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Woaah a lot of external tangents
egxa   3
N 16 minutes ago by NO_SQUARES
Source: All Russian 2025 11.7
A quadrilateral \( ABCD \) with no parallel sides is inscribed in a circle \( \Omega \). Circles \( \omega_a, \omega_b, \omega_c, \omega_d \) are inscribed in triangles \( DAB, ABC, BCD, CDA \), respectively. Common external tangents are drawn between \( \omega_a \) and \( \omega_b \), \( \omega_b \) and \( \omega_c \), \( \omega_c \) and \( \omega_d \), and \( \omega_d \) and \( \omega_a \), not containing any sides of quadrilateral \( ABCD \). A quadrilateral whose consecutive sides lie on these four lines is inscribed in a circle \( \Gamma \). Prove that the lines joining the centers of \( \omega_a \) and \( \omega_c \), \( \omega_b \) and \( \omega_d \), and the centers of \( \Omega \) and \( \Gamma \) all intersect at one point.
3 replies
egxa
Apr 18, 2025
NO_SQUARES
16 minutes ago
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2023 Hong Kong TST 3 (CHKMO) Problem 4
PikaNiko   3
N 26 minutes ago by lightsynth123
Source: 2023 Hong Kong TST 3 (CHKMO)
Let $ABCD$ be a quadrilateral inscribed in a circle $\Gamma$ such that $AB=BC=CD$. Let $M$ and $N$ be the midpoints of $AD$ and $AB$ respectively. The line $CM$ meets $\Gamma$ again at $E$. Prove that the tangent at $E$ to $\Gamma$, the line $AD$ and the line $CN$ are concurrent.
3 replies
PikaNiko
Dec 3, 2022
lightsynth123
26 minutes ago
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trolling geometry problem
iStud   4
N Yesterday at 3:11 AM by GreenTea2593
Source: Monthly Contest KTOM April P3 Essay
Given a cyclic quadrilateral $ABCD$ with $BC<AD$ and $CD<AB$. Lines $BC$ and $AD$ intersect at $X$, and lines $CD$ and $AB$ intersect at $Y$. Let $E,F,G,H$ be the midpoints of sides $AB,BC,CD,DA$, respectively. Let $S$ and $T$ be points on segment $EG$ and $FH$, respectively, so that $XS$ is the angle bisector of $\angle{DXA}$ and $YT$ is the angle bisector of $\angle{DYA}$. Prove that $TS$ is parallel to $BD$ if and only if $AC$ divides $ABCD$ into two triangles with equal area.
4 replies
iStud
Monday at 9:28 PM
GreenTea2593
Yesterday at 3:11 AM
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Equal distances between pairs of orthocenters in cyclic quad
Shu   2
N Apr 20, 2025 by Nari_Tom
Source: XVII Tuymaada Mathematical Olympiad (2010), Senior Level
In a cyclic quadrilateral $ABCD$, the extensions of sides $AB$ and $CD$ meet at point $P$, and the extensions of sides $AD$ and $BC$ meet at point $Q$. Prove that the distance between the orthocenters of triangles $APD$ and $AQB$ is equal to the distance between the orthocenters of triangles $CQD$ and $BPC$.
2 replies
Shu
Jul 31, 2011
Nari_Tom
Apr 20, 2025
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NEPAL TST 2025 DAY 2
Tony_stark0094   9
N Apr 17, 2025 by hectorleo123
Consider an acute triangle $\Delta ABC$. Let $D$ and $E$ be the feet of the altitudes from $A$ to $BC$ and from $B$ to $AC$ respectively.

Define $D_1$ and $D_2$ as the reflections of $D$ across lines $AB$ and $AC$, respectively. Let $\Gamma$ be the circumcircle of $\Delta AD_1D_2$. Denote by $P$ the second intersection of line $D_1B$ with $\Gamma$, and by $Q$ the intersection of ray $EB$ with $\Gamma$.

If $O$ is the circumcenter of $\Delta ABC$, prove that $O$, $D$, and $Q$ are collinear if and only if quadrilateral $BCQP$ can be inscribed within a circle.

$\textbf{Proposed by Kritesh Dhakal, Nepal.}$
9 replies
Tony_stark0094
Apr 12, 2025
hectorleo123
Apr 17, 2025
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Quad formed by orthocenters has same area (all 7's!)
v_Enhance   35
N Apr 16, 2025 by Wictro
Source: USA January TST for the 55th IMO 2014
Let $ABCD$ be a cyclic quadrilateral, and let $E$, $F$, $G$, and $H$ be the midpoints of $AB$, $BC$, $CD$, and $DA$ respectively. Let $W$, $X$, $Y$ and $Z$ be the orthocenters of triangles $AHE$, $BEF$, $CFG$ and $DGH$, respectively. Prove that the quadrilaterals $ABCD$ and $WXYZ$ have the same area.
35 replies
v_Enhance
Apr 28, 2014
Wictro
Apr 16, 2025
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Nice Quadrilateral Geo
amuthup   52
N Apr 14, 2025 by Frd_19_Hsnzde
Source: 2021 ISL G4
Let $ABCD$ be a quadrilateral inscribed in a circle $\Omega.$ Let the tangent to $\Omega$ at $D$ meet rays $BA$ and $BC$ at $E$ and $F,$ respectively. A point $T$ is chosen inside $\triangle ABC$ so that $\overline{TE}\parallel\overline{CD}$ and $\overline{TF}\parallel\overline{AD}.$ Let $K\ne D$ be a point on segment $DF$ satisfying $TD=TK.$ Prove that lines $AC,DT,$ and $BK$ are concurrent.
52 replies
amuthup
Jul 12, 2022
Frd_19_Hsnzde
Apr 14, 2025
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IMO Problem 4
iandrei   105
N Apr 13, 2025 by cj13609517288
Source: IMO ShortList 2003, geometry problem 1
Let $ABCD$ be a cyclic quadrilateral. Let $P$, $Q$, $R$ be the feet of the perpendiculars from $D$ to the lines $BC$, $CA$, $AB$, respectively. Show that $PQ=QR$ if and only if the bisectors of $\angle ABC$ and $\angle ADC$ are concurrent with $AC$.
105 replies
iandrei
Jul 14, 2003
cj13609517288
Apr 13, 2025
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cyclic quadrilateral starting with right triangle
parmenides51   4
N Apr 12, 2025 by Rounak_iitr
Source: Australian MO 2015
Let $ABC$ be a triangle with $ACB = 90^o$. The points $D$ and $Z$ lie on the side $AB$ such that $CD$ is perpendicular to $AB$ and $AC = AZ$. The line that bisects $BAC$ meets $CB$ and $CZ$ at $X$ and $Y$ , respectively. Prove that the quadrilateral $BXYD$ is cyclic.
4 replies
parmenides51
Sep 24, 2018
Rounak_iitr
Apr 12, 2025
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H not needed
dchenmathcounts   46
N Apr 11, 2025 by endless_abyss
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
46 replies
dchenmathcounts
May 23, 2020
endless_abyss
Apr 11, 2025
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Diagonal of a pentagon that divides it into a triangle and a cyclic quadrilatera
EmersonSoriano   0
Apr 5, 2025
Source: 2017 Peru Southern Cone TST P1
We say that a diagonal of a convex pentagon is good if it divides the pentagon into a triangle and a circumscribable quadrilateral. What is the maximum number of good diagonals that a convex pentagon can have?

Clarification: A polygon is circumscribable if there is a circle tangent to each of its sides.
0 replies
EmersonSoriano
Apr 5, 2025
0 replies
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The locus of P with supplementary angles condition
WakeUp   3
N Apr 4, 2025 by Nari_Tom
Source: Baltic Way 2001
Given a rhombus $ABCD$, find the locus of the points $P$ lying inside the rhombus and satisfying $\angle APD+\angle BPC=180^{\circ}$.
3 replies
WakeUp
Nov 17, 2010
Nari_Tom
Apr 4, 2025
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APMO 2016: Great triangle
shinichiman   26
N Apr 6, 2025 by ray66
Source: APMO 2016, problem 1
We say that a triangle $ABC$ is great if the following holds: for any point $D$ on the side $BC$, if $P$ and $Q$ are the feet of the perpendiculars from $D$ to the lines $AB$ and $AC$, respectively, then the reflection of $D$ in the line $PQ$ lies on the circumcircle of the triangle $ABC$. Prove that triangle $ABC$ is great if and only if $\angle A = 90^{\circ}$ and $AB = AC$.

Senior Problems Committee of the Australian Mathematical Olympiad Committee
26 replies
shinichiman
May 16, 2016
ray66
Apr 6, 2025
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APMO 2016: Great triangle
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circumcircle
APMO
geometry solved
functional equation
right triangle
reflection
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Source: APMO 2016, problem 1
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shinichiman
3212 posts
shinichiman
#1 May 16, 2016, 8:51 PM • 10 Y
Y by buratinogigle, rightways, YadisBeles, Kezer, Davi-8191, R8450932, UpvoteFarm, Adventure10, Mango247, Rounak_iitr
We say that a triangle $ABC$ is great if the following holds: for any point $D$ on the side $BC$, if $P$ and $Q$ are the feet of the perpendiculars from $D$ to the lines $AB$ and $AC$, respectively, then the reflection of $D$ in the line $PQ$ lies on the circumcircle of the triangle $ABC$. Prove that triangle $ABC$ is great if and only if $\angle A = 90^{\circ}$ and $AB = AC$.

Senior Problems Committee of the Australian Mathematical Olympiad Committee
This post has been edited 1 time. Last edited by MellowMelon, May 18, 2017, 3:29 AM
Reason: add proposer
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djmathman
7938 posts
djmathman
#2 May 16, 2016, 9:16 PM • 10 Y
Y by A_Math_Lover, Ankoganit, ks_789, Tafi_ak, bobjoe123, ike.chen, jrsbr, UpvoteFarm, Adventure10, Mango247
Oh man, a geometric functional equation - interesting.

Solution
This post has been edited 2 times. Last edited by djmathman, May 16, 2016, 9:39 PM
Reason: reworded something small
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62861
3564 posts
62861
#3 May 16, 2016, 9:19 PM • 2 Y
Y by UpvoteFarm, Adventure10
djmathman wrote:
Oh man, a geometric functional equation - interesting.

Solution

You need to show that a 45-45-90 triangle is great as well (which is not completely trivial).
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djmathman
7938 posts
djmathman
#4 May 16, 2016, 9:33 PM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
Oops that is true. It seems that I have forgotten the first fundamental rule of functional equations - one must always plug the solution back in to make sure it checks!

Fortunately this isn't too bad
This post has been edited 3 times. Last edited by djmathman, May 16, 2016, 9:46 PM
Reason: mislabeled points in original writeup oops
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trumpeter
3332 posts
trumpeter
#6 May 16, 2016, 10:36 PM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
djmathman wrote:
With this in mind, set $D$ to be the foot of the altitude from $A$ to $\overline{BC}$...

Just to put it out there, it is fairly easy to length-chase to get $AB=AC$ from here by using polynomials.
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navi_09220114
476 posts
navi_09220114
#7 May 17, 2016, 12:28 PM • 4 Y
Y by Tafi_ak, UpvoteFarm, Adventure10, Mango247
You can actually take D to be midpoint of BC, then to prove AB=AC will be easier, because then the feet of D to AB and AC is the midline,and D'A will then be parallel to BC... (of course, this is after you proved BAC=90 using angle bisector.)
This post has been edited 1 time. Last edited by navi_09220114, May 17, 2016, 1:01 PM
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math90
1476 posts
math90
#8 May 17, 2016, 1:01 PM • 2 Y
Y by UpvoteFarm, Adventure10
First of all choose $D$ to be the foot of angle bisector from $A$. From here we obtain $\angle BAC=90$ by angle chasing. Now use the first observation and choose $D$ to be the foot of perpendicular from $A$. Now by length chasing and triangle similarity, we obtain $AB=AC$.
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WizardMath
2487 posts
WizardMath
#9 May 17, 2016, 2:39 PM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
$\phantom{}$
This post has been edited 1 time. Last edited by WizardMath, Dec 24, 2019, 2:24 PM
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Complex2Liu
83 posts
Complex2Liu
#10 May 17, 2016, 4:30 PM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
First we select $D$ as the intersection of $AO$ and $\overline{BC}.$ Let $E$ denotes the foot from $A$ to $\overline{BC},$ and $D^*,E^*$ denote the reflection of $D,E$ in line $PQ$ respectively. Since $PQ$ is parallel to $BC,$ it's easy to see that $E^*$ is the orthocenter of $\triangle APQ,$ which implies that $E^*$ and $D^*$ are symmetry over the perpendicular bisector of $\overline{BC},$ in other words, \[D^*\text{ lies on the circumcircle of }\triangle ABC\iff\angle BD^*C=\angle BE^*C=\angle A\iff E^*\equiv A.\]Therefore $PQ$ is median line $\implies \angle A=90^\circ.$ This is because $D$ is the intersection of the perpendicular bisector of $\overline{AB}$ and $\overline{AC}.$
[asy] size(7cm); pointpen=black; pathpen=black; pointfontpen=fontsize(9pt); void b(){ pair A=D("A",dir(110),dir(110)); pair B=D("B",dir(-150),dir(-150)); pair C=D("C",dir(-30),dir(-30)); pair D=D("D",extension(A,origin,B,C),S); pair P=D("P",foot(D,A,B),W); pair Q=D("Q",foot(D,A,C),E); pair E=D("E",foot(A,B,C),S); pair D1=D("D^*",2*foot(D,P,Q)-D,dir(120)); pair E1=D("E^*",2*foot(E,P,Q)-E,N); D(A--B--C--cycle); D(P--D--Q,magenta); D(B--E1--C); D(B--D1--C); D(P--Q,dashed); draw(anglemark(B,E1,C,3),deepgreen); draw(anglemark(B,D1,C,3),deepgreen); D(E1--E,dotted); D(D1--D,dotted); D(circumcircle(A,P,Q),red+linetype("4 4")); } b(); pathflag=false; b(); [/asy]
Then we select $D$ as the foot from $A$ to $\overline{BC}.$ By the above result we get $APDQ$ is a rectangle, thus $D^*\in \odot(APDQ),$ and
\[\begin{aligned}D^* \text{ lies on the circumcircle of }\triangle ABC &\iff D^* \text{ sends $\triangle D^*PB$ to $\triangle D^*QC$}\\ &\iff \frac{DP}{PB}=\frac{D^*P}{PB}=\frac{D^*Q}{QC}=\frac{DQ}{QC}\\ &\iff \tan{\angle B}=\tan{\angle C}\\ &\iff \angle B=\angle C. \end{aligned}\]as desired. $\square$
[asy] size(7cm); pointpen=black; pathpen=black; pointfontpen=fontsize(9pt); void b(){ pair A=D("A",dir(70),dir(70)); pair B=D("B",dir(180),W); pair C=D("C",dir(0),E); pair D=D("D",foot(A,B,C),S); pair P=D("P",foot(D,A,B),W); pair Q=D("Q",foot(D,A,C),S); pair D1=D("D^*",2*foot(D,P,Q)-D,dir(70)); D(P--D--Q,magenta); D(D--D1,dotted); D(B--P--D1--cycle,blue+dashed); D(D1--Q--C--cycle,blue+dashed); D(A--P--Q--cycle); D(B--C); } b(); pathflag=false; b(); [/asy]
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babu2001
402 posts
babu2001
#11 May 19, 2016, 8:20 AM • 6 Y
Y by YadisBeles, Ramanujan_1729, Promi, UpvoteFarm, Adventure10, Mango247
As we have already seen we get $\angle BAC=90^{\circ}$ by setting $D$ to be the foot of angle bisector of $\angle BAC$. Now let $D$ be the midpoint of $BC$, then $P,Q$ are the midpoints of $AB,AC$ respectively as $\angle BAC=90^{\circ}$. Now let $D'$ be the reflection of $D$ in $PQ$. Then $\angle PD'Q=\angle PDQ=\angle PAQ\implies AD'PQ$ is cyclic, thus $D'\equiv\odot(ABC)\cap\odot(APQ)$. But $\odot(APQ)$ is tangent to $\odot(ABC)$ at $A$, hence $D'\equiv A$, hence $AD\perp PQ\implies AB=AC$, as required.
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mjuk
196 posts
mjuk
#12 May 19, 2016, 11:00 AM • 2 Y
Y by UpvoteFarm, Adventure10
Let $E$ be reflection of $D$ in $PQ$.
1. Suppose $\triangle ABC$ is great:
Let $D$ be intersection of bisector of $\angle A$ and $BC$. $P,Q$ are symmetric wrt. $AD$, so reflection of $D$ in $PQ$ lies on $AD$. Both $A$ and $E$ lie on $\odot ABC$ and they are on same side of $PQ$, hence $A\equiv E \Longrightarrow \angle PAQ=\angle PDQ$, but since $APDQ$ is cyclic, $\angle PAQ=180^{\circ}-\angle PDQ$, so $\angle BAC=\angle PAQ=90^{\circ}$.
Now let $D$ be midpoint of $BC$. Let line paralel to $BC$ through $A$ intersect $\odot ABC$ at $A'$. Since $APDQ$ is a rectangle, we have $d(A,PQ)=d(D,PQ)=d(E,PQ)$, so $AE\parallel BC\Longrightarrow E\equiv A'$.Let $K,L$ be projections of $A,A'$ on $BC$, $AA'BC$ is isosceles trapezoid, so $K,L$ are symmetric wrt. $D$. Then since $K\equiv D\Longrightarrow L\equiv D\Longrightarrow A=A'$ so $\triangle ABC$ is $A$-isosceles and $\angle A=90^{\circ}$.
2. Suppose $\angle A=90$ and $AB=AC$.
$\angle PEQ=\angle PDQ=90^{\circ} \Longrightarrow PEDQ$ is cyclic. $QE=QD=AP=QC$, and $PE=PD=AQ=PB$. $\angle EQC=\angle EQD+90^{\circ}=180^{\circ}-\angle EPD+90^{\circ}=\angle BPE$ $\Longrightarrow \triangle QEC\sim \triangle PEB $
$\Longrightarrow \angle BEC=\angle PEQ=90^{\circ}\Longrightarrow E\in \odot ABC$
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oceanmath99
48 posts
oceanmath99
#13 May 28, 2016, 8:12 AM • 4 Y
Y by MRF2017, UpvoteFarm, Adventure10, Mango247
Sorry!
I read all post on the top carefully
But I have a question with case "ABC is great $\rightarrow$ $\angle A=90^{\circ}$ and $AB=AC$"
If D be a random point on the side BC (is not midpoint BC, foot of the angle bisector of $\angle A$,..) then prove that $\angle A=90^{\circ}$ and $AB=AC$?????

Please answer this my question!
Thanks all!
This post has been edited 2 times. Last edited by oceanmath99, May 28, 2016, 8:13 AM
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djmathman
7938 posts
djmathman
#15 May 28, 2016, 2:44 PM • 5 Y
Y by oceanmath99, sabkx, UpvoteFarm, Adventure10, Mango247
^^ That doesn't matter. We've shown that by setting $D$ to be the foot of the angle bisector or the midpoint of $BC$ or the foot of the altitude or whatever that the only triangle $\triangle ABC$ can possibly be is an isosceles right triangle. Thus, we don't have to test all the other points to conclude this.

Let's go off on what seemingly might be a tangent. Consider the following functional equation: find all functions $f$ such that \[f(x)+f(y)=x^2+y^2\]for all real $x$ and $y$. This FE has a very simple solution: substitute $y=x$ to obtain \[2f(x) = 2x^2\quad\implies\quad f(x) = x^2.\]Now we just need to check that $f(x)$ always works, which it does.

This may seem like a strange example, but the point is made clear: in order to show that $f(x)=x^2$ is the only possible function which satisfies the given conditions, all we need to do is to look at the case where $x=y$. Once we have that, we just need to check that $f(x)=x^2$ works.

The same thing goes with this problem. In all the posts above, we use the special cases of $D$ being the angle bisector/midpoint/etc. to deduce that $\triangle ABC$ must be an isosceles right triangle. Once we have that, we just need to check that indeed $\triangle ABC$ is great - which I do in post 4.
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oceanmath99
48 posts
oceanmath99
#16 May 29, 2016, 1:45 PM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
Dear djmathman,
Thanks you very much! I understand this problem is a geometric functional equation!

But,
Sorry, I still a small question.
I think we must see only case such as midpoint or angle bisrctor or...
No need see all case.
:)
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rkm0959
1721 posts
rkm0959
#17 Aug 1, 2016, 9:11 AM • 3 Y
Y by PWuSinaisGod, UpvoteFarm, Adventure10
First, we prove the if direction. Denote the reflection of $D$ wrt $PQ$ be $D'$.

Clearly $D'AQP$ is cyclic, so $\angle D'PB = \angle D'QC$.
Using $D'P =PD = BP$ and $D'Q=QD=QC$ gives $\triangle D'PB \sim \triangle D'QC$, so $\angle BD'C = \angle PD'Q=90$.
This implies that $AD'BC$ is cyclic. We are done.

Now we prove the only if direction.
First, take $D$ where $AD$ bisects $\angle A$. Then $\triangle PAD \equiv \triangle QAD$, so $D'$ lies on $AD$.
So if $AD'CB$ cyclic gives $A=D'$, so $AQDP$ is a square, so $\angle A = 90$.
Take $D$ be the perpendicular from $A$ to $BC$. $D'$ being on $(ABC)$ is equivalent to $\triangle D'PB \sim \triangle D'QC$.
This is equivalent to $\frac{DP}{PB} = \frac{DQ}{DC}$, or $\angle B = \angle C$. We are done.
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Tommy2000
715 posts
Tommy2000
#18 Mar 16, 2017, 1:06 PM • 2 Y
Y by UpvoteFarm, Adventure10
Let $D'$ denote the reflection of $D$ in $PQ$. First, take the foot of the angle bisector from $A$. Then we see that $\angle A = 90^\circ$ as $A$ and $D'$ lie on the same side of $BC$.

Now, we know $\angle PDQ = 90^\circ$, so it suffices to show $\angle BD'P = \angle CD'Q$. However we already know that $\angle D'PB = \angle D'QC$ as $AD'PQD$ is cyclic, so this is equivalent to the condition
\[ \frac{D'P}{PB} = \frac{DP}{PB} = \frac{DQ}{QC} = \frac{D'Q}{QC}\]However, we have
\[ \frac{DP}{PB} = \frac{QC}{DQ}\]since $PD \parallel AC$, so this is equivalent with $BPD$ and $CQD$ being isosceles right. But they are similar to the original, so the original condition is equivalent with $ABC$ being isosceles right with $\angle A = 90^\circ$.
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ta2341
9 posts
ta2341
#19 Mar 3, 2018, 10:44 AM • 3 Y
Y by UpvoteFarm, Adventure10, Mango247
Can we use continuity to argue that A must be the image of some point on BC? As B is its own image, and so is C, and we can argue that the image of a point on BC that is very close to B must lie on arc BAC, very close to B, so as point D travels from B to C on BC, its image travels from B to C on arc BAC, and therefore its image must overlap with A at some point. Is this valid?
This post has been edited 3 times. Last edited by ta2341, Mar 3, 2018, 11:03 AM
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Math-wiz
6107 posts
Math-wiz
#20 Dec 22, 2019, 7:44 PM • 2 Y
Y by UpvoteFarm, Adventure10
shinichiman wrote:
We say that a triangle $ABC$ is great if the following holds: for any point $D$ on the side $BC$, if $P$ and $Q$ are the feet of the perpendiculars from $D$ to the lines $AB$ and $AC$, respectively, then the reflection of $D$ in the line $PQ$ lies on the circumcircle of the triangle $ABC$. Prove that triangle $ABC$ is great if and only if $\angle A = 90^{\circ}$ and $AB = AC$.

Senior Problems Committee of the Australian Mathematical Olympiad Committee

Anyone tried coordinate bash? Taking $A(0,0),B(0,y_1)$ and $C(x_2,y_2)$ simplifies the problem quite well, and it is easier to interpret reflection in tje Cartesian plane. I will post the solution as soon as I find one.
This post has been edited 1 time. Last edited by Math-wiz, Dec 22, 2019, 7:44 PM
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508669
1040 posts
508669
#21 Oct 17, 2020, 6:52 PM • 2 Y
Y by UpvoteFarm, Mango247
shinichiman wrote:
We say that a triangle $ABC$ is great if the following holds: for any point $D$ on the side $BC$, if $P$ and $Q$ are the feet of the perpendiculars from $D$ to the lines $AB$ and $AC$, respectively, then the reflection of $D$ in the line $PQ$ lies on the circumcircle of the triangle $ABC$. Prove that triangle $ABC$ is great if and only if $\angle A = 90^{\circ}$ and $AB = AC$.

Senior Problems Committee of the Australian Mathematical Olympiad Committee

Easy problem for APMO.

Let $D = BC \cap$ Angle Bisector of $\angle BAC$. It can be also seen that $D_1$ lies on $AD$. Since $A, D$ lie on opposite sides if $PQ$, $A, D_1$ lie on same side of $PQ$. But these assertion imply that $A = D_1$ which means that
$APDQ$ is a square which means that $\angle BAC = 90^\circ$.

Consider $D$ on $BC$ such that $\angle ADB = 90^\circ$. Then using the previous condition and this condition we get that $AB=AC$ in two steps because we get that $D = \odot (ABC) \cap \odot (APQ)$.

Now to prove this claim works, observe that it is angle chasing after noticing that $P, Q$ are circumcenter of $\triangle BDD_1$ and $\triangle CDD_1$ respectively.
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CANBANKAN
1301 posts
CANBANKAN
#22 Mar 5, 2021, 7:33 PM • 4 Y
Y by UpvoteFarm, Mango247, Mango247, Mango247
Why is this so hard? I sincerely found it much harder than APMO 16 P2,4,5

Let $D'$ be the reflection of $D$ over $PQ$.

If: note $\angle PDB=\angle QDC=45^{\circ}$, so $\angle PDQ=\angle PD'Q=90^{\circ}$ note $BP=PD=PD'$, and $CQ=DQ=D'Q$. We can see that $\angle BD'C=\angle PD'Q-\angle PD'B+\angle QD'C$. Since $BP=PD', D'Q=QC$, $\angle PD'B=\frac 12 \angle APD'$ and $\angle QD'C=\frac 12 \angle AQD'$. Since $\angle BAC=\angle PAQ=\angle PD'Q=90^{\circ}$, $APD'Q$ is cyclic, so $\angle APD'=\angle AQD'$, as desired.

Only if: let $D$ be the foot of the $\angle A$'s bisector. Then $\angle PAD=\angle QAD, AD=AD, \angle APD=\angle AQD$, so $APD$ is congruent to $AQD$, so $PD=QD$. This implies $AD$ perpendicularly bisect $PQ$, so $PR=RQ$. Therefore, $D'$ lies on $AD$, so $D'=A$, and $AR=RD$, so $\angle BAC=90^{\circ}$. Furthermore, $APDQ$ is actually a square.

To show $AB=AC$, I take $D=O$, the midpoint of $BC$. Then notice $OP,OQ$ are the midlines of $\triangle ABC$, and so is $PQ$. The key observation is $AD'||BC$. Indeed, let $R=AQ\cap D'P$, we can see $AR+RQ=D'R+RP$ and $AR\cdot RQ=D'R\cdot RP$, so it follows that $AR=D'R, QR=PR, AD||PQ||BC$. Furthermore, $D'O\perp BC$, so if $D'$ is on the circumcircle and $BC$ is horizontal, $D'$ is the highest point (or the lowest point) on the circle. Since $AD'||BC$, it follows that $A=D'$.
This post has been edited 3 times. Last edited by CANBANKAN, Mar 17, 2021, 1:00 AM
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Mahdi_Mashayekhi
694 posts
Mahdi_Mashayekhi
#23 Feb 6, 2022, 6:23 AM • 1 Y
Y by UpvoteFarm
First we'll prove other triangles are not Great then we'll prove 90-45-45 is Great.

we just need to find special points as D. Let AD be angle bisector of ∠A. It's well known AD is perpendicular bisector of PQ so D' must be A. ∠PAQ = ∠PDQ = ∠ACB + ∠ABC so ∠PAQ = 90 so ∠A = 90. Now let AD be altitude. APDQ is rectangle so AD'PQ is isosceles trapezoid. ∠D'AP = ∠APQ = ∠ACB so if AD'BC is cyclic we have ∠AD'B = 180 - ∠ACB = 180 - ∠D'AP so D' lies on AB and is A so AD is perpendicular to APDQ so APDQ is square so AB = AC.

Let ABC be a 90-45-45 triangle and D a random point on BC. PB = PD = PD' and QC = QD = QD' so P and Q are center of BD'D and CD'D. ∠BD'C = ∠BD'D + ∠CD'D = 45 + 45 = 90 so BAD'C is cyclic.
we're Done.
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Mogmog8
1080 posts
Mogmog8
#24 Feb 11, 2022, 5:07 AM • 3 Y
Y by centslordm, megarnie, UpvoteFarm
Claim: $\angle A=90$ and $AB=AC$ is necessary.
Proof. For each $D_i$ let $P_i$ and $Q_i$ be the feet from $D_i$ to $\overline{AB}$ and $\overline{AC}.$ Let $D_1$ be the foot of the angle bisector from $A$ and note that $D_1'$ lies on $\overline{AD_1}.$ Hence, $D_1'=A$ and since $AP_1D_1Q_1$ is cyclic, $$2\angle BAC=\angle P_1AQ_1+\angle P_1D_1Q_1=180$$and $\angle A=90.$ Let $D_2$ be the foot from $A$ to $\overline{BC}.$ Then, $D_2'$ lies on $(P_2D_2Q_2)$ and $(ABC)$ so $D_2'=A.$ Hence, $AP_2D_2Q_2$ is a square and $AB=AC.$ $\blacksquare$

Claim: $\angle A=90$ and $AB=AC$ is sufficient.
Proof. Notice $D'P=DP=BP$ so $\angle DD'B=\tfrac{1}{2}\angle DPB=45.$ Similarly, $\angle DD'C=45$ so $\angle CD'B=90=\angle A.$ $\blacksquare$ $\square$
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ike.chen
1162 posts
ike.chen
#25 Jul 29, 2022, 10:53 PM • 1 Y
Y by UpvoteFarm
First, we assume $ABC$ is great. Let $D_1$ denote the reflection of $D$ in $PQ$.

Suppose $D$ is the foot of the internal bisector of $\angle BAC$. Then, we clearly have $DP = DQ$, so $APDQ$ is a kite. It follows that $AD \perp PQ$, so $A$ and $D_1$ must coincide. Thus, $$PA = PD = QD = QA$$which means $APDQ$ is a square, as $AD \perp PQ$. As a result, we know $\angle A = 90^{\circ}$ must hold.

Now, suppose $D$ is the midpoint of $BC$. Because $APDQ$ is a rectangle, $$\angle PD_1Q = \angle PDQ = 90^{\circ} = \angle PAQ$$so $APDQD_1$ is cyclic with diameter $PQ$. Moreover, $$\angle APQ = \angle PQD = \angle PQD_1 = \angle PAD_1$$implies $AD_1QP$ is a cyclic isosceles trapezoid. Hence, $AD_1$ and $PQ$ have the same perpendicular bisector, so $DP = DQ$ follows from $DA = R = DD_1$. Thus, $$AB = 2 \cdot DQ = 2 \cdot DP = AC$$which means the only possible solution is $\angle A = 90^{\circ}$ and $AB = AC$.

Now, we show that $ABC$ is indeed great when $\angle A = 90^{\circ}$ and $AB = AC$. Let $M$ be the circumcenter of $ABC$. It's clear that $AD_1QP$ is still an isosceles trapezoid. Now, since $BDP$ and $CDQ$ are also isosceles right triangles, we have $$BP \cdot PA = PD \cdot DQ = AQ \cdot QC$$so $$MP^2 = Pow_{(ABC)}(P) + R^2 = Pow_{(ABC)}(Q) + R^2 = MQ^2.$$Thus, $MA = MD_1$ follows from $MP = MQ$, which finishes. $\blacksquare$


Remarks: The flavor of this question is similar to that of ISL 2020/G1. In fact, attempting to solve that problem definitely helped me solve this question.
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IAmTheHazard
5001 posts
IAmTheHazard
#26 Jul 31, 2023, 2:48 PM • 2 Y
Y by UpvoteFarm, centslordm
Send $D$ to $B$ and $C$ respectively, and the reflection $D'$ gets sent to $B$ and $C$ respectively as well. Therefore, by continuity, there exists some choice of $D$ such that $D'$ has the same "x-value" as $A$ if the x-axis is set to $\overline{BC}$ (i.e. $\overline{AD'} \perp \overline{BC}$ or $A=D'$). This clearly means that $D'=A$, since $D'$ is clearly not the second intersection of the $A$-altitude with $(ABC)$. But on the other hand, $\angle PD'Q=\angle PDQ=180^\circ-\angle PAQ$, so we must have $\angle A=90^\circ$.

Now, if $\triangle ABC$ is right, let $D$ be the midpoint of $\overline{BC}$, so $P$ and $Q$ are the midpoints of their respective sides as well. Then $d(D',\overline{BC})=2d(D,\overline{PQ})=d(A,\overline{BC})$. Since $D'B=D'C$, this is bad unless $A$ is the arc midpoint of $\overline{BC}$, i.e. $AB=AC$. $\blacksquare$
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Inconsistent
1455 posts
Inconsistent
#27 Feb 29, 2024, 11:18 PM
Y by
When $D = B$, we have $D' = B$ and when $D = C$, we have $D' = C$. Thus move $D$ continuously from $B$ to $C$, then since $D'$ lies on the same side of $BC$ as $A$, there exists $E$ on $BC$ so that when $D = E$, we have that $D' = A$. However this implies $A, E$ are equidistant from $P, Q$ when $D = E$, so $PQ$ passes through their midpoint, however $AE$ is a diameter of $(APEQ)$ so it follows that $\angle BAC = \angle PAQ = 90^{\circ}$.

Now, set $D$ to be the midpoint of $BC$, then the reflection of $D$ over $PQ$ is the projection of $A$ onto the perpendicular bisector of $BC$, since this must lie on $(ABC)$, it follows that $A$ lies on the horizontal bisector of $BC$, as desired.

Now to complete the case, when $ABC$ is as desired, we have that $AD$ passes through the center of $(APQ)$, so it is isogonal in $\angle A$ to the perpendicular to $PQ$. Thus if $A'$ is the reflection of $A$ over $BC$, it follows that $DA', AD$ are isogonal in $\angle A$ so $DA' \perp PQ$. Let $S = DA' \cap (ABC)$, then it follows that $SA \parallel PQ$. Since $PQ$ is a diameter of $(APQD)$, it also follows that $A, D'$ lie on the same side of $PQ$ and $d(A, PQ) = d(D', PQ)$, so we have $AD' \parallel PQ$ as well. Thus $S = D'$, finishing.
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DottedCaculator
7339 posts
DottedCaculator
#28 Mar 9, 2024, 8:28 PM • 1 Y
Y by ihatemath123
If $D$ is arbitrarily close to $B$, then the reflection of $D$ over $PQ$ lies on a line arbitrarily close to the reflection of $BC$ over the $B$-altitude and is arbitrarily close to $B$, which means that the $B$-altitude is the angle bisector of the tangent to $B$ is the angle bisector of $BC$, so $\angle B=\frac12\angle A$. Similarly, $\angle C=\frac12\angle A$, so $ABC$ is an isosceles right triangle. If $ABC$ is an isosceles right triangle, then $APDQ$ is a rectangle so if $O$ is the midpoint of $BC$ and $D'$ is the reflection of $D$ over $PQ$, then $APDQOD'$ is cyclic, so $\angle BAO=\angle OAC$ implies $\angle PD'O=\angle QAO$, and $D'Q=DQ=AP$ implies $\angle AD'P=\angle D'AQ$, so $\angle AD'O=\angle D'AO$ implies $D'$ lies on the circumcircle of $ABC$.
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ray66
31 posts
ray66
#29 Apr 6, 2025, 3:17 PM
Y by
Sketch

First denote the reflection of $D$ over $PQ$ as $D'$. Consider $D$ when $D'$ coincides with $A$. This occurs when $\angle A=90$ and $D$ lies on the intersection of $BC$ with the angle bisector of $A$. Next, consider the case that $PQ$ is parallel to $BC$. This occurs when $D$ is the midpoint of $BC$, so $A$ must be the midpoint of arc $BC$. Now consider $D'$, which is also the reflection of $A$ over the perpendicular bisector of $PQ$. $D'$ only lies on the circle if the perpendicular bisector of $PQ$ passes through $O$ (because the reflection of $A$ over a diameter is also on the circle). By POP, the power of $Q$ is the same as the power of $P$ in every isosceles right triangle, so $OM'$ bisects $PQ$ and we're done.
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