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The word "immunology" consists of 11 letters, with the following counts of distinct letters: i (1), m (2), u (1), n (2), o (1), l (1), g (1), y (1). To find the number of distinct arrangements, we use the formula for permutations of multiset:
[ \frac{11!}{2! \times 2!} = \frac{39916800}{4} = 9979200. ]
Thus, there are 9,979,200 distinct ways to arrange the letters in "immunology."
What else can I help you with?
How many ways can the letters in square be arranged?
The letters of the word SQUARE can be arranged in 6! = 720 orders.
How many different ways can the letters of the word ARISE be arranged?
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How many ways can the letters in FACTOR be arranged so that the first and last letters are vowels?
48
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12
How many different ways can the letters of the word PRAISE be arranged?
720
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180
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How many distinct ways can the letters in the word Google be arranged?
6 x 5 x 4 x 3 x 2/2 = 360 distinct ways
How many ways can the letters of the word china be arranged?
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How many ways can the word immunology be arranged?
4: the two m and o can be swapped without affecting the spelling.
How many ways can 8 objects be arranged in a row?
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How many times can the word RANDOM be re-arranged?
The word "RANDOM" consists of 6 distinct letters. The number of ways to rearrange these letters is calculated by finding the factorial of the number of letters, which is 6! (6 factorial). Thus, the total number of rearrangements is 720.
How many distinct ways can the word DEEDS be arranged?
720
How many ways can the letters in glasses be arranged?
120
How many ways can the letters apple be arranged?
20
How many ways can 4 letters be arranged?
4! = 24, they can be arranged in 24 different ways
