Table of Contents Factoring - Perfect Square Trinomial A Perfect Square Trinomial is any trinomial that is the result of squaring a binomial. Binomial.

Slides:

Advertisements

Similar presentations

Factoring – Sum and Difference of Two Cubes

Advertisements

FACTORING TRINOMIALS OF THE FORM X 2 +BX+C Section 6.2.

Factoring Polynomials

Perfect Square Trinomials. Form for Perfect Square Trinomials: a 2 + 2ab + b 2 OR a 2 – 2ab + b 2.

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec

(2.8) Factoring Special Products OBJECTIVE: To Factor Perfect Square Trinomials and Differences of Squares.

Factoring Decision Tree

Table of Contents Factoring – Review of Basic Factoring The following is a quick review of basic factoring 1.Common Factor Example 1:

Math Notebook. Review  Find the product of (m+2) (m-2)  Find the product of (2y-3)^2.

Warm Up. Essential Question: How do you factor a polynomial without a middle term?

Warm Up Write each expression as a trinomial. Factor each expression.

Quadratics – Completing the Square A Perfect Square Trinomial is any trinomial that is the result of squaring a binomial. Example 1: Binomial Squared Perfect.

5.4 Special Factoring Techniques

Factoring Special Cases. Factoring by Grouping. What you’ll learn To factor perfect square trinomials and differences squares. To factor higher degree.

 Polynomials Lesson 5 Factoring Special Polynomials.

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec

Section 5.4 Factoring FACTORING Greatest Common Factor,

5.4 Factoring Greatest Common Factor,

9.5 Factoring Trinomials. 9.5 – Factoring Trinomials Goals / “I can…”  Factor trinomials.

Factoring Rules. Binomial Look for the greatest common factor Look for a difference of squares. –This means that the two terms of the binomial are perfect.

Chapter 6 Section 4 Copyright © 2008 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.

Factoring General Trinomials Factoring Trinomials Factors of 9 are: REVIEW: 1, 93, 3.

Factoring a Binomial There are two possibilities when you are given a binomial. It is a difference of squares There is a monomial to factor out.

Factoring Perfect Square Trinomials

Factoring the sum and difference of two cubes By Dr. J. Arnold.

Table of Contents Factoring – Signs in Trinomials When we factor trinomials into binomials, it is very important to understand the possible sign combinations.

Factoring – Signs in Trinomials When we factor trinomials into binomials, it is very important to understand the possible sign combinations. The L in the.

Factoring General Trinomials Factoring Trinomials Factors of 9 are: REVIEW: 1, 93, 3.

Copyright © 2010 Pearson Education, Inc. All rights reserved. 6.5 – Slide 1.

Factoring Differences of Squares. Remember, when factoring, we always remove the GCF (Greatest Common Factor) first. Difference of Squares has two terms.

Unit 8, Lesson 7a. (x+3)(x+2) Multiplying Binomials (FOIL) FOIL = x 2 + 2x + 3x + 6 = x 2 + 5x + 6.

5 – 2: Solving Quadratic Equations by Factoring Objective: CA 8: Students solve and graph quadratic equations by factoring, completing the square, or using.

5-4 Factoring Quadratic Expressions M11.A.1.2.1: Find the Greatest Common Factor and/or the Least Common Multiple for sets of monomials M11.D.2.1.5: Solve.

Skills Check Factor. 1. x 2 + 2x – x x x 2 + 6x – x x x x + 15.

Page 452 – Factoring Special

Questions over hw?.

WARM UP SOLVE USING THE QUADRATIC EQUATION, WHAT IS THE EXACT ANSWER. DON’T ROUND.

Factoring - Perfect Square Trinomial A Perfect Square Trinomial is any trinomial that is the result of squaring a binomial. Binomial Squared Perfect Square.

Warm-Up: Factor the following polynomials 1.7x x – 5 1.x 2 – 15x x 4 – 8x x 6 1.6x 2 – 17x + 12.

Special Factoring Patterns Students will be able to recognize and use special factoring patterns.

Factoring Quadratic Trinomials To Factor Trinomials in the Form x² + bx + c. OBJECTIVE C can be positive or negative.

Table of Contents Square Roots of a Quantity Squared An important form of a square root is: It would seem that we should write … … but as we shall see,

Factoring – Trinomials 2 The other type of trinomial has a coefficient greater than one in front of the first squared term. We will use binomial factors.

Section 6.4 Factoring Special Forms. 6.4 Lecture Guide: Factoring Special Forms Objective 1: Factor perfect square trinomials.

Difference of Two Perfect Squares

Section 5-5: Factoring Using Special Patterns Goal: Factor Using Special Patterns.

Table of Contents Quadratics – Completing the Square A Perfect Square Trinomial is any trinomial that is the result of squaring a binomial. Example 1:

Difference of Squares Recall that, when multiplying conjugate binomials, the product is a difference of squares. E.g., (x - 7)(x + 7) = x Therefore,

Notes Over 10.8 Methods of Factoring Binomial Trinomial

Review: Factoring Trinomials

Objectives Factor perfect-square trinomials.

Factoring Perfect-Square Trinomials and Differences of Squares

Special Factoring Formulas

Do Now Determine if the following are perfect squares. If yes, identify the positive square root /16.

What numbers are Perfect Squares?

Factoring the Difference of Two Squares

Factoring Polynomials 3

Multiply (x + 3) (x + 6) (x + 2) (x + 9) (x + 1) (x + 18)

Squares of Binomials Chapter 5 Section 5.6.

Perfect Square Trinomials

4.3 Solving Quadratic Equations by Factoring

Factoring Special Forms

Objectives Factor perfect-square trinomials.

Chapter 6 Section 4.

Factoring Trinomials.

Factoring Trinomials and Difference of Two Perfect Squares

Factoring Special Products

Perfect Square Trinomial

Factoring Trinomials.

Optimization & Quadratics

Presentation transcript:

Table of Contents Factoring - Perfect Square Trinomial A Perfect Square Trinomial is any trinomial that is the result of squaring a binomial. Binomial Squared Perfect Square Trinomial

Table of Contents Our goal now is to start with a perfect square trinomial and factor it into a binomial squared. Here are the patterns. Perfect Square Trinomial Factored Note the pattern for the signs:

Table of Contents Here is how to identify a perfect square trinomial: 1.Both first and last terms are perfect squares 2.The middle term is given by If these two conditions are met, then the expression is a perfect square trinomial. Note that there is always a positive sign on both of these terms.

Table of Contents Example 1 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? 2.Is the middle term

Table of Contents Since the trinomial is a perfect square, factor it using the pattern: 1.First term a: 2.Last term b: 3.Sign same as the middle term 4.Squared

Table of Contents Example 2 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? 2.Is the middle term

Table of Contents Since the trinomial is a perfect square, factor it using the pattern: 1.First term: 2.Last term 3.Sign same as the middle term 4.Squared

Table of Contents Example 3 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? 2.Check the middle term:

Table of Contents Since the trinomial is a perfect square, factor it using the pattern: 1.First term: 2.Last term 3.Sign same as the middle term 4.Squared

Table of Contents Example 4 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? 2.Check the middle term: No This is not a perfect square trinomial. If it can be factored, another method will have to be used.

Table of Contents Example 5 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? This is not a perfect square trinomial. If it can be factored, another method will have to be used. No

Table of Contents Example 6 Factor: Determine if the trinomial is a perfect square trinomial. This is not a perfect square trinomial since the last term has a negative sign. Perfect square trinomials always have a positive sign for the last term.

Table of Contents Example 7 Factor: Determine if the trinomial is a perfect square trinomial. 1.Are both first and last terms perfect squares? 2.Check the middle term:

Table of Contents Since the trinomial is a perfect square, factor it using the pattern: 1.First term: 2.Last term 3.Sign same as the middle term 4.Squared

Table of Contents