# Split a number into its digits with Haskell

Given an arbitrary number, how can I process each digit of the number individually?

Edit I've added a basic example of the kind of thing `Foo` might do.

For example, in C# I might do something like this:

``````static void Main(string[] args)
{
int number = 1234567890;
string numberAsString = number.ToString();

foreach(char x in numberAsString)
{
string y = x.ToString();
int z = int.Parse(y);
Foo(z);
}
}

void Foo(int n)
{
Console.WriteLine(n*n);
}
``````
-
–  KennyTM Oct 18 '10 at 21:01
Why don't you just use show? –  FUZxxl Oct 19 '10 at 5:48
@FUZxxl because I want to work with each digit in turn as a number –  Greg B Oct 20 '10 at 7:39
Something like `showNumbers = show >=> return`? –  FUZxxl Oct 21 '10 at 0:53

Have you heard of div and mod?

You'll probably want to reverse the list of numbers if you want to treat the most significant digit first. Converting the number into a string is an impaired way of doing things.

``````135 `div` 10 = 13
135 `mod` 10 = 5
``````

Generalize into a function:

``````digs :: Integral x => x -> [x]
digs 0 = []
digs x = digs (x `div` 10) ++ [x `mod` 10]
``````

Or in reverse:

``````digs :: Integral x => x -> [x]
digs 0 = []
digs x = x `mod` 10 : digs (x `div` 10)
``````

This treats `0` as having no digits. A simple wrapper function can deal with that special case if you want to.

Note that this solution does not work for negative numbers (the input `x` must be integral, i.e. a whole number).

-
Care to give me an example? –  Greg B Oct 18 '10 at 21:01
–  KennyTM Oct 18 '10 at 21:02
I've added an example to my code as I don't see how div and mod will help me walk over the digits of any arbitrary number. Could you expand on your thoughts please. –  Greg B Oct 18 '10 at 21:05
@Greg B this is a haskell source code that does the exact same thing your algorithm does, but using @supercooldave algorithm => pastie.org/1231091 –  Roman Gonzalez Oct 18 '10 at 21:37

You could also just reuse `digits` from Hackage.

-

You can use

``````digits = map (`mod` 10) . reverse . takeWhile (> 0) . iterate (`div` 10)
``````

or for reverse order

``````rev_digits = map (`mod` 10) . takeWhile (> 0) . iterate (`div` 10)
``````

The iterate part generates an infinite list dividing the argument in every step by 10, so 12345 becomes [12345,1234,123,12,1,0,0..]. The takeWhile part takes only the interesting non-null part of the list. Then we reverse (if we want to) and take the last digit of each number of the list.

I used point-free style here, so you can imagine an invisible argument n on both sides of the "equation". However, if you want to write it that way, you have to substitute the top level `.` by `\$`:

``````digits n = map(`mod` 10) \$ reverse \$ takeWhile (> 0) \$ iterate (`div`10) n
``````
-
``````digits :: Integer -> [Int]
digits = map (read . (:[])) . show
``````

or you can return it into `[]`:

``````digits :: Integer -> [Int]
digits = map (read . return) . show
``````

or, with Data.Char.digitToInt:

``````digits :: Integer -> [Int]
digits = map digitToInt . show
``````

the same as Daniel's really, but pointless and uses Int, because a digit shouldn't really exceed `maxBound :: Int`.

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maybe (digits = map (read . return) . show) ? or (read . pure).. –  Ed'ka Oct 19 '10 at 20:36
the `digitToInt` version is probably better anyway, and `:[]` was slightly more obvious to me. eh, I'll edit it in. I have no idea where pure is from, so. –  sreservoir Oct 19 '10 at 22:00

Using the same technique used in your post, you can do:

``````digits :: Integer -> [Int]
digits n = map (\x -> read [x] :: Int) (show n)
``````

See it in action:

``````Prelude> digits 123
[1,2,3]
``````

Does that help?

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`digits = map (read . (:[])) . show` –  sreservoir Oct 18 '10 at 22:47

Textbook unfold

``````import qualified Data.List as L
digits = reverse . L.unfoldr (\x -> if x == 0 then Nothing else Just (mod x 10, div x 10))
``````
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``````digits n = if q == 0 then [r] else digits q ++ [r]