Answer:
Domain: [-1, 2)
Range: (0, 4]
Explanation:
Domain
The domain of a function is the set of all possible input values (x-values).
From observation of the graph, the x-values of the endpoints of the continuous curve are x = -1 and x = 2.
As there is a closed circle at endpoint (-1, 3), this indicates that x = -1 is included in the interval of the domain.
As there is an open circle at endpoint (2, 0), this indicates that x = 2 is not included in the interval of the domain.
When writing interval notation:
- ( or ) : Use parentheses to indicate that the value is excluded.
- [ or ] : Use square brackets to indicate that the value is included.
Therefore, the domain of the graphed function is:
Range
The range of a function is the set of all possible output values (y-values).
From observation of the graph, the highest y-value of the curve is y = 4 and the lowest is y = 0.
As there is an open circle at (2, 0), this indicates that y = 0 is not included in the interval of the range.
When writing interval notation:
- ( or ) : Use parentheses to indicate that the value is excluded.
- [ or ] : Use square brackets to indicate that the value is included.
Therefore, the range of the graphed function is: