A monomial is measured by its degree To find its degree, we add up the exponents of all the variables of the monomial.

Similar documents
UNIT 2 FACTORING. M2 Ch 11 all

Topic 7: Polynomials. Introduction to Polynomials. Table of Contents. Vocab. Degree of a Polynomial. Vocab. A. 11x 7 + 3x 3

MathB65 Ch 4 VII, VIII, IX.notebook. November 06, 2017

Review for Mastery. Integer Exponents. Zero Exponents Negative Exponents Negative Exponents in the Denominator. Definition.

Day 131 Practice. What Can You Do With Polynomials?

Sections 7.1, 7.2: Sums, differences, products of polynomials CHAPTER 7: POLYNOMIALS

MathB65 Ch 4 IV, V, VI.notebook. October 31, 2017

5.3. Polynomials and Polynomial Functions

Something that can have different values at different times. A variable is usually represented by a letter in algebraic expressions.

Algebra 1: Hutschenreuter Chapter 10 Notes Adding and Subtracting Polynomials

Module 11 Lesson 3. Polynomial Functions Quiz. Some questions are doubled up if a pool wants to be set up to randomize the questions.

A polynomial is an algebraic expression that has many terms connected by only the operations of +, -, and of variables.

Graphs of Polynomials: Polynomial functions of degree 2 or higher are smooth and continuous. (No sharp corners or breaks).

Chapter 5: Exponents and Polynomials

When you square a binomial, you can apply the FOIL method to find the product. You can also apply the following rules as a short cut.

( 4 p 3. ( 2 p 2. ( x 3 y 4. ( y. (2 p 2 ) 2 ( q 4 ) 2. ( x 2 ) POLYNOMIALS, PAGES CHECK IT OUT! PAGES

Find a common monomial factor. = 2y 3 (y + 3)(y 3) Difference of two squares

LT1: Adding and Subtracting Polynomials. *When subtracting polynomials, distribute the negative to the second parentheses. Then combine like terms.

Polynomials and Polynomial Equations

polynomial function polynomial function of degree n leading coefficient leading-term test quartic function turning point

I CAN classify polynomials by degree and by the number of terms.

6-3 Polynomials. Warm Up Lesson Presentation Lesson Quiz. Holt McDougal Algebra 1

2-2: Evaluate and Graph Polynomial Functions

Controlling the Population

Functions: Polynomial, Rational, Exponential

Lesson 3 Algebraic expression: - the result obtained by applying operations (+, -,, ) to a collection of numbers and/or variables o

Review Notes - Solving Quadratic Equations

2, or x 5, 3 x 0, x 2

Algebra 1 Seamless Curriculum Guide

Chapter Six. Polynomials. Properties of Exponents Algebraic Expressions Addition, Subtraction, and Multiplication Factoring Solving by Factoring

LESSON 7.2 FACTORING POLYNOMIALS II

20A. Build. Build and add. Build a rectangle and find the area (product). l e s s o n p r a c t i c e 1. X X X 2 + 6X X

Algebra. Practice Pack

Unit 2: Polynomials Guided Notes

POLYNOMIAL EXPRESSIONS PART 1

Polynomials. Title Page. Prior Knowledge: understanding of coefficients and terms

Math 0312 EXAM 2 Review Questions

THE DISTRIBUTIVE LAW. Note: To avoid mistakes, include arrows above or below the terms that are being multiplied.

Chapter 6. Polynomials

Unit 7: Factoring Quadratic Polynomials

Name: Chapter 7: Exponents and Polynomials

Polynomial comes from poly- (meaning "many") and -nomial (in this case meaning "term")... so it says "many terms

Find two positive factors of 24 whose sum is 10. Make an organized list.

Adding and Subtracting Polynomials Add and Subtract Polynomials by doing the following: Combine like terms

Combining Like Terms in Polynomials

Unit 1 Vocabulary. A function that contains 1 or more or terms. The variables may be to any non-negative power.

UNIT 9 (Chapter 7 BI) Polynomials and Factoring Name:

Chapter 3-1 Polynomials

Polynomial Functions

Math 101 Study Session Spring 2016 Test 4 Chapter 10, Chapter 11 Chapter 12 Section 1, and Chapter 12 Section 2

MATH98 Intermediate Algebra Practice Test Form B

Algebra I Unit Report Summary

Math 10-C Polynomials Concept Sheets

Unit 1: Polynomial Functions SuggestedTime:14 hours

Algebra 1 Mod 1 Review Worksheet I. Graphs Consider the graph below. Please do this worksheet in your notebook, not on this paper.

Chapter 8 Polynomials and Factoring

Part 2 - Beginning Algebra Summary

MA094 Part 2 - Beginning Algebra Summary

Unit 2: Polynomials Guided Notes

UP AND UP DOWN AND DOWN DOWN AND UP UP AND DOWN

The most factored form is usually accomplished by common factoring the expression. But, any type of factoring may come into play.

Rising 8th Grade Math. Algebra 1 Summer Review Packet

MATH98 Intermediate Algebra Practice Test Form A

Polynomials. Exponents. End Behavior. Writing. Solving Factoring. Graphing. End Behavior. Polynomial Notes. Synthetic Division.

Sections 7.2, 7.3, 4.1

Real Numbers. Real numbers are divided into two types, rational numbers and irrational numbers

Topics Covered in Math 115

Warm Up answers. 1. x 2. 3x²y 8xy² 3. 7x² - 3x 4. 1 term 5. 2 terms 6. 3 terms

Polynomial Operations

8-1. Adding and Subtracting Polynomials. Warm- Up. Write in Standard Form. Write in Slope Intercept Form. 1.) y = -! x +2 2.

Unit 3: Polynomial Functions. By: Anika Ahmed, Pavitra Madala, and Varnika Kasu

6-3 Polynomials 6-3 Polynomials

Algebra I Polynomials

Beginning Algebra MAT0024C. Professor Sikora. Professor M. J. Sikora ~ Valencia Community College

{ independent variable some property or restriction about independent variable } where the vertical line is read such that.

Teacher's Page. Mar 20 8:26 AM

8-1: Adding and Subtracting Polynomials

Maintaining Mathematical Proficiency

6.1 Using Properties of Exponents 1. Use properties of exponents to evaluate and simplify expressions involving powers. Product of Powers Property

MULTIPLYING TRINOMIALS

Multiplying a Monomial times a Monomial. To multiply a monomial term times a monomial term with radicals you use the following rule A B C D = A C B D

Solving Equations Quick Reference

MATH 0960 ELEMENTARY ALGEBRA FOR COLLEGE STUDENTS (8 TH EDITION) BY ANGEL & RUNDE Course Outline

Algebra 2 Summer Work Packet Review and Study Guide

Note: A file Algebra Unit 09 Practice X Patterns can be useful to prepare students to quickly find sum and product.

2.1 Quadratic Functions

( ) is called the dependent variable because its

Mathematics Textbook Correlation to the 2016 Algebra I Standards of Learning and Curriculum Framework

Solving Quadratic Equations Review

P4 Polynomials and P5 Factoring Polynomials

Adding and Subtracting Polynomials

Vocabulary. Term Page Definition Clarifying Example. binomial. cubic. degree of a monomial. degree of a polynomial

Properties of Real Numbers

Ready To Go On? Skills Intervention 7-1 Integer Exponents

Module 4: Equations and Inequalities in One Variable

7-7 Multiplying Polynomials

Unit 3 Factors & Products

5.2. Adding and Subtracting Polynomials. Objectives. Know the basic definitions for polynomials. Add and subtract polynomials.

7.2 Solving Quadratic Equations by Factoring

ISSUED BY KENDRIYA VIDYALAYA - DOWNLOADED FROM Chapter - 2. (Polynomials)

Transcription:

UNIT 6 POLYNOMIALS

Polynomial (Definition) A monomial or a sum of monomials. A monomial is measured by its degree To find its degree, we add up the exponents of all the variables of the monomial. Ex. 2 x 3 y 4 z 5 2 has a degree of 0 (do not mistake degree for zero exponent) x 3 has an exponent of 3 y 4 has an exponent of 4 z 5 has an exponent of 5 Add up the exponents of your variables only 3 + 4 + 5 = 12 This monomial would be a 12th degree polynomial

Let's Practice Finding the Degree of a Monomial 3 degree of 3x degree of 3x 2 degree of 3x 3 degree of 3x 4 degree of

DEGREE OF A POLYNOMIAL The degree of a polynomial is determined by the monomial with the highest degree. 3 would be a 0 degree polynomial because all numbers have a degree of zero. (NOT TO BE CONFUSED WITH ZERO EXPONENT PROPERTY). We call 0 degree polynomials CONSTANT. 3x would be a 1st degree polynomial because the 3 has a degree of 0 and x has an exponent of 1. We call 1st degree polynomials LINEAR. 3x 2 would be a 2nd degree polynomial because the 3 has a degree of 0 and x 2 has an exponent of 2. We call 2nd degree polynomials QUADRATIC. 3x 3 would be a 3rd degree polynomial because the 3 has a degree of 0 and x 3 has an exponent of 3. We call 3rd degree polynomials CUBIC. 3x 4 would be a 4th degree polynomial because the 3 has a degree of 0 and x 4 has an exponent of 4. We call 4th degree polynomials QUARTIC. 3x 5 would be a 5th degree polynomial because the 3 has a degree of 0 and x 5 has an exponent of 5. We call 5th degree polynomials QUINTIC. 3x 6 would be a 6th degree polynomial because the 3 has a degree of 0 and x 6 has an exponent of 6. We call 6th degree and above their degree name, so it would be a polynomial to the 6TH DEGREE.

NAMING A POLYNOMIAL The number of terms added together determines the name of a polynomial. 6 has only 1 term and would be called a MONOMIAL. x + 3 has 2 terms and would be called a BINOMIAL. x 2 + x + 3 had 3 terms and would be called a TRINOMIAL. x 3 + x 2 + x + 3 has 4 terms and would be called a POLYNOMIAL. Any polynomial with 4 or more terms is also called a POLYNOMIAL.

Use this chart as a guide

Let's Practice (Fill out this table)

STANDARD FORM The terms of a polynomial are usually arranged so that the terms are in order from greatest degree to least degree. This is called the standard form of a polynomial. Ex: x 2 + x + 1 is in standard form because the terms are arranged from greatest to least degree from left to right. 2nd degree, 1st degree, zero degree Practice problems 7-12 on page 5 of Ch 8 Sec 1 Study Guide by writing each polynomial in standard form.

Leading Coeffcient The number in front of the monomial with the largest degree. Ex. x 2 + x + 1 1 is the leading coefficient since x 2 is the highest degree of any of the 3 monomials. Practice problems 7-12 on page 5 of Ch 8 Sec 1 Study Guide by determining the leading coefficient of each polynomial.

MULTIPLYING A POLYNOMIAL AND A MONOMIAL METHOD 1 HORIZONTAL x( 5x + x 2 ) x(5x) + x(x 2 ) 5x 2 + x 3 x 3 + 5x 2 distribute the x to each term inside the parenthesis simplify 1 is the leading coefficient put in standard form (greatest to least degree) Cubic Binomial is its proper name

METHOD 2 VERTICAL x( 5x + x 2 ) 5x + x 2 (x) x multiply x to each term 5x 2 + x 3 x 3 + 5x 2 put in standard form (greatest to least degree) 1 is the leading coefficient Cubic Binomial is its proper name Practice multiplying by one of the methods on Worksheet 8-2 Study Guide page 12 (1-9)

MULTIPLYING A BINOMIAL BY A BINOMIAL HORIZONTAL (FOIL) When 2 binomials are multiplied together, the result will always result in 4 terms. Those 4 terms will be simplified into standard form and result in a TRINOMIAL. We will concentrate on Quadratic Trinomials. Practice using the FOIL method on 8-3 Study Guide page 18 (1-18)

SPECIAL PRODUCTS Ex. 1 Square of a Sum ( x + 4 ) 2 a is x b is 4 2(a)(b) is 2(x)(4) a 2 = (x) 2 2ab = 2(4x) b 2 = (4) 2 Put them all together to get x 2 + 8x + 16 Ex. 2 Square of a difference ( x - 6 ) 2 a is x b is -6 2(a)(b) is 2(x)(-6) a 2 = (x) 2 2ab = 2(-6x) b 2 = (-6) 2 Put them all together to get x 2-12x + 36 Practice solving for special products on 8-3 Study Guide page 25 (1-21)

Ex. 3 ( x + 4 ) ( x - 4 ) a is x b is 4 and -4 2ab is 2(x)(4) and 2(x)(-4) a 2 = (x) 2 2ab = 2(4x) + 2(-4x) b 2 = -(4) 2 Put them all together to get x 2 + 8x -8x -16 x 2-16 Simplify Practice finding special products on 8-3 Study Guide page 26 (1-21)

2024 © sciencedocbox.com Privacy Policy | Terms of Service | Feedback