n^2 + 24n + 35 is a perfect square

Old High School Olympiads Regional, National, and International Math Olympiads before 2001 mostly, recent years have been posted in order to make contest collections richer

Regional, National, and International Math Olympiads before 2001 mostly, recent years have been posted in order to make contest collections richer

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Old High School Olympiads Regional, National, and International Math Olympiads before 2001 mostly, recent years have been posted in order to make contest collections richer

Regional, National, and International Math Olympiads before 2001 mostly, recent years have been posted in order to make contest collections richer

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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.

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0 replies

jlacosta

Apr 2, 2025

0 replies

k i testing latex post , please ignore

parmenides51 3

N Feb 23, 2025 by parmenides51

Source: used with https://artofproblemsolving.com/community/c3170239_latex_testing_for_post_collections

issue 1 ..,
Click to reveal hidden text

Γραμμικά Συστήματα 2x2 στα σχολικά βιβλία μαθηματικών
ΒΓ 1 Δώδεκα μικρά λεωφορεία των 8 και 14 ατόμων μεταφέρουν συνολικά 126 επιβάτες. Πόσα λεωφορεία είναι των 8 και πόσα των 14 ατόμων;
2 .Ένας πατέρας είναι 44 ετών και ο γιος του είναι 8 ετών. Μετά από πόσα έτη η ηλικία του πατέρα θα είναι τριπλάσια της ηλικίας του γιου;
ΓΓ 3. Ο κερματοδέκτης ενός μηχανήματος πώλησης αναψυκτικών δέχεται κέρματα των 50 λεπτών και του 1 ευρώ. Όταν ανοίχτηκε, διαπιστώθηκε ότι περιείχε 126 κέρματα συνολικής αξίας 90 ευρώ. Πόσα κέρματα υπήρχαν από κάθε είδος;
4. Συσκευάσαμε 2,5 τόνους ελαιόλαδου σε 800 δοχεία των 2 και 5 κιλών. Να βρείτε πόσα δοχεία χρησιμοποιήσαμε από κάθε είδος.
5. O μέσος όρος της βαθμολογίας ενός μαθητή στη Φυσική και τη Χημεία κατά το πρώτο τρίμηνο ήταν 16. Στο δεύτερο τρίμηνο ο βαθμός της Φυσικής μειώθηκε κατά 2 μονάδες, ο βαθμός της Χημείας αυξήθηκε κατά 4 μονάδες με αποτέλεσμα οι δύο βαθμοί να γίνουν ίσοι. Ποιους βαθμούς είχε ο μαθητής σε καθένα από τα δύο μαθήματα κατά το πρώτο τρίμηνο;
6. Αν οι μαθητές ενός τμήματος καθίσουν ανά ένας σε κάθε θρανίο, τότε θα μείνουν όρθιοι 8 μαθητές, ενώ αν καθίσουν ανά δύο θα μείνουν κενά 4 θρανία. Να βρείτε πόσοι είναι οι μαθητές και πόσα τα θρανία.
7. Μια ποτοποιία παρασκεύασε 400 λίτρα ούζο περιεκτικότητας 38% vol, αναμειγνύοντας δύο ποιότητες με περιεκτικότητες 32% vol και 48% vol αντίστοιχα. Πόσα λίτρα από κάθε ποιότητα χρησιμοποίησε;
8. Από ένα σταθμό διοδίων πέρασαν 945 αυτοκίνητα και μοτοσικλέτες και εισπράχτηκαν 1810 €. Αν ο οδηγός κάθε αυτοκινήτου πλήρωσε 2 € και ο οδηγός κάθε μοτοσικλέτας πλήρωσε 1,2 €, να βρείτε πόσα ήταν τα αυτοκίνητα και πόσες οι μοτοσικλέτες.
9. Σ' ένα τηλεοπτικό παιχνίδι σε κάθε παίκτη υποβάλλονται 10 ερωτήσεις και για κάθε σωστή απάντηση προστίθενται βαθμοί, ενώ για κάθε λανθασμένη απάντηση αφαιρούνται βαθμοί. Ένας παίκτης έδωσε 7 σωστές απαντήσεις και συγκέντρωσε 64 βαθμούς, ενώ ένας άλλος έδωσε 4 σωστές απαντήσεις και συγκέντρωσε 28 βαθμούς. Πόσους βαθμούς παίρνει ένας παίκτης για κάθε σωστή απάντηση και πόσοι βαθμοί τού αφαιρούνται για κάθε λανθασμένη απάντηση;
10. Να βρείτε τις ηλικίες δύο αδελφών, αν σήμερα διαφέρουν κατά 5 χρόνια, ενώ μετά από 11 χρόνια οι ηλικίες τους θα έχουν λόγο 4/3.
11. Σ ´ ένα ταξίδι με πλοίο, το εισιτήριο της Α΄ θέσης κοστίζει 18 € και της Β΄ θέσης κοστίζει 6 € λιγότερα. Αν σ ´ ένα ταξίδι κόπηκαν 350 εισιτήρια συνολικής αξίας 4500 €, να βρείτε πόσα εισιτήρια κόπηκαν από κάθε κατηγορία.
12. Να βρείτε ένα διψήφιο αριθμό, που το άθροισμα των ψηφίων του είναι ίσο με 10 και αν εναλλάξουμε τα ψηφία του, τότε θα προκύψει αριθμός κατά 18 μικρότερος.
ΑΛ. 13. Από κεφάλαιο 4000 € ένα μέρος του κατατέθηκε σε μια τράπεζα προς 5% και το υπόλοιπο σε μια άλλη τράπεζα προς 3%. Ύστερα από 1 χρόνο εισπράχθηκαν συνολικά 175€ τόκοι. Ποιο ποσό τοκίστηκε προς 5% και ποιο προς 3%;
14 Πόσο καθαρό οινόπνευμα πρέπει να προσθέσει ένας φαρμακοποιός σε 200ml διάλυμα οινοπνεύματος περιεκτικότητας 15%, για να πάρει διάλυμα οινοπνεύματος περιεκτικότητας 32%;
BΛ. 15. Ένα ξενοδοχείο έχει 26 δωμάτια, άλλα δίκλινα και άλλα τρίκλινα και συνολικά 68 κρεβάτια. Πόσα είναι τα δίκλινα και πόσα τα τρίκλινα δωμάτια;
16. Σε έναν αγώνα το παιδικό εισιτήριο κοστίζει 1,5 € και το εισιτήριο ενός ενήλικα 4€. Τον αγώνα παρακολούθησαν 2200 άτομα και εισπράχτηκαν 5050 €. Να βρείτε πόσα ήταν τα παιδιά και πόσοι οι
ενήλικες που παρακολούθησαν τον αγώνα.
17. Ένας χημικός έχει δύο διαλύματα υδροχλωρικού οξέως, το πρώτο έχει περιεκτικότητα 50% σε υδροχλωρικό οξύ και το δεύτερο έχει περιεκτικότητα 80% σε υδροχλωρικό οξύ. Ποια ποσότητα από κάθε διάλυμα πρέπει να αναμείξει ώστε να πάρει 100 ml διάλυμα περιεκτικότητας 68% σε υδροχλωρικό οξύ;

3 replies

parmenides51

Oct 10, 2022

parmenides51

Feb 23, 2025

i Geo Collections + Forums + Greek Aops Index

parmenides51 57

N Oct 12, 2024 by parmenides51

57 replies

parmenides51

Mar 7, 2020

parmenides51

Oct 12, 2024

i Forum's Purpose - Index of posted Contest Collections

parmenides51 29

N Mar 30, 2023 by huashiliao2020

I created this forum in order to post High School Math Olympiads before 2001 (not present in aops at the moment) in order to add more Contests to the existing Aops Contest Collections (without spamming the existing forums by posting too many posts in so little time). I also post recent problems not available at the moment at contest collections, in oder to create those post collections.
Anyone is welcome to post problems from a national competition (final round or TST) of his / her country not already posted in Aops Contest Collections, to get those links (just not post random problem but all from each year's competition). There is no limit to how many problems anyone may post in this forum, as it serves as a new problem collection source for more (older usually) posts collection (e.g. anyone may post in a day 40 different problems from 10 years of his \ her 4 problem's olympiad in 40 different posts - one problem at each post).

Forum Contests Collected:
- Mathcenter Contest (Thai)
- Mathlinks Contests (old name of aops)
- OIFMAT (FMAT - Chilean)
- Oliforum Contest (Italian)
- VMEO (VMF - Vietnamese)

Below are the contest collections I have created using this forum :
- Arab Math Olympiad
- Argentina NMO Finals: 2008
- Argentina NMO Round 4 / Regional Geo, L1, L2, L3, years 1995-2022
- Argentina Provincional Geo: L1, L2, L3 , 1995-2022
- Argentina TST / geometry : Ibero , IMO, Cono Sur
- Austrian - Polish Competition : 1979-2000
- Austria Beginners' Competition: 2001-08
- Belarus National MO: 1995, 1997 missing problems , 1998 , 2001, 2002, 2003,2006 , 2014
- Belarus TST : 1998 , 2000 , 2009 , 2010, 2011, 2012, 2014, 2015, 2016
- Bosnia and Herzegovina JBMO TST: 2003-07
- Brazil TSTs: EGMO, Geometry : Cono Sur, Cono Sur Training List , ΙΜΟ + Ibero ,
- Brazil IMO TST: 2007-16
- Bulgaria National MO: 1993-96
- Chile Contests / Chile NMO 1989 -2015
- Czech and Slovak Olympiad III A: so far 1986, 1991- 2001
- Czech-Polish-Slovak Junior Match: all
- ~~Croatia National MO~~: 1996-2004
- Croatia TST: so far 2001, 2002, 2003
- Estonia Open Junior: ~~2001-2005~~, 2006, 2007, ~~2008-2019~~
- Estonia Open Senior: ~~2001-2005~~, 2006, 2007, ~~2008-2019~~
- Estonia National MO: so far 1996-2007, (soon 2008-2021)
- Estonia TST: ~~1992-95, 1998-2000~~, 2001-19
- ~~French National MO~~: 1986, 1988-2003
- Final Mathematical Cup
- Germany / Bundeswettbewerb Mathematik : 1974-1982 , 1990
- Germany / National MO: so far 1965, 1996- 2001, 2009
- Germany / QUEDMO (11 /15 editions so far)
- Greece Junior: 1996 - 2020
- Hungary / Kürschák: 1947-84
- Hungary / Dürer / Finals: 2019-21
- India / LIMIT : 2020
- India / Postal Coaching: 2007-09 , 2012
- Israel / National (Gillis) : 1995-98
- Israel / Grosman: so far 1995, 1997, 1999, 2001
- Italy TST: so far 1993-94, 1998
- Kyrgystan TST: 2010, 2018
- Lithuania / Grand Duchy of Lithuania 2009-20
- Macedonia North National MO: so far 1994, 1995, 1996, 1997, 1998, 1999, 2002, 2003, 2004, 2005
- May Olympiad all
- Moldova Contests /JBMO TST: 1999- 2020
- ~~Moldova National MO~~
- ~~Mongolia National MO~~: 1999-2002, 2007
- Netherlands / Dutch ΙΜΟ TST: 2021
- New Zealand / NZMOC Camp Selection Problems, New Zealand MO
- Norway / Abels Math Contest (Final Round): 1993- 2006
- Polish MO Finals: 1966-84
- Rioplatense L3 1990-99
- Romania MOP: ROMOP 2011 Juniors
- Romania JBMO TST : 2002-19
- Romania TST: so far 1989, 1990 , 1991 (missing), 1992, 1993, 1995
- Saudi Arabia / BMO TST: 2010-11, 2013, 2015-19
/ GMO TST: 2013-16, 2018
/ IMO TST: 2011.2013, 2015-19
/ Pre-TST + Training Tests: 2010-11, 2021
- Saudi Arabia JBMO TST: 2017, 2019
- ~~Serbia National MO~~: 1974 - 2006 (also known as Yugoslavia before 1990)
- Serbia TST:
- Singapore Junior : 2006-2019 collected
- Singapore Open: 1995 - 2004, 2014, 2016-17
- Singapore Senior : 1996 - 2008, 2011-13, 2015-19,
- Singapore TST: 1995 -2003
- ~~Slovenia National MO~~: 1997-2001, 2005
- Slovenia TST: so far 1997, 1998, 2005
- Soros Olympiad
- Spanish MO: 1966-83
- Sweden National MO: 1961 - 2020
- Switzerland TST : so far 1997 - 2004, 2015 .
- Thailand MO: 2004- 15
- Ukraine National MO: 1997, 1998, 1999, 2005
- Ukraine TST: 1999, 2009-18
- USA / iΤest: 2005

Basic Source: Imomath

PS. My posting ability in public forums is as everyone’s else limited. Therefore when I post in public forums, I post only the geometry problems. When my source is written not in English, only the geometry ones are posted as I spend time translating them by google translate. When my source is written in English, I post the whole problem set in aops, posting the non-geometry problems in this forum and adding all the problems in contest collections.
In this forum’s index, anyone may find which contests’ years have been posted inside this forum.
In the future, each year's post collections shall be available in the Contests Collections, till then anyone may find them above.

Related forums:
Old Russian Math Olympiads
China High School Contests
KöMaL (Hungarian Magazine)

For the friends of geometry:
Olympiad Geometry Collections + Forums
A Beautiful Journey Through Olympiad Geometry - solutions forum
Evan Chen's EGMO study group
Lemmas in Olympiad Geometry - active forum
Tran Quang Hung's geometry group

uc = Under Construction

PS. It is not permitted to create contest collections of each year inside aops from National Contests of UK and Australia.

PS.2 Test

29 replies

parmenides51

Feb 11, 2020

huashiliao2020

Mar 30, 2023

|a - b| is perfect square if a - b = a^2c - b^2d$ for consecutive c,d

parmenides51 2

N 3 hours ago by AshAuktober

Source: 2011 Saudi Arabia IMO TST 2.1

Let $a$ and $b$ be integers such that $a - b = a^2c - b^2d$ for some consecutive integers $c$ and $d$ . Prove that $|a - b|$ is a perfect square.

2 replies

parmenides51

Dec 29, 2021

AshAuktober

3 hours ago

p divides F_{2p} - F_p

parmenides51 2

N Today at 3:04 AM by CrazyInMath

Source: 2011 Saudi Arabia BMO TST 3.4 - Balkan MO

Let $(F_n )_{n\ge o}$ be the sequence of Fibonacci numbers: $F_0 = 0$ , $F_1 = 1$ and $F_{n+2} = F_{n+1}+F_n$ , for every $n \ge 0$ .
Prove that for any prime $p \ge 3$ , $p$ divides $F_{2p} - F_p$ .

2 replies

parmenides51

Dec 29, 2021

CrazyInMath

Today at 3:04 AM

color 9x9 board so that each 2x3 or 3x block contains exactly 2 black

parmenides51 2

N Yesterday at 12:45 PM by lightsynth123

Source: Singapore Senior Math Olympiad 2015 2nd Round p4 SMO

Is it possible to color each square on a $9\times 9$ board so that each $2\times 3$ or $3\times 2$ block contains exactly $2$ black squares? If so, what is/are the possible total number(s) of black squares?

2 replies

parmenides51

Mar 26, 2020

lightsynth123

Yesterday at 12:45 PM

x^[x]=9/2

parmenides51 4

N Apr 24, 2025 by navier3072

Source: 2002 Austria Beginners' Competition p2

Prove that there are no $x\in\mathbb{R}^+$ such that $x^{\lfloor x \rfloor }=\frac92.$

4 replies

parmenides51

Oct 4, 2022

navier3072

Apr 24, 2025

4mn - m - n is a perfect square

parmenides51 2

N Apr 24, 2025 by navier3072

Source: ROMOP 2011 Junior p10 - Romanian MOP

There are no nonzero natural numbers $m, n$ for which it $4mn - m - n$ is a perfect square.

2 replies

parmenides51

Aug 14, 2020

navier3072

Apr 24, 2025

set of 15 coprime numbers out of 2011 contains a prime number

parmenides51 1

N Apr 24, 2025 by lightsynth123

Source: Singapore Junior Math Olympiad 2012 2nd Round p5 SMO

Suppose $S = \{a_1, a_2,..., a_{15}\}$ is a set of $1 5$ distinct positive integers chosen from $2 , 3, ... , 2012$ such that every two of them are coprime. Prove that $S$ contains a prime number.
(Note: Two positive integers $m, n$ are coprime if their only common factor is 1)

1 reply

parmenides51

Mar 25, 2020

lightsynth123

Apr 24, 2025

30x070y03 is a multiple of 37

parmenides51 4

N Apr 20, 2025 by Namisgood

Source: Singapore Junior Math Olympiad 2nd Round p1 SMO 2015 and 2018

Consider the integer $30x070y03$ where $x, y$ are unknown digits. Find all possible values of $x, y$ so that the given integer is a multiple of $37$ .

4 replies

parmenides51

Mar 26, 2020

Namisgood

Apr 20, 2025

can anyone give the soln without using inequalitys?(except AM GM)

Namisgood 0

Apr 20, 2025

Source: JBMO TST 2022

Solve in the set $R$ the equation $\frac{3x+3}{\sqrt{x}}-\frac{x+1}{\sqrt{x^2-x+1}}=4$

0 replies

Namisgood

Apr 20, 2025

0 replies

[x] {x } = 2001 x

parmenides51 3

N Apr 19, 2025 by Namisgood

Source: 2001 Moldova JBMO TST p2

Solve in $R$ equation $[x] \cdot \{x\} = 2001 x$ , where $[ .]$ and $\{ .\}$ represent respectively the floor and the integer functions.

3 replies

parmenides51

Feb 20, 2021

Namisgood

Apr 19, 2025

sum 2^k/\sqrt{k+0.5} <= 2^{n+1}\sqrt{n+1}- 4n^{3/2}/3 from k=1 to n

parmenides51 4

N Apr 19, 2025 by lightsynth123

Source: Singapore Senior Math Olympiad 2016 2nd Round p3 SMO

For any integer $n \ge 1$ , show that
$\sum_{k=1}^{n} \frac{2^k}{\sqrt{k+0.5}} \le 2^{n+1}\sqrt{n+1}-\frac{4n^{3/2}}{3}$

4 replies

parmenides51

Mar 26, 2020

lightsynth123

Apr 19, 2025

n^2 + 24n + 35 is a perfect square

parmenides51 5

N Mar 31, 2025 by lightsynth123

Source: Singapore Junior Math Olympiad 2016 2nd Round p1 SMO

Find all integers $n$ such that $n^2 + 24n + 35$ is a square.

5 replies

parmenides51

Mar 26, 2020

lightsynth123

Mar 31, 2025

n^2 + 24n + 35 is a perfect square

G H J

Reveal topic tags

Perfect Square

number theory

G H BBookmark kLocked kLocked NReply

Source: Singapore Junior Math Olympiad 2016 2nd Round p1 SMO

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parmenides51

30650 posts

parmenides51

#1 h Mar 26, 2020, 2:08 PM

Y by

Find all integers $n$ such that $n^2 + 24n + 35$ is a square.

Z K Y

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AIMEBOY

5 posts

AIMEBOY

#2 h Dec 6, 2020, 12:56 PM

Y by

n= -67. and n=43

Z K Y

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MathX322

3 posts

MathX322

#3 h Dec 6, 2020, 2:22 PM

Y by

AIMEBOY wrote:

n= -67. and n=43

Yup!
It Would be great if you could post your solution as well

Z K Y

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abhijeetkr

7 posts

abhijeetkr

#4 h Dec 7, 2020, 7:05 PM • 3 Y

Y by MathsloverABHI, MathX322, Iora

parmenides51 wrote:

Find all integers $n$ such that $n^2 + 24n + 35$ is a square.

Let $n^2 + 24n + 35$ = $x^2 eqn.1$
$n^2 + 24n + 35 + 109$ = $x^2+109$
$(n+12)^2$ = $x^2 +109$
$(n+12)^2-x^2$ =109
$(n+12+x)(n+12-x)$ = 109
Since Rhs is a prime no.
Therefore $(n+12-x) = 1$
$(n+12+x)=109$
On simplifying we'll get x=54, substituting it in eqn 1, we get
$n^2 +24n - 2881 =0$
The solutions to this quadratic are the only soln,i.e. 43,-67

This post has been edited 3 times. Last edited by abhijeetkr, Dec 7, 2020, 7:07 PM
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abhijeetkr

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abhijeetkr

#5 h Dec 7, 2020, 7:08 PM

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MathX322 wrote:

AIMEBOY wrote:

n= -67. and n=43