A marketing class of a college has a total strength of 30. It has formed three groups: G1, G2, and G3, which have 10, 10, and 6 students, respectively. If no student of G1 is on either of the other two groups, what is the greatest possible number of students who are on none of the groups?
(A) 6
(B) 7
(C) 8
(D) 10
(E) 14
OA D
A marketing class of a college
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Number of students on the committee G1 = 10.stevecultt wrote:A marketing class of a college has a total strength of 30. It has formed three groups: G1, G2, and G3, which have 10, 10, and 6 students, respectively. If no student of G1 is on either of the other two groups, what is the greatest possible number of students who are on none of the groups?
(A) 6
(B) 7
(C) 8
(D) 10
(E) 14
OA D
As no member of G1 is on either of the other two groups, the above 10 students belong to only G1.
However, there may be an overlap with the students of G2 and G3.
Number of students on G2 = 10.
Number of students on G3 = 6.
We get the greatest number of students who would not be in any of the groups if there is the maximum overlap between the students of G2 and G3.
So let's assume that all the 6 students in G3 are in G2 group too, thus the minimum number of students in all the groups = 10 + 10 + 6 - 6 = 20.
=> There are 30 - 20 = 10 = Maximum students who are in no groups.
The correct answer: D
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Of the 30 total students, none of the 10 students in G1 is in G2 or G3.stevecultt wrote:A marketing class of a college has a total strength of 30. It has formed three groups: G1, G2, and G3, which have 10, 10, and 6 students, respectively. If no student of G1 is on either of the other two groups, what is the greatest possible number of students who are on none of the groups?
(A) 6
(B) 7
(C) 8
(D) 10
(E) 14
Thus:
Total number of students in G1, G2 or both = (total number of students) - (students in G1) = 30-10 = 20.
For the remaining 20 students, we can use a DOUBLE-MATRIX.
Total remaining students =20.
Total in G2 = 10.
Total in G3 = 6.
The following matrix is yielded:
Completing the bottom row and the rightmost column, we get:
To maximize the number of students in none of the 3 groups, we must maximize the value of the CENTER BOX: the number of students in NEITHER G2 NOR G3.
The value of the center box cannot be greater than the total of the center column (the blue 10) or the total of the middle row (the blue 14 ).
Thus, the greatest possible value for the center box is 10, yielding the following matrix:
As the matrix illustrates, the greatest number of students who can be in neither G2 nor G3 = 10.
Since none of these 10 students is in G1, the greatest number of students who can be in NONE of the three groups = 10.
The correct answer is D.
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Hi stevecultt,
Both Jay and Mitch have provided great explanations for this question, so I won't rehash any of that here. Instead, I'd like to know the source of this question. I ask because it's poorly worded - and if the original source is presenting GMAT material in this way, then you might want to consider working with material that better matches the design/style of what you'll see on Test Day.
GMAT assassins aren't born, they're made,
Rich
Both Jay and Mitch have provided great explanations for this question, so I won't rehash any of that here. Instead, I'd like to know the source of this question. I ask because it's poorly worded - and if the original source is presenting GMAT material in this way, then you might want to consider working with material that better matches the design/style of what you'll see on Test Day.
GMAT assassins aren't born, they're made,
Rich
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Since the 10 students in G1 don't belong to either of the other two groups, we can remove them from the total of 30 students. Thus, we have 20 students who belong to G2 and/or G3 and neither of these two groups. We can use the following formula:stevecultt wrote:A marketing class of a college has a total strength of 30. It has formed three groups: G1, G2, and G3, which have 10, 10, and 6 students, respectively. If no student of G1 is on either of the other two groups, what is the greatest possible number of students who are on none of the groups?
(A) 6
(B) 7
(C) 8
(D) 10
(E) 14
20 = #(G2) + #(G3) - #(G2 and G3) + #(neither)
Since we want to maximize #(neither), we want to maximize #(G2 and G3) also. However, #(G2 and G3) is the number of students who belong to both G2 and G3, so it can't be more than the lesser of the number of students in G2 or G3, which is 6. So let's say #(G2 and G3) = 6:
20 = 10 + 6 - 6 + #(neither)
20 = 10 + #(neither)
10 = #(neither)
Since we already excluded the 10 students in G1, not only is #(neither) the number of students in neither G2 nor G3, it's also the number of students in none of the three groups.
Answer: D