“11 (number)”的意思、由来-开放百科全书

11 (eleven) is the natural number following 10 and preceding 12. It is the first repdigit. In English, it is the smallest positive integer requiring three syllables and the largest prime number with a single-morpheme name.

Name

Eleven derives from the Old English {{lang|ang|ęndleofon}} which is first attested in Bede's late 9th-century Ecclesiastical History of the English People.{{refn|Specifically, in the line {{lang|ang|jjvjv ðæt rice hæfde endleofan wintra.}}^[1]}}^[2] It has cognates in every Germanic language (for example, German elf), whose Proto-Germanic ancestor has been reconstructed as *ainalifa-,^[2] from the prefix *aina- (adjectival "one") and suffix *-lifa- of uncertain meaning.^[2] It is sometimes compared with the Lithuanian {{lang|lt|vienúolika}}, although {{lang|lt|-lika}} is used as the suffix for all numbers from 11 to 19 (analogous to "-teen").^[2]

The Old English form has closer cognates in Old Frisian, Saxon, and Norse, whose ancestor has been reconstructed as *ainlifun. This has formerly been considered derived from Proto-Germanic *tehun ("ten");^[2]^[3] it is now sometimes connected with *leikʷ- or *leip- ("left; remaining"), with the implicit meaning that "one is left" after having already counted to ten.^[4]

In languages

Grammar

While, as mentioned above, 11 has its own name in Germanic languages such as English, German, and Swedish. It is the first compound number in many other languages, e.g., Italian ùndici (but in Spanish and Portuguese, 16, and in French, 17 is the first compound number), Chinese 十一 shí yī, Korean 열한 yeol han.

In mathematics

11 is a prime number. It is the smallest two-digit prime number in the decimal base.

If a number is divisible by 11, reversing its digits will result in another multiple of 11. As long as no two adjacent digits of a number added together exceed 9, then multiplying the number by 11, reversing the digits of the product, and dividing that new number by 11, will yield a number that is the reverse of the original number. (For example: 142,312 × 11 = 1,565,432 → 2,345,651 ÷ 11 = 213,241.)

Multiples of 11 by one-digit numbers all have matching double digits: 00 (=0), 11, 22, 33, 44, etc.

There are 11 regular and semiregular convex uniform tilings in the second dimension, and 11 planigons that correspond to these 11 regular and semiregular tilings.

In base 10, there is a simple test to determine if an integer is divisible by 11: take every digit of the number located in odd position and add them up, then take the remaining digits and add them up. If the difference between the two sums is a multiple of 11, including 0, then the number is divisible by 11.^[5] For instance, if the number is 65,637 then (6 + 6 + 7) - (5 + 3) = 19 - 8 = 11, so 65,637 is divisible by 11. This technique also works with groups of digits rather than individual digits, so long as the number of digits in each group is odd, although not all groups have to have the same number of digits. For instance, if one uses three digits in each group, one gets from 65,637 the calculation (065) - 637 = -572, which is divisible by 11.

Another test for divisibility is to separate a number into groups of two consecutive digits (adding a leading zero if there is an odd number of digits), and then add up the numbers so formed; if the result is divisible by 11, the number is divisible by 11. For instance, if the number is 65,637, 06 + 56 + 37 = 99, which is divisible by 11, so 65,637 is divisible by eleven. This also works by adding a trailing zero instead of a leading one: 65 + 63 + 70 = 198, which is divisible by 11. This also works with larger groups of digits, providing that each group has an even number of digits (not all groups have to have the same number of digits).

In base 13 and higher bases (such as hexadecimal), 11 is represented as B, where ten is A. In duodecimal, however, 11 is sometimes represented as E and ten as T or X.

There are 11 orthogonal curvilinear coordinate systems (to within a conformal symmetry) in which the 3-variable Helmholtz equation can be solved using the separation of variables technique.

11 of the thirty-five hexominoes can be folded to form cubes. 11 of the sixty-six octiamonds can be folded to form octahedra.

11 is the fourth Sophie Germain prime,^[6] the third safe prime,^[7] the fourth Lucas prime,^[8] the first repunit prime,^[9] the second good prime,^[10] and the second unique prime.^[11] Although it is necessary for n to be prime for 2ⁿ − 1 to be a Mersenne prime, the converse is not true: 2¹¹ − 1 = 2047 which is 23 × 89.

11 raised to the nth power is the nth row of Pascal's Triangle. (This works for any base, but the number eleven must be changed to the number represented as 11 in that base; for example, in duodecimal this must be done using thirteen.)

11 is a Heegner number, meaning that the ring of integers of the field

has the property of unique factorization.

One consequence of this is that there exists at most one point on the elliptic curve x³ = y² + 11 that has positive-integer coordinates. In this case, this unique point is (15, 58).

List of basic calculations

In numeral systems

In science

Astronomy

In religion

Christianity

After Judas Iscariot was disgraced, the remaining apostles of Jesus were sometimes described as "the Eleven" ({{bibleverse||Mark|16:11|NKJV}}; {{bibleverse||Luke|24:9|NKJV}} and {{bibleverse-nb||Luke|24:33|NKJV}}); this occurred even after Matthias was added to bring the number to twelve, as in Acts 2:14:^[13] Peter stood up with the eleven (New International Version). The New Living Translation says Peter stepped forward with the eleven other apostles, making clear that the number of apostles was now twelve.

Saint Ursula is said to have been martyred in the third or fourth century in Cologne with a number of companions, whose reported number "varies from five to eleven".^[14] A legend that Ursula died with eleven thousand virgin companions^[15] has been thought to appear from misreading XI. M. V. (Latin abbreviation for "Eleven martyr virgins") as "Eleven thousand virgins".

Babylonian

In the Enûma Eliš the goddess Tiamat creates eleven monsters to take revenge for the death of her husband, Apsû.

In music

In sports

In the military

In computing

In Canada

In other fields

See also

References

1. ^Bede, Eccl. Hist., Bk. V, Ch. xviii.
2. ^{{cite book|last1=Kroonen|first1=Guus|title=Etymological Dictionary of Proto-Germanic|date=2013|publisher=Brill|location=Leiden|isbn=978-90-04-18340-7|page=11f.}}
3. ^{{citation |last=Dantzig |first=Tobias |date=1930 |title=Number: The Language of Science }}.
4. ^¹²³⁴Oxford English Dictionary, 1st ed. "eleven, adj. and n." Oxford University Press (Oxford), 1891.
5. ^{{cite book |title=Number Story: From Counting to Cryptography |last=Higgins |first=Peter |year=2008 |publisher=Copernicus |location=New York |isbn=978-1-84800-000-1 |page=47 |pages= }}
6. ^{{Cite web|url=https://oeis.org/A005384|title=Sloane's A005384 : Sophie Germain primes|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-01}}
7. ^{{Cite web|url=https://oeis.org/A005385|title=Sloane's A005385 : Safe primes|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-01}}
8. ^{{Cite web|url=https://oeis.org/A005479|title=Sloane's A005479 : Prime Lucas numbers|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-01}}
9. ^{{Cite web|url=https://oeis.org/A004022|title=Sloane's A004022 : Primes of the form (10^n - 1)/9|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-01}}
10. ^{{Cite web|url=https://oeis.org/A028388|title=Sloane's A028388 : Good primes|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-01}}
11. ^{{Cite web|url=https://oeis.org/search?q=unique+prime|title=Sloane's A040017 : Unique period primes (no other prime has same period as 1/p) in order (periods are given in A051627)|last=|first=|date=|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2018-11-20}}
12. ^{{cite web|url=http://www.ngcicproject.org/|title=The NGC / IC Project - Home of the Historically Corrected New General Catalogue (HCNGC) since 1993|first=Robert Erdmann, Bob Erdmann, Robert, Bob, Erdmann, NGC, IC, Astronomy, Deep-Sky, Database, Galaxy, Galaxies, Dreyer, Herschel, telescope, Corwin, Skiff, Buta, Archinal, Cragin, Ling, Gottlieb, Deep, Sky, Space, Catalog, Catalogs, pictures,|last=photos.|date=|website=www.ngcicproject.org}}
13. ^{{cite web|url=http://bible.cc/acts/2-14.htm|title=Acts 2:14 Then Peter stood up with the eleven, lifted up his voice, and addressed the crowd: "Men of Judea and all who dwell in Jerusalem, let this be known to you, and listen carefully to my words.|author=|date=|website=bible.cc}}
14. ^Ursulines of the Roman Union, Province of Southern Africa, St. Ursula and Companions {{Webarchive|url=https://web.archive.org/web/20160319063727/http://www.ursulines.org.za/stursulacompanions.html |date=2016-03-19 }}, accessed 10 July 2016
15. ^Four scenes from the life of St Ursula, accessed 10 July 2016
16. ^{{cite web|author=Corazon, Billy |title=Imaginary Interview: Jason Webley |url=http://www.threeimaginarygirls.com/features/2009jul/imaginaryinterviewjasonwebley |date=July 1, 2009 |work=Three Imaginary Girls |accessdate=2012-09-06 |deadurl=yes |archiveurl=https://web.archive.org/web/20120404095400/https://www.threeimaginarygirls.com/features/2009jul/imaginaryinterviewjasonwebley |archivedate=2012-04-04 |df= }}
17. ^{{cite web|url=https://www.census.gov/cgi-bin/sssd/naics/naicsrch?code=11&search=2012+NAICS+Search|title=US Census Bureau Site North American Industry Classification System main page|first=US Census Bureau Classification Development Branch,|last=ESMD|date=|website=www.census.gov}}
18. ^{{cite web|url=http://www.directlinesoftware.com/survey.htm |title=Surveying Units and Terms |publisher=Directlinesoftware.com |date=2012-07-30 |accessdate=2012-08-20}}