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21 Sep 2020, 04:00
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
65% (01:56) correct
35%
(02:12)
wrong
based on 516
sessions
History
Date
Time
Result
Not Attempted Yet
In a class, 60% of students play soccer or basketball. If 10% play both sports and 60% do not play soccer, what is the probability that a student chosen at random from the class plays neither soccer nor basketball?
A. 0.3
B. 0.4
C. 0.5
D. 0.6
E. 0.7
A. 0.3
B. 0.4
C. 0.5
D. 0.6
E. 0.7
16 Nov 2020, 14:21
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Bunuel
If 60% of the students play soccer or basketball, then the other 40% play neither soccer nor basketball.
So, P(selected students plays neither soccer nor basketball) = 40% = 0.4
Answer: B
Not convinced? Think of it this way:
There are 100 people in a room.
When I say, "raise your hand if you play soccer or basketball," 60 people raise their hand.
What does this say about the 40 students who aren't raising their hands?
It tells us that those 40 people play neither soccer nor basketball.
ASIDE: Some students might believe that " people who play soccer or basketball" does not include those who play both sports.
This belief is incorrect. On the GMAT, the word OR is inclusive, which means people who play both soccer and basketball would also raise their hand.
General Discussion
Fighter1095
GRE 1: Q167 V162
Posts: 132
21 Sep 2020, 04:10
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S. Not s total
B 0.1. 0.2. 0.3
NotB 0.3. 0.4. 0.7
Tot 0.4 0.6. 1
P = (f/T)
P(neither) = (0.4)/1 = 0.4
Posted from my mobile device
B 0.1. 0.2. 0.3
NotB 0.3. 0.4. 0.7
Tot 0.4 0.6. 1
P = (f/T)
P(neither) = (0.4)/1 = 0.4
Posted from my mobile device
