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23 Sep 2024, 06:49
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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:
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Question Stats:
57% (01:49) correct
43%
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wrong
based on 195
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In a room there are 5 couples, in how many ways two men and two women can be selected such that exactly one couple is selected?
A. 30
B. 50
C. 60
D. 90
E. 120
A. 30
B. 50
C. 60
D. 90
E. 120
First, let us choose one couple out of the five to have exactly 1 man and 1 woman chosen.
This can be done in 5C1 ways, which is equal to 5.
Next, choose 1 man from the remaining 4 couples in 4C1 ways.
Next, choose exactly 1 woman from the remaining 3 couples in 3C1 ways.
Thus, the total number of ways of choosing two men and two women such that exactly one couple is selected = 5C1*4C1*3C1 = 60 ways.
So, C is the correct choice.
Note that we could also have first chosen a woman (5C1), then a man (4C1) and finally a couple (3C1) and our answer would still be the same. This is because here the order of choosing an individual or a pair is immaterial.
This can be done in 5C1 ways, which is equal to 5.
Next, choose 1 man from the remaining 4 couples in 4C1 ways.
Next, choose exactly 1 woman from the remaining 3 couples in 3C1 ways.
Thus, the total number of ways of choosing two men and two women such that exactly one couple is selected = 5C1*4C1*3C1 = 60 ways.
So, C is the correct choice.
Note that we could also have first chosen a woman (5C1), then a man (4C1) and finally a couple (3C1) and our answer would still be the same. This is because here the order of choosing an individual or a pair is immaterial.
23 Sep 2024, 12:14
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We can choose any one couple out of 5, so 5C1
From remaining 4 couples, we can choose a man in 4C1 ways.
A woman can not be chosen in 4C1 as she might be the wife of the man selected and we will get a second couple. So, we can choose a women in 3C1 ways.
Total number of ways of choosing 2 man & 2 women such that exactly one couple is selected= 5C1*4C1*3C1
= 5*4*3
=60 ways
ANSWER: C
Posted from my mobile device
From remaining 4 couples, we can choose a man in 4C1 ways.
A woman can not be chosen in 4C1 as she might be the wife of the man selected and we will get a second couple. So, we can choose a women in 3C1 ways.
Total number of ways of choosing 2 man & 2 women such that exactly one couple is selected= 5C1*4C1*3C1
= 5*4*3
=60 ways
ANSWER: C
Posted from my mobile device
