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Question

A round table conference is to be held among 20 delegates belonging from 20 different countries. The number of ways they can be seated

A
without any restriction is 19!
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B
when there is atleast two persons between two particular delegates is 18×18!
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C
when two particular delegates should never sit opposite to each other is 19!
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D
when two particular delegates should always sit together is 2×18!
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Solution

The correct options are
A without any restriction is 19!
D when two particular delegates should always sit together is 2×18!
Number of ways to arrange n persons in circular table is (n1)! ways
Total ways without any restriction is (201)!=19!

When two particular delegates should always sit together:
Let the two particular delegates who wish to sit together be treated as one unit. So we have 19 delegates who can be arranged on a round table in (191)!=18! ways.
After this, the two particular delegates can be permuted between themselves in 2!=2 ways.
Hence, number of required arrangements is =2×18!.

When two particular delegates should sit opposite to each other:
Let first delegate select the seat, it can be done in 1 way (because it is circular table)
Now second delegate can select the seat in 1 way opposite to first delegate.
Now the remaining persons can be arranged in 18! ways.
Total number of required ways when two particular delegates should never sit opposite to each other =19!1×1×18!=18×18!

When there is exactly one person between two particular delegates:
Let the person be arranged in between two particular delegates in 18C1 ways.
The remaining arrangements can be done in (203+11)!=17! ways.
While two particular delegates can interchange among themselves.
Total ways are 18C1×2!×17!=2×18!
Total number of required ways when there is atleast two persons between two particular delegates is =19!2×2×18!=15×18!

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