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In set theory, there are various types of sets that help categorize and understand the nature of different collections of elements. The key types include:
- Empty or null set
- Equal sets
- Unequal sets
- Equivalent sets
- Subsets (proper and improper)
- Supersets
- Power sets
- Singleton sets
- Finite and infinite sets
- Universal set
An empty set is a set with no elements. It is denoted by the symbol or in roster form as { }. Example:
- (no natural number exists between 7 and 8)
Example 1
Given: , find . Solution: No natural numbers exist between -10 and -1. So, .
Example 2
Given , identify even numbers in . Solution: None of the elements are even. So, .
Example 3
Given , find the set of girl names . Solution: No girl names present. Hence, .
Two sets are equal if they contain exactly the same elements. For example:
Example 1
Given Since all elements match, .
Unequal sets have at least one differing element. Denoted as . Example:
Example 2
Two sets are equivalent if they have the same number of elements. Denoted as . Example:
Example 1
Example 2
since
A set is a subset of set if all elements of are also in . Denoted . The number of subsets of a set with elements is .
Proper vs improper subsets
- Proper subset: Contains some but not all elements of a set,
- Improper subset: Contains all elements of the set itself,
The power set of a set is the set of all its subsets, denoted . If , then .
Example 1
Given
- All subsets:
- Improper subset:
- Proper subsets: All others
Example 2
. Total subsets:
A finite set has countable elements. An infinite set has uncountable or unlimited elements.
- Example of finite set:
- Example of infinite set:
Example 1
, , → A and B are infinite, C is finite
A singleton set contains only one element.
A universal set contains all elements under consideration, denoted by or . Example: If , then
Example 1
Given:
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