examine the graph. determine whether the relation is discrete, continuous, or neither discrete nor…

examine the graph. determine whether the relation is discrete, continuous, or neither discrete nor continuous. then state the domain and range of the relation. the relation is select choice domain = select choice range = select choice
Answer
Explanation:
Step1: Identify relation type
A continuous relation has a connected graph. The given graph is a vertical line, which is a connected set of points, so it is continuous.
Step2: Determine domain
The domain is the set of all x - values. For a vertical line (x = a) (in this case (x=- 2)), the domain is a single value. Since the line is at (x = - 2), the domain is ({-2}).
Step3: Determine range
The range is the set of all y - values. The vertical line extends infinitely in both the positive and negative y - directions. So the range is ((-\infty,\infty)).
Answer:
The relation is continuous. Domain = ({-2}) Range = ((-\infty,\infty))