It seems that the specific features of the graph and the required form to be filled out aren't provided in your message. However, I can help you understand how to analyze a polynomial graph by considering common features.

1. **Zeroes/Roots**: Points where the graph crosses or touches the x-axis; these represent the values of $ x $ for which $ f(x) = 0 $.

2. **Y-intercept**: The point where the graph intersects the y-axis, given by $ f(0) $.

3. **End Behavior**: This describes how the graph behaves as $ x $ approaches $ +\infty $ or $ -\infty $. The leading coefficient and the degree of the polynomial will determine this.

4. **Turning Points**: Points where the graph changes direction; the number of turning points can be at most $ n - 1 $ for a polynomial of degree $ n $.

5. **Intervals of Increase/Decrease**: Analyze the graph to find where the function is increasing or decreasing.

6. **Local Maximum/Minimum**: Points where the function takes on a local highest or lowest value.

To fill in the form regarding the features of the graph, please provide specific details or a description of the graph, and I can assist you with the analysis!

Question

It seems that the specific features of the graph and the required form to be filled out aren't provided in your message. However, I can help you understand how to analyze a polynomial graph by considering common features.

1. **Zeroes/Roots**: Points where the graph crosses or touches the x-axis; these represent the values of $ x $ for which $ f(x) = 0 $.

2. **Y-intercept**: The point where the graph intersects the y-axis, given by $ f(0) $.

3. **End Behavior**: This describes how the graph behaves as $ x $ approaches $ +\infty $ or $ -\infty $. The leading coefficient and the degree of the polynomial will determine this.

4. **Turning Points**: Points where the graph changes direction; the number of turning points can be at most $ n - 1 $ for a polynomial of degree $ n $.

5. **Intervals of Increase/Decrease**: Analyze the graph to find where the function is increasing or decreasing.

6. **Local Maximum/Minimum**: Points where the function takes on a local highest or lowest value.

To fill in the form regarding the features of the graph, please provide specific details or a description of the graph, and I can assist you with the analysis!

Knowee AI · Accepted Answer