Answer:
Domain = {8, 5, 9, 6}
Explanation:
The given relation consists of four ordered pairs: (8, 10), (5, 7), (9, -11), and (6, -8). To determine the domain of the relation, we need to identify all the distinct x-values in the ordered pairs.
The x-value of the first ordered pair is 8, the second is 5, the third is 9, and the fourth is 6. So, the domain of the relation is the set of all these x-values, which is:
Domain = {8, 5, 9, 6}
The domain of a relation is the set of all possible input values that the relation can accept. In this case, the domain consists of the x-values in the ordered pairs, which are the input values for the relation. The range of the relation would be the set of all possible output values that the relation can produce, which would consist of the y-values in the ordered pairs.
It's important to note that in a relation, an x-value can have multiple corresponding y-values, or it can have no corresponding y-value. In this relation, we don't have any repeated x-values, and all x-values have a corresponding y-value.