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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