Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

To count the subsequences of length 4 of a string of length n which are divisible by 9.

For example if the input string is 9999 then cnt=1

My approach is similar to Brute Force and takes O(n^3).Any better approach than this?

share|improve this question
If the input string is 99999 (5 digits), what would count be? Do only unique subsequences count, or does each duplicate count separately? – Steve314 Aug 7 '12 at 21:44
@Steve314 Each duplicate count seperately – Luv Aug 8 '12 at 14:06

4 Answers 4

up vote 5 down vote accepted

If you want to check if a number is divisible by 9, You better look here.

I will describe the method in short:

checkDividedByNine(String pNum) :
If pNum.length < 1
   return false
If pNum.length == 1
   return toInt(pNum) == 9;
Sum = 0
For c in pNum:
    Sum += toInt(pNum)
return checkDividedByNine(toString(Sum))

So you can reduce the running time to less than O(n^3).

EDIT: If you need very fast algorithm, you can use pre-processing in order to save for each possible 4-digit number, if it is divisible by 9. (It will cost you 10000 in memory)

EDIT 2: Better approach: you can use dynamic programming:

For string S in length N:

D[i,j,k] = The number of subsequences of length j in the string S[i..N] that their value modulo 9 == k.

Where 0 <= k <= 8, 1 <= j <= 4, 1 <= i <= N.

D[i,1,k] = simply count the number of elements in S[i..N] that = k(mod 9).
D[N,j,k] = if j==1 and (S[N] modulo 9) == k, return 1. Otherwise, 0.
D[i,j,k] = max{ D[i+1,j,k], D[i+1,j-1, (k-S[i]+9) modulo 9]}.

And you return D[1,4,0].

You get a table in size - N x 9 x 4.

Thus, the overall running time, assuming calculating modulo takes O(1), is O(n).

share|improve this answer
That I know. I want to reduce the complexity of the problem. – Luv Aug 7 '12 at 21:07
If pNum.length < 1 return false; Why? Why not return 0? – Vikram Aug 7 '12 at 21:10
checkDividedByNine return boolean, not a number. – barak1412 Aug 7 '12 at 21:21
@Luv look at my dynamic programming solution – barak1412 Aug 7 '12 at 21:42
@barak1412 See me working code for the above problem using DP – Luv Aug 8 '12 at 14:01

Assuming that the subsequence has to consist of consecutive digits, you can scan from left to right, keeping track of what order the last 4 digits read are in. That way, you can do a linear scan and just apply divisibility rules.

If the digits are not necessarily consecutive, then you can do some finangling with lookup tables. The idea is that you can create a 3D array named table such that table[i][j][k] is the number of sums of i digits up to index j such that the sum leaves a remainder of k when divided by 9. The table itself has size 45n (i goes from 0 to 4, j goes from 0 to n-1, and k goes from 0 to 8).

For the recursion, each table[i][j][k] entry relies on table[i-1][j-1][x] and table[i][j-1][x] for all x from 0 to 8. Since each entry update takes constant time (at least relative to n), that should get you an O(n) runtime.

share|improve this answer
Numbers are not necessarily consecutive in a subsequence – Luv Aug 7 '12 at 21:11
Any better than O(n^4)?? – Luv Aug 7 '12 at 21:14
If you're only looking for the total number, you can try some stuff with memoizing; I'll update my answer. (I was being silly earlier) – Dennis Meng Aug 7 '12 at 21:15
By the way, can you please explain me how is it O(n^3) or O(n^4)? – Vikram Aug 7 '12 at 21:16
@Vikram Originally I was working under the assumption that we had to generate each group of 4 digits (of which there are n choose 4), which would have made it O(n^4). Then I found the smarter way to approach it. – Dennis Meng Aug 7 '12 at 21:28

How about this one:

/*NOTE: The following holds true, if the subsequences consist of digits in contagious locations */ 

public int countOccurrences (String s) {
    int count=0;
    int len = s.length();
    String subs = null;
    int sum;

    if (len < 4)
        return 0;
    else {
        for (int i=0 ; i<len-3 ; i++) {
            subs = s.substring(i, i+4);
            sum = 0;

            for (int j=0; j<=3; j++) {
                sum += Integer.parseInt(String.valueOf(subs.charAt(j)));

            if (sum%9 == 0)
        return count;
share|improve this answer
As mentioned in a comment to my question, the subsequences don't necessarily contain consecutive digits. Otherwise, this should work. – Dennis Meng Aug 7 '12 at 21:49
@DennisMeng...You are right, my friend! – Vikram Aug 7 '12 at 22:04

Here is the complete working code for the above problem based on the above discussed ways using lookup tables

int fun(int h)
return (h/10 + h%10);

int main()
int t;
int i,T;
    char str[10001];
    int len=strlen(str);
    int arr[len][5][10];

    int j,k,l;
              int y;


        for(i=len-2;i>=0;i--)   //represents the starting index of the string

                    int temp[5][10];
                    //COPYING ARRAY
                    int a,b,c,d;

            for(j=1;j<=4;j++)   //represents the length of the string
                for(k=0;k<=9;k++)   //represents the no. of ways to make it

                                int h,r;
                                  temp[r][h]=( temp[r][h]+(arr[i][c][d]*arr[i+1][j][k]))%1000000007;

                    //copy back from temp array




    return 0;
share|improve this answer
It runs in linear time using lookup tables but it takes O(600n) in worst case and space O(n*4*10). Please see if it could be further optimized. Thanks in advance – Luv Aug 8 '12 at 14:04

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.