ANSWER
There are 210 different permutations
EXPLANATION
The word 'ALFALFA' has 7 letters.
The letter 'A' repeats three times.
The letter 'F' repeats two times.
The letter 'L' also repeats two times.
The number of different permutation is
[tex] \frac{7!}{3!2!2!} = 210[/tex]
There are 210 different permutations.
Answer: There are 210 distinct permutations of the letter of that word.
Step-by-step explanation:
Since we have given that
ALFALFA
Here, 3 A,
2 F,
2 L
Number of letters in that word = 7
So, Number of distinct permutations of the letters of the word "ALFALFA":
[tex]\dfrac{7!}{3!\times 2!\times 2!}\\\\=210[/tex]
Hence, there are 210 distinct permutations of the letter of that word.
