I have this code, which splits a number into groups of 5, puts them into a list, and then multiples them. This is Problem 8 in Project Euler, if you're confused. It's also not finished, as I need to find the other possible 5 consecutive integers.

```
def split_number(number, n):
line = str(number)
split = [line[i:i+n] for i in range(0, len(line), n)]
return split
splitnum = split_number((extremely long number), 5)
for x in enumerate(splitnum[:-1]):
split5 = split_number(splitnum[x], 1)
for n in split5:
splitproduct = reduce(lambda x, y: x*y, splitnum[n])
if (splitproduct > solution):
solution = splitproduct
print solution
```

When I try to run this, I get the error

```
TypeError: list indices must be integers, not tuple
```

I guess when I iterate through splitnum, x is a tuple. I need it to be an integer so I can use split5() correctly.

New code:

```
def split_number(number, n):
line = str(number)
split = [line[i:i+n] for i in range(1, len(line)-n+1, n)]
return split
number =
while len(split_number(number,1)) is not 0:
splitnum = split_number((number), 5)
solution = 0
for x in splitnum[:-1]:
split5 = split_number(x, 1)
for n in split5:
splitproduct = reduce(lambda x, y: x*y, n)
if (splitproduct > solution):
solution = splitproduct
number = split_number(number, 1)
del number[0]
print solution
```

Now I'm getting a memory error on the 'split' line in function split_number. that's probably because of the extremely long number. But that isn't the topics question, I just wanted you guys to see how I implemented their solutions (which worked, because the program actually runs). :)

`split_number([1, 2, 3, 4], 2)`

should yield`1, 2`

,`2, 3`

and`3, 4`

, not`1, 2`

and`3, 4`

. – Blender Mar 9 '13 at 0:10`range`

inside`split_number`

back to`1`

. Also you will want to set`len(line)-n+1`

as the maximum number so you don’t end up with four groups containing less than five numbers. – poke Mar 9 '13 at 0:20“Now I'm getting a memory error on the 'split' line”– The problem is that you calculate and store all the possible groups first and then want to go through it. If you combine it together and just look at asingleelement of the`split`

-list (i.e. don’t calculate more), then you should be fine. – poke Mar 9 '13 at 0:33