2001 AIME I Problem 9

Below is the professionally curated solution for Problem 9 of the 2001 AIME I, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2001 AIME I solutions, or check the answer key.

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Concepts:area ratiosymmetry (algebra)algebraic manipulation

Difficulty rating: 2560

9.

In triangle ABC,ABC, AB=13,AB = 13, BC=15,BC = 15, and CA=17.CA = 17. Point DD is on AB,\overline{AB}, EE is on BC,\overline{BC}, and FF is on CA.\overline{CA}. Let AD=pAB,AD = p \cdot AB, BE=qBC,BE = q \cdot BC, and CF=rCA,CF = r \cdot CA, where p,p, q,q, and rr are positive and satisfy p+q+r=23p + q + r = \frac{2}{3} and p2+q2+r2=25.p^2 + q^2 + r^2 = \frac{2}{5}. The ratio of the area of triangle DEFDEF to the area of triangle ABCABC can be written in the form mn,\frac{m}{n}, where mm and nn are relatively prime positive integers. Find m+n.m + n.

Solution:

Each corner triangle's area is a product of side fractions: [ADF]=p(1r)[ABC],[ADF] = p(1-r)[ABC], [BED]=q(1p)[ABC],[BED] = q(1-p)[ABC], and [CFE]=r(1q)[ABC],[CFE] = r(1-q)[ABC], using the formula 12xysinθ\frac{1}{2}xy\sin\theta on the shared angles. Subtracting, [DEF][ABC]=1p(1r)q(1p)r(1q)=1(p+q+r)+(pq+qr+rp).\frac{[DEF]}{[ABC]} = 1 - p(1-r) - q(1-p) - r(1-q) = 1 - (p+q+r) + (pq+qr+rp).

From the given values, pq+qr+rp=(2/3)22/52=4/92/52=145.pq + qr + rp = \frac{(2/3)^2 - 2/5}{2} = \frac{4/9 - 2/5}{2} = \frac{1}{45}.

Therefore the ratio is 123+145=1645,1 - \frac{2}{3} + \frac{1}{45} = \frac{16}{45}, and m+n=16+45=61.m + n = 16 + 45 = 61.

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