# Algorithm for counting n-element subsets of m-element set divisible by k

Suppose {1, 2, 3, ..., m} is a set. I choose n distinct elements from this set. Can I write an algorithm which counts the number of such subsets whose sum is divisible by k (ordering not mattering)?

This problem would have been much easier if ordering mattered, but it doesn't and I don't have a clue how to approach. Can anyone please help?

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This can be done in time O(n·k·m) and space O(n·k) by a method similar to that outlined below. Let S be your set with m elements. By definition of set and subset, all the elements of S are distinct, as are all the elements of any S-subset.

First, consider the simpler problem where we count S-subsets with any number of elements instead of exactly n elements. Let N(W,r) be the number of W-subsets U such that ΣU (the sum of elements of U) is equal to r mod k. If W is a subset of S, let W' be W + z, where z ∈ S\W; that is, z is an element of S not already in W. Now N(W', (r+z)%k) = N(W, (r+z)%k) + N(W, r) because N(W, (r+z)%k) is the number of W'-subsets U with ΣU≡(r+z)%k) that don't contain z and N(W, r) is the number of W'-subsets U with ΣU≡(r+z)%k) that do contain z. Repeat this construction, treating each element of S in turn until W' = S, at which point the desired answer is N(S,0). Time is O(k·m), space is O(k).

To adapt the above process for exact subset sizes, change N(W,r) to N(W,h,r), where h is a subset size, and adapt the equations for N(W',r) to N(W',h,r) in the obvious way. Time is O(k·n·m), space is O(k·n).

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set -> all elements are different.

create an array to describe how many representatives each numberclass has:

``````ncnt=new int[k]
for x in elements{
ncnt[x%k]++;
}
``````

dynamic programming:

``````int waysToCreate(int input_class,int class_idx, int n){
int ways=0
// not using this class:
if(class_idx+1 < k )
ways+=waysToCreate(input_class,class_idx+1,n);
for( int i=1;i < ncnt[class_idx] && i<=n ){
int new_input_class=(input_class+i*class_idx)%k;
if(i == n && new_input_class != 0){
break; // all elements are used, but doesn't congrunent with 0 (mod k)
}
int subways=1;
if(class_idx+1 < k )
subways=waysToCreate(new_input_class,class_idx+1,n-i)

ways+=nchoosek(ncnt[class_idx],i) * subways;
}
return ways;
}
``````

enable memoize on `waysToCreate`, `nchoosek`

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