Recursion: Difference between revisions
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[http://en.wikipedia.org/wiki/Recursion_(computer_science) Recursion] is a form of looping, where a function calls itself, usually until a condition is met. Although recursion can be somewhat difficult to understand at first, it can result in much cleaner code. In the example below, a [http://en.wikipedia.org/wiki/Factorial factorial] function has two sections: the base step, and the recursive step. | [http://en.wikipedia.org/wiki/Recursion_(computer_science) Recursion] is a form of looping, where a function calls itself, usually until a condition is met. Although recursion can be somewhat difficult to understand at first, it can result in much cleaner code. In the example below, a [http://en.wikipedia.org/wiki/Factorial factorial] function has two sections: the base step, and the recursive step. Keep in mind that if you do not have a base step, and only a recursive step, your function will run endlessly, causing stack overflow. | ||
The base step simply returns a value of one when ''n'' is one or zero. | The base step simply returns a value of one when ''n'' is one or zero. |
Revision as of 21:08, 5 April 2012
Recursion is a form of looping, where a function calls itself, usually until a condition is met. Although recursion can be somewhat difficult to understand at first, it can result in much cleaner code. In the example below, a factorial function has two sections: the base step, and the recursive step. Keep in mind that if you do not have a base step, and only a recursive step, your function will run endlessly, causing stack overflow.
The base step simply returns a value of one when n is one or zero. Since we know that the factorial of 1 equals 1, we know that the factorial of two equals two times the factorial of one. In code, factorial(2) == 2*factorial(1) = 2*1 = 2.
It follows that the factorial of three is three times the factorial of two. In code, factorial(3) == 3*factorial(2) = 3*2*factorial(1) = 3*2*1 = 6.
Generalizing, the factorial of n is n times the factorial of n+1. In code, factorial(n) = n*factorial(n-1).
function factorial(n)
if n <= 1 then -- base case
return 1
else
return n * factorial(n-1) -- recursive step
end
end
print(factorial(5))