Art of Problem Solving
AoPS Online AoPS Online
Math texts, online classes, and more
for students in grades 5-12.
Visit AoPS Online
Books for Grades 5-12 Online Courses
Beast Academy Beast Academy
Engaging math books and online learning
for students ages 6-13.
Visit Beast Academy
Books for Ages 6-13 Beast Academy Online
AoPS Academy AoPS Academy
Small live classes for advanced math
and language arts learners in grades 1-12.
Visit AoPS Academy
Find a Physical Campus Visit the Virtual Campus

Stay ahead of learning milestones! Enroll in a class over the summer!
Counting and Probability
B
No tags match your search
M
G
Topic
First Poster
Last Poster
H
D860 : Flower domino and unconnected
Dattier   4
N 2 hours ago by Haris1
Source: les dattes à Dattier
Let G be a grid of size m*n.

We have 2 dominoes in flowers and not connected like here
IMAGE
Determine a necessary and sufficient condition on m and n, so that G can be covered with these 2 kinds of dominoes.

4 replies
Dattier
May 26, 2024
Haris1
2 hours ago
J
H
Equal Distances in an Isosceles Setting
mojyla222   3
N 3 hours ago by sami1618
Source: IDMC 2025 P4
Let $ABC$ be an isosceles triangle with $AB=AC$. The circle $\omega_1$, passing through $B$ and $C$, intersects segment $AB$ at $K\neq B$. The circle $\omega_2$ is tangent to $BC$ at $B$ and passes through $K$. Let $M$ and $N$ be the midpoints of segments $AB$ and $AC$, respectively. The line $MN$ intersects $\omega_1$ and $\omega_2$ at points $P$ and $Q$, respectively, where $P$ and $Q$ are the intersections closer to $M$. Prove that $MP=MQ$.

Proposed by Hooman Fattahi
3 replies
mojyla222
Yesterday at 5:05 AM
sami1618
3 hours ago
J
H
standard Q FE
jasperE3   1
N 3 hours ago by ErTeeEs06
Source: gghx, p19004309
Find all functions $f:\mathbb Q\to\mathbb Q$ such that for any $x,y\in\mathbb Q$:
$$f(xf(x)+f(x+2y))=f(x)^2+f(y)+y.$$
1 reply
jasperE3
Yesterday at 6:27 PM
ErTeeEs06
3 hours ago
J
H
Dear Sqing: So Many Inequalities...
hashtagmath   33
N 3 hours ago by GeoMorocco
I have noticed thousands upon thousands of inequalities that you have posted to HSO and was wondering where you get the inspiration, imagination, and even the validation that such inequalities are true? Also, what do you find particularly appealing and important about specifically inequalities rather than other branches of mathematics? Thank you :)
33 replies
hashtagmath
Oct 30, 2024
GeoMorocco
3 hours ago
J
H
3 knightlike moves is enough
sarjinius   1
N 3 hours ago by markam
Source: Philippine Mathematical Olympiad 2025 P6
An ant is on the Cartesian plane. In a single move, the ant selects a positive integer $k$, then either travels [list]
[*] $k$ units vertically (up or down) and $2k$ units horizontally (left or right); or
[*] $k$ units horizontally (left or right) and $2k$ units vertically (up or down).
[/list]
Thus, for any $k$, the ant can choose to go to one of eight possible points.
Prove that, for any integers $a$ and $b$, the ant can travel from $(0, 0)$ to $(a, b)$ using at most $3$ moves.
1 reply
sarjinius
Mar 9, 2025
markam
3 hours ago
J
H
Weird Geo
Anto0110   0
3 hours ago
In a trapezium $ABCD$, the sides $AB$ and $CD$ are parallel and the angles $\angle ABC$ and $\angle BAD$ are acute. Show that it is possible to divide the triangle $ABC$ into 4 disjoint triangle $X_1. . . , X_4$ and the triangle $ABD$ into 4 disjoint triangles $Y_1,. . . , Y_4$ such that the triangles $X_i$ and $Y_i$ are congruent for all $i$.
0 replies
Anto0110
3 hours ago
0 replies
J
H
Is the geometric function injective?
Project_Donkey_into_M4   1
N 3 hours ago by Funcshun840
Source: Mock RMO TDP and Kayak 2018, P3
A non-degenerate triangle $\Delta ABC$ is given in the plane, let $S$ be the set of points which lie strictly inside it. Also let $\mathfrak{C}$ be the set of circles in the plane. For a point $P \in S$, let $A_P, B_P, C_P$ be the reflection of $P$ in sides $\overline{BC}, \overline{CA}, \overline{AB}$ respectively. Define a function $\omega: S \rightarrow \mathfrak{C}$ such that $\omega(P)$ is the circumcircle of $A_PB_PC_P$. Is $\omega$ injective?

Note: The function $\omega$ is called injective if for any $P, Q \in S$, $\omega(P) = \omega(Q) \Leftrightarrow P = Q$
1 reply
Project_Donkey_into_M4
Yesterday at 6:23 PM
Funcshun840
3 hours ago
J
H
numbers at vertices of triangle / tetrahedron, consecutive and gcd related
parmenides51   1
N 4 hours ago by TheBaiano
Source: 2022 May Olympiad L2 p4
a) A positive integer is written at each vertex of a triangle. Then on each side of the triangle the greatest common divisor of its ends is written. It is possible that the numbers written on the sides be three consecutive integers, in some order?
b) A positive integer is written at each vertex of a tetrahedron. Then, on each edge of the tetrahedron is written the greatest common divisor of its ends . It is possible that the numbers written in the edges are six consecutive integers, in some order?
1 reply
parmenides51
Sep 4, 2022
TheBaiano
4 hours ago
J
H
red squares in a 7x7 board
parmenides51   2
N 4 hours ago by TheBaiano
Source: 2022 May Olympiad L2 p1
In a $7\times7$ board, some squares are painted red. Let $a$ be the number of rows that have an odd number of red squares and let $b$ be the number of columns that have an odd number of red squares. Find all possible values of $a+b$. For each value found, give a example of how the board can be painted.
2 replies
parmenides51
Sep 4, 2022
TheBaiano
4 hours ago
J
H
winning strategy, vertices of regular n-gon
parmenides51   1
N 4 hours ago by TheBaiano
Source: 2022 May Olympiad L2 p5
The vertices of a regular polygon with $N$ sides are marked on the blackboard. Ana and Beto play alternately, Ana begins. Each player, in turn, must do the following:
$\bullet$ join two vertices with a segment, without cutting another already marked segment; or
$\bullet$ delete a vertex that does not belong to any marked segment.
The player who cannot take any action on his turn loses the game. Determine which of the two players can guarantee victory:
a) if $N=28$
b) if $N=29$
1 reply
parmenides51
Sep 4, 2022
TheBaiano
4 hours ago
J
a