The number of ways that the letter of the word Canada can be arranged is simply the number of permutations of 6 things taken 6 at a time, which is 6 factorial, or 720. However, since the letter A is repeated twice, the number is distinct permutations is a factor of 4 less than that, or 180.
The number of different ways the letters of a word can be arranged, when all the letters are different, is the same as the number of permutations of those letters. In this case, the answer is 5!, or 120.
In how many distinct ways can the letters of the word MEDDLES be arranged?
Tiffany
34,650
194,594,400
They can't be arranged in a million different ways!
The number of different ways the letters of a word can be arranged, when all the letters are different, is the same as the number of permutations of those letters. In this case, the answer is 5!, or 120.
4! = 24, they can be arranged in 24 different ways
raisesiresrises------------------------------------They can be arranged in 5!=120 ways.
There are 45360 ways.
10080
5040
720
720
24 different ways....
There are 40320 ways.
They can be rearranged in 16 different ways.