Objective: The students will learn different types of techniques to Multiply polynomials. Students will demonstrate their understanding by achieving an.

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Presentation transcript:

Objective: The students will learn different types of techniques to Multiply polynomials. Students will demonstrate their understanding by achieving an accuracy rate of 70% or higher my.hrw.com. CFU: What are we going to learn TODAY? Math Notebook

We shall learn how to find the product of two polynomials. Learning Objective We shall learn how to find the product of two polynomials. CFU: What are we going to learn TODAY? Multiply. Activate Prior Knowledge 1. 3x2(x5 – 2y) 2. 4x(6x3 – 3y) 3. (6y3 + 2)5y5

Concept Development Polynomial:- (poly meaning "many") consisting of several terms separated by addition and subtraction. Academic Vocabulary 2: order from greatest to least

Multiplying Polynomial Expressions by Monomials Concept Development Multiplying Polynomial Expressions by Monomials

Concept Development Polynomial:- (poly meaning "many") consisting of several terms separated by addition and subtraction. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Recall: When multiplying like base, add the exponents. Step 3: Add the diagonal products (like terms). Recall: When adding like base, add the coefficients. Academic Vocabulary 2: order from greatest to least

We shall find the product of two polynomials. Concept Development We shall find the product of two polynomials. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Step 3: Add the like terms. Academic Vocabulary Box Method

Multiplying Polynomial Expressions by Monomials Concept Development Multiplying Polynomial Expressions by Monomials

Polynomial:- (poly meaning "many") consisting of several terms Concept Development Polynomial:- (poly meaning "many") consisting of several terms separated by addition and subtraction. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Recall: When multiplying like base, add the exponents. Step 3: Add the diagonal products (like terms). Recall: When adding like base, add the coefficients. Academic Vocabulary Box Method

We shall find the product of two polynomials. Concept Development We shall find the product of two polynomials. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Step 3: Add the like terms. Academic Vocabulary Box Method

Multiplying Polynomial Expressions by Monomials Concept Development Multiplying Polynomial Expressions by Monomials

Polynomial:- (poly meaning "many") consisting of several terms Concept Development Polynomial:- (poly meaning "many") consisting of several terms separated by addition and subtraction. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Recall: When multiplying like base, add the exponents. Step 3: Add the diagonal products (like terms). Recall: When adding like base, add the coefficients. Academic Vocabulary Box Method

We shall find the product of two polynomials. Concept Development We shall find the product of two polynomials. Step 1: Write one of the polynomial on the top and the other on the side of a box. *It does not matter which goes where. Step 2: Multiply the edges (adding exponents) and together and fill in the corresponding spot. Step 3: Add the like terms. Academic Vocabulary Box Method

(x 2 – 4x + 1)(x 2 + 5x – 2) Multiplying Polynomial Expressions Concept Development Multiplying Polynomial Expressions (x 2 – 4x + 1)(x 2 + 5x – 2)

Multiply Special Products of Binomials Square of a Binomial Concept Development Multiply Special Products of Binomials Square of a Binomial Sum & Difference of Square Recall: When multiplying like base, add the exponents. Recall: When adding like base, add the coefficients.

Multiply Special Products of Binomials Concept Development Multiply Special Products of Binomials Recall: When multiplying like base, add the exponents. Recall: When adding like base, add the coefficients.

Quadratic Box Method Monomials Binomials Trinomials Closure Summary Closure What did you learn today about Multiplying Polynomials using Box-Method? Quadratic Box Method Monomials Binomials Trinomials Polynomials Multiply Coefficients Exponents Word Bank