31 (عدد)

31 (thirty-one) is the natural number following 30 and preceding 32. It is a prime number.

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 Mathematics

31 is the 11th prime number. It is a superprime and a self prime (after 3, 5, and 7), as no integer added up to its base 10 digits results in 31.^[1] It is the third Mersenne prime of the form 2ⁿ − 1,^[2] and the eighth Mersenne prime exponent,^[3] in-turn yielding the maximum positive value for a 32-bit signed binary integer in computing: 2,147,483,647. After 3, it is the second Mersenne prime not to be a double Mersenne prime, while the 31st prime number (127) is the second double Mersenne prime, following 7.^[4] On the other hand, the thirty-first triangular number is the perfect number 496, of the form 2^{(5 − 1)}(2⁵ − 1) by the Euclid-Euler theorem.^[5] 31 is also a primorial prime like its twin prime (29),^[6][7] as well as both a lucky prime^[8] and a happy number^[9] like its dual permutable prime in decimal (13).^[10]

31 is the number of regular polygons with an odd number of sides that are known to be constructible with compass and straightedge, from combinations of known Fermat primes of the form 2²ⁿ + 1 (they are 3, 5, 17, 257 and 65537).^[11][12]

31 is a centered pentagonal number.

Only two numbers have a sum-of-divisors equal to 31: 16 (1 + 2 + 4 + 8 + 16) and 25 (1 + 5 + 25), respectively the square of 4, and of 5.^[13]

31 is the 11th and final consecutive supersingular prime.^[14] After 31, the only supersingular primes are 41, 47, 59, and 71.

31 is the first prime centered pentagonal number,^[15] the fifth centered triangular number,^[16] and a centered decagonal number.^[17]

For the Steiner tree problem, 31 is the number of possible Steiner topologies for Steiner trees with 4 terminals.^[18]

At 31, the Mertens function sets a new low of −4, a value which is not subceded until 110.^[19]

31 is a repdigit in base 2 (11111) and in base 5 (111).

The cube root of 31 is the value of π correct to four significant figures:

${\displaystyle {\sqrt[{3}]{3}}1=3.141\;{\color {red}38065\;\ldots }}$

The first five Euclid numbers of the form p₁ × p₂ × p₃ × ... × p_n + 1 (with p_n the nth prime) are prime:^[20]

• 3 = 2 + 1
• 7 = 2 × 3 + 1
• 31 = 2 × 3 × 5 + 1
• 211 = 2 × 3 × 5 × 7 + 1 and
• 2311 = 2 × 3 × 5 × 7 × 11 + 1

The following term, 30031 = 59 × 509 = 2 × 3 × 5 × 7 × 11 × 13 + 1, is composite.^[أ] The next prime number of this form has a largest prime p of 31: 2 × 3 × 5 × 7 × 11 × 13 × ... × 31 + 1 ≈ 8.2 × 10³³.^[21]

While 13 and 31 in base-ten are the proper first duo of two-digit permutable primes and emirps with distinct digits in base ten, 11 is the only two-digit permutable prime that is its own permutable prime.^[10][22] Meanwhile 13₁₀ in ternary is 111₃ and 31₁₀ in quinary is 111₅, with 13₁₀ in quaternary represented as 31₄ and 31₁₀ as 133₄ (their mirror permutations 331₄ and 13₄, equivalent to 61 and 7 in decimal, respectively, are also prime). (11, 13) form the third twin prime pair^[6] between the fifth and sixth prime numbers whose indices add to 11, itself the prime index of 31.^[23] Where 31 is the prime index of the fourth Mersenne prime,^[2] the first three Mersenne primes (3, 7, 31) sum to the thirteenth prime number, 41.^[23][ب] 13 and 31 are also the smallest values to reach record lows in the Mertens function, of −3 and −4 respectively.^[25]

The numbers 31, 331, 3331, 33331, 333331, 3333331, and 33333331 are all prime. For a time it was thought that every number of the form 3_w1 would be prime. However, the next nine numbers of the sequence are composite; their factorisations are:

• 333333331 = 17 × 19607843
• 3333333331 = 673 × 4952947
• 33333333331 = 307 × 108577633
• 333333333331 = 19 × 83 × 211371803
• 3333333333331 = 523 × 3049 × 2090353
• 33333333333331 = 607 × 1511 × 1997 × 18199
• 333333333333331 = 181 × 1841620626151
• 3333333333333331 = 199 × 16750418760469 and
• 33333333333333331 = 31 × 1499 × 717324094199.

The next term (3₁₇1) is prime, and the recurrence of the factor 31 in the last composite member of the sequence above can be used to prove that no sequence of the type R_wE or ER_w can consist only of primes, because every prime in the sequence will periodically divide further numbers.^{[بحاجة لمصدر]}

31 is the maximum number of areas inside a circle created from the edges and diagonals of an inscribed six-sided polygon, per Moser's circle problem.^[26] It is also equal to the sum of the maximum number of areas generated by the first five n-sided polygons: 1, 2, 4, 8, 16, and as such, 31 is the first member that diverges from twice the value of its previous member in the sequence, by 1.

Icosahedral symmetry contains a total of thirty-one axes of symmetry; six five-fold, ten three-fold, and fifteen two-fold.^[27]

 In science

• The atomic number of gallium

 Astronomy

• Messier object M31, a magnitude 4.5 galaxy in the constellation Andromeda. It is also known as the Andromeda Galaxy, and is readily visible to the naked eye in a modestly dark sky.
• The New General Catalogue object NGC 31, a spiral galaxy in the constellation Phoenix

 In sports

• Ice hockey goaltenders often wear the number 31.^{[بحاجة لمصدر]}

 In other fields

Thirty-one is also:

• The number of days in each of the months January, March, May, July, August, October and December
• The number of the date that Halloween and New Year's Eve are celebrated
• The code for international direct-dial phone calls to the Netherlands
• Thirty-one, a card game
• The number of kings defeated by the incoming Israelites in Canaan according to Joshua 12:24: "all the kings, one and thirty" (Wycliffe Bible translation)
• A type of game played on a backgammon board
• The number of flavors of Baskin-Robbins ice cream; the shops are called 31 Ice Cream in Japan
• ISO 31 is the ISO's standard for quantities and units
• In the title of the anime Ulysses 31
• In the title of Nick Hornby's book 31 Songs
• A women's honorary at The University of Alabama (XXXI)^{[بحاجة لمصدر]}
• The number of the French department Haute-Garonne
• In music, 31-tone equal temperament is a historically significant tuning system (31 equal temperament), first theorized by Christiaan Huygens and promulgated in the 20th century by Adriaan Fokker
• Number of letters in Macedonian alphabet
• Number of letters in Ottoman alphabet^{[بحاجة لمصدر]}
• A slang term for masturbation in Turkish.^[28]

 Notes

 References

 External links

ابحث عن thirty-one في
قاموس المعرفة.

• Prime Curios! 31 from the Prime Pages