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23 May 2023, 11:44
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
(medium)
Question Stats:
78% (02:42) correct
22%
(03:11)
wrong
based on 96
sessions
History
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Time
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Not Attempted Yet
In an examination 43% passed in Math, 52% passed in Physics and 52% passed in Chemistry. Only 8% students passed in all the three. 14% passed in Math and Physics and 21% passed in Math and Chemistry and 20% passed in Physics and Chemistry. Number of students who took the exam is 200. Let Set P, Set C and Set M denotes the students who passed in Physics, Chemistry and Math respectively. Then How many students passed in Math only?
A. 32
B. 42
C. 45
D. 52
E. 56
A. 32
B. 42
C. 45
D. 52
E. 56
23 May 2023, 15:51
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Bunuel
We can plot the information on a Venn diagram as shown below -
Attachment:
Screenshot 2023-05-24 041906.jpg [ 26.31 KiB | Viewed 33613 times ]
Only Math = 16%
\(\frac{16}{100} * 200 = 32\)
Option A
23 May 2023, 17:09
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I have to say that the sentence about assigning variables to the three classes seems un-GMAT™-like, but hey, I am (mostly) a rule respecter, so I used a Venn Diagram method similar to the one in the post above, only I converted all the percentages to students upfront.
Attachment:
Screen Shot 2023-05-23 at 19.29.28.png [ 63.86 KiB | Viewed 31034 times ]
Once you have removed any non-participants, work from the center, the green region, first if possible to avoid extra counting later. If 8% [of 200 students] passed all subjects, then there are 16 students in this region.
Next, write in as much information about the other areas of overlap, the blue regions above, being careful not to count the students already in the center. If 14% passed in Math and Physics, then 28 students passed both. However, 16 of these students were already counted, so only 12 remain. Then, if 21% passed in Math and Chemistry, 42 students passed both. Again, 16 of these students were already counted, so only 26 remain. Finally, if 20% passed in Physics and Chemistry, then 40 students passed both, and by now, we ought to know that 24 passed these two subjects without passing Math.
Finally, since we are not interested in any remaining area other than the students [who] passed in Math only, we can turn our attention to the orange region. If 43% [of students] passed in Math, then 86 students passed, and we can subtract the other areas within the Math circle that have already been filled out to get our answer, as shown above.
If you wanted to make sure your answer was correct, you could quickly figure out the numbers for the other missing areas and add everything up. If the sum was 200, you would have to be correct.
I know there is a formula you can memorize to solve these questions, but in general, I find an analytical and organized approach much more intuitive and much less error-prone.
Good luck with your studies.
- Andrew
