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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.

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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:
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0 replies
1 viewing
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
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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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Very easy inequality
Bugi   32
N a minute ago by Alex-131
Source: JBMO Shortlist 2002
Let $ a,b,c$ be positive real numbers. Prove the inequality:
$ \frac {a^3}{b^2} + \frac {b^3}{c^2} + \frac {c^3}{a^2}\ge \frac {a^2}{b} + \frac {b^2}{c} + \frac {c^2}{a}$
32 replies
Bugi
Nov 12, 2008
Alex-131
a minute ago
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FE f(x)f(y)+1=f(x+y)+f(xy)+xy(x+y-2)
steven_zhang123   5
N 2 minutes ago by pco
Find all functions $f: \mathbb{R} \rightarrow \mathbb{R}$ such that for all $x,y \in \mathbb{R}$, we have $f(x)f(y)+1=f(x+y)+f(xy)+xy(x+y-2)$.
5 replies
steven_zhang123
Yesterday at 11:27 PM
pco
2 minutes ago
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polynomial
hanzo.ei   0
6 minutes ago
Source: from a book
Given a polynomial \( P(x) \) satisfying \( P(0) = 0 \), \( P(1) = 1 \), and for \( n \) (\( n \geq 2, n \in \mathbb{N} \)) positive real numbers \( k_1, k_2, \dots, k_n \). Prove that there exists a strictly increasing sequence of real numbers \( (a_i)_{i=1}^{n} \subset (0,1) \) such that
\[ \sum_{i=1}^{n} \frac{k_i}{P'(a_i)} = \sum_{i=1}^{n} k_i. \]
0 replies
hanzo.ei
6 minutes ago
0 replies
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Inspired by old results
sqing   6
N 12 minutes ago by MathsII-enjoy
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
$$ a^2 + b^2 + c^2 + 2abc \geq 5$$
6 replies
1 viewing
sqing
Mar 27, 2025
MathsII-enjoy
12 minutes ago
J
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$$ac=bd$$
sqing   2
N 14 minutes ago by Acorn-SJ
Source: Own
Let $ a,b,c,d $ be reals such that $ a^2+b^2=4,c^2+d^2=9 $ and $ abcd\ge 9.$ Prove that$$ac=bd$$Let $ a,b,c,d $ be reals such that $ a^2+b^2=4,c^2+d^2=9 $ and $ ad+bc \ge 6.$ Prove that$$ac=bd$$Let $ a,b,c,d $ be reals such that $ a^2+b^2=4,c^2+d^2=9 $ and $ab+cd \geq \frac{13}{2}.$ Prove that$$ac=bd$$




2 replies
sqing
an hour ago
Acorn-SJ
14 minutes ago
J
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Heavy config geo involving mixtilinear
Assassino9931   1
N 15 minutes ago by VicKmath7
Source: Bulgaria Spring Mathematical Competition 2025 12.4
Let $ABC$ be an acute-angled triangle \( ABC \) with \( AC > BC \) and incenter \( I \). Let \( \omega \) be the mixtilinear circle at vertex \( C \), i.e. the circle internally tangent to the circumcircle of \( \triangle ABC \) and also tangent to lines \( AC \) and \( BC \). A circle \( \Gamma \) passes through points \( A \) and \( B \) and is tangent to \( \omega \) at point \( T \), with \( C \notin \Gamma \) and \( I \) being inside \( \triangle ATB \). Prove that:
$$\angle CTB + \angle ATI = 180^\circ + \angle BAI - \angle ABI.$$
1 reply
Assassino9931
2 hours ago
VicKmath7
15 minutes ago
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Product of cosines subject to product of sines
Assassino9931   1
N 26 minutes ago by RagvaloD
Source: Bulgaria Spring Mathematical Competition 2025 11.2
Let $\alpha, \beta$ be real numbers such that $\sin\alpha\sin\beta=\frac{1}{3}$. Prove that the set of possible values of $\cos \alpha \cos \beta$ is the interval $\left[-\frac{2}{3}, \frac{2}{3}\right]$.
1 reply
Assassino9931
2 hours ago
RagvaloD
26 minutes ago
J
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A colouring game on a grid
Tintarn   2
N 44 minutes ago by math-olympiad-clown
Source: Baltic Way 2024, Problem 8
Let $a$, $b$, $n$ be positive integers such that $a + b \leq n^2$. Alice and Bob play a game on an (initially uncoloured) $n\times n$ grid as follows:
- First, Alice paints $a$ cells green.
- Then, Bob paints $b$ other (i.e.uncoloured) cells blue.
Alice wins if she can find a path of non-blue cells starting with the bottom left cell and ending with the top right cell (where a path is a sequence of cells such that any two consecutive ones have a common side), otherwise Bob wins. Determine, in terms of $a$, $b$ and $n$, who has a winning strategy.
2 replies
Tintarn
Nov 16, 2024
math-olympiad-clown
44 minutes ago
J
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Polynomials and their shift with all real roots and in common
Assassino9931   1
N an hour ago by joeym2011
Source: Bulgaria Spring Mathematical Competition 2025 11.4
We call two non-constant polynomials friendly if each of them has only real roots, and every root of one polynomial is also a root of the other. For two friendly polynomials \( P(x), Q(x) \) and a constant \( C \in \mathbb{R}, C \neq 0 \), it is given that \( P(x) + C \) and \( Q(x) + C \) are also friendly polynomials. Prove that \( P(x) \equiv Q(x) \).
1 reply
Assassino9931
2 hours ago
joeym2011
an hour ago
J
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When is this well known sequence periodic?
Assassino9931   1
N an hour ago by RagvaloD
Source: Bulgaria Spring Mathematical Competition 2025 12.2
Determine all values of $a_0$ for which the sequence of real numbers with $a_{n+1}=3a_n - 4a_n^3$ for all $n\geq 0$ is periodic from the beginning.
1 reply
Assassino9931
2 hours ago
RagvaloD
an hour ago
J
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nice problem
hanzo.ei   1
N an hour ago by hanzo.ei
Source: I forgot
Let triangle $ABC$ be inscribed in the circumcircle $(O)$ and circumscribed about the incircle $(I)$, with $AB < AC$. The incircle $(I)$ touches the sides $BC$, $CA$, and $AB$ at $D$, $E$, and $F$, respectively. A line through $I$, perpendicular to $AI$, intersects $BC$, $CA$, and $AB$ at $X$, $Y$, and $Z$, respectively. The line $AI$ meets $(O)$ at $M$ (distinct from $A$). The circumcircle of triangle $AYZ$ intersects $(O)$ at $N$ (distinct from $A$). Let $P$ be the midpoint of the arc $BAC$ of $(O)$. The line $AI$ cuts segments $DF$ and $DE$ at $K$ and $L$, respectively, and the tangents to the circle $(DKL)$ at $K$ and $L$ intersect at $T$. Prove that $AT \perp BC$.
1 reply
+1 w
hanzo.ei
Yesterday at 5:58 PM
hanzo.ei
an hour ago
J
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VERY HARD MATH PROBLEM!
slimshadyyy.3.60   10
N an hour ago by orangebear
Let a ≥b ≥c ≥0 be real numbers such that a^2 +b^2 +c^2 +abc = 4. Prove that
a+b+c+(√a−√c)^2 ≥3.
10 replies
slimshadyyy.3.60
Yesterday at 10:49 PM
orangebear
an hour ago
J
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possible triangle inequality
sunshine_12   0
an hour ago
a, b, c are real numbers
|a| + |b| + |c| − |a + b| − |b + c| − |c + a| + |a + b + c| ≥ 0
hey everyone, so I came across this inequality, and I did make some progress:
Let (a+b), (b+c), (c+a) be three sums T1, T2 and T3. As there are 3 sums, but they can be of only 2 signs, by pigeon hole principle, atleast 2 of the 3 sums must be of the same sign.
But I'm getting stuck on the case work. Can anyone help?
Thnx a lot
0 replies
sunshine_12
an hour ago
0 replies
J
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Sequence of functions
mathlover1231   0
an hour ago
Source: Own
Let f:N->N be a function such that f(1) = 1, f(n+1) = f(n) + 2^f(n) for every positive integer n. Prove that all numbers f(1), f(2), …, f(3^2023) give different remainders when divided by 3^2023
0 replies
mathlover1231
an hour ago
0 replies
J
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J
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Collapsible arrangements [CMO 2018 - P1]
Amir Hossein   29
N Mar 26, 2025 by Ilikeminecraft
Source: 2018 Canadian Mathematical Olympiad - P1
Consider an arrangement of tokens in the plane, not necessarily at distinct points. We are allowed to apply a sequence of moves of the following kind: select a pair of tokens at points $A$ and $B$ and move both of them to the midpoint of $A$ and $B$.

We say that an arrangement of $n$ tokens is collapsible if it is possible to end up with all $n$ tokens at the same point after a finite number of moves. Prove that every arrangement of $n$ tokens is collapsible if and only if $n$ is a power of $2$.
29 replies
Amir Hossein
Mar 31, 2018
Ilikeminecraft
Mar 26, 2025
J
Collapsible arrangements [CMO 2018 - P1]
G H J
Reveal topic tags
combinatorics
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G H BBookmark kLocked kLocked NReply
Source: 2018 Canadian Mathematical Olympiad - P1
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Amir Hossein
5452 posts
Amir Hossein
#1 Mar 31, 2018, 2:09 AM • 8 Y
Y by Smita, phymaths, Math-Ninja, Davi-8191, Nymoldin, Danielzh, Adventure10, Mango247
Consider an arrangement of tokens in the plane, not necessarily at distinct points. We are allowed to apply a sequence of moves of the following kind: select a pair of tokens at points $A$ and $B$ and move both of them to the midpoint of $A$ and $B$.

We say that an arrangement of $n$ tokens is collapsible if it is possible to end up with all $n$ tokens at the same point after a finite number of moves. Prove that every arrangement of $n$ tokens is collapsible if and only if $n$ is a power of $2$.
This post has been edited 1 time. Last edited by Amir Hossein, Mar 31, 2018, 2:14 AM
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adamov1
355 posts
adamov1
#2 Mar 31, 2018, 2:18 AM • 5 Y
Y by Amir Hossein, hansu, ESCmath, Adventure10, Mango247
Note that the sum of the coordinates of the points is constant, so the desired point must be the centroid.

To show that $n$ a power of $2$ works, proceed by induction on $\log_2 n$ by pairing up points and sending each pair to their midpoints, resulting in $2$ identical sets of $\frac{n}{2}$ points, which can be sent to their (identical) centroids by induction as desired.

Now if $n$ is not a power of $2$, consider the set of points consisting of $1$ copy of $(1,0)$ and $n-1$ copies of $(0,0)$. The centroid is then $(\frac{1}{n},0)$. Note that the given operation, when applied to these points, will only allow the coordinates to be reduced fractions with a denominator a power of $2$. But $n$ is not such a number, so this arrangement is not collapsible.
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Mathdragon245
133 posts
Mathdragon245
#3 Apr 1, 2018, 9:05 AM • 3 Y
Y by Amir Hossein, Adventure10, Mango247
Here's a solution very similar to the above.
The if part is identical ,so i am going to give a slightly different proof for the only if part.
We want to show that if $n$ has an odd divisor other than $1$,then there exists an arrangement of $n$ points which is not collapsible.
Let's put the tokens in the number line,more specifically put $2$ tokens at number $2$,and the next tokens in progressive powers of two one by one.Let the number where the token is located by the weight of the token.
Initially the total weight is $2^n$.
Furthermore,it is easy to see that the total weight remains invariant at every operation.
If somehow,me manage to get all the tokens end up at one single point ,then this means that there exist positive integers $t$ and $s$ such that $\frac{n \cdot t}{2^s}=2^n$ or $n \cdot t=2^{n+s}$,which is a contradiction since the $LHS$ has an odd divisor other than $1$,but the $RHS$ does not.
Hence,$n$ must be a power of two.
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phymaths
264 posts
phymaths
#4 Apr 4, 2018, 12:32 PM • 2 Y
Y by Adventure10, Mango247
Amir Hossein wrote:
Consider an arrangement of tokens in the plane, not necessarily at distinct points. We are allowed to apply a sequence of moves of the following kind: select a pair of tokens at points $A$ and $B$ and move both of them to the midpoint of $A$ and $B$.

We say that an arrangement of $n$ tokens is collapsible if it is possible to end up with all $n$ tokens at the same point after a finite number of moves. Prove that every arrangement of $n$ tokens is collapsible if and only if $n$ is a power of $2$.

Nice Problem!
We set up the co-ordinate plane.
Let the weight of a token be the sum of its $x$ and $y$ coordinates.
Note that the total weight of all the tokens remains invariant.Thus if the arrangement is collapsible, the tokens will meet at point with co-ordinates $((x_1+x_2+...x_n)/n , (y_1 +y_2 +..y_n)/n)$.

Let us take an arrangement of $n$ tokens with $(n-1)$ of them at one point and $1$ token at another point.
Its easy to see that no matter what the coordinates of the point are, every time
we ' fuse' $2$ points, the new coordinates are of form $a/2^k$ .This the final point they meet will also be of this form.
Also we can choose $s$ and $t$ the coordinates of the set of $n-1$ points and the lone point such that $n$ and $(x_1 +x_2 +..x_n)$ are coprime forcing $n=2^k$ for some integer $k$.

Now we prove any arrangement of $2^k$ tokens is collapsible.
For this we proceed by Induction.
Base case is obvious.
Now we make pairs of points which is possible and fuse every pair.(Points with same coordinate fuse to become the same point).
Now we get $2^{k-1}$ packets of fused points.
Now we apply induction and on these points and thus each point's partner moves along with it throughout. Thus we can fuse all points and the arrangement is 'collapsible'.
Hence proved!


Motivation
This post has been edited 3 times. Last edited by phymaths, Apr 4, 2018, 12:49 PM
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rkm0959
1721 posts
rkm0959
#5 Apr 12, 2018, 1:18 AM • 2 Y
Y by Adventure10, Mango247
If $n=2^k$, $n$ tokens are obviously collapsible.

If not, note that the tokens have to meet at their centroid. Take $n-1$ copies of $(0,0)$ and one copy of $(1,0)$.
They have to meet at $(\frac{1}{n},0)$, but all locations of each token have coordinates of the form $(\frac{a}{2^k},0)$.
Therefore, $n$ must be a power of $2$ for this set of tokens to be collapsible. Done.
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Durjoy1729
221 posts
Durjoy1729
#6 Jan 4, 2019, 5:49 AM • 5 Y
Y by Digonta1729, potentialenergy, DonaldJ.Trump, Adventure10, Mango247
If part is very trivia. If $n=2^k $ we can find even number of point where they containing odd numbers of tokens.We can pair this odd number such that in every pair $2 $ elements { $2^x-(2m+1), 2m+1$} sum up at $2^x$. Repeatedly applying this proccess we can obtain at a moment such that in every points there must have$ 2^t $coins for a positive $t$.
This post has been edited 3 times. Last edited by Durjoy1729, Jan 4, 2019, 5:52 AM
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Taha1381
816 posts
Taha1381
#7 Mar 11, 2019, 3:47 PM • 2 Y
Y by Adventure10, Mango247
This is a Combinatorical function equation :) .First we are going to plug in some special points to see $n$ must be a power of $2$.For this we notice that if points have integer coordinate then any point achived by taking mean of points have a rational coordinate with denomiter a power of $2$.However the sum of coordinates still invarient with this moves so if one can have all the points in one place the coordinate of that point will be the mean of all $n$ points.This motivates a lot of constructions for example $n-1$ points on $(0,0)$ and one point on $(0,k)$ which quickly implies that $n$ should be a power of $2$.Now for showing every power of $2$ is collapsible we make use of induction let $n=2^k$ we induct on $k$.The base case is trivial.for inductive step split $2^{k+1}$ points into two parts with $2^k$ points.Apply the inductive hypopeties to bot now we have two position that in every of them there are $2^k$ points.Now just pair points in different positions and apply the move to each pair.
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SixForty
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SixForty
#8 May 21, 2020, 3:20 AM
Y by
I'm just thinking out loud here, but this should be relatively easy to generalize, shouldn't it? By that I mean:

If, instead of utilizing pairs of tokens, a move is defined by selecting k tokens and moving all of them to their geometric centre, then we can prove that every arrangement of n tokens is collapsible if and only if n is a power of k. Correct?

In addition, we should be able to trivially extrapolate our proof to show that this is true for an arrangement of tokens in any m-dimensional space, and not just a plane. Correct?
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babygrogu
46 posts
babygrogu
#9 Nov 14, 2020, 1:37 PM
Y by
SixForty wrote:
I'm just thinking out loud here, but this should be relatively easy to generalize, shouldn't it? By that I mean:

If, instead of utilizing pairs of tokens, a move is defined by selecting k tokens and moving all of them to their geometric centre, then we can prove that every arrangement of n tokens is collapsible if and only if n is a power of k. Correct?

In addition, we should be able to trivially extrapolate our proof to show that this is true for an arrangement of tokens in any m-dimensional space, and not just a plane. Correct?
Lemma: At some point, the tokens must be in an arrangement where exactly $\frac{n}{2}$ tokens are at 2 points if it is collapsible for every arrangement of tokens.

Proof: We know that right before the last move, the tokens must be at 3 points where there is 1 token at 1 point, another token at 1 point, and n-2 tokens at the midpoint of these. The only way to get to this state which works for every arrangement is for $\frac{n}{2}$ tokens to be at 2 points and to move points to the midpoint of these until the midpoint has n-2 tokens. This is because if there was a different way, then it wouldn't be true for every arrangement because if you moved one of the points you are using, the outcome would be different.

Since there should be n/2 tokens at 2 points, this means that n/2 tokens should also be collapsible for every arrangement. 2 tokens is clearly collapsible, so the next collapsible number of tokens for every arrangement of them can be $a_n$ where $a_1=2$, and $a_n=2a_{n-1}$, which is the same recursive formula for the powers of 2. This can be generalized for any dimension.
This post has been edited 2 times. Last edited by babygrogu, Nov 21, 2020, 7:45 PM
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heheXD1
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heheXD1
#10 Mar 11, 2021, 2:04 AM
Y by
adamov1 wrote:
Click to reveal hidden text

"Now if $n$ is not a power of $2$, consider the set of points consisting of $1$ copy of $(1,0)$ and $n-1$ copies of $(0,0)$. The centroid is then $(\frac{1}{n},0)$. Note that the given operation, when applied to these points, will only allow the coordinates to be reduced fractions with a denominator a power of $2$. But $n$ is not such a number, so this arrangement is not collapsible." I don't quite understand the logic of this part of the solution, if you are trying to prove that any arrangement of $n$ tokens, where $n$ is not a power of 2, is non-collapsible, how can you just consider one specific example to arrive at a conclusion for any arrangement of $n$ tokens?
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heheXD1
429 posts
heheXD1
#11 Mar 11, 2021, 6:22 AM • 3 Y
Y by Mango247, Mango247, Mango247
Anyone??
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508669
1040 posts
508669
#12 Mar 11, 2021, 5:37 PM • 1 Y
Y by Mango247
Amir Hossein wrote:
Consider an arrangement of tokens in the plane, not necessarily at distinct points. We are allowed to apply a sequence of moves of the following kind: select a pair of tokens at points $A$ and $B$ and move both of them to the midpoint of $A$ and $B$.

We say that an arrangement of $n$ tokens is collapsible if it is possible to end up with all $n$ tokens at the same point after a finite number of moves. Prove that every arrangement of $n$ tokens is collapsible if and only if $n$ is a power of $2$.

Nice problem.

If $n = 2^k$ for $k \in \mathbb{N}$, we induct on $k$ with $k = 1$ base case and see that if for all $k_1 \leq k$ we can make all tokens coincide, then for $n = 2^{k_1+1}$ tokens, we randomly pair up tokens and move each pair of tokens to their midpoint, and complete using induction hypothesis.

If $n$ is not a power of $2$, then we consider the usual Cartesian plane co-ordinates and place $n-1$ tokens at the origin and $1$ token at $(0,1)$. If all tokens are coinciding, then it must be at point $(0, \frac{1}{n})$ but given any moment, the co-ordinate of any point is of form $(0, \frac{z}{2^p})$ for $(z, p) \in \mathbb{Z}_{\geq 0}$ but this means it can never be $(0, \frac{1}{n})$ which is the desired conclusion

@below khina has mentioned it, but still here you go, look at bold words below
Amir Hossein wrote:
Consider an arrangement of tokens in the plane, not necessarily at distinct points. We are allowed to apply a sequence of moves of the following kind: select a pair of tokens at points $A$ and $B$ and move both of them to the midpoint of $A$ and $B$.

We say that an arrangement of $n$ tokens is collapsible if it is possible to end up with all $n$ tokens at the same point after a finite number of moves. Prove that every arrangement of $n$ tokens is collapsible if and only if $n$ is a power of $2$.
This post has been edited 1 time. Last edited by 508669, Mar 12, 2021, 5:12 AM
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heheXD1
429 posts
heheXD1
#13 Mar 11, 2021, 10:45 PM
Y by
@above How did you just consider one specific set up, being $n - 1$ tokens at the origin and 1 token at $(0, 1)$ and draw a conclusion about all arrangements?
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khina
993 posts
khina
#14 Mar 12, 2021, 12:39 AM • 1 Y
Y by heheXD1
@above It asks to prove that it holds for ALL configurations if and only if $n$ is a power of $2$. What they did is prove that there exists SOME configuration when $n$ isn't a power of $2$, that doesn't work. This implies that it doesn't hold that ALL configurations work, which is what they want to prove for when $n$ isn't a power of $2$.
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Returner
11 posts
Returner
#15 Mar 12, 2021, 4:42 PM
Y by
Please ??? provide a graph theory solution to these 2
P1
Suppose in a group of n people each one has at most 3 enemies
Prove that the group can be partitioned into 2 subgroups ST each member has at most 1 enemy in the subgroup to which he belongs

P2
2n people have assembled together around a circular table, each one having at most n-1 enemies and at least n friends
Show that there exists a circular arrangement of these 2n people where no hostile pair sits adjacent to each other
Please help this noob
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heheXD1
429 posts
heheXD1
#16 Mar 13, 2021, 2:12 AM • 1 Y
Y by Mango247
@2above OHHHHH, ty for explaining!
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JustKeepRunning
2958 posts
JustKeepRunning
#17 Apr 18, 2021, 1:55 AM
Y by
Imagine the tokens as points on a number line, label them $a_1, a_2, \cdots, a_k$. Notice that if $k=2^{n}$ for integer $n,$ then the algorithm for collapsing is simple: just average the two on the left, the two on the right, the remaining two on the left, the remaining two on the rights, etc. It is easy to see that all the numbers will come to be $\frac{a_1+a_2\cdots a_k}{k}$ because $k$ is a power of $2$.

We now prove that all other arrangements don't hold. An invariant is the sum, so this means that the number that all of the $a_i$ for $1\leq I\leq k$ collapse to is fixed, namely, it is $\frac{a_1+a_2+\cdots a_k}{k}$. Notice that the process given in the problem always results in averages with weights of $\frac{1}{2^c}$ for some integer on some number of $a_i$. Therefore, if $k$ is not a power of $2$(and it is easy to choose specific values of $a_i$ so that the numerator and denominator of the fraction are relatively prime, so there is no chance of the "odd" part of the denominator cancelling out) then there is no way to achieve such an average, so we are done.
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jasperE3
11133 posts
jasperE3
#18 Apr 22, 2021, 3:39 AM
Y by
$\textbf{1. }$ Every arrangement of $n$ tokens is collapsible if $n$ is a power of $2$.
We prove this by induction.
Base case. One token is collapsible.
Inductive assumption. We have $2^{n+1}$ tokens on each of the points $S=\{(a_n,b_n)\}$.
Inductive step. We can divide $S$ into two equinumerous subsets $S_1$ and $S_2$. The $n$th element of $S_1$ and the $n$th element of $S_2$ are paired, and for each pairing, we collapse the tokens. Then it reduces to a $2^n$ token configuration. $\blacksquare$

$\textbf{2. }$ Some arrangement of $n$ tokens is not collapsible if $n$ is not a power of $2$.
Let the $n$ tokens be on the $x$-axis. Then the tokens must collapse to the point whose $x$-value is the arithmetic mean of their $x$-values. An example of where this is impossible is when all but one token is on the origin, and the other is at $(1,0)$. Then they must meet at $\left(\frac1n,0\right)$. Since we take the midpoint of any two tokens, only integral multiples of negative powers of two are achievable. However, this must mean that $\frac1n$ is of the form $\frac a{2^b}$, for $a,b\in\mathbb Z$. WLOG, $a$ is odd, so it must be $1$, and thus $n$ is a power of two, contradiction. $\blacksquare$

The proof is done. $\square$
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Mogmog8
1080 posts
Mogmog8
#19 Nov 19, 2022, 5:21 PM • 2 Y
Y by centslordm, Danielzh
We claim by induction that powers of two are collapsible. For the base case $n=2^0,$ the result is clear. For the inductive step, assume $n=2^k$ is collapsible. Then, split $n=2^{k+1}$ into two sets of $2^k$ and collapse the sets so that half the tokens are at one point and the other half at another point. Then, through $2^k$ moves, we can move all the tokens to the midpoint of the two points by pairing off coins from the two sets.

Next, we claim that for $n$ not power of two, all arrangements such that the $x$ coordinates of the tokens are integers and their sum is not divisible by $n$ fail. Such an arrangement clearly exists. If the tokens are placed at $(x_i,y_i)$ for $1\le i\le n,$ the sum of the $x$ coordinates is an invariant so if $n$ is collapsible, each $x$ coordinate will eventually be $(x_1+\dots+x_n)/n.$ But each token can only move to coordinates of the form $x_1/2^{\alpha_1}+\dots+x_n/2^{\alpha_n}$ so $$\frac{x_1+\dots+x_n}{n}=\frac{x_1}{2^{\alpha_1}}+\dots+\frac{x_n}{2^{\alpha_n}}.$$This is absurd as the p-adic valuation of the left hand side is negative for any $p\mid n,$ $p\neq 2,$ while the p-adic valuation is non-negative for the right hand side. $\square$
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HamstPan38825
8857 posts
HamstPan38825
#20 Dec 17, 2022, 3:14 AM
Y by
The answer is all powers of 2. For a construction, we can just work inductively, where we can combine all $2^{k+1}$ points into $2^k$ midpoints, each of which has two points. From there, we can repeat the construction for $k$ twice using the inductive hypothesis.

To show that the other $n$ do not work, consider the configuration where $n-1$ of the points are at $(0, 0)$ and the last one is at $(1, 0)$. As the operation does not change the sum of the coordinates, the final collapsible point must be $\left(\frac 1n, 0\right)$. But it's clear that the only points that tokens can ever reach must be of the form $\left(\frac i{2^k}, 0\right)$, but $n$ is not a power of $2$, so no token can ever reach this final point, contradiction.
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peppapig_
279 posts
peppapig_
#21 Feb 10, 2023, 5:21 PM • 1 Y
Y by mulberrykid
All powers of two.

Proof.
First we will prove that all non-powers of $2$ do not work. We will do this by constructing a configuration of $n$ coins that is not collapsible for some positive integer $n$ that is not a perfect power of $2$. We can do this by placing $n-1$ of the coins at the origin and the remaining coin at the point $(1,0)$. The sum of the $x$-coordinates of all of these points will always remain the same(since we are just taking the average every time we make a move on two coins), but notice that if we express all of these $x$-coordinates as fractions, their denominators must always be powers of $2$. This is a contradiction because we would like to end up with all of the $x$-coordinates being $\frac{1}{n}$, with $n$ not being a power of $2$, and therefore non-powers of $2$ do not work.

Now we will prove that all powers of $2$ work by giving a strategy to collapse all the coins. Notice that if you have two groups of coins of the same size on two different points, these coins are collapsible, since we can pair the coins and have them all end up at the midpoint of these two points. With powers of $2$, we start with $n=2^k$ groups of $1$ coin each, which we can collapse to $2^{k-1}$ groups of $2$ coins each, and so on and so forth until we end up with one group of $2^k$ points. Thus we have proved that all powers of $2$ work and we are done.
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coolmath_2018
2807 posts
coolmath_2018
#22 Feb 23, 2023, 7:51 PM
Y by
We claim that the answer is all $n$ in the form of $2^k$.

We will use induction to show this.
Base Case: $n = 2$ clearly works.
Inductive Step: Assume the system is collapsible for $2^k$ and we wish to prove it for $2^{k+1}$. Clearly we can divide the $2^{k+1}$ tokens into two $2^k$ piles which can be collapsed. Hence, $2^{k+1}$ can be collapsed.

Now we show that only numbers in the form of $2^k$ are collapsable. Assume that we have $n$ tokens where $n \not= 2^k$. Note that if we put $n-1$ tokens at $(0,0)$ and the last token at $(1,0)$ they must collapse at the point $(\tfrac{1}{n}, 0)$. But by repeatedly taking the midpoint, our denominator must be a power of 2, contradicting our assumption. Hence only numbers of the form $2^k$ are collapsable.
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RedFireTruck
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RedFireTruck
#23 Apr 12, 2023, 10:17 PM
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https://i.postimg.cc/4x3vqpXm/image.png
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Danielzh
481 posts
Danielzh
#24 May 14, 2023, 12:45 AM
Y by
Mogmog8 wrote:
But each token can only move to coordinates of the form $x_1/2^{\alpha_1}+\dots+x_n/2^{\alpha_n}$ so $$\frac{x_1+\dots+x_n}{n}=\frac{x_1}{2^{\alpha_1}}+\dots+\frac{x_n}{2^{\alpha_n}}.$$This is absurd as the p-adic valuation of the left hand side is negative for any $p\mid n,$ $p\neq 2,$ while the p-adic valuation is non-negative for the right hand side. $\square$

Wowwwww very clever thinking :O
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L13832
252 posts
L13832
#25 Jul 12, 2024, 11:20 PM
Y by
For $n=1$ case the sequence is is collapsible, by inductive hypothesis we assume is it is true for $n=2^k$ and now we prove for $n=2^{k+1}$, notice that for $2^{k+1}$ we can divide the sequence of tokens into two parts of $2^k$ size which are collapsible and then collapcing the two points into a single point so the arrangements of $2^{k+1}$ tokens is also collapsible.
Now to prove that no other form other than arrangements of $2^k$ is collapsible. If we place all the tokens on non-negative integer positions on a real number line we will observe that the sum of the $x$-coordinates of all the tokens on a number line remains the same or is an INVARIANT, each $x$-coordinate will collapse to $\displaystyle \frac{(x_1+x_2+...+x_n)}{n}$, this is a contradiction.
because eventually the token can only move to a position with a denominator of a power of $2$, so for an arrangement n should be a power of $2$.
This post has been edited 1 time. Last edited by L13832, Jul 27, 2024, 5:34 AM
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dolphinday
1318 posts
dolphinday
#26 Jul 19, 2024, 12:51 AM
Y by
If $n$ is a power of $2$ we can keep on putting the tokens in groups of $2$ from which our construction is simple.
If $n$ is not a power of $2$ then put the tokens on the number line in $1$, $2$, $4$, $\dots$, $2^{n-1}$. Note the final spot for which the tokens must end up at is fixed since the sum of each of the tokens on the number line is invariant. So the point on the number line where the tokens must end up is $\frac{2^n-1}{n}$. However the denominator of any token on the number line must be a power of $2$ so the coins can't reach the final position if $n$ is not a power of $2$, done.
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Topiary
22 posts
Topiary
#27 Jul 22, 2024, 2:05 PM
Y by
We claim only powers of 2 work. We prove the necessity first. We will induct on the exponent $2^k$ , $\forall k \ge 0$. For $k = 0$ we have $2^0=1$ which is obviously true. We assume the truth for $n = 2^k$. Now split $2^{k+1}$ into two piles of $w^k$, which we assumed to be collapsible. We can pair up one pile on one point and the other half on another point , to which they will collapse to their midpoint.

We now prove that non powers of two won't work. First assume the contrary. Place $n-1$ points on the origin and 1 point at the point $(1,0).$ As the total sum of the coordinates after any individual move is invariant, the final collapsible point will be )$(\frac 1 n,0 )$ However when we repeatedly take the midpoint , we end up wiht a denominator with a power of 2, contradicting our assumption.
\end{proof}
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EpicBird08
1740 posts
EpicBird08
#28 Jul 31, 2024, 6:58 PM
Y by
The answer is $n = 2^k$ where $k$ is a nonnegative integer. To show this works, an induction-type argument can be used. For $k=0,$ do nothing. Otherwise, pair up tokens and perform a move on each pair, and repeat the argument on $k-1$ twice.

To show necessity, suppose that we have a prime $p > 2$ dividing $n.$ We can put the $i$th token at a lattice point $(x_i, y_i)$ such that the sum of the $x_i$ is not divisible by $p.$ Then because the sum of coordinates is invariant, the coordinates of the final point is $\left(\frac{x_1 + \dots + x_n}{n}, \frac{y_1 + \dots + y_n}{n}\right).$ Since $p \mid n$ and doesn't divide the first sum, we need to somehow divide by $p$ when we can only divide by $2.$ This is impossible, hence $n$ must be a power of $2,$ as desired.

Remark: One could just set $y_i = 0$ for all $i$, $x_i = 0$ for $i \ge 2,$ and $x_1 = 1.$ This would also do the trick, but our approach is more general.
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Saucepan_man02
1300 posts
Saucepan_man02
#29 Jan 29, 2025, 7:12 AM
Y by
Plot the problem in argand plane:

Let each vertex be denoted by $z_k$. Note that: $\sum z_k$ is constant, thus the final point for any collapsible arrangement must be the centroid.
If $n$ is a power of $2$, we clearly see by induction that its collapsible.
If not, then consider $z_1=1, z_2=z_3=\cdots=z_n=0$ which has a centroid of $(\tfrac{1}{n}, 0)$. But, notice that, after every move, we must have every point's real part to be of the form $\tfrac{1}{2^k}$ (or $0$ itself), which leads to contradiction.
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Ilikeminecraft
328 posts
Ilikeminecraft
#30 Mar 26, 2025, 4:35 PM
Y by
The answer is all powers of 2. To do 2, it is trivial by induction.
For non powers of 2, line them up on the number line. Then, put $n - 1$ at 0 and one is at $1.$ It is obvious that the sum of all numbers will always be 1. However, all of them must also have finitely many number of 1/0s in the binary expansion. This finishes.
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