Objective - To multiply polynomials. Multiply the polynomial by the monomial. 1) 3(x + 4) 2) 3) Distributive Property.

Slides:

Advertisements

Similar presentations

5.2 Multiplying Polynomials. To Multiply Polynomials Each term of one polynomial must be multiply each term of the other polynomial.

Advertisements

Objective: To be able to find the product of two binomials. Objective: To be able to find the product of two binomials. 8.7 Multiplying Polynomials Part.

Day 1 – Polynomials Multiplying Mrs. Parziale

Polynomials and Factoring Review By: Ms. Williams.

Mutiplying Brackets.

Adding and Subtracting Polynomials Section 0.3. Polynomial A polynomial in x is an algebraic expression of the form: The degree of the polynomial is n.

Polynomials P4.

Warm Up 1.) What is the simplified form of –x2(2x3 + 5x2 + 6x)?

 We use the acronym below to multiply two binomials. F – O – I – L – FIRST OUTSIDE INSIDE LAST.

EXAMPLE 3 Factor by grouping Factor the polynomial x 3 – 3x 2 – 16x + 48 completely. x 3 – 3x 2 – 16x + 48 Factor by grouping. = (x 2 – 16)(x – 3) Distributive.

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

Degree The largest exponent Standard Form Descending order according to exponents.

How do you perform operations with polynomials? Section P4 (old text)

 Simplify the following…  2(4 + x)  x(x – 3x 2 + 2)  5x – 2 + 6x  2x 2 + 5x – 11x  8x(4x 2 )

Multiplying Polynomials

Review Operations with Polynomials December 9, 2010.

Multiplying Polynomials *You must know how to multiply before you can factor!”

More about multiplying polynomials February 17, 2010.

Aim: How do we multiply polynomials? Do Now: Multiply the following 1. 2x(3x + 1) 2. (x – 1)(x + 2) 3. (x +2)(x 2 – 3x + 1)

Lesson 7-7 Multiplying Polynomials

Day Problems Simplify each product. 1. 8m(m + 6) 2. -2x(6x3 – x2 + 5x)

Multiplying Binomials Mentally (the FOIL method) Chapter 5.4.

Quiz 1) 2). Multiplying a Trinomial and Binomial We can’t FOIL because it is not 2 binomials. So we will distribute each term in the trinomial to each.

I. Using the Distributive Property To simplify a of two binomials, you can each term of the first binomial to each term in the binomial. PRODUCT DISTRIBUTE.

Objective - To multiply polynomials. Multiply the polynomial by the monomial. 1) 3(x + 4) 2) 3) Distributive Property.

Multiplying Polynomials January 29, Page #10-38 even 10) terms: 5x 3, x; coefficients: 5, 1 12) term: 7x 2 ; coeff: 7 14) monomial 16) monomial.

EQ – what is a polynomial, and how can I tell if a term is one?

CLASSIFYING POLYNOMIALS. A _______________ is a sum or difference of terms. Polynomials have special names based on their _______ and the number of _______.

Multiplying Polynomials -Distributive property -FOIL -Box Method.

Copyright © 2010 Pearson Education, Inc. All rights reserved. 5.3 – Slide 1.

Copyright © 2014, 2010, 2006 Pearson Education, Inc. Section 5.3 Slide 1 Exponents and Polynomials 5.

Multiplying Polynomials January 29, Page #10-38 even 10) terms: 5x 3, x; coefficients: 5, 1 12) term: 7x 2 ; coeff: 7 14) monomial 16) monomial.

EXAMPLE 3 Multiply polynomials vertically

Using Distribution with Polynomials Copyright Scott Storla 2015.

Notes Rev.3 Multiply Polynomials Distributive Property FOIL Boxes Square Binomials Mentally.

Objective - To recognize and use the factoring pattern, Difference of Squares. Multiply. 1) 2) 3) 4) Inner and Outer terms cancel!

Binomial X Binomial The problems will look like this: (x – 4)(x + 9)

8.7 Multiplying Polynomials What you’ll learn: 1.To multiply two binomials 2.To multiply two polynomials.

EXAMPLE 3 Factor by grouping Factor the polynomial x 3 – 3x 2 – 16x + 48 completely. x 3 – 3x 2 – 16x + 48 Factor by grouping. = (x 2 – 16)(x – 3) Distributive.

MULTIPLYING AND FACTORING CHAPTER 8 SECTION 2 AND 3.

EXAMPLE 3 Multiply polynomials vertically Find the product (b 2 + 6b – 7)(3b – 4). SOLUTION STEP 1 Multiply by – 4. b 2 + 6b – 7 – 4b 2 – 24b b –

Mrs. Reynolds 2/19/14. When multiplying two binomials, you can use the FOIL Method. FOIL is a series of four steps using the Distributive Property.

Lesson 10.2 Multiplying Polynomials Objective: To multiply polynomials Multiply monomials by other polynomials by using distributive property Examples.

8.7 Multiplying Polynomials. Multiplying a Binomial by a Binomial A binomial is a polynomial with two terms. To multiply a binomial by a binomial, you.

Notes Over 6.3 Adding Polynomial Horizontally and Vertically Find the sum. Just combine like terms.

Notes Over 10.2 Multiply binomials by using F O I L.

Multiply two binomials using FOIL method

Multiplying Binomials

Polynomials and Polynomial Functions

Objective - To multiply polynomials.

Algebra I Section 9.1 – 9.2 Review

Aim: How do we multiply polynomials?

5.4 Multiplying Polynomials.

Multiplying Binomials and Special Cases

Multiplying Binomials

Multiplying Polynomials

Identifying Terms, Factors, and Coefficients (3.1.1)

Multiplying Polynomials

Exponents, Polynomials, and Polynomial Functions

Notes Over 10.2 Multiply binomials by using F O I L.

13 Exponents and Polynomials.

Multiplying Polynomials

Unit 1 Section 3B: MULTIPLYING POLYNOMIALS

Warm up: Match: Constant Linear Quadratic Cubic x3 – 2x 7

(2)(4) + (2)(5) + (3)(4) + (3)(5) =

Ch Part 1 Multiplying Polynomials

Warm Up Simplify the expression by using distributive property and then combining like terms. x(x + 5) + 4(x + 5)

Multiplying Polynomials

Objective - To multiply binomials mentally using FOIL.

Objective - To recognize and use the factoring pattern, Difference of Squares. Multiply. 1) 2) 3) 4) Inner and Outer terms cancel!

Presentation transcript:

Objective - To multiply polynomials. Multiply the polynomial by the monomial. 1) 3(x + 4) 2) 3) Distributive Property

Note#2 Standard: 10.2 Multiplying Polynomials Objective: Multiply two polynomials

Multiplying Polynomials Horizontal Method + + Vertical Method

Polynomial Squares Simplify. Common mistake!

Simplify. 1)2)

Objective - To multiply binomials mentally using FOIL. Often the product of two binomials =Trinomial = Takes too long! Quadratic Term Linear Term Constant Term

For use with the product of binomials only! FirstOuterInnerLast

For use with the product of binomials only! First OuterInnerLast

For use with the product of binomials only! FirstOuterInner Last

For use with the product of binomials only! First Outer InnerLast

For use with the product of binomials only! FirstOuter Inner Last

For use with the product of binomials only! First OuterInnerLast

For use with the product of binomials only! First Outer InnerLast

For use with the product of binomials only! FirstOuter Inner Last

For use with the product of binomials only! FirstOuterInner Last

For use with the product of binomials only! FirstOuterInnerLast

Try... FirstOuterInnerLast

Use FOIL to multiply the binomials below. 1) 2) 3) 4) 5) 6) 7) 8) 9) 10)

Use FOIL to multiply the binomials below. 11) 12) 13) 14) 15) 16) 17) 18) 19) 20)