# Find all ways to sum given number (with repetitions allowed) from given set

1. Not a homework but an interview question
2. I am not sure if the solution I have is the optimal, hence posting the question.
3. Couldnt find duplicate of this question, if you find one, please do close as dup. (Note this problem is not same as 'finding sum from given array with repetition not allowed')

So given an array (e.g. [1,2]) of n elements and a number 'k' (e.g. 6), find all possible ways to produce the sum = k

For given example answer would be 4 because

``````1 1 1 1 1 1
1 1 1 1 2
1 1 2 2
2 2 2
``````

The algorithm I could think of is by brute force, we simulate all possible scenarios, and stop when from given state we can not reach result.

`````` arr[] = [1,2]
k = 6
globalCount =0;
function findSum(arr,k)
{
if(k ==0)
globalCount++
return
else if(k<0)
return

for each i in arr{
arr.erase(i)
tmp = k
findSum(arr,tmp)
while(k>=0){
findSum(arr,tmp -= i)
}
}
``````

I am not sure if my solution is most efficient one out there. Please comment /correct or show pointers to better solutions.

EDIT : Would really appreciate if someone can give me runtime complexity of my code and their soln code. :) Mine code complexity I think is Big-O( n^w ) w = k/avg(arr[0]..arr[n-1])

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possible duplicate of Generating the partitions of a number –  templatetypedef Sep 7 '11 at 21:15

If you're willing to excuse the fancy linq tricks, you might find this C# solution useful. Fortunately linq reads kind of like english. The idea is to build up the solutions as `k` starts from 0 and increments until it reaches its correct value. Each value of `k` builds on the previous solutions. One thing you have to watch for though is to ensure that the new "ways" you're finding are not re-orderings of others. I solved that by only counting them as valid if they're sorted. (which was only a single comparison)

``````void Main() {
foreach (int[] way in GetSumWays(new[] {1, 2}, 6)) {
Console.WriteLine (string.Join(" ", way));
}
}

int[][] GetSumWays(int[] array, int k) {
int[][][] ways = new int[k + 1][][];
ways[0] = new[] { new int[0] };

for (int i = 1; i <= k; i++) {
ways[i] = (
from val in array
where i - val >= 0
from subway in ways[i - val]
where subway.Length == 0 || subway[0] >= val
select Enumerable.Repeat(val, 1)
.Concat(subway)
.ToArray()
).ToArray();
}

return ways[k];
}
``````

Output:

``````1 1 1 1 1 1
1 1 1 1 2
1 1 2 2
2 2 2
``````

It uses a dynamic programming approach and should be faster than a naive recursive approach. I think. I know it's fast enough to count the number of ways to break a dollar in a few milliseconds. (242)

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+1 for code. Golly! if u hadnt told me, I wouldnt have known ever that it is a program that compiles and executes. That is so much like english. :) –  Ajeet Sep 7 '11 at 20:33

This is an interesting subset of the partition problem. There's actually a closed-form solution to this (see here and here) if you allow all integers.

Doing some googling for the "restricted partition function" gave me some leads. This paper gives a pretty mathematically rigorous discussion of a couple of solutions to this problem, as does this one.

Unfortunately I'm too lazy to code these up. They're pretty intense solutions.

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Thanks Queequeg, for finding the problem behind the problem. :) –  Ajeet Sep 7 '11 at 20:34