# Exhaustively get all the possible combinations of a word of three lettters

I am working on a leetcode problem "wordLadder"

Given two words (beginWord and endWord), and a dictionary's word list, find the length of shortest transformation sequence from beginWord to endWord, such that:

1. Only one letter can be changed at a time.
2. Each transformed word must exist in the word list. Note that beginWord is not a transformed word.

Note:

• Return 0 if there is no such transformation sequence.
• All words have the same length.
• All words contain only lowercase alphabetic characters.
• You may assume no duplicates in the word list.
• You may assume beginWord and endWord are non-empty and are not the same.

Example 1:

``````Input:
beginWord = "hit",
endWord = "cog",
wordList = ["hot","dot","dog","lot","log","cog"]

Output: 5

Explanation: As one shortest transformation is "hit" -> "hot" -> "dot" -> "dog" -> "cog",
return its length 5.
``````

Example 2:

``````Input:
beginWord = "hit"
endWord = "cog"
wordList = ["hot","dot","dog","lot","log"]

Output: 0

Explanation: The endWord "cog" is not in wordList, therefore no possible transformation.
``````

my solution

``````class Solution:
visited = set()
wordSet = set(wordList)

queue = [(beginWord, 1)]

while len(queue) > 0:
word, step = queue.pop(0)
logging.debug(f"word: {word}, step:{step}")

#base case
if word == endWord:
return step #get the result.
if word in visited: #better than multiple conditions later.
continue

for i in range(len(word)):
for j in range(0, 26):
ordinal = ord('a') + j
next_word = word[0:i] + chr(ordinal) + word[i + 1:]
logging.debug(f"changed_word: {next_word}")
if next_word in wordSet:
queue.append((next_word, step + 1))
visited.add(word) # paint word as visited

return 0
``````

To exhaust all the possible combination of a word I read the discussion area, all employed the slice techniques

`next_word = word[0:i] + chr(ordinal) + word[i + 1:]`

Is there other solutions to handle the problem?

This is a classical networking problem. What you should do is generate a square Matrix with dimensions equal to the number of words in your dictionary. Then fill the matrix with ones wherever the words are a one letter transformation towards each other i.e. `network['hot']['not'] = 1` all other cells need to be `0`. Now you defined your network, and you can use a shortest path allgorithm like Dijkstra in order to solve your Problem