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H
k a My Retirement & New Leadership at AoPS
rrusczyk   1571
N Mar 26, 2025 by SmartGroot
I write today to announce my retirement as CEO from Art of Problem Solving. When I founded AoPS 22 years ago, I never imagined that we would reach so many students and families, or that we would find so many channels through which we discover, inspire, and train the great problem solvers of the next generation. I am very proud of all we have accomplished and I’m thankful for the many supporters who provided inspiration and encouragement along the way. I'm particularly grateful to all of the wonderful members of the AoPS Community!

I’m delighted to introduce our new leaders - Ben Kornell and Andrew Sutherland. Ben has extensive experience in education and edtech prior to joining AoPS as my successor as CEO, including starting like I did as a classroom teacher. He has a deep understanding of the value of our work because he’s an AoPS parent! Meanwhile, Andrew and I have common roots as founders of education companies; he launched Quizlet at age 15! His journey from founder to MIT to technology and product leader as our Chief Product Officer traces a pathway many of our students will follow in the years to come.

Thank you again for your support for Art of Problem Solving and we look forward to working with millions more wonderful problem solvers in the years to come.

And special thanks to all of the amazing AoPS team members who have helped build AoPS. We’ve come a long way from here:IMAGE
1571 replies
rrusczyk
Mar 24, 2025
SmartGroot
Mar 26, 2025
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k a March Highlights and 2025 AoPS Online Class Information
jlacosta   0
Mar 2, 2025
March is the month for State MATHCOUNTS competitions! Kudos to everyone who participated in their local chapter competitions and best of luck to all going to State! Join us on March 11th for a Math Jam devoted to our favorite Chapter competition problems! Are you interested in training for MATHCOUNTS? Be sure to check out our AMC 8/MATHCOUNTS Basics and Advanced courses.

Are you ready to level up with Olympiad training? Registration is open with early bird pricing available for our WOOT programs: MathWOOT (Levels 1 and 2), CodeWOOT, PhysicsWOOT, and ChemWOOT. What is WOOT? WOOT stands for Worldwide Online Olympiad Training and is a 7-month high school math Olympiad preparation and testing program that brings together many of the best students from around the world to learn Olympiad problem solving skills. Classes begin in September!

Do you have plans this summer? There are so many options to fit your schedule and goals whether attending a summer camp or taking online classes, it can be a great break from the routine of the school year. Check out our summer courses at AoPS Online, or if you want a math or language arts class that doesn’t have homework, but is an enriching summer experience, our AoPS Virtual Campus summer camps may be just the ticket! We are expanding our locations for our AoPS Academies across the country with 15 locations so far and new campuses opening in Saratoga CA, Johns Creek GA, and the Upper West Side NY. Check out this page for summer camp information.

Be sure to mark your calendars for the following events:
[list][*]March 5th (Wednesday), 4:30pm PT/7:30pm ET, HCSSiM Math Jam 2025. Amber Verser, Assistant Director of the Hampshire College Summer Studies in Mathematics, will host an information session about HCSSiM, a summer program for high school students.
[*]March 6th (Thursday), 4:00pm PT/7:00pm ET, Free Webinar on Math Competitions from elementary through high school. Join us for an enlightening session that demystifies the world of math competitions and helps you make informed decisions about your contest journey.
[*]March 11th (Tuesday), 4:30pm PT/7:30pm ET, 2025 MATHCOUNTS Chapter Discussion MATH JAM. AoPS instructors will discuss some of their favorite problems from the MATHCOUNTS Chapter Competition. All are welcome!
[*]March 13th (Thursday), 4:00pm PT/7:00pm ET, Free Webinar about Summer Camps at the Virtual Campus. Transform your summer into an unforgettable learning adventure! From elementary through high school, we offer dynamic summer camps featuring topics in mathematics, language arts, and competition preparation - all designed to fit your schedule and ignite your passion for learning.[/list]
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0 replies
jlacosta
Mar 2, 2025
0 replies
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k i Adding contests to the Contest Collections
dcouchman   1
N Apr 5, 2023 by v_Enhance
Want to help AoPS remain a valuable Olympiad resource? Help us add contests to AoPS's Contest Collections.

Find instructions and a list of contests to add here: https://artofproblemsolving.com/community/c40244h1064480_contests_to_add
1 reply
dcouchman
Sep 9, 2019
v_Enhance
Apr 5, 2023
J
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k i Zero tolerance
ZetaX   49
N May 4, 2019 by NoDealsHere
Source: Use your common sense! (enough is enough)
Some users don't want to learn, some other simply ignore advises.
But please follow the following guideline:


To make it short: ALWAYS USE YOUR COMMON SENSE IF POSTING!
If you don't have common sense, don't post.


More specifically:

For new threads:


a) Good, meaningful title:
The title has to say what the problem is about in best way possible.
If that title occured already, it's definitely bad. And contest names aren't good either.
That's in fact a requirement for being able to search old problems.

Examples:
Bad titles:
- "Hard"/"Medium"/"Easy" (if you find it so cool how hard/easy it is, tell it in the post and use a title that tells us the problem)
- "Number Theory" (hey guy, guess why this forum's named that way¿ and is it the only such problem on earth¿)
- "Fibonacci" (there are millions of Fibonacci problems out there, all posted and named the same...)
- "Chinese TST 2003" (does this say anything about the problem¿)
Good titles:
- "On divisors of a³+2b³+4c³-6abc"
- "Number of solutions to x²+y²=6z²"
- "Fibonacci numbers are never squares"


b) Use search function:
Before posting a "new" problem spend at least two, better five, minutes to look if this problem was posted before. If it was, don't repost it. If you have anything important to say on topic, post it in one of the older threads.
If the thread is locked cause of this, use search function.

Update (by Amir Hossein). The best way to search for two keywords in AoPS is to input
[code]+"first keyword" +"second keyword"[/code]
so that any post containing both strings "first word" and "second form".


c) Good problem statement:
Some recent really bad post was:
[quote]$lim_{n\to 1}^{+\infty}\frac{1}{n}-lnn$[/quote]
It contains no question and no answer.
If you do this, too, you are on the best way to get your thread deleted. Write everything clearly, define where your variables come from (and define the "natural" numbers if used). Additionally read your post at least twice before submitting. After you sent it, read it again and use the Edit-Button if necessary to correct errors.


For answers to already existing threads:


d) Of any interest and with content:
Don't post things that are more trivial than completely obvious. For example, if the question is to solve $x^{3}+y^{3}=z^{3}$, do not answer with "$x=y=z=0$ is a solution" only. Either you post any kind of proof or at least something unexpected (like "$x=1337, y=481, z=42$ is the smallest solution). Someone that does not see that $x=y=z=0$ is a solution of the above without your post is completely wrong here, this is an IMO-level forum.
Similar, posting "I have solved this problem" but not posting anything else is not welcome; it even looks that you just want to show off what a genius you are.

e) Well written and checked answers:
Like c) for new threads, check your solutions at least twice for mistakes. And after sending, read it again and use the Edit-Button if necessary to correct errors.



To repeat it: ALWAYS USE YOUR COMMON SENSE IF POSTING!


Everything definitely out of range of common sense will be locked or deleted (exept for new users having less than about 42 posts, they are newbies and need/get some time to learn).

The above rules will be applied from next monday (5. march of 2007).
Feel free to discuss on this here.
49 replies
ZetaX
Feb 27, 2007
NoDealsHere
May 4, 2019
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a+b+c=1
cadiTM   23
N 28 minutes ago by Marcus_Zhang
Source: Korea Final Round 2011
Find the maximal value of the following expression, if $a,b,c$ are nonnegative and $a+b+c=1$.
\[ \frac{1}{a^2 -4a+9} + \frac {1}{b^2 -4b+9} + \frac{1}{c^2 -4c+9} \]
23 replies
+1 w
cadiTM
Aug 28, 2012
Marcus_Zhang
28 minutes ago
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Line passes through a fixed point
math154   55
N 36 minutes ago by shendrew7
Source: USA December TST for IMO 2014, Problem 1
Let $ABC$ be an acute triangle, and let $X$ be a variable interior point on the minor arc $BC$ of its circumcircle. Let $P$ and $Q$ be the feet of the perpendiculars from $X$ to lines $CA$ and $CB$, respectively. Let $R$ be the intersection of line $PQ$ and the perpendicular from $B$ to $AC$. Let $\ell$ be the line through $P$ parallel to $XR$. Prove that as $X$ varies along minor arc $BC$, the line $\ell$ always passes through a fixed point. (Specifically: prove that there is a point $F$, determined by triangle $ABC$, such that no matter where $X$ is on arc $BC$, line $\ell$ passes through $F$.)

Robert Simson et al.
55 replies
math154
Dec 24, 2013
shendrew7
36 minutes ago
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GEOMETRY GEOMETRY GEOMETRY
Kagebaka   70
N 38 minutes ago by EeEeRUT
Source: IMO 2021/3
Let $D$ be an interior point of the acute triangle $ABC$ with $AB > AC$ so that $\angle DAB = \angle CAD.$ The point $E$ on the segment $AC$ satisfies $\angle ADE =\angle BCD,$ the point $F$ on the segment $AB$ satisfies $\angle FDA =\angle DBC,$ and the point $X$ on the line $AC$ satisfies $CX = BX.$ Let $O_1$ and $O_2$ be the circumcenters of the triangles $ADC$ and $EXD,$ respectively. Prove that the lines $BC, EF,$ and $O_1O_2$ are concurrent.
70 replies
1 viewing
Kagebaka
Jul 20, 2021
EeEeRUT
38 minutes ago
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2021 ELMO Problem 1
reaganchoi   69
N 43 minutes ago by Giant_PT
In $\triangle ABC$, points $P$ and $Q$ lie on sides $AB$ and $AC$, respectively, such that the circumcircle of $\triangle APQ$ is tangent to $BC$ at $D$. Let $E$ lie on side $BC$ such that $BD = EC$. Line $DP$ intersects the circumcircle of $\triangle CDQ$ again at $X$, and line $DQ$ intersects the circumcircle of $\triangle BDP$ again at $Y$. Prove that $D$, $E$, $X$, and $Y$ are concyclic.
69 replies
+1 w
reaganchoi
Jun 24, 2021
Giant_PT
43 minutes ago
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a+b+c=3 inequality
Zuyong   0
an hour ago
Source: ??
Let $a,b,c\in R: a+b+c=3$ and find the maximum $$P=\frac{1}{a^2+3}+\frac{1}{b^2+3}+\frac{1}{c^2+3}$$
0 replies
Zuyong
an hour ago
0 replies
J
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set with c+2a>3b
VicKmath7   47
N an hour ago by mananaban
Source: ISL 2021 A1
Let $n$ be a positive integer. Given is a subset $A$ of $\{0,1,...,5^n\}$ with $4n+2$ elements. Prove that there exist three elements $a<b<c$ from $A$ such that $c+2a>3b$.

Proposed by Dominik Burek and Tomasz Ciesla, Poland
47 replies
VicKmath7
Jul 12, 2022
mananaban
an hour ago
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Showing properties about subsets of positive integers.
Functional   41
N 2 hours ago by maromex
Source: IMO 2018 Shortlist A3
Given any set $S$ of positive integers, show that at least one of the following two assertions holds:

(1) There exist distinct finite subsets $F$ and $G$ of $S$ such that $\sum_{x\in F}1/x=\sum_{x\in G}1/x$;

(2) There exists a positive rational number $r<1$ such that $\sum_{x\in F}1/x\neq r$ for all finite subsets $F$ of $S$.
41 replies
+1 w
Functional
Jul 17, 2019
maromex
2 hours ago
J
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Very Nice Polynomial Reducibility
Seungjun_Lee   6
N 2 hours ago by analysis90
Source: 2025 Korea Winter Program Practice Test P8
Determine all triplets of positive integers $(p,m,n)$ such that $p$ is a prime, $m \neq n < 2p$ and $2 \nmid n$. Also, the following polynomial is reducible in $\mathbb{Z}[x]$
$$x^{2p} - 2px^m - p^2x^n - 1$$
6 replies
Seungjun_Lee
Jan 19, 2025
analysis90
2 hours ago
J
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Japan 1997 inequality
hxtung   76
N 2 hours ago by Marcus_Zhang
Source: Japan MO 1997, problem #2
Prove that

$ \frac{\left(b+c-a\right)^{2}}{\left(b+c\right)^{2}+a^{2}}+\frac{\left(c+a-b\right)^{2}}{\left(c+a\right)^{2}+b^{2}}+\frac{\left(a+b-c\right)^{2}}{\left(a+b\right)^{2}+c^{2}}\geq\frac35$

for any positive real numbers $ a$, $ b$, $ c$.
76 replies
hxtung
Jul 27, 2003
Marcus_Zhang
2 hours ago
J
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f(x+y)f(z)=f(xz)+f(yz)
dangerousliri   29
N 2 hours ago by jasperE3
Source: Own
Find all functions $f:\mathbb{R}\rightarrow\mathbb{R}$ such that for all irrational numbers $x, y$ and $z$,
$$f(x+y)f(z)=f(xz)+f(yz)$$
Some stories about this problem. This problem it is proposed by me (Dorlir Ahmeti) and Valmir Krasniqi. We did proposed this problem for IMO twice, on 2018 and on 2019 from Kosovo. None of these years it wasn't accepted and I was very surprised that it wasn't selected at least for shortlist since I think it has a very good potential. Anyway I hope you will like the problem and you are welcomed to give your thoughts about the problem if it did worth to put on shortlist or not.
29 replies
dangerousliri
Jun 25, 2020
jasperE3
2 hours ago
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Cyclic sum of 1/((3-c)(4-c))
v_Enhance   20
N 2 hours ago by Marcus_Zhang
Source: ELMO Shortlist 2013: Problem A6, by David Stoner
Let $a, b, c$ be positive reals such that $a+b+c=3$. Prove that \[18\sum_{\text{cyc}}\frac{1}{(3-c)(4-c)}+2(ab+bc+ca)\ge 15. \]Proposed by David Stoner
20 replies
v_Enhance
Jul 23, 2013
Marcus_Zhang
2 hours ago
J
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fraction sum
miiirz30   3
N 2 hours ago by KAME06
Source: 2025 Euler Olympiad, Round 1
Evaluate the following sum:
$$ \frac{1}{1} + \frac{1}{1 + 2} + \frac{1}{1 + 2 + 3} + \frac{1}{1 + 2 + 3 + 4} + \ldots + \frac{1}{1 + 2 + 3 + 4 + \dots + 2025} $$
Proposed by Prudencio Guerrero Fernández
3 replies
miiirz30
Yesterday at 5:52 PM
KAME06
2 hours ago
J
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Hard Combi Geo
AbbyWong   1
N 3 hours ago by AbbyWong
Source: Unknown
A (possibly non-convex) planar polygon P is good if no two sides of P are parallel.
For any good polygon P, we may take any three sides of P and extend them into lines. These lines
intersect to form a triangle. Such a triangle is called a peritriangle of P. Let f(P) denote the minimal
number of peritriangles of P whose union completely cover P.
For each positive integer n, find all possible values of f(P) as P ranges over all good n-gons.
1 reply
AbbyWong
Sunday at 11:03 PM
AbbyWong
3 hours ago
J
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minimum sum
miiirz30   5
N 3 hours ago by megarnie
Source: 2025 Euler Olympiad, Round 1
Find the minimum value of $m + n$, where $m$ and $n$ are positive integers satisfying:

$2023 \vert m + 2025n$
$2025 \vert m + 2023n$

Proposed by Prudencio Guerrero Fernández
5 replies
miiirz30
Yesterday at 6:19 PM
megarnie
3 hours ago
J
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J
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Inspired by old results
sqing   7
N Yesterday at 3:25 AM by sqing
Source: Own
Let $ a,b,c > 0 $ and $ a+b+c +abc =4. $ Prove that
$$ a^2 + b^2 + c^2 + 3 \geq 2( ab+bc + ca )$$Let $ a,b,c > 0 $ and $ ab+bc+ca+abc=4. $ Prove that
$$ a^2 + b^2 + c^2 + 2abc \geq 5$$
7 replies
sqing
Mar 27, 2025
sqing
Yesterday at 3:25 AM
J
Inspired by old results
G H J
Reveal topic tags
inequalities proposed
algebra
inequalities
L
G H BBookmark kLocked kLocked NReply
Source: Own
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sqing
41348 posts
sqing
#1 Mar 27, 2025, 12:35 PM
Y by
Let $ a,b,c > 0 $ and $ a+b+c +abc =4. $ Prove that
$$ a^2 + b^2 + c^2 + 3 \geq 2( ab+bc + ca )$$Let $ a,b,c > 0 $ and $ ab+bc+ca+abc=4. $ Prove that
$$ a^2 + b^2 + c^2 + 2abc \geq 5$$
This post has been edited 1 time. Last edited by sqing, Mar 27, 2025, 12:44 PM
Z K Y
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sqing
41348 posts
sqing
#2 Mar 27, 2025, 12:47 PM
Y by
Let $ a,b,c > 0 $ and $a^2+b^2+c^2+abc =4. $ Prove that
$$ a+b+c + 3 \geq 2( ab+bc + ca )$$Let $ a,b,c > 0 $ and $ a^2+b^2+c^2+abc=4. $ Prove that
$$ ab+bc+ca+3 \leq 2(a+b+c )$$
Z K Y
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MathsII-enjoy
10 posts
MathsII-enjoy
#3 Mar 27, 2025, 3:40 PM
Y by
sqing wrote:
Let $ a,b,c > 0 $ and $ a+b+c +abc =4. $ Prove that
$$ a^2 + b^2 + c^2 + 3 \geq 2( ab+bc + ca )$$
:D
Attachments:
This post has been edited 1 time. Last edited by MathsII-enjoy, Mar 27, 2025, 3:41 PM
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sqing
41348 posts
sqing
#4 Mar 28, 2025, 2:54 AM
Y by
Thanks.
Let $ a,b,c > 0 $ and $ a+b+c =3abc . $ Prove that
$$ a^2 + b^2 + c^2 + 3 \geq 2( ab+bc + ca )$$Let $ a,b,c > 0 $ and $ a^2+b^2+c^2+1=4a^2b^2c^2 . $ Prove that
$$ a^2 + b^2 + c^2 + 3 \geq 2( ab+bc + ca )$$Let $ a,b,c >0 $ and $ abc=1$. Prove that
$$a^2+b^2+c^2 +3 \geq 2(ab+bc+ca)$$Let $ x,y,z>0 $and $ x^2+y^2+z^2+3=2(xy+yz+zx) . $ Show that
$$ \sqrt{xy}+\sqrt{yz}+\sqrt{zx}\ge 3 $$Let $ x,y,z>0 $and $x^2+y^2+z^2+3 \le 2(xy+yz+zx)$. Prove that
$$(x^4+y)(y^4+z)(z^4+x) \ge (x+y^2)(y+z^2)(z+x^2)$$
This post has been edited 1 time. Last edited by sqing, Mar 29, 2025, 3:10 AM
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SUN8691
28 posts
SUN8691
#5 Mar 28, 2025, 1:03 PM
Y by
Can you prove this inequality ?

Let a,b,c ≥ 0 real numbers with ab+bc+ca ≤4. Prove that a+b+c+3 ≥ 2(√ab + √bc + √ca )
This post has been edited 1 time. Last edited by SUN8691, Mar 28, 2025, 1:04 PM
Reason: Mistake
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MathsII-enjoy
10 posts
MathsII-enjoy
#6 Sunday at 4:08 AM
Y by
SUN8691 wrote:
Can you prove this inequality ?

Let a,b,c ≥ 0 real numbers with ab+bc+ca ≤4. Prove that a+b+c+3 ≥ 2(√ab + √bc + √ca )

That inequality holds on what a, b, c ? I can't find it :(
Z K Y
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MathsII-enjoy
10 posts
MathsII-enjoy
#7 Sunday at 3:05 PM
Y by
Let $ x,y,z>0 $ and $ x^2+y^2+z^2+3=2(xy+yz+zx) .$ Provethat:$ $ $ \sqrt{xy}+\sqrt{yz}+\sqrt{zx}\ge 3 $
Attachments:
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sqing
41348 posts
sqing
#9 Yesterday at 3:25 AM
Y by
Thanks.
Z K Y
N Quick Reply
G
H
=
a