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21 Jan 2018, 03:25
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
(medium)
Question Stats:
64% (01:10) correct
36%
(01:21)
wrong
based on 287
sessions
History
Date
Time
Result
Not Attempted Yet
In how many ways can Ann, Bea, Cam, Don, Ella and Fey be seated if Ann and Bea cannot be seated next to each other?
(A) 240
(B) 360
(C) 480
(D) 600
(E) 720
(A) 240
(B) 360
(C) 480
(D) 600
(E) 720
30 Jan 2018, 00:40
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Jannnn04
In how many ways can Ann, Bea, Cam, Don, Ella and Fey be seated if Ann and Bea cannot be seated next to each other?
(A) 240
(B) 360
(C) 480
(D) 600
(E) 720
6 people (Ann, Bea, Cam, Don, Ella and Fey) without any restriction can be seated in a row in 6! ways.
Now, consider as one unit {Ann, Bea}. We'll have 5 units: {Ann, Bea}; {Cam}; {Don}; {Ella} and {Fey}. These 5 units can be arranged in 5! ways. Ann and Bea within their unit can be arranged in two ways: {Ann, Bea} or {Bea, Ann}. So, the number of ways to arrange 6 people so that two of them, {Ann, Bea}, ARE together is 5!*2.
Finally, if we subtract the number of arrangements where Ann and Bea are together from total number of arrangements, we'll get the number of arrangements where Ann and Bea are NOT together: 6! - 5!*2 = 480.
Answer: C.
General Discussion
globaldesi
Joined: 28 Jul 2016
Last visit: 23 Feb 2026
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Concentration: Finance, Human Resources
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21 Jan 2018, 04:59
Kudos
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C should be.
Total - AB sit together
total =6!
AB sit together = 2*5!
hence 6!-2*5!= 5!(6-2)= 120*4 = 480
Total - AB sit together
total =6!
AB sit together = 2*5!
hence 6!-2*5!= 5!(6-2)= 120*4 = 480
