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Question
In a playground, 3 sisters and 5 other girls are playing together. The number of ways in which all the girls be seated in a circular order so that the three sisters are not seated together is
In a playground, 3 sisters and 5 other girls are playing together. The number of ways in which all the girls be seated in a circular order so that the three sisters are not seated together is
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Solution
The correct option is C 4320
There are 3 sisters and 5 other girls in total of 8 girls. The number of ways to arrange these 8 girls in a circular manner =(8−1)!=7!.
The number of ways when sisters always come together in the arrangement =5!×3!.
(Consider three sisters as one unit)
Hence, the required number of ways in which the arrangement can take place if none of the 3 sisters are seated together
=7!−(5!×3!)=5040−(120×6)=5040−720=4320
There are 3 sisters and 5 other girls in total of 8 girls. The number of ways to arrange these 8 girls in a circular manner =(8−1)!=7!.
The number of ways when sisters always come together in the arrangement =5!×3!.
(Consider three sisters as one unit)
Hence, the required number of ways in which the arrangement can take place if none of the 3 sisters are seated together
=7!−(5!×3!)=5040−(120×6)=5040−720=4320
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