Found problems: 85335
2010 Contests, 1
Consider points $D,E$ and $F$ on sides $BC,AC$ and $AB$, respectively, of a triangle $ABC$, such that $AD, BE$ and $CF$ concurr at a point $G$. The parallel through $G$ to $BC$ cuts $DF$ and $DE$ at $H$ and $I$, respectively. Show that triangles $AHG$ and $AIG$ have the same areas.
2007 May Olympiad, 3
Jorge chooses $6$ different positive integers and writes one on each face of a cube. He threw his bucket three times.
The first time his cube showed the number $5$ facing up and also the sum of the numbers on the faces sides was $20$. The second time his cube showed the number $7$ facing up and also the sum of the numbers on the faces sides was $17$. The third time his cube showed the number $4$ up, plus all the numbers on the side faces. They turned out to be primes. What are the numbers that Jorge chose and how did he distribute them on the faces of the cube? Analyze all odds.
Remember that $1$ is not prime.
2015 Czech-Polish-Slovak Junior Match, 2
We removed the middle square of $2 \times 2$ from the $8 \times 8$ board.
a) How many checkers can be placed on the remaining $60$ boxes so that there are no two not jeopardize?
b) How many at least checkers can be placed on the board so that they are at risk all $60$ squares?
(A lady is threatening the box she stands on, as well as any box she can get to in one move without going over any of the four removed boxes.)
2015 ASDAN Math Tournament, 11
Let $ABCDEF$ be a regular hexagon, and let $G$, $H$, $I$, $J$, $K$, and $L$ be the midpoints of sides $AB$, $BC$, $CD$, $DE$, $EF$, and $FA$, respectively. The intersection of lines $\overline{AH}$, $\overline{BI}$, $\overline{CJ}$, $\overline{DK}$, $\overline{EL}$, and $\overline{FG}$ bound a smaller regular hexagon. Find the ratio of the area of the smaller hexagon to the area of $ABCDEF$.
2005 Hong kong National Olympiad, 4
Let $a,b,c,d$ be positive real numbers such that $a+b+c+d=1$. Prove that\[ 6(a^3+b^3+c^3+d^3)\ge(a^2+b^2+c^2+d^2)+\frac{1}{8} \]
2016 Thailand TSTST, 1
Find all functions $f:\mathbb{Q}\to\mathbb{Q}$ such that $$f(xy)+f(x+y)=f(x)f(y)+f(x)+f(y)$$ for all $x,y\in\mathbb{Q}$.
2020 Princeton University Math Competition, A1/B3
Let $f(x) =\frac{x+a}{x+b}$ satisfy $f(f(f(x))) = x$ for real numbers $a, b$. If the maximum value of a is $p/q$, where $p, q$ are relatively prime integers, what is $|p| + |q|$?
2011 Purple Comet Problems, 25
Find the remainder when $A=3^3\cdot 33^{33}\cdot 333^{333}\cdot 3333^{3333}$ is divided by $100$.
2025 Austrian MO National Competition, 4
Determine all integers $n$ that can be written in the form
\[
n = \frac{a^2 - b^2}{b},
\]
where $a$ and $b$ are positive integers.
[i](Walther Janous)[/i]
2000 Turkey Team Selection Test, 1
$(a)$ Prove that for every positive integer $n$, the number of ordered pairs $(x, y)$ of integers satisfying $x^2-xy+y^2 = n$ is divisible by $3.$
$(b)$ Find all ordered pairs of integers satisfying $x^2-xy+y^2=727.$
1982 Bundeswettbewerb Mathematik, 3
Suppose $P$ is a point inside a convex $2n$-gon, such that $P$ does not lie on any diagonal. Show that $P$ lies inside an even number of triangles whose vertices are vertices of the polygon.
2017 Serbia JBMO TST, 3
Let ABC be a triangle with angle ACB=60. Let AA' and BB' be altitudes and let T be centroid of the triangle ABC. If A'T and B'T intersect triangle's circumcircle in points M and N respectively prove that MN=AB.
1964 Spain Mathematical Olympiad, 6
Make a graphical representation of the function $y=\vert \vert \vert x-1 \vert -2 \vert -3 \vert$ on the interval $-8 \leq x \leq 8$.
2013 Czech-Polish-Slovak Junior Match, 2
Find all natural numbers $n$ such that the sum of the three largest divisors of $n$ is $1457$.
2021 Azerbaijan Senior NMO, 2
Find all triples of natural numbers $(a, b, c)$ for which the number $$2^a + 2^b + 2^c + 3$$ is the square of an integer.
2022 Thailand TST, 3
A hunter and an invisible rabbit play a game on an infinite square grid. First the hunter fixes a colouring of the cells with finitely many colours. The rabbit then secretly chooses a cell to start in. Every minute, the rabbit reports the colour of its current cell to the hunter, and then secretly moves to an adjacent cell that it has not visited before (two cells are adjacent if they share an edge). The hunter wins if after some finite time either:[list][*]the rabbit cannot move; or
[*]the hunter can determine the cell in which the rabbit started.[/list]Decide whether there exists a winning strategy for the hunter.
[i]Proposed by Aron Thomas[/i]
2018 Moscow Mathematical Olympiad, 4
$ABCD$ is convex and $AB\not \parallel CD,BC \not \parallel DA$. $P$ is variable point on $AD$. Circumcircles of $\triangle ABP$ and $\triangle CDP$ intersects at $Q$. Prove, that all lines $PQ$ goes through fixed point.
2006 Switzerland - Final Round, 6
At least three players have participated in a tennis tournament. Evey two players have played each other exactly once, and each player has at least one match won. Show that there are three players $A,B,C$ such that $A$ won against $B$, $B$ won against $C$ and $C$ won against $A$.
2008 Germany Team Selection Test, 1
A sequence $ (S_n), n \geq 1$ of sets of natural numbers with $ S_1 = \{1\}, S_2 = \{2\}$ and
\[{ S_{n + 1} = \{k \in }\mathbb{N}|k - 1 \in S_n \text{ XOR } k \in S_{n - 1}\}.
\]
Determine $ S_{1024}.$
2021/2022 Tournament of Towns, P5
There were 20 participants in a chess tournament. Each of them played with each other twice: once as white and once as black. Let us say that participant $X{}$ is no weaker than participant $Y{}$ if $X{}$ has won at least the same number of games playing white as $Y{}$ and also has won at least the same number of games playing black as $Y{}$ . Do there exist for sure two participants $A{}$ and $B{}$ such that $A{}$ is not weaker than $B{}$?
[i]Boris Frenkin[/i]
2018 Bosnia and Herzegovina Junior BMO TST, 1
Students are in classroom with $n$ rows. In each row there are $m$ tables. It's given that $m,n \geq 3$. At each table there is exactly one student. We call neighbours of the student students sitting one place right, left to him, in front of him and behind him. Each student shook hands with his neighbours. In the end there were $252$ handshakes. How many students were in the classroom?
2010 Finnish National High School Mathematics Competition, 5
Let $S$ be a non-empty subset of a plane. We say that the point $P$ can be seen from $A$ if every point from the line segment $AP$ belongs to $S$. Further, the set $S$ can be seen from $A$ if every point of $S$ can be seen from $A$. Suppose that $S$ can be seen from $A$, $B$ and $C$ where $ABC$ is a triangle. Prove that $S$ can also be seen from any other point of the triangle $ABC$.
1976 Canada National Olympiad, 3
Two grade seven students were allowed to enter a chess tournament otherwise composed of grade eight students. Each contestant played once with each other contestant and received one point for a win, one half point for a tie and zero for a loss. The two grade seven students together gained a total of eight points and each grade eight student scored the same number of points as his classmates. How many students for grade eight participated in the chess tournament? Is the solution unique?
2020 LIMIT Category 1, 2
In a square $ABCD$ of side $2$ units, $E$ is the midpoint of $AD$ and $F$ on $BE$ such that $CF\perp BE$, then the quadrilateral $CDEF$ has an area of
(A)$2$
(B)$2.2$
(C)$\sqrt{5}$
(D)None of these
1999 China Second Round Olympiad, 1
In convex quadrilateral $ABCD, \angle BAC=\angle CAD.$ $E$ lies on segment $CD$, and $BE$ and $AC$ intersect at $F,$ $DF$ and $BC$ intersect at $G.$ Prove that $\angle GAC=\angle EAC.$