Caselet DI MCQ Quiz - Objective Question with Answer for Caselet DI - Download Free PDF
Last updated on Jun 6, 2025
Latest Caselet DI MCQ Objective Questions
Caselet DI Question 1:
Comprehension:
Directions: Read the following information carefully and answer the questions based on it.
A faculty has 8000 students in the school and the ratio of boys to girls is 5 : 3. All the students are involved in five different games Cricket, Basketball, Hockey, Football, and Badminton. 15% of the boys and 20% of the girls are in Cricket and Basketball respectively. One-fourth of the boys are in the Hockey game. The number of girls in Cricket is 10% more than the number of boys in cricket. 20% of the total number of students are in Badminton. Girls in Hockey are 60% of the boys in the same game. 20% of the girls are in Football and the remaining girls are in Badminton. 28% of the boys are in Basketball and the remaining boys are in Football.
What is the total number of boys in the Basketball and Football games together?
Answer (Detailed Solution Below)
Caselet DI Question 1 Detailed Solution
Total number of boys = 8000 × 5/8 = 5000
Total number of girls = 8000 × 3/8 = 3000
The total number of students in Badminton game = 8000 × 20 /100 = 1600
|
Games |
Boys |
Girls |
|
Cricket |
5000 × 15/100 = 750 |
750 × 110/100 = 825 |
|
Basketball |
5000 × 28/100 = 1400 |
3000× 20/100 = 600 |
|
Hockey |
5000 × 1/4 = 1250 |
1250 × 60/100 = 750 |
|
Badminton |
1600 – 225 = 1375 |
3000 – 2775 = 225 |
|
Football |
5000 – 4775 = 225 |
3000× 20/100 = 600 |
Calculation:
1400 boys plays Basketball
225 boys plays Football
The total boys in the basketball and football games together = 1400 + 225 = 1625
Caselet DI Question 2:
Comprehension:
Directions: Read the following information carefully and answer the questions based on it.
A faculty has 8000 students in the school and the ratio of boys to girls is 5 : 3. All the students are involved in five different games Cricket, Basketball, Hockey, Football, and Badminton. 15% of the boys and 20% of the girls are in Cricket and Basketball respectively. One-fourth of the boys are in the Hockey game. The number of girls in Cricket is 10% more than the number of boys in cricket. 20% of the total number of students are in Badminton. Girls in Hockey are 60% of the boys in the same game. 20% of the girls are in Football and the remaining girls are in Badminton. 28% of the boys are in Basketball and the remaining boys are in Football.
The number of boys in Cricket games is what percent of the number of girls in the game cricket and badminton together?
Answer (Detailed Solution Below)
Caselet DI Question 2 Detailed Solution
Total number of boys = 8000 × 5/8 = 5000
Total number of girls = 8000 × 3/8 = 3000
The total number of students in Badminton game = 8000 × 20 /100 = 1600
|
Games |
Boys |
Girls |
|
Cricket |
5000 × 15/100 = 750 |
750 × 110/100 = 825 |
|
Basketball |
5000 × 28/100 = 1400 |
3000× 20/100 = 600 |
|
Hockey |
5000 × 1/4 = 1250 |
1250 × 60/100 = 750 |
|
Badminton |
1600 – 225 = 1375 |
3000 – 2775 = 225 |
|
Football |
5000 – 4775 = 225 |
3000× 20/100 = 600 |
Calculation:
750 boys play cricket.
1050 girls play cricket and badminton together.
Then Required percentage = 750/1050 × 100
Required percentage = 71.42%
Caselet DI Question 3:
Comprehension:
Directions: Read the following information carefully and answer the questions based on it.
A faculty has 8000 students in the school and the ratio of boys to girls is 5 : 3. All the students are involved in five different games Cricket, Basketball, Hockey, Football, and Badminton. 15% of the boys and 20% of the girls are in Cricket and Basketball respectively. One-fourth of the boys are in the Hockey game. The number of girls in Cricket is 10% more than the number of boys in cricket. 20% of the total number of students are in Badminton. Girls in Hockey are 60% of the boys in the same game. 20% of the girls are in Football and the remaining girls are in Badminton. 28% of the boys are in Basketball and the remaining boys are in Football.
What is the number of girls in the Badminton game?
Answer (Detailed Solution Below)
Caselet DI Question 3 Detailed Solution
Total number of boys = 8000 × 5/8 = 5000
Total number of girls = 8000 × 3/8 = 3000
The total number of students in Badminton game = 8000 × 20 /100 = 1600
|
Games |
Boys |
Girls |
|
Cricket |
5000 × 15/100 = 750 |
750 × 110/100 = 825 |
|
Basketball |
5000 × 28/100 = 1400 |
3000× 20/100 = 600 |
|
Hockey |
5000 × 1/4 = 1250 |
1250 × 60/100 = 750 |
|
Badminton |
1600 – 225 = 1375 |
3000 – 2775 = 225 |
|
Football |
5000 – 4775 = 225 |
3000× 20/100 = 600 |
Calculation:
From the table,
225 girls play Badminton.
Hence, girls in Badminton games = 225
Caselet DI Question 4:
Comprehension:
Directions: Read the following information carefully and answer the questions based on it.
A faculty has 8000 students in the school and the ratio of boys to girls is 5 : 3. All the students are involved in five different games Cricket, Basketball, Hockey, Football, and Badminton. 15% of the boys and 20% of the girls are in Cricket and Basketball respectively. One-fourth of the boys are in the Hockey game. The number of girls in Cricket is 10% more than the number of boys in cricket. 20% of the total number of students are in Badminton. Girls in Hockey are 60% of the boys in the same game. 20% of the girls are in Football and the remaining girls are in Badminton. 28% of the boys are in Basketball and the remaining boys are in Football.
Which games has the maximum number of boys in the school?
Answer (Detailed Solution Below)
Caselet DI Question 4 Detailed Solution
Total number of boys = 8000 × 5/8 = 5000
Total number of girls = 8000 × 3/8 = 3000
The total number of students in Badminton game = 8000 × 20 /100 = 1600
|
Games |
Boys |
Girls |
|
Cricket |
5000 × 15/100 = 750 |
750 × 110/100 = 825 |
|
Basketball |
5000 × 28/100 = 1400 |
3000× 20/100 = 600 |
|
Hockey |
5000 × 1/4 = 1250 |
1250 × 60/100 = 750 |
|
Badminton |
1600 – 225 = 1375 |
3000 – 2775 = 225 |
|
Football |
5000 – 4775 = 225 |
3000× 20/100 = 600 |
Calculation:
From the above table,
Basketball = 1400 boys
Hence, the maximum number of boys are in Basketball games.
Caselet DI Question 5:
Comprehension:
Direction: Read the given information carefully and answer the following question.
There are ‘x’ number of trainees in a TTP8.0. Each of them likes either one or more of the following types of activities – Creation and Solution, Blueprint and Content Writing. The respective ratio of male and female trainee in 5 : 1.
Out of the total male trainees,16% like only Creation and Solution. 22% like only Blueprint. 12% like only Content Writing. 30% of the male students like only Creation and Solution and Blueprint. 10% like only Blueprint and Content Writing and 6% like only Content Writing and Creation and Solution. The remaining 16 male students like all the given types of activities.
Out of the total female students, 15% like only Creation and Solution. 20% like only Blueprint. 7.5% like only Content Writing. 25% of the female students like only Creation and Solution and Blueprint. 17.5% like only Blueprint and Content Writing and 10% like only Content Writing and Creation and Solution. The remaining female students like all the given types of activities.
If 35% and 40% of total male and female selected in Insta Reel, then find total trainees in Insta Reel are what percentage more/less than total trainees in Content Writing?
Answer (Detailed Solution Below)
Caselet DI Question 5 Detailed Solution
Given:
|
|
Males |
Females |
|
Total |
5x/6 |
x/6 |
|
Only Creation and Solution |
16% of (5x/6) |
15% of (x/6) |
|
Only Blueprint |
22% of 5x/6 |
20% of (x/6) |
|
Only Content Writing |
12% of 5x/6 |
7.5% of (x/6) |
|
Only Creation and Solution and Blueprint |
30% of 5x/6 |
25% of (x/6) |
|
Only Blueprint and Content Writing |
10% of 5x/6 |
17.5% of (x/6) |
|
Only Content Writing and Creation and Solution |
6% of 5x/6 |
10% of (x/6) |
|
All activities together |
4% of (5x/6) = 16 |
Remaining 5% of (x/6) |
Calculation:
According to the question, we get
4% of (5x/6) = 16
⇒ 5x = 2400
⇒ x = 480
Total Males = 5 × (480/6) = 400
Total Females = 480/6 = 80
|
|
Males |
Females |
|
Total |
400 |
80 |
|
Only Creation and Solution |
64 |
12 |
|
Only Blueprint |
88 |
16 |
|
Only Content Writing |
48 |
6 |
|
Only Creation and Solution and Blueprint |
120 |
20 |
|
Only Blueprint and Content Writing |
40 |
14 |
|
Only Content Writing and Creation and Solution |
24 |
8 |
|
All activities together |
16 |
4 |
According to the question, we get
Total number of males selected in Insta Reel
⇒ 35% of 400 = 140
Total number of females selected in Insta Reel
⇒ 40% of 80 = 32
Total number of trainees in Content Writing
⇒ 48 + 6 + 40 + 14 + 24 + 8 + 16 + 4
⇒ 160
Required percentage = {(172 – 160)/160} × 100
⇒ 120/16 = 7.5%
∴ Required percentage is 7.5%
Top Caselet DI MCQ Objective Questions
Comprehension:
Directions: Read the given information carefully and answer the following questions.
A and B invested in a business in the ratio 4 : 5. A invested for 4 months more than B. At the end of year, the total profit earned is Rs. 35000 out of which B earned Rs. 15000.
What is the ratio of the time period of investment of A and B?
Answer (Detailed Solution Below)
Caselet DI Question 6 Detailed Solution
Download Solution PDFGiven:
Investment ratio of A and B = 4:5.
Time invested by A = 4 months more than B.
Total profit = Rs. 35000.
Profit earned by B = Rs. 15000.
Formula Used:
Profit share ratio = (Investment × Time) ratio.
Calculation:
Let investment of A = 4x, and B = 5x.
Let time invested by B = t months, then A invested for t + 4 months.
Profit ratio = Profit of A : Profit of B.
From total profit, Profit of A = Rs. 35000 - Rs. 15000 = Rs. 20000.
Profit ratio = 20000 : 15000 = 4 : 3.
Setting up equation from profit ratio:
⇒ (4x × (t + 4)) / (5x × t) = 4 / 3
Removing x as it cancels out:
⇒ (4 × (t + 4)) / (5 × t) = 4 / 3
Cross multiply to solve for t:
⇒ 12 × (t + 4) = 20 × t
⇒ 12t + 48 = 20t
⇒ 8t = 48
⇒ t = 6
Time invested by B = 6 months, and A = 6 + 4 = 10 months.
Time ratio of A to B = 10 months : 6 months = 5 : 3.
The ratio of the time period of investment of A and B is 5:3.
Comprehension:
Directions: Read the given information carefully and answer the following questions.
A and B invested in a business in the ratio 4 : 5. A invested for 4 months more than B. At the end of year, the total profit earned is Rs. 35000 out of which B earned Rs. 15000.
What is the amount invested by A in the business?
Answer (Detailed Solution Below)
Caselet DI Question 7 Detailed Solution
Download Solution PDFLet the amount invested by A and B be 4x and 5x respectively
Let B invested by ‘t’ months
Time of investment of A = t + 4
Profit ratio = 4x × (t + 4) : 5x × t = (4t + 16) : 5t
Now, B’s share:
5t/(4t + 16 + 5t) × 35000 = 15000
35t = 27t + 48
8t = 48
t = 6 months
Period of investment: A = 10 months, B = 6 months
Amount invested by A = 4x
We cannot determine the value of ‘x’
∴ Amount invested by A cannot be determined.
Here many might mistake 'by the end of year' as one year and solve the question and get it wrong. Note that it is not written 'by the end of one year', since no numerical value of time is given, and with only the ratio given we can not reach a valid conclusion.
200 students appeared in a specific examination. There were 80 students who failed in Mathematics. 160 students passed in Physics. 30 students failed in Chemistry. 30 students failed in Mathematics and Physics. 15 students failed in Mathematics and Chemistry. 10 students failed in Physics and Chemistry. 100 students passed in all three subjects.
How many students failed in only one subject?
Answer (Detailed Solution Below)
Caselet DI Question 8 Detailed Solution
Download Solution PDFConcept used:
n(A U B U C) = n(A) + n (B) + n(c) - n(A ∩ B) - n(B ∩ C) - n(C ∩ A) + n(A ∩ B ∩ C)
Where, n(A U B U C) = no of students failed in all subject
n(A ∩ B ∩ C) = number of total students failed
Calculation:
Total students pass = 100
So, total students fail = 200 - 100 = 100
Students failed in Physics = 200 - 160 = 40
Now,
100 = 80 + 40 + 30 - (15 + 30 + 10) + students failed in all subjects
⇒ students failed in all subjects = 100 - 150 + 55
⇒ students failed in all subjects = 155 - 150 = 5
Again,
Failed in only (M, P) = 30 - 5 = 25
Failed in only (P, C) = 10 - 5 = 5
Failed in only (C, M) = 15 - 5 = 10
So,
Failed in only maths = 80 - (10 + 5 + 25) = 80 - 40 = 40
Failed in only physics = 40 - (25 + 5 + 5) = 40 - 35 = 5
Failed in only chemistry = 30 - (10 + 5 + 5) = 30 - 20 = 10
Thus, total students failed in only one subject = 40 + 5 + 10 = 55
∴ The correct answer is option (2).
Comprehension:
Directions: Consider the following information and answer the questions based on it
In a group of 75 students, 12 like only cabbage, 15 like only cauliflower, 21 like only carrot, 12 like both carrot and cabbage, 13 like only capsicum and 2 like both capsicum and cauliflower.
The difference between the people who like carrot and cauliflower is
A. 6
B. 18
C. 16
D. 4Answer (Detailed Solution Below)
Caselet DI Question 9 Detailed Solution
Download Solution PDFTotal number of people who like carrot = 21 + 12 = 33
Total number of people who like cauliflower = 15 + 2 = 17
∴ Required difference = 33 – 17 = 16
Comprehension:
Directions: Read the given information carefully and answer the following questions.
Three streams Arts, Science, and Commerce are offered in 3 colleges A, B, and C.
(1) There are 1750 students in college A. The number of Commerce students in college A is 400 more than that of in Science in college A. the ratio of the number of students in college A in Arts and Science is 23 : 2.
(2) There are 3250 students in Arts in all colleges. The number of students in Science in all colleges is 37.5% less than that of in Commerce in all colleges.
(3) The number of Arts students in college C is 10% more than that of in college B. the ratio of the number of students in Science in college B to that of in college C is 3 : 4.
(4) The number of students in Commerce in college B is 30% less than that in college A. total number of students in college B is 280 less than that of in college C.
The total number of students in college B is what percent more/less than that of in Science in all colleges?
Answer (Detailed Solution Below)
Caselet DI Question 10 Detailed Solution
Download Solution PDFLet the number of students in Arts and Science in college A be 23x and 2x respectively.
⇒ Number of students in Commerce in college A = 400 + 2x
23x + 2x + 400 + 2x = 1750
27x = 1350
x = 50
College A: Arts = 1150, Science = 100, Commerce = 500
Let the number of Commerce students in all colleges be 8y
⇒ Number of Science students in all colleges = 62.5/100 × 8y = 5y
Number of students in Commerce in college B = 70/100 × 500 = 350
⇒ Number of students in Commerce in college C = 8y – (500 + 350)
⇒ 8y – 850
Let the number of students in Arts in college B be z
⇒ Number of students in Arts in college C = 110/100 × z = 1.1z
1150 + z + 1.1z = 3250
2.1z = 2100
z = 1000
Number of students in Science in college B = 3/7 × (5y – 100) = 15y/7 – 300/7
Number of students in Science in college C = 4/7 × (5y – 100) = 20y/7 – 400/7
Now, Total number of students in college B = 1000 + 350 + 15y/7 – 300/7
⇒ 1350 – 300/7 + 15y/7
Total number of students in college C = 1100 + 20y/7 – 400/7 + 8y – 850
⇒ 250 – 400/7 + 20y/7 + 8y
Now, 250 – 400/7 + 20y/7 + 8y – 280 = 1350 – 300/7 + 15y/7
⇒ 1380 + 100/7 = 61y/7
⇒ y = 160
Now, putting the value of y and z, we get
|
College |
Number of students in Arts |
Number of students in Science |
Number of students in Commerce |
|
A |
1150 |
100 |
500 |
|
B |
1000 |
300 |
350 |
|
C |
1100 |
400 |
430 |
Total students in college B = 1000 + 300 + 350 = 1650
Total students in Science in all colleges = 100 + 300 + 400 = 800
∴ Required percent = (1650 – 800)/800 × 100 = 106.25%
Comprehension:
Directions: Read the following information carefully and answer the given questions:-
In school, the total number of students is 14,000. On the annual function of the school, 25% of the total boys and 60% of total girls have participated and the number of total girls in the school is equal to the number of boys who have not participated in the function.
Find the number of boys who have participated in annual function of the school.
Answer (Detailed Solution Below)
Caselet DI Question 11 Detailed Solution
Download Solution PDFTotal number of students = 14,000
Percentage of boys who participated in annual function = 25%
Percentage of girls who participated in annual function = 60%
Number of girls in school = Number of boys who have not participated in function
Concept used:
Total number of boys or girls = Number of those who participated + Number of those who have not participated
Calculation:
Let the number of boys and girls be x and y respectively
Number of boys who have participated in annual function = 25% of x
⇒ 0.25x
Number of boys who have not participated = (x – 0.25x)
⇒ 0.75x
Number of girls in school = y = 0.75x
Now, as per the question
⇒ x + y = 14,000
⇒ x + 0.75x = 14,000
⇒ 1.75x = 14,000
⇒ x = 8000
Number of boys who have participated in annual function = 0.25x
⇒ 0.25 × 8000
⇒ 2000
∴ The number of boys who have participated in annual function is 2000
District XYZ has 50,000 voters; out of them, 20% are urban voters and 80% rural voters. For an election, 25% of the rural voters were shifted to the urban area. Out of the voters in both rural and urban areas, 60% are honest, 70% are hardworking, and 35% are both honest and hardworking.
Two candidates, A and B, contested the election. Candidate B swept the urban vote, while Candidate A found favour with the rural voters. Voters who were both honest and hardworking voted for NOTA. How many votes were polled in favour of candidate A, candidate B and NOTA, respectively?
Answer (Detailed Solution Below)
Caselet DI Question 12 Detailed Solution
Download Solution PDFGiven:
District XYZ has 50,000 voters; out of them, 20% are urban voters and 80% rural voters.
Calculation:
Total votes = 50000
⇒ Urban votes originally = 20/100 × 50000 = 10000 and Rural votes originally = 80/100 × 50000 = 40000
For election, 25% of the rural voters were shifted to the urban area
⇒ 25/100 × 40000 = 10000 rural votes shifted to urban area.
⇒ Now, Urban votes = 10000 + 10000 = 20000 and Rural votes = 40000 - 10000 = 30000
Out of the voters in both rural and urban areas, 60% are honest, 70% are hardworking, and 35% are both honest and hardworking.
Voters who were both honest and hardworking voted for NOTA.
∴ Votes swept by NOTA = 35% of urban + 35% of rural = 35/100 × 20000 + 35/100 × 30000 = 17500
Candidate A found favour with the rural voters, rural voters left = 100% - 35% = 65% of rural voters
∴ Votes swept by A = 65/100 × 30000 = 19500
Candidate B found favour with the urban voters, Urban voters left = 100% - 35% = 65% of urban voters
∴ Votes swept by B = 65/100 × 20000 = 13000
⇒ Votes polled in favor of candidate A, candidate B and NOTA are 19500, 13000 and 17500 respectively
Comprehension:
Direction: Read the information carefully and answer the following questions:
In a school of 750 students, each student likes atleast one of the three colors- Red, Green and Blue. 109 students like only red color, 150 students like only green color and 125 students like only blue color. The number of students who like red and green colors only is 70% of the students who like only green color. The number of students who like red and blue colors only is 60% of the students who like only blue color. 100 students like all the colors.
Find the number of students who like green and blue colours only.
Answer (Detailed Solution Below)
Caselet DI Question 13 Detailed Solution
Download Solution PDFGiven:
Total number of students = 750
The number of students who like red and green colours only = 70% of 150 students
and The number of students who like red and blue colours only = 60% of 125 students
Calculation:
Let the number of students who like green and blue colours only be a.
Number of students who like red and green colours only = (70/100) × 150
⇒ 105 students
Number of students who like red and blue colours only = (60/100) × 125
⇒ 75 students
Now, The total number of students = 750
⇒ 109 + 150 + 125 + 100 + 105 + 75 + a = 750
⇒ 664 + a = 750
⇒ a = 750 – 664
⇒ a = 86 students
∴ 86 students like both green and blue colors only.
A survey of 170 families, 115 drink Coffee, 110 drink Tea and 130 drink Milk. Also, 85 drink Coffee and Milk, 75 drink Coffee and Tea, 95 drink Tea and Milk, 70 drink all the three. Find How many use Coffee and Milk but not Tea.
Answer (Detailed Solution Below)
Caselet DI Question 14 Detailed Solution
Download Solution PDFGiven,
Number of families who participate in survey = 170
Number of families who drink Coffee = 115
Number of families who drink Tea = 110
Number of families who drink Milk = 130
Number of families who drink Coffee and Milk = 85
Number of families who drink Coffee and Tea = 75
Number of families who drink Tea and Milk = 95
Number of families who drink Coffee, Milk and Tea = 70
Calculation:
Number of families who drink only Milk and Tea = 95 – 70 = 25
Number of families who drink only Coffee and Milk = 85 – 70 = 15Comprehension:
Direction: Read the following data carefully and answer the following questions:
There are two villages A and B in a certain district. The population of village A is 35% less than the population of village B. Total population of both villages is 8250. The ratio between adults and children in two villages is 20: 13. The difference between the number of adults and children including two villages is 1750. In village A, the number of adults is 60% more than the number of children. While in village B, the number of adults is 1.5 times the number of children.
Find the difference between the number of adults in village B and the number of children village B.
Answer (Detailed Solution Below)
Caselet DI Question 15 Detailed Solution
Download Solution PDFLet the population of village A and Village B be A and B respectively.
⇒ A + B = 8250
⇒ 65B/100 + B = 8250
⇒ B = 5000
⇒ A = 3250
Let adults of village A and Village B be P and Q respectively while children of village A and Village B be S and T respectively.
⇒ P + S = 3250
⇒ 160S/100 + S = 3250
S = 1250 = children of village A
P = 2000 = adults of village A
⇒ Q + T = 5000
⇒ 1.5T + T = 5000
T = 2000 = children of village B
Q = 3000 = adults of village B
Required difference = 3000 – 2000 = 1000