What is a Set?
In the field of Mathematics, sets can be defined as the collection of objects whose elements are fixed and cannot be changed. You can say that a set is a well defined collection of objects. The elements cannot be repeated in a set but can be written in any order. The set is always represented by capital letters.
What are the types of Sets?
There are primarily 8 types of sets that are used in Mathematics, they are:
Empty Sets - The set, which has no elements, is also called a Null set or Void set. It is denoted by {}.
Singleton Sets - The set which has just one element is named a singleton set.
Finite and Infinite Sets - A set that has a finite number of elements is known as a finite set, whereas the infinite set is the set whose elements can't be estimated, but it has some figure or number that is adequate enough to evaluate that set.
Equal Sets - If every element of set A is also the element of set B and if every element of set A is also the elements of set A are called equal sets. This implies that the elements of both the sets i.e. set A and set B are equal.
Subsets - A set P is said to be a subset of set U if the elements of set U belong to set P. In other words, it can be said that each and every element present in the set P is also present in set U.
Power Sets - The set of all subsets is known as power sets.
Universal Sets - A set that contains all the elements of other sets is called a universal set.
Disjoint Sets - If two sets X and Y do not have any common elements, and their intersection results in zero (0), then set X and Y are called disjoint sets.
Union, Intersection,Difference and Complement of Sets -
Union of Sets -
The union of two sets consists of all their elements. It is denoted by (⋃).
For example: Set A = {2,3,7} and set B = { 4,5,8}
Then the union of set A and set B will be;
B ⋃ B = {2,3,7,4,5,8}
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Intersection of Sets -
The set of all elements, which are common to all the given sets, gives an intersection of sets. It is denoted by ⋂.
For Example: set A = {2,3,7} and set B = {2,4,9}
So, A ⋂ B = {2}
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Difference of Sets -
The difference between set S and set T is such that it has only those elements which are in the set S and not in the set T. S – T = {p : p ∊ S and p ∉ T}
Similarly, T – S = {p: p ∊ T and p ∉ S}
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Complement of a Set
Let U be the universal set and let A ⊂ U. Then, the complement of A, denoted by A’ or (U - A),is defined as:
A’ = {x U : x A}
Clearly, x A’ x A
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Every set has a complement of sets. Also, for a universal set, the empty set is known as the complement of the universal set. The empty set contains no elements of the subset and is also known as Null Set, which is denoted by {Ø} or {}.
Questions to be Solved:
Solved Examples
1.If set A = {a, b, c, d} and B = {b, c, e, f} then, find A-B.
Answer: Let’s find the difference of the two sets,
A – B = {a, d} and B – A = {e, f}
2.Let X = {David, Jhon, Misha} be the set of students of Class XI, who are in the school hockey team. Let Y = {Zoya, Rahul, Riya} be the set of students from Class XI who are in the school football team. Find X U Y and interpret the set.
Solution:
(U Union - Combination of two sets)
Given X = {David, Jhon, Zoya}
Y = {Zoya, Rahul, Riya}
Common elements (Zoya) should be taken once
X U Y = {David, Jhon, Zoya, Rahul, Riya}.
This union set is equal to the set of students from Class eleven who are present in the hockey team or in the football team or in both of the teams.
FAQs on Types of Sets
1. What are the main types of sets in Class 11 Maths as per the NCERT syllabus?
As per the CBSE syllabus for the 2025-26 session, the main types of sets students learn about are:
- Empty Set (or Null Set): A set that contains no elements, denoted by {} or ∅.
- Singleton Set: A set with exactly one element.
- Finite and Infinite Sets: Sets with a countable (finite) or uncountable (infinite) number of elements.
- Subsets and Proper Subsets: A set A is a subset of B if all elements of A are in B. It's a proper subset if A is a subset of B and A ≠ B.
- Equal and Equivalent Sets: Equal sets have the exact same elements. Equivalent sets have the same number of elements (cardinality).
- Power Set: The set of all possible subsets of a given set.
- Universal Set: The master set containing all elements relevant to a particular problem or context.
2. What is the key difference between equal sets and equivalent sets? Provide an example.
The primary difference lies in their elements. Equal sets must have the exact same elements, regardless of order. For example, A = {1, 2, 3} and B = {3, 1, 2} are equal sets. Equivalent sets, on the other hand, only need to have the same number of elements (i.e., the same cardinality). Their elements can be different. For example, C = {a, b, c} and D = {1, 2, 3} are equivalent because both have three elements, but they are not equal.
3. Can you explain the concept of a Power Set with a simple example?
A Power Set is a collection of all possible subsets of a given set, including the empty set and the set itself. If a set A has 'n' elements, its power set, denoted as P(A), will have 2n elements.
For example, if we have a set S = {x, y}, its subsets are:
- The empty set: ∅
- Subsets with one element: {x}, {y}
- The set itself: {x, y}
Therefore, the power set is P(S) = {∅, {x}, {y}, {x, y}}.
4. Why is the empty set (∅) considered a subset of every set?
This is a fundamental concept in set theory. A set 'A' is a subset of set 'B' if there are no elements in 'A' that are not in 'B'. Since the empty set has no elements at all, the condition that it contains an element not present in another set can never be met. Therefore, the empty set is logically a subset of any set, including itself. This principle is crucial for defining the power set correctly.
5. What is the importance of a Universal Set (U) in solving problems?
The Universal Set (U) is important because it establishes the context or boundaries for a problem. It contains all elements under consideration for a particular situation. Without a defined Universal Set, concepts like the complement of a set (A'), which consists of all elements in U that are not in A, would be meaningless. For example, in a problem about vowels, U = {a, e, i, o, u}. In a problem about the first ten natural numbers, U = {1, 2, 3, 4, 5, 6, 7, 8, 9, 10}.
6. How are Venn diagrams used to represent different types of sets?
Venn diagrams are visual tools that show the relationship between sets. Here’s how they represent different concepts:
- A Universal Set is typically shown as a large rectangle.
- Subsets are represented by circles drawn completely inside another circle.
- Overlapping sets (with common elements) are shown as intersecting circles. The overlapping area represents the intersection.
- Disjoint sets (with no common elements) are represented by two separate, non-touching circles.
7. How can you apply the concepts of disjoint and overlapping sets in a real-world scenario?
These concepts help categorise groups based on shared characteristics.
- Disjoint Sets: Imagine the set of all even numbers and the set of all odd numbers. These are disjoint because no number can be both even and odd. They have no elements in common.
- Overlapping Sets: Consider the set of students in a class who play cricket and the set of students who play basketball. These sets are overlapping because some students may play both sports. The students who play both form the intersection of the two sets.
8. What is the difference between a finite set and an infinite set?
The difference is based on the number of elements in the set. A finite set has a specific, countable number of elements. For example, the set of days in a week, A = {Sunday, Monday, ..., Saturday}, is finite because it has 7 elements. An infinite set has an endless number of elements that cannot be counted. For example, the set of all natural numbers, N = {1, 2, 3, 4, ...}, is infinite because it goes on forever.
9. What are the basic operations that can be performed on sets?
The four fundamental operations on sets are:
- Union (∪): The set of all elements that are in set A, or in set B, or in both.
- Intersection (∩): The set of all elements that are common to both set A and set B.
- Difference (–): The set of elements that are in set A but not in set B (A – B).
- Complement ('): The set of all elements in the universal set (U) that are not in set A (A').
