2010 AIME I Problem 15

Below is the professionally curated solution for Problem 15 of the 2010 AIME I, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2010 AIME I solutions, or check the answer key.

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Concepts:incircle, incenter, and inradiusStewart’s Theoremarea ratio

Difficulty rating: 3370

15.

In ABC\triangle ABC with AB=12,AB = 12, BC=13,BC = 13, and AC=15,AC = 15, let MM be a point on AC\overline{AC} such that the incircles of ABM\triangle ABM and BCM\triangle BCM have equal radii. Let pp and qq be positive relatively prime integers such that AMCM=pq.\frac{AM}{CM} = \frac{p}{q}. Find p+q.p + q.

Solution:

Let k=AMCM.k = \frac{AM}{CM}. Triangles ABMABM and CBMCBM share the altitude from B,B, so [ABM][CBM]=k.\frac{[ABM]}{[CBM]} = k. Since the inradius of a triangle is its area divided by its semiperimeter, equal inradii force 12+AM+BM13+CM+BM=k\frac{12 + AM + BM}{13 + CM + BM} = k as well. From AM+CM=15AM + CM = 15 we get AM=15kk+1AM = \frac{15k}{k+1} and CM=15k+1;CM = \frac{15}{k+1}; since AM=kCM,AM = k \cdot CM, the perimeter equation simplifies to BM(1k)=13k12,BM(1 - k) = 13k - 12, so BM=13k121k,BM = \frac{13k - 12}{1 - k}, and BM>0BM \gt 0 forces 1213<k<1.\frac{12}{13} \lt k \lt 1.

Stewart's theorem on cevian BM\overline{BM} gives AB2CM+BC2AM=AC(BM2+AMCM),AB^2 \cdot CM + BC^2 \cdot AM = AC\left(BM^2 + AM \cdot CM\right), so BM2=144+169kk+1225k(k+1)2.BM^2 = \frac{144 + 169k}{k + 1} - \frac{225k}{(k+1)^2}. Setting this equal to (13k12)2(1k)2\frac{(13k-12)^2}{(1-k)^2} and clearing denominators yields (169k2+88k+144)(1k)2=(13k12)2(k+1)2,(169k^2 + 88k + 144)(1-k)^2 = (13k-12)^2(k+1)^2, which simplifies to 4k(69k2112k+44)=0.4k\left(69k^2 - 112k + 44\right) = 0.

The roots are k=0,k = 0, k=23,k = \frac{2}{3}, and k=2223,k = \frac{22}{23}, and only k=2223k = \frac{22}{23} exceeds 1213\frac{12}{13} (then AM=223,AM = \frac{22}{3}, CM=233,CM = \frac{23}{3}, BM=10BM = 10). Hence p+q=22+23=45.p + q = 22 + 23 = 45.

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