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k a May Highlights and 2025 AoPS Online Class Information
jlacosta   0
May 1, 2025
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0 replies
jlacosta
May 1, 2025
0 replies
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D1033 : A problem of probability for dominoes 3*1
Dattier   1
N 4 minutes ago by Dattier
Source: les dattes à Dattier
Let $G$ a grid of 9*9, we choose a little square in $G$ of this grid three times, we can choose three times the same.

What the probability of cover with 3*1 dominoes this grid removed by theses little squares (one, two or three) ?
1 reply
Dattier
May 15, 2025
Dattier
4 minutes ago
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Inequality
lgx57   1
N 12 minutes ago by sqing
Source: Own
$a,b,c \in \mathbb{R}^{+}$,$\dfrac{1}{a}+\dfrac{1}{b}+\dfrac{1}{c}=1$. Prove that
$$a^abc+b^bac+c^cab \ge 27(ab+bc+ca)$$
1 reply
lgx57
an hour ago
sqing
12 minutes ago
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Easy but Nice 12
TelvCohl   2
N 19 minutes ago by AuroralMoss
Source: Own
Given a $ \triangle ABC $ with orthocenter $ H $ and a point $ P $ lying on the Euler line of $ \triangle ABC. $ Prove that the midpoint of $ PH $ lies on the Thomson cubic of the pedal triangle of $ P $ WRT $ \triangle ABC. $
2 replies
TelvCohl
Mar 8, 2025
AuroralMoss
19 minutes ago
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Serbian selection contest for the IMO 2025 - P6
OgnjenTesic   8
N 21 minutes ago by atdaotlohbh
Source: Serbian selection contest for the IMO 2025
For an $n \times n$ table filled with natural numbers, we say it is a divisor table if:
- the numbers in the $i$-th row are exactly all the divisors of some natural number $r_i$,
- the numbers in the $j$-th column are exactly all the divisors of some natural number $c_j$,
- $r_i \ne r_j$ for every $i \ne j$.

A prime number $p$ is given. Determine the smallest natural number $n$, divisible by $p$, such that there exists an $n \times n$ divisor table, or prove that such $n$ does not exist.

Proposed by Pavle Martinović
8 replies
1 viewing
OgnjenTesic
May 22, 2025
atdaotlohbh
21 minutes ago
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standard Q FE
jasperE3   4
N Apr 26, 2025 by jasperE3
Source: gghx, p19004309
Find all functions $f:\mathbb Q\to\mathbb Q$ such that for any $x,y\in\mathbb Q$:
$$f(xf(x)+f(x+2y))=f(x)^2+f(y)+y.$$
4 replies
jasperE3
Apr 20, 2025
jasperE3
Apr 26, 2025
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standard Q FE
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Reveal topic tags
fe
functional equation
algebra
functional equation in Q
FE over Q
rational
function
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G H BBookmark kLocked kLocked NReply
Source: gghx, p19004309
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jasperE3
11385 posts
jasperE3
#1 Apr 20, 2025, 6:27 PM
Y by
Find all functions $f:\mathbb Q\to\mathbb Q$ such that for any $x,y\in\mathbb Q$:
$$f(xf(x)+f(x+2y))=f(x)^2+f(y)+y.$$
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ErTeeEs06
69 posts
ErTeeEs06
#2 Apr 20, 2025, 9:40 PM • 1 Y
Y by jasperE3
Seems like a nice problem! This is my current progress after 30 minutes of work. To be continued... (hopefully)

Denote the given assertion by $P(x, y)$.

$P(-1, 0)$ gives $f(-1)=0$. Now comparing $P(-1, \frac{x}{2})$ and $P(0, \frac{x}{2})$ gives that $$f(f(x))=f(f(x-1))+f(0)^2$$for all $x\in \mathbb{Q}$. From simple induction it follows that $$f(f(n))=(n+1)f(0)^2+f(0)$$for all integers $n$.

$P(0, -1)$ gives $-f(0)^2+f(0)=f(0)^2-1$ and this quadratic has solutions $f(0)=1, f(0)=-\frac{1}{2}$. I'll now split into 2 cases.

Case 1: $f(0)=1$

From the things found before we know $f(f(n))=n+2$ for all integers $n$ and $P(0, n)$ yields $2n+2=1+f(n)+n$ and therefore $f(n)=n+1$ for all integers $n$.

Case 2: $f(0)=-\frac{1}{2}$

From the things found before we know $f(f(n))=\frac{n-1}{4}$ and $P(0, n)$ yields $f(n)=-\frac{n+1}{2}$ for all integers $n$.
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jasperE3
11385 posts
jasperE3
#3 Apr 22, 2025, 4:18 AM
Y by
bump, above poster has the right idea, one more insight is needed (if you haven't seen this idea before)
ideas from the original thread may be useful
This post has been edited 1 time. Last edited by jasperE3, Apr 22, 2025, 4:31 AM
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ErTeeEs06
69 posts
ErTeeEs06
#4 Apr 22, 2025, 8:33 PM
Y by
jasperE3 wrote:
bump, above poster has the right idea, one more insight is needed (if you haven't seen this idea before)
ideas from the original thread may be useful

I tried for some more time but didn't really make progress. Only managed to find for all values of the form $\frac{n}{2^k}$ but no clue how to do it for other values. Can you give a hint?
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jasperE3
11385 posts
jasperE3
#5 Apr 26, 2025, 12:38 AM
Y by
ok ill post my solution
jasperE3 wrote:
Find all functions $f:\mathbb Q\to\mathbb Q$ such that for any $x,y\in\mathbb Q$:
$$f(xf(x)+f(x+2y))=f(x)^2+f(y)+y.$$

As in the $\mathbb R\to\mathbb R$ solution, we get $f\left(x+\frac12\right)=f(x)+f(0)^2-\frac12$ and $f(0)\in\left\{-\frac12,1\right\}$.

Case 1: $f(0)=1$
We have, for $x\in\mathbb Q$, $f\left(x+\frac12\right)=f(x)+\frac12$ and so $f(x+n)=f(x)+n$ for $n\in\mathbb N$ by induction.
Fix $x\in\mathbb Q$, let $n>0$ be the denominator of $x+f(x)$ in lowest terms so that $nx+nf(x)$ is an integer (existence guaranteed because $x+f(x)\in\mathbb Q$). Then using $P(x+n,y)$ and $P(x,y)$ we have:
\begin{align*} f(x)^2+f(y)+y+nx+nf(x)+n^2+n&=f(xf(x)+f(x+2y))+nx+nf(x)+n^2+n\\ &=f(xf(x)+f(x+2y)+nx+nf(x)+n^2+n)\\ &=f((x+n)(f(x)+n)+f(x+2y)+n)\\ &=f((x+n)f(x+n)+f(x+2y+n))\\ &=f(x+n)^2+f(y)+y\\ &=f(x)^2+2nf(x)+n^2+f(y)+y \end{align*}so simplifying we get $\boxed{f(x)=x+1}$ which satisfies the equation.

Case 2: $f(0)=-\frac12$
Similarly, we have, for $x\in\mathbb Q$, $f\left(x+\frac12\right)=f(x)-\frac14$ and so $f(x+n)=f(x)-\frac n2$ for $n\in\mathbb N$ by induction.
Fix $x\in\mathbb Q$, let $n>0$ be the denominator of $-x+2f(x)$ in lowest terms so that $-nx+2nf(x)$ is an integer (existence guaranteed because $-x+2f(x)\in\mathbb Q$). Then using $P(x+2n,y)$ and $P(x,y)$ we have:
\begin{align*} f(x)^2+f(y)+y+\frac12nx-nf(x)+n^2+\frac12n&=f(xf(x)+f(x+2y))+\frac12nx-nf(x)+n^2+\frac12n\\ &=f(xf(x)+f(x+2y)-nx+2nf(x)-2n^2-n)\\ &=f((x+2n)(f(x)-n)+f(x+2y)-n)\\ &=f((x+2n)f(x+2n)+f(x+2y+2n))\\ &=f(x+2n)^2+f(y)+y\\ &=f(x)^2-2nf(x)+n^2+f(y)+y \end{align*}so simplifying we get $\boxed{f(x)=\frac{-x-1}2}$ which satisfies the equation.
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