2025 AIME II Problem 15

Below is the professionally curated solution for Problem 15 of the 2025 AIME II, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2025 AIME II solutions, or check the answer key.

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Concepts:polynomialfactoringoptimization

Difficulty rating: 3500

15.

There are exactly three positive real numbers kk such that the function f(x)=(x18)(x72)(x98)(xk)xf(x) = \frac{(x - 18)(x - 72)(x - 98)(x - k)}{x} defined over the positive real numbers achieves its minimum value at exactly two positive real numbers x.x. Find the sum of these three values of k.k.

Solution:

For x>0,x \gt 0, f(x)+f(x) \to +\infty both as x0+x \to 0^+ (the numerator tends to 187298k>018 \cdot 72 \cdot 98 \cdot k \gt 0) and as x,x \to \infty, so ff attains a global minimum value cc on (0,).(0, \infty). It is attained at exactly two points precisely when f(x)c0f(x) - c \ge 0 with two distinct positive double roots, i.e. (x18)(x72)(x98)(xk)cx=(x2Sx+P)2(x - 18)(x - 72)(x - 98)(x - k) - cx = (x^2 - Sx + P)^2 where the roots of x2Sx+Px^2 - Sx + P are positive and distinct (so S,P>0S, P \gt 0).

Matching coefficients of x3,x^3, x2,x^2, and the constant (the xx-coefficient just determines cc): 2S=188+k,S2+2P=10116+188k,P2=187298k=127008k.2S = 188 + k, \qquad S^2 + 2P = 10116 + 188k, \qquad P^2 = 18 \cdot 72 \cdot 98 \cdot k = 127008k. Substitute k=2t2k = 2t^2 with t>0:t \gt 0: then S=94+t2S = 94 + t^2 and P=504t.P = 504t. The middle equation becomes (94+t2)2+1008t=10116+376t2,(94 + t^2)^2 + 1008t = 10116 + 376t^2, i.e. t4188t2+1008t1280=0,t^4 - 188t^2 + 1008t - 1280 = 0, which factors as (t2)(t4)(t+16)(t10)=0.(t - 2)(t - 4)(t + 16)(t - 10) = 0.

The positive roots t=2,4,10t = 2, 4, 10 give k=2t2=8,32,200k = 2t^2 = 8, 32, 200 (each indeed yields S2>4P,S^2 \gt 4P, matching the problem's promise of exactly three values). The sum is 8+32+200=240.8 + 32 + 200 = 240.

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