#CompetitionYearsProblemsYears
1International Mathematical Olympiad1959–2025398
2Middle European Mathematical Olympiad2009–2025160
International Mathematical Olympiad 2024 Problem 1

Determine all real numbers α\alpha such that, for every positive integer nn, the integer α+2α++nα\lfloor \alpha \rfloor + \lfloor 2\alpha \rfloor + \cdots + \lfloor n\alpha \rfloor is a multiple of nn. (Note that z\lfloor z \rfloor denotes the greatest integer less than or equal to zz. For example, π=4\lfloor -\pi \rfloor = -4 and 2=2.9=2\lfloor 2 \rfloor = \lfloor 2.9 \rfloor = 2.)

International Mathematical Olympiad 2024 Problem 2

Determine all pairs (a,b)(a, b) of positive integers for which there exist positive integers gg and NN such that gcd(an+b,bn+a)=g\gcd(a^n + b, b^n + a) = g holds for all integers nNn \geq N. (Note that gcd(x,y)\gcd(x, y) denotes the greatest common divisor of integers xx and yy.)

International Mathematical Olympiad 2024 Problem 3

Let a1,a2,a3,a_1, a_2, a_3, \ldots be an infinite sequence of positive integers, and let NN be a positive integer. Suppose that, for each n>Nn > N, ana_n is equal to the number of times an1a_{n-1} appears in the list a1,a2,,an1a_1, a_2, \ldots, a_{n-1}.

Prove that at least one of the sequences a1,a3,a5,a_1, a_3, a_5, \ldots and a2,a4,a6,a_2, a_4, a_6, \ldots is eventually periodic.

(An infinite sequence b1,b2,b3,b_1, b_2, b_3, \ldots is eventually periodic if there exist positive integers pp and MM such that bm+p=bmb_{m+p} = b_m for all mMm \geq M.)

International Mathematical Olympiad 2024 Problem 4

Let ABCABC be a triangle with AB<AC<BCAB < AC < BC. Let the incentre and incircle of triangle ABCABC be II and ω\omega, respectively. Let XX be the point on line BCBC different from CC such that the line through XX parallel to ACAC is tangent to ω\omega. Similarly, let YY be the point on line BCBC different from BB such that the line through YY parallel to ABAB is tangent to ω\omega. Let AIAI intersect the circumcircle of triangle ABCABC again at PAP \neq A. Let KK and LL be the midpoints of ACAC and ABAB, respectively.

Prove that KIL+YPX=180\angle KIL + \angle YPX = 180^{\circ}.

International Mathematical Olympiad 2024 Problem 5

Turbo the snail plays a game on a board with 2024 rows and 2023 columns. There are hidden monsters in 2022 of the cells. Initially, Turbo does not know where any of the monsters are, but he knows that there is exactly one monster in each row except the first row and the last row, and that each column contains at most one monster.

Turbo makes a series of attempts to go from the first row to the last row. On each attempt, he chooses to start on any cell in the first row, then repeatedly moves to an adjacent cell sharing a common side. (He is allowed to return to a previously visited cell.) If he reaches a cell with a monster, his attempt ends and he is transported back to the first row to start a new attempt. The monsters do not move, and Turbo remembers whether or not each cell he has visited contains a monster. If he reaches any cell in the last row, his attempt ends and the game is over.

Determine the minimum value of nn for which Turbo has a strategy that guarantees reaching the last row on the nthn^{\text{th}} attempt or earlier, regardless of the locations of the monsters.

International Mathematical Olympiad 2024 Problem 6

Let Q\mathbb{Q} be the set of rational numbers. A function f ⁣:QQf\colon \mathbb{Q} \to \mathbb{Q} is called aquaesulian if the following property holds: for every x,yQx, y \in \mathbb{Q}, f(x+f(y))=f(x)+yorf(f(x)+y)=x+f(y).f(x + f(y)) = f(x) + y \quad \text{or} \quad f(f(x) + y) = x + f(y).

Show that there exists an integer cc such that for any aquaesulian function ff there are at most cc different rational numbers of the form f(r)+f(r)f(r) + f(-r) for some rational number rr, and find the smallest possible value of cc.

Middle European Mathematical Olympiad 2024 Problem I-1

Determine all kN0k \in \mathbb{N}_0 for which there exists a function f ⁣:N0N0f \colon \mathbb{N}_0 \to \mathbb{N}_0 such that f(2024)=kf(2024) = k and

f(f(n))f(n+1)f(n)f(f(n)) \leq f(n + 1) - f(n)

for all nN0n \in \mathbb{N}_0.

Remark. Here N0\mathbb{N}_0 denotes the set of nonnegative integers.

Middle European Mathematical Olympiad 2024 Problem I-2

There is a sheet of paper (like this one) on an infinite blackboard. Marvin secretly chooses a convex 2024-gon PP that lies fully on the piece of paper. Tigerin wants to find the vertices of PP. In each step, Tigerin can draw a line gg on the blackboard that is fully outside the piece of paper, then Marvin replies with the line hh parallel to gg that is the closest to gg which passes through at least one vertex of PP. Prove that there exists a positive integer nn such that Tigerin can always determine the vertices of PP in at most nn steps.

Middle European Mathematical Olympiad 2024 Problem I-3

Let ABCABC be an acute scalene triangle. Choose a circle ω\omega passing through BB and CC which intersects segments ABAB and ACAC again in points DAD \neq A and EAE \neq A, respectively. Let FF be the intersection of BEBE and CDCD. Let GG be the point on the circumcircle of ABFABF such that GBGB is tangent to ω\omega. Similarly, let HH be the point on the circumcircle of ACFACF such that HCHC is tangent to ω\omega. Prove that there exists a point TAT \neq A, independent of the choice of ω\omega, such that the circumcircle of AGHAGH passes through TT.

Middle European Mathematical Olympiad 2024 Problem T-1

Consider the two infinite sequences a0,a1,a2,a_0, a_1, a_2, \ldots and b0,b1,b2,b_0, b_1, b_2, \ldots of real numbers such that a0=0a_0 = 0, b0=0b_0 = 0 and ak+1=bk,bk+1=akbk+ak+1bk+1a_{k+1} = b_k, \qquad b_{k+1} = \frac{a_k b_k + a_k + 1}{b_k + 1} for each integer k0k \geq 0. Prove that a2024+b202488a_{2024} + b_{2024} \geq 88.

Middle European Mathematical Olympiad 2024 Problem T-3

There are 2024 mathematicians sitting in a row next to the river Tisza. Each of them is working on exactly one research topic, and if two mathematicians are working on the same topic, everyone sitting between them is also working on it.

Marvin is trying to figure out for each pair of mathematicians whether they are working on the same topic. He is allowed to ask each mathematician the following question: "How many of these 2024 mathematicians are working on your topic?" He asks the questions one by one, so he knows all previous answers before he asks the next one.

Determine the smallest positive integer kk such that Marvin can always accomplish his goal with at most kk questions.

Middle European Mathematical Olympiad 2024 Problem T-4

A finite sequence x1,x2,,xrx_1, x_2, \ldots, x_r of positive integers is a palindrome if xi=xr+1ix_i = x_{r+1-i} for all integers 1ir1 \leq i \leq r.

Let a1,a2,a_1, a_2, \ldots be an infinite sequence of positive integers. For a positive integer j2j \geq 2, denote by a[j]a[j] the finite subsequence a1,a2,,aj1a_1, a_2, \ldots, a_{j-1}. Suppose that there exists a strictly increasing infinite sequence b1,b2,b_1, b_2, \ldots of positive integers such that for every positive integer nn, the subsequence a[bn]a[b_n] is a palindrome and bn+2bn+1+bnb_{n+2} \leq b_{n+1} + b_n. Prove that there exists a positive integer TT such that ai=ai+Ta_i = a_{i+T} for every positive integer ii.

Middle European Mathematical Olympiad 2024 Problem T-5

Let ABCABC be a triangle with BAC=60°\angle BAC = 60°. Let DD be a point on the line ACAC such that AB=ADAB = AD and AA lies between CC and DD. Suppose that there are two points EFE \neq F on the circumcircle of the triangle DBCDBC such that AE=AF=BCAE = AF = BC. Prove that the line EFEF passes through the circumcenter of ABCABC.

Middle European Mathematical Olympiad 2024 Problem T-6

Let ABCABC be an acute triangle. Let MM be the midpoint of the segment BCBC. Let I,J,KI, J, K be the incenters of triangles ABC,ABM,ACMABC, ABM, ACM, respectively. Let P,QP, Q be points on the lines MK,MJMK, MJ, respectively, such that AJP=ABC\angle AJP = \angle ABC and AKQ=BCA\angle AKQ = \angle BCA. Let RR be the intersection of the lines CPCP and BQBQ. Prove that the lines IRIR and BCBC are perpendicular.

Middle European Mathematical Olympiad 2024 Problem T-7

Define glueing of positive integers as writing their base ten representations one after another and interpreting the result as the base ten representation of a single positive integer.

Find all positive integers kk for which there exists an integer NkN_k with the following property: for all nNkn \geq N_k, we can glue the numbers 1,2,,n1, 2, \ldots, n in some order so that the result is a number divisible by kk.

Remark. The base ten representation of a positive integer never starts with zero.

Example. Glueing 15, 14, 7 in this order makes 15147.

Middle European Mathematical Olympiad 2024 Problem T-8

Let kk be a positive integer and a1,a2,a_1, a_2, \ldots be an infinite sequence of positive integers such that aiai+1kai2a_i a_{i+1} \mid k - a_i^2 for all integers i1i \geq 1. Prove that there exists a positive integer MM such that an=an+1a_n = a_{n+1} for all integers nMn \geq M.