Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

For our activity today, we were tasked to make using recursion with the sum of digits. I already made this program:

int main()

int num = 0, sum;

printf("Enter an integer: ");


for ( sum=0; num>0;)

    sum = sum + num % 10;
    num = num /10;
printf("Sum = %d", sum);

return 0;


Our teacher added "Input and output must be done in the main() function." Am doing the right thing? Or am I missing something in my code?

share|improve this question
This is an iterative (for loop) solution and does not use recursion. –  FrankPl Aug 30 '13 at 1:32

2 Answers 2

up vote 2 down vote accepted

To do recursion, create a function that recurses rather than using a for loop.

int SumDigits(int i) {
  if (i < 10) {
    return i;
  else {
    return i%10 + SumDigits(i/10);

scanf("%d", &i);
printf("%d\n", SumDigits(i));
share|improve this answer
I absolutely hate with a vengeance the if...return...else construct :-) –  paxdiablo Aug 30 '13 at 1:47
@paxdiablo I don't use it much. It seems easier to understand for new folk. I prefer the style of your post or the - gasp - return (i<10) ? foo : bar; –  chux Aug 30 '13 at 3:13

What you have there is an iterative solution, not a recursive one.

Recursion involves defining the problems in terms of a simpler version of the problem, all the time working towards a fixed end point.

The fixed end point in this case is any number less than 10, for which the value is that digit.

The transition to a simpler case (for numbers greater than 9) is simply to add the least significant digit to the result of the number divided by ten (integer division).

Since it's classwork, pseudo-code only I'm afraid.

def digitSum (n):
    if n < 10:
        return n
    return (n % 10) + digitSum (n / 10)

If you follow that for the number 314, you'll see what happens.

  • At recursion level one, n == 314 so it calculates 314 % 10 to get 4 and calls digitSum(31).
    • At recursion level two, n == 31 so it calculates 31 % 10 to get 1 and calls digitSum(3).
      • At recursion level three, n == 3 so it just returns 3
    • Back up to level two, that's added to the remembered 1 and returned as 4.
  • Back up to level one, that's added to the remembered 4 and returned as 8.

Hence you end up with the digit sum of 8 for the number 314.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.