6 5 54 321 -6 -5 -4 -3 -2 -1₁ -1 INO -3 -4 -5 -6- 2 3 4 5 6 Write the domain of the function using interval notation.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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### Understanding the Domain of a Function from a Graph

Below is a graph of a function. This graph helps us visualize the behavior and scope of the function within a specific range.

#### Graph Description:

- The graph has a set of axes marked from -6 to 6 on both the x-axis and y-axis.
- The function depicted is a part of an upward-facing parabola.
- The left side of the parabola starts just below the y-axis at the point (-2, -1), denoted with an open circle, indicating that this point is not included in the function.
- The right side of the parabola ends at the point (1, 1), marked with a closed circle, indicating that this point is included in the function.
- The lowest point of the curve, or vertex, appears to be at around (-0.5, -2).

#### Task:

**Write the domain of the function using interval notation.**

The domain of a function includes all possible input values (x-values) that the function can accept. Based on the given graph, the function starts at \( x = -2 \) and ends at \( x = 1 \).

- Since the graph has an open circle at \( x = -2 \), the value -2 is not included.
- The graph has a closed circle at \( x = 1 \), meaning the value 1 is included.

Therefore, the domain in interval notation is:
\[ (-2, 1] \]

---

For educators and students, comprehending how to identify the domain from a graph is an essential skill in algebra and precalculus courses. This example demonstrates how to interpret open and closed circles on a graph and convert visual data into interval notation.
Transcribed Image Text:### Understanding the Domain of a Function from a Graph Below is a graph of a function. This graph helps us visualize the behavior and scope of the function within a specific range. #### Graph Description: - The graph has a set of axes marked from -6 to 6 on both the x-axis and y-axis. - The function depicted is a part of an upward-facing parabola. - The left side of the parabola starts just below the y-axis at the point (-2, -1), denoted with an open circle, indicating that this point is not included in the function. - The right side of the parabola ends at the point (1, 1), marked with a closed circle, indicating that this point is included in the function. - The lowest point of the curve, or vertex, appears to be at around (-0.5, -2). #### Task: **Write the domain of the function using interval notation.** The domain of a function includes all possible input values (x-values) that the function can accept. Based on the given graph, the function starts at \( x = -2 \) and ends at \( x = 1 \). - Since the graph has an open circle at \( x = -2 \), the value -2 is not included. - The graph has a closed circle at \( x = 1 \), meaning the value 1 is included. Therefore, the domain in interval notation is: \[ (-2, 1] \] --- For educators and students, comprehending how to identify the domain from a graph is an essential skill in algebra and precalculus courses. This example demonstrates how to interpret open and closed circles on a graph and convert visual data into interval notation.
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