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Set Theory 
CPT Section D Quantitative 
Aptitude Chapter 7 
Brijeshwar Prasad Gupta 
 
Page 2


Set Theory 
CPT Section D Quantitative 
Aptitude Chapter 7 
Brijeshwar Prasad Gupta 
 
MCQ’s 
. 
Page 3


Set Theory 
CPT Section D Quantitative 
Aptitude Chapter 7 
Brijeshwar Prasad Gupta 
 
MCQ’s 
. 
MCQ.1 
1. In a group of 20 children, 8 drink tea but not coffee and 13 like tea. The 
number of children drinking coffee but not tea is 
(a) 6 
(b) 7 
(c) 1 
(d) none of these    
Answer:(B) 
Page 4


Set Theory 
CPT Section D Quantitative 
Aptitude Chapter 7 
Brijeshwar Prasad Gupta 
 
MCQ’s 
. 
MCQ.1 
1. In a group of 20 children, 8 drink tea but not coffee and 13 like tea. The 
number of children drinking coffee but not tea is 
(a) 6 
(b) 7 
(c) 1 
(d) none of these    
Answer:(B) 
MCQ.2 
2.If A has 32 elements, B has 42 
elements and A ? B has 62 
elements, the number of elements in 
A n B is 
• (a) 12 
• (b) 74 
• (c) 10 
• (d) none of these    
Answer: A 
Page 5


Set Theory 
CPT Section D Quantitative 
Aptitude Chapter 7 
Brijeshwar Prasad Gupta 
 
MCQ’s 
. 
MCQ.1 
1. In a group of 20 children, 8 drink tea but not coffee and 13 like tea. The 
number of children drinking coffee but not tea is 
(a) 6 
(b) 7 
(c) 1 
(d) none of these    
Answer:(B) 
MCQ.2 
2.If A has 32 elements, B has 42 
elements and A ? B has 62 
elements, the number of elements in 
A n B is 
• (a) 12 
• (b) 74 
• (c) 10 
• (d) none of these    
Answer: A 
MCQ.3 
3. Given A = {2, 3}, B = {4, 5}, 
C = {5, 6} then    A × (B n C) is 
• (a) {(2, 5), (3, 5)} 
• (b) {(5, 2), (5, 3)} 
• (c) {(2, 3), (5, 5)} 
• (d) none of these    
Answer:A 
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FAQs on MCQ - Set Theory - Quantitative Aptitude for CA Foundation

1. What is set theory?
Ans. Set theory is a branch of mathematical logic that studies sets, which informally are collections of objects. Although any type of object can be collected into a set, set theory is applied most often to objects that are relevant to mathematics.
2. What are the basic operations of set theory?
Ans. The basic operations of set theory are union, intersection, difference, and complement. Union is the operation of combining two or more sets into a single set that contains all the elements of the original sets. Intersection is the operation of forming a set of all the elements that are common to two or more sets. Difference is the operation of forming a set of all the elements that belong to one set but not to another. Complement is the operation of forming a set of all the elements that do not belong to a given set.
3. What is the cardinality of a set?
Ans. The cardinality of a set is the number of elements in the set. It can be finite (if the set has a specific number of elements) or infinite (if the set has an unlimited number of elements).
4. How are sets represented in set theory?
Ans. Sets are represented in set theory using braces {}. For example, the set of all even numbers can be represented as {2, 4, 6, 8, ...}. The elements of a set are separated by commas, and the entire set is enclosed in braces.
5. What is the difference between a subset and a proper subset?
Ans. A subset is a set that contains all the elements of another set, including the empty set and the set itself. A proper subset is a subset that contains some, but not all, of the elements of another set. In other words, a proper subset is a subset that is not equal to the original set.
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