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dchenmathcounts   45
N 37 minutes ago by EpicBird08
Source: USEMO 2019/1
Let $ABCD$ be a cyclic quadrilateral. A circle centered at $O$ passes through $B$ and $D$ and meets lines $BA$ and $BC$ again at points $E$ and $F$ (distinct from $A,B,C$). Let $H$ denote the orthocenter of triangle $DEF.$ Prove that if lines $AC,$ $DO,$ $EF$ are concurrent, then triangle $ABC$ and $EHF$ are similar.

Robin Son
45 replies
dchenmathcounts
May 23, 2020
EpicBird08
37 minutes ago
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A board with crosses that we color
nAalniaOMliO   3
N an hour ago by nAalniaOMliO
Source: Belarusian National Olympiad 2025
In some cells of the table $2025 \times 2025$ crosses are placed. A set of 2025 cells we will call balanced if no two of them are in the same row or column. It is known that any balanced set has at least $k$ crosses.
Find the minimal $k$ for which it is always possible to color crosses in two colors such that any balanced set has crosses of both colors.
3 replies
nAalniaOMliO
Mar 28, 2025
nAalniaOMliO
an hour ago
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April Fools Geometry
awesomeming327.   6
N an hour ago by GreekIdiot
Let $ABC$ be an acute triangle with $AB<AC$, and let $D$ be the projection from $A$ onto $BC$. Let $E$ be a point on the extension of $AD$ past $D$ such that $\angle BAC+\angle BEC=90^\circ$. Let $L$ be on the perpendicular bisector of $AE$ such that $L$ and $C$ are on the same side of $AE$ and
\[\frac12\angle ALE=1.4\angle ABE+3.4\angle ACE-558^\circ\]Let the reflection of $D$ across $AB$ and $AC$ be $W$ and $Y$, respectively. Let $X\in AW$ and $Z\in AY$ such that $\angle XBE=\angle ZCE=90^\circ$. Let $EX$ and $EZ$ intersect the circumcircles of $EBD$ and $ECD$ at $J$ and $K$, respectively. Let $LB$ and $LC$ intersect $WJ$ and $YK$ at $P$ and $Q$. Let $PQ$ intersect $BC$ at $F$. Prove that $FB/FC=DB/DC$.
6 replies
1 viewing
awesomeming327.
Apr 1, 2025
GreekIdiot
an hour ago
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Functional equations
hanzo.ei   14
N an hour ago by jasperE3
Source: Greekldiot
Find all $f: \mathbb R_+ \rightarrow \mathbb R_+$ such that $f(xf(y)+f(x))=yf(x+yf(x)) \: \forall \: x,y \in \mathbb R_+$
14 replies
hanzo.ei
Mar 29, 2025
jasperE3
an hour ago
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Problem 1
SlovEcience   2
N an hour ago by Raven_of_the_old
Prove that
\[ C(p-1, k-1) \equiv (-1)^{k-1} \pmod{p} \]for \( 1 \leq k \leq p-1 \), where \( C(n, m) \) is the binomial coefficient \( n \) choose \( m \).
2 replies
SlovEcience
3 hours ago
Raven_of_the_old
an hour ago
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Conditional maximum
giangtruong13   1
N 2 hours ago by giangtruong13
Source: Specialized Math
Let $a,b$ satisfy that: $1 \leq a \leq2$ and $1 \leq b \leq 2$. Find the maximum: $$A=(a+b^2+\frac{4}{a^2}+\frac{2}{b})(b+a^2+\frac{4}{b^2}+\frac{2}{a})$$
1 reply
giangtruong13
Mar 22, 2025
giangtruong13
2 hours ago
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four variables inequality
JK1603JK   0
2 hours ago
Source: unknown?
Prove that $$27(a^4+b^4+c^4+d^4)+148abcd\ge (a+b+c+d)^4,\ \ \forall a,b,c,d\ge 0.$$
0 replies
1 viewing
JK1603JK
2 hours ago
0 replies
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a hard geometry problen
Tuguldur   0
2 hours ago
Let $ABCD$ be a convex quadrilateral. Suppose that the circles with diameters $AB$ and $CD$ intersect at points $X$ and $Y$. Let $P=AC\cap BD$ and $Q=AD\cap BC$. Prove that the points $P$, $Q$, $X$ and $Y$ are concyclic.
( $AB$ and $CD$ are not the diagnols)
0 replies
Tuguldur
2 hours ago
0 replies
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Regarding Maaths olympiad prepration
omega2007   1
N 2 hours ago by GreekIdiot
<Hey Everyone'>
I'm 10 grader student and Im starting prepration for maths olympiad..>>> From scratch (not 2+2=4 )

Do you haves compilled resources of Handouts,
PDF,
Links,
List of books topic wise
which are shared on AOPS (and from your prespective) for maths olympiad and any useful thing, which will help me in boosting Maths olympiad prepration.
1 reply
omega2007
3 hours ago
GreekIdiot
2 hours ago
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Induction
Mathlover_1   2
N 2 hours ago by GreekIdiot
Hello, can you share links of same interesting induction problems in algebra
2 replies
Mathlover_1
Mar 24, 2025
GreekIdiot
2 hours ago
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n-gon function
ehsan2004   10
N 2 hours ago by Zany9998
Source: Romanian IMO Team Selection Test TST 1996, problem 1
Let $ f: \mathbb{R}^2 \rightarrow \mathbb{R} $ be a function such that for every regular $ n $-gon $ A_1A_2 \ldots A_n $ we have $ f(A_1)+f(A_2)+\cdots +f(A_n)=0 $. Prove that $ f(x)=0 $ for all reals $ x $.
10 replies
ehsan2004
Sep 13, 2005
Zany9998
2 hours ago
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Geometry
T.N.T   3
N Jan 3, 2022 by jayme
In triangle $ABC$ right angled at $A$ ,$AH$ is altitude.prove that :The center of the inscribed circle $ABH$ , the center of the inscribed circle $ACH$ and $B$ and $C$ make a cyclic quadrilateral.
3 replies
T.N.T
Nov 29, 2016
jayme
Jan 3, 2022
J
Geometry
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Reveal topic tags
geometry
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T.N.T
8 posts
T.N.T
#1 Nov 29, 2016, 5:45 PM • 1 Y
Y by Adventure10
In triangle $ABC$ right angled at $A$ ,$AH$ is altitude.prove that :The center of the inscribed circle $ABH$ , the center of the inscribed circle $ACH$ and $B$ and $C$ make a cyclic quadrilateral.
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jayme
9775 posts
jayme
#2 Nov 30, 2016, 6:16 AM • 2 Y
Y by Adventure10, Mango247
Dear,

see : http://www.artofproblemsolving.com/community/c6t48f6h1208052_incircle_problem

Sincerely
Jean-Louis
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T.N.T
8 posts
T.N.T
#3 Nov 30, 2016, 10:30 AM • 2 Y
Y by Adventure10, Mango247
Thanks...
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jayme
9775 posts
jayme
#4 Jan 3, 2022, 10:52 AM
Y by
Dear Mathlinkers,

here

Sincerely
Jean-Louis
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