Presentation is loading. Please wait.

Presentation is loading. Please wait.

Solving Radical Equations Copyright © 2011 by Lynda Aguirre1.

Published byClarence Fletcher Modified over 8 years ago

Similar presentations

Presentation on theme: "Solving Radical Equations Copyright © 2011 by Lynda Aguirre1."— Presentation transcript:

1 Solving Radical Equations Copyright © 2011 by Lynda Aguirre1

2 Radical Equations A RADICAL is the symbol best known as a square root symbol. Copyright © 2011 by Lynda Aguirre2 A Radical Equation has both a radical and an equal sign.

3 Radicals The square root actually has numbers in it that are “understood” and therefore they are not written in. Copyright © 2011 by Lynda Aguirre3 Root = 2 Radicand The object under the radical symbol Power = 1 That means that the Square Root of “Happy Face” is actually… The 2 nd root of “Happy Face” raised to the first power.

4 Radicals If the Radical is part of an Equation, it can be eliminated by raising both sides to the matching power (i.e. power = root) Copyright © 2011 by Lynda Aguirre4 Root = 2 The 2 nd power cancels out the 2 nd root Since the root is not showing, that makes it a “2” (or 2 nd root) Procedure: Raise both sides to the 2 nd power to eliminate the 2 nd root. Calculate the other side

5 Radical Equations If the Radical is part of an Equation, it can be eliminated by raising both sides to the matching power (i.e. power = root) Copyright © 2011 by Lynda Aguirre5 Root = 3 The 3 rd power cancels out the 3 rd root If the root is a “3” (or 3 rd root) Procedure: Raise both sides to the 3 rd power to eliminate the 3 rd root. Calculate the other side

6 Radicals If the Radical is part of an Equation, it can be eliminated by raising both sides to the matching power (i.e. power = root) Copyright © 2011 by Lynda Aguirre6 Root = 2 Since the root is not showing, that makes it a “2” (or 2 nd root) Raise both sides to the 2 nd power to eliminate the 2 nd root. Solve for “x”

7 Radical Equations If the Radical is part of an Equation, it can be eliminated by raising both sides to the matching power (i.e. power = root) Copyright © 2011 by Lynda Aguirre7 Root = 2 Since the root is not showing, that makes it a “2” (or 2 nd root) Raise both sides to the 2 nd power to eliminate the 2 nd root. Calculate the other side (Use FOIL) Solve for “x” Factor it “2” doesn’t work, so the solution is x = 6 Note: You must check answers when solving radical equations. (Plug the answers into the original problem and see if the sides are equal)

8 Radical Equations 2) Square both sides 1) Isolate Radical 3) Simplify each side 4) Solve for x SOLUTION Subtract 3 from both sides Subtract 2 from both sides Copyright © 2011 by Lynda Aguirre8

9 Radical Equations 2) Square both sides 1) Isolate Radical 3) Simplify each side 4) Solve for x SOLUTION Already isolated Subtract 3 from both sides Expand and use FOIL Subtract x from both sides and factor Regular factoring gives us 6 and 1. Note: You must check answers when solving radical equations. (Plug the answers into the original problem and see if the sides are equal) Checking: 1 does not work Copyright © 2011 by Lynda Aguirre9

10 Radical Equations 2) Square both sides 1) Isolate Radical 3) Simplify each side 4) Solve for x SOLUTION Already isolated Subtract 5 from both sides Expand and use FOIL Subtract x from both sides and factor Regular factoring won’t work, use quadratic formula (see notes) Copyright © 2011 by Lynda Aguirre10

11 Solving Radical Equations Copyright © 2011 by Lynda Aguirre11 Step 1: Isolate the Radical by moving everything else to the other side of the equation. Move any term that is not under the radical to the other side using Opposite Operations. Step 2: Square both sides If it is a third root, cube both sides, a fourth root? raise to the fourth power, etc. It is a good idea to write parentheses around the terms * If there are two terms remember to use FOIL or one of the formulas* Step 3: Simplify each side Write terms in descending order (highest power to lowest) Distribute, Add or Subtract like terms. Step 4: Solve for x - Linear Equations: Isolate x - Quadratic Equations: Move everything to one side, zero on the other and factor Step 5: Repeat steps 1 through 4 if there is more than one radical in the equation.

12 Practice 1 doesn’t check Neither solution checks, so the answer is “no solution” Copyright © 2011 by Lynda Aguirre12

13 For free math notes visit our website: www.greenebox.com Copyright (c) 2011 by Lynda Greene Aguirre13

Download ppt "Solving Radical Equations Copyright © 2011 by Lynda Aguirre1."

Similar presentations

4.5 Complex Numbers Objectives:

4.5 Complex Numbers Objectives:
Warm up 1. Solve 2. Solve 3. Decompose to partial fractions -1/2, 1

Warm up 1. Solve 2. Solve 3. Decompose to partial fractions -1/2, 1
1copyright (c) Lynda Greene 2002. Complete the Square Copyright©2002 Lynda Greene 2copyright (c) Lynda Greene 2002.

1copyright (c) Lynda Greene Complete the Square Copyright©2002 Lynda Greene 2copyright (c) Lynda Greene 2002.
Section 9.1 The Square Root Property Section 9.2 The Quadratic Formula.

Section 9.1 The Square Root Property Section 9.2 The Quadratic Formula.
College Algebra: Class 4 Radical Equations Objectives: Solve radical equations Solve equations quadratic in form Solve equations by factoring.

College Algebra: Class 4 Radical Equations Objectives: Solve radical equations Solve equations quadratic in form Solve equations by factoring.
7.8 Equations Involving Radicals. Solving Equations Involving Radicals :  1. the term with a variable in the radicand on one side of the sign.  2. Raise.

7.8 Equations Involving Radicals. Solving Equations Involving Radicals :  1. the term with a variable in the radicand on one side of the sign.  2. Raise.
Radical Equations: KEY IDEAS An equation that has a radical with a variable under the radicand is called a radical equation. The only restriction on to.

Radical Equations: KEY IDEAS An equation that has a radical with a variable under the radicand is called a radical equation. The only restriction on to.
Ch 10.3 Solving Radical Equations Objective: To solve equations involving square roots (and equations involving perfect squares).

Ch 10.3 Solving Radical Equations Objective: To solve equations involving square roots (and equations involving perfect squares).
Chapter 2: Equations and Inequalities 2.4: Other Types of Equations

Chapter 2: Equations and Inequalities 2.4: Other Types of Equations
Solving a System of Equations using Multiplication

Solving a System of Equations using Multiplication
Lesson 13.4 Solving Radical Equations. Squaring Both Sides of an Equation If a = b, then a 2 = b 2 Squaring both sides of an equation often introduces.

Lesson 13.4 Solving Radical Equations. Squaring Both Sides of an Equation If a = b, then a 2 = b 2 Squaring both sides of an equation often introduces.
Solve a radical equation

Solve a radical equation
Section 7.6 Solving Radical Equations  The Power Principle for Equations If A = B then A n = B n  The Danger in Solving an Equivalent Equation  Equations.

Section 7.6 Solving Radical Equations  The Power Principle for Equations If A = B then A n = B n  The Danger in Solving an Equivalent Equation  Equations.
How Do We Solve Radical Equations? Do Now: Simplify the given expression. Do Now: Simplify the given expression. 1. 2. 1. 2.

How Do We Solve Radical Equations? Do Now: Simplify the given expression. Do Now: Simplify the given expression
5.7 Complex Numbers 12/17/2012.

5.7 Complex Numbers 12/17/2012.
1.3 Solving Equations Using a Graphing Utility; Solving Linear and Quadratic Equations.

1.3 Solving Equations Using a Graphing Utility; Solving Linear and Quadratic Equations.
Solving Review Semester 2. Notice the variable is in the exponent. That means we need to use logs to solve. Because an “e” is involved we must use ln.

Solving Review Semester 2. Notice the variable is in the exponent. That means we need to use logs to solve. Because an “e” is involved we must use ln.
Factoring Quadratic Polynomials 1 copyright © 2011 Lynda Aguirre.

Factoring Quadratic Polynomials 1 copyright © 2011 Lynda Aguirre.
Tonight’s Homework: 6-6: (page 456) (evens): 4 – 18, 24, 28, 32 – 38, 46, 50, 58 (17 points) (17 points)

Tonight’s Homework: 6-6: (page 456) (evens): 4 – 18, 24, 28, 32 – 38, 46, 50, 58 (17 points) (17 points)
Mathematics for Business and Economics - I

Mathematics for Business and Economics - I

Similar presentations

Ads by Google