# Convert number to list of digits

How do I convert a number to a list of digits?

I am currently doing:

``````;; (num->list 12345) -> '(1 2 3 4 5)
(define (num->list n)
(local
((define (num->list n)
(map (lambda (c)
(char->num c))
(string->list (number->string n))))

(define (char->num c)
(- (char->integer c) 48)))

(num->list n)))
``````

but would like to know if there's a better way.

-

This is the digits function of my Standard Prelude:

``````(define (digits n . args)
(let ((b (if (null? args) 10 (car args))))
(let loop ((n n) (d '()))
(if (zero? n) d
(loop (quotient n b)
(cons (modulo n b) d))))))
``````

Your version of the function goes back-and-forth between strings and numbers; my version is purely arithmetic. My version also provides for bases other than decimal.

-
Ugh, manual argument unpacking. :-( Thankfully, Racket implements SRFI-89-style optional arguments (as demonstrated in my post), and this question is tagged as Racket-specific. :-D –  Chris Jester-Young Nov 5 '11 at 6:02

Here's how I'd do it in Racket:

``````(require srfi/1 srfi/26)
(define (digits->list num (base 10))
(unfold-right zero? (cut remainder <> base) (cut quotient <> base) num))
``````

This is the sort of problem `unfold` was designed for. :-D

-

"Better" is always open to definition, but a bit more direct/obvious way would be something like this:

``````(define (int->list n) (if (zero? n) `()
(append (int->list (quotient n 10)) (list (remainder n 10)))))
``````

As to whether this is "good", "bad", "better", etc., I guess it depends on what you want. There's no question that you can find code that's more efficient, more versatile, etc. (in fact, @user448810 has already posted some). This is more what I'd think of as example code for something like an introduction to Scheme -- the emphasis is on being simple and easy to understand/explain1. I'd expect that almost anybody with a bare minimum of exposure to some Lisp-like language and a general idea of how such numeric conversion is done should be able to figure out everything that's going on here fairly quickly/easily.

1. Even at the expense of incorrect behavior for some corner cases -- e.g., as-is, it only even attempts to work correctly for strictly positive numbers.
-
Except, `append` + `list` is an antipattern in Scheme programming (`cons` + `reverse` is much more orthodox, though in this example no `reverse` is necessary). So, I wouldn't consider it a suitable "introduction to Scheme" example. :-( –  Chris Jester-Young Nov 5 '11 at 6:07