Write the domain and range of h using interval notation.

Algebra and Trigonometry (6th Edition)
6th Edition
ISBN:9780134463216
Author:Robert F. Blitzer
Publisher:Robert F. Blitzer
ChapterP: Prerequisites: Fundamental Concepts Of Algebra
Section: Chapter Questions
Problem 1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,...
Question
## Domain and Range from the Graph of a Continuous Function

### Understanding the Domain and Range

The entire graph of the function \( h \) is shown in the figure below. We will write the domain and range of \( h \) using interval notation.

![Graph of function h](graph_url_placeholder)

### Analyzing the Graph

The graph provided shows a continuous function \( h \) with the following key points:
- The function starts from the point (-4, 3) and ends at the point (4, -2) on the \( x \)-axis.

### Domain

The domain of a function includes all the possible \( x \)-values that the function can take. Observing the graph:

- The \( x \)-values range from -4 to 4, although the point at \( x = 4 \) has an open circle, indicating that this \( x \)-value is not included in the domain.

Therefore, the domain of \( h \) in interval notation is:

\[ [-4, 4) \]

### Range

The range of a function includes all the possible \( y \)-values that the function can output. Observing the graph:

- The \( y \)-values range from -2 to 3, with both endpoints being included, as there are no open circles on the \( y \)-values.

Therefore, the range of \( h \) in interval notation is:

\[ [-2, 3] \]

### Conclusion

From the given graph, we have determined the domain and range of the function \( h \). The domain is all the possible \( x \)-values from -4 to just less than 4, and the range is all the possible \( y \)-values from -2 to 3.
Transcribed Image Text:## Domain and Range from the Graph of a Continuous Function ### Understanding the Domain and Range The entire graph of the function \( h \) is shown in the figure below. We will write the domain and range of \( h \) using interval notation. ![Graph of function h](graph_url_placeholder) ### Analyzing the Graph The graph provided shows a continuous function \( h \) with the following key points: - The function starts from the point (-4, 3) and ends at the point (4, -2) on the \( x \)-axis. ### Domain The domain of a function includes all the possible \( x \)-values that the function can take. Observing the graph: - The \( x \)-values range from -4 to 4, although the point at \( x = 4 \) has an open circle, indicating that this \( x \)-value is not included in the domain. Therefore, the domain of \( h \) in interval notation is: \[ [-4, 4) \] ### Range The range of a function includes all the possible \( y \)-values that the function can output. Observing the graph: - The \( y \)-values range from -2 to 3, with both endpoints being included, as there are no open circles on the \( y \)-values. Therefore, the range of \( h \) in interval notation is: \[ [-2, 3] \] ### Conclusion From the given graph, we have determined the domain and range of the function \( h \). The domain is all the possible \( x \)-values from -4 to just less than 4, and the range is all the possible \( y \)-values from -2 to 3.
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