Art of Problem Solving
AoPS Online AoPS Online
Math texts, online classes, and more
for students in grades 5-12.
Visit AoPS Online
Books for Grades 5-12 Online Courses
Beast Academy Beast Academy
Engaging math books and online learning
for students ages 6-13.
Visit Beast Academy
Books for Ages 6-13 Beast Academy Online
AoPS Academy AoPS Academy
Small live classes for advanced math
and language arts learners in grades 1-12.
Visit AoPS Academy
Find a Physical Campus Visit the Virtual Campus

Stay ahead of learning milestones! Enroll in a class over the summer!
No tags match your search
M
G
Topic
First Poster
Last Poster
H
k a April Highlights and 2025 AoPS Online Class Information
jlacosta   0
Apr 2, 2025
Spring is in full swing and summer is right around the corner, what are your plans? At AoPS Online our schedule has new classes starting now through July, so be sure to keep your skills sharp and be prepared for the Fall school year! Check out the schedule of upcoming classes below.

WOOT early bird pricing is in effect, don’t miss out! If you took MathWOOT Level 2 last year, no worries, it is all new problems this year! Our Worldwide Online Olympiad Training program is for high school level competitors. AoPS designed these courses to help our top students get the deep focus they need to succeed in their specific competition goals. Check out the details at this link for all our WOOT programs in math, computer science, chemistry, and physics.

Looking for summer camps in math and language arts? Be sure to check out the video-based summer camps offered at the Virtual Campus that are 2- to 4-weeks in duration. There are middle and high school competition math camps as well as Math Beasts camps that review key topics coupled with fun explorations covering areas such as graph theory (Math Beasts Camp 6), cryptography (Math Beasts Camp 7-8), and topology (Math Beasts Camp 8-9)!

Be sure to mark your calendars for the following events:
[list][*]April 3rd (Webinar), 4pm PT/7:00pm ET, Learning with AoPS: Perspectives from a Parent, Math Camp Instructor, and University Professor
[*]April 8th (Math Jam), 4:30pm PT/7:30pm ET, 2025 MATHCOUNTS State Discussion
April 9th (Webinar), 4:00pm PT/7:00pm ET, Learn about Video-based Summer Camps at the Virtual Campus
[*]April 10th (Math Jam), 4:30pm PT/7:30pm ET, 2025 MathILy and MathILy-Er Math Jam: Multibackwards Numbers
[*]April 22nd (Webinar), 4:00pm PT/7:00pm ET, Competitive Programming at AoPS (USACO).[/list]
Our full course list for upcoming classes is below:
All classes run 7:30pm-8:45pm ET/4:30pm - 5:45pm PT unless otherwise noted.

Introductory: Grades 5-10

Prealgebra 1 Self-Paced

Prealgebra 1
Sunday, Apr 13 - Aug 10
Tuesday, May 13 - Aug 26
Thursday, May 29 - Sep 11
Sunday, Jun 15 - Oct 12
Monday, Jun 30 - Oct 20
Wednesday, Jul 16 - Oct 29

Prealgebra 2 Self-Paced

Prealgebra 2
Sunday, Apr 13 - Aug 10
Wednesday, May 7 - Aug 20
Monday, Jun 2 - Sep 22
Sunday, Jun 29 - Oct 26
Friday, Jul 25 - Nov 21

Introduction to Algebra A Self-Paced

Introduction to Algebra A
Monday, Apr 7 - Jul 28
Sunday, May 11 - Sep 14 (1:00 - 2:30 pm ET/10:00 - 11:30 am PT)
Wednesday, May 14 - Aug 27
Friday, May 30 - Sep 26
Monday, Jun 2 - Sep 22
Sunday, Jun 15 - Oct 12
Thursday, Jun 26 - Oct 9
Tuesday, Jul 15 - Oct 28

Introduction to Counting & Probability Self-Paced

Introduction to Counting & Probability
Wednesday, Apr 16 - Jul 2
Thursday, May 15 - Jul 31
Sunday, Jun 1 - Aug 24
Thursday, Jun 12 - Aug 28
Wednesday, Jul 9 - Sep 24
Sunday, Jul 27 - Oct 19

Introduction to Number Theory
Thursday, Apr 17 - Jul 3
Friday, May 9 - Aug 1
Wednesday, May 21 - Aug 6
Monday, Jun 9 - Aug 25
Sunday, Jun 15 - Sep 14
Tuesday, Jul 15 - Sep 30

Introduction to Algebra B Self-Paced

Introduction to Algebra B
Wednesday, Apr 16 - Jul 30
Tuesday, May 6 - Aug 19
Wednesday, Jun 4 - Sep 17
Sunday, Jun 22 - Oct 19
Friday, Jul 18 - Nov 14

Introduction to Geometry
Wednesday, Apr 23 - Oct 1
Sunday, May 11 - Nov 9
Tuesday, May 20 - Oct 28
Monday, Jun 16 - Dec 8
Friday, Jun 20 - Jan 9
Sunday, Jun 29 - Jan 11
Monday, Jul 14 - Jan 19

Intermediate: Grades 8-12

Intermediate Algebra
Monday, Apr 21 - Oct 13
Sunday, Jun 1 - Nov 23
Tuesday, Jun 10 - Nov 18
Wednesday, Jun 25 - Dec 10
Sunday, Jul 13 - Jan 18
Thursday, Jul 24 - Jan 22

Intermediate Counting & Probability
Wednesday, May 21 - Sep 17
Sunday, Jun 22 - Nov 2

Intermediate Number Theory
Friday, Apr 11 - Jun 27
Sunday, Jun 1 - Aug 24
Wednesday, Jun 18 - Sep 3

Precalculus
Wednesday, Apr 9 - Sep 3
Friday, May 16 - Oct 24
Sunday, Jun 1 - Nov 9
Monday, Jun 30 - Dec 8

Advanced: Grades 9-12

Olympiad Geometry
Tuesday, Jun 10 - Aug 26

Calculus
Tuesday, May 27 - Nov 11
Wednesday, Jun 25 - Dec 17

Group Theory
Thursday, Jun 12 - Sep 11

Contest Preparation: Grades 6-12

MATHCOUNTS/AMC 8 Basics
Wednesday, Apr 16 - Jul 2
Friday, May 23 - Aug 15
Monday, Jun 2 - Aug 18
Thursday, Jun 12 - Aug 28
Sunday, Jun 22 - Sep 21
Tues & Thurs, Jul 8 - Aug 14 (meets twice a week!)

MATHCOUNTS/AMC 8 Advanced
Friday, Apr 11 - Jun 27
Sunday, May 11 - Aug 10
Tuesday, May 27 - Aug 12
Wednesday, Jun 11 - Aug 27
Sunday, Jun 22 - Sep 21
Tues & Thurs, Jul 8 - Aug 14 (meets twice a week!)

AMC 10 Problem Series
Friday, May 9 - Aug 1
Sunday, Jun 1 - Aug 24
Thursday, Jun 12 - Aug 28
Tuesday, Jun 17 - Sep 2
Sunday, Jun 22 - Sep 21 (1:00 - 2:30 pm ET/10:00 - 11:30 am PT)
Monday, Jun 23 - Sep 15
Tues & Thurs, Jul 8 - Aug 14 (meets twice a week!)

AMC 10 Final Fives
Sunday, May 11 - Jun 8
Tuesday, May 27 - Jun 17
Monday, Jun 30 - Jul 21

AMC 12 Problem Series
Tuesday, May 27 - Aug 12
Thursday, Jun 12 - Aug 28
Sunday, Jun 22 - Sep 21
Wednesday, Aug 6 - Oct 22

AMC 12 Final Fives
Sunday, May 18 - Jun 15

F=ma Problem Series
Wednesday, Jun 11 - Aug 27

WOOT Programs
Visit the pages linked for full schedule details for each of these programs!

MathWOOT Level 1
MathWOOT Level 2
ChemWOOT
CodeWOOT
PhysicsWOOT

Programming

Introduction to Programming with Python
Thursday, May 22 - Aug 7
Sunday, Jun 15 - Sep 14 (1:00 - 2:30 pm ET/10:00 - 11:30 am PT)
Tuesday, Jun 17 - Sep 2
Monday, Jun 30 - Sep 22

Intermediate Programming with Python
Sunday, Jun 1 - Aug 24
Monday, Jun 30 - Sep 22

USACO Bronze Problem Series
Tuesday, May 13 - Jul 29
Sunday, Jun 22 - Sep 1

Physics

Introduction to Physics
Wednesday, May 21 - Aug 6
Sunday, Jun 15 - Sep 14
Monday, Jun 23 - Sep 15

Physics 1: Mechanics
Thursday, May 22 - Oct 30
Monday, Jun 23 - Dec 15

Relativity
Sat & Sun, Apr 26 - Apr 27 (4:00 - 7:00 pm ET/1:00 - 4:00pm PT)
Mon, Tue, Wed & Thurs, Jun 23 - Jun 26 (meets every day of the week!)
0 replies
jlacosta
Apr 2, 2025
0 replies
J
H
k i Adding contests to the Contest Collections
dcouchman   1
N Apr 5, 2023 by v_Enhance
Want to help AoPS remain a valuable Olympiad resource? Help us add contests to AoPS's Contest Collections.

Find instructions and a list of contests to add here: https://artofproblemsolving.com/community/c40244h1064480_contests_to_add
1 reply
dcouchman
Sep 9, 2019
v_Enhance
Apr 5, 2023
J
H
k i Zero tolerance
ZetaX   49
N May 4, 2019 by NoDealsHere
Source: Use your common sense! (enough is enough)
Some users don't want to learn, some other simply ignore advises.
But please follow the following guideline:


To make it short: ALWAYS USE YOUR COMMON SENSE IF POSTING!
If you don't have common sense, don't post.


More specifically:

For new threads:


a) Good, meaningful title:
The title has to say what the problem is about in best way possible.
If that title occured already, it's definitely bad. And contest names aren't good either.
That's in fact a requirement for being able to search old problems.

Examples:
Bad titles:
- "Hard"/"Medium"/"Easy" (if you find it so cool how hard/easy it is, tell it in the post and use a title that tells us the problem)
- "Number Theory" (hey guy, guess why this forum's named that way¿ and is it the only such problem on earth¿)
- "Fibonacci" (there are millions of Fibonacci problems out there, all posted and named the same...)
- "Chinese TST 2003" (does this say anything about the problem¿)
Good titles:
- "On divisors of a³+2b³+4c³-6abc"
- "Number of solutions to x²+y²=6z²"
- "Fibonacci numbers are never squares"


b) Use search function:
Before posting a "new" problem spend at least two, better five, minutes to look if this problem was posted before. If it was, don't repost it. If you have anything important to say on topic, post it in one of the older threads.
If the thread is locked cause of this, use search function.

Update (by Amir Hossein). The best way to search for two keywords in AoPS is to input
[code]+"first keyword" +"second keyword"[/code]
so that any post containing both strings "first word" and "second form".


c) Good problem statement:
Some recent really bad post was:
[quote]$lim_{n\to 1}^{+\infty}\frac{1}{n}-lnn$[/quote]
It contains no question and no answer.
If you do this, too, you are on the best way to get your thread deleted. Write everything clearly, define where your variables come from (and define the "natural" numbers if used). Additionally read your post at least twice before submitting. After you sent it, read it again and use the Edit-Button if necessary to correct errors.


For answers to already existing threads:


d) Of any interest and with content:
Don't post things that are more trivial than completely obvious. For example, if the question is to solve $x^{3}+y^{3}=z^{3}$, do not answer with "$x=y=z=0$ is a solution" only. Either you post any kind of proof or at least something unexpected (like "$x=1337, y=481, z=42$ is the smallest solution). Someone that does not see that $x=y=z=0$ is a solution of the above without your post is completely wrong here, this is an IMO-level forum.
Similar, posting "I have solved this problem" but not posting anything else is not welcome; it even looks that you just want to show off what a genius you are.

e) Well written and checked answers:
Like c) for new threads, check your solutions at least twice for mistakes. And after sending, read it again and use the Edit-Button if necessary to correct errors.



To repeat it: ALWAYS USE YOUR COMMON SENSE IF POSTING!


Everything definitely out of range of common sense will be locked or deleted (exept for new users having less than about 42 posts, they are newbies and need/get some time to learn).

The above rules will be applied from next monday (5. march of 2007).
Feel free to discuss on this here.
49 replies
ZetaX
Feb 27, 2007
NoDealsHere
May 4, 2019
J
H
Functional Equation
anantmudgal09   20
N 17 minutes ago by bin_sherlo
Source: India TST 2018 D1 P3
Find all functions $f: \mathbb{R} \mapsto \mathbb{R}$ such that $$f(x)f\left(yf(x)-1\right)=x^2f(y)-f(x),$$for all $x,y \in \mathbb{R}$.
20 replies
1 viewing
anantmudgal09
Jul 18, 2018
bin_sherlo
17 minutes ago
J
H
My hardest algebra ever created (only one solve in the contest)
mshtand1   0
21 minutes ago
Source: Ukraine IMO TST P9
Find all functions \( f: (0, +\infty) \to (0, +\infty) \) for which, for all \( x, y > 0 \), the following identity holds:
\[ f(x) f(yf(x)) + y f(xy) = \frac{f\left(\frac{x}{y}\right)}{y} + \frac{f\left(\frac{y}{x}\right)}{x} \]
Proposed by Mykhailo Shtandenko
0 replies
mshtand1
21 minutes ago
0 replies
J
H
Killer NT that nobody solved (also my hardest NT ever created)
mshtand1   0
26 minutes ago
Source: Ukraine IMO 2025 TST P8
A positive integer number \( a \) is chosen. Prove that there exists a prime number that divides infinitely many terms of the sequence \( \{b_k\}_{k=1}^{\infty} \), where
\[ b_k = a^{k^k} \cdot 2^{2^k - k} + 1. \]
Proposed by Arsenii Nikolaev and Mykhailo Shtandenko
0 replies
mshtand1
26 minutes ago
0 replies
J
H
Squares on height in right triangle
Miquel-point   0
2 hours ago
Source: Romanian NMO 2025 7.4
Consider the right-angled triangle $ABC$ with $\angle A$ right and $AD\perp BC$, $D\in BC$. On the ray $[AD$ we take two points $E$ and $H$ so that $AE=AC$ and $AH=AB$. Consider the squares $AEFG$ and $AHJI$ containing inside $C$ and $B$, respectively. If $K=EG\cap AC$ and $L=IH\cap AB$, $N=IL\cap GK$ and $M=IB\cap GC$, prove that $LK\parallel BC$ and that $A$, $N$ and $M$ are collinear.
0 replies
Miquel-point
2 hours ago
0 replies
J
H
Projections on lateral faces of pyramid are coplanar
Miquel-point   0
2 hours ago
Source: Romanian NMO 2025 8.4
From a point $O$ inside a square $ABCD$ we raise a segment $OS$ perpendicular to the plane of the square. Show that the projections of $O$ on the planes $(SAB)$, $(SBC)$, $(SCD)$ and $(SDA)$ are coplanar if and only if $O\in [AC]\cup [BD]$.
0 replies
Miquel-point
2 hours ago
0 replies
J
H
NT equation
EthanWYX2009   3
N 2 hours ago by pavel kozlov
Source: 2025 TST T11
Let \( n \geq 4 \). Proof that
\[ (2^x - 1)(5^x - 1) = y^n \]have no positive integer solution \((x, y)\).
3 replies
EthanWYX2009
Mar 10, 2025
pavel kozlov
2 hours ago
J
H
math olympiads
Lirimath   1
N 2 hours ago by maromex
Let a,b,c be real numbers such that a^2(b+c)+b^2(c+a)+c^2(a+b)=3(a+b+c-1) and a+b+c differnet by 0.Prove that ab+bc+ca=3 if and only if abc=1
1 reply
Lirimath
3 hours ago
maromex
2 hours ago
J
H
math olympiad
Lirimath   2
N 2 hours ago by maromex
Let a,b,c be positive real numbers such that a+b+c=3abc.Prove that
a^2+b^2+c^2+3>=2(ab+bc+ca).
2 replies
Lirimath
2 hours ago
maromex
2 hours ago
J
H
Interesting F.E
Jackson0423   9
N 2 hours ago by Sedro
Show that there does not exist a function
\[ f : \mathbb{R}^+ \to \mathbb{R} \]satisfying the condition that for all \( x, y \in \mathbb{R}^+ \),
\[ f(x^2 + y) \geq f(x) + y. \]

~Korea 2017 P7
9 replies
1 viewing
Jackson0423
Yesterday at 4:12 PM
Sedro
2 hours ago
J
H
Three-player money transfer game with unique winner per round
rilarfer   1
N 3 hours ago by Lankou
Source: ASJTNic 2005
Ana, Bárbara, and Cecilia play a game with the following rules:
[list]
[*] In each round, exactly one player wins.
[*] The two losing players each give half of their current money to the winner.
[/list]
The game proceeds as follows:

[list=1]
[*] Ana wins the first round.
[*] Bárbara wins the second round.
[*] Cecilia wins the third round.
[/list]
At the end of the game, the players have the following amounts:
[list]
[*] Ana: C$35
[*] Bárbara: C$75
[*] Cecilia: C$150
[/list]
How much money did each of them have at the beginning?
1 reply
rilarfer
3 hours ago
Lankou
3 hours ago
J
H
Find all integer solutions to an exponential equation involving powers of 2 and
rilarfer   2
N 3 hours ago by teomihai
Source: ASJTNic 2005
Find all integer pairs $(x, y)$ such that:
$$ 2^x + 3^y = 3^{y + 2} - 2^{x + 1}. $$
2 replies
rilarfer
3 hours ago
teomihai
3 hours ago
J
H
Winning strategy in a two-player subtraction game starting with 65 tokens
rilarfer   1
N 3 hours ago by CHESSR1DER
Source: ASJTNic 2005
Juan and Pedro play the following game:
[list]
[*] There are initially 65 tokens.
[*] The players alternate turns, starting with Juan.
[*] On each turn, a player may remove between 1 and 7 tokens.
[*] The player who removes the last token wins.
[/list]
Describe and justify a strategy that guarantees Juan a win.
1 reply
rilarfer
3 hours ago
CHESSR1DER
3 hours ago
J
H
Radius of circle tangent to two equal circles and a common line
rilarfer   1
N 3 hours ago by Lankou
Source: ASJTNic 2005
Two circles of radius 2 are tangent to each other and to a straight line. A third circle is placed so that it is tangent to both of the other circles and also tangent to the same straight line.

What is the radius of the third circle?

IMAGE
1 reply
rilarfer
3 hours ago
Lankou
3 hours ago
J
H
Four-variable FE mod n
TheUltimate123   2
N 3 hours ago by cosmicgenius
Source: PRELMO 2023/3 (http://tinyurl.com/PRELMO)
Let \(n\) be a positive integer, and let \(\mathbb Z/n\mathbb Z\) denote the integers modulo \(n\). Determine the number of functions \(f:(\mathbb Z/n\mathbb Z)^4\to\mathbb Z/n\mathbb Z\) satisfying \begin{align*} &f(a,b,c,d)+f(a+b,c,d,e)+f(a,b,c+d,e)\\ &=f(b,c,d,e)+f(a,b+c,d,e)+f(a,b,c,d+e). \end{align*}for all \(a,b,c,d,e\in\mathbb Z/n\mathbb Z\).
2 replies
TheUltimate123
Jul 11, 2023
cosmicgenius
3 hours ago
J
H
J
H
angles in triangle
AndrewTom   32
N Mar 7, 2025 by Tsikaloudakis
Source: BrMO 2012/13 Round 2
The point $P$ lies inside triangle $ABC$ so that $\angle ABP = \angle PCA$. The point $Q$ is such that $PBQC$ is a parallelogram. Prove that $\angle QAB = \angle CAP$.
32 replies
AndrewTom
Feb 1, 2013
Tsikaloudakis
Mar 7, 2025
J
angles in triangle
G H J
Reveal topic tags
geometry
parallelogram
geometric transformation
reflection
Hi
L
G H BBookmark kLocked kLocked NReply
Source: BrMO 2012/13 Round 2
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
AndrewTom
12750 posts
AndrewTom
#1 Feb 1, 2013, 8:07 AM • 4 Y
Y by Adventure10, Mango247, Rounak_iitr, ItsBesi
The point $P$ lies inside triangle $ABC$ so that $\angle ABP = \angle PCA$. The point $Q$ is such that $PBQC$ is a parallelogram. Prove that $\angle QAB = \angle CAP$.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Nilashis
132 posts
Nilashis
#2 Feb 1, 2013, 8:56 AM • 3 Y
Y by AndrewTom, Adventure10, Mango247
Use sin rule on $\triangle ABQ$, $\triangle ACQ$, $\triangle BAP$, $\triangle CAP$ and comparing them we get that
$\frac{sin\angle BAQ}{sin\angle QAC}=\frac{sin\angle CAP}{sin\angle PAB}$. Now take $\angle BAQ=x$ and $\angle PAC=y$ then the equation reduces to $\frac{sinx}{sin(A-x)}=\frac{siny}{sin(A-y)}$
$2sin(A-x)siny=2sin(A-y)sinx$
$cos(A-x-y)-cos(A-x+y)=cos(A-y-x)-cos(A-y+x)$
$cos(A-x+y)=cos(A-y+x)$
$x-y=y-x$
$x=y$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
nsato
15653 posts
nsato
#3 Feb 1, 2013, 4:21 PM • 2 Y
Y by Adventure10, ehuseyinyigit
This appears as an exercise in Geometry Revisited (Section 1.9, Exercise 3).
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
sunken rock
4384 posts
sunken rock
#4 Feb 6, 2013, 11:21 AM • 3 Y
Y by AndrewTom, Adventure10, Mango247
It has been posted here around few years ago, with a very nice synthetic solution!

Best regards,
sunken rock
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
MMEEvN
252 posts
MMEEvN
#5 Feb 11, 2013, 12:52 PM • 12 Y
Y by sunken rock, AndrewTom, kprepaf, jlammy, 93051, v_Enhance, Med_Sqrt, hakN, Adventure10, Mango247, ohiorizzler1434, ehuseyinyigit
Let $R$ be the point such that $APBR$ is a parallelogram . Hence $AR || BP ||QC$ and $AR=BP=CQ$ Hence $ARQC$ is a parallelogram.$\angle ACQ = \angle ARQ$ . But $ \angle ACQ = \angle ABQ$ . Hence $ARBQ$ is cyclic.
.$\angle PAB=\angle ABR =\angle AQR= \angle QAC$. $ \Longrightarrow \angle QAB=\angle PAC$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
jlammy
1099 posts
jlammy
#6 Dec 24, 2013, 6:43 PM • 2 Y
Y by Adventure10, Mango247
sunken rock wrote:
It has been posted here around few years ago, with a very nice synthetic solution!

Best regards,
sunken rock

Can you specify the details of this "very nice synthetic solution"?
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
sunken rock
4384 posts
sunken rock
#7 Dec 24, 2013, 7:57 PM • 2 Y
Y by Adventure10, Mango247
@jlammy: Like MMEEvN did!

Best regards,
sunken rock
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
IDMasterz
1412 posts
IDMasterz
#8 Aug 19, 2014, 2:45 PM • 1 Y
Y by Adventure10
no angle chasing: Let $P'$ be the $P$ isogonal conjugate and $P''$ be its reflection over $BC$. The angle bisectors of $BPC$ and $BAC$ are obviously parallel. $AP, PP''$ are antiparallel wrt $BPC$ so $AP' \parallel PP'' \parallel QP'$ since $PP'QP''$ form a parallelogram, so done.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
DottedCaculator
7336 posts
DottedCaculator
#9 Dec 10, 2021, 10:44 PM
Y by
Solution
This post has been edited 1 time. Last edited by DottedCaculator, Dec 10, 2021, 10:45 PM
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Project_Donkey_into_M4
137 posts
Project_Donkey_into_M4
#11 Jan 14, 2022, 1:40 PM
Y by
AndrewTom wrote:
The point $P$ lies inside triangle $ABC$ so that $\angle ABP = \angle PCA$. The point $Q$ is such that $PBQC$ is a parallelogram. Prove that $\angle QAB = \angle CAP$.

For a non complicated solution unlike above here's a hint
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
guptaamitu1
656 posts
guptaamitu1
#12 Feb 14, 2022, 11:00 PM • 1 Y
Y by Rounak_iitr
Here's a different proof with similar triangles and homothety (plus reflection in angle bisector)
Let $E = \overline{BP} \cap \overline{AC}, F = \overline{CP} \cap \overline{AB}$. Then points $B,C,E,F$ are concyclic. Using $BPCQ$ is a parallelogram we get
$$ \angle QCB = \angle PBC = \angle EBC = \angle EFC = \angle EFP $$Similarly $\angle QBC = \angle FEP$. Hence,
$$ \triangle QBC \sim \triangle PEF $$[asy] size(200); pair B=dir(-160),C=dir(-20),E=dir(70),F=dir(135),A=extension(B,F,C,E),P=extension(B,E,C,F),Q=B+C-P; draw(unitcircle,cyan); fill(P--E--F--P--cycle,purple+grey+grey); fill(B--Q--C--B--cycle,purple+grey+grey); dot("$A$",A,dir(A)); dot("$B$",B,dir(B)); dot("$C$",C,dir(C)); dot("$E$",E,dir(E)); dot("$F$",F,dir(F)); dot("$P$",P,dir(-90)); dot("$Q$",Q,dir(Q)); draw(A--B--C--A,royalblue); draw(B--E^^C--F,red); draw(P--A--Q,green); draw(B--Q--C^^E--F,brown); [/asy]
Let $\mathbb H$ denote homothety at $A$ with scale $\frac{AF}{AC} = \frac{AE}{AB}$ followed by reflection in internal angle bisector of $\angle BAC$. Note $\mathbb H(F) = C$ and $\mathbb H(E) = B$. Thus $\mathbb H(P) = P'$ is a point such that $$\triangle PEF \sim \triangle P' BC$$Hence $P' \equiv Q$. As $\mathbb H$ also consists of reflection in internal angle bisector of $\angle BAC$, so $\angle BAP = \angle CAQ$ follows. $\blacksquare$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
TechnoLenzer
55 posts
TechnoLenzer
#13 Sep 4, 2022, 5:28 PM • 2 Y
Y by ike.chen, allin27x
Let $\infty_1 = BP \cap CQ$ and $\infty_2 = CP \cap BQ$. Since these are parallel pairs of lines, $\infty_1, \infty_2$ are the points at infinity for those pencils of parallel lines respectively. Note that $\measuredangle \infty_1AB = \measuredangle PBA = \measuredangle ACP = \measuredangle CA\infty_2$ by $A\infty_1 \; || \; CP$ and $A\infty_2 \; || \; BP$. Thus, $A\infty_1$ is isogonal to $A\infty_2$ wrt. $\triangle ABC$. Hence by DDIT on complete quadrilateral $P, B, Q, C, \infty_1, \infty_2$, there exists a projective involution swapping $(AB, AC)$, $(A\infty_1, A\infty_2)$, $(AP, AQ)$. This is taking the isogonal, and so $AP, AQ$ are isogonal. $\blacksquare$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
samrocksnature
8791 posts
samrocksnature
#14 Nov 20, 2022, 10:25 PM
Y by
Any complex sols?
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
AwesomeYRY
579 posts
AwesomeYRY
#15 Mar 13, 2023, 7:27 PM
Y by
Consider the following two series of laws of sines:
\begin{align*} \frac{BQ}{\sin(\angle BAQ)} = \frac{AQ}{\sin(\angle ABP + \angle PBQ)} &= \frac{AQ}{\sin(\angle PCA + \angle ACP)} = \frac{CQ}{\sin (\angle QAC)},\\ \frac{BP}{\sin(\angle BAP)} = \frac{AP}{\sin(\angle ABP)} &= \frac{AP}{\sin(\angle PCA)} = \frac{PC}{\sin(\angle PAC)}. \end{align*}Putting them together, we get
\[\frac{\sin(\angle QAC)}{\sin(\angle BAQ)} = \frac{CQ}{BQ}= \frac{BP}{PC} = \frac{\sin(\angle BAP)}{\sin(\angle PAC)}\]and since $\angle WAC + \angle BAQ = \angle BAC = \angle BAP + \angle PAC$, we have that $\angle BAP = \angle QAC$ and we're done. $\blacksquare$.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
anurag27826
93 posts
anurag27826
#16 Apr 25, 2023, 1:50 PM
Y by
Amazing problem, although my solution is the same as of guptaamitu1's solution, but still im posting it for the sake of storage.

First of all we claim that $\triangle PEF \sim \triangle BQC$. Note that $\angle EPF = \angle BPC = \angle BQC$. Also note that $\angle PFE = \angle PBC = \angle QCB$. Both angle equalities are there since $BPCQ$ is a parallelogram. So, consider homothety $\psi$ under $A$ follow by reflection along the angle bisector of $\angle BAC$ with scale $\frac{AF}{AC}$. Note that $\psi$ sends $F$ to $C$ and $E$ to $B$. Then $\psi$ sends $P$ to $P'$ such that $\triangle CP'B \sim FPE \implies P' = Q$. So, it also implies that the line $AQ$ is a reflection of the line $AP$ along the angle bisector of $\angle BAC$, which implies $\angle BAP = \angle CAQ$. So, we're done.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
OronSH
1728 posts
OronSH
#17 Aug 27, 2023, 3:20 AM
Y by
Great problem.

We use directed angles. Let $P'$ be the isogonal conjugate of $P.$ Consider the lines through $P'$ parallel to $PB,PC.$ These lines intersect $AB$ at points $D,F$ with $D$ between $A$ and $F,$ and they intersect $AC$ at points $E,G$ with $E$ between $A$ and $G.$ Since $\angle DFE=\angle ABP=\angle PCA=\angle DGE,$ we have that $DEGF$ is cyclic. Also, since $\angle BFP'=\angle ABP=\angle PCA=\angle BCP',$ we have $BFCP'$ is cyclic, and similarly $BCGP'$ is cyclic, so $BFCG$ is cyclic, and by Reim's theorem we have $DE,BC$ parallel. Now, take a homothety at $A$ sending $DE$ to $BC.$ It is not hard to see that this takes $P'$ to $Q,$ so $A,P',Q$ are collinear, and we have $\angle QAB=\angle CAP.$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
huashiliao2020
1292 posts
huashiliao2020
#18 Aug 30, 2023, 10:55 PM
Y by
It states that for a point P inside a triangle ABC with ABP=ACP, the point Q such that BPCQ is a parallelogram, AQ-AP are pairwise isogonal lines.

Here's the first one, quoted from my sl2012g2 (a good application for anyone who's reading!)
Sketch. If we let D be the point s.t. APBD is a parallelogram, we have that BDQ is congruent to APC by a translation of vector AD. (This is just done by length equalities and parallel lines.) Now, from DQB=ACP=ABP=DAB, ADBQ is cyclic. Then BAQ=BRQ=PAC, as desired. $\square$

Second solution I just came up with: Let BP,CP intersect AC,AB at E,F, respectively. It's obvious that $$F\in(BCE)\implies EFP=EBC=QCB,FEP=FCB=CBQ\implies EFP\sim CBQ,AEF\sim ABC\implies AEPF\sim ABQC\implies BAP=FAP=CAQ,$$as desired. $\blacksquare$
This post has been edited 2 times. Last edited by huashiliao2020, Aug 30, 2023, 11:01 PM
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Ianis
402 posts
Ianis
#19 Aug 30, 2023, 11:30 PM
Y by
Let $P'$ be the isogonal conjugate of $P$ in $ABC$, the angle condition implies that $P'$ is on the perpendicular bisector of $BC$. Use barycentric coordinates with respect to $ABC$ and let $P=(x,y,z)$. Then $P'=\left (\frac{a^2}{x}:\frac{b^2}{y}:\frac{c^2}{z}\right )$ and $Q=B+C-P=(-x,1-y,1-z)=(-x,z+x,x+y)$. We have\begin{align*}\begin{vmatrix}1&0&0\\\dfrac{a^2}{x}&\dfrac{b^2}{y}&\dfrac{c^2}{z}\\-x&z+x&x+y\end{vmatrix} & =\begin{vmatrix}\dfrac{b^2}{y}&\dfrac{c^2}{z}\\z+x&x+y\end{vmatrix} \\ & =b^2\frac{x+y}{y}-c^2\frac{z+x}{z} \\ & =\frac{b^2yz-c^2yz+b^2zx-c^2xy}{yz} \\ & =\frac{x}{a^2}\left ((b^2-c^2)\frac{a^2}{x}+a^2\left (\frac{b^2}{y}-\frac{c^2}{z}\right )\right ) \\ & =0, \end{align*}where the last equality holds because $P'$ is on the perpendicular bisector of $BC$. Hence $A,P',Q$ are collinear, so $\angle QAB=\angle P'AB=\angle CAP$. Done.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
asdf334
7586 posts
asdf334
#20 Oct 8, 2023, 9:45 PM
Y by
hello;;; ddit with $A$ and $BPCQ$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
shendrew7
793 posts
shendrew7
#21 Dec 31, 2023, 7:14 AM
Y by
Trivial by first isogonality lemma.

Let $X = BP \cap CA$ and $Y = CP \cap AB$. Then $BCXY$ is cyclic and $BPCQ$ is a parallelogram, so
\[\angle PXY = \angle BCP = \angle CBQ, \quad \angle PXY = \angle CBP = \angle BCQ.\]
Hence we have $\triangle PXY \sim \triangle QBC$ as well as $\triangle AXY \sim \triangle ABC$, so the quadrilaterals $AXPY$ and $ABQC$ are also similar with opposite orientation, which implies the desired. $\blacksquare$
This post has been edited 1 time. Last edited by shendrew7, Dec 31, 2023, 7:14 AM
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
joshualiu315
2513 posts
joshualiu315
#22 Jan 10, 2024, 3:10 AM
Y by
Let $R$ be the reflection of $P$ across the midpoint of $\overline{AB}$. It is clear that $ARBP$ is a parallelogram. Then, notice that $\overline{AR} \parallel \overline{BP} \parallel \overline{QC}$, and $AR=BP=QC$. Hence, $ARQC$ is a parallelogram, meaning that $\angle ARQ = \angle ACQ$.

Also, we have

\[\angle ABQ = \angle PBQ+\angle ABP =\angle PCQ+\angle PCA = \angle ACQ.\]
This means that $\angle ABQ = \angle ARQ$, so $ARBQ$ is cyclic. Thus,

\[\angle BAP = \angle ABR = \angle AQR = \angle CAQ. \ \square\]
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
EpicBird08
1746 posts
EpicBird08
#23 Jan 13, 2024, 5:08 PM
Y by
Let $H$ be the point such that $APCH$ is a parallelogram. First note that $AH = CP = BQ$ since $BPCQ$ is a parallelogram as well. Additionally, this gives $AH \parallel PC \parallel BQ,$ so $AHQB$ is also a parallelogram. Then $$\measuredangle AHQ = \measuredangle QBA = \measuredangle QBP + \measuredangle PBA = \measuredangle PCQ + \measuredangle ACP = \measuredangle ACQ,$$so $AHCQ$ is cyclic.

Next, note from our three parallelograms that $QC = BP, CH = AP,$ and $QH = AB,$ so $\triangle ABP \cong \triangle HQC.$ Finally, $\angle BAP = \angle QHC = \angle QAC,$ as desired.
This post has been edited 1 time. Last edited by EpicBird08, Jan 13, 2024, 5:09 PM
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
dolphinday
1319 posts
dolphinday
#24 Feb 4, 2024, 3:53 PM
Y by
Construct parallelograms $APCR$, $APBS$, and $BPCQ$.
And it follows that $ARQB$ is a parallelogram since $BQ \parallel PC \parallel AR$ and $AP \parallel RC$. Similarly, $ACQS$ is a parallelogram. Then we have $\angle SBP = 180^{\circ} = \angle SAP = \angle QAR = \angle BQA$ so $ASBQ$ is cyclic. Then $\angle CAQ = \angle{AQS} = \angle SBA = \angle{PAB}$ so we are done.
This post has been edited 2 times. Last edited by dolphinday, Feb 4, 2024, 3:53 PM
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Assassino9931
1245 posts
Assassino9931
#25 Feb 18, 2024, 11:56 AM
Y by
Denote $\angle BAC = \alpha$, $\angle ABP = \angle ACP = x$, $\angle BAP = y$, $\angle CAQ = z$. The Sine Law in $ABP$ and $ACP$ gives $\frac{BP}{\sin y} = \frac{AP}{\sin x} = \frac{CP}{\sin(\alpha - y)}$, i.e. $\frac{CP}{BP} = \frac{\sin(\alpha - y)}{\sin y}$. Analogously $\frac{BQ}{CQ} = \frac{\sin(\alpha - z)}{\sin z}$. However, $CP = BQ$ and $BP = CQ$ from the parallelogram $BPCQ$, thus $\frac{\sin(\alpha - y)}{\sin y} = \frac{\sin(\alpha - z)}{\sin z}$. Hence $\sin\alpha \cot y - \cos \alpha = \sin\alpha \cot z - \cos \alpha$, equivalent to $\cot y = \cot z$, i.e. $y=z$, as desired.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
dolphinday
1319 posts
dolphinday
#26 Jul 4, 2024, 4:39 PM
Y by
Alternate solution involving DDIT;

Apply DDIT on quadrilateral $BC\infty_{BP}\infty_{BQ}$ from point $A$.
Then $B\infty_{BP} \cap C\infty_{BQ} = P$, and $B_\infty{BQ} \cap C\infty_{BP} = Q$, so we get that $(AB, AC)$, $(A\infty_{BP}, A\infty_{BQ})$, and $(AP, AQ)$ are involutions.
However $\angle \infty_{BQ}AC = \angle ACP = \angle ABP = \angle \infty_{BP}AB$, so $(AB, AC)$ and $(A\infty_{BP}, A\infty_{BQ})$ are both involutions around the angle bisector of $\angle BAC$. So it follows that $AP$ and $AQ$ are isogonal as desired.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Martin2001
132 posts
Martin2001
#27 Aug 16, 2024, 5:50 PM
Y by
Let the reflection of $P$ over the midpoint of $AC$ be $K.$ We see that $AKQB$ is a parralelogram. We show $AKCQ$ is cyclic because then $\angle QAC=\angle QKC=\angle BAQ.$ Let $\angle QAC=y, \angle ACP=x.$ Then $a-y=\angle BAQ=\angle KQA.$ Then note that $\angle CAK=x.$ Therefore $$180-a-x=\angle AKQ=\angle ACQ=b+c-x,$$as desired$.\blacksquare$
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
ihatemath123
3442 posts
ihatemath123
#28 Aug 16, 2024, 7:55 PM • 1 Y
Y by OronSH
Vertically stretch about the angle bisector of $\angle BAC$ until $P$ is the orthocenter of $\triangle ABC$, then $Q$ is the antipode so it's obvious.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
bachkieu
133 posts
bachkieu
#29 Sep 5, 2024, 12:13 AM
Y by
I think this works?
Let $CQ \cap AB = X, BQ \cap AC = Y$; it's easy to show that $\triangle ABC \sim \triangle AYX$ and that $P$ of $\triangle$ $ABC$ corresponds to $Q$ of $\triangle AYX$.
This post has been edited 1 time. Last edited by bachkieu, Sep 5, 2024, 12:14 AM
Reason: forgot period
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Lleeya
11 posts
Lleeya
#30 Sep 5, 2024, 1:21 AM • 1 Y
Y by endless_abyss
This is Romanian Lemma, construct $EPFR$ to be parralelogram and trivial by similarity of $AEF$ and $ABC$.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
endless_abyss
41 posts
endless_abyss
#31 Nov 25, 2024, 5:30 PM
Y by
Here's my solution :)
Attachments:
This post has been edited 1 time. Last edited by endless_abyss, Nov 25, 2024, 5:31 PM
Reason: typo haha
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
AndreiVila
209 posts
AndreiVila
#32 Nov 25, 2024, 6:27 PM • 2 Y
Y by trigadd123, Ciobi_
Lleeya wrote:
This is Romanian Lemma, construct $EPFR$ to be parralelogram and trivial by similarity of $AEF$ and $ABC$.

Now I can finally go to sleep knowing that we've achieved our goal at MOP. We won.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
AshAuktober
990 posts
AshAuktober
#33 Mar 7, 2025, 7:27 AM
Y by
Yay!
The given is equivalent to $A\infty_{BP}$, $A\infty_{CP}$ being isogonal. From here Isogonal Line Lemma (or DDIT if you wish) gives the required.
Z K Y
The post below has been deleted. Click to close.
This post has been deleted. Click here to see post.
Tsikaloudakis
978 posts
Tsikaloudakis
#35 Mar 7, 2025, 11:28 AM
Y by
see the figure:
Attachments:
Z K Y
N Quick Reply
G
H
=
a