Difference between revisions of "Factorial"
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| − | The function defined on the set of non-negative integers with value at equal to the product of the natural numbers from 1 to n, that is, to $1\cdot2\ | + | The function defined on the set of non-negative integers with value at n equal to the product of the natural numbers from 1 to n, that is, to $1\cdot2\cdot\ldots\cdot n; it is denoted by n! (by definition, 0!=1). For large n an approximate expression for the factorial is given by the [[Stirling formula|Stirling formula]]. The factorial is equal to the number of permutations of n$ elements. The more general expression |
| − | $$(a)_\mu=a(a+1)\ | + | $$(a)_\mu=a(a+1)\dotsm(a+\mu-1) \ ,$$ |
is also called a factorial, where a is a complex number, \mu is a natural number, and (a)_0=1. See also [[Gamma-function|Gamma-function]]. | is also called a factorial, where a is a complex number, \mu is a natural number, and (a)_0=1. See also [[Gamma-function|Gamma-function]]. | ||
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The ''Pochhammer symbol'' (a)_\mu denotes the ''rising factorial'', also denoted (a)^{\overline{\mu}}. Analogously, one defines the ''falling factorial'' | The ''Pochhammer symbol'' (a)_\mu denotes the ''rising factorial'', also denoted (a)^{\overline{\mu}}. Analogously, one defines the ''falling factorial'' | ||
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| − | (a)^{\underline{\mu}} = a(a-1)\ | + | (a)^{\underline{\mu}} = a(a-1)\dotsm(a-\mu+1) \ . |
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Latest revision as of 13:41, 14 February 2020
The function defined on the set of non-negative integers with value at n equal to the product of the natural numbers from 1 to n, that is, to 1\cdot2\cdot\ldots\cdot n; it is denoted by n! (by definition, 0!=1). For large n an approximate expression for the factorial is given by the Stirling formula. The factorial is equal to the number of permutations of n elements. The more general expression
(a)_\mu=a(a+1)\dotsm(a+\mu-1) \ ,
is also called a factorial, where a is a complex number, \mu is a natural number, and (a)_0=1. See also Gamma-function.
Comments
Because n! equals the number of permutations of n elements, the factorial is extensively used in combinatorics, probability theory, mathematical statistics, etc. Cf. Combinatorial analysis; Combination; Binomial coefficients.
The Pochhammer symbol (a)_\mu denotes the rising factorial, also denoted (a)^{\overline{\mu}}. Analogously, one defines the falling factorial (a)^{\underline{\mu}} = a(a-1)\dotsm(a-\mu+1) \ .
Factorial. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Factorial&oldid=43579