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k a April Highlights and 2025 AoPS Online Class Information
jlacosta   0
Apr 2, 2025
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0 replies
jlacosta
Apr 2, 2025
0 replies
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Cool combinatorial problem (grid)
Anto0110   1
N 7 minutes ago by Anto0110
Suppose you have an $m \cdot n$ grid with $m$ rows and $n$ columns, and each square of the grid is filled with a non-negative integer. Let $a$ be the average of all the numbers in the grid. Prove that if $m >(10a+10)^n$ the there exist two identical rows (meaning same numbers in the same order).
1 reply
Anto0110
Yesterday at 1:57 PM
Anto0110
7 minutes ago
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one nice!
teomihai   2
N 23 minutes ago by teomihai
3 girls and 4 boys must be seated at a round table. In how many distinct ways can they be seated so that the 3 girls do not sit next to each other and there can be a maximum of 2 girls next to each other. (The table is round so the seats are not numbered.)
2 replies
teomihai
Yesterday at 7:32 PM
teomihai
23 minutes ago
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Find the constant
JK1603JK   0
27 minutes ago
Source: unknown
Find all $k$ such that $$\left(a^{3}+b^{3}+c^{3}-3abc\right)^{2}-\left[a^{3}+b^{3}+c^{3}+3abc-ab(a+b)-bc(b+c)-ca(c+a)\right]^{2}\ge 2k\cdot(a-b)^{2}(b-c)^{2}(c-a)^{2}$$forall $a,b,c\ge 0.$
0 replies
JK1603JK
27 minutes ago
0 replies
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IMO ShortList 1999, number theory problem 1
orl   61
N an hour ago by cursed_tangent1434
Source: IMO ShortList 1999, number theory problem 1
Find all the pairs of positive integers $(x,p)$ such that p is a prime, $x \leq 2p$ and $x^{p-1}$ is a divisor of $ (p-1)^{x}+1$.
61 replies
orl
Nov 13, 2004
cursed_tangent1434
an hour ago
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Olympiad
sasu1ke   3
N Today at 1:00 AM by sasu1ke
IMAGE
3 replies
sasu1ke
Yesterday at 11:52 PM
sasu1ke
Today at 1:00 AM
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How to judge a number is prime or not?
mingzhehu   1
N Yesterday at 11:14 PM by scrabbler94
A=(10X1+1)(10X+1),X1,X∈N+
B=(10 X1+3)(10X+7),X∈N,X1∈N
C=(10 X1+9)(10X+9), X∈N,X1∈N
D=(10 X1+1)(10X+3), X1∈N+,X∈N
E=(10 X1+7)(10X+9),X∈N,X1∈N
F=(10 X1+1)(10X+7),X1∈N+,X∈N
G=(10 X1+3)(10X+9),X∈N,X1∈N
H=(10 X1+1)10X+9),X1∈N+,X∈N
I=(10 X1+3)(10X+3),X1∈N,X∈N
J=( 10X1+7)(10X+7),X∈N,X1∈N

For any natural number P∈{P=10N+1,n∈N},make P=A or B or C
If P can make the roots of function group(ABC) without any root group completely made up of integer, P will be a prime
For any natural number P∈{P=10N+3,n∈N},make P=D or E
If P can make the roots of function group(DE) without any root group completely made up
of integer, P will be a prime
For any natural number P∈{P=10N+7,n∈N},make P=F or G
If P can make the roots of function group(FG) without any root group completely made up
of integer, P will be a prime
For any natural number P∈{P=10N+9,n∈N},make P=H or I or J
If P can make the roots of function group(GIJ) without any root group completely made up
of integer, P will be a prime
1 reply
mingzhehu
Yesterday at 2:45 PM
scrabbler94
Yesterday at 11:14 PM
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inequality
revol_ufiaw   3
N Yesterday at 2:55 PM by MS_asdfgzxcvb
Prove that that for any real $x \ge 0$ and natural number $n$,
$$x^n (n+1)^{n+1} \le n^n (x+1)^{n+1}.$$
3 replies
revol_ufiaw
Yesterday at 2:05 PM
MS_asdfgzxcvb
Yesterday at 2:55 PM
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What is an isogonal conjugate and why is it useful?
EaZ_Shadow   6
N Yesterday at 2:40 PM by maxamc
What is an isogonal conjugate and why is it useful? People use them in Olympiad geometry proofs but I don’t understand why and what is the purpose, as it complicates me because of me not understanding it.
6 replies
EaZ_Shadow
Dec 28, 2024
maxamc
Yesterday at 2:40 PM
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Any nice way to do this?
NamelyOrange   3
N Yesterday at 2:00 PM by pooh123
Source: Taichung P.S.1 math program tryouts

How many ordered pairs $(a,b,c)\in\mathbb{N}^3$ are there such that $c=ab$ and $1\le a\le b\le c\le60$?
3 replies
NamelyOrange
Apr 2, 2025
pooh123
Yesterday at 2:00 PM
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Inequalities
sqing   3
N Yesterday at 2:00 PM by sqing
Let $ a,b,c> 0 $ and $ \frac{a}{a^2+ab+c}+\frac{b}{b^2+bc+a}+\frac{c}{c^2+ca+b} \geq 1$. Prove that
$$ a+b+c\leq 3 $$
3 replies
sqing
Apr 4, 2025
sqing
Yesterday at 2:00 PM
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Inequalities
sqing   0
Yesterday at 1:10 PM
Let $a,b$ be real numbers such that $ a^2+b^2+a^3 +b^3=4 . $ Prove that
$$a+b \leq 2$$Let $a,b$ be real numbers such that $a+b + a^2+b^2+a^3 +b^3=6 . $ Prove that
$$a+b \leq 2$$
0 replies
sqing
Yesterday at 1:10 PM
0 replies
J
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that statement is true
pennypc123456789   3
N Yesterday at 12:32 PM by sqing
we have $a^3+b^3 = 2$ and $3(a^4+b^4)+2a^4b^4 \le 8 $ , then we can deduce $a^2+b^2$ \le 2 $ ?
3 replies
pennypc123456789
Mar 23, 2025
sqing
Yesterday at 12:32 PM
J
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Distance vs time swimming problem
smalkaram_3549   1
N Yesterday at 11:54 AM by Lankou
How should I approach a problem where we deal with velocities becoming negative and stuff. I know that they both travel 3 Lengths of the pool before meeting a second time.
1 reply
smalkaram_3549
Yesterday at 2:57 AM
Lankou
Yesterday at 11:54 AM
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.problem.
Cobedangiu   4
N Yesterday at 11:40 AM by Lankou
Find the integer coefficients after expanding Newton's binomial:
$$(\frac{3}{2}-\frac{2}{3}x^2)^n (n \in Z)$$
4 replies
Cobedangiu
Apr 4, 2025
Lankou
Yesterday at 11:40 AM
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Mexican midpoint
parmenides51   4
N Mar 26, 2020 by EulersTurban
Source: Mexican Mathematical Olympiad 2006 P5
Let $ABC$ be an acute triangle , with altitudes $AD,BE$ and $CF$. Circle of diameter $AD$ intersects the sides $AB,AC$ in $M,N$ respevtively. Let $P,Q$ be the intersection points of $AD$ with $EF$ and $MN$ respectively. Show that $Q$ is the midpoint of $PD$.
4 replies
parmenides51
Jul 31, 2018
EulersTurban
Mar 26, 2020
J
Mexican midpoint
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Source: Mexican Mathematical Olympiad 2006 P5
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parmenides51
30629 posts
parmenides51
#1 Jul 31, 2018, 12:21 PM • 2 Y
Y by GeometryWorld, Adventure10
Let $ABC$ be an acute triangle , with altitudes $AD,BE$ and $CF$. Circle of diameter $AD$ intersects the sides $AB,AC$ in $M,N$ respevtively. Let $P,Q$ be the intersection points of $AD$ with $EF$ and $MN$ respectively. Show that $Q$ is the midpoint of $PD$.
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AlastorMoody
2125 posts
AlastorMoody
#2 Apr 1, 2019, 1:56 PM • 1 Y
Y by Adventure10
Note: Though this solution doesn't require $BMNC$ cyclic, still I'll prove it :D
$$\angle AMN=\angle ADN=\angle AFE \implies FE||MN \implies BMNC \text{ is cyclic}$$Let $E'$ be the reflection of $E$ over $AB$ $\implies$ $E' \in \odot (ABDE)$, then,
$$\angle E'FE=2\angle AFE=2\angle BFD=2(90^{\circ}-\angle DFC)=180^{\circ}-\angle DFE$$Hence, $E'F$ passes through $D$ and if $D'$ is the reflection of $D$ over $AB$ $\implies$ $EF$ passes through $D'$, hence homothety at $D$ with magnitude $\frac{1}{2}$ sends $EF$ $\mapsto$ $MN$ $\implies $ $PQ=QD$
This post has been edited 1 time. Last edited by AlastorMoody, Apr 1, 2019, 2:50 PM
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a_simple_guy
121 posts
a_simple_guy
#3 Apr 2, 2019, 2:14 AM • 2 Y
Y by Adventure10, Mango247
Alternative Solution:-
Note that $\odot(AEF)$ and $\odot(AMN)$ are tangent at $A$. Hence the homothety at $A$ which sends $(AEF) \longrightarrow (AMN)$ sends $MN \longrightarrow EF \implies MN \parallel EF$. Now let $DF \cap MN=J$ and $DE \cap MN=K$. Note that $\angle FMJ=\angle AFP =\angle AHE = \angle BHD =\angle BFD=\angle MHD \implies JF=JM$. Now since $\triangle MFJ$ is right angle at $M$, hence J is the midpoint of $DF$ and similarly $K$ is the midpoint of $DE$. So there is a homothety centred at $D$ sends $JK \longrightarrow MN$ and it sends $Q \longrightarrow P$ and we are done.
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khanhnx
1618 posts
khanhnx
#4 Apr 2, 2019, 1:05 PM • 3 Y
Y by DashTheSup, Adventure10, Mango247
Let $M'$, $N'$ be reflections of $D$ through $AB$, $AC$, respectively
We have: $\widehat{BFM'}$ = $\widehat{BFD}$ = $\widehat{ACB}$ = $\widehat{AFE}$
So: $M'$ $\in$ $EF$
Similarly: $N'$ $\in$ $EF$
But: $AD^2$ = $\overline{AM}$ . $\overline{AB}$ = $\overline{AN}$ . $\overline{AC}$ then $B$, $C$, $N$, $M$ lie on a circle
Combine with: $B$, $C$, $E$, $F$ lie on a circle, we have: $EF$ $\parallel$ $MN$
Hence: $\dfrac{\overline{DQ}}{\overline{DP}}$ = $\dfrac{\overline{DM}}{\overline{DM'}}$ = $\dfrac{1}{2}$ or $Q$ is midpoint of $DP$
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EulersTurban
386 posts
EulersTurban
#5 Mar 26, 2020, 1:29 PM
Y by
https://i.imgur.com/VSdrP6d.png


So first of all denote by $\alpha = \angle A$,$\beta = \angle B$ and $\gamma = \angle C$,and denote by $H_k(A)$ a homothety centered at A with homothetic coeficient k.
So in our problem it is easy to see that $\triangle AMD \sim \triangle AFH$ and $\triangle AND \sim \triangle AEH$,where $H$ is the orthocenter of the triangle $\triangle ABC$.Form these similarity relations and from the cyclic quad $AMDN$ we have that $FE \parallel MN$.Thus we have that $\triangle AMN \sim \triangle AFE$.Thus we have a $H_k(A)$,where $k$ is:
$$k = \frac{AH}{AD} =\frac{AB.\frac{cos\alpha}{sin\gamma}}{AB.sin\beta} = \frac{cos\alpha}{sin\beta.sin\gamma}$$Thus we have the following:
$$AD-AP=PD$$$$\frac{1}{k}AH-AP = PQ+QD$$$$\frac{1}{k}(AP+PH)-AP=PQ+QD$$$$(\frac{1}{k}-1)AP+\frac{1}{k}PH=PQ+QD$$$$(\frac{1}{k}-1)AP=PQ$$Since $\frac{1}{k}PH = QD$ (this is easily seen from the similarities of $\triangle MDN \sim \triangle FHE$ and $\triangle AMD \sim \triangle AFH$).
So now we ask ourselves what is the value of $\frac{AD}{AP}$,this can be easily calculated:
$$ \frac{AD}{AP} = \frac{\frac{1}{sin \beta} AM}{\frac{sin \gamma}{sin(90+\beta-\gamma}.AF} = \frac{sin(90+\beta-\gamma)}{sin\beta sin\gamma}\frac{1}{k} = \frac{sin(90+\beta-\gamma)}{cos \alpha}$$Thus we have the following:
$$AP+(\frac{1}{k}-1)AP+QD=\frac{sin(90+\beta-\gamma)}{cos\alpha}AP$$Solving this for $QD$ we get that $PQ=QD$....... :D
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