Focus: Model, Write, and Classify Polynomials

Lesson 5.1: Modelling Polynomials (P.210)

(updated as of Oct. 2010)

Focus: Model, write, and classify polynomials

Complete Investigate (p.210) Algebra Tiles (only positives) Algebra Tiles (ans incl)

Algebra Tiles (describe polynomial)

Define the following:

•  Polynomial: ______

i.e.

non-example:

•  Terms: ______i.e.

•  Coefficients: ______i.e.

•  Degree of a polynomial: ______i.e.

•  Constant term: ______i.e.

•  Monomial: ______i.e.

•  Binomial: ______i.e.

•  Trinomial: ______i.e.

Example 1) Which of these polynomials can be represented by the same algebra tiles?

a) b) c)

Example 2) Use algebra tiles to model each polynomial.

Is the polynomial a monomial, binomial, or trinomial? Explain.

a) b) c)

Example 3) Which polynomial does each group of algebra tiles represent?

Model A Model B Model C

Assignment P.214

Lesson 5.2: Like Terms and Unlike Terms (p.217)

Focus: Simplify polynomials by combining like terms

These are all zero pairs:

and and

We can use zero pairs to simplify algebraic expressions.

Example 1) Combining Like Tiles and Removing Zero Pairs

Simplify this tile model. Write the polynomial that the remaining tiles represent.

a)

Polynomial ______

b)

Polynomial ______

c)

Polynomial ______

Terms that can be represented by matching tiles are called ______terms.

•  Examples of like terms: ______

•  Examples of Unlike terms: ______

We can simplify a ______by adding the ______of the ______terms

Example 2) Simplifying a Polynomial Symbolically

Simplify:

a) b)

c) d)

5.3 Adding Polynomials (p.225)

Focus: Use different strategies to add polynomials

Investigate (p.225)

Example 1) Adding Polynomials with Algebra Tiles

o  Use algebra tiles to model concretely.

o  Draw the model pictorially below.

o  Write an addition sentence using symbols (algebraically).

Pictorially

Symbolically

Example 2) Adding Polynomials Symbolically

Add:

Example 3) Adding Polynomials Vertically

Add:

Example 4) Write a polynomial for the perimeter of this rectangle. Simplify the polynomial.

Substitute to check your answer.

Example 5) Adding Polynomials in Two Variables

5.4 Subtracting Polynomials (p.231)

Focus: Use different strategies to subtract polynomials.

Example 1) Represent the expression in 3 different ways, then simplify.

Method 1: Using tiles (______) Method 2: Using tiles (______)

Symbolically (algebraic)

Example 2) Represent the expression in 3 different ways, then simplify.

Method 1: Using tiles (______) Method 2: Using tiles (______)

Symbolically (algebraic)

Example 3) Represent the expression in 3 different ways, then simplify.

Method 1: Using tiles (______) Method 2: Using tiles (______)

Symbolically (algebraic)

Example 4) Represent the expression in 3 different ways, then simplify.

Method 1: Using tiles (______) Method 2: Using tiles (______)

Symbolically (algebraic)

Example 5) Represent the expression in 3 different ways, then simplify.

Method 1: Using tiles (______) Method 2: Using tiles (______)

Symbolically (algebraic)

Example 6) Simplify each algebraically.

a)

b)

c)

d)

e)

5.5 Multiplying & Dividing a Polynomial by a Constant

FOCUS: Use different strategies to multiply & divide a polynomial by a constant

Discuss what means? How can you represent this using a picture?

Tiles Applet

INVESTIGATE: (P.241)

Example 1) Multiplying a Binomial and a Trinomial by a Constant

Determine each product pictorially and symbolically:

a)

Pictorially Symbolically

Method 1 Method 2 Method 3

b)

Pictorially Symbolically

NOTE: Multiplication & division are ______operations.

To divide a polynomial by a constant, we ______the process of multiplication.

Representing division using a Model

Algebra Tiles Area Model Algebraically

Example 2) Dividing a Binomial and a Trinomial by a Constant

a)

Method 1: Tiles Method 2: Algebraic (breaking into terms)

b)

Method 1: Division = backwards multiplication Method 2: Algebraic (breaking into terms)

5.6 Multiplying & Dividing a Polynomial by a Monomial (p.249)

FOCUS: use different strategies to multiply and divide a polynomial by a monomial

Example 1) Multiplying a Binomial by a Monomial

Represent each expression using tiles, then complete the product.

A)

Method 1: Tiles Method 2: Area model

Method 3: Algebraic

B)

Method 1: Tiles Method 2: Area model

Method 3: Algebraic

(using the distributive property)

C)

Method 1: Tiles Method 2: Distributive property

Example 2)

A) 

B) 

C) 

NOTE: As before, multiplication & division are ______operations.

To divide a polynomial by a monomial, we ______the process of multiplication.

Example 3) Draw . Simplify.

Example 4) Draw . Simplify.

Example 5) Dividing a Monomial and a Binomial by a Monomial

Determine the quotient of each.

A) 

B) 

C) 

D) 

E)