Question
Use the given graph of the polynomial function to complete the following.
a. Estimate the x-intercept(s).
b. State whether the leading coefficient is positive or negative.
c. Determine whether the polynomial function is cubic or quartic.
-5
-3
-1
1
3
5
-5
-3
-1
1
3
5
x
y
The x-intercepts are xequals
enter your response here.
a. Estimate the x-intercept(s).
b. State whether the leading coefficient is positive or negative.
c. Determine whether the polynomial function is cubic or quartic.
-5
-3
-1
1
3
5
-5
-3
-1
1
3
5
x
y
The x-intercepts are xequals
enter your response here.
Answers
GPT-4o mini
To answer your questions regarding the polynomial function based on the provided graph, let's go through each part step by step.
### a. Estimate the x-intercept(s).
The x-intercepts of a polynomial function are the points where the graph intersects the x-axis. You would look at the graph and identify the x-values for which y = 0.
If we assume that you see crossings at specific points, you might estimate the x-intercepts to be:
- \( x_1 = a \)
- \( x_2 = b \) (if there are two intercepts)
For example, if the graph crosses at \( x = -3 \) and \( x = 1 \), you would write:
The x-intercepts are \( x = -3 \) and \( x = 1 \).
### b. State whether the leading coefficient is positive or negative.
To determine if the leading coefficient is positive or negative, look at the end behavior of the graph:
- If the graph rises to the right as you move along the x-axis (from left to right), then the leading coefficient is **positive**.
- If the graph falls to the right, then the leading coefficient is **negative**.
If the graph rises to the right, you would state:
The leading coefficient is **positive**.
If it falls, you would state:
The leading coefficient is **negative**.
### c. Determine whether the polynomial function is cubic or quartic.
- A **cubic** polynomial has a degree of 3 and typically has 1 or 3 real roots (x-intercepts) and an "S" shaped graph.
- A **quartic** polynomial has a degree of 4 and usually has up to 4 real roots, and its graph can have a "W" shaped appearance.
You would look at the number of turns in the graph:
- If there are up to 3 turning points, it's likely cubic.
- If there are up to 4 turning points, it's probably quartic.
For example, if you see the graph has 3 turning points, you would state:
The polynomial function is **cubic**.
If there are 4 turning points, you would state:
The polynomial function is **quartic**.
### Summary Example
Let's say you observed the following from the graph:
- x-intercepts at -3 and 1.
- The graph rises to the right, indicating a positive leading coefficient.
- The graph appears to have three turning points.
You would complete your answers as follows:
- The x-intercepts are \( x = -3 \) and \( x = 1 \).
- The leading coefficient is **positive**.
- The polynomial function is **cubic**.
Feel free to adjust the estimates based on what you see in your specific graph!
### a. Estimate the x-intercept(s).
The x-intercepts of a polynomial function are the points where the graph intersects the x-axis. You would look at the graph and identify the x-values for which y = 0.
If we assume that you see crossings at specific points, you might estimate the x-intercepts to be:
- \( x_1 = a \)
- \( x_2 = b \) (if there are two intercepts)
For example, if the graph crosses at \( x = -3 \) and \( x = 1 \), you would write:
The x-intercepts are \( x = -3 \) and \( x = 1 \).
### b. State whether the leading coefficient is positive or negative.
To determine if the leading coefficient is positive or negative, look at the end behavior of the graph:
- If the graph rises to the right as you move along the x-axis (from left to right), then the leading coefficient is **positive**.
- If the graph falls to the right, then the leading coefficient is **negative**.
If the graph rises to the right, you would state:
The leading coefficient is **positive**.
If it falls, you would state:
The leading coefficient is **negative**.
### c. Determine whether the polynomial function is cubic or quartic.
- A **cubic** polynomial has a degree of 3 and typically has 1 or 3 real roots (x-intercepts) and an "S" shaped graph.
- A **quartic** polynomial has a degree of 4 and usually has up to 4 real roots, and its graph can have a "W" shaped appearance.
You would look at the number of turns in the graph:
- If there are up to 3 turning points, it's likely cubic.
- If there are up to 4 turning points, it's probably quartic.
For example, if you see the graph has 3 turning points, you would state:
The polynomial function is **cubic**.
If there are 4 turning points, you would state:
The polynomial function is **quartic**.
### Summary Example
Let's say you observed the following from the graph:
- x-intercepts at -3 and 1.
- The graph rises to the right, indicating a positive leading coefficient.
- The graph appears to have three turning points.
You would complete your answers as follows:
- The x-intercepts are \( x = -3 \) and \( x = 1 \).
- The leading coefficient is **positive**.
- The polynomial function is **cubic**.
Feel free to adjust the estimates based on what you see in your specific graph!