International Morse Code defines a standard encoding where each letter is mapped to a series of dots and dashes, as follows:
'a'
maps to".-"
,'b'
maps to"-..."
,'c'
maps to"-.-."
, and so on.
For convenience, the full table for the 26
letters of the English alphabet is given below:
[".-","-...","-.-.","-..",".","..-.","--.","....","..",".---","-.-",".-..","--","-.","---",".--.","--.-",".-.","...","-","..-","...-",".--","-..-","-.--","--.."]
Given an array of strings words
where each word can be written as a concatenation of the Morse code of each letter.
- For example,
"cab"
can be written as"-.-..--..."
, which is the concatenation of"-.-."
,".-"
, and"-..."
. We will call such a concatenation the transformation of a word.
Return the number of different transformations among all words we have.
Example 1:
Input: words = ["gin","zen","gig","msg"] Output: 2 Explanation: The transformation of each word is: "gin" -> "--...-." "zen" -> "--...-." "gig" -> "--...--." "msg" -> "--...--." There are 2 different transformations: "--...-." and "--...--.".
Example 2:
Input: words = ["a"] Output: 1
Constraints:
1 <= words.length <= 100
1 <= words[i].length <= 12
words[i]
consists of lowercase English letters.