4.2 Polynomial Functions and Models

4.2 Polynomial Functions and Models
Understand the graphs of polynomial functions Evaluate and graph piecewise-defined functions Use polynomial regression to model data

Graphs of Polynomial Functions (1 of 3)

A turning point occurs whenever the graph of a polynomial function changes from increasing to decreasing or from decreasing to increasing. Turning points are associated with “hills” or “valleys” on a graph: (−2, 8) and (2, −8)

Constant Polynomial Function
If f(x) = a and a ≠ 0, then f is both a constant function and a polynomial function of degree 0. Graph is a horizontal line. No x-intercepts or turning points

Linear Polynomial Function (1 of 2)
If f(x) = ax + b and a ≠ 0, then ƒ is both a linear function and a polynomial function of degree 1. Graph is a line, neither horizontal nor vertical. Graph has one x-intercept and no turning points

Linear Polynomial Function (2 of 2)

Quadratic Polynomial Functions (1 of 2)
If f(x) = ax² + bx + c and a ≠ 0, then ƒ is both a quadratic function and a polynomial function of degree 2. Graph is a parabola, opening either upward (a > 0) or downward (a < 0). Graph can have zero, one, or two x-intercepts, and exactly one turning point, called the vertex.

Quadratic Polynomial Functions (2 of 2)

Cubic Polynomial Functions (1 of 2)
If f(x) = ax³ + bx² + cx + d and a ≠ 0, then f is both a cubic function and a polynomial function of degree 3.

Cubic Polynomial Functions (2 of 2)

Quartic Polynomial Functions (1 of 2)
Graph can have up to four x-intercepts and up to three turning points.

Quartic Polynomial Functions (2 of 2)

Quintic Polynomial Functions (1 of 2)

Quintic Polynomial Functions (2 of 2)

Degree, x-intercepts, and Turning Points
The graph of a polynomial function of degree n, with n ≥ 1, has at most n x-intercepts and at most n − 1 turning points.

Example: Analyzing the graph of a Polynomial function (1 of 8)

Use the graph of the polynomial function f shown. a. How many turning points and x-intercepts are there? b. Is the leading coefficient a positive or negative? Is the degree odd or even? c. Determine the minimum degree of f.

Solution a. There are four turning points corresponding to the two “hills” and two “valleys”. There appear to be 4 x-intercepts.

b. The left side rises and the right side falls. Therefore, a < 0 and the polynomial function has odd degree. c. The graph has four turning points. A polynomial of degree n can have at most n − 1 turning points. Therefore, f must be at least degree 5.

Graph f(x) = x³ − 2x² − 5x + 6, and then complete the following. a. Identify the x-intercepts. b. Approximate the coordinates of any turning points to the nearest hundredth. c. Use the turning points to approximate any local extrema.

Solution a. The graph appears to intersect the x-axis at the points (−2, 0), (1, 0), and (3, 0). The x-intercepts are (−2, 0), (1, 0), and (3, 0).

b. There are two turning points. Their coordinates approximately (−0.79, 8.21) and (2.12, −4.06).

c. There is a local maximum of about 8.21 and a local minimum of about −4.06.

Example: Analyzing the end behavior of a graph (1 of 2)
Let f(x) = 2 + 3x − 3x² − 2x³. a. Give the degree and leading coefficient. b. State the end behavior of the graph of f. Solution a. The term with the highest degree is −2x³ so the degree is 3 and the leading coefficient is −2.

Example: Analyzing the end behavior of a graph (2 of 2)
b. The degree is odd and the leading coefficient is negative. The graph of f rises to the left and falls to the right. More formally,

Example: Evaluating a piecewise-defined Polynomial function (1 of 2)
Evaluate f(x) at −3, −2, 1, and 2. Solution To evaluate f(−3) we use the formula x² − x because −3 is the interval −5 ≤ x < −2. f(−3) = (−3)² − (−3) = 12

Example: Evaluating a piecewise-defined Polynomial function (2 of 2)
To evaluate f(−2) we use f(x) = −x³ because −2 is in the interval −2 ≤ x < 2. f(−2) = −(−2)³ = −(−8) = 8 Similarly, f(1) = −1³ = −1 and f(2) = 4 − 4(2) = −4

Example: Graphing a piecewise-defined function
Complete the following. a. Sketch a graph of f. b. Determine if f is continuous on its domain. c. Solve the equation f(x) = 1.

Example: Graphing a piecewise-defined Polynomial function (1 of 2)

Example: Graphing a piecewise-defined Polynomial function (2 of 2)
b. The domain is −4 ≤ x ≤ 4. Because there are no breaks in the graph of f on its domain, the graph of f is continuous.

Polynomial Regression
We now have the mathematical understanding to model the data presented in the introduction to this section: polynomial modeling. We can use least-squares regression, which was also discussed in previous sections, for linear and quadratic functions.

Example: Determining a cubic modeling function (1 of 5)
The data in the table lists Brazil’s unemployment rates. Year Rate (%) 2010 6.75 2012 5.48 2014 4.84 2016 9.19 2018 10.4 2020 10.0

a. Find a polynomial function of degree 3 that models the data. b. Graph f and the data together. c. Estimate unemployment in d. Did your estimates in part c involve interpolation or extrapolation? Is there a problem with using higher degree polynomials (n ≥ 3) for extrapolation? Explain.

Solution a. Enter the six data points. Then select cubic regression. The equation for ƒ(x) is shown.

b. Here is the scatterplot.

c. f(2024) ≈ −6.58, which is incorrect because the employment rate cannot be negative.

4.2 Polynomial Functions and Models

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