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There are 68 children in the cafeteria of a school and all of the chil 31 Mar 2017, 03:54
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There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria. If 18 children did at least 2 of these things, how many children did exactly two of these things?

A. 3
B. 6
C. 9
D. 13
E. 15
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E
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There are 68 children in the cafeteria of a school and all of the chil 13 Apr 2017, 22:08
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There are 68 children in the cafeteria of a school and all of the chil 10 Aug 2018, 18:39
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Bunuel
There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria. If 18 children did at least 2 of these things, how many children did exactly two of these things?

A. 3
B. 6
C. 9
D. 13
E. 15
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We can use the following formula:

Total = n(L) + n(D) + n(F) - n(exactly two) - 2 * n(all three) + n(none)

68 = 34 + 23 + 32 - x - 2 * (18 - x) + 0 [Note: n(all three) = n(at least two) - n(exactly two)]

68 = 89 - x - 36 + 2x

68 = 53 + x

x = 15

Answer: E
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There are 68 children in the cafeteria of a school and all of the chil 01 Apr 2017, 09:07
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There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria. If 18 children did at least 2 of these things, how many children did exactly two of these things?

A. 3
B. 6
C. 9
D. 13
E. 15

34 - Home lunch
34 - No home lunch

Scenario 1:
Out of 34 without Home lunch, lets say 32 with fruit from cafeteria & remaining 2 out of 23 drink from cafeteria. Therefore, 34 home lunch includes 21 with drink from cafeteria. Therefore, atleast 2 will be 34-21=13.

Scenario 2:
Out of 34 without Home lunch, lets say 23 with drink from cafeteria & remaining 11 out of 32 fruit from cafeteria. Therefore, 34 home lunch includes 21 with fruit from cafeteria. Therefore, atleast 2 will be 34-21=13.

Hence, answer is 13 (D).
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There are 68 children in the cafeteria of a school and all of the chil 13 Apr 2017, 11:40
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As per the question stem total number of children having only one type of meal and having at least two meals would be equal to 50 and 18 respectively. Now, 50 =(34+23+32)-2(at least two)- all three and that implies all three = 3. Subsequently, only two = 18-3 =15 (AT LEAST TWO = ONLY 2 + ALL 3)
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There are 68 children in the cafeteria of a school and all of the chil 13 Apr 2017, 11:45
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34+23+32=89
89-68=21
21-18=3
So there are 3 children doing all 3 things
Leaves us with 21-(3×2)=15 children doing exactly 2 things

E

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There are 68 children in the cafeteria of a school and all of the chil 01 Aug 2018, 05:17
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So, this is a three set venn diagrm question
Let students with lunches = A
Let students with Drinks = B
Let students with Fruit= C

Using a nice formula (Which you can easily derive) :
Total = [A+B+C] - [sum of 2-group overlaps] + all three common + Neither

Here we are told that "18 children did at least 2 of these things" which mean the SUM common area of two and three overlaps is 18.
This includes AnB, BnC, AnC which is the combination of three 'two-set' overlap area and one 'three-set' overlap area.
Let 'center(three-set overlap area)' be x
So putting numbers in the formula we get : 68=[34+23+32] - 18 + x + 0
x=3

So, only two set overlap area = number of children did exactly two of these things = 18-3 = 15
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There are 68 children in the cafeteria of a school and all of the chil 15 Aug 2018, 04:08
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So, this is a three set venn diagrm question
Let students with lunches = A
Let students with Drinks = B
Let students with Fruit= C

Using a nice formula (Which you can easily derive) :
Total = [A+B+C] - [sum of 2-group overlaps] + all three common + Neither

Here we are told that "18 children did at least 2 of these things" which mean the SUM common area of two and three overlaps is 18.
This includes AnB, BnC, AnC which is the combination of three 'two-set' overlap area and one 'three-set' overlap area.
Let 'center(three-set overlap area)' be x
So putting numbers in the formula we get : 68=[34+23+32] - 18 + x + 0
x=3

So, only two set overlap area = number of children did exactly two of these things = 18-3 = 15
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Using the above calculations the value of x is x=-3. @bunnel: Are we supposed to take the positive value in this case? Please help.
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There are 68 children in the cafeteria of a school and all of the chil 12 Dec 2019, 04:55
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Bunuel
There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria. If 18 children did at least 2 of these things, how many children did exactly two of these things?

A. 3
B. 6
C. 9
D. 13
E. 15
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All 68 children had atleast one thing - homelunch, drink, fruit

There are 34 + 23 + 32 = 89 instances of these three things in all.
18 children had at least two so 18 instances have been double counted at least. Let's remove them. We are left with 89 - 18 = 71
Now we still have 3 instances extra so these 3 must have been counted thrice.

Hence 18 - 3 = 15 children consumed exactly two.

Answer (E)
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There are 68 children in the cafeteria of a school and all of the chil 06 Feb 2020, 22:41
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RishiQV
So, this is a three set venn diagrm question
Let students with lunches = A
Let students with Drinks = B
Let students with Fruit= C

Using a nice formula (Which you can easily derive) :
Total = [A+B+C] - [sum of 2-group overlaps] + all three common + Neither

Here we are told that "18 children did at least 2 of these things" which mean the SUM common area of two and three overlaps is 18.
This includes AnB, BnC, AnC which is the combination of three 'two-set' overlap area and one 'three-set' overlap area.
Let 'center(three-set overlap area)' be x
So putting numbers in the formula we get : 68=[34+23+32] - 18 + x + 0
x=3

So, only two set overlap area = number of children did exactly two of these things = 18-3 = 15

Using the above calculations the value of x is x=-3. @bunnel: Are we supposed to take the positive value in this case? Please help.
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@bunnel Can you comment to this question... I have the same one like this guy.

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There are 68 children in the cafeteria of a school and all of the chil 05 Jun 2021, 12:22
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Total = n(A) + n(B) + n(C) - n(exactly two) -2* n(A∩B∩C)
or, 68 = 34 +23 +32 - x -2*(18-x) or, 68 = 89 -36 +x or, x = 15

So, I think E. :)
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There are 68 children in the cafeteria of a school and all of the chil 22 Aug 2021, 09:23
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total = A+B+C- 2*( atleast) + exactly two
68= 34+23+32 -36+exactly two
exactly two = 68-53 ;15
option E

Bunuel
There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria. If 18 children did at least 2 of these things, how many children did exactly two of these things?

A. 3
B. 6
C. 9
D. 13
E. 15
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There are 68 children in the cafeteria of a school and all of the chil 17 Oct 2021, 19:15
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Let the number of people who took at least 1 item (they took 1 or 2 or 3 items) = I

Let the number of people who took at least 2 items (they took 2 or 3 items) = II


And finally let the number of people who took all 3 items = III


Everyone of the 68 unique people took at least 1 (in other words the Union of the set is defined ——> there is no one in the “neither/nor” group)

Therefore:
(# of ppl who took at least 1) + (# of ppl who took at least 2) + (# of ppl who took 3) = A + B + C

Where A, B, and C = the three tallies ——-> 34, 23, and 32

Note: this can be proven by labeling a Venn diagram with variables and adding up the 3 circles (A + B + C) and then adding up each of I , II, and III

So we have:

I + II + III = 34 + 23 + 32 = 89

Where it must be the case that: I >/= II >/= III

I = Union of the overlapping sets = number of people who bring at least I = all 68 unique people

And

II = # of ppl who bring at least 2 = 18

I + II + III = 89

Becomes

(68) + (18) + III = 89

III = 3 people

And finally, the number of people who bring exactly 2 items =

II - III = 18 - 3 = 15

Answer
15

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There are 68 children in the cafeteria of a school and all of the chil 17 Oct 2021, 19:31
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Given: There are 68 children in the cafeteria of a school and all of the children have something for lunch. Thirty-four of the children brought lunches from home, 23 of the children bought a drink from the cafeteria beverage machine, and 32 of the children bought fruit in the cafeteria.
Asked: If 18 children did at least 2 of these things, how many children did exactly two of these things?

18 = Exactly 2 + Exactly 3
Exactly 3 = 18 - Exactly 2

All = 1 + 2 + 3 - Exactly 2 - 2* Exactly 3
68 = 34 + 23 + 32 - Exactly 2 - 2* Exactly 3 = 89 - Exactly 2 - 2 (18 - Exactly 2) = 89 - 36 + Exactly 2 = 53 + Exactly 2
Exactly 2 = 15

IMO E
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There are 68 children in the cafeteria of a school and all of the chil 17 Oct 2021, 19:34
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Hi prerakgoel03
How did you get lunch value = 34 and not (3/4)*68 = 51


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There are 68 children in the cafeteria of a school and all of the chil 03 Aug 2025, 02:12
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