use Power of the Point to find , and so . Use law of cosines to find , hence as well, and is equilateral, so .
I'm sure there is a more elegant solution from here, but instead we'll do some hairy law of cosines:
(1)
Adding these two and simplifying we get:
(2). Ah, but (since lies on ), and we can find using the law of cosines:
, and plugging in we get .
Also, , and (since is on the circle with diameter ), so .
Plugging in all our values into equation (2), we get:
, or .
Finally, we plug this into equation (1), yielding:
. Thus,
or The answer is .
Solution 2
Let , , for convenience. We claim that is a symmedian. Indeed, let be the midpoint of segment . Since , it follows that and consequently . Therefore, . Now let . Since is a diameter, lies on the perpendicular bisector of ; hence , , are collinear. From , it immediately follows that quadrilateral is cyclic. Therefore, , implying that is a symmedian, as claimed.
The rest is standard; here's a quick way to finish. From above, quadrilateral is harmonic, so . In conjunction with , it follows that . (Notice that this holds for all triangles .) To finish, substitute , , to obtain as before.
-Solution by thecmd999
Solution 3
First of all, use the Angle Bisector Theorem to find that and , and use Stewart's Theorem to find that . Then use Power of a Point to find that . Then use the circumradius of a triangle formula to find that the length of the circumradius of is .
Since is the diameter of circle , is . Extending to intersect circle at , we find that is the diameter of the circumcircle of (since is ). Therefore, .
Let , , and . Then, by the Pythagorean Theorem,
and
Subtracting the first equation from the second, the term cancels out and we obtain:
By Power of a Point, , so
Since , .
Because and intercept the same arc in circle and the same goes for and , and . Therefore, by AA Similarity. Since side lengths in similar triangles are proportional,
However, the problem asks for , so .
-Solution by TheBoomBox77
Solution 4
It can be verified with law of cosines that Also, is the midpoint of major arc so and Thus is equilateral. Notice now that But so bisects Thus,
Let By law of cosines on we find But by ptolemy on , so so and the answer is
~abacadaea
See Also
2012 AIME II (Problems • Answer Key • Resources) | ||
Preceded by Problem 14 |
Followed by Last Problem | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.