# Amicable numbers Information

*https://en.wikipedia.org/wiki/Amicable_number*

**Amicable numbers** are two different
numbers related in such a way that the
sum of the
proper divisors of each is equal to the other number.

The smallest pair of amicable numbers is ( 220, 284). They are amicable because the proper divisors of 220 are 1, 2, 4, 5, 10, 11, 20, 22, 44, 55 and 110, of which the sum is 284; and the proper divisors of 284 are 1, 2, 4, 71 and 142, of which the sum is 220. (A proper divisor of a number is a positive factor of that number other than the number itself. For example, the proper divisors of 6 are 1, 2, and 3.)

A pair of amicable numbers constitutes an aliquot sequence of period 2. It is unknown if there are infinitely many pairs of amicable numbers.

A related concept is that of a
perfect number, which is a number that equals the sum of *its own* proper divisors, in other words a number which forms an aliquot sequence of period 1. Numbers that are members of an aliquot sequence with period greater than 2 are known as
sociable numbers.

The first ten amicable pairs are: (220, 284), (1184, 1210), (2620, 2924), (5020, 5564), (6232, 6368), (10744, 10856), (12285, 14595), (17296, 18416), (63020, 76084), and (66928, 66992). (sequence A259180 in the OEIS). (Also see OEIS: A002025 and OEIS: A002046)

## History

Amicable numbers were known to the
Pythagoreans, who credited them with many mystical properties. A general formula by which some of these numbers could be derived was invented circa 850 by the
Iraqi mathematician
Thābit ibn Qurra (826–901). Other
Arab mathematicians who studied amicable numbers are
al-Majriti (died 1007),
al-Baghdadi (980–1037), and
al-Fārisī (1260–1320). The
Iranian mathematician
Muhammad Baqir Yazdi (16th century) discovered the pair (9363584, 9437056), though this has often been attributed to
Descartes.^{
[1]} Much of the work of
Eastern mathematicians in this area has been forgotten.

Thābit ibn Qurra's formula was rediscovered by
Fermat (1601–1665) and
Descartes (1596–1650), to whom it is sometimes ascribed, and extended by
Euler (1707–1783). It was extended further by
Borho in 1972. Fermat and Descartes also rediscovered pairs of amicable numbers known to Arab mathematicians. Euler also discovered dozens of new pairs.^{
[2]} The second smallest pair, (1184, 1210), was discovered in 1866 by a then teenage B. Nicolò I. Paganini (not to be confused with the composer and violinist), having been overlooked by earlier mathematicians.^{
[3]}

By 1946 there were 390 known pairs, but the advent of computers has allowed the discovery of many thousands since then. Exhaustive searches have been carried out to find all pairs less than a given bound, this bound being extended from 10^{8} in 1970, to 10^{10} in 1986, 10^{11} in 1993, 10^{17} in 2015, and to 10^{18} in 2016.

As of April 2021^{
[update]}, there are over 1,226,910,693 known amicable pairs.^{
[4]}

## Rules for generation

While these rules do generate some pairs of amicable numbers, many other pairs are known, so these rules are by no means comprehensive.

In particular, the two rules below produce only even amicable pairs, so they are of no interest for the open problem of finding amicable pairs coprime to 210 = 2·3·5·7, while over 1000 pairs coprime to 30 = 2·3·5 are known [García, Pedersen & te Riele (2003), Sándor & Crstici (2004)].

### Thābit ibn Qurra theorem

The **Thābit ibn Qurra theorem** is a method for discovering amicable numbers invented in the ninth century by the
Arab
mathematician
Thābit ibn Qurra.^{
[5]}

It states that if

*p*= 3×2^{n − 1}− 1,*q*= 3×2^{n}− 1,*r*= 9×2^{2n − 1}− 1,

where *n* > 1 is an
integer and p, q, and r are
prime numbers, then 2^{n}×*p*×*q* and 2^{n}×*r* are a pair of amicable numbers. This formula gives the pairs (220, 284) for *n* = 2, (17296, 18416) for *n* = 4, and (9363584, 9437056) for *n* = 7, but no other such pairs are known. Numbers of the form 3×2^{n} − 1 are known as
Thabit numbers. In order for Ibn Qurra's formula to produce an amicable pair, two consecutive Thabit numbers must be prime; this severely restricts the possible values of n.

To establish the theorem, Thâbit ibn Qurra proved nine
lemmas divided into two groups. The first three lemmas deal with the determination of the aliquot parts of a natural integer. The second group of lemmas deals more specifically with the formation of perfect, abundant and deficient numbers.^{
[6]}

### Euler's rule

*Euler's rule* is a generalization of the Thâbit ibn Qurra theorem. It states that if

*p*= (2^{n − m}+ 1)×2^{m}− 1,*q*= (2^{n − m}+ 1)×2^{n}− 1,*r*= (2^{n − m}+ 1)^{2}×2^{m + n}− 1,

where *n* > *m* > 0 are
integers and p, q, and r are
prime numbers, then 2^{n}×*p*×*q* and 2^{n}×*r* are a pair of amicable numbers. Thābit ibn Qurra's theorem corresponds to the case *m* = *n* − 1. Euler's rule creates additional amicable pairs for (*m*,*n*) = (1,8), (29,40) with no others being known. Euler (1747 & 1750) overall found 58 new pairs to make all the by then existing pairs into 61.^{
[2]}^{
[7]}

## Regular pairs

Let (m, n) be a pair of amicable numbers with *m* < *n*, and write *m* = *gM* and *n* = *gN* where g is the
greatest common divisor of m and n. If M and N are both
coprime to g and
square free then the pair (m, n) is said to be **regular** (sequence
A215491 in the
OEIS), otherwise it is called **irregular** or **exotic**. If (m, n) is regular and M and N have i and j prime factors respectively, then (*m*, *n*) is said to be of **type** (*i*, *j*).

For example, with (*m*, *n*) = (220, 284), the greatest common divisor is 4 and so *M* = 55 and *N* = 71. Therefore, (220, 284) is regular of type (2, 1).

## Twin amicable pairs

An amicable pair (*m*, *n*) is twin if there are no integers between m and n belonging to any other amicable pair (sequence
A273259 in the
OEIS)

## Other results

In every known case, the numbers of a pair are either both
even or both odd. It is not known whether an even-odd pair of amicable numbers exists, but if it does, the even number must either be a square number or twice one, and the odd number must be a square number. However, amicable numbers where the two members have different smallest prime factors do exist: there are seven such pairs known.^{
[8]} Also, every known pair shares at least one common prime
factor. It is not known whether a pair of
coprime amicable numbers exists, though if any does, the
product of the two must be greater than 10^{67}.^{[
citation needed]} Also, a pair of coprime amicable numbers cannot be generated by Thabit's formula (above), nor by any similar formula.

In 1955,
Paul Erdős showed that the density of amicable numbers, relative to the positive integers, was 0.^{
[9]}

In 1968,
Martin Gardner noted that most even amicable pairs known at his time have sums divisible by 9,^{
[10]} and a rule for characterizing the exceptions (sequence
A291550 in the
OEIS) was obtained.^{
[11]}

According to the sum of amicable pairs conjecture, as the number of the amicable numbers approaches infinity, the percentage of the sums of the amicable pairs divisible by ten approaches 100% (sequence A291422 in the OEIS).

## References in popular culture

- Amicable numbers are featured in the novel
*The Housekeeper and the Professor*by Yōko Ogawa, and in the Japanese film based on it. -
Paul Auster's collection of short stories entitled
*True Tales of American Life*contains a story ('Mathematical Aphrodisiac' by Alex Galt) in which amicable numbers play an important role. - Amicable numbers are featured briefly in the novel
*The Stranger House*by Reginald Hill. - Amicable numbers are mentioned in the French novel
*The Parrot's Theorem*by Denis Guedj. - Amicable numbers are mentioned in the JRPG
*Persona 4 Golden*. - Amicable numbers are featured in the visual novel
*Rewrite*. - Amicable numbers (220, 284) are referenced in episode 13 of the 2017 Korean drama Andante.
- Amicable numbers are featured in the Greek movie
*The Other Me (2016 film)*. - Amicable numbers are discussed in
Brian Cleggs book
*Are Numbers Real?* - Amicable numbers are mentioned in the 2020 novel
*Apeirogon*by Colum McCann.

## Generalizations

### Amicable tuples

Amicable numbers satisfy and which can be written together as . This can be generalized to larger tuples, say , where we require

For example, (1980, 2016, 2556) is an amicable triple (sequence A125490 in the OEIS), and (3270960, 3361680, 3461040, 3834000) is an amicable quadruple (sequence A036471 in the OEIS).

Amicable multisets are defined analogously and generalizes this a bit further (sequence A259307 in the OEIS).

### Sociable numbers

Sociable numbers are the numbers in cyclic lists of numbers (with a length greater than 2) where each number is the sum of the proper divisors of the preceding number. For example, are sociable numbers of order 4.

#### Searching for sociable numbers

The
aliquot sequence can be represented as a
directed graph, , for a given integer , where denotes the
sum of the proper divisors of .^{
[12]}
Cycles in represent
sociable numbers within the interval . Two special cases are loops that represent
perfect numbers and cycles of length two that represent
amicable pairs.

## See also

- Betrothed numbers (quasi-amicable numbers)

## Notes

**^**Costello, Patrick (1 May 2002). "New Amicable Pairs Of Type (2; 2) And Type (3; 2)" (PDF).*Mathematics of Computation*.**72**(241): 489–497. doi: 10.1090/S0025-5718-02-01414-X. Retrieved 19 April 2007.- ^
^{a}^{b}Sandifer, C. Edward (2007).*How Euler Did It*. Mathematical Association of America. pp. 49–55. ISBN 978-0-88385-563-8. **^**Sprugnoli, Renzo (27 September 2005). "Introduzione alla matematica: La matematica della scuola media" (PDF) (in Italian). Universita degli Studi di Firenze: Dipartimento di Sistemi e Informatica. p. 59. Archived from the original (PDF) on 13 September 2012. Retrieved 21 August 2012.**^**Sergei Chernykh Amicable pairs list**^**http://mathworld.wolfram.com/ThabitibnKurrahRule.html**^**Rashed, Roshdi (1994).*The development of Arabic mathematics: between arithmetic and algebra*.**156**. Dordrecht, Boston, London: Kluwer Academic Publishers. p. 278,279. ISBN 978-0-7923-2565-9.**^**See William Dunham in a video: An Evening with Leonhard Euler – YouTube**^**http://sech.me/ap/news.html#20160130**^**Erdős, Paul (1955). "On amicable numbers" (PDF).*Publicationes Mathematicae Debrecen*.**4**: 108–111.**^**Gardner, Martin (1968). "MATHEMATICAL GAMES".*Scientific American*.**218**(3): 121–127. ISSN 0036-8733.**^**Lee, Elvin (1969). "On Divisibility by Nine of the Sums of Even Amicable Pairs".*Mathematics of Computation*.**23**(107): 545–548. doi: 10.2307/2004382. ISSN 0025-5718.**^**Rocha, Rodrigo Caetano; Thatte, Bhalchandra (2015),*Distributed cycle detection in large-scale sparse graphs*, Simpósio Brasileiro de Pesquisa Operacional (SBPO), doi: 10.13140/RG.2.1.1233.8640

## References

Wikisource has the text of the
1911 Encyclopædia Britannica article .
Amicable Numbers |

- This article incorporates text from a publication now in the
public domain: Chisholm, Hugh, ed. (1911). "
Amicable Numbers".
*Encyclopædia Britannica*(11th ed.). Cambridge University Press. - Sándor, Jozsef; Crstici, Borislav (2004).
*Handbook of number theory II*. Dordrecht: Kluwer Academic. pp. 32–36. ISBN 978-1-4020-2546-4. Zbl 1079.11001. - Wells, D. (1987).
*The Penguin Dictionary of Curious and Interesting Numbers*. London: Penguin Group. pp. 145–147. -
Weisstein, Eric W.
"Amicable Pair".
*MathWorld*. - Weisstein, Eric W.
"Thâbit ibn Kurrah Rule".
*MathWorld*. - Weisstein, Eric W.
"Euler's Rule".
*MathWorld*.

## External links

- M. García; J.M. Pedersen; H.J.J. te Riele (2003-07-31).
"Amicable pairs, a survey" (PDF).
*Report MAS-R0307*. - Grime, James.
"220 and 284 (Amicable Numbers)".
*Numberphile*. Brady Haran. Archived from the original on 2017-07-16. Retrieved 2013-04-02. - Grime, James.
"MegaFavNumbers - The Even Amicable Numbers Conjecture".
*YouTube*. Retrieved 2020-06-09.