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Question
A word has 8 consonants and 3 vowels. How many distinct words can be formed if 4 consonants and 2 vowels are chosen?
Solution
4 consonants can be selected from 8 consonants in 8C4 ways and 2 vowels can be selected from 3 vowels in 3C2 ways.
∴ the number of words with 4 consonants and 2 vowels = 8C4 × 3C2
= `(8!)/(4!4!) xx (3!)/(2!1!)`
= `(8 xx 7 xx 6 xx 5)/(4 xx 3 xx 2 xx 1) xx (3 xx 2!)/(2!)`
= 70 × 3
= 210
Now each of these words contains 6 letters which can be arranged in 6P6 = 6! ways.
∴ the total number of words that can be formed with 4 consonants and 2 vowels
= 210 × 6!
= 210 × 6 × 5 × 4 × 3 × 2 × 1
= 151200.
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