The number of words (with or without meaning) that can be formed from all the letters of the word “LETTER” in which vowels never come together is

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Solution

Find all the possible scenarios where vowels come together and subtract it from the total words possible
The word LETTER has $6$ alphabets of which $2$ are repeated twice.
The total number of $6$ letter words $= \frac{6!}{2! 2!} = \frac{6 \times 5 \times 4 \times 3 \times 2}{2 \times 2}$
$= 180$ words
There are $2$ vowels in the word LETTER, that is, (EE).
If EE are assumed to be together they can be arranged in $\frac{5!}{2!}$ ways.
So, the words where vowels are together are $\frac{5!}{2!} = \frac{120}{2} = 60$
Thus, the total number of words where vowels are not together $= 180 - 60 = 120$
Hence, there are $120$ words formed from the word LETTER where no vowels are together.

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