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28 Apr 2020, 05:04
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62% (02:24) correct
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The table shows the number of people who responded “yes” or “no” or “don't know” when asked whether their city council should implement environmental programs X and Y. If a total of 1,000 people responded to the question about both programs, what was the number of people who did not respond “yes” to implementing either of the two programs?
(1) The number of people who responded “yes” to implementing only Program X was 300.
(2) The number of people who responded “no” to implementing Program X and “no” to implementing Program Y was 100.
ID: 700282
DS17700.02
Attachment:
2020-04-30_1919.png [ 9.59 KiB | Viewed 43131 times ]
jvdunn26
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GMAT 1: 730 Q48 V42
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WE:Consulting (Consulting)
11 Jul 2020, 12:14
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“What was the number of people who did not respond “yes” to implementing either of the two programs?
The key to understand here is that “did not respond ‘yes’” is the same as “responded ‘no’ or 'don’t know'”. The two outcomes can be grouped together and the problem can be solved with a matrix. Using the information in the question stem, set up the matrix as shown in the first table below.
(1) The number of people who responded “yes” to implementing only Program X was 300.
This is sufficient. It tells us that 300 people voted “yes” to Program X and also “no” or “don’t know” to Program Y. Because a total of 700 people voted “no” or “don’t know” for Program Y, 400 must have voted “no” or “don’t know” for both X and Y.
(2) The number of people who responded “no” to implementing Program X and “no” to implementing Program Y was 100.
This is not sufficient. Because “no” and “don’t know” should be treated as the same, both must be included to give us a value for our matrix.
Answer: A
The key to understand here is that “did not respond ‘yes’” is the same as “responded ‘no’ or 'don’t know'”. The two outcomes can be grouped together and the problem can be solved with a matrix. Using the information in the question stem, set up the matrix as shown in the first table below.
(1) The number of people who responded “yes” to implementing only Program X was 300.
This is sufficient. It tells us that 300 people voted “yes” to Program X and also “no” or “don’t know” to Program Y. Because a total of 700 people voted “no” or “don’t know” for Program Y, 400 must have voted “no” or “don’t know” for both X and Y.
(2) The number of people who responded “no” to implementing Program X and “no” to implementing Program Y was 100.
This is not sufficient. Because “no” and “don’t know” should be treated as the same, both must be included to give us a value for our matrix.
Answer: A
Attachments
DS17700.02.JPG [ 52.32 KiB | Viewed 39470 times ]
Harsh2111s
13 May 2020, 09:52
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Quote:
Let's look at option A
Number of people responded yes only to X=300
Thus Number of people responded to both X and Y =100 (as per table, total 400 people responded for X)
And number of people responded only to Y=200(as per table,total 300 people responded for Y)
Hence total number who did not responded yes to either X or Y= 1000-(300+100+200)=400
Option A sufficient.
Let's look at option B.
he number of people who responded “no” to implementing Program X and “no” to implementing Program Y was 100
Thus
Number of people responded "NO" to only X=100 (as per table, people who responded NO to X is 200)
Number of people responded "NO" to only Y=250(as per table, people who responded NO to Y is 350)
Now here problem is if want to find number who did not responded yes to either X or Y then we also need to know how many individual answered did not know to each X and Y.
Hence option B is insufficient.
I hope it helps
Attachments
2020-04-30_1919.png [ 9.15 KiB | Viewed 37948 times ]
