My problem is, I need to count how many combination of array of integers sums to a value `W`

.`

let say:

```
int array[] = {1,2,3,4,5};
```

My Algorithm is just find all combinations of lengths from `1`

to `W / minimum(array)`

, which is equal to `W`

because minimum is 1.
And checking each combination if its sum equal to W then increment a counter `N`

.

any other algorithm to solve this ? should be faster :)

**Update:**
ok, the subset problem and the Knapsack Problem are good, but my problem is that the combinations of the array repeats the elements, like this:

```
1,1,1 -> the 1st combination
1,1,2
1,1,3
1,1,4
1,1,5
1,2,2 -> this combination is 1,2,2, not 1,2,1 because we already have 1,1,2.
1,2,3
1,2,4
1,2,5
1,3,3 -> this combination is 1,3,3, not 1,3,1 because we already have 1,1,3.
1,3,4
.
.
1,5,5
2,2,2 -> this combination is 2,2,2, not 2,1,1 because we already have 1,1,2.
2,2,3
2,2,4
2,2,5
2,3,3 -> this combination is 2,3,3, not 2,3,1 because we already have 1,2,3.
.
.
5,5,5 -> Last combination
```

these are all combinations of `{1,2,3,4,5}`

of length 3. the subset-sum problem gives another kind of combinations that I'm not interested in.

so the combination that sums to `W`

, lets say `W = 7`

,

```
2,5
1,1,5
1,3,3
2,2,3
1,1,2,3
1,2,2,2
1,1,1,1,3
1,1,1,2,2
1,1,1,1,1,2
1,1,1,1,1,1,1
```

**Update:**
The Real Problem is in the repeated of the elements `1,1,1`

is need and the order of the generated combination are not important, so `1,2,1`

is the same as `1,1,2`

and `2,1,1`

.