Display Title
Video Tutorial--Polynomial Concepts--Video 3--Multiplying Polynomials
Display Title
Video Tutorial--Polynomial Concepts--Video 3--Multiplying Polynomials
Topic
Polynomials
Description
This segment explores multiplication of polynomials using techniques like the distributive property and the FOIL method for binomials. It explains the closure property under multiplication and applies these concepts to find areas and volumes of geometric shapes. Key vocabulary includes distributive property, FOIL method, monomial, binomial, trinomial, and product.
This video is essential to understand the topic of Polynomials. It provides insights into mathematical concepts and their applications, with a focus on building foundational understanding.
Teacher’s Script: Students, as we dive into today’s topic, this video will offer a visual exploration of multiplication of polynomials using techniques like the distributive property and the FOIL method for binomials. It explains the closure property under multiplication and applies these concepts to find areas and volumes of geometric shapes. Key vocabulary includes distributive property, FOIL method, monomial, binomial, trinomial, and product. It’s designed to clarify key points and provide practical examples. Pay close attention to how the concepts are illustrated, as they will be crucial for our upcoming activities.
For a complete collection of videos related to Polynomials click on this link: Polynomials Collection.
What Are Polynomials?
Polynomials Are Made Up of Monomials
A monomial is a single expression that is usually the product of a number and one or more variables raised to a positive exponent power. Read the following definition.
A monomial is an example of a polynomial.
Binomials Are Made Up of Two Monomials
If you combine two monomials, you have a binomial, so long as the two monomials cannot be further added or subtracted. Read the following definition.
Notice how each binomial is made up of two monomials. Here’s an example of two monomials that, when combined, result in a monomial, not a binomial.
Trinomials Are Made Up of Three Monomials
If you combine three monomials, you have a trinomial, so long as the monomials cannot be further added or subtracted. Read the following definition.
Notice how each binomial is made up of three monomials.
The Degree of a Polynomial
The term with the highest exponent determines the degree of the polynomial.
This is a polynomial of degree 1:
This is a polynomial of degree 2:
This is a polynomial of degree 3:
Common Core Standards | CCSS.MATH.CONTENT.HSA.APR.A.1, CCSS.MATH.CONTENT.HSF.IF.C.7.C |
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Duration | 6 minutes |
Grade Range | 9 - 12 |
Curriculum Nodes |
Algebra • Polynomials • Polynomial Expressions • The FOIL Method |
Copyright Year | 2021 |
Keywords | polynomials, multiplication, Closure Property |