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.

Slides:

Advertisements

Similar presentations

Aim: How do we solve polynomial equations using factoring?

Advertisements

Solving Quadratic Equations by Factoring. Remember: When solving a quadratic equation by factoring, you must first start with an equation set equal to.

 Pg. 15 #37-42, 46-49,53, 55. Learning Target: I will recognize the types of polynomials and multiply them together to get a single polynomials. Learning.

Converting Quadratic Equations

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

1.3 Complex Number System.

6.6 Quadratic Equations We will multiply binomials using the FOIL method. We will factor trinomials We will solve quadratic equations by factoring. We.

Objectives Fundamental Theorem of Algebra 6-6

GUIDED PRACTICE for Example How many solutions does the equation

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

6.6 Quadratic Equations. Multiplying Binomials A binomial has 2 terms Examples: x + 3, 3x – 5, x 2 + 2y 2, a – 10b To multiply binomials use the FOIL.

Converting Quadratic Equations A step-by-step guide with practice.

5.2 – Solving Quadratic Equations by Factoring (Day 1) Algebra 2.

Factoring and Solving Polynomial Equations (Day 1)

Factoring. Warm Up Multiply: Objective The student will be able to factor by distribution, grouping and factor trinomials.

5.3Product of Two Binomials. Remember! Powers/Exponents: Distributing:

Section 6.2 and 6.3 Polynomials -- A function with several terms that are added or subtracted together, such as: 5x 4 + 3x 3 – 10x x – 9 10x 5 –

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

Review Operations with Polynomials December 9, 2010.

Notes for April 28 th Answers to Warm-Up (x – 4)(x – 7)4.(6x + 9)(3x – 3)

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

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

Lesson 10.5 Factoring Objective: To factor a quadratic trinomial of the form Factoring a trinomial is the opposite of multiplying two binomials. Example:

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

Multiplying Binomials Mentally (the FOIL method) Chapter 5.4.

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

Thinking Mathematically Algebra: Equations and Inequalities 6.6 Solving Quadratic Equations.

5-5 Solving Quadratic Equations Objectives:  Solve quadratic equations.

Solving Quadratic Equations. Review of Solving Quadratic Equations ax 2 +bx +c = 0 When the equation is equal to zero, solve by factoring if you can.

8-1 Completing the Square

5.3 Factoring Quadratic Function 12/7/2012. are the numbers you multiply together to get another number: 3 and 4 are factors of 12, because 3x4=12. 2.

  Different types of Quadratics:  GCF:  Trinomials:  Difference of Squares:  Perfect Square Trinomials: Factoring Quadratics.

2.1 – Linear and Quadratic Equations Linear Equations.

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

9-2 Factoring Using the Distributive Property Objectives: 1)Students will be able to factor polynomials using the distributive property 2)Solve quadratic.

5 minutes Warm-Up Solve. 2) 1).

Section 5.4 Factoring Quadratic Expressions Obj: to find common and binomial factors of quadratic expressions.

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.

Solving Quadratic Equations. Find the quadratic equation if the solutions are 3 and -2. x = 3 x = -2 Make them equal zero. x – 3 = 0x + 2 = 0 (x – 3)(x.

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

Objective The student will be able to: multiply two polynomials using the distributive property.

9.4: FACTORING TO SOLVE QUADRATIC EQUATIONS. ZERO-PRODUCT PROPERTY WITH EXAMPLES: Zero-Product Property: If ab = 0, then a = 0 or b = 0. ( If the quadratic.

Factoring Trinomials By Grouping Method Factoring 5/17/20121Medina.

Polynomials. What are polynomials? Polynomials are expressions of more than two algebraic terms, especially the sum of several terms that contain different.

April 6, 2009 You need:textbook calculator No Fantastic Five warm ups this week. Take notes and/or read section Work together if you need help –

Chapter 10 Polynomials and Factoring

Multiplication of monomial and binomials.

8-6 Solving Quadratic Equations using Factoring

Solving quadratic equations

Multiplying Binomials

Multiplying Polynomials

Multiplying Polynomials

Solve System by Linear Combination / Addition Method

ALGEBRA REVIEW PROBLEMS

13 Exponents and Polynomials.

Notes - Solving Quadratic Equations in Factored Form

5.4 Factor and Solve Polynomial Equations

Lesson 9.6 Factor

Lesson 9.6 Factor

Multiplying Polynomials

Solving Quadratic Equations by Factoring

} 2x + 2(x + 2) = 36 2x + 2x + 4 = 36 4x + 4 = x =

Unit 1 Section 3B: MULTIPLYING POLYNOMIALS

8-3 Multiplying Polynomials by Using FOIL

Day 147 – Factoring Trinomials

Bellwork: 2/13/18 Find each product.

Review Write the product of the sum and difference. (x + 3) (x – 3)

Factoring Trinomials.

Presentation transcript:

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 term in the binomial Combine Like Terms

Objective - To solve quadratic and other polynomial equations using the zeros method Linear Equations

Objective - To solve quadratic and other polynomial equations using the zeros method. Quadratic Equations We know that if I multiply two things together at least one of them MUST be a zero. Knowing this we set both equal to zero and put an or in between them We set both (or all if there are 3 or 4) of the parts equal to zero and solve them. The answers go in brackets at the end

Use the Zero Product Property to solve for x. 1) 4) 3)