Thakshashila: Created page with "= Union of Sets - Definition, Explanation, and Examples = The '''union''' of two sets is a fundamental operation in set theory. It combines all the elements from both sets into one set without repeating any element. == Definition of Union == The union of two sets $A$ and $B$ is the set containing all elements that belong to either $A$ , or $B$ , or both. It is denoted by: $A \cup B$ Mathematically: $A \cup B..."$

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Created page with "= Union of Sets - Definition, Explanation, and Examples = The '''union''' of two sets is a fundamental operation in set theory. It combines all the elements from both sets into one set without repeating any element. == Definition of Union == The union of two sets <math>A</math> and <math>B</math> is the set containing all elements that belong to either <math>A</math>, or <math>B</math>, or both. It is denoted by: <math>A \cup B</math> Mathematically: <math>A \cup B..."

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= Union of Sets - Definition, Explanation, and Examples =

The '''union''' of two sets is a fundamental operation in set theory. It combines all the elements from both sets into one set without repeating any element.

== Definition of Union ==

The union of two sets <math>A</math> and <math>B</math> is the set containing all elements that belong to either <math>A</math>, or <math>B</math>, or both. It is denoted by:

<math>A \cup B</math>

Mathematically:

<math>A \cup B = \{ x : x \in A \text{ or } x \in B \}</math>

== Understanding Union ==

When we take the union of two sets, we gather every element that appears in either set. If an element is common to both sets, it appears only once in the union because sets do not allow duplicates.

== Step-by-Step Explanation ==

1. Identify all elements in set <math>A</math>.
2. Identify all elements in set <math>B</math>.
3. Combine these elements into a new set.
4. Remove any duplicate elements to ensure all elements are unique.

== Examples of Union of Sets ==

=== Example 1: Simple Numbers ===
Let
<math>A = \{1, 2, 3\}</math>
<math>B = \{3, 4, 5\}</math>

Step 1: Elements of <math>A</math> are 1, 2, and 3.
Step 2: Elements of <math>B</math> are 3, 4, and 5.
Step 3: Combine all elements: 1, 2, 3, 3, 4, 5.
Step 4: Remove duplicates (3 is repeated): 1, 2, 3, 4, 5.

So,
<math>A \cup B = \{1, 2, 3, 4, 5\}</math>

=== Example 2: Letters in Words ===
Let
<math>C = \{\text{a}, \text{b}, \text{c}\}</math>
<math>D = \{\text{b}, \text{d}, \text{e}\}</math>

Step 1: Elements of <math>C</math>: a, b, c.
Step 2: Elements of <math>D</math>: b, d, e.
Step 3: Combine elements: a, b, c, b, d, e.
Step 4: Remove duplicates (b is repeated): a, b, c, d, e.

Thus,
<math>C \cup D = \{a, b, c, d, e\}</math>

=== Example 3: Students in Two Classes ===
Class 1 students:
<math>E = \{\text{John}, \text{Emma}, \text{Liam}\}</math>
Class 2 students:
<math>F = \{\text{Emma}, \text{Olivia}, \text{Noah}\}</math>

Step 1: Elements of <math>E</math>: John, Emma, Liam.
Step 2: Elements of <math>F</math>: Emma, Olivia, Noah.
Step 3: Combine elements: John, Emma, Liam, Emma, Olivia, Noah.
Step 4: Remove duplicate (Emma): John, Emma, Liam, Olivia, Noah.

Therefore,
<math>E \cup F = \{\text{John}, \text{Emma}, \text{Liam}, \text{Olivia}, \text{Noah}\}</math>

== Summary ==

* The union operation joins all unique elements from two sets.
* Duplicates are counted only once.
* It is useful in many areas like probability, logic, and computer science to combine data or possibilities.

[[Category:Set Theory]]
[[Category:Set Operations]]
[[Category:Mathematics]]

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