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k a May Highlights and 2025 AoPS Online Class Information
jlacosta   0
May 1, 2025
May is an exciting month! National MATHCOUNTS is the second week of May in Washington D.C. and our Founder, Richard Rusczyk will be presenting a seminar, Preparing Strong Math Students for College and Careers, on May 11th.

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[*]May 21st, 4:00pm PT/7:00pm ET, Mathcamp 2025 Qualifying Quiz Part 2 Math Jam, Problems 5 and 6, Canada/USA Mathcamp staff will discuss solutions to Problems 5 and 6 of the 2025 Mathcamp Qualifying Quiz![/list]
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0 replies
jlacosta
May 1, 2025
0 replies
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Simple triangle geometry [a fixed point]
darij grinberg   49
N 6 minutes ago by cj13609517288
Source: German TST 2004, IMO ShortList 2003, geometry problem 2
Three distinct points $A$, $B$, and $C$ are fixed on a line in this order. Let $\Gamma$ be a circle passing through $A$ and $C$ whose center does not lie on the line $AC$. Denote by $P$ the intersection of the tangents to $\Gamma$ at $A$ and $C$. Suppose $\Gamma$ meets the segment $PB$ at $Q$. Prove that the intersection of the bisector of $\angle AQC$ and the line $AC$ does not depend on the choice of $\Gamma$.
49 replies
darij grinberg
May 18, 2004
cj13609517288
6 minutes ago
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Kosovo MO 2010 Problem 5
Com10atorics   19
N 15 minutes ago by CM1910
Source: Kosovo MO 2010 Problem 5
Let $x,y$ be positive real numbers such that $x+y=1$. Prove that
$\left(1+\frac {1}{x}\right)\left(1+\frac {1}{y}\right)\geq 9$.
19 replies
Com10atorics
Jun 7, 2021
CM1910
15 minutes ago
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Hard combi
EeEApO   1
N 21 minutes ago by EeEApO
In a quiz competition, there are a total of $100 $questions, each with $4$ answer choices. A participant who answers all questions correctly will receive a gift. To ensure that at least one member of my family answers all questions correctly, how many family members need to take the quiz?

Now, suppose my spouse and I move into a new home. Every year, we have twins. Starting at the age of $16$, each of our twin children also begins to have twins every year. If this pattern continues, how many years will it take for my family to grow large enough to have the required number of members to guarantee winning the quiz gift?
1 reply
EeEApO
2 hours ago
EeEApO
21 minutes ago
J
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Problem on symmetric polynomial
ayan_mathematics_king   5
N 23 minutes ago by bjump
If $a^3+b^3+c^3=(a+b+c)^3$, prove that $a^5+b^5+c^5=(a+b+c)^5$ where $a,b,c \in \mathbb{R}$
5 replies
ayan_mathematics_king
Jul 28, 2019
bjump
23 minutes ago
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No more topics!
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Two circumscribed circles
BogG   3
N Feb 24, 2012 by horizon
Source: Swiss Imo Selection 2006
Let $D$ be inside $\triangle ABC$ and $E$ on $AD$ different to $D$. Let $\omega_1$ and $\omega_2$ be the circumscribed circles of $\triangle BDE$ and $\triangle CDE$ respectively. $\omega_1$ and $\omega_2$ intersect $BC$ in the interior points $F$ and $G$ respectively. Let $X$ be the intersection between $DG$ and $AB$ and $Y$ the intersection between $DF$ and $AC$. Show that $XY$ is $\|$ to $BC$.
3 replies
BogG
May 25, 2006
horizon
Feb 24, 2012
J
Two circumscribed circles
G H J
Reveal topic tags
geometry
circumcircle
power of a point
radical axis
geometry proposed
L
G H BBookmark kLocked kLocked NReply
Source: Swiss Imo Selection 2006
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BogG
60 posts
BogG
#1 May 25, 2006, 9:44 PM • 2 Y
Y by Adventure10, Mango247
Let $D$ be inside $\triangle ABC$ and $E$ on $AD$ different to $D$. Let $\omega_1$ and $\omega_2$ be the circumscribed circles of $\triangle BDE$ and $\triangle CDE$ respectively. $\omega_1$ and $\omega_2$ intersect $BC$ in the interior points $F$ and $G$ respectively. Let $X$ be the intersection between $DG$ and $AB$ and $Y$ the intersection between $DF$ and $AC$. Show that $XY$ is $\|$ to $BC$.
This post has been edited 3 times. Last edited by BogG, May 26, 2006, 2:15 PM
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grobber
7849 posts
grobber
#2 May 26, 2006, 7:22 AM • 2 Y
Y by Adventure10 and 1 other user
Let $P=DE\cap BC$. By Menelaus in $ABP,ACP$ with transversals $DG$ and $DF$ respectively, we see that $\frac{XB}{XA}=\frac{DP}{DA}\cdot\frac{GB}{GP}$, and $\frac{YC}{YA}=\frac{DP}{DA}\cdot\frac{FC}{FP}$. Proving that the two LHS's in the expressions above are equal is then equivalent to proving that $\frac{GB}{GP}=\frac{FC}{FP}$, which, in turn, is equivalent to $PF\cdot PB=PG\cdot PC$. This is just another way of saying that the powers of $P$ wrt $\omega_1,\omega_2$ are equal, which is clear because $P$ belongs to the radical axis $DE$ of the two circles.


P.S.

You said $\omega_1$ is the circumcircle of $BDC$. I'm pretty sure, however, that you meant $BDE$, right?
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BogG
60 posts
BogG
#3 May 26, 2006, 8:47 AM • 2 Y
Y by Adventure10, Mango247
I'm sorry you are right it's $\triangle BDE$ :D

And it was also my solution with menelaos :roll:
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horizon
404 posts
horizon
#4 Feb 24, 2012, 3:56 PM • 2 Y
Y by Adventure10, Mango247
see here:
http://www.artofproblemsolving.com/Forum/viewtopic.php?t=79779
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