X-box Factoring

Warm-UpPlease complete these individually.1. Fill in the following X-solve problems.

a. b. c.

2. Write the general form of a quadratic equation.

3. Divide using the box method. a. 4a3 + 12a2 + 6a b. 14x5y3 – 35x4y2 + 21x2y 2a 7xy

X- Box

Product

X-box Factoring• This is a guaranteed method for factoring

quadratic equations—no guessing necessary!• We will learn how to factor quadratic

equations using the x-box method• Background knowledge needed:

– Basic x-solve problems– General form of a quadratic equation– Dividing a polynomial by a monomial using the

box method

Standard 11.0Students apply basic factoring techniques to

second- and simple third-degree polynomials. These techniques include finding a common factor for all terms in a polynomial, recognizing the difference of two squares, and recognizing perfect squares of binomials.

Objective: I can use the x-box method to factor non-prime trinomials.

Factor the x-box wayExample: Factor 3x2 -13x -10

(3)(-10)=-30

3x2 -13x -10 = (x-5)(3x+2)

Factor the x-box way

Middleb=m+

Product

ac=mnm n

First and Last

Coefficients

y = ax2 + bx + c

Last term

1st Term

Factorn

Factorm

Base 1 Base 2

Height

ExamplesFactor using the x-box method.1. x2 + 4x – 12 a) b)

4 6 -2 x2 6x

-2x -12

Solution: x2 + 4x – 12 = (x + 6)(x - 2)

Examples continued

2. x2 - 9x + 20a) b)

x2 -4x

-5x 20

Solution: x2 - 9x + 20 = (x - 4)(x - 5)

Think-Pair-Share1. Based on the problems we’ve done,

list the steps in the diamond/box factoring method so that someone else can do a problem using only your steps.

2. Trade papers with your partner and use their steps to factor the following problem: x2 +4x -32.

Trying out the Steps3. If you cannot complete the problem

using only the steps written, put an arrow on the step where you stopped. Give your partner’s paper back to him.

4. Modify the steps you wrote to correct any incomplete or incorrect steps. Finish the problem based on your new steps and give the steps back to your partner.

5. Try using the steps again to factor: 4x2 +4x -3.

Stepping Up6. Edit your steps and factor:

3x2 + 11x – 20.7. Formalize the steps as a class.

Examples continued

3. 2x2 - 5x - 7 a) b)

2x2 -7x

x2x -7

Solution: 2x2 - 5x – 7 = (2x - 7)(x + 1)

Examples continued

3. 15x2 + 7x - 2 a) b) -30

15x2 10x

-3x -2

5x3x +

Solution: 15x2 + 7x – 2 = (3x + 2)(5x - 1)

Guided PracticeGrab your white boards, pens and erasers!

Independent Practice

Do the worksheets for Homework using the x-box method. Show all your work to receive credit– don’t forget to check by multiplying!

X-box Factoring

Documents

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2.1 Factoring out the GCF and Factoring by Grouping · 55 2.1 Factoring out the GCF and Factoring by Grouping CHAPTER 2 POLYNOMIAL FACTORING 2.1 Factoring out the GCF and Factoring