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?

If you want to check if a number is divisible by 9, You better look here. I will describe the method in short:
So you can reduce the running time to less than O(n^3). EDIT: If you need very fast algorithm, you can use preprocessing in order to save for each possible 4digit 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.
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). 


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



How about this one:



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 For the recursion, each 

