(C) First,arrange the $9$ men around a circular table,which can be done in $(9-1)! = 8!$ ways.There are $9$ gaps created between the $9$ men.To ensure

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(C) First,arrange the $9$ men around a circular table,which can be done in $(9-1)! = 8!$ ways.There are $9$ gaps created between the $9$ men.To ensure no two women sit together,we must place the $5$ women in these $9$ gaps.The number of ways to arrange $5$ women in $9$ gaps is given by $^9 P_5$.Therefore,the total number of ways is $8! \times ^9 P_5$.

Class 11 Mathematics Permutation and Combination Circular permutations

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The number of ways of arranging $9$ men and $5$ women around a circular table so that no two women come together are

AP EAMCET 2024 All AP EAMCET

A
$8! \times ^8 P_5$
B
$9! \times ^9 P_5$
C
$8! \times ^9 P_5$
D
$8! \times 5!$

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The number of ways of arranging $9$ men and $5$ women around a circular table so that no two women come together are

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