The word "banana" consists of 6 letters, with the letter "a" appearing 3 times, "n" appearing 2 times, and "b" appearing once. To find the number of unique arrangements, you can use the formula for permutations of multiset: ( \frac{n!}{n_1! \times n_2! \times n_3!} ), where ( n ) is the total number of letters, and ( n_1, n_2, n_3 ) are the counts of each distinct letter. This gives ( \frac{6!}{3! \times 2! \times 1!} = 60 ) unique arrangements of the letters in "banana."
The word "DECAGON" has 7 letters, with the letter "A" appearing once, "C" appearing once, "D" appearing once, "E" appearing once, "G" appearing once, "N" appearing once, and "O" appearing once. To find the number of different 4-letter permutations, we need to consider combinations of these letters. Since all letters are unique, the number of 4-letter permutations is calculated using the formula for permutations of n distinct objects taken r at a time: ( P(n, r) = \frac{n!}{(n-r)!} ). Here, ( n = 7 ) and ( r = 4 ), so the number of permutations is ( P(7, 4) = \frac{7!}{(7-4)!} = \frac{7!}{3!} = 7 \times 6 \times 5 \times 4 = 840 ). Thus, there are 840 different 4-letter permutations that can be formed from the letters in "DECAGON."
Powers are how many times you multiply a number by itself. Three squared (or three to the second power) is the same as 3 times 3. Three to the third power is the same as 3 times 3 times 3. This can continue forever. For the record, three to the third power is equal to 27.
Words that contain the letter "a" three times include "banana," "anagram," and "alabama." Each of these words features the letter "a" repeated three times in various positions. If you need more examples or specific types of words, please let me know!
27
australia, antarctica,albania,
The word "banana" consists of 6 letters, with the letter "a" appearing 3 times, "n" appearing 2 times, and "b" appearing once. To find the number of unique arrangements, you can use the formula for permutations of multiset: ( \frac{n!}{n_1! \times n_2! \times n_3!} ), where ( n ) is the total number of letters, and ( n_1, n_2, n_3 ) are the counts of each distinct letter. This gives ( \frac{6!}{3! \times 2! \times 1!} = 60 ) unique arrangements of the letters in "banana."
The word "DECAGON" has 7 letters, with the letter "A" appearing once, "C" appearing once, "D" appearing once, "E" appearing once, "G" appearing once, "N" appearing once, and "O" appearing once. To find the number of different 4-letter permutations, we need to consider combinations of these letters. Since all letters are unique, the number of 4-letter permutations is calculated using the formula for permutations of n distinct objects taken r at a time: ( P(n, r) = \frac{n!}{(n-r)!} ). Here, ( n = 7 ) and ( r = 4 ), so the number of permutations is ( P(7, 4) = \frac{7!}{(7-4)!} = \frac{7!}{3!} = 7 \times 6 \times 5 \times 4 = 840 ). Thus, there are 840 different 4-letter permutations that can be formed from the letters in "DECAGON."
Afghanistan, Albania, Antigua and Barbuda, Australia, Azerbaijan, The Bahamas, Bosnia and Herzegovina, Canada, Central African Republic, Equatorial Guinea, Guatemala, Jamaica, Kazakhstan, Madagascar, Malaysia, Marshall Islands, Mauritania, Nicaragua, Panama, Papua New Guinea, Paraguay, Saudi Arabia, Saint Vincent and the Grenadines, Tanzania, Trinidad and Tobago, United Arab Emirates
The word "tattletale" contains the letter T three times.
Afghanistan, Albania, Antigua and Barbuda, Australia, Azerbaijan, The Bahamas, Bosnia and Herzegovina, Canada, Central African Republic, Equatorial Guinea, Guatemala, Jamaica, Kazakhstan, Madagascar, Malaysia, Marshall Islands, Mauritania, Nicaragua, Panama, Papua New Guinea, Paraguay, Saudi Arabia, Saint Vincent and the Grenadines, Tanzania, Trinidad and Tobago, United Arab Emirates
good times=fun
eerie, geese
goggles
Remember
Powers are how many times you multiply a number by itself. Three squared (or three to the second power) is the same as 3 times 3. Three to the third power is the same as 3 times 3 times 3. This can continue forever. For the record, three to the third power is equal to 27.
That's an unusual question.