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26 Aug 2015, 01:28
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
15%
(low)
Question Stats:
80% (01:35) correct
20%
(01:45)
wrong
based on 1217
sessions
History
Date
Time
Result
Not Attempted Yet
A group of people were given 2 puzzles. 79% people solved puzzle X and 89% people solved puzzle Y. What is the maximum and minimum percentage of people who could have solved both the puzzles?
(A) 11%, 0%
(B) 49%, 33%
(C) 68%, 57%
(D) 79%, 68%
(E) 89%, 79%
(A) 11%, 0%
(B) 49%, 33%
(C) 68%, 57%
(D) 79%, 68%
(E) 89%, 79%
26 Aug 2015, 03:35
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The maximum and minimum are establish through what's input for the neither variable. Below,
Total = Group1 + Group2 - Both + Neither
Maximum:
100 = 79 + 89 - Both + 11, where 11 is the lesser of the two not within a group.
Both = 79
Minimum:
100 = 79 + 89 - Both + 0, in that both of them had atleast one, puzzle x or puzzle y.
Both = 68
Therefore, D 79, 68
Total = Group1 + Group2 - Both + Neither
Maximum:
100 = 79 + 89 - Both + 11, where 11 is the lesser of the two not within a group.
Both = 79
Minimum:
100 = 79 + 89 - Both + 0, in that both of them had atleast one, puzzle x or puzzle y.
Both = 68
Therefore, D 79, 68
26 Aug 2015, 05:12
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Bunuel
To solve this question, we don't need any formulas. Just read the question carefully. If 79% of the people solved puzzle X and 89% solved puzzle Y, then maximum % that can solve both correctly can only be 79%. From the given options, only D looks good
Answer D
