how many different words can be formed with the letters of the word SUPER such that the vowels always come together
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Hence, the total number of ways in which the letters of the 'SUPER' can be arranged such that vowels are always together are 4! * 2! = 48 ways.
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Answered by
4
Answer:
48 ways
Step-by-step explanation:
in order to find the number of permutations that can be formed where the two vowels U and E come together.
In these cases, we group the letters that should come together and consider that group as one letter.
So, the letters are S,P,R, (UE). Now the number of words are 4.
Therefore, the number of ways in which 4 letters can be arranged is 4!
In U and E, the number of ways in which U and E can be arranged is 2!
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