32 (number)

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Short description: Natural number
← 31 32 33 →
Cardinalthirty-two
Ordinal32nd
(thirty-second)
Factorization25
Divisors1, 2, 4, 8, 16, 32
Greek numeralΛΒ´
Roman numeralXXXII
Binary1000002
Ternary10123
Quaternary2004
Quinary1125
Senary526
Octal408
Duodecimal2812
Hexadecimal2016
Vigesimal1C20
Base 36W36

32 (thirty-two) is the natural number following 31 and preceding 33.

Mathematics

32 is the fifth power of two ([math]\displaystyle{ 2^{5} }[/math]), making it the first non-unitary fifth-power of the form [math]\displaystyle{ p^{5} }[/math] where [math]\displaystyle{ p }[/math] is prime. 32 is the totient summatory function [math]\displaystyle{ \Phi(n) }[/math] over the first 10 integers,[1] and the smallest number [math]\displaystyle{ n }[/math] with exactly 7 solutions for [math]\displaystyle{ \varphi (n) }[/math].

The aliquot sum of a power of two is always one less than the number itself, therefore the aliquot sum of 32 is 31.[2]

[math]\displaystyle{ \begin{align} 32 & = 1^{1} + 2^{2} + 3^{3} \\ 32 & = (1\times4)+(2\times5)+(3\times6) \\ 32 & = (1\times2)+(1\times2\times3)+(1\times2\times3\times4) \\ \end{align} }[/math]

The product between neighbor numbers of 23, the dual permutation of the digits of 32 in decimal, is equal to the sum of the first 32 integers: [math]\displaystyle{ 22 \times 24= 528 }[/math].[3][lower-alpha 1]

32 is also a Leyland number expressible in the form [math]\displaystyle{ x^y + y^x }[/math], where:[5][lower-alpha 2] [math]\displaystyle{ 32=2^{4} + 4^{2}. }[/math]

The eleventh Mersenne number is the first to have a prime exponent (11) that does not yield a Mersenne prime, equal to:[7][lower-alpha 3] [math]\displaystyle{ 2047 = 32^{2} + (31 \times 33) = 1024 + 1023 = 2^{11} - 1. }[/math]

When read in binary, the first 32 rows of Pascal's Triangle represent the thirty-two divisors that belong to the largest constructible polygon.

The product of the five known Fermat primes is equal to the number of sides of the largest regular constructible polygon with a straightedge and compass that has an odd number of sides, with a total of sides numbering [math]\displaystyle{ 2^{32} - 1 = 3\cdot5\cdot17\cdot257\cdot65\;537 = 4\;294\;967\;295. }[/math]

The first 32 rows of Pascal's triangle read as single binary numbers represent the 32 divisors that belong to this number, which is also the number of sides of all odd-sided constructible polygons with simple tools alone (if the monogon is also included).[10]

There are also a total of 32 uniform colorings to the 11 regular and semiregular tilings.[11]

There are 32 three-dimensional crystallographic point groups[12] and 32 five-dimensional crystal families,[13] and the maximum determinant in a 7 by 7 matrix of only zeroes and ones is 32.[14] In sixteen dimensions, the sedenions generate a non-commutative loop [math]\displaystyle{ \mathbb {S}_{L} }[/math] of order 32,[15] and in thirty-two dimensions, there are at least 1,160,000,000 even unimodular lattices (of determinants 1 or −1);[16] which is a marked increase from the twenty-four such Niemeier lattices that exists in twenty-four dimensions, or the single [math]\displaystyle{ \mathrm E_{8} }[/math] lattice in eight dimensions (these lattices only exist for dimensions [math]\displaystyle{ d \propto 8 }[/math]). Furthermore, the 32nd dimension is the first dimension that holds non-critical even unimodular lattices that do not interact with a Gaussian potential function of the form [math]\displaystyle{ f_{\alpha} (r) = e^{-\alpha {r}} }[/math] of root [math]\displaystyle{ r }[/math] and [math]\displaystyle{ \alpha \gt 0 }[/math].[17]

32 is the furthest point in the set of natural numbers [math]\displaystyle{ \mathbb {N}_{0} }[/math] where the ratio of primes (2, 3, 5, ..., 31) to non-primes (0, 1, 4, ... 32) is [math]\displaystyle{ \tfrac {1}{2}. }[/math][lower-alpha 4]

In science

  • The atomic number of germanium
  • The freezing point of water at standard atmospheric pressure in degrees Fahrenheit
  • In the Standard Model of particle physics, there are 32 degrees of freedom among the leptons and all bosons that interact with them (including the graviton, which is generally expected to exist, and assuming there are no right-handed neutrinos)[citation needed]

Astronomy

In music

  • A thirty-second note or demisemiquaver is a note played for 1/32 of the duration of a whole note
  • The number of completed, numbered piano sonatas by Ludwig van Beethoven
  • "32 Footsteps", a song by They Might Be Giants
  • "The Chamber of 32 Doors", a song by Genesis, from their 1974 concept album The Lamb Lies Down on Broadway
  • "32", a song on Mr. Mister's debut album I Wear the Face
  • "32", a song by electro-rock group Carpark North
  • "Thirty Two", a song by Van Morrison on the album New York Sessions '67
  • ThirtyTwo is the fourth album by English band Reverend and the Makers
  • "32 Pennies", a song on Warrant's 1989 debut album Dirty Rotten Filthy Stinking Rich
  • The number of rays in the Japanese Rising Sun on the cover of Incubus' 2006 album Light Grenades
  • "32 Ways To Die", a song on Sum41's album Half Hour of Power
  • The shortened pseudonym of UK rapper Wretch 32

In religion

In the Kabbalah, there are 32 Kabbalistic Paths of Wisdom. This is, in turn, derived from the 32 times of the Hebrew names for God, Elohim appears in the first chapter of Genesis.

One of the central texts of the Pāli Canon in the Theravada Buddhist tradition, the Digha Nikaya, describes the appearance of the historical Buddha with a list of 32 physical characteristics.

The Hindu scripture Mudgala Purana also describes Ganesha as taking 32 forms.

In sports

  • In chess, the total number of black squares on the board, the total number of white squares, and the total number of pieces (black and white) at the beginning of the game.
  • The number of teams in the National Football League.
  • The number of teams in the National Hockey League.
  • In association football:
    • The FIFA World Cup final tournament has featured 32 men's national teams from 1998 through 2022, after which the field will expand to 48.
    • The FIFA Women's World Cup final tournament will feature 32 national teams starting with the next edition in 2023.
    • The ball used in association football is most often made with 32 panels of leather or synthetic material.

In other fields

Thirty-two could also refer to:

  • The number of teeth of a full set of teeth in an adult human, including wisdom teeth
  • The size of a databus in bits: 32-bit
  • The size, in bits, of certain integer data types, used in computer representations of numbers
  • IPv4 uses 32-bit (4-byte) addresses
  • ASCII and Unicode code point for space
  • The code for international direct dial phone calls to Belgium
  • In the title Thirty-Two Short Films About Glenn Gould, starring Colm Feore
  • The Article 32 of the UCMJ concerns pre-trial investigations. Such a hearing is often called an "Article 32 hearing"
  • The caliber .32 ACP
  • The number of the French department Gers
  • The traditional 32 counties of Ireland

Notes

  1. 32 is the ninth 10-happy number, while 23 is the sixth.[4] Their sum is 55, which is the tenth triangular number,[3] while their difference is [math]\displaystyle{ 9 = 3^{2}. }[/math]
  2. On the other hand, a regular 32-sided icosidodecagon contains [math]\displaystyle{ 2^{3} + 3^{2} = 17 }[/math] distinct symmetries.[6]
    For comparison, a 16-sided hexadecagon contains 14 symmetries, an 8-sided octagon contains 11 symmetries, and a square contains 8 symmetries.
  3. Specifically, 31 is the eleventh prime number, equal to the sum of 20 and its composite index 11, where 33 is the twenty-first composite number, equal to the sum of 21 and its composite index 12 (which are palindromic numbers).[8][9] 32 is the only number to lie between two adjacent numbers whose values can be directly evaluated from sums of associated prime and composite indices (32 is the twentieth composite number, which maps to 31 through its prime index of 11, and 33 by a factor of 11, that is the composite index of 20; the aliquot part of 32 is 31 as well).[2] This is due to the fact that the ratio of composites to primes increases very rapidly, by the prime number theorem.
  4. 29 is the only earlier point, where there are twenty non primes, and ten primes. Note, that 40 — twice the composite index of 32 — lies between the 8th pair of sexy primes (37, 43),[18] which represent the only two points in the set of natural numbers where the ratio of prime numbers to composite numbers (up to) is 1/2. Where 68 is the forty-eighth composite, 48 is the thirty second, with the difference 6848 = 20, the composite index of 32.[8] Otherwise, thirty-two lies midway between primes (23, 41), (17, 47) and (3, 61).
    At 33, there are 11 numbers that are prime and 22 that are not, when considering instead the set of natural numbers [math]\displaystyle{ \mathbb{N}^+ }[/math] that does not include 0. The product 11 × 33 = 363 represents the thirty-second number to return 0 for the Mertens function M(n).[19]

References

  1. Sloane, N. J. A., ed. "Sequence A002088 (Sum of totient function)". OEIS Foundation. https://oeis.org/A002088. Retrieved 2023-05-04. 
  2. 2.0 2.1 Sloane, N. J. A., ed. "Sequence A001065 (Sum of proper divisors (or aliquot parts) of n: sum of divisors of n that are less than n.)". OEIS Foundation. https://oeis.org/A001065. Retrieved 2024-01-10. 
  3. 3.0 3.1 Sloane, N. J. A., ed. "Sequence A000217 (Triangular numbers)". OEIS Foundation. https://oeis.org/A000217. Retrieved 2023-05-04. 
  4. "Sloane's A007770 : Happy numbers". OEIS Foundation. https://oeis.org/A007770. 
  5. "Sloane's A076980 : Leyland numbers". OEIS Foundation. https://oeis.org/A076980. 
  6. Conway, John H.; Burgiel, Heidi; Goodman-Strauss, Chaim (2008). "Chapter 20: Generalized Schaefli symbols (Types of symmetry of a polygon)". The Symmetries of Things (1st ed.). New York: CRC Press (Taylor & Francis). pp. 275–277. doi:10.1201/b21368. ISBN 978-1-56881-220-5. OCLC 181862605. https://www.taylorfrancis.com/books/mono/10.1201/b21368/symmetries-things-chaim-goodman-strauss-john-conway-heidi-burgiel. 
  7. Sloane, N. J. A., ed. "Sequence A000225 (a(n) equal to 2^n - 1. (Sometimes called Mersenne numbers, although that name is usually reserved for A001348.))". OEIS Foundation. https://oeis.org/A000225. Retrieved 2024-01-08. 
  8. 8.0 8.1 Sloane, N. J. A., ed. "Sequence A002808 (The composite numbers: numbers n of the form x*y for x > 1 and y > 1.)". OEIS Foundation. https://oeis.org/A002808. Retrieved 2024-01-08. 
  9. Sloane, N. J. A., ed. "Sequence A00040 (The prime numbers.)". OEIS Foundation. https://oeis.org/A00040. Retrieved 2024-01-08. 
  10. Conway, John H.; Guy, Richard K. (1996). "The Primacy of Primes". The Book of Numbers. New York, NY: Copernicus (Springer). pp. 137–142. doi:10.1007/978-1-4612-4072-3. ISBN 978-1-4612-8488-8. OCLC 32854557. https://link.springer.com/chapter/10.1007/978-1-4612-4072-3_5. 
  11. Grünbaum, Branko; Shephard, G. C. (1987). "Section 2.9 Archimedean and uniform colorings". Tilings and Patterns. New York: W. H. Freeman and Company. pp. 102–107. doi:10.2307/2323457. ISBN 0-7167-1193-1. OCLC 13092426. https://archive.org/details/isbn_0716711931. 
  12. Sloane, N. J. A., ed. "Sequence A004028 (Number of geometric n-dimensional crystal classes.)". OEIS Foundation. https://oeis.org/A004028. Retrieved 2022-11-08. 
  13. Sloane, N. J. A., ed. "Sequence A004032 (Number of n-dimensional crystal families.)". OEIS Foundation. https://oeis.org/A004032. Retrieved 2022-11-08. 
  14. Sloane, N. J. A., ed. "Sequence A003432 (Hadamard maximal determinant problem: largest determinant of a (real) {0,1}-matrix of order n.)". OEIS Foundation. https://oeis.org/A003432. Retrieved 2023-04-04. 
  15. Cawagas, Raoul E.; Gutierrez, Sheree Ann G. (2005). "The Subloop Structure of the Cayley-Dickson Sedenion Loop". Matimyás Matematika (Diliman, Q.C.: The Mathematical Society of the Philippines) 28 (1–3): 13–15. ISSN 0115-6926. http://mathsociety.ph/matimyas/images/vol28/CawagasMatimyas.pdf. 
  16. Baez, John C. (November 15, 2014). "Integral Octonions (Part 8)". U.C. Riverside, Department of Mathematics. https://math.ucr.edu/home/baez/octonions/integers/integers_8.html. 
  17. Heimendahl, Arne; Marafioti, Aurelio et al. (June 2022). "Critical Even Unimodular Lattices in the Gaussian Core Model". International Mathematics Research Notices (Oxford: Oxford University Press) 1 (6): 5352. doi:10.1093/imrn/rnac164. 
  18. Sloane, N. J. A., ed. "Sequence A156274 (List of prime pairs of the form (p, p+6).)". OEIS Foundation. https://oeis.org/A156274. Retrieved 2024-01-11. 
  19. Sloane, N. J. A., ed. "Sequence A028442 (Numbers k such that Mertens's function M(k) (A002321) is zero.)". OEIS Foundation. https://oeis.org/A028442. Retrieved 2024-01-11. 

External links