#CompetitionYearsProblemsYears
1International Mathematical Olympiad1959–2025398
2Middle European Mathematical Olympiad2009–2025160
International Mathematical Olympiad 2018 Problem 1

Let Γ\Gamma be the circumcircle of acute-angled triangle ABCABC. Points DD and EE lie on segments ABAB and ACAC, respectively, such that AD=AEAD = AE. The perpendicular bisectors of BDBD and CECE intersect the minor arcs ABAB and ACAC of Γ\Gamma at points FF and GG, respectively. Prove that the lines DEDE and FGFG are parallel (or are the same line).

International Mathematical Olympiad 2018 Problem 2

Find all integers n3n \geq 3 for which there exist real numbers a1,a2,,an+2a_1, a_2, \ldots, a_{n+2}, such that an+1=a1a_{n+1} = a_1 and an+2=a2a_{n+2} = a_2, and aiai+1+1=ai+2a_i a_{i+1} + 1 = a_{i+2} for i=1,2,,ni = 1, 2, \ldots, n.

International Mathematical Olympiad 2018 Problem 3

An anti-Pascal triangle is an equilateral triangular array of numbers such that, except for the numbers in the bottom row, each number is the absolute value of the difference of the two numbers immediately below it. For example, the following array is an anti-Pascal triangle with four rows which contains every integer from 1 to 10.

42657183109\begin{array}{ccccccc} & & & 4 & & & \\ & & 2 & & 6 & & \\ & 5 & & 7 & & 1 & \\ 8 & & 3 & & 10 & & 9 \end{array}

Does there exist an anti-Pascal triangle with 2018 rows which contains every integer from 1 to 1+2++20181 + 2 + \cdots + 2018?

International Mathematical Olympiad 2018 Problem 4

A site is any point (x,y)(x, y) in the plane such that xx and yy are both positive integers less than or equal to 20.

Initially, each of the 400 sites is unoccupied. Amy and Ben take turns placing stones with Amy going first. On her turn, Amy places a new red stone on an unoccupied site such that the distance between any two sites occupied by red stones is not equal to 5\sqrt{5}. On his turn, Ben places a new blue stone on any unoccupied site. (A site occupied by a blue stone is allowed to be at any distance from any other occupied site.) They stop as soon as a player cannot place a stone.

Find the greatest KK such that Amy can ensure that she places at least KK red stones, no matter how Ben places his blue stones.

International Mathematical Olympiad 2018 Problem 5

Let a1,a2,a_1, a_2, \ldots be an infinite sequence of positive integers. Suppose that there is an integer N>1N > 1 such that, for each nNn \geq N, the number a1a2+a2a3++an1an+ana1\frac{a_1}{a_2} + \frac{a_2}{a_3} + \cdots + \frac{a_{n-1}}{a_n} + \frac{a_n}{a_1} is an integer. Prove that there is a positive integer MM such that am=am+1a_m = a_{m+1} for all mMm \geq M.

International Mathematical Olympiad 2018 Problem 6

A convex quadrilateral ABCDABCD satisfies ABCD=BCDAAB \cdot CD = BC \cdot DA. Point XX lies inside ABCDABCD so that XAB=XCDandXBC=XDA.\angle XAB = \angle XCD \quad \text{and} \quad \angle XBC = \angle XDA. Prove that BXA+DXC=180°\angle BXA + \angle DXC = 180°.

Middle European Mathematical Olympiad 2018 Problem I-1

Let Q+\mathbb{Q}^+ denote the set of all positive rational numbers and let αQ+\alpha \in \mathbb{Q}^+. Determine all functions f ⁣:Q+(α,+)f\colon \mathbb{Q}^{+}\to (\alpha , + \infty) satisfying

f(x+yα)=f(x)+f(y)α,for allx,yQ+.f \left(\frac {x + y}{\alpha}\right) = \frac {f (x) + f (y)}{\alpha}, \quad \text {for all} \, x, y \in \mathbb {Q} ^ {+}.

Middle European Mathematical Olympiad 2018 Problem I-2

The two figures depicted below consisting of 66 and 1010 unit squares, respectively, are called staircases.

figure

Consider a 2018×20182018 \times 2018 board consisting of 201822018^2 cells, each being a unit square. Two arbitrary cells were removed from the same row of the board. Prove that the rest of the board cannot be cut (along the cell borders) into staircases (possibly rotated).

Middle European Mathematical Olympiad 2018 Problem I-3

Let ABCABC be an acute-angled triangle with AB<ACAB < AC, and let DD be the foot of its altitude from AA. Let RR and QQ be the centroids of the triangles ABDABD and ACDACD, respectively. Let PP be a point on the line segment BCBC such that PDP \neq D and the points P,Q,RP, Q, R and DD are concyclic. Prove that the lines AP,BQAP, BQ and CRCR are concurrent.

Middle European Mathematical Olympiad 2018 Problem I-4

(a) Prove that for every positive integer mm there exists an integer nmn \geq m such that

n1n2nm=(nm).(*)\left\lfloor \frac {n}{1} \right\rfloor \cdot \left\lfloor \frac {n}{2} \right\rfloor \cdots \left\lfloor \frac {n}{m} \right\rfloor = \binom {n} {m}. \tag{*}

(b) Denote by p(m)p(m) the smallest integer nmn \geq m such that the equation (*) holds. Prove that p(2018)=p(2019)p(2018) = p(2019).

Remark: For a real number xx, we denote by x\lfloor x \rfloor the largest integer not larger than xx.

Middle European Mathematical Olympiad 2018 Problem T-2

Let P(x)P(x) be a polynomial of degree n2n \geq 2 with rational coefficients such that P(x)P(x) has nn pairwise different real roots forming an arithmetic progression. Prove that among the roots of P(x)P(x) there are two that are also the roots of some polynomial of degree 22 with rational coefficients.

Middle European Mathematical Olympiad 2018 Problem T-3

A group of pirates had an argument and now each of them holds some other two at gunpoint. All the pirates are called one by one in some order. If the called pirate is still alive, he shoots both pirates he is aiming at (some of whom might already be dead). All shots are immediately lethal. After all the pirates have been called, it turns out that exactly 2828 pirates got killed.

Prove that if the pirates were called in whatever other order, at least 1010 pirates would have been killed anyway.

Middle European Mathematical Olympiad 2018 Problem T-4

Let nn be a positive integer and u1,u2,,unu_1, u_2, \ldots, u_n be positive integers not larger than 2k2^k, for some integer k3k \geq 3. A representation of a non-negative integer tt is a sequence of non-negative integers a1,a2,,ana_1, a_2, \ldots, a_n such that t=a1u1+a2u2++anun.t = a_1 u_1 + a_2 u_2 + \cdots + a_n u_n.

Prove that if a non-negative integer tt has a representation, then it also has a representation where less than 2k2k of the numbers a1,a2,,ana_1, a_2, \ldots, a_n are non-zero.

Middle European Mathematical Olympiad 2018 Problem T-5

Let ABCABC be an acute-angled triangle with AB<ACAB < AC, and let DD be the foot of its altitude from AA. Points BB' and CC' lie on the rays ABAB and ACAC, respectively, so that points BB', CC' and DD are collinear and points BB, CC, BB' and CC' lie on one circle with center OO. Prove that if MM is the midpoint of BCBC and HH is the orthocenter of ABCABC, then DHMODHMO is a parallelogram.

Middle European Mathematical Olympiad 2018 Problem T-6

Let ABCABC be a triangle. The internal bisector of ABC\angle ABC intersects the side ACAC at LL and the circumcircle of triangle ABCABC again at WBW \neq B. Let KK be the perpendicular projection of LL onto AWAW. The circumcircle of triangle BLCBLC intersects line CKCK again at PCP \neq C. Lines BPBP and AWAW meet at point TT. Prove that AW=WTAW = WT.

Middle European Mathematical Olympiad 2018 Problem T-7

Let a1,a2,a3,a_1, a_2, a_3, \ldots be the sequence of positive integers such that a1=1andak+1=ak3+1, for all positive integers k.a_1 = 1 \quad \text{and} \quad a_{k+1} = a_k^3 + 1, \text{ for all positive integers } k.

Prove that for every prime number pp of the form 3+23\ell + 2, where \ell is a non-negative integer, there exists a positive integer nn such that ana_n is divisible by pp.