Number theory

by spiderman0, Mar 30, 2025, 4:51 PM

Find all n such that $3^n + 1$ is divisibly by $n^2$.
I want a solution that uses order or a solution like “let p be the least prime divisor of n”
number theory
Order
L

Fixed point config on external similar isosceles triangles

by Assassino9931, Mar 30, 2025, 12:41 PM

Let $AB$ be an acute scalene triangle. A point \( D \) varies on its side \( BC \). The points \( P \) and \( Q \) are the midpoints of the arcs \( \widehat{AB} \) and \( \widehat{AC} \) (not containing \( D \)) of the circumcircles of triangles \( ABD \) and \( ACD \), respectively. Prove that the circumcircle of triangle \( PQD \) passes through a fixed point, independent of the choice of \( D \) on \( BC \).
This post has been edited 1 time. Last edited by Assassino9931, Today at 1:10 PM
Fixed point
geometry
L

Geo challenge on finding simple ways to solve it

by Assassino9931, Mar 30, 2025, 12:35 PM

Let $ABC$ be an acute scalene triangle inscribed in a circle \( \Gamma \). The angle bisector of \( \angle BAC \) intersects \( BC \) at \( L \) and \( \Gamma \) at \( S \). The point \( M \) is the midpoint of \( AL \). Let \( AD \) be the altitude in \( \triangle ABC \), and the circumcircle of \( \triangle DSL \) intersects \( \Gamma \) again at \( P \). Let \( N \) be the midpoint of \( BC \), and let \( K \) be the reflection of \( D \) with respect to \( N \). Prove that the triangles \( \triangle MPS \) and \( \triangle ADK \) are similar.
This post has been edited 1 time. Last edited by Assassino9931, Today at 1:09 PM
geometry
Angle Chasing
similarity
circumcircle
L

nice problem

by hanzo.ei, Mar 29, 2025, 5:58 PM

Let triangle $ABC$ be inscribed in the circumcircle $(O)$ and circumscribed about the incircle $(I)$, with $AB < AC$. The incircle $(I)$ touches the sides $BC$, $CA$, and $AB$ at $D$, $E$, and $F$, respectively. A line through $I$, perpendicular to $AI$, intersects $BC$, $CA$, and $AB$ at $X$, $Y$, and $Z$, respectively. The line $AI$ meets $(O)$ at $M$ (distinct from $A$). The circumcircle of triangle $AYZ$ intersects $(O)$ at $N$ (distinct from $A$). Let $P$ be the midpoint of the arc $BAC$ of $(O)$. The line $AI$ cuts segments $DF$ and $DE$ at $K$ and $L$, respectively, and the tangents to the circle $(DKL)$ at $K$ and $L$ intersect at $T$. Prove that $AT \perp BC$.
geometry unsolved
geometry
L

Finding big a_i a_i+1

by nAalniaOMliO, Mar 28, 2025, 8:36 PM

Positive real numbers $a_1>a_2>\ldots>a_n$ with sum $s$ are such that the equation $nx^2-sx+1=0$ has a positive root $a_{n+1}$ smaller than $a_n$.
Prove that there exists a positive integer $r \leq n$ such that the inequality $a_ra_{r+1} \geq \frac{1}{r}$ holds.
algebra
L

fifth power

by mathbetter, Mar 25, 2025, 1:11 PM

\[ \text{Find all prime numbers } (p, q) \text{ such that } p^2 + 3pq + q^2 \text{ is a fifth power of an integer.} \]
number theory
prime numbers
L

Escape from the room

by jannatiar, Mar 4, 2025, 6:51 AM

A person is locked in a room with a password-protected computer. If they enter the correct password, the door opens and they are freed. However, the password changes every time it is entered incorrectly. The person knows that the password is always a 10-digit number, and they also know that the password change follows a fixed pattern. This means that if the current password is \( b \) and \( a \) is entered, the new password is \( c \), which is determined by \( b \) and \( a \) (naturally, the person does not know \( c \) or \( b \)). Prove that regardless of the characteristics of this computer, the prisoner can free themselves.

Proposed by Reza Tahernejad Karizi
This post has been edited 3 times. Last edited by jannatiar, Mar 10, 2025, 7:30 PM
combinatorics
Game Theory
AlborzMO
L

Special students

by BR1F1SZ, Dec 24, 2024, 5:47 PM

In a school with double schooling, in the morning the language teacher divided the students into $200$ groups for an activity. In the afternoon, the math teacher divided the same students into $300$ groups for another activity. A student is considered special if the group they belonged to in the afternoon is smaller than the group they belonged to in the morning. Find the minimum number of special students that can exist in the school.

Note: Each group has at least one student.
combinatorics
L

Equal radius

by FabrizioFelen, Jun 20, 2016, 7:09 PM

Let $\triangle ABC$ be triangle with incenter $I$ and circumcircle $\Gamma$. Let $M=BI\cap \Gamma$ and $N=CI\cap \Gamma$, the line parallel to $MN$ through $I$ cuts $AB$, $AC$ in $P$ and $Q$. Prove that the circumradius of $\odot (BNP)$ and $\odot (CMQ)$ are equal.
This post has been edited 1 time. Last edited by FabrizioFelen, Jun 20, 2016, 7:10 PM
geometry
incenter
circumcircle
L

Question 2

by Valentin Vornicu, Jul 25, 2007, 7:34 AM

Consider five points $ A$, $ B$, $ C$, $ D$ and $ E$ such that $ ABCD$ is a parallelogram and $ BCED$ is a cyclic quadrilateral. Let $ \ell$ be a line passing through $ A$. Suppose that $ \ell$ intersects the interior of the segment $ DC$ at $ F$ and intersects line $ BC$ at $ G$. Suppose also that $ EF = EG = EC$. Prove that $ \ell$ is the bisector of angle $ DAB$.

Author: Charles Leytem, Luxembourg
geometry
parallelogram
circumcircle
IMO
IMO 2007
Charles Leytem
homothety
L

life crisis

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Submit

  • done!
    $~~~~$

    by pupitrethebean, Mar 19, 2025, 2:05 PM

  • Hi! Contrib?

    by RandomeMids, Mar 13, 2025, 2:22 PM

  • aww tysmmmm

    by pupitrethebean, Feb 3, 2025, 10:19 PM

  • revive the shoutbox lol

    i like your blog : )

    by witchofblackbirdpond, Feb 3, 2025, 7:56 PM

  • revive the shoutbox

    by pupitrethebean, Jan 20, 2025, 4:42 AM

  • d
    e
    d
    .$~~$

    by ujulee, Nov 26, 2024, 11:37 PM

  • bruhhh nahhhh

    by pupitrethebean, Oct 13, 2024, 3:22 PM

  • this blog is so aesthetic it's crazy

    by Technodoggo, Oct 12, 2024, 11:16 PM

  • ehhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhhh soon :>

    by pupitrethebean, Oct 12, 2024, 1:29 AM

  • pupitre you should totally promote meee

    by CC_chloe, Oct 11, 2024, 7:34 PM

  • admins and contribs r different colors

    by pupitrethebean, Oct 8, 2024, 3:01 PM

  • why are certain usernames different colors :thonk:

    by Technodoggo, Oct 8, 2024, 12:44 AM

  • spoooooky

    by blair_givenchy, Oct 3, 2024, 12:24 PM

  • okie dokes

    by pupitrethebean, Oct 3, 2024, 1:55 AM

  • could i pls contrib as well? and if it's alright could i have display name of "Lydia"?

    by Hestu_the_Bestu, Oct 2, 2024, 5:52 PM

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Mosquito
my brother
Name
Netflix
nice
no ac
no comprendo
no school
Nooooo
Oh
oh no
oh no children
Old
oops
ootd
orange
panera
Photos
picture
pizza
Power
project
qotd
questionable
Rabbit
rating
remember kids
reminder
RIP
ruff ruff
sadness
sajfdjasf
seansuksd
send help
Sick
skip
smort
so random
sobbing
sobs
song
SOUP
Spanish
stairs
Stinky
story
stuff
taipei
taipei 101
teasuckspp
this is a bad idea
Thoughts
Tired
Travel
twoset
uh oh
uju dont say smooth hand
update
Vacation
vans
vansisstinky
Warm
wedding
wevideo
what
what an L
whenitsnotday
work
WWI
y are there 24 posts in 14 day
ye
YEEE
About Owner
  • Posts: 4
  • Joined: Jan 19, 2023
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  • Blog created: Mar 31, 2023
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