MAC Learning Objectives. Module 7 Additional Equations and Inequalities. Let s Review Some Properties of Rational Exponents

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MAC 1105 Module 7 Additional Equations and Inequalities Learning Objectives Upon completing this module, you should be able to: 1. Use properties of rational exponents (rational powers). 2. Understand radical notation. 3. Solve equations involving rational powers. 4. Solve radical equations. 5. Solve absolute value equations 6. Solve inequalities involving absolute values. 7. Solve quadratic inequalities. 2 Let s Review Some Properties of Rational Exponents 3 1

Let s Practice Some Simplification Simplify each expression by hand. 8 2/3 b) ( 32) 4/5 s 4 What are Power Functions? Power functions typically have rational exponents. A special type of power function is a root function. Examples of power functions include: f 1 (x) = x 2, f 2 (x) = x 3/4, f 3 (x) = x 0.4, and f 4 (x) = 5 What are Power Functions? (Cont.) Often, the domain of a power function f is restricted to nonnegative numbers. Suppose the rational number p/q is written in lowest terms. The domain of f(x) = x p/q is all real numbers whenever q is odd and all nonnegative numbers whenever q is even. The following graphs show 3 common power functions. 6 2

How to Solve Equations Involving Rational Powers? Example Solve 4x 3/2 6 = 6. Approximate the answer to the nearest hundredth, and give graphical support. s Symbolic 4x 3/2 6 = 6 4x 3/2 = 12 (x 3/2 ) 2 = 3 2 x 3 = 9 x = 9 1/3 x = 2.08 Graphical 7 How to Solve an Equation Involving Radical? When solving equations that contain square roots, it is common to square each side of an equation. Example Solve 8 Check How to Solve an Equation Involving Radical? (Cont.) Substituting these values in the original equation shows that the value of 1 is an extraneous solution because it does not satisfy the given equation. Therefore, the only solution is 6. 9 3

How to Solve Equation Involving Radicals? Some equations may contain a cube root. Solve Both solutions check, so the solution set is 10 Let s Review the Absolute Value Function The symbol for the absolute value of x is The absolute value function is a piecewise-defined function. The output from the absolute value function is never negative. 11 How to Solve an Absolute Value Equation? Example: Solve 12 4

How to Solve Absolute Value Inequalities? Example: Solve 2x > > 3 From the previous example the solutions of the equation 2x = = 3 are 1 1 and 2. - Thus the solutions for the inequality 2x > > 3 are x < 1 1 or x > 2. [Hint: See 2. above.] - In interval notation this is ( ( 1) U (2, 13 How to Solve a Quadratic Inequality? A first step in solving a quadratic inequality is to determine the x- values where equality occurs. These x-values are the boundary numbers. Let s look at a quadratic inequality graphically. The graph of a quadratic function opens either upward or downward. In this case, a = 1, parabola opens up, and we have x-intercepts: 1 and 2 14 How to Solve a Quadratic Inequality? (Cont.) Note the parabola lies below the x- axis between the intercepts for the equation x 2 x 2 = 0 s to x 2 x 2 < 0, is the solution set {x 1 < x < 2} or ( 1, 2) in interval notation. s to x 2 x 2 > 0 include x-values either left of x = 1 or right of x = 2, where the parabola is above the x-axis, and thus {x x < 1 or x > 2}. 15 5

Example Solve the inequality. Write the solution set for each in interval notation. a) 3x 2 + x 4 = 0 b) 3x 2 + x 4 < 0 c) 3x 2 + x 4 > 0 a) Factoring (3x + 4)(x 1) = 0 x = 4/3 x = 1 The solutions are 4/3 and 1. 16 Example (Cont.) b) 3x 2 + x 4 < 0 Parabola opening upward. x-intercepts are 4/3 and 1 Below the x-axis (y < 0) set: ( 4/3, 1) y < 0 c) 3x 2 + x 4 > 0 Above the x axis (y > 0) set: (, 4/3) (1, ) y > 0 y > 0 17 Solving Quadratic Inequalities in 4 Steps 18 6

What have we learned? We have learned to: 1. Use properties of rational exponents (rational powers). 2. Understand radical notation. 3. Solve equations involving rational powers. 4. Solve radical equations. 5. Solve absolute value equations 6. Solve inequalities involving absolute values. 7. Solve quadratic inequalities. 19 Credit Some of these slides have been adapted/modified in part/whole from the slides of the following textbook: Rockswold, Gary, Precalculus with Modeling and Visualization, 3th Edition 20 7

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