# How to split a number into its digits in APL

In APL, how can I split an integer or number into a vector containing its digits? What is the most concise (shortest) way of doing this?

You can use the inverse of `Decode` with base 10:

``````10⊥⍣¯1⊢
``````

since `Decode` would take in as many digits as needed and decode them, its inverse would take a number and encode it to as many digits as needed,

or, with `⎕IO←0`, you can try to find the indexes of the formatted number inside the digits vector:

``````⎕D⍳⍕
``````

Demo for both solutions.

This is better than the uglier use of `Encode` with custom length derived by shaping an array of 10 to the length of the log10 of the input:

``````{⍵⊤⍨10⍴⍨⌈10⍟1+⍵}
``````
• Just to be complete, the "old school" encode method would be something like `(10⍴10)⊤1234567890` == `1 2 3 4 5 6 7 8 9 0` – Paul Houle Jul 8 '17 at 23:40
• that works, but what does the `⊢` do (in your first example)? I am new to APL, and as far as I know it returns its right argument (but it doesn't have one here?). – ed588 Jul 9 '17 at 10:40
• @ed588 it is there to complete the expression into a train, so you can assign it to a variable as a function (`10 (⊥⍣¯1) ⊢`). the `⊥⍣¯1` is a function on itself, so you need to associate the 10 somehow. – Uriel Jul 9 '17 at 10:41
• so does that mean that `f←10⊥⍣¯1⊢` is (roughly) equivalent to `f←{10(⊥⍣¯1)⍵}`? – ed588 Jul 9 '17 at 11:32
• @ed588 not just roughly; another common form is `(10∘⊥⍣¯1)` which means (roughly) "compose 10 as constant first argument of this function" – Uriel Jul 9 '17 at 11:35

I did this in APL2 by first applying FORMAT and then EXECUTE EACH (though it might be limited to positive integers) :

``````⍎¨⍕
``````

Try it online!

• As simple (though doubtlessly inefficient) as that is, I never would have thought of it. Yet another example of how there's always a dozen ways to do the same thing in APL. – Paul Houle Aug 20 '17 at 18:37

Not the most concise, but the power to do this was in the earliest APL. The 1962 book shows how to work with positional number systems using only basic functions and matrix multiply: 