Statement 1: the number of ways in which...

Statement 1: the number of ways in which `n` persons can be seated at a round table, so that all shall not have the same neighbours in any two arrangements is `(n-1)!//2.` Statement 2: number of ways of arranging `n` different beads in circles is `(n-1)!//2.`

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Find the number of ways in which six persons can be seated at a round table, so that all shall not have the same neighbours n any two arrangements.

Find the number of ways in which six persons can be seated at a round table, so that all shall not have the same neighbours n any two arrangements.

Find the number of ways in which six persons can be seated at a round table, so that all shall not have the same neighbours n any two arrangements.

Find the number of ways in which six persons can be seated at a round table, so that all shall not have the same neighbours n any two arrangements.

Find the number of ways in which six persons can be seated at a round table,so that all shall not have the same neighbours n any two arrangements.

The number of ways in which four persons be seated at a round table, so that all shall not have the same neighbours in any two arrangements,is

The number of ways in which four persons be seated at a round table, so that all shall not have the same neighbours in any two arrangements,is

The number of ways in which four persons be seated at a round table, so that all shall not have the same neighbours in any two arrangements,is

The number of ways in which four persons be seated at a round table, so that all shall not have the same neighbours in any two arrangements,is

The number of ways in which four persons be seated at a round table, so that all shall not have the same neighbours in any two arrangements,is

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