Factoring Polynomials

Factoring Polynomials Lesson 7.6

Imagine a cube with any side length. Imagine increasing the height by 2 cm, the width by 3 cm, and the length by 4 cm.

The starting figure is a cube, so you can let x be the length of each of its sides. So, l=w=h=x. The volume of the starting figure is x3. • To find the volume of the expanded box, you can see it as the sum of the volumes of eight different boxes.

You find the volume of each piece by multiplying length by width by height.

You can also think of the expanded volume as the product of the new height, width, and length. V=(x+2)(x+3)(x+4) • A 3rd-degree polynomial function is called a cubic function. This cubic function in factored form is equivalent to the polynomial function in general form. (Try graphing both functions on your calculator.) • You already know that there is a relationship between the factored form of a quadratic equation, and the roots and x-intercepts of that quadratic equation. In this lesson you will learn how to write higher-degree polynomial equations in factored form when you know the roots of the equation. You’ll also discover useful techniques for converting a polynomial in general form to factored form.

Example A • Write cubic functions for the graphs below. • Both graphs have the same x-intercepts: -2.5, 3.2, and 7.5. So both functions have the factored form y a(x+2.5)(x-7.5)(x-3.2). But the vertical scale factor, a, is different for each function.

Example A • One way to find a is to substitute the coordinates of one other point, such as the y-intercept, into the function. The curve on the left has y-intercept (0, 240). • Substituting this point into the equation gives 240= a(2.5)(7.5)(3.2). Solving for a, you get a=4. So the equation of the cubic function on the left isy=4(x+2.5)(x-7.5)(x-3.2)

Example A • The curve on the right has y-intercept (0,-90). • Substituting this point into the equation gives -90=a(2.5)(7.5)(3.2). So a=-1.5, and the equation of the cubic function on the right isy=-1.5(x+2.5)(x-7.5)(x-3.2)

The factored form of a polynomial function tells you the zeros of the function and the x-intercepts of the graph of the function. • Recall that zeros are solutions to the equation f (x)=0. Factoring, if a polynomial can be factored, is one strategy for finding the real solutions of a polynomial equation. In the investigation you will practice writing a higher-degree polynomial function in factored form.

Box Factory • What are the different ways to construct an open-top box from a 16-by-20–unit sheet of material? What is the maximum volume this box can have? What is the minimum volume? Your group will investigate this problem by constructing open-top boxes using several possible integer values for x.

Procedural Note • Cut several 16-by-20–unit rectangles out of graph paper. • Choose several different values for x. • For each value of x, construct a box by cutting squares with side length x from each corner and folding up the sides.

Follow the Procedure Note to construct several different-size boxes from 16-by-20–unit sheets of paper. Record the dimensions of each box and calculate its volume. Make a table to record the x-values and volumes of the boxes. • For each box, what are the length, width, and height, in terms of x? Use these expressions to write a function that gives the volume of a box as a function of x. • Graph your volume function from the previous step. Plot your data points on the same graph. How do the points relate to the function?

What is the degree of this function? Give some reasons to support your answer. • Locate the x-intercepts of your graph. (There should be three.) Call these three values r1, r2, and r3. Use these values to write the function in the form y=(x-r1)(x-r2)(x-r3). • Graph the function from the previous step with your function from second step. What are the similarities and differences between the graphs? How can you alter the function from the previous step to make both functions equivalent?

They have the same x-intercepts and general shape but different vertical scale factors. A vertical scale factor of 4 makes them equivalent: y =4x(x-8)(x-10).

What happens if you try to make boxes by using the values r1, r2, and r3 as x? • What domain of x-values makes sense in this context? • What x-value maximizes the volume of the box?

Example B • Use the graph of each function to determine its factored form. The graph shows that the x-intercepts are 1 and 2. Because the coefficient of the highest-degree term, x2, is 1, the vertical scale factor is 1. The factored form is y=(x+1)(x-2).

Example B • Use the graph of each function to determine its factored form. The x-intercepts are -3, -2, and 3. So, you can write the function as Y=a(x+3)(x+2)(x-3) Because the leading coefficient needs to be 4, the vertical scale factor is also 4. Y=4(x+3)(x+2)(x-3)

In Example B, we converted a function from general form to factored form by using a graph and looking for the x-intercepts. • his method works especially well when the zeros are integer values. Once you know the zeros of a polynomial function you can write the factored form. • You can also write a polynomial function in factored form when the zeros are not integers, or even when they are nonreal.

Polynomials with real coefficients can be separated into three types: • Polynomials that can’t be completely factored with real numbers; • polynomials that can be factored with real numbers, but some of the roots are not “nice” integer or fractional values; and • polynomials that can be factored and have all integer or fractional roots.

Consider these cases of quadratic functions:

What happens when the graph of a quadratic function has exactly one point of intersection with the x-axis? It has one root that occurs twice, so it is a perfect square. Its factored form is y=a(x-r1 )2.

Factoring Polynomials