Probably not the best approach but it should work.
Determine number of combinations of three numbers which sum to 8:
1,1,6
1,2,5
1,3,4
2,2,4
2,3,3
To find the above I started with:
6,1,1 then subtracted 1 from six and added it to the next column...
5,2,1 then subtracted 1 from second column and added to next column...
5,1,2 then started again at first column...
4,2,2 carry again from second to third
4,1,3 again from first...
3,2,3 second -> third
3,1,4
knowing that less than half is 2 all combinations must have been found... but since the list isn't long we might as well go to the end.
Now sort each list of 3 from greatest to least(or vice versa)
Now sort each list of 3 relative to each other.
Copy each unique list into a list of unique lists.
We now have all the combinations which add to 8 (five lists I think).
Now consider a list in the above set
6,1,1 all the possible combinations are found by:
8 pick 6, (since we picked six there is only 2 left to pick from) 2 pick 1, 1 pick 1
which works out to 28*2*1 = 56, it is worth knowing how many possibilities there are so you can test.
n choose r (pick r elements from n total options)
n C r = n! / [(n-r)! r!]
So now you have the total number of iterations for each component of the list for the first one it is 28...
Well picking 6 items from 8 is the same as creating a list of 8 minus 2 elements, but which two elements?
Well if we remove 1,2 that leaves us with 3,4,5,6,7,8. Lets consider all groups of 2... Starting with 1,2 the next would be 1,3... so the following is read column by column.
12
13 23
14 24 34
15 25 35 45
16 26 36 46 56
17 27 37 47 57 67
18 28 38 48 58 68 78
Summing each of the above columns gives us 28. (so this only covered the first digit in the list (6,1,1) repeat the procedure for the second digit (a one) which is "2 Choose 1" So of the left over two digits from the above list we pick one of two and then for the last we pick the remaining one.
I know this is not a detailed algorithm but I hope you'll be able to get started.