120 ABCDE , there are 120 ways these five letters can be rearranged.
The nine letters in chocolate can be rearranged in 362,880 different ways.
120
There are 3360 ways.
You can arrange the letters in group One hundred and twenty-five different ways.
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120 ABCDE , there are 120 ways these five letters can be rearranged.
The nine letters in chocolate can be rearranged in 362,880 different ways.
There are 8 letters with no repeated letters and you are working out the number of combintaions of all 8 letters with respect to order so the answer is 8P8=8!=40320
120
The only nine letter word that can be spelled with the letters in 'marmalade' is MARMALADE.
The letter is the word "small" can be rearranged in 60 different ways.
To calculate the number of ways the letters in the word "pencil" can be rearranged, we first determine the total number of letters, which is 6. Since there are two repeated letters (the letter 'e'), we divide the total number of letters by the factorial of the number of times each repeated letter appears. This gives us 6! / 2! = 360 ways to rearrange the letters in the word "pencil."
10!/3!.3!.2!
Fix X then you are left with 10 letters, so you have 10! ways to arrange
If your asking how they can be rearranged then... There are 5 letters. 5 can go in the first spot then 4 in the second and 3 in the third 2 in the fourth spot and 1 in the fifth. 5*4*3*2*1 = 120
In how many distinct ways can the letters of the word MEDDLES be arranged?