how many different four letter words can can be formed with letter of WORD such that letter is not repeated
Answers
Answer:
There are 6 distinct letters in Gondar. We have to choose four letters at a time and arrange them to form a word.
There are 6 distinct letters in Gondar. We have to choose four letters at a time and arrange them to form a word.Selection of four letters from the six, is the combination 6C4 = (6!)/(4! *2!) = 15.
There are 6 distinct letters in Gondar. We have to choose four letters at a time and arrange them to form a word.Selection of four letters from the six, is the combination 6C4 = (6!)/(4! *2!) = 15.That is, we have 15 combinations of four letter words.
There are 6 distinct letters in Gondar. We have to choose four letters at a time and arrange them to form a word.Selection of four letters from the six, is the combination 6C4 = (6!)/(4! *2!) = 15.That is, we have 15 combinations of four letter words.Now each of these four letter combinations can be arranged in 4! ways, i.e., 24 ways.
There are 6 distinct letters in Gondar. We have to choose four letters at a time and arrange them to form a word.Selection of four letters from the six, is the combination 6C4 = (6!)/(4! *2!) = 15.That is, we have 15 combinations of four letter words.Now each of these four letter combinations can be arranged in 4! ways, i.e., 24 ways.So, the total number of four letter words that can be formed using the letters of “Gondar” is 15*24, i.e., 360 words.
Answer:
And is 15 or 24 please mark me as the brainliest
Step-by-step explanation:
There are 360 of words like this and we have 15 combinations