What is the domain of this relation?
(
–
10,
–
3)
(6,9)
(
–
4,
–
3)
(
–
8,8)
(4,
–
10)
The domain of this relation would be {-10, 6, -4, -8, 4}.
The domain of a relation is the set of all possible input values, or x-values.
Looking at the given relation, we can see that the x-values for each pair are: -10, 6, -4, -8, and 4.
Therefore, the domain of this relation is {-10, 6, -4, -8, 4}.
To find the domain of a relation, we need to determine the set of all possible x-values or inputs for the given set of ordered pairs.
Looking at the given ordered pairs, we can see that each ordered pair has an x-coordinate and a y-coordinate. The x-coordinate represents the input or domain value, while the y-coordinate represents the output or range value.
The domain of a relation is simply a set of all possible x-values or inputs. In other words, it includes all the x-coordinates of the ordered pairs in the relation.
For the given set of ordered pairs:
(–10, –3)
(6, 9)
(–4, –3)
(–8, 8)
(4, –10)
The domain is the set of x-coordinates from these ordered pairs:
Domain = {–10, 6, –4, –8, 4}
So, the domain of the given relation is {-10, 6, -4, -8, 4}.