2021 AIME I Problems/Problem 15

Revision as of 09:54, 12 March 2021 by Dearpasserby (talk | contribs) (Solution 2)

Problem

Let $S$ be the set of positive integers $k$ such that the two parabolas\[y=x^2-k~~\text{and}~~x=2(y-20)^2-k\]intersect in four distinct points, and these four points lie on a circle with radius at most $21$. Find the sum of the least element of $S$ and the greatest element of $S$.

Solution

Solution 1

With binary search you can narrow down the k value. Newton raphson method let you narrow down the x and y solution for that specific k value. With 3 (x,y) pairs you can find radius of the circle.

You end up finding the bounds of 5 and 280. The sum is 285.

~Lopkiloinm

Solution 2

Make the translation $x \rightarrow x+20$ to obtain $20+x=y^2-k , y=2x^2-k$. Multiply the second equation by 2 and sum, we see that $2(x^2+y^2)=3k+40+2x+y$. Completing the square gives us $(x- \frac{1}{2})^2+(y - \frac{1}{4})^2 = \frac{325+24k}{16}$; this explains why the two parabolas intersect at four points that lie on a circle*. For the upper bound, observe that $LHS \leq 21 \rightarrow 24k \leq 6731$, so $k \leq 280$.

For the lower bound, we need to ensure there are 4 intersections to begin with. A quick check shows k=5 works while k=4 does not. Therefore, the answer is 5+280=285.

  • In general, this problem tells us that the intersection points of two conics without xy terms lie on a circle.

-Ross Gao

See also

2021 AIME I (ProblemsAnswer KeyResources)
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