Olympiad problems

2020/2021 Tournament of Towns, P3

Tags: circles , geometry

Let $M{}$ be the midpoint of the side $BC$ of the triangle $ABC$. The circle $\omega$ passes through $A{}$, touches the line $BC$ at $M{}$, intersects the side $AB$ at the point $D{}$ and the side $AC$ at the point $E{}$. Let $X{}$ and $Y{}$ be the midpoints of $BE$ and $CD$ respectively. Prove that the circumcircle of the triangle $MXY$ touches $\omega$. [i]Alexey Doledenok[/i]

1995 Rioplatense Mathematical Olympiad, Level 3, 2

Tags: geometry , area of a triangle , orthocenter , inradius

In a circle of center $O$ and radius $r$, a triangle $ABC$ of orthocenter $H$ is inscribed. It is considered a triangle $A'B'C'$ whose sides have by length the measurements of the segments $AB, CH$ and $2r$. Determine the triangle $ABC$ so that the area of the triangle $A'B'C'$ is maximum.

1989 IMO Longlists, 24

Tags: geometry , quadratic , number theory

Let $ a, b, c, d$ be positive integers such that $ ab \equal{} cd$ and $ a\plus{}b \equal{} c \minus{} d.$ Prove that there exists a right-angled triangle the measure of whose sides (in some unit) are integers and whose area measure is $ ab$ square units.

2015 India Regional MathematicaI Olympiad, 3

Tags: number theory , diophantine equation , system of equations

Find all integers $a,b,c$ such that $a^{2}=bc+4$ and $b^{2}=ca+4$.

Bangladesh Mathematical Olympiad 2020 Final, #4

Tags: combination

Once in a restaurant [b][i]Dr. Strange[/i][/b] found out that there were 12 types of food items from 1 to 12 on the menu. He decided to visit the restaurant 12 days in a row and try a different food everyday. 1st day, he tries one of the items from the first two. On the 2nd day, he eats either item 3 or the item he didn’t tried on the 1st day. Similarly, on the 3rd day, he eats either item 4 or the item he didn’t tried on the 2nd day. If someday he's not able to choose items that way, he eats the item that remained uneaten from the menu. In how many ways can he eat the items for 12 days?

2000 Switzerland Team Selection Test, 10

Tags: combinatorics

At $n$ distinct points of a circular race course there are $n$ cars ready to start. Each car moves at a constant speed and covers the circle in an hour. On hearing the initial signal, each of them selects a direction and starts moving immediately. If two cars meet, both of them change directions and go on without loss of speed. Show that at a certain moment each car will be at its starting point.

2007 Moldova National Olympiad, 11.3

Tags: 3d geometry , analytic geometry , geometry

$ABCDA_{1}B_{1}C_{1}D_{1}$ is a cube with side length $4a$. Points $E$ and $F$ are taken on $(AA_{1})$ and $(BB_{1})$ such that $AE=B_{1}F=a$. $G$ and $H$ are midpoints of $(A_{1}B_{1})$ and $(C_{1}D_{1})$, respectively. Find the minimum value of the $CP+PQ$, where $P\in[GH]$ and $Q\in[EF]$.

2013 HMNT, 4

Tags: geometry , perimeter , probability

There are $2$ runners on the perimeter of a regular hexagon, initially located at adjacent vertices. Every second, each of the runners independently moves either one vertex to the left, with probability $\frac{1}{2}$, or one vertex to the right, also with probability $\frac{1}{2}$. Find the probability that after a $2013$ second run (in which runners switch vertices $2013$ times each), the runners end up at adjacent vertices once again.

May Olympiad L1 - geometry, 1999.2

Tags: geometry , parallelogram , pentagon , angle

In a parallelogram $ABCD$ , $BD$ is the largest diagonal. By matching $B$ with $D$ by a bend, a regular pentagon is formed. Calculate the measures of the angles formed by the diagonal $BD$ with each of the sides of the parallelogram.

2002 Mediterranean Mathematics Olympiad, 2

Tags: algebra

Suppose $x, y, a$ are real numbers such that $x+y = x^3 +y^3 = x^5 +y^5 = a$. Find all possible values of $a.$