Test: Venn Diagrams- 3 - CAT MCQ

Assume the number of members who can play exactly 1 game = I

The number of members who can play exactly 1 game = II

The number of members who can play exactly 1 game = III

I + 2II + 3III = 144 + 123 + 132 = 399….(1)

I + II + III = 256……(2)

⇒ II + 2III = 143…..(3)

Also, II + 3III = 58 + 25 + 63 = 146 ……(4)

⇒ III = 3 (From 3 and 4)

⇒ II =137

⇒ I = 116

The members who play only tennis = 123 - 58 - 25 + 3 = 43

Now 23 students choose maths as one of their subject.

This means (MPC)+ (MC) + (PC) = 23 where MPC denotes students who choose all the three subjects maths, physics and chemistry and so on.

So MC + PM = 5 Similarly we have PC+ MP = 7

We have to find the smallest number of students choosing chemistry

For that in the first equation let PM=5 and MC=0. In the second equation this PC = 2

Hence minimum number of students choosing chemistry will be (18+2) = 20 Since 18 students chose all the three subjects.

Let total number of people in the town = 100x
People who have both brown hair and eyes = b = 12x
⇒ People who have brown hair = a+ b = 40x
⇒ a = 28x
Similarly, c = 18x
∴ People who have neither brown hair nor brown eyes = 100x -(12x + 18x + 28x) = 42%

Students who play all the three games are 4, and with the rest information given in the question, we can at best draw the venn diagram as:

Now, total students = 40.

So, Chess+ 5 + 8 + 15 - x = 40

=> 18 + 28 - x = 40

=> 46 - x = 40

∴ x = 6

Given, a + b + c = 50 and a + b + c + x + y + z = 190 => x + y + z = 140.

Also, let E1 = k => E2 = 2k and E3 = 3k

E1 + E2 + E3 = 6k = 190 + 50 = 240 => k = 40.

Option A: If the number of students choosing only E2, the number of students
choosing both E2 and E3, are given then the number of students who choose E2 and E1, E1 and E3 can be found. From this only E1, only E3 can be calculated.

Option B: knowing the number of students choosing both E1 and E2, the number of students
choosing both E2 and E3, and a number of students choosing both E3 and E1 is insufficient. This information is not enough to calculate the number of students who choose only E1, only E2, and only E3.

Option C: If x and c are known, we can’t find y and z.

Option D is not sufficient.

Given, a + b + c = 50 and a + b + c + x + y + z = 190 => x + y + z = 140.

Also, let E1 = k => E2 = 2k and E3 = 3k

E1 + E2 + E3 = 6k = 190 + 50 = 240 => k = 40.

Option A,  the number of students choosing E1 is 40.

Option B, number of students choosing either E1 or E2 or both, but not E3 = total – E3 = 190-120 = 70.

Option C, number of students choosing both E1 and E2 => this can not be obtained.

Option D, number of students choosing E3 = 3x = 120.

Given Readership of newspaper X = 8.7

only X + 2.5 + 0.5 + 1 = 8.7

only X = 4.7

Given Readership of newspaper Y = 9.1

only Y + 2.5 + 1.5 + 0.5 = 9.1

only Y = 4.6

Given Readership of newspaper Z = 5.6

only Z + 0.5 + 1 + 1.5 = 5.6

only Z = 2.6

Number of people who read only one newspaper = 4.7 + 4.6 + 2.6 = 11.9 lakhs

Exactly two consecutive months include both July-August and August-September. We cannot include July-September, as these months are not consecutive.

N – none of the three months

Number of people who read in July and August only = 7

Number of people who read in August and September only = 2

Therefore, the number of surveyed people who have read exactly for two consecutive months = 7+2 = 9

Given e = 8

Number of students shortlisted for A and B is 14

e + b = 14

b = 6

Number of students shortlisted for A and C is 12

e + d = 12

d = 4

Number of students shortlisted for B and C is 15

e + f = 15

f = 7

Given

Number of students shortlisted for B is 26

b + f + e + c = 26

6 + 7 + 8 + c = 26

c = 5

Number of students shortlisted for C is 29

d + e + f + g = 29

g = 10

Number of students shortlisted for A is 21

b + e + d + a = 21

a = 3

Number of students shortlisted for only B = c = 5

Number of students shortlisted for only C = g = 10

Ratio = 5:10 = 1:2

The following Venn diagram may represent the given information, where T = tea and C = coffee.

• Number of students who like only tea = 60
• Number of students who like only coffee = 40
• Number of students who like at least one of tea or coffee = n (only Tea) + n (only coffee) + n (both Tea & coffee) . So, 60 + 40 + 80 = 180