Determine whether each statement is true or false. ∅ ∪ ∅ = ∅

Set union is an operation that combines all unique elements from two or more sets. The union of sets A and B, denoted as A ∪ B, includes every element that is in A, in B, or in both. Understanding this concept is crucial for determining the outcome of union operations, especially when dealing with empty sets.

The empty set, denoted as ∅, is a set that contains no elements. It is a fundamental concept in set theory, serving as the identity element for the union operation. Recognizing the properties of the empty set is essential for evaluating statements involving unions and intersections.

In set theory, the identity element for union is the empty set. This means that when you take the union of any set with the empty set, the result is the original set. This property is vital for understanding how operations on sets behave, particularly in confirming the truth of statements involving unions of empty sets.