In how many different ways can the letters of the word 'CORPORATION' be arranged so that the vowels always come together?
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A50400
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B100800
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C25200
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D75600
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E5760
Answer
Correct Answer: 50400
Explanation
Problem restatementArrange 'CORPORATION' with all vowels in a single block. Account carefully for repeated letters.
Given data
- Letters (11 total): C(1), O(3), R(2), P(1), A(1), T(1), I(1), N(1).
- Vowels: O, O, O, A, I (5 vowels, with O repeated 3 times).
- Consonants: C, R, R, P, T, N (6 letters, with R repeated 2 times).
Concept/ApproachTreat the 5 vowels as a single block [V]. First, arrange the 7 items: [V] plus the 6 consonants (with R repeated). Then multiply by the internal arrangements of the vowels (with 3 O's repeated).
Step-by-step calculation Arrange 7 items: [V], C, R, R, P, T, N ⇒ 7! / 2! (for the two R's) = 5040 / 2 = 2520 Arrange vowels inside [V]: 5! / 3! (for three O's) = 120 / 6 = 20 Total arrangements = 2520 × 20 = 50400
Verification/AlternativeCheck counts: total letters 11; grouping vowels reduces to 7 items; duplicated R's and O's appropriately handled by dividing by factorials of repeats.
Common pitfalls
- Forgetting to divide by 2! for the two R's in the outer arrangement.
- Forgetting to divide by 3! for the three O's inside the vowel block.
Final Answer50400