2018 AIME I Problem 5

Below is the professionally curated solution for Problem 5 of the 2018 AIME I, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2018 AIME I solutions, or check the answer key.

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Concepts:logarithmfactoringcasework

Difficulty rating: 2510

5.

For each ordered pair of real numbers (x,y)(x, y) satisfying log2(2x+y)=log4(x2+xy+7y2),\log_2(2x + y) = \log_4(x^2 + xy + 7y^2), there is a real number KK such that log3(3x+y)=log9(3x2+4xy+Ky2).\log_3(3x + y) = \log_9(3x^2 + 4xy + Ky^2). Find the product of all possible values of K.K.

Solution:

Because log4u=log2u,\log_4 u = \log_2 \sqrt{u}, the first equation is equivalent to (2x+y)2=x2+xy+7y2(2x + y)^2 = x^2 + xy + 7y^2 together with 2x+y>0.2x + y \gt 0. Expanding gives 3x2+3xy6y2=0,3x^2 + 3xy - 6y^2 = 0, which factors as 3(xy)(x+2y)=0.3(x - y)(x + 2y) = 0. So x=yx = y or x=2y,x = -2y, with (x,y)(0,0).(x, y) \ne (0, 0).

Similarly the second equation says (3x+y)2=3x2+4xy+Ky2,(3x + y)^2 = 3x^2 + 4xy + Ky^2, that is 6x2+2xy+y2=Ky2.6x^2 + 2xy + y^2 = Ky^2. If x=yx = y (taking x>0x \gt 0 so both logarithms are defined), then K=6+2+1=9.K = 6 + 2 + 1 = 9. If x=2yx = -2y (taking y<0,y \lt 0, so 2x+y=3y>02x + y = -3y \gt 0 and 3x+y=5y>03x + y = -5y \gt 0), then 24y24y2+y2=Ky2,24y^2 - 4y^2 + y^2 = Ky^2, so K=21.K = 21.

Both cases occur, so the product of all possible values is 921=189.9 \cdot 21 = 189.

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