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k a April Highlights and 2025 AoPS Online Class Information
jlacosta   0
Apr 2, 2025
Spring is in full swing and summer is right around the corner, what are your plans? At AoPS Online our schedule has new classes starting now through July, so be sure to keep your skills sharp and be prepared for the Fall school year! Check out the schedule of upcoming classes below.

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[list][*]April 3rd (Webinar), 4pm PT/7:00pm ET, Learning with AoPS: Perspectives from a Parent, Math Camp Instructor, and University Professor
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[*]April 22nd (Webinar), 4:00pm PT/7:00pm ET, Competitive Programming at AoPS (USACO).[/list]
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0 replies
jlacosta
Apr 2, 2025
0 replies
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d | \overline{aabbcc} iff d | \overline{abc} where d is two digit number
parmenides51   1
N a minute ago by luphuc
Source: Czech-Polish-Slovak Junior Match 2013, Individual p4 CPSJ
Determine the largest two-digit number $d$ with the following property:
for any six-digit number $\overline{aabbcc}$ number $d$ is a divisor of the number $\overline{aabbcc}$ if and only if the number $d$ is a divisor of the corresponding three-digit number $\overline{abc}$.

Note The numbers $a \ne 0, b$ and $c$ need not be different.
1 reply
parmenides51
Mar 14, 2020
luphuc
a minute ago
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Hard inequality
JK1603JK   1
N 27 minutes ago by xytunghoanh
Source: unknown?
Let $a,b,c>0$ and $a^2+b^2+c^2=2(a+b+c).$ Find the minimum $$P=(a+b+c)\left(\frac{1}{a}+\frac{1}{b}+\frac{1}{c}\right)$$
1 reply
JK1603JK
2 hours ago
xytunghoanh
27 minutes ago
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Functional Equation
JSGandora   13
N 38 minutes ago by ray66
Source: 2006 Red MOP Homework Algebra 1.2
Find all functions $f:\mathbb{R}\rightarrow \mathbb{R}$ satisfying
\[f(x+f(y))=x+f(f(y))\]
for all real numbers $x$ and $y$, with the additional constraint $f(2004)=2005$.
13 replies
JSGandora
Mar 17, 2013
ray66
38 minutes ago
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Impossible divisibility
pohoatza   35
N 44 minutes ago by cursed_tangent1434
Source: Romanian TST 3 2008, Problem 3
Let $ m,\ n \geq 3$ be positive odd integers. Prove that $ 2^{m}-1$ doesn't divide $ 3^{n}-1$.
35 replies
pohoatza
Jun 7, 2008
cursed_tangent1434
44 minutes ago
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Problem 2 of First round
Pinko   4
N Aug 19, 2019 by Pluto1708
Source: VIII International Festival of Young Mathematicians Sozopol 2017, Theme for 10-12 grade
Point $F$ lies on the circumscribed circle around $\Delta ABC$, $P$ and $Q$ are projections of point $F$ on $AB$ and $AC$ respectively. Prove that, if $M$ and $N$ are the middle points of $BC$ and $PQ$ respectively, then $MN$ is perpendicular to $FN$.
4 replies
Pinko
Aug 18, 2019
Pluto1708
Aug 19, 2019
J
Problem 2 of First round
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Reveal topic tags
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Source: VIII International Festival of Young Mathematicians Sozopol 2017, Theme for 10-12 grade
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Pinko
437 posts
Pinko
#1 Aug 18, 2019, 5:20 PM • 2 Y
Y by Adventure10, Mango247
Point $F$ lies on the circumscribed circle around $\Delta ABC$, $P$ and $Q$ are projections of point $F$ on $AB$ and $AC$ respectively. Prove that, if $M$ and $N$ are the middle points of $BC$ and $PQ$ respectively, then $MN$ is perpendicular to $FN$.
Z K Y
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zuss77
520 posts
zuss77
#2 Aug 19, 2019, 10:42 AM • 3 Y
Y by Pinko, Adventure10, Mango247
$\angle PBF = \angle ACF$ , $\triangle FPB \sim \triangle FQC$. By Gliding principle $\triangle FNM$ is also similar to them. So $\angle FNM = \angle FPB = 90^\circ$.

BTW, is there a page for this contest on AoPS?
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UzbekMathematician
141 posts
UzbekMathematician
#3 Aug 19, 2019, 2:17 PM • 5 Y
Y by MisterJ, Adventure10, Mango247, Mango247, Mango247
$K $ is projection of point $F $ on $AB $ and $AC $. $P, Q $ and $K $ colinear, by Simson line.
$PAQF $-cyclic. $\angle FPQ=\angle FAQ=\angle FBC$, $\angle BFC=\angle BAC=\angle PFQ$ $\implies$
$\triangle PFQ \sim \triangle BFC $ and $FN $, $FM $ are median of $\triangle PFQ$, $\triangle BFC $ , respectively.
Since, $\angle FNK= \angle FMK $, so $FNMK $-cyclic. Therefore, $\angle FNM=\angle FKM=90^{\circ}$
This post has been edited 1 time. Last edited by UzbekMathematician, Aug 19, 2019, 2:17 PM
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Pinko
437 posts
Pinko
#4 Aug 19, 2019, 5:25 PM • 2 Y
Y by Adventure10, Mango247
zuss77 wrote:

...BTW, is there a page for this contest on AoPS?
zuss77, yes there is. I will soon add more editions from previous years to AOPS. It's under National and Regional Contests -> Bulgaria Contests -> Int'l Fest. of Young Mathematicians, Sozopol. The competition is held in Bulgaria annually and it is also open for international participation.
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Pluto1708
1107 posts
Pluto1708
#5 Aug 19, 2019, 5:28 PM • 1 Y
Y by Adventure10
Pinko wrote:
Point $F$ lies on the circumscribed circle around $\Delta ABC$, $P$ and $Q$ are projections of point $F$ on $AB$ and $AC$ respectively. Prove that, if $M$ and $N$ are the middle points of $BC$ and $PQ$ respectively, then $MN$ is perpendicular to $FN$.
Baltic Way 2007
This post has been edited 1 time. Last edited by Pluto1708, Aug 19, 2019, 5:29 PM
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