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D
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Difficulty:
75%
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Question Stats:
54% (02:17) correct
46%
(02:14)
wrong
based on 525
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3 persons (1 couple and 1 single) are seated at random in a row of 5 chairs. What is the probability that the couple does not sit together?
A. 5/7
B. 4/5
C. 2/5
D. 3/5
E. 11/18
A. 5/7
B. 4/5
C. 2/5
D. 3/5
E. 11/18
20 Apr 2012, 23:39
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keiraria
Let's find the probability that a couple sits together (right next to each other) and subtract that value from 1.
Total # of ways 3 persons \(C_1\), \(C_2\) and \(S\) to be seated in a row of 5 seats is \(\frac{5!}{2!}=60\). Consider this, we are interested in arrangement of \(C_1, \ C_2, \ S, \ E, \ E\), so in arrangement of 5 letters out of which 2 E's are identical (E denotes an empty seat);
# of ways for a couple to sit together is \(\frac{4!}{2!}*2=24\). Consider a couple as a single unit: \(\{C_1,C_2\}, \ S, \ E, \ E\), so we have total of 4 units out of which 2 E's are identical, # of arrangement of these units is \(\frac{4!}{2!}\), but \(C_1\), \(C_2\) within their unit can be arranged in 2 ways (\(\{C_1,C_2\}\) or \(\{C_2,C_1\}\)), so total # of arrangement for this case is \(\frac{4!}{2!}*2=24\);
\(P=1-\frac{24}{60}=\frac{3}{5}\).
Answer: D.
General Discussion
28 Dec 2012, 19:42
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keiraria
Given: {H} {W} {S} will attempt to seat on _ _ _ _ _ seats
How many ways for {H} {W} {S} to seat on _ _ _ _ _ seats? 5*4*3
How many ways for {HW} {S} to seat together on _ _ _ _ _ seats? 4*3 Then multiply by 2 to account for the arrangement of HW. 4*3*2!
What is the probability of {H}{W} NOT seating together? \(=1 - \frac{4*3*2}{5*4*3} = 1 - \frac{2}{5} = 3/5\)
Answer: D
