I have the following list of letters:

letters = ['t', 'u', 'v', 'w', 'x', 'y', 'z']

And following list of words:

words = ['apple', 'whisky', 'yutz', 'xray', 'tux', 'zebra']

How can I search using Python if any of the combination of words exist for the list of letters? Like just looking at it we can observe that two words 'yutz' and 'tux' are the only one which can be built for the list of letters we have.

I'm new to Python and I tried to make different for loops but not able to reach anywhere.

for word in words:
    for i in letters:
        if i in word:
            print('not in word')

And the result is disaster as you guys can understand.

  • Split every word in words by letter then sort it and join then compare joined string with sorted and joined letters. – Serg Anuke Nov 11 '17 at 18:05
  • @SergAnuke There's no need to do sorting here. – PM 2Ring Nov 11 '17 at 18:06
  • 2
    Can you only use each letter once? – Sam Redway Nov 11 '17 at 18:11
up vote 5 down vote accepted

You need to look at your problem in terms of sets. Any word from your words list that is a subset of your set of letters can be formed by those letters. Put differently, letters needs to be a superset of the word:

letters = {'t', 'u', 'v', 'w', 'x', 'y', 'z'}  # a set, not a list
for word in words:
    if letters.issuperset(word):

The set.issuperset() method returns true if all elements of the iterable argument are in the set.

If you wanted a list, just use a list comprehension:

[word for word in words if letters.issuperset(word)]


>>> words = ['apple', 'whisky', 'yutz', 'xray', 'tux', 'zebra']
>>> letters = {'t', 'u', 'v', 'w', 'x', 'y', 'z'}  # a set, not a list
>>> [word for word in words if letters.issuperset(word)]
['yutz', 'tux']

Note that this only looks at unique letters. apple is a subset of the letters set {'a', 'p', 'l', 'e'}. If you need to handle letter counts too, you need to use a multiset; Python has an implementation called collections.Counter(). This keeps track not only of the letters, but also of their counts.

The Counter type doesn't support testing for sub- or supersets, so you have to use subtraction instead; if an empty Counter() is produced, the whole word can be formed from the letter counts:

letters = Counter(['a', 'p', 'l', 'e', 'p', 'i'])
words = ['apple', 'applepie']
for word in words:
    if Counter(word) - letters:

or as a list comprehension:

[word for word in words if Counter(word) - letters]

which produces ['apple'], as there is only a single 'e' in the input letter multi-set, and only 2 'p's, not 3.

  • This works if the letter can be re-used. Take apple - it has 2 'p' s if the list only has one p in it - can you make apple from that list ie ['a', 'p', 'l', 'e'] ? – Sam Redway Nov 11 '17 at 18:12
  • 2
    @SamRedway: already addressed (I was typing up the sample when you commented). – Martijn Pieters Nov 11 '17 at 18:16
  • @MartijnPieters I have been able to solve this problem but now have I another challenge. Scrabble can have blank tiles which we can denote as "" in python. What if in my example instead of 't' we have "". Humanly we know that we can use this blank tile and make words like "ytuz" and "tux". But how will we do it programmatically? – Hannan Nov 24 '17 at 17:43

You can use set.difference here:

r = [w for w in words if not set(w).difference(letters)]

['yutz', 'tux']

If the result is an empty set, that means every character in w belongs to letters. If that is the case, set.difference returns an empty set, which is False-y, so not .... results in True and the word is printed. This is equivalent to:

for w in words:
    if not set(w).difference(letters):


This is similar to testing with set.issuperset, but approaches the problem from a different perspective.

  • 1
    They don't want to know what letters are missing, only if the word can be formed from the letters. A simple subset / superset test is all that is needed. – Martijn Pieters Nov 11 '17 at 18:08
  • 1
    @MartijnPieters The essence of my answer captures exactly that. – coldspeed Nov 11 '17 at 18:09
  • 2
    @MartijnPieters My answer is just as valid as yours, I don't see the reason for a downvote here. – coldspeed Nov 11 '17 at 18:12
  • 1
    And creating a new set instead of a boolean is inefficient. There is no need to turn each word into a new set object, and set.difference() returns a full set object, which you then only test for containing elements and discard again. – Martijn Pieters Nov 11 '17 at 18:17
  • 1
    @MartijnPieters I very explicitly said (in my initial answer) "If the result is an empty set, that means every character in w belongs to letters." If that doesn't explain what I wanted to convey, I don't know what does. – coldspeed Nov 11 '17 at 18:17

You can use the all function with a generator to determine if all the characters in a word belonging to words exists in letters:

letters = ['t', 'u', 'v', 'w', 'x', 'y', 'z']
words = ['apple', 'whisky', 'yutz', 'xray', 'tux', 'zebra']
final_words = [i for i in words if all(c in letters for c in i)]


['yutz', 'tux']
  • Lets say a word has two instances of a letter - but the list letters only has one instance of that letter? – Sam Redway Nov 11 '17 at 18:10
  • @SamRedway this answers checks for existence. Your statement above would apply to a program using collections.Counter or another system of storing letter frequencies. – Ajax1234 Nov 11 '17 at 18:13
  • Was a question rather than a statement. I don't think the OP has been clear on this point. – Sam Redway Nov 11 '17 at 18:14

You can use itertool's permutation method :

In one line:

print(set(["".join(permutation) for item in words for permutation in itertools.permutations(letters,len(item)) if "".join(permutation) in words ]))

Detailed solution:

above list comprehension is same as:

words = ['apple', 'whisky', 'yutz', 'xray', 'tux', 'zebra']

letters = ['t', 'u', 'v', 'w', 'x', 'y', 'z']
import itertools

for i in words:
    for k in itertools.permutations(letters,len(i)):
        if "".join(k) in words and "".join(k) not in final:



['yutz', 'tux']
  • 1
    This is hugely inefficient. You are executing O(N!) different tests for every word, where only O(N) tests are needed. – Martijn Pieters Nov 11 '17 at 19:10
  • @MartijnPieters I just shown that he can try this , i didn't said 'you must' , i know you have answered in good way and i know those methods too so should i repeat your answer ? – Aaditya Ura Nov 11 '17 at 19:13
  • I'm just giving feedback on how useful this approach is, nothing more. – Martijn Pieters Nov 11 '17 at 19:14

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