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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
53% (03:25) correct
47%
(03:20)
wrong
based on 496
sessions
History
Date
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A group of Republicans and Democrats was surveyed and each member was asked whether they liked apple pies or éclairs. 80% of the Republicans liked apple pie, 55% of the Democrats liked eclairs, and 20% of the Republicans who liked apple pie also liked eclairs. If the number of Republicans who liked both desserts is equal to the number of Democrats who liked éclairs, what is one possible value for the number of members of the group?
A. 81
B. 88
C. 160
D. 550
E. 710
A. 81
B. 88
C. 160
D. 550
E. 710
28 Jul 2015, 15:11
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emmak
Little shortcut to this task
Republicans who like both products: \(80\%*20\% = 16\%\) and this number equal to Democrats who like eclairs \(=55\%\) so
\(0.16R=0.55D\) --> \(16R=55D\) --> \(\frac{16}{55}=\frac{D}{R}\)
After this part we don't need any further calculations because from this ratio we can infer that common number of Democrats + Republicans will be multiple of 71 (16+55=71)
and only answer E is multiple of 71.
25 Feb 2013, 06:10
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emmak
Let the number of republicans be 100x and that of the democrats be 100y. Now, we are given that 80x like apple pies. Again, 16x like both apple pie and eclairs amongst the republicans.
Also, 55y like eclairs amongst the democrats.
Also given that 16x = 55y
Thus, the total number of people in the group =\(100x+100y = 100(x+y) = 100*y*(\frac{55}{16}+1) = 100*y*(\frac{71}{16})\)
Now, the number of people has to be an integer.Also, as 71 and 16 are co-primes, thus 100y has to be a multiple of 16. Thus, 100y = 16k, where k is a non negative integer.
Thus, the total number of people = 100(x+y) = \(16k*\frac{71}{16}\) = 71k. From the given options, for k=10, option E matches.
E.
