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Art of Problem Solving

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inequality

danilorj 0

2 hours ago

Let $a, b, c$ be nonnegative real numbers such that $a + b + c = 3$ . Prove that
$\frac{a}{4 - b} + \frac{b}{4 - c} + \frac{c}{4 - a} + \frac{1}{16}(1 - a)^2(1 - b)^2(1 - c)^2 \leq 1,$ and determine all such triples $(a, b, c)$ where the equality holds.

0 replies

danilorj

2 hours ago

0 replies

P,Q,B are collinear

MNJ2357 28

N 2 hours ago by Ilikeminecraft

Source: 2020 Korea National Olympiad P2

$H$ is the orthocenter of an acute triangle $ABC$ , and let $M$ be the midpoint of $BC$ . Suppose $(AH)$ meets $AB$ and $AC$ at $D,E$ respectively. $AH$ meets $DE$ at $P$ , and the line through $H$ perpendicular to $AH$ meets $DM$ at $Q$ . Prove that $P,Q,B$ are collinear.

28 replies

MNJ2357

Nov 21, 2020

Ilikeminecraft

2 hours ago

Chinese Girls Mathematical Olympiad 2017, Problem 7

Hermitianism 45

N 3 hours ago by Ilikeminecraft

Source: Chinese Girls Mathematical Olympiad 2017, Problem 7

This is a very classical problem.
Let the $ABCD$ be a cyclic quadrilateral with circumcircle $\omega_1$ .Lines $AC$ and $BD$ intersect at point $E$ ,and lines $AD$ , $BC$ intersect at point $F$ .Circle $\omega_2$ is tangent to segments $EB,EC$ at points $M,N$ respectively,and intersects with circle $\omega_1$ at points $Q,R$ .Lines $BC,AD$ intersect line $MN$ at $S,T$ respectively.Show that $Q,R,S,T$ are concyclic.

45 replies

Hermitianism

Aug 16, 2017

Ilikeminecraft

3 hours ago

D1031 : A general result on polynomial 1

Dattier 1

N 3 hours ago by Dattier

Source: les dattes à Dattier

Let $P(x,y) \in \mathbb Q(x,y)$ with $\forall (a,b) \in \mathbb Z^2, P(a,b) \in \mathbb Z$ .

Is it true that $P(x,y) \in \mathbb Q[x,y]$ ?

1 reply

Dattier

6 hours ago

Dattier

3 hours ago

Asymmetric FE

sman96 18

N 3 hours ago by jasperE3

Source: BdMO 2025 Higher Secondary P8

Find all functions $f: \mathbb{R} \to \mathbb{R}$ such that $f(xf(y)-y) + f(xy-x) + f(x+y) = 2xy$ for all $x, y \in \mathbb{R}$ .

18 replies

sman96

Feb 8, 2025

jasperE3

3 hours ago

Easy Geometry

pokmui9909 6

N 3 hours ago by reni_wee

Source: FKMO 2025 P4

Triangle $ABC$ satisfies $\overline{CA} > \overline{AB}$ . Let the incenter of triangle $ABC$ be $\omega$ , which touches $BC, CA, AB$ at $D, E, F$ , respectively. Let $M$ be the midpoint of $BC$ . Let the circle centered at $M$ passing through $D$ intersect $DE, DF$ at $P(\neq D), Q(\neq D)$ , respecively. Let line $AP$ meet $BC$ at $N$ , line $BP$ meet $CA$ at $L$ . Prove that the three lines $EQ, FP, NL$ are concurrent.

6 replies

pokmui9909

Mar 30, 2025

reni_wee

3 hours ago

Old hard problem

ItzsleepyXD 3

N 3 hours ago by Funcshun840

Source: IDK

Let $ABC$ be a triangle and let $O$ be its circumcenter and $I$ its incenter.
Let $P$ be the radical center of its three mixtilinears and let $Q$ be the isogonal conjugate of $P$ .
Let $G$ be the Gergonne point of the triangle $ABC$ .
Prove that line $QG$ is parallel with line $OI$ .

3 replies

ItzsleepyXD

Apr 25, 2025

Funcshun840

3 hours ago

\frac{2^{n!}-1}{2^n-1} be a square

AlperenINAN 10

N 4 hours ago by Nuran2010

Source: Turkey JBMO TST 2024 P5

Find all positive integer values of $n$ such that the value of the
$\frac{2^{n!}-1}{2^n-1}$ is a square of an integer.

10 replies

AlperenINAN

May 13, 2024

Nuran2010

4 hours ago

Beautiful Angle Sum Property in Hexagon with Incenter

Raufrahim68 0

4 hours ago

Hello everyone! I discovered an interesting geometric property and would like to share it with the community. I'm curious if this is a known result and whether it can be generalized.

Problem Statement:
Let
A
B
C
D
E
K
ABCDEK be a convex hexagon with an incircle centered at
O
O. Prove that:

∠
A
O
B
+
∠
C
O
D
+
∠
E
O
K
=
180
∘
∠AOB+∠COD+∠EOK=180
∘

0 replies

Raufrahim68

4 hours ago

0 replies

Anything real in this system must be integer

Assassino9931 7

N 4 hours ago by Leman_Nabiyeva

Source: Al-Khwarizmi International Junior Olympiad 2025 P1

Determine the largest integer $c$ for which the following statement holds: there exists at least one triple $(x,y,z)$ of integers such that
$\begin{align*} x^2 + 4(y + z) = y^2 + 4(z + x) = z^2 + 4(x + y) = c \end{align*}$ and all triples $(x,y,z)$ of real numbers, satisfying the equations, are such that $x,y,z$ are integers.

Marek Maruin, Slovakia

7 replies

Assassino9931

May 9, 2025

Leman_Nabiyeva

4 hours ago

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