Insert ⊆ or s in each blank to make the resulting statement true. {1, 5} ____ {0, 1, 2, 3, 5}

Set notation is a mathematical language used to describe collections of objects, known as elements. In this context, sets are represented by curly braces, and elements are listed within them. Understanding how to read and write sets is crucial for determining relationships between them, such as subset and equality.

A subset is a set whose elements are all contained within another set. If set A is a subset of set B, denoted as A ⊆ B, every element of A is also an element of B. This concept is essential for comparing sets and understanding their relationships, particularly in the context of the given question.

An element of a set is an individual object or number that belongs to that set. The notation 'a ∈ A' indicates that 'a' is an element of set A. Recognizing whether an element is part of a set is vital for determining the truth of statements involving sets, such as whether one set is a subset of another.