What is the number of words that can be formed from the letter of word universal the vowels remaining always together?

How many words can be formed with the letters of the word 'UNIVERSITY', the vowels remaining together?

The word UNIVERSITY consists of 10 letters that include four vowels of which two are same.
Thus, the vowels  can be arranged amongst themselves in

\[\frac{4!}{2!}\]ways.Keeping the vowels as a single entity, we are left with 7 letters, which can be arranged in 7! ways.By fundamental principle of counting, we get,

Number of words =  7!\[\times\]\[\frac{4!}{2!}\] = 60480

Concept: Factorial N (N!) Permutations and Combinations

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