Set Notation for Set Operations Table
The table below represents different set notations used for set operations.
Set Notation for Set Operations |
Symbol |
Description |
---|---|---|
Union |
∪ |
The union of two sets includes all elements present in both sets. |
Intersection |
∩ |
The intersection of two sets includes common elements between two sets. |
Complement |
c |
The complement of set is given by U – set. |
Set Difference |
– |
The set difference of two sets includes the elements of first set that are not present in second set. |
Subset |
⊆ |
The subset of a set is the set that includes some element of a set. |
Set Notation
Set notation refers to the different symbols used in the representation and operation of sets. The set notation used to represent the elements of sets is curly brackets i.e., {}.
In this article, we will explore set notation, set notations for set representation and set operations. We will also cover the set notation table and solve some examples related to set notation.
Table of Content
- What is Set Notation?
- Set Notation for Set Representation
- Set Notation for Set Operations
- Set Notation for Set Operations Table
- Set Notation Table
- Examples on Set Notation