Your question can be rephrased like this :
Given a number N, find all sets [S1, S2, S3 .....] where the sum of each set equals N. The size of the sets are given by the number L.
First let's consider the case of
L=2.This means that you can have the following sets
(9,1) , (8,2), (7,3) , (6,4) , (5,5)
I'll call this the base solution and you'll soon see why.
Let's change our L to 3 now and redo our answer :
So let's consider the number 9. Does there exist such a list
L such that
sum(L) + 9 = 10 ? The obvious answer is No, but what's interesting here is not the answer but the question itself. We are basically asking for a set of
2 elements that can be summed up to be the number
1. This is the same problem that was solved by the base solution.
So therefore for each number
[9,8,7,6,5,4,3,2,1] you try to find a set
x+a+b = 10.
This isn't a complete answer, but the idea is that you see the pattern here, and use recursion to calculate the base case as done above and then figure out the recursive call that will complete your solution. Good luck!