# enumerating all possible strings of length K from an alphabet in Python [duplicate]

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is there any best way to generate all possible three letters keywords

how can I enumerate all strings of length K from an alphabet L, where L is simply a list of characters? E.g. if L = ['A', 'B', 'C'] and K = 2, I'd like to enumerate all possible strings of length 2 that can be made up with the letters 'A', 'B', 'C'. They can be reused, so 'AA' is valid.

This is essentially permutations with replacement, as far as I understand. if theres a more correct technical term for this, please let me know.... its essentially all strings of length K that you can make by choosing ANY letter from the alphabet L, and possibly reusing letters, in a way that is sensitive to order (so AB is NOT identical to BA according to this.) is there a clearer way to state this?

in any case i believe the solution is:

[ ''.join(x) for x in product(L, repeat=K) ]

but i am interested in other answers to this, esp. naive approaches versus fast Pythonic ones, and discussions of speed considerations.

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## marked as duplicate by agf, JMax, Jeff Atwood♦Sep 27 '11 at 9:03

Please write some code and / or tell us specifically what problem you're facing trying to do that. –  agf Sep 27 '11 at 7:39
You can do it by using recursion. –  tgmath Sep 27 '11 at 7:40
I agree it's a duplicate, apologies for missing it. would still like to know about recursive way to do this since that is not mentioned in other thread in detail –  user248237dfsf Sep 27 '11 at 8:03
Your edit has made this a discussion / polling question -- it no longer has a specific correct answer, or even a specific question ("I am interested in..."). That's not on-topic for this site. –  agf Sep 27 '11 at 8:07

this is part of the Python Documentation

EDIT2: of course the right answer is the product, thanks for the comment

print  [''.join(x) for x in product('ABC', repeat=3)]

prints 27 elements

['AAA', 'AAB', 'AAC', 'ABA', 'ABB', 'ABC', 'ACA', 'ACB', 'ACC', 'BAA', 'BAB',
'BAC', 'BBA', 'BBB', 'BBC', 'BCA', 'BCB', 'BCC', 'CAA', 'CAB', 'CAC', 'CBA',
'CBB', 'CBC', 'CCA', 'CCB', 'CCC']

@agf gave the right answer before

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Doesn't look right - if the alphabet size (iterable) is length 3, and r = 3, you'd expect 3^3 sequences, but len([x for x in combinations_with_replacement(['A', 'B', 'C'], 3)]) returns 10. –  user248237dfsf Sep 27 '11 at 7:48
see my edit, which element would be wrong? :-) –  knitti Sep 27 '11 at 7:53
none are wrong, but it misses some. there should be 3^3, or 27 elements: [ ''.join(x) for x in product('ABC', repeat=3) ] ['AAA', 'AAB', 'AAC', 'ABA', 'ABB', 'ABC', 'ACA', 'ACB', 'ACC', 'BAA', 'BAB', 'BAC', 'BBA', 'BBB', 'BBC', 'BCA', 'BCB', 'BCC', 'CAA', 'CAB', 'CAC', 'CBA', 'CBB', 'CBC', 'CCA', 'CCB', 'CCC'] –  user248237dfsf Sep 27 '11 at 7:58
Where is 'ABA', 'ACA' etc? Please read your link "Combinations are emitted in lexicographic sort order." The right answer is given (by me) in stackoverflow.com/questions/7074051/… –  agf Sep 27 '11 at 7:59