Factorial: Difference between revisions

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' ${\displaystyle Y!}$. 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 ${\displaystyle \Gamma (n)}$, so that it is defined for real and complex numbers. Because ${\displaystyle \Gamma (n)}$ equals ${\displaystyle (n-1)!}$, !Y is defined as ${\displaystyle \Gamma (Y+1)}$.

      !¯1.2 0.5 2.7
¯5.821148569 0.8862269255 4.170651784
      !2J1 ¯2J¯1
0.962865153J1.339097176 ¯0.1715329199J¯0.3264827482

The 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
_ __ _ __

External links

Documentation

• Dyalog
• APLX
• J Dictionary, NuVoc