Factorial: Difference between revisions
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{{Built-in|Factorial|!}} is a [[monadic]] [[scalar function]] which gives the [[wikipedia:factorial|factorial]] of a non-negative integer. Factorial | {{Built-in|Factorial|!}} is a [[monadic]] [[scalar function]] which gives the [[wikipedia:factorial|factorial]] of a non-negative integer. Factorial takes its [[glyph]] <source lang=apl inline>!</source> from [[Comparison_with_traditional_mathematics#Prefix|traditional mathematics]] but, like all [[monadic function]]s, takes its argument on the right <source lang=apl inline>!Y</source> instead of traditional mathematics' <math>Y!</math>. It shares the glyph with the dyadic arithmetic function [[Binomial]]. | ||
== Examples == | == Examples == | ||
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== Extended definition == | == Extended definition == | ||
In multiple implementations, this function has an extended definition using the [[wikipedia:Gamma function|Gamma function]] Gamma(n), so that it is defined for real and [[complex]] numbers. Because Gamma(n) equals (n-1)!, <source lang=apl inline>!Y</source> is defined as Gamma(Y+1). | In multiple implementations, this function has an extended definition using the [[wikipedia:Gamma function|Gamma function]] <math>\Gamma(n)</math>, so that it is defined for real and [[complex]] numbers. Because <math>\Gamma(n)</math> equals <math>(n-1)!</math>, <source lang=apl inline>!Y</source> is defined as <math>\Gamma(Y+1)</math>. | ||
<source lang=apl> | <source lang=apl> | ||
Revision as of 19:07, 3 June 2020
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Factorial (!) is a monadic scalar function which gives the factorial of a non-negative integer. Factorial takes its glyph ! from traditional mathematics but, like all monadic functions, takes its argument on the right !Y instead of traditional mathematics' . It shares the glyph with the dyadic arithmetic function Binomial.
Examples
The factorial of a positive integer n is defined as the product of 1 to n inclusive.
!0 1 2 3 4
1 1 2 6 24
×/⍳4
24
Extended definition
In multiple implementations, this function has an extended definition using the Gamma function , so that it is defined for real and complex numbers. Because equals , !Y is defined as .
!¯1.2 0.5 2.7
¯5.821148569 0.8862269255 4.170651784
!2J1 ¯2J¯1
0.962865153J1.339097176 ¯0.1715329199J¯0.3264827482The Gamma function diverges at 0 or negative numbers, so !Y is undefined at negative integers.
!¯1 DOMAIN ERROR !¯1 ∧
In J, where literal infinity is supported, negative integer factorial evaluates to positive infinity _ (if the argument is odd) or negative infinity __ (if even). This corresponds to the positive-side limit of the Gamma function.
!_1 _2 _3 _4 _ __ _ __