The number of ways in which the letters of the word TRIANGLE can be arranged such that two vowels do not occur together is

1200

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2400

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14400

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1440

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Solution

The correct option is C
14400

$\circ T \circ R \circ N \circ G \circ L \circ$

Three vowels can be arrange at 6 places in $^{6} P_{3}$ = 120 ways. Hence the required number of arrangements = $120 \times 5!$ =14400.

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The number of ways in which the letters of the word TRIANGLE can be arranged such that two vowels do not occur together is

The number of ways in which the letters of the word $TRIANGLE$ can be arranged such that two vowels do not occur together is?

^{'} A E R O P L A N E^{'}

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