# i have a list of numbers and a certain sum, and i need to calculate the possible number of ways to generate that sum

Also, repetition of numbers is allowed.

I reffered to the program:

``````def subset_sum_recursive(numbers,target,partial):
s = sum(partial)

#check if the partial sum is equals to target
if s == target:
print "sum(%s)=%s"%(partial,target)
if s >= target:
return # if we reach the number why bother to continue

for i in range(len(numbers)):
n = numbers[i]
remaining = numbers[i+1:]
subset_sum_recursive(remaining,target,partial + [n])

def subset_sum(numbers,target):
#we need an intermediate function to start the recursion.
subset_sum_recursive(numbers,target,list())

if __name__ == "__main__":
subset_sum([3,9,8,4,5,7,10],15)

#Outputs:
#sum([3, 8, 4])=15
#sum([3, 5, 7])=15
#sum([8, 7])=15
#sum([5, 10])=15
``````

but i am not getting where to put the count variable , its so confusing

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Are you saying that your algorithm is also supposed to output `[3,3,3,3,3]`? –  mgilson Apr 16 '13 at 20:58
this is exactly your looking for : stackoverflow.com/questions/4632322/… –  Moj Apr 16 '13 at 20:59
@Moj, the code from the accepted answer is what this question is about –  gnibbler Apr 16 '13 at 21:06

It seems like you have a typical Counting Coins problem.

All the snippets you see there should solve the problem you want to solve (it also includes combinations that re-use the same number). I find convenient, if slow, this python version on that wiki:

``````def changes(amount, coins):
ways = [0] * (amount + 1)
ways[0] = 1
for coin in coins:
for j in xrange(coin, amount + 1):
ways[j] += ways[j - coin]
return ways[amount]

print changes(100, [1, 5, 10, 25])
print changes(100000, [1, 5, 10, 25, 50, 100])
``````

If you want to know more, refer to this previous answer to a similar question - it breaks down the possible variants of the problem and exposes a pretty good solution.

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you can also define a list in main and the append to list when ever one solution is found :

``````if s == target:
print "sum(%s)=%s"%(partial,target)
solutions.append("sum(%s)=%s"%(partial,target))

if __name__ == "__main__":
solutions=[]
subset_sum([3,9,8,4,5,7,10],15)
print len(solutions) # output: 4
``````
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Not sure about canonical way to solve this problem, may be guru knows. But I find my solution quite nice:

``````import itertools
inp = [3,9,8,4,5,7,10]
outp = list()
target = 15
for x in range(2,len(inp)):
outp.extend([ tsum for tsum in itertools.combinations(inp,x) if sum(tsum) == target ])
outp
``````

UPD This is quite satisfactory for small inputs. For large inputs it doesn't scale very well. – @gnibbler Consider reading this question if you have large input

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This is quite satisfactory for small inputs. For large inputs it doesn't scale very well. –  gnibbler Apr 16 '13 at 21:41
absolutely correct. Updated my answer. –  singer Apr 16 '13 at 21:43