I recommend you structure your code in a more precise way. You can split the vaguely-specified task you mention along different sub-tasks, e.g.:

- determine and normalize the signs of
the number and base (do you
*need* to
support negative bases, or can you
just raise an exception?), also
ensuring an immediate exception gets
raised in error cases (e.g. a base of
`0`

or `1`

);
- write a function that (give positive and
correct values for
`a`

and `b`

) returns a
"sequence of digits" to represent `a`

in
base `b`

, where a "digit" is an integer
between `0`

included and `b`

excluded;
- write a function that given a's sign and
sequence-of-digits expansions builds and
returns a string representation -- depends
on how you want to represent very large
"digits" when b is large, say > 36 if you
want to use digits, then ASCII letters,
for the first 36 digits in the obvious
way; maybe you should accept an "alphabet"
string to use for the purpose (and the
first function above should raise an exception
when b's too large for the given alphabet)
- write a function that uses all the above ones
to print the string out

Of these tasks, only the second one can be seen as suitable to a "recursive" implementation if one insists (though an iterative implementation is in fact much more natural!) -- given that this is homework, I guess you'll have to do it recursively because that's part of the assigned task, ah well!-). But, for reference, one obvious way to iterate would be:

```
def digitsequence(a, b):
results = []
while True:
results.append(a % b)
if a < b: break
a //= b
return reversed(results)
```

assuming one wants the digit sequence in the "big endian" order we're used to from the way positional decimal notation entered Western culture (it was the more naturally-computed little-endian order in the Arabic original... but Arab being written right-to-left, the literal transcription of that order in European languages, written left-to-right, became big-endian!-).

Anyway, you can take simple, linear recursion as a way to "reverse" things implicitly (you could say such recursion "hides" a last-in, first-out stack, which is clearly a way to reverse a sequence;-), which I guess is where the recursion spec in the homework assignment may be coming from;-).