Section 2.6     Solving Inequalities Algebraically and Graphically                                                                                             59 
                                                                                                                                                                  Course Number 
                                 Section 2.6  Solving Inequalities Algebraically and                                                                               
                                                           Graphically                                                                                            Instructor 
                                                                                                                                                                   
                                 Objective: In this lesson you learned how to solve linear inequalities,                                                          Date 
                                                     inequalities involving absolute values, polynomial                                                            
                                                     inequalities, and rational inequalities. 
                                  
                                    Important Vocabulary                                             Define each term or concept. 
                                     
                                    Solutions of an inequality  sss ssssss ss sss ssssssss sss sssss sss ssssssssss ss sssss 
                                     
                                    Graph of an inequality  sss sss ss sss ssssss ss sss ssss ssssss ssss ssss sssssssss sss 
                                    ssssssss sss ss ss sssssssssss 
                                    Double inequality  ss ssssssssss ssss ssssssssss sss sssssssssssss 
                                     
                                    Critical numbers  sss ssssssss ssss ssss sss ssssssssss ss s ssssssssss ssssssssss sssss ss 
                                    sssss 
                                    Test intervals  ssss sssssssss sssss sss ssss ssssss ssss ss sssss sss ssssssssss sss ss ssss 
                                    ssssssss 
                                     
                                  
                                  
                                 I.  Properties of Inequalities  (Pages 219−220)                                                                       What you should learn 
                                                                                                                                                       How to recognize 
                                 Solving an inequality in the variable x means . . .    sssssss sss sss                                                properties of inequalities 
                                 ssssss ss s sss sssss sss ssssssssss ss sssss 
                                  
                                 Numbers that are solutions of an inequality are said to  
                                            sssssss          s the inequality. 
                                  
                                 To solve a linear inequality in one variable, use the      s sssssssss    
                                 ss ssssssssssss               to isolate the variable. 
                                  
                                 When each side of an inequality is multiplied or divided by a 
                                 negative number, . . .     sss sssssssss ss sss ssssssssss ssssss ssss 
                                 ss ssssssss ss sssss ss ssssssss s ssss ssssssssss 
                                  
                                 Two inequalities that have the same solution set are 
                                            ssssssssss ssssssssssss              . 
                                  
                                 Complete the list of Properties of Inequalities given below. 
                                        1)  Transitive Property:  a < b and b < c  →            s s s          s 
                                        2)  Addition of Inequalities:  a < b and c < d  →     s s s s s s s    s 
                                 Larson/Hostetler/Edwards  Algebra and Trigonometry: A Graphing Approach, Fifth Edition  Student Success Organizer 
                                 Copyright © Houghton Mifflin Company. All rights reserved. 
                60                                                   Chapter 2     Solving Equations and Inequalities 
                    3)  Addition of a Constant c:  a < b  →       s s s s s s s           s 
                    4)  Multiplication by a Constant c:  
                              For c > 0,    a < b  →               ss s ss           s 
                              For c < 0,    a < b  →               ss s ss           s 
                 
                II.  Solving a Linear Inequality  (Pages 220−221)                      What you should learn 
                                                                                       How to use properties of 
                Describe the steps that would be necessary to solve the linear         inequalities to solve 
                inequality 7x − 2<9x +8.                                               linear inequalities 
                 
                sss s ss ssss sssss ssssssss ss ssss ssss sssss sss sssssss ssss ssssss 
                ssssss ssss ssss ss s s sss sssssss sss sssssssssss sssss sss ssssssss 
                sss ss ss sssssssss 
                 
                 
                To use a graphing utility to solve the linear inequality 
                 7x−2<9x+8, . . .     sssss ss s ss s s sss ss s ss s s ss sss ssss 
                sssssss sssssss sss sss sssssssss sssssss ss sss ssssssss sssssss ss 
                ssss sss sssss ss sssssssssssss ssssssss sssss sss sssss ss ss ssss 
                sssss sss sssss ss sss sssss sss ssssssss ssss 
                 
                The two inequalities − 10 < 3x and 14 ≥ 3x can be rewritten as 
                the double inequality            s ss s ss s ss            . 
                 
                 
                III.  Inequalities Involving Absolute Value  (Page 222)                What you should learn 
                                                                                       How to solve inequalities 
                Let x be a variable or an algebraic expression and let a be a real     involving absolute values 
                number such that a ≥ 0. The solutions of  x < a  are all values of 
                x that               sss sssssss s s sss s              . The solutions of 
                  x >a are all values of x that             sss ssss ssss s s ss sssssss 
                ssss s                   . 
                 
                Example 1:  Solve the inequality:   x +11 −4≤0 
                              ss sss s ss 
                 
                 
                The symbol ∪ is called a         sssss        symbol and is used to 
                denote        sss sssssssss ss sss ssss                                      . 
                       Larson/Hostetler/Edwards  Algebra and Trigonometry: A Graphing Approach, Fifth Edition  Student Success Organizer 
                                                                     Copyright © Houghton Mifflin Company. All rights reserved. 
                      Section 2.6     Solving Inequalities Algebraically and Graphically                                      61 
                      Example 2:  Write the following solution set using interval 
                                     notation:   x > 8 or x < 2 
                                     ss ss ss s sss ss 
                       
                       
                      IV.  Polynomial Inequalities  (Pages 223−225)                                What you should learn 
                                                                                                   How to solve polynomial 
                      Where can polynomials change signs?                                          inequalities 
                      ssss ss sss ssssss sss ssssssss ssss ssss sss ssssssssss sssss ss sssss  
                       
                      Between two consecutive zeros, a polynomial must be . . .      
                      ssssssss ssssssss ss ssssssss sssssssss 
                       
                      When the real zeros of a polynomial are put in order, they divide 
                      the real number line into . . .      sssssssss ss sssss sss ssssssssss 
                      sss ss ssss ssssssss 
                       
                      These zeros are the          ssssssss sssssss          of the inequality, 
                      and the resulting open intervals are the          ssss sssssssss           
                      . 
                       
                      Complete the following steps for determining the intervals on 
                      which the values of a polynomial are entirely negative or entirely 
                      positive: 
                          1)  ssss sss ssss sssss ss sss sssssssssss sss sssssss sss sssss 
                              ss ssssssssss ssssss sss sssss ss s ssssssssss sss sss 
                              ssssssss ssssssss     
                           
                          2)  sss sss ssssssss sssssss ss sssssssss sss ssss ssssssssss 
                       
                       
                          3)  ssssss sss ssssssssssssss sssssss ss ssss ssss ssssssss sss 
                              ssssssss sss ssssssssss ss ssss ssssss ss sss sssss ss sss 
                              ssssssssss ss sssssssss sss ssssssssss ssss ssss ssssssss 
                              ssssss sss sssss sssssss ss sss sssssssss ss sss sssss ss sss 
                              ssssssssss ss sssssssss sss ssssssssss ssss ssss ssssssss 
                              ssssss sss sssss sssssss ss sss sssssssss 
                       
                      To approximate the solution of the polynomial inequality 
                      3x2 + 2x −5<0 from a graph, . . .        sssss sss ssssssssss 
                      ssssssssss s s sss s ss s s sss ssssss sss sssssss ss sss sssss ssss ss 
                      sssss sss sssssss 
                       
                       
                      Larson/Hostetler/Edwards  Algebra and Trigonometry: A Graphing Approach, Fifth Edition  Student Success Organizer 
                      Copyright © Houghton Mifflin Company. All rights reserved. 
                62                                                    Chapter 2     Solving Equations and Inequalities 
                If a polynomial inequality is not given in general form, you 
                should begin the solution process by . . .        sssssss sss 
                ssssssssss ss sssssss sssssssss sss ssssssssss ss sss ssss sss ssss ss 
                sss sssss sssss 
                                                                                                    y
                                                                                                   5
                Example 3:  Solve x2 + x −20≥0. 
                sss ss s ss s sss ss                                                               3
                                                                                                   1
                                                                                                                  x
                Example 4:  Use a graph to solve the polynomial inequality             -5   -3   -1    1    3    5
                                                                                                  -1
                               −x2 −6x−9>0. 
                ss                                                                                -3
                                                                                                  -5
                 
                V.  Rational Inequalities  (Page 226)                                    What you should learn 
                                                                                         How to solve rational 
                To extend the concepts of critical numbers and test intervals to         inequalities 
                rational inequalities, use the fact that the value of a rational 
                expression can change sign only at its           sssss            and its 
                            sssssssss ssssss          . These two types of numbers make 
                up the          ssssssss sssssss           of a rational inequality. 
                 
                To solve a rational inequality, . . .     sssss sssss sss ssssssss 
                ssssssssss ss ssssssss sssss ssss ssss sss sssss sss sssssssss ssssss 
                ss sss sssssssss ssssssss sssssssssss ssss sss sssssssssss ssss 
                sssssssss sss ssss s sssss ssss ssss ssssssss ss sss sssssssssss ssssss 
                sss ssss sssssssss ssss sssssss sss ssssssssss ss sss sssss             sss 
                ssss 
                 
                Example 5:  Solve 3x+15 ≤0. 
                                      x − 2
                sss ss ss  
                 
                 
                 
                  Homework Assignment 
                   
                  Page(s) 
                   
                  Exercises 
                       Larson/Hostetler/Edwards  Algebra and Trigonometry: A Graphing Approach, Fifth Edition  Student Success Organizer 
                                                                      Copyright © Houghton Mifflin Company. All rights reserved.