Difference between revisions of "Twelve"
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| − | The [[word]] "'''twelve'''" is the largest [[number]] with a single-[ | + | The [[word]] "'''twelve'''" is the largest [[number]] with a single-[https://en.wikipedia.org/wiki/Morpheme morpheme] name in [[English]]. Etymology suggests that "twelve" (similar to "eleven") arises from the Germanic [https://en.wikipedia.org/wiki/Compound_(linguistics) compound] twalif "two-leftover", so a [[literal]] [[translation]] would yield "two remaining [after having [[ten]] taken]". This compound [[meaning]] may have been [[transparent]] to speakers of [https://nordan.daynal.org/wiki/index.php?title=English#ca._600-1100.09THE_OLD_ENGLISH.2C_OR_ANGLO-SAXON_PERIOD Old English], but the modern form "twelve" is quite opaque. Only the remaining tw- hints that twelve and two are related. |
A group of twelve things is called a ''Duodecad''. The ordinal adjective is ''duodenary'', twelfth. The adjective referring to a [[group]] consisting of twelve [[things]] is ''duodecuple''. | A group of twelve things is called a ''Duodecad''. The ordinal adjective is ''duodenary'', twelfth. The adjective referring to a [[group]] consisting of twelve [[things]] is ''duodecuple''. | ||
| − | The [[number]] twelve is often used as a sales unit in trade, and is often referred to as a [ | + | The [[number]] twelve is often used as a sales unit in trade, and is often referred to as a [https://en.wikipedia.org/wiki/Dozen dozen]. Twelve dozen are known as a [https://en.wikipedia.org/wiki/Gross_(unit) gross]. (Note that there are thirteen items in a [https://en.wikipedia.org/wiki/Baker%27s_dozen baker's dozen].) |
| − | As shown below, the number twelve is frequently cited in the [ | + | As shown below, the number twelve is frequently cited in the [https://en.wikipedia.org/wiki/Abrahamic_religions Abrahamic religions] and is also central to [https://en.wikipedia.org/wiki/Gregorian_calendar Western calendar] and [[units]] of [[time]]. |
==In mathematics== | ==In mathematics== | ||
| − | Twelve is a [ | + | Twelve is a [https://en.wikipedia.org/wiki/Composite_number composite number], the smallest number with exactly six [https://en.wikipedia.org/wiki/Divisor divisors], its proper divisors being 1, 2, 3, 4, 6 and 12. Twelve is also a highly composite number, the next one being 24. It is the first composite number of the form p2q; a square-prime, and also the first member of the (p2) family in this form. 12 has an [https://en.wikipedia.org/wiki/Aliquot_sum aliquot sum] of 16 (133% in [[abundance]]). Accordingly, 12 is the first [https://en.wikipedia.org/wiki/Abundant_number abundant number] (in fact a [https://en.wikipedia.org/wiki/Superabundant_number superabundant number]) and demonstrates an 8 member aliquot sequence; {12,16,15,9,4,3,1,0} 12 is the 3rd composite number in the 3-aliquot tree. The only number which has 12 as its aliquot sum is the [https://en.wikipedia.org/wiki/Square_number square] 121. Only 2 other square primes are abundant (18 and 20). |
| − | Twelve is a [ | + | Twelve is a [https://en.wikipedia.org/wiki/Sublime_number sublime number], a [[number]] that has a [https://en.wikipedia.org/wiki/Perfect_number perfect number] of divisors, and the sum of its divisors is also a perfect number. Since there is a subset of 12's proper divisors that add up to 12 (all of them but with 4 excluded), 12 is a [https://en.wikipedia.org/wiki/Semiperfect_number semiperfect number]. |
If an odd perfect number is of the form 12k + 1, it has at least twelve distinct prime factors. | If an odd perfect number is of the form 12k + 1, it has at least twelve distinct prime factors. | ||
| − | Twelve is a [ | + | Twelve is a [https://en.wikipedia.org/wiki/Superfactorial superfactorial], being the product of the first three factorials. Twelve being the product of three and four, the first four positive integers show up in the equation 12 = 3 × 4, which can be continued with the equation 56 = 7 × 8. |
| − | Twelve is the ninth [ | + | Twelve is the ninth [https://en.wikipedia.org/wiki/Perrin_number Perrin number], preceded in the sequence by 5, 7, 10, and also appears in the [https://en.wikipedia.org/wiki/Padovan_sequence Padovan sequence], preceded by the terms 5, 7, 9 (it is the sum of the first two of these). It is the fourth [https://en.wikipedia.org/wiki/Pell_number Pell number], preceded in the sequence by 2 and 5 (it is the sum of the former plus twice the latter). |
| − | A twelve-sided polygon is a [ | + | A twelve-sided polygon is a [https://en.wikipedia.org/wiki/Dodecagon dodecagon]. A twelve-faced polyhedron is a [https://en.wikipedia.org/wiki/Dodecahedron dodecahedron]. Regular cubes and [https://en.wikipedia.org/wiki/Octahedron octahedrons] both have 12 edges, while regular [https://en.wikipedia.org/wiki/Icosahedron icosahedrons] have 12 vertices. Twelve is a [https://en.wikipedia.org/wiki/Pentagonal_number pentagonal number]. The densest three-dimensional [https://en.wikipedia.org/wiki/Lattice_(group) lattice] [https://en.wikipedia.org/wiki/Sphere_packing sphere packing] has each sphere touching 12 others, and this is almost certainly true for any arrangement of [[spheres]] (the [https://en.wikipedia.org/wiki/Kepler_conjecture Kepler conjecture]). Twelve is also the [https://en.wikipedia.org/wiki/Kissing_number kissing number] in [[three]] [[dimensions]]. |
| − | Twelve is the smallest weight for which a [ | + | Twelve is the smallest weight for which a [https://en.wikipedia.org/wiki/Cusp_form cusp form] exists. This cusp form is the discriminant Δ(q) whose Fourier coefficients are given by the [https://en.wikipedia.org/wiki/Ramanujan Ramanujan] τ-function and which is (up to a constant multiplier) the 24th power of the [https://en.wikipedia.org/wiki/Dedekind_eta_function Dedekind eta function]. This [[fact]] is related to a constellation of interesting appearances of the number twelve in mathematics ranging from the value of the [https://en.wikipedia.org/wiki/Riemann_zeta_function Riemann zeta function] function at -1 i.e. ζ(-1)=-1/12, the fact that the abelianization of SL(2,Z) has twelve elements, and even the properties of lattice polygons. |
| − | There are twelve [ | + | There are twelve [https://en.wikipedia.org/wiki/Jacobian_elliptic_function Jacobian elliptic functions] and twelve cubic [https://en.wikipedia.org/wiki/Distance-transitive_graph distance-transitive graphs]. |
| − | The [ | + | The [https://en.wikipedia.org/wiki/Duodecimal duodecimal system] (1210 [twelve] = 1012), which is the use of 12 as a division factor for many ancient and [https://en.wikipedia.org/wiki/Medieval_weights_and_measures medieval weights and measures], including hours, probably originates from [https://en.wikipedia.org/wiki/Mesopotamia Mesopotamia]. |
| − | In [ | + | In [https://en.wikipedia.org/wiki/Base_thirteen base thirteen] and higher bases (such as [https://en.wikipedia.org/wiki/Hexadecimal hexadecimal]), twelve is represented as C. In [https://en.wikipedia.org/wiki/Base_10 base 10], the number 12 is a [https://en.wikipedia.org/wiki/Harshad_number Harshad number]. |
==Color Theory== | ==Color Theory== | ||
| − | There are twelve basic [ | + | There are twelve basic [https://en.wikipedia.org/wiki/Hue hues] in the [https://en.wikipedia.org/wiki/Color_wheel color wheel]; 3 primary colors (red, yellow, blue), 3 secondary colors (orange, green & purple) and 6 tertiary colors (names for these vary, but are intermediates between the primaries and secondaries).[https://en.wikipedia.org/wiki/12_%28number%29] |
[[Category: Mathematics]] | [[Category: Mathematics]] | ||
[[Category: History]] | [[Category: History]] | ||
Latest revision as of 02:42, 13 December 2020
The word "twelve" is the largest number with a single-morpheme name in English. Etymology suggests that "twelve" (similar to "eleven") arises from the Germanic compound twalif "two-leftover", so a literal translation would yield "two remaining [after having ten taken]". This compound meaning may have been transparent to speakers of Old English, but the modern form "twelve" is quite opaque. Only the remaining tw- hints that twelve and two are related.
A group of twelve things is called a Duodecad. The ordinal adjective is duodenary, twelfth. The adjective referring to a group consisting of twelve things is duodecuple.
The number twelve is often used as a sales unit in trade, and is often referred to as a dozen. Twelve dozen are known as a gross. (Note that there are thirteen items in a baker's dozen.)
As shown below, the number twelve is frequently cited in the Abrahamic religions and is also central to Western calendar and units of time.
In mathematics
Twelve is a composite number, the smallest number with exactly six divisors, its proper divisors being 1, 2, 3, 4, 6 and 12. Twelve is also a highly composite number, the next one being 24. It is the first composite number of the form p2q; a square-prime, and also the first member of the (p2) family in this form. 12 has an aliquot sum of 16 (133% in abundance). Accordingly, 12 is the first abundant number (in fact a superabundant number) and demonstrates an 8 member aliquot sequence; {12,16,15,9,4,3,1,0} 12 is the 3rd composite number in the 3-aliquot tree. The only number which has 12 as its aliquot sum is the square 121. Only 2 other square primes are abundant (18 and 20).
Twelve is a sublime number, a number that has a perfect number of divisors, and the sum of its divisors is also a perfect number. Since there is a subset of 12's proper divisors that add up to 12 (all of them but with 4 excluded), 12 is a semiperfect number.
If an odd perfect number is of the form 12k + 1, it has at least twelve distinct prime factors.
Twelve is a superfactorial, being the product of the first three factorials. Twelve being the product of three and four, the first four positive integers show up in the equation 12 = 3 × 4, which can be continued with the equation 56 = 7 × 8.
Twelve is the ninth Perrin number, preceded in the sequence by 5, 7, 10, and also appears in the Padovan sequence, preceded by the terms 5, 7, 9 (it is the sum of the first two of these). It is the fourth Pell number, preceded in the sequence by 2 and 5 (it is the sum of the former plus twice the latter).
A twelve-sided polygon is a dodecagon. A twelve-faced polyhedron is a dodecahedron. Regular cubes and octahedrons both have 12 edges, while regular icosahedrons have 12 vertices. Twelve is a pentagonal number. The densest three-dimensional lattice sphere packing has each sphere touching 12 others, and this is almost certainly true for any arrangement of spheres (the Kepler conjecture). Twelve is also the kissing number in three dimensions.
Twelve is the smallest weight for which a cusp form exists. This cusp form is the discriminant Δ(q) whose Fourier coefficients are given by the Ramanujan τ-function and which is (up to a constant multiplier) the 24th power of the Dedekind eta function. This fact is related to a constellation of interesting appearances of the number twelve in mathematics ranging from the value of the Riemann zeta function function at -1 i.e. ζ(-1)=-1/12, the fact that the abelianization of SL(2,Z) has twelve elements, and even the properties of lattice polygons.
There are twelve Jacobian elliptic functions and twelve cubic distance-transitive graphs.
The duodecimal system (1210 [twelve] = 1012), which is the use of 12 as a division factor for many ancient and medieval weights and measures, including hours, probably originates from Mesopotamia.
In base thirteen and higher bases (such as hexadecimal), twelve is represented as C. In base 10, the number 12 is a Harshad number.
Color Theory
There are twelve basic hues in the color wheel; 3 primary colors (red, yellow, blue), 3 secondary colors (orange, green & purple) and 6 tertiary colors (names for these vary, but are intermediates between the primaries and secondaries).[1]
