Answer
$\text{
a function
}\\\text{Domain: } \{
3,5,8,9
\}\\\text{Range: }\{
0,3,4,8
\}$
Work Step by Step
$\bf{\text{Solution Outline:}}$
To determine if the given relation, $\{
(8,0),(5,4),(9,3),(3,8)
\}$ is a function, check if the first components are all unique.
The domain is the set of all first components, while the range is the set of all second components.
$\bf{\text{Solution Details:}}$
The first components in the given set of ordered pairs are all unique. Hence, the given set is a function.
The domain is the set of all first components, while the range is the set of all second components. Hence, the given set of ordered pairs has the following characteristics:
\begin{array}{l}\require{cancel}
\text{
a function
}\\\text{Domain: } \{
3,5,8,9
\}\\\text{Range: }\{
0,3,4,8
\}
.\end{array}