def digits(n): res =  while n > 0: res.append(n % 10) n /= 10 return res
I want to rewrite this function so it uses recursion. I'm currently lost as to what to do. Can anyone give me some direction?
Here's a possible solution:
The above solution fixes a bug in your code, you were returning the digits in reverse order. Also notice that
Here's how it works:
The call to
Now we go up the call stack:
Accepting @thg435's challenge, here's a tail-recursive solution:
To create a recursive function you need to determine two things:
You have already found both of these things, the base case is the while loop condition and the general case is the inside of the while loop. Try to use this information to move forward.
When you use recursion, a good basis is to have two cases to check, a base case and a recursive case. The base case is the conditions and result under which the program returns, in your case, the base case would be when n > 0 (If you think of it like a while loop, it's the condition for the while loop exiting). The recursive case (there can be multiple of these) occur when the loop isn't done, if you compare to a while loop, this is basically the body of the loop. At the end of the recursive case, you need to call the function again with your changes to the input, in this case n/10.
So, your function definition would be something like:
For the base case, you want to check if n is 0, and, if it is, return the empty list:
Now, in the recursive case, you want to append n%10 to the list and call your function again, only you want to call it with a different n, changed as you had it in your while loop:
So, if you trace this through, for every recursive case, you get a list containing n%10, then it adds the result of the new call, which will be either (n/10)%10 or the empty list. For example, running this function with n=100 would break down like this:
Nested parens are used to show how the function digits gets rewritten inline.