I'm on checkio.org trying to solve this problem:
You are given a two or more digits number N. For this mission, you should find the smallest positive number of X, such that the product of its digits is equal to N. If X does not exist, then return 0. Let's examine the example. N = 20. We can factorize this number as 2*10, but 10 is not a digit. Also we can factorize it as 4*5 or 2*2*5. The smallest number for 2*2*5 is 225, for 4*5 -- 45. So we select 45.
I've created the recursive function that factorizes an integer and I'm passing the factoredList into another recursive function called "groupIt" to find the lowest integer that's the product of the factored integers.
Here's the function:
def groupIt(digits): tempList =  if len(digits)>1: for z in range(0,len(digits)-1): if digits[z]*digits[z+1]>=10: toStore="" for k in range(0,len(digits)): toStore+=str(digits[k]) return int(toStore) else: digits.append(digits.pop(z+1)*digits.pop(z)) digits.sort() tempList.append(groupIt(digits)) else: return digits tempList.sort() return tempList
For an integer '20', the factored list is 2 x 2 x 5. When I recursively call groupIt on [4,5], "len(digits)-1" = 1, so z goes from range (0,1).
As I understand it, z should only be 0, since it wouldn't include the last integer in the range, but z does eventually go to 1 in the same for-loop for [4,5].
If I replace "for z in range(0,len(digits)-1)" with "for z in range(0,1)," the code works, so the problem does appear to be isolated there.