I'm sorry for deleting the original question, here it is: We have a bag or an array of n integers, we need to find the product of each of the (n-1) subsets. e.g:

S = {1, 0, 3, 6}

ps[1] = 0*3*6 = 0;

ps[2] = 1*3*6 = 18; etc.

After discussions, we need to take care of the three cases and they are illustrated in the following:

```
1. S is a set (contains one zero element)
for i=1 to n
if s[i]=0
sp[i] = s[1] * s[2] * ...* s[i-1] * s[i+1] *.....*s[n]
else
sp[i] = 0;
2. S is a bag (contains more than one zero element)
for i=1 to n
sp[i] = 0;
3. S is a set (contains no zero elements)
product = 1
for i=1 to n
product *= s[i];
for i=1 to n
sp[i] = product / s[i];
```

Thanks.

`O(N)`

solution exists without using division: stackoverflow.com/questions/2680548/… – polygenelubricants Apr 22 '10 at 8:33