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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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0 replies
1 viewing
jlacosta
Apr 2, 2025
0 replies
J
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k i Suggestion Form
jwelsh   0
May 6, 2021
Hello!

Given the number of suggestions we’ve been receiving, we’re transitioning to a suggestion form. If you have a suggestion for the AoPS website, please submit the Google Form:
Suggestion Form

To keep all new suggestions together, any new suggestion threads posted will be deleted.

Please remember that if you find a bug outside of FTW! (after refreshing to make sure it’s not a glitch), make sure you’re following the How to write a bug report instructions and using the proper format to report the bug.

Please check the FTW! thread for bugs and post any new ones in the For the Win! and Other Games Support Forum.
0 replies
jwelsh
May 6, 2021
0 replies
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k i Read me first / How to write a bug report
slester   3
N May 4, 2019 by LauraZed
Greetings, AoPS users!

If you're reading this post, that means you've come across some kind of bug, error, or misbehavior, which nobody likes! To help us developers solve the problem as quickly as possible, we need enough information to understand what happened. Following these guidelines will help us squash those bugs more effectively.

Before submitting a bug report, please confirm the issue exists in other browsers or other computers if you have access to them.

For a list of many common questions and issues, please see our user created FAQ, Community FAQ, or For the Win! FAQ.

What is a bug?
A bug is a misbehavior that is reproducible. If a refresh makes it go away 100% of the time, then it isn't a bug, but rather a glitch. That's when your browser has some strange file cached, or for some reason doesn't render the page like it should. Please don't report glitches, since we generally cannot fix them. A glitch that happens more than a few times, though, could be an intermittent bug.

If something is wrong in the wiki, you can change it! The AoPS Wiki is user-editable, and it may be defaced from time to time. You can revert these changes yourself, but if you notice a particular user defacing the wiki, please let an admin know.

The subject
The subject line should explain as clearly as possible what went wrong.

Bad: Forum doesn't work
Good: Switching between threads quickly shows blank page.

The report
Use this format to report bugs. Be as specific as possible. If you don't know the answer exactly, give us as much information as you know. Attaching a screenshot is helpful if you can take one.

Summary of the problem:
Page URL:
Steps to reproduce:
1.
2.
3.
...
Expected behavior:
Frequency:
Operating system(s):
Browser(s), including version:
Additional information:

If your computer or tablet is school issued, please indicate this under Additional information.

Example
Summary of the problem: When I click back and forth between two threads in the site support section, the content of the threads no longer show up. (See attached screenshot.)
Page URL: http://artofproblemsolving.com/community/c10_site_support
Steps to reproduce:
1. Go to the Site Support forum.
2. Click on any thread.
3. Click quickly on a different thread.
Expected behavior: To see the second thread.
Frequency: Every time
Operating system: Mac OS X
Browser: Chrome and Firefox
Additional information: Only happens in the Site Support forum. My tablet is school issued, but I have the problem at both school and home.

How to take a screenshot
Mac OS X: If you type ⌘+Shift+4, you'll get a "crosshairs" that lets you take a custom screenshot size. Just click and drag to select the area you want to take a picture of. If you type ⌘+Shift+4+space, you can take a screenshot of a specific window. All screenshots will show up on your desktop.

Windows: Hit the Windows logo key+PrtScn, and a screenshot of your entire screen. Alternatively, you can hit Alt+PrtScn to take a screenshot of the currently selected window. All screenshots are saved to the Pictures → Screenshots folder.

Advanced
If you're a bit more comfortable with how browsers work, you can also show us what happens in the JavaScript console.

In Chrome, type CTRL+Shift+J (Windows, Linux) or ⌘+Option+J (Mac).
In Firefox, type CTRL+Shift+K (Windows, Linux) or ⌘+Option+K (Mac).
In Internet Explorer, it's the F12 key.
In Safari, first enable the Develop menu: Preferences → Advanced, click "Show Develop menu in menu bar." Then either go to Develop → Show Error console or type Option+⌘+C.

It'll look something like this:
IMAGE
3 replies
slester
Apr 9, 2015
LauraZed
May 4, 2019
J
H
k i Community Safety
dcouchman   0
Jan 18, 2018
If you find content on the AoPS Community that makes you concerned for a user's health or safety, please alert AoPS Administrators using the report button (Z) or by emailing sheriff@aops.com . You should provide a description of the content and a link in your message. If it's an emergency, call 911 or whatever the local emergency services are in your country.

Please also use those steps to alert us if bullying behavior is being directed at you or another user. Content that is "unlawful, harmful, threatening, abusive, harassing, tortuous, defamatory, vulgar, obscene, libelous, invasive of another's privacy, hateful, or racially, ethnically or otherwise objectionable" (AoPS Terms of Service 5.d) or that otherwise bullies people is not tolerated on AoPS, and accounts that post such content may be terminated or suspended.
0 replies
dcouchman
Jan 18, 2018
0 replies
J
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Funny Diophantine
Taco12   21
N 4 minutes ago by emmarose55
Source: 2023 RMM, Problem 1
Determine all prime numbers $p$ and all positive integers $x$ and $y$ satisfying $$x^3+y^3=p(xy+p).$$
21 replies
Taco12
Mar 1, 2023
emmarose55
4 minutes ago
J
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inequalities proplem
Cobedangiu   5
N 26 minutes ago by Cobedangiu
$x,y\in R^+$ and $x+y-2\sqrt{x}-\sqrt{y}=0$. Find min A (and prove):
$A=\sqrt{\dfrac{5}{x+1}}+\dfrac{16}{5x^2y}$
5 replies
Cobedangiu
Apr 18, 2025
Cobedangiu
26 minutes ago
J
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Killer NT that nobody solved (also my hardest NT ever created)
mshtand1   6
N 33 minutes ago by maromex
Source: Ukraine IMO 2025 TST P8
A positive integer number \( a \) is chosen. Prove that there exists a prime number that divides infinitely many terms of the sequence \( \{b_k\}_{k=1}^{\infty} \), where
\[ b_k = a^{k^k} \cdot 2^{2^k - k} + 1. \]
Proposed by Arsenii Nikolaev and Mykhailo Shtandenko
6 replies
mshtand1
Apr 19, 2025
maromex
33 minutes ago
J
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Existence of AP of interesting integers
DVDthe1st   35
N an hour ago by cursed_tangent1434
Source: 2018 China TST Day 1 Q2
A number $n$ is interesting if 2018 divides $d(n)$ (the number of positive divisors of $n$). Determine all positive integers $k$ such that there exists an infinite arithmetic progression with common difference $k$ whose terms are all interesting.
35 replies
+1 w
DVDthe1st
Jan 2, 2018
cursed_tangent1434
an hour ago
J
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k help me PLEASE
dwead   4
N Tuesday at 6:29 PM by jlacosta
Im wondering if there is any way to reset progress in a specific subject in alcumus like algebra or geometry the reason i want to do that is because im getting progress when im not even doing them and it's kinda annoying when i have to skip the ones that ive done but really haven't
4 replies
dwead
Apr 22, 2025
jlacosta
Tuesday at 6:29 PM
J
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k Happy Easter!!!
A_Crabby_Crab   37
N Apr 21, 2025 by MathDolphin95
Happy Easter to all on Aops!!!

I hope everyone on this awesome website will be filled with peace, joy and love this season (its 50 days long y'all so start partying and eat some jelly beans if you can).

37 replies
A_Crabby_Crab
Apr 20, 2025
MathDolphin95
Apr 21, 2025
J
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k I need help to reset progress in a certain subject but not all subjects
dwead   6
N Apr 20, 2025 by mdk2013
is there a way to reset progress in a certain subject but only that subject so like reset progress in algebra but not in prealgeba?
6 replies
dwead
Apr 19, 2025
mdk2013
Apr 20, 2025
J
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k Question
jjmmxx   2
N Apr 18, 2025 by jjmmxx
"New users are not allowed to post images in the Community."
Can you tell me about this...?
2 replies
jjmmxx
Apr 18, 2025
jjmmxx
Apr 18, 2025
J
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k bar color
jusluo   6
N Apr 17, 2025 by jkim0656
im wondering why my progress bar hasnt turned to a different shade of color after hitting a milestone. I passed orange, and it didn't turn to that color, its still grey (this is in week 12.) is there something I can do to fix it?
6 replies
jusluo
Apr 17, 2025
jkim0656
Apr 17, 2025
J
H
k repeated deletion of EGMO threads in HSO
InterLoop   3
N Apr 17, 2025 by EeEeRUT
I hope posting this in Site Support is fine? I'm not sure whether an HSO admin is doing this but-

The EGMO 2025 problem 1 and problem 2 were originally posted by me on the day of the contest and found deleted (not by me) yesterday. Someone else noticed this and posted the problems again, but these threads were deleted once more.
3 replies
InterLoop
Apr 17, 2025
EeEeRUT
Apr 17, 2025
J
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Post did not come
Speedysolver1   28
N Apr 16, 2025 by jlacosta
IMAGE
28 replies
Speedysolver1
Apr 14, 2025
jlacosta
Apr 16, 2025
J
H
k Typo in blog info
Craftybutterfly   3
N Apr 16, 2025 by bpan2021
I found a typo in blog css. It is supposed to say Edit your blog's CSS in the text area below. not Edit your blog's CSS in the textarea below.
3 replies
Craftybutterfly
Apr 16, 2025
bpan2021
Apr 16, 2025
J
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k Python turtle
Speedysolver1   15
N Apr 16, 2025 by jlacosta
It gave a turtle window as seen without import turtle 
print("this does not import turtle")

IMAGE
15 replies
Speedysolver1
Apr 10, 2025
jlacosta
Apr 16, 2025
J
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k Search results do not show up
Craftybutterfly   17
N Apr 15, 2025 by jlacosta
Summary: If you use advanced search, the search says "No topics here!"
Steps to reproduce:
1. Use advanced search
2. there will be no topics when you finish
Frequency: 100%
Operating system(s): HP elitebook
Browser: Chrome latest version
17 replies
Craftybutterfly
Apr 4, 2025
jlacosta
Apr 15, 2025
J
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Collinearity in cyclic quadrilateral
davidlam   7
N Oct 29, 2015 by rkm0959
A convex quadrilateral $ABCD$ with $AC \neq BD$ is inscribed in a circle with center $O$. Let $E$ be the intersection of diagonals $AC$ and $BD$. If $P$ is a point inside $ABCD$ such that $\angle PAB+\angle PCB=\angle PBC+\angle PDC=90^\circ$, prove that $O$, $P$ and $E$ are collinear.
7 replies
davidlam
Dec 2, 2006
rkm0959
Oct 29, 2015
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Collinearity in cyclic quadrilateral
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Reveal topic tags
geometry
circumcircle
symmetry
power of a point
radical axis
geometry unsolved
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davidlam
30 posts
davidlam
#1 Dec 2, 2006, 1:05 PM • 2 Y
Y by Adventure10, Mango247
A convex quadrilateral $ABCD$ with $AC \neq BD$ is inscribed in a circle with center $O$. Let $E$ be the intersection of diagonals $AC$ and $BD$. If $P$ is a point inside $ABCD$ such that $\angle PAB+\angle PCB=\angle PBC+\angle PDC=90^\circ$, prove that $O$, $P$ and $E$ are collinear.
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leepakhin
474 posts
leepakhin
#2 Dec 2, 2006, 2:28 PM • 2 Y
Y by Adventure10, Mango247
Let $\Sigma, \Sigma_{1}, \Sigma_{2}$ be respectively the circumcircles of $ABCD, \triangle PBD, \triangle PAC$. Let also $C_{1}, C_{2}$ be the centres of $\Sigma_{1}, \Sigma_{2}$ respectively.

Consider the radical axes of each two of them. Since the radical axis of $\Sigma, \Sigma_{1}$ is $BD$ and that of $\Sigma, \Sigma_{2}$ is $AC$, the radical axis of $\Sigma_{1}, \Sigma_{2}$ must be concurrent with $AC$ and $BD$, i.e. it passes through $E$. Therefore, the radical axis of $\Sigma_{1}, \Sigma_{2}$ is $PE$.

To prove $O$, $P$, $E$ are collinear, it suffices to prove $O$ has the same power with respect to $\Sigma_{1}$ and $\Sigma_{2}$.

Without loss of generality we may let $\angle A$ and $\angle B$ to be not smaller than a right angle. Then point $P$ lies in $\triangle CDE$ and it is outside $\Sigma_{1}$ and $\Sigma_{2}$. By some angle chasing we can prove that $\angle ODC_{1}=90^\circ$, and so the power of $O$ w.r.t $\Sigma_{1}$ is equal to $OC_{1}^{2}-CC_{1}^{2}=OC^{2}$. Similarly, the power of $O$ w.r.t. $\Sigma_{2}$ is also the square of the circumradius of $ABCD$. The result follows.
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Megus
1198 posts
Megus
#3 Dec 2, 2006, 7:26 PM • 2 Y
Y by Adventure10, Mango247
Consider inversion with center $P$ and any power. Then see that our hypothesis implies that $A^{*}B^{*}C^{*}D^{*}$ ($X^{*}$ denotes point $X$ after inversion) is a rectangle. Let $O'$ be center of circumcircle of $A^{*}B^{*}C^{*}D^{*}$. Point $E^{*}$ is the intersection of circumcircles of $PBD$ and $PCA$ and hence lies on line $PO'$ (as $O'$ is the intersection of $A^{*}C^{*}$ and $B^{*}D^{*}$). But well-known fact says that $P,O',O$ are collinear and hence $P,O',O^{*}$ are collinear, so $P,E^{*},O^{*}$ are collinear and hence $P,E,O$ are collinear. :) QED
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modeler
175 posts
modeler
#4 Dec 3, 2006, 1:10 AM • 2 Y
Y by Adventure10, Mango247
Let $A', B', C', D'$ be the intersection point of the circle and $AP, BP, CP, DP$ respectively. By angle tracing, $A'B'C'D'$ is a rectangle. Therefore $O$ is the intersection point of $A'C'$ and $B'D'$. Use central projection to map $P$ to the centre of the circle. Then by symmetry, $P, E, O$ are collinear.
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me@home
2349 posts
me@home
#5 Dec 3, 2006, 7:33 AM • 2 Y
Y by Adventure10, Mango247
Diagram:
hope that helps a little (It helped me...)
Attachments:
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vslmat
154 posts
vslmat
#6 Aug 5, 2012, 11:25 AM • 2 Y
Y by Adventure10, Mango247
Another solution:
Let $AP$ cut the circle at $F$, $BP$ cut the circle at $H$.
$\angle PAB + \angle PCB = \angle PCF = 90^{\circ}$,so $PC$ must cut $OF$ at a point $G$ on the circle.
Similarly, $DP$ must cut $OH$ at $K$ on the circle.
Let $GB$ cut $AK$ at $X$.
By Pascal theorem in $ACGBDK: E = AC \cap BD, P = CG \cap DK, X = AK \cap GB$ are collinear.
By Pascal theorem in $GFAKHB: O = GF \cap KH, P = FA \cap HB, X = GB \cap AK$ are collinear.
So $E, P, X, O$ are collinear
Attachments:
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drmzjoseph
445 posts
drmzjoseph
#7 Oct 29, 2015, 5:53 AM • 4 Y
Y by FabrizioFelen, Pirkuliyev Rovsen, Adventure10, Mango247
If $AP,BP,CP,DP$ cut to $\odot (ABCD)$ at $A',B',C',D'$ respectively. Consider $\mathcal{G}$ the composition of involutions with poles $P,E,P$ that fixed the conic $\odot (ABCD)$ is well-known that is a involution with pole on $EP$. Since $\mathcal{G}(A')=C'$ and $\mathcal{G}(B')=D' \Rightarrow A'C'$ and $B'D'$ are secants at the pole of $\mathcal{G}$. Using the condition $\angle PAB+\angle PCB=\angle PBC+\angle PDC=90^\circ$ we get $A'C'$ and $B'D'$, and are secants at $O$ so $E,P,O$ are collinear.
This post has been edited 1 time. Last edited by drmzjoseph, Oct 29, 2015, 7:57 AM
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rkm0959
1721 posts
rkm0959
#8 Oct 29, 2015, 8:40 AM • 2 Y
Y by Adventure10, Mango247
This was in Korean Postal Coaching..
Let $O_1$ be the pole of $AC$ with respect to $O$.
Draw a circle - with $O_1$ as its center and $O_1A=O_1C$ as its radius.
Then we have $2\angle APC = 2(90+\angle ADC)=180+\angle AOC = 360-\angle AO_1C$, so $P$ lies on the circle $O_1$.
Similarly, $P$ lies on the circle $O_2$. I claim that $O, P, E$ lie on the radical axis of $O_1, O_2$.
First, $O$ lies on the radical axis since $P_{O_1}(O)=OA^2=OB^2=P_{O_2}(O)$.
Also, $E$ lies on the radical axis since $AE \cdot EC = BE \cdot ED$. Therefore, we are done. $\blacksquare$
This post has been edited 1 time. Last edited by rkm0959, Oct 29, 2015, 8:40 AM
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