Olympiad problems

2003 IMO, 3

Each pair of opposite sides of a convex hexagon has the following property: the distance between their midpoints is equal to $\dfrac{\sqrt{3}}{2}$ times the sum of their lengths. Prove that all the angles of the hexagon are equal.

2015 AMC 12/AHSME, 23

Tags: probability , integration , geometry , trigonometry , calculus , rectangle , geometric probability

Let $S$ be a square of side length $1$. Two points are chosen independently at random on the sides of $S$. The probability that the straight-line distance between the points is at least $\tfrac12$ is $\tfrac{a-b\pi}c$, where $a$, $b$, and $c$ are positive integers and $\gcd(a,b,c)=1$. What is $a+b+c$? $\textbf{(A) }59\qquad\textbf{(B) }60\qquad\textbf{(C) }61\qquad\textbf{(D) }62\qquad\textbf{(E) }63$

2006 Tournament of Towns, 4

Tags: geometry , 3d geometry , prism , pyramid

Is it possible to split a prism into disjoint set of pyramids so that each pyramid has its base on one base of the prism, while its vertex on another base of the prism ? (6)

1989 Mexico National Olympiad, 5

Tags: geometry , rectangle , tangent circle

Let $C_1$ and $C_2$ be two tangent unit circles inside a circle $C$ of radius $2$. Circle $C_3$ inside $C$ is tangent to the circles $C,C_1,C_2$, and circle $C_4$ inside $C$ is tangent to $C,C_1,C_3$. Prove that the centers of $C,C_1,C_3$ and $C_4$ are vertices of a rectangle.

2005 China Team Selection Test, 2

Tags: perimeter , cyclic quadrilateral , pythagorean theorem , geometry

Cyclic quadrilateral $ABCD$ has positive integer side lengths $AB$, $BC$, $CA$, $AD$. It is known that $AD=2005$, $\angle{ABC}=\angle{ADC} = 90^o$, and $\max \{ AB,BC,CD \} < 2005$. Determine the maximum and minimum possible values for the perimeter of $ABCD$.

1995 Bundeswettbewerb Mathematik, 2

Tags: geometry , locus , equilateral

A line $g$ and a point $A$ outside $g$ are given in a plane. A point $P$ moves along $g$. Find the locus of the third vertices of equilateral triangles whose two vertices are $A$ and $P$.

2010 Today's Calculation Of Integral, 662

Tags: calculus , integration , geometric transformation , rotation , inequalities , perimeter , geometry

In $xyz$ space, let $A$ be the solid generated by a rotation of the figure, enclosed by the curve $y=2-2x^2$ and the $x$-axis about the $y$-axis. (1) When the solid is cut by the plane $x=a\ (|a|\leq 1)$, find the inequality which expresses the figure of the cross-section. (2) Denote by $L$ the distance between the point $(a,\ 0,\ 0)$ and the point on the perimeter of the cross-section found in (1), find the maximum value of $L$. (3) Find the volume of the solid by a rotation of the solid $A$ about the $x$-axis. [i]1987 Sophia University entrance exam/Science and Technology[/i]

2012 India IMO Training Camp, 1

Tags: trapezoid , geometry

Let $ABCD$ be a trapezium with $AB\parallel CD$. Let $P$ be a point on $AC$ such that $C$ is between $A$ and $P$; and let $X, Y$ be the midpoints of $AB, CD$ respectively. Let $PX$ intersect $BC$ in $N$ and $PY$ intersect $AD$ in $M$. Prove that $MN\parallel AB$.

2022 Baltic Way, 12

Tags: geometry

An acute-angled triangle $ABC$ has altitudes $AD, BE$ and $CF$. Let $Q$ be an interior point of the segment $AD$, and let the circumcircles of the triangles $QDF$ and $QDE$ meet the line $BC$ again at points $X$ and $Y$ , respectively. Prove that $BX = CY$ .

2016 China Western Mathematical Olympiad, 7

Tags: geometry , cyclic quadrilateral

$ABCD$ is a cyclic quadrilateral, and $\angle BAC = \angle DAC$. $\astrosun I_1$ and $\astrosun I_2$ are the incircles of $\triangle ABD$ and $\triangle ADC$ respectively. Prove that one of the common external tangents of $\astrosun I_1$ and $\astrosun I_2$ is parallel to $BD$

2002 Moldova National Olympiad, 12.6

Tags: geometric transformation , homothety , projective geometry , geometry

Let A,B,C be three collinear points and a circle T(A,r). If M and N are two diametrical opposite variable points on T, Find locus geometrical of the intersection BM and CN.

2002 CentroAmerican, 2

Tags: geometry

Let $ ABC$ be an acute triangle, and let $ D$ and $ E$ be the feet of the altitudes drawn from vertexes $ A$ and $ B$, respectively. Show that if, \[ Area[BDE]\le Area[DEA]\le Area[EAB]\le Area[ABD]\] then, the triangle is isosceles.

2018 Saint Petersburg Mathematical Olympiad, 1

Tags: analytic geometry , geometry , number theory

Let $l$ some line, that is not parallel to the coordinate axes. Find minimal $d$ that always exists point $A$ with integer coordinates, and distance from $A$ to $l$ is $\leq d$

2023 Korea Summer Program Practice Test, P6

Tags: geometry , angle bisector , circumcircle , power of a point , radical axis

$AB < AC$ on $\triangle ABC$. The midpoint of arc $BC$ which doesn't include $A$ is $T$ and which includes $A$ is $S$. On segment $AB,AC$, $D,E$ exist so that $DE$ and $BC$ are parallel. The outer angle bisector of $\angle ABE$ and $\angle ACD$ meets $AS$ at $P$ and $Q$. Prove that the circumcircle of $\triangle PBE$ and $\triangle QCD$ meets on $AT$.

2019 PUMaC Geometry B, 3

Tags: geometry , circumcircle

Let $\triangle ABC$ be a triangle with circumcenter $O$ and orthocenter $H$. Let $D$ be a point on the circumcircle of $ABC$ such that $AD \perp BC$. Suppose that $AB = 6, DB = 2$, and the ratio $\tfrac{\text{area}(\triangle ABC)}{\text{area}(\triangle HBC)}=5.$ Then, if $OA$ is the length of the circumradius, then $OA^2$ can be written in the form $\tfrac{m}{n}$, where $m$ and $n$ are relatively prime positive integers. Compute $m + n$.

2011 JBMO Shortlist, 5

Tags: geometry

Inside the square ${ABCD}$, the equilateral triangle $\vartriangle ABE$ is constructed. Let ${M}$ be an interior point of the triangle $\vartriangle ABE$ such that $MB=\sqrt{2}$, $MC=\sqrt{6}$, $MD=\sqrt{5}$ and ${ME=\sqrt{3}}$. Find the area of the square ${ABCD}$.

2022 Kyiv City MO Round 1, Problem 3

Tags: geometry

Let $AL$ be the inner bisector of triangle $ABC$. The circle centered at $B$ with radius $BL$ meets the ray $AL$ at points $L$ and $E$, and the circle centered at $C$ with radius $CL$ meets the ray $AL$ at points $L$ and $D$. Show that $AL^2 = AE\times AD$. [i](Proposed by Mykola Moroz)[/i]

2009 Today's Calculation Of Integral, 470

Tags: calculus , integration , geometry , parabola , calculus computations , conic

Determin integers $ m,\ n\ (m>n>0)$ for which the area of the region bounded by the curve $ y\equal{}x^2\minus{}x$ and the lines $ y\equal{}mx,\ y\equal{}nx$ is $ \frac{37}{6}$.

III Soros Olympiad 1996 - 97 (Russia), 11.5

Tags: geometry , parallelogram

The area of a convex quadrilateral is $S$, and the angle between the diagonals is $a$. On the sides of this quadrilateral, as on the bases, isosceles triangles with vertex angle equal to $\phi$, wherein two opposite triangles are located on the other side of the corresponding side of the quadrilateral than the quadrilateral itself, and the other two are located on the other side. Prove that the vertices of the constructed triangles, different from the vertices of the quadrilateral, serve as the vertices of a parallelogram. Find the area of this parallelogram.

2018 Singapore MO Open, 2

Tags: geometry , smo

Let O be a point inside triangle ABC such that $\angle BOC$ is $90^\circ$ and $\angle BAO = \angle BCO$. Prove that $\angle OMN$ is $90$ degrees, where $M$ and $N$ are the midpoints of $\overline{AC}$ and $\overline{BC}$, respectively.

2021 Alibaba Global Math Competition, 13

Tags: manifold , group theory , submanifold , geometry , topology

Let $M_n=\{(u,v) \in S^n \times S^n: u \cdot v=0\}$, where $n \ge 2$, and $u \cdot v$ is the Euclidean inner product of $u$ and $v$. Suppose that the topology of $M_n$ is induces from $S^n \times S^n$. (1) Prove that $M_n$ is a connected regular submanifold of $S^n \times S^n$. (2) $M_n$ is Lie Group if and only if $n=2$.

1985 Traian Lălescu, 2.3

Tags: geometry , perimeter , pure geometry

Let $ ABC $ a triangle, and $ P\neq B,C $ be a point situated upon the segment $ BC $ such that $ ABP $ and $ APC $ have the same perimeter. $ M $ represents the middle of $ BC, $ and $ I, $ the center of the incircle of $ ABC. $ Prove that $ IM\parallel AP. $

2003 IMO, 3

2015 AMC 12/AHSME, 23

2006 Tournament of Towns, 4

1989 Mexico National Olympiad, 5

2005 China Team Selection Test, 2

1995 Bundeswettbewerb Mathematik, 2

2010 Today's Calculation Of Integral, 662

2012 India IMO Training Camp, 1

2022 Baltic Way, 12

2016 China Western Mathematical Olympiad, 7

2002 Moldova National Olympiad, 12.6

2002 CentroAmerican, 2

2018 Saint Petersburg Mathematical Olympiad, 1

2023 Korea Summer Program Practice Test, P6

2019 PUMaC Geometry B, 3

2011 JBMO Shortlist, 5

2022 Kyiv City MO Round 1, Problem 3

2009 Today's Calculation Of Integral, 470

III Soros Olympiad 1996 - 97 (Russia), 11.5

2018 Singapore MO Open, 2

2021 Alibaba Global Math Competition, 13

1985 Traian Lălescu, 2.3

2023 Harvard-MIT Mathematics Tournament, 1

2021 Oral Moscow Geometry Olympiad, 1

1999 Korea - Final Round, 1