I want to calculate the number of **different** ordered groups of N integers so that the elements of each group sums up to A

For instance: if N = 3 and A = 3 the result should be 10:

1 = [3, 0, 0]

2 = [2, 1, 0]

3 = [1, 2, 0]

4 = [0, 3, 0]

5 = [2, 0, 1]

6 = [1, 1, 1]

7 = [0, 2, 1]

8 = [1, 0, 2]

9 = [0, 1, 2]

10 = [0, 0, 3]

the way I did it was by brute-force:

```
public static int calc(int a, int n){
if (n <= 1 || a == 0) return 1;
int sum = 0;
for (int i=0; i<=n; i++)
sum += calc(a - i, n - 1);
return sum;
}
```

i suspect that there can be a better way (some mathematical calculation that I missing..) is there?

**EDIT**
In the original question i forgot to take into consideration the order