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I had this problem on an exam yesterday. I couldn't resolve it so you can imagine the result...

Make a recursive function: int invertint( int num) that will receive an integer and return it but inverted, example: 321 would return as 123

I wrote this:

int invertint( int num ) {
  int rest = num % 10;
  int div = num / 10;
  if( div == 0 ) {
     return( rest );
  return( rest * 10 + invert( div ) )

Worked for 2 digits numbers but not for 3 digits or more. Since 321 would return 1 * 10 + 23 in the last stage.

Thanks a lot!

PS: Is there a way to understand these kind of recursion problems in a faster manner or it's up to imagination of one self?

share|improve this question
Have you considered convert it to char* and call a recursive function with a char*? It makes things easier probably, but I don't know if you were allowed to do this – Dan Jul 5 '12 at 15:08
What shall the result of 1230 be, 3210 or 321? – Jo So Jul 5 '12 at 15:10
@JoSo I think there can't be a leading 0 in a integer... so I guess it would be: 1230: 321 – JorgeeFG Jul 5 '12 at 15:14
If you are looking at hints on how to solve this kind of problem, my suggestions would be 1) Try to stick to a if(is_base_case){ basecase } else { recursive_case } structure. It gets natural with practice and 2) Learn how to convert tail recursion to while loops and vice versa. Many kinds of problems fall under this category – hugomg Jul 5 '12 at 17:03
up vote 3 down vote accepted
int invertint( int num ) {
  int i ;

  if(i == 1) return num;
  return( (num % 10) * i + invertint( num / 10 ) );
share|improve this answer
Works perfect, thank you. If it's not disturbing, could you explain how you thought it? Thanks! – JorgeeFG Jul 5 '12 at 15:33
@Jorge: The idea is to recurse the other way around -- instead of handling the rightmost digit first, you handle the leftmost. That's what the loop does here and the log10/pow combination does in my answer. The rest comes rather naturally. – cha0site Jul 5 '12 at 15:40
@Jorge - i:10^floor(log10(num)), cha0site explained. – BLUEPIXY Jul 5 '12 at 16:04
int reverse(int no,int rev)
return reverse(no/10,rev*10+no%10);
return rev;

call this method as reverse(numberToReverse,0)

share|improve this answer
Your 2nd function doesn't really work, you aren't even using the result of the recursive call. – interjay Jul 5 '12 at 15:16
@interjay It will work. – Kalai Selvan Ravi Jul 5 '12 at 15:21
No, it won't work. You aren't even returning a value from the function. -1 for arguing when you obviously didn't test it. – interjay Jul 5 '12 at 15:24
@interjay I have removed that function. After I tested it, I will post it. – Kalai Selvan Ravi Jul 5 '12 at 15:31
OK, -1 removed. I don't think there is a simple way to answer the question without adding an extra parameter or counting the number of digits. – interjay Jul 5 '12 at 15:35

Just as an alternative, this could be done without recursion.

    int invertint(int num)
        int res = 0;
        while (num != 0)
            res = res * 10 + (num % 10);
            num /= 10;
        return res;

But since recursion was the assignment, given the int(int) signature, easiest would be with a pow(log10)) variation (provided that you're allowed to include math.h ? )

    int invertint(int num)
        if (num == 0) return 0;
        return invertint(num / 10)  +  (int)pow(10, (int)log10(num)) * (num % 10);
share|improve this answer

If you do it the other way, you won't need a counter.

int invertint(int num)
    if (0 == num || 0 == num % 10) {
        return num / 10;
    int digits = floor(log10(num)) + 1;
    int modulus = pow(10, digits - 1);
    return invertint(num % modulus) * 10 + num / modulus;

Note that this isn't as simple as I originally thought - I had to use math.

share|improve this answer
This is the same as Rafael Baptista's answer, and is just as wrong. – interjay Jul 5 '12 at 15:06
@interjay: Actually, you're right. Let me think about this some more. – cha0site Jul 5 '12 at 15:11
@interjay: I fixed it. – cha0site Jul 5 '12 at 15:25
Yeah, it should work now, +1. I don't think the exam question is very good because it requires you to either use floating point to count the digits, or use a loop (which is silly when the point is to use recursion). – interjay Jul 5 '12 at 15:32
@interjay: Agreed. Sadly, I think it's quite common, for some reason most "didactic" examples of recursion are not very good uses of recursion. – cha0site Jul 5 '12 at 15:48

The problem is with return(rest * 10 + invert(div)). You can't do the multiplication yourself. The factor depends on the number of times the function is recursed, thus you have to provide the carry as a second argument to your function (carry is initialized with 0)

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Your mistake is that in the last statement you are multiplying rest by 10. Why only 10? You need to shift the rest digit by as many digits as there are left in the remaining part of the number. You are shifting by only 1. No wonder it works only for 2-digit numbers.

The last part should be done along the lines of

int tail = invert( div );
int deg = /* number of digits in `tail` */;
return rest * (int) pow(10, deg) + div;
share|improve this answer
+1. This was the answer, I also thought of. But, shouldn't it be (number of digits in tail - 1). For Ex: 321 has 3 digits, so it should be rest * pow(10, 2) when it executes for the last time. – Jay Jul 5 '12 at 15:43
@Jay: tail in this case is actually the remaining portion of the number (which has already been fed through the recursive call). I.e. if the original number was 321, then rest is 1, while tail is 23. So, deg will be 2, exactly as it should be. However, I already see a problem with this solution if tail ends up with leading zeros after inversion. The number of digits should be calculated before the recursive call. BLUEPIXY does it correctly in the accepted solution. – AnT Jul 5 '12 at 16:14

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