Found problems: 85335
2004 All-Russian Olympiad Regional Round, 9.4
Three natural numbers are such that the product of any two of them is divided by the sum of these two numbers. Prove that these three numbers have a common divisor greater than one.
2024 Junior Balkan Team Selection Tests - Romania, P3
In the exterior of the acute-angles triangle $ABC$ we construct the isosceles triangles $DAB$ and $EAC$ with bases $AB{}$ and $AC{}$ respectively such that $\angle DBC=\angle ECB=90^\circ.$ Let $M$ and $N$ be the reflections of $A$ with respect to $D$ and $E$ respectively. Prove that the line $MN$ passes through the orthocentre of the triangle $ABC.$
[i]Florin Bojor[/i]
2002 AMC 10, 11
The product of three consecutive positive integers is $ 8$ times their sum. What is the sum of their squares?
$ \textbf{(A)}\ 50 \qquad
\textbf{(B)}\ 77 \qquad
\textbf{(C)}\ 110 \qquad
\textbf{(D)}\ 149 \qquad
\textbf{(E)}\ 194$
2014 Online Math Open Problems, 11
Given a triangle $ABC$, consider the semicircle with diameter $\overline{EF}$ on $\overline{BC}$ tangent to $\overline{AB}$ and $\overline{AC}$. If $BE=1$, $EF=24$, and $FC=3$, find the perimeter of $\triangle{ABC}$.
[i]Proposed by Ray Li[/i]
2020-21 IOQM India, 12
Given a pair of concentric circles, chords $AB,BC,CD,\dots$ of the outer circle are drawn such that they all touch the inner circle. If $\angle ABC = 75^{\circ}$, how many chords can be drawn before returning to the starting point ?
[img]https://i.imgur.com/Cg37vwa.png[/img]
2022 HMNT, 3
Alice is bored in class, so she thinks of a positive integer. Every second after that, she subtracts from her current number its smallest prime divisor, possibly itself. After 2022 seconds, she realizes that her number is prime. Find the sum of all possible values of her initial number.
2009 Ukraine National Mathematical Olympiad, 4
In the triangle $ABC$ given that $\angle ABC = 120^\circ .$ The bisector of $\angle B$ meet $AC$ at $M$ and external bisector of $\angle BCA$ meet $AB$ at $P.$ Segments $MP$ and $BC$ intersects at $K$. Prove that $\angle AKM = \angle KPC .$
2024 USAMO, 6
Let $n > 2$ be an integer and let $\ell \in \{1, 2,\dots, n\}$. A collection $A_1,\dots,A_k$ of (not necessarily distinct) subsets of $\{1, 2,\dots, n\}$ is called $\ell$-large if $|A_i| \ge \ell$ for all $1 \le i \le k$. Find, in terms of $n$ and $\ell$, the largest real number $c$ such that the inequality
\[ \sum_{i=1}^k\sum_{j=1}^k x_ix_j\frac{|A_i\cap A_j|^2}{|A_i|\cdot|A_j|}\ge c\left(\sum_{i=1}^k x_i\right)^2 \]
holds for all positive integer $k$, all nonnegative real numbers $x_1,x_2,\dots,x_k$, and all $\ell$-large collections $A_1,A_2,\dots,A_k$ of subsets of $\{1,2,\dots,n\}$.
[i]Proposed by Titu Andreescu and Gabriel Dospinescu[/i]
1973 Spain Mathematical Olympiad, 1
Given the sequence $(a_n)$, in which $a_n =\frac14 n^4 - 10n^2(n - 1)$, with $n = 0, 1, 2,...$ Determine the smallest term of the sequence.
2001 Tournament Of Towns, 5
Let $a$ and $d$ be positive integers. For any positive integer $n$, the number $a+nd$ contains a block of consecutive digits which constitute the number $n$. Prove that $d$ is a power of 10.
Durer Math Competition CD 1st Round - geometry, 2009.C3
We know the lengths of the $3$ altitudes of a triangle. Construct the triangle.
2005 China Team Selection Test, 3
Let $\alpha$ be given positive real number, find all the functions $f: N^{+} \rightarrow R$ such that $f(k + m) = f(k) + f(m)$ holds for any positive integers $k$, $m$ satisfying $\alpha m \leq k \leq (\alpha + 1)m$.
2001 National High School Mathematics League, 3
In four functions $y=\sin|x|,y=\cos|x|,y=|\cot x|,y=\lg|\sin x|$, which one is even function, and increases on $\left(0,\frac{\pi}{2}\right)$, with period of $\pi$?
$\text{(A)}y=\sin|x|\qquad\text{(B)}y=\cos|x|\qquad\text{(C)}y=|\cot x|\qquad\text{(D)}y=\lg|\sin x|$
2017 ELMO Shortlist, 3
Consider a finite binary string $b$ with at least $2017$ ones. Show that one can insert some plus signs in between pairs of digits such that the resulting sum, when performed in base $2$, is equal to a power of two.
[i]Proposed by David Stoner
1983 IMO Longlists, 14
Let $\ell$ be tangent to the circle $k$ at $B$. Let $A$ be a point on $k$ and $P$ the foot of perpendicular from $A$ to $\ell$. Let $M$ be symmetric to $P$ with respect to $AB$. Find the set of all such points $M.$
2017 Mexico National Olympiad, 5
On a circle $\Gamma$, points $A, B, N, C, D, M$ are chosen in a clockwise order in such a way that $N$ and $M$ are the midpoints of clockwise arcs $BC$ and $AD$ respectively. Let $P$ be the intersection of $AC$ and $BD$, and let $Q$ be a point on line $MB$ such that $PQ$ is perpendicular to $MN$. Point $R$ is chosen on segment $MC$ such that $QB = RC$, prove that the midpoint of $QR$ lies on $AC$.
1967 IMO Shortlist, 2
Prove this proposition: Center the sphere circumscribed around a tetrahedron which coincides with the center of a sphere inscribed in that tetrahedron if and only if the skew edges of the tetrahedron are equal.
2009 Kosovo National Mathematical Olympiad, 3
Let $a,b$ and $c$ be the sides of a triangle, prove that
$\frac {a}{b+c}+\frac {b}{c+a}+\frac {c}{a+b}<2$.
MathLinks Contest 3rd, 2
Let $a_1, a_2, ..., a_{2004}$ be integer numbers such that for all positive integers $n$ the number $A_n = a^n_1 + a^n_2 + ...+ a^n_{2004}$ is a perfect square. What is the minimal number of zeros within the $2004$ numbers?
2021 Israel TST, 4
Let $r$ be a positive integer and let $a_r$ be the number of solutions to the equation $3^x-2^y=r$ ,such that $0\leq x,y\leq 5781$ are integers. What is the maximal value of $a_r$?
2024 Iran MO (2nd Round), 1
Kimia has a weird clock; the clock's second hand moves 34 or 47 seconds forward instead of each regular second, at random. As an example, if the clock displays the time as $\text{12:23:05}$, the following times could be displayed in this order:
$$\text{12:23:39, 12:24:13, 12:25:00, 12:25:34, 12:26:21,\dots}$$
Prove that the clock's second hand would eventually land on a perfect square.
2013 Stanford Mathematics Tournament, 2
How many alphabetic sequences (that is, sequences containing only letters from $a\cdots z$) of length $2013$ have letters in alphabetic order?
2024 Bulgarian Winter Tournament, 9.1
Find all real $x, y$, satisfying $$(x+1)^2(y+1)^2=27xy$$ and $$(x^2+1)(y^2+1)=10xy.$$
PEN H Problems, 51
Prove that the product of five consecutive positive integers is never a perfect square.
1951 Moscow Mathematical Olympiad, 198
* On a plane, given points $A, B, C$ and angles $\angle D, \angle E, \angle F$ each less than $180^o$ and the sum equal to $360^o$, construct with the help of ruler and protractor a point $O$ such that $\angle AOB = \angle D, \angle BOC = \angle E$ and $\angle COA = \angle F.$