Olympiad problems

2007 Today's Calculation Of Integral, 215

For $ a\in\mathbb{R}$, let $ M(a)$ be the maximum value of the function $ f(x)\equal{}\int_{0}^{\pi}\sin (x\minus{}t)\sin (2t\minus{}a)\ dt$. Evaluate $ \int_{0}^{\frac{\pi}{2}}M(a)\sin (2a)\ da$.

2024 Sharygin Geometry Olympiad, 17

Tags: geometry , incircle

Let $ABC$ be a non-isosceles triangle, $\omega$ be its incircle. Let $D, E, $ and $F$ be the points at which the incircle of $ABC$ touches the sides $BC, CA, $ and $AB$ respectively. Let $M$ be the point on ray $EF$ such that $EM = AB$. Let $N$ be the point on ray $FE$ such that $FN = AC$. Let the circumcircles of $\triangle BFM$ and $\triangle CEN$ intersect $\omega$ again at $S$ and $T$ respectively. Prove that $BS, CT, $ and $AD$ concur.

2006 CentroAmerican, 6

Tags: ratio , trigonometry , projective geometry , geometry

Let $ABCD$ be a convex quadrilateral. $I=AC\cap BD$, and $E$, $H$, $F$ and $G$ are points on $AB$, $BC$, $CD$ and $DA$ respectively, such that $EF \cap GH= I$. If $M=EG \cap AC$, $N=HF \cap AC$, show that \[\frac{AM}{IM}\cdot \frac{IN}{CN}=\frac{IA}{IC}.\]

1963 Bulgaria National Olympiad, Problem 1

Tags: number theory

Find all three-digit numbers whose remainders after division by $11$ give quotient, equal to the sum of the squares of its digits.

2010 Indonesia TST, 4

Tags: combinatorics

For each positive integer $ n$, define $ f(n)$ as the number of digits $ 0$ in its decimal representation. For example, $ f(2)\equal{}0$, $ f(2009)\equal{}2$, etc. Please, calculate \[ S\equal{}\sum_{k\equal{}1}^{n}2^{f(k)},\] for $ n\equal{}9,999,999,999$. [i]Yudi Satria, Jakarta[/i]

2016 Junior Balkan Team Selection Tests - Romania, 2

Tags: combinatorics

Given three colors and a rectangle m × n dice unit, we want to color each segment constituting one side of a square drive with one of three colors so that each square unit have two sides of one color and two sides another color. How many colorings we have?

2002 China Girls Math Olympiad, 5

Tags: floor function , inequalities

There are $ n \geq 2$ permutations $ P_1, P_2, \ldots, P_n$ each being an arbitrary permutation of $ \{1,\ldots,n\}.$ Prove that \[ \sum^{n\minus{}1}_{i\equal{}1} \frac{1}{P_i \plus{} P_{i\plus{}1}} > \frac{n\minus{}1}{n\plus{}2}.\]

Estonia Open Senior - geometry, 2004.1.5

Tags: inequalities , geometric inequality , area of triangle , geometry

Find the smallest real number $x$ for which there exist two non-congruent triangles with integral side lengths having area $x$.

2004 Baltic Way, 4

Tags: inequalities

Let $x_1$, $x_2$, ..., $x_n$ be real numbers with arithmetic mean $X$. Prove that there is a positive integer $K$ such that for any integer $i$ satisfying $0\leq i<K$, we have $\frac{1}{K-i}\sum_{j=i+1}^{K} x_j \leq X$. (In other words, prove that there is a positive integer $K$ such that the arithmetic mean of each of the lists $\left\{x_1,x_2,...,x_K\right\}$, $\left\{x_2,x_3,...,x_K\right\}$, $\left\{x_3,...,x_K\right\}$, ..., $\left\{x_{K-1},x_K\right\}$, $\left\{x_K\right\}$ is not greater than $X$.)

2015 South Africa National Olympiad, 2

Tags: algebra

Determine all pairs of real numbers $a$ and $x$ that satisfy the simultaneous equations $$5x^3 + ax^2 + 8 = 0$$ and $$5x^3 + 8x^2 + a = 0.$$

2005 Abels Math Contest (Norwegian MO), 4a

Tags: algebra , inequalities

Show that for all positive real numbers $a, b$ and $c$, the inequality $(a+b)(a+c)\ge 2\sqrt{abc(a+b+c)}$ is true.

1995 Niels Henrik Abels Math Contest (Norwegian Math Olympiad) Round 2, 9

Tags: analytic geometry , symmetry

We draw a circle with radius 5 on a gridded paper where the grid consists of squares with sides of length 1. The center of the circle is placed in the middle of one of the squares. All the squares through which the circle passes are colored. How many squares are colored? (The figure illustrates this for a smaller circle.) [img]http://i250.photobucket.com/albums/gg265/geometry101/NielsHenrikAbel1995Number9.jpg[/img] A. 24 B. 32 C. 40 D. 64 E. None of these

2019 China Team Selection Test, 5

Tags: inequalities

Find all integer $n$ such that the following property holds: for any positive real numbers $a,b,c,x,y,z$, with $max(a,b,c,x,y,z)=a$ , $a+b+c=x+y+z$ and $abc=xyz$, the inequality $$a^n+b^n+c^n \ge x^n+y^n+z^n$$ holds.

Swiss NMO - geometry, 2009.7

Tags: geometry , common tangent , circles , concurrency

Points $A, M_1, M_2$ and $C$ are on a line in this order. Let $k_1$ the circle with center $M_1$ passing through $A$ and $k_2$ the circle with center $M_2$ passing through $C$. The two circles intersect at points $E$ and $F$. A common tangent of $k_1$ and $k_2$, touches $k_1$ at $B$ and $k_2$ at $D$. Show that the lines $AB, CD$ and $EF$ intersect at one point.

1996 Flanders Math Olympiad, 3

Tags: pigeonhole principle

Consider the points $1,\frac12,\frac13,...$ on the real axis. Find the smallest value $k \in \mathbb{N}_0$ for which all points above can be covered with 5 [b]closed[/b] intervals of length $\frac1k$.

2010 All-Russian Olympiad, 3

Tags: circumcircle , ratio , similar triangles , geometry

Let $O$ be the circumcentre of the acute non-isosceles triangle $ABC$. Let $P$ and $Q$ be points on the altitude $AD$ such that $OP$ and $OQ$ are perpendicular to $AB$ and $AC$ respectively. Let $M$ be the midpoint of $BC$ and $S$ be the circumcentre of triangle $OPQ$. Prove that $\angle BAS =\angle CAM$.

2003 Greece JBMO TST, 3

Tags: combinatorics , subset

Consider the set $M=\{1,2,3,...,2003\}$. How many subsets of $M$ with even number of elements exist?

1978 Vietnam National Olympiad, 5

Tags: maximum , right angle , geometry

A river has a right-angle bend. Except at the bend, its banks are parallel lines of distance $a$ apart. At the bend the river forms a square with the river flowing in across one side and out across an adjacent side. What is the longest boat of length $c$ and negligible width which can pass through the bend?

2003 Abels Math Contest (Norwegian MO), 3

Tags: angle , geometry

Let $ABC$ be a triangle with $AC> BC$, and let $S$ be the circumscribed circle of the triangle. $AB$ divides $S$ into two arcs. Let $D$ be the midpoint of the arc containing $C$. (a) Show that $\angle ACB +2 \cdot \angle ACD = 180^o$. (b) Let $E$ be the foot of the altitude from $D$ on $AC$. Show that $BC +CE = AE$.

2018 Costa Rica - Final Round, N3

Tags: number theory , diophantine

Let $a$ and $b$ be positive integers such that $2a^2 + a = 3b^2 + b$. Prove that $a-b$ is a perfect square.

2018 Tournament Of Towns, 2.