# Nested For Loops Using List Comprehension

If I had two strings, `'abc'` and `'def'`, I could get all combinations of them using two for loops:

``````for j in s1:
for k in s2:
print(j, k)
``````

However, I would like to be able to do this using list comprehension. I've tried many ways, but have never managed to get it. Does anyone know how to do this?

## 3 Answers

``````lst = [j + k for j in s1 for k in s2]
``````

or

``````lst = [(j, k) for j in s1 for k in s2]
``````

if you want tuples.

Like in the question, `for j...` is the outer loop, `for k...` is the inner loop.

Essentially, you can have as many independent 'for x in y' clauses as you want in a list comprehension just by sticking one after the other.

• +1 since the OP asked for LC's. – John La Rooy Sep 3 '10 at 10:21
• What if you want to do the nested loop to iterate over a nested list? Something like: [print('a') for ax in axs for axs in axes] is printing a bunch on [None, None...] up to len(axes) – Pablo Ruiz Ruiz Nov 14 '18 at 16:09

Since this is essentially a Cartesian product, you can also use itertools.product. I think it's clearer, especially when you have more input iterables.

``````itertools.product('abc', 'def', 'ghi')
``````
• +1 because product is a nicer answer than LC's for this – John La Rooy Sep 3 '10 at 10:22
• itertools strikes again! Nice solution – Brendan Maguire Feb 13 '14 at 13:58

Try recursion too:

``````s=""
s1="abc"
s2="def"
def combinations(s,l):
if l==0:
print s
else:
combinations(s+s1[len(s1)-l],l-1)
combinations(s+s2[len(s2)-l],l-1)

combinations(s,len(s1))
``````

Gives you the 8 combinations:

``````abc
abf
aec
aef
dbc
dbf
dec
def
``````
• Accourding to OP's question, I think the output should give couples of letters, and there should be 9 combinations. – Mattia Jul 30 '15 at 8:42
• What happened to: abd, abe, acd, ace, acf, adb, adc, ade, adf, aeb, aed, afb, afc, afd, afe, and all the ones starting with c, e, or f? Even if order is not important, omitted are: bda, ade, etc. – Harry Binswanger Mar 26 '17 at 2:38
• The way this works is, that the left most position can only be "a" or "d", the middle position can only be "b" or "e", and the right position can only be "c" or "f". – Stefan Gruenwald Mar 27 '17 at 22:31