# How can I make a function for solving a factorial using F#?

A factorial is a number that multiplies itself and minus one and so on and so forth until it reaches zero.

For example !5! = 5 * 4 * 3 * 2 * 1

How would I declare a recursive function for this? Should I declare a recursive function for this? Thanks for the help.

``````//Factorials!
let factorial n =
result = ?
``````
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It's 5!, not !5. `!n` usually denotes the number of derangements of `n` objects. –  Mehrdad Afshari Nov 6 '10 at 0:10
!thanks - (15 chars) –  delete Nov 6 '10 at 0:11

## 5 Answers

How, option 1:

``````let rec factorial n =
match n with
| 0 | 1 -> 1
| _ -> n * factorial(n-1)
``````

How, option 2 (tail recursive, compiled into a loop):

``````let factorial n =
let rec loop i acc =
match i with
| 0 | 1 -> acc
| _ -> loop (i-1) (acc * i)
loop n 1
``````

Should: no, see my answer to:

While or Tail Recursion in F#, what to use when?

where I advocate often avoiding both iteration and recursion in favor of higher-order functions. But if you're just getting started, maybe don't worry too much about that advice yet. (But then see e.g. @ChaosPandion's answer, or e.g.

``````let factorial n = [1..n] |> List.fold (*) 1
``````

Or even:

``````let factorial n = [1..n] |> List.reduce (*) // doesn't require the 2nd parameter
``````
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+1 That sums it up. Serg, the 2nd answer will be more performant. –  Steve Rowe Nov 6 '10 at 0:15
Thanks for the helps guys. I'm not the copypaster coding guy, and I'd like to understand a bit more what's going on in the second bit. Specifically the 'match' keyword and the '|' symbols. Also, what is the _ symbol for? Thanks a million, hopefully this questions helps other people. –  delete Nov 6 '10 at 0:17
"Pattern-matching" will take a little time to learn/understand all of, see the docs: msdn.microsoft.com/en-us/library/dd547125.aspx –  Brian Nov 6 '10 at 0:21
Or see en.wikibooks.org/wiki/F_Sharp_Programming/… for more on pattern-matching. –  Brian Nov 6 '10 at 0:31

Here is another example:

``````let factorial (num:int) =
seq { for n in [1..num] -> n }
|> Seq.reduce (fun acc n -> acc * n)
``````

This example might be a bit clearer:

``````let factorial num =
[1..num] |> Seq.fold (fun acc n -> acc * n) 1
``````
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Any reason not just "for i in 1..num -> i"? Or the list [1..i] for that mater? –  Brian Nov 6 '10 at 0:25
@Brian - Nope. :) –  ChaosPandion Nov 6 '10 at 0:26

Brian's answers are most practical, but here is the solution in continuation passing style:

``````let rec factorial n =
let rec loopk i k =
match i with
| 0 | 1 -> k i
| _ -> loopk (i-1) (fun r -> k (i * r))
in loopk n (fun r -> r)
``````
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This would have been mind bending for me had I not implemented ECMAScript regular expressions. This style is used in the specification. –  ChaosPandion Nov 6 '10 at 0:34

How would I declare a recursive function for this?

First of all, to define a recursive function, you'd use `let rec` instead of `let` (because `let` does not allow you to refer to the function you're defining recursively).

To define the factorial function recursively, the easiest (but not most efficient) way would be to use the standard mathematical definition of the factorial function.

A more efficient approach would be to define a tail-recursive helper function taking a second argument which stores the result calculated thus far.

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According to what I've read on StackOverflow this morning while browsing the F# tag, I can in fact skip the 'rec' keyword, but I MUST explicitely declare the datatypes. Please correct me if I'm wrong. –  delete Nov 6 '10 at 0:14
@Serg: You're wrong. If you don't use `rec` the function you're defining is simply not accessible in its definition. –  sepp2k Nov 6 '10 at 0:17
You need to say 'rec' to define a recursive function, else the function's name identifier won't be in scope. See stackoverflow.com/questions/3739628/… –  Brian Nov 6 '10 at 0:18

My favorite F# solution to recursive sequences is... infinite, tail-recursive sequences!:

``````let factSeq =
let rec factSeq m n =
seq { let m = m * n
yield m
yield! factSeq m (n+1I) }
seq { yield 1I ; yield 2I ; yield! (factSeq 2I 3I) }

let factTake n = factSeq |> Seq.take n //the first n terms
let fact n = factSeq |> Seq.nth (n-1) //the nth term
``````

I'm using BigIntegers here since the factorial sequence grows so quickly (go ahead, try the 20,000th term).

I generally agree with Brian's advice to use higher-order functions over iterative loops or recursive loops (tail-recursion + accumulator) whenever possible. But I think in this case, an infinite sequence as I've shown is more flexible since it produces all terms of the factorial sequence up to the desired term (`factTake`), and each term only requires only one multiplication step (n*(n-1)). Whereas, if you wanted the first n terms using a fold solution, each calculation would be done independently and wouldn't benefit from the previous calculation.

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