There is insufficient information for us to even begin to understand this question. Please edit the question to include more context or relevant information. You have not specified which word you want: french or corner.
You can arrange the letters in group One hundred and twenty-five different ways.
Since you didn't say they had to spell anything there are 720 possibilities.
In the word "function" you have 8 letters. 6 different letters and 2 equal letters.The number of different arrangements that are possible to get are:6!∙8C2 = 720∙(28) = 20 160 different arrangements.
4 letters, 2 sylables. The word is "Noël".
there should be 720 ways !
We can rearrange the letters in tattoo 60 times.
Banana
4! = 24 ways.
there should be 720 ways !
The number of permutations of the letters PENCIL is 6 factorial, or 720.
25 times. 5 letters. 5 x 5 = 25.
You can arrange the letters in group One hundred and twenty-five different ways.
5!/(2!*2!) = 30 ways.
This is how you do it, there are 7 letters in average so it would be, 7x6x5x4x3x2x1.
Make notes that:There are 2 c's in the given word.There are 2 o's in the given word.Since repetition is restricted when rearranging the letters, we need to divide the total number of ways of rearranging the letters by 2!2!. Since there are 9 letters in the word to rearrange, we have 9!. Therefore, there are 9!/(2!2!) ways to rearrange the letters of the word 'chocolate'.
24 ways
"Colonialist" has 11 letters, including 3 pairs of matching letters, so the letters can be arranged in: 11! / (2! * 2! * 2!) = 4,989,600 ways.