2005 AIME II Problem 8

Below is the professionally curated solution for Problem 8 of the 2005 AIME II, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2005 AIME II solutions, or check the answer key.

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Concepts:tangent circleschordPythagorean Theorem

Difficulty rating: 2710

8.

Circles C1\mathcal{C}_1 and C2\mathcal{C}_2 are externally tangent, and they are both internally tangent to circle C3.\mathcal{C}_3. The radii of C1\mathcal{C}_1 and C2\mathcal{C}_2 are 44 and 10,10, respectively, and the centers of the three circles are all collinear. A chord of C3\mathcal{C}_3 is also a common external tangent of C1\mathcal{C}_1 and C2.\mathcal{C}_2. Given that the length of the chord is mnp,\frac{m\sqrt{n}}{p}, where m,m, n,n, and pp are positive integers, mm and pp are relatively prime, and nn is not divisible by the square of any prime, find m+n+p.m + n + p.

Solution:

Let P1,P_1, P2,P_2, P3P_3 be the centers of the circles and RR the radius of C3.\mathcal{C}_3. External tangency gives P1P2=4+10=14,P_1P_2 = 4 + 10 = 14, and internal tangency gives P3P1=R4P_3P_1 = R - 4 and P3P2=R10.P_3P_2 = R - 10. Since the centers are collinear, (R4)+(R10)=14,(R - 4) + (R - 10) = 14, so R=14R = 14 and P3P_3 lies on P1P2\overline{P_1P_2} with P3P1=10P_3P_1 = 10 and P3P2=4.P_3P_2 = 4.

Drop perpendiculars P1X,P_1X, P2Y,P_2Y, P3ZP_3Z to the chord, so P1X=4,P_1X = 4, P2Y=10,P_2Y = 10, and ZZ is the midpoint of the chord. The distance from a point moving along line P1P2P_1P_2 to the tangent line changes linearly, and P3P_3 is 1014\frac{10}{14} of the way from P1P_1 to P2,P_2, so P3Z=4+1014(104)=587.P_3Z = 4 + \frac{10}{14}(10 - 4) = \frac{58}{7}.

The half-chord is 142(587)2=960433647=43907,\sqrt{14^2 - \left(\frac{58}{7}\right)^2} = \frac{\sqrt{9604 - 3364}}{7} = \frac{4\sqrt{390}}{7}, so the chord has length 83907.\frac{8\sqrt{390}}{7}. Since 390=23513390 = 2 \cdot 3 \cdot 5 \cdot 13 is squarefree and gcd(8,7)=1,\gcd(8, 7) = 1, the answer is m+n+p=8+390+7=405.m + n + p = 8 + 390 + 7 = 405.

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