Twelve persons are to be arranged around two round tables such that one table can accommodate seven persons and another five persons only. Answer the following questions.
Number of ways of arrangements if two particular persons A and B do not want to be on the same table is
A
10C46!4!
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B
2˙10C46!4!
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C
11C66!4!
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D
None of these
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Solution
The correct option is B2˙10C46!4! Here, A can sit on first table and B on the second or A on second table and B on the second table. If A is on the first table, then remaining six for first table can be selected in 10C6 ways. Now these seven persons can be arranged in 6! ways. Remaining five can be arranged on the other table in 4! ways. Hence, total number of ways is 210C66!4!.