11.4 Multiply & Divide Radical Expressions

Slides:

Advertisements

Similar presentations

Algebraic Expressions – Rationalizing the Denominator

Advertisements

Warm Up Simplify each expression

Simplifying Radical Expressions Product Property of Radicals For any numbers a and b where and,

Multiplying and Dividing Radial Expressions 11-8

Multiply complex numbers

SQUARE ROOT METHOD. Simplify Radicals A. Single Ex.

10.5 Multiplying and Dividing Radical Expressions

Binomial Radical Expressions

11-2: Operations with Radical Expressions

Objectives Multiply and divide radical expressions.

Multiplying and Dividing Radial Expressions 11-8

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec

Identify the perfect square in each set , 81, 27, , 99, 8, , 84, 12, , 216, 196, 72 Find the Prime Factorization of.

5.5 Roots of Real Numbers and Radical Expressions.

Unit 2 Algebra Investigations Lesson 3: Rational and Radical Expressions Notes 3.4: Simplify Radical Expressions.

Lesson 10-3 Warm-Up.

7.7 Operations with Radicals.  A or of radicals can be simplified using the following rules.  1. Simplify each in the sum.  2. Then, combine radical.

11-4 Multiplying and Dividing Radical Expressions Warm Up Warm Up Lesson Presentation Lesson Presentation California Standards California StandardsPreview.

Including Rationalizing The Denominators. Warm Up Simplify each expression

CONFIDENTIAL 1 Algebra1 Multiplying and Dividing Radical Expressions.

6.3 Binomial Radical Expressions P You can only use this property if the indexes AND the radicands are the same. This is just combining like terms.

12.2 Operations with Radical Expressions √

Simplifying Radical Expressions Basic multiplication Basic division o Rationalize the denominator.

Lesson 2.1, page 266 Complex Numbers Objective: To add, subtract, multiply, or divide complex numbers.

Complex Number System Adding, Subtracting, Multiplying and Dividing Complex Numbers Simplify powers of i.

Conjugate of Denominator

Copyright © Cengage Learning. All rights reserved. 8 Radical Functions.

To divide radicals: divide the coefficients divide the radicands if possible rationalize the denominator so that no radical remains in the denominator.

Conjugate: Value or that is multiplied to a radical expression That clears the radical. Rationalizing: Removing a radical expression from the denominator.

Chapter 11 Sec 1 Simplifying Radical Expressions.

Advanced Algebra Notes Section 4.5: Simplifying Radicals (A) A number r is a _____________ of a number x if. The number r is a factor that is used twice.

7.3 Binomial Radical Expressions (Day 1). Like Terms/Radicals Like radicals - radical expressions that have the same index and the same radicand When.

Lesson 1 MI/Vocab radical expression radicand rationalizing the denominator conjugate Simplify radical expression using the Product Property of Square.

Lesson 1 MI/Vocab radical expression radicand rationalizing the denominator conjugate Simplify radical expression using the Product Property of Square.

Holt Algebra Multiplying and Dividing Radical Expressions Warm Up(On Separate Sheet) Simplify each expression

Holt Algebra Multiplying and Dividing Radical Expressions Warm Up Simplify each expression

Operations w/ Radicals Chapter 10, Section 3. Targets I will be able to simplify sums and differences of radical expressions. I will be able to simplify.

Fractional Expressions Section 1.4. Objectives Simplify fractional expressions. Multiply and divide fractional expressions. Add and subtract fractional.

 Radical expressions that contain the sum and difference of the same two terms are called conjugates.

7.5 Operations with Radical Expressions. Review of Properties of Radicals Product Property If all parts of the radicand are positive- separate each part.

A or of radicals can be simplified using the following rules. 1. Simplify each in the sum. 2. Then, combine radical terms containing the same and. sumdifference.

Copyright © 2012, 2008, 2004 Pearson Education, Inc. 1 Objectives Multiplying and Dividing Radical Expressions Multiply radical expressions. Rationalize.

 Simplify then perform the operations indicated….

Homework Multiply. Write each product in simplest form. All variables represent nonnegative numbers Simplify each quotient.

Warm Up Simplify each expression

Multiplying and Dividing Radial Expressions 11-8

Roots, Radicals, and Root Functions

Multiplying and Dividing Radial Expressions 11-8

Multiplying and Dividing Radical Expressions

Simplifying Radical Expressions

Simplifying Radical Expressions

Multiplying and Dividing Radial Expressions 11-8

Simplifying Radical Expressions

Simplifying Radical Expressions

Simplifying Radical Expressions

Multiplying Binomial Radial Expressions and Rationalizing with Conjugates. MA.912.A.6.2 Add, subtract, multiply, and divide radical expressions (Square.

Chapter 8 Section 5.

Warm Up Simplify each expression

12.2 Operations with Radical Expressions √

Rationalizing Denominators and Numerators of Radical Expressions

Radical Expressions CA 2.0.

Rationalizing Denominators and Numerators of Radical Expressions

Operations with Radical Expressions √

Simplifying Radical Expressions

10-1 Simplifying Radicals

Dividing Radical Expressions

Simplifying Radical Expressions

Dear Power point User, This power point will be best viewed as a slideshow. At the top of the page click on slideshow, then click from the beginning.

Roots, Radicals, and Root Functions

Chapter 8 Section 5.

Presentation transcript:

11.4 Multiply & Divide Radical Expressions Algebra 2.0

Main Idea We are using the Product and Quotient Properties of Square Roots to multiply and divide radical expressions. All your skills from 11.2 and Ch 7 will be needed.

Ex 1 Multiplying Square Roots Multiply terms together under radical Multiply terms together outside the radical Simplify

Practice

Ex 2-Using the Distributive Property Use the Distributive Property, then simplify.

Practice 2

Ex 3-Multiplying Sums & Differences Of Radicals Just like multiplying binomials, use FOIL or Punnett Square.

Practice 3

Ex 4-Rationalizing the Denominator You CAN’T have square roots in the DENOMINATOR, so you must get rid of them. This is called rationalizing the denominator. To rationalize the denominator, multiply both top and bottom by it.

Ex 4-Rationalizing the Denominator

Practice 4

Ex ???-Conjugates

CONJUGATES To eliminate a binomial radical in the denominator, multiply by the opposite binomial on top and bottom. Use FOIL or Punnett Square to multiply binomials.

Ex ???-Conjugates Ex 1 Ex 2

Conjugate Practice #1 #2

Lesson Review What is the multiplication and division property of square roots? What chapter 7 method(s) did we use when multiplying two binomials? When do we need to rationalize the denominator? What is a conjugate?