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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.

Are you interested in working towards MATHCOUNTS and don’t know where to start? We have you covered! If you have taken Prealgebra, then you are ready for MATHCOUNTS/AMC 8 Basics. Already aiming for State or National MATHCOUNTS and harder AMC 8 problems? Then our MATHCOUNTS/AMC 8 Advanced course is for you.

Summer camps are starting next month at the Virtual Campus in math and language arts that are 2 - to 4 - weeks in duration. Spaces are still available - don’t miss your chance to have an enriching summer experience. 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)!

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[list][*]May 9th, 4:30pm PT/7:30pm ET, Casework 2: Overwhelming Evidence — A Text Adventure, a game where participants will work together to navigate the map, solve puzzles, and win! All are welcome.
[*]May 19th, 4:30pm PT/7:30pm ET, What's Next After Beast Academy?, designed for students finishing Beast Academy and ready for Prealgebra 1.
[*]May 20th, 4:00pm PT/7:00pm ET, Mathcamp 2025 Qualifying Quiz Part 1 Math Jam, Problems 1 to 4, join the Canada/USA Mathcamp staff for this exciting Math Jam, where they discuss solutions to Problems 1 to 4 of the 2025 Mathcamp Qualifying Quiz!
[*]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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Cycle in a graph with a minimal number of chords
GeorgeRP   4
N 11 minutes ago by CBMaster
Source: Bulgaria IMO TST 2025 P3
In King Arthur's court every knight is friends with at least $d>2$ other knights where friendship is mutual. Prove that King Arthur can place some of his knights around a round table in such a way that every knight is friends with the $2$ people adjacent to him and between them there are at least $\frac{d^2}{10}$ friendships of knights that are not adjacent to each other.
4 replies
GeorgeRP
Yesterday at 7:51 AM
CBMaster
11 minutes ago
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amazing balkan combi
egxa   8
N an hour ago by Gausikaci
Source: BMO 2025 P4
There are $n$ cities in a country, where $n \geq 100$ is an integer. Some pairs of cities are connected by direct (two-way) flights. For two cities $A$ and $B$ we define:

$(i)$ A $\emph{path}$ between $A$ and $B$ as a sequence of distinct cities $A = C_0, C_1, \dots, C_k, C_{k+1} = B$, $k \geq 0$, such that there are direct flights between $C_i$ and $C_{i+1}$ for every $0 \leq i \leq k$;
$(ii)$ A $\emph{long path}$ between $A$ and $B$ as a path between $A$ and $B$ such that no other path between $A$ and $B$ has more cities;
$(iii)$ A $\emph{short path}$ between $A$ and $B$ as a path between $A$ and $B$ such that no other path between $A$ and $B$ has fewer cities.
Assume that for any pair of cities $A$ and $B$ in the country, there exist a long path and a short path between them that have no cities in common (except $A$ and $B$). Let $F$ be the total number of pairs of cities in the country that are connected by direct flights. In terms of $n$, find all possible values $F$

Proposed by David-Andrei Anghel, Romania.
8 replies
egxa
Apr 27, 2025
Gausikaci
an hour ago
J
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abc = 1 Inequality generalisation
CHESSR1DER   6
N an hour ago by CHESSR1DER
Source: Own
Let $a,b,c > 0$, $abc=1$.
Find min $ \frac{1}{a^m(bx+cy)^n} + \frac{1}{b^m(cx+ay)^n} + \frac{1}{c^m(cx+ay)^n}$.
$1)$ $m,n,x,y$ are fixed positive integers.
$2)$ $m,n,x,y$ are fixed positive real numbers.
6 replies
CHESSR1DER
2 hours ago
CHESSR1DER
an hour ago
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Fond all functions in M with a) f(1)=5/2, b) f(1)=√3
Amir Hossein   5
N an hour ago by jasperE3
Source: IMO LongList 1982 - P34
Let $M$ be the set of all functions $f$ with the following properties:

(i) $f$ is defined for all real numbers and takes only real values.

(ii) For all $x, y \in \mathbb R$ the following equality holds: $f(x)f(y) = f(x + y) + f(x - y).$

(iii) $f(0) \neq 0.$

Determine all functions $f \in M$ such that

(a) $f(1)=\frac 52$,

(b) $f(1)= \sqrt 3$.
5 replies
Amir Hossein
Mar 18, 2011
jasperE3
an hour ago
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J
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Troll number theory
kokcio   0
Apr 10, 2025
Let $p,q,r>2$ are primes, which satisfy:
$q^4+(q+4)(r^2-q^2)=p$
$q|p+5$
$\sqrt{\frac{q^4-1}{r^2-1}}$ is an integer
Find all possible values of $p$.
0 replies
kokcio
Apr 10, 2025
0 replies
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Troll number theory
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kokcio
69 posts
kokcio
#1 Apr 10, 2025, 6:45 AM
Y by
Let $p,q,r>2$ are primes, which satisfy:
$q^4+(q+4)(r^2-q^2)=p$
$q|p+5$
$\sqrt{\frac{q^4-1}{r^2-1}}$ is an integer
Find all possible values of $p$.
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