SIMO Retiree Blog

(Glen here.) Recently, there was some discussion about this year's IOI in a group chat, and Ker Yang remarked that the first task, " Souvenirs ", was basically a math question. Of course, I had to have a look. The original description is pretty long, so here's a rewriting in a more math olympiad style: Sheldon is buying french fries from a fast food restaurant, which sells fries in $N$ different sizes (with packagings labelled from largest to smallest from $0$ to $N-1$), with integer costs $P_0 > P_1 > \ldots > P_{N-1} > 0$. To buy fries, Sheldon can pay $\$M$ where $M$ is a positive integer, and then define a sequence $i_1,i_2,\ldots$ as follows: $i_1$ is the smallest integer such that $P_{i_1}\le M$, and in general, $i_k$ is the smallest integer $>i_{k-1}$ such that $P_{i_k} \le M - P_{i_1} - \cdots P_{i_{k-1}}$. If no such $i_k$ can be defined, the sequence terminates. Then, Sheldon receives the fries with labels $i_1,i_2,\ldots$ along with his chang...

(Drew here.) As a retired contestant, I decided it would be fun to attempt the IMO 2025 paper and see how well I would do on it! Let's get started. Problem 1 (IMO 2025/1) A line in the plane is called sunny if it is not parallel to any of the $x$–axis, the $y$–axis, or the line $x+y=0$.  Let $n\ge3$ be a given integer. Determine all nonnegative integers $k$ such that there exist $n$ distinct lines in the plane satisfying both of the following: for all positive integers $a$ and $b$ with $a+b\le n+1$, the point $(a,b)$ lies on at least one of the lines; and exactly $k$ of the $n$ lines are sunny. To begin, I decided to try the $n=3$ case, as that's the smallest one. The points form a right triangle with $3$ points on each edge, and a sunny line is a line not parallel to any of the edges of the main triangle. We can shift the points a bit to instead form an equilateral triangle, and a sunny line is any line not parallel to any of the sides of the equilateral triangle. Important...

 (Glen here.) The blog has been somewhat inactive because everyone has been busy, so sorry if we kept you waiting! I got sent this year's SMO Senior Round 2 paper this morning, so I thought I'd give it a shot. I don't have paper with me, so that's an extra challenge, I guess. Problem 1 Let $ABCD$ be a convex quadrilateral and $M$ be the intersection of its diagonals. Through $M$ draw a line meetin [sic] the side $AB$ at $P$ sand [sic] the side $CD$ at $Q$. Find all the quadrilaterals so that there exists the segment $PQ$ that divides the triangles $ABM$ and $CDM$ into $4$ similar triangles. ??? What on earth is this??? Here's a picture:  Ok, we probably need $\angle APM = \angle MPB = 90^\circ$? Yeah, if not, then each triangle has two distinct angles that add up to $180^\circ$, which is bad. This also tells us that $AB||DC$, as $PQ$ is perpendicular to both. If $\angle APM = 90^\circ$, then the only two possibilities for $APM$ and $BPM$ to be similar are if $MA=MB$...