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Warm Up 1. Graph the inequality y < 2x + 1. Solve using any method. 2. x 2 – 16x + 63 = 0 3. 3x 2 + 8x = 3 7, 9
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Solve quadratic inequalities by using tables and graphs. Solve quadratic inequalities by using algebra. Objectives
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quadratic inequality in two variables Vocabulary
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Many business profits can be modeled by quadratic functions. To ensure that the profit is above a certain level, financial planners may need to graph and solve quadratic inequalities. A quadratic inequality in two variables can be written in one of the following forms, where a, b, and c are real numbers and a ≠ 0. Its solution set is a set of ordered pairs (x, y).
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In Lesson 2-5, you solved linear inequalities in two variables by graphing. You can use a similar procedure to graph quadratic inequalities. y ax 2 + bx + c y ≤ ax 2 + bx + c y ≥ ax 2 + bx + c
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Graph y ≥ x 2 – 7x + 10. Example 1: Graphing Quadratic Inequalities in Two Variables Step 1 Graph the boundary of the related parabola y = x 2 – 7x + 10 with a solid curve. Its y-intercept is 10, its vertex is (3.5, –2.25), and its x-intercepts are 2 and 5.
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Example 1 Continued Step 2 Shade above the parabola because the solution consists of y-values greater than those on the parabola for corresponding x-values.
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Example 1 Continued Check Use a test point to verify the solution region. y ≥ x 2 – 7x + 10 0 ≥ (4) 2 –7(4) + 10 0 ≥ 16 – 28 + 10 0 ≥ –2 Try (4, 0).
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Graph the inequality. Step 1 Graph the boundary of the related parabola y = 2x 2 – 5x – 2 with a solid curve. Its y-intercept is –2, its vertex is (1.3, –5.1), and its x-intercepts are –0.4 and 2.9. Check It Out! Example 1a y ≥ 2x 2 – 5x – 2
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Step 2 Shade above the parabola because the solution consists of y-values greater than those on the parabola for corresponding x-values. Check It Out! Example 1a Continued
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Check Use a test point to verify the solution region. y < 2x 2 – 5x – 2 0 ≥ 2(2) 2 – 5(2) – 2 0 ≥ 8 – 10 – 2 0 ≥ –4 Try (2, 0). Check It Out! Example 1a Continued
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Graph each inequality. Step 1 Graph the boundary of the related parabola y = –3x 2 – 6x – 7 with a dashed curve. Its y-intercept is –7. Check It Out! Example 1b y < –3x 2 – 6x – 7
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Step 2 Shade below the parabola because the solution consists of y-values less than those on the parabola for corresponding x-values. Check It Out! Example 1b Continued
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Check Use a test point to verify the solution region. y < –3x 2 – 6x –7 –10 < –3(–2) 2 – 6(–2) – 7 –10 < –12 + 12 – 7 –10 < –7 Try (–2, –10). Check It Out! Example 1b Continued
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Quadratic inequalities in one variable, such as ax 2 + bx + c > 0 (a ≠ 0), have solutions in one variable that are graphed on a number line. For and statements, both of the conditions must be true. For or statements, at least one of the conditions must be true. Reading Math
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Solve the inequality by using tables or graphs. Example 2A: Solving Quadratic Inequalities by Using Tables and Graphs x 2 + 8x + 20 ≥ 5 Use a graphing calculator to graph each side of the inequality. Set Y 1 equal to x 2 + 8x + 20 and Y 2 equal to 5. Identify the values of x for which Y 1 ≥ Y 2.
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Solve the inequality by using tables and graph. Example 2B: Solving Quadratics Inequalities by Using Tables and Graphs x 2 + 8x + 20 < 5 Use a graphing calculator to graph each side of the inequality. Set Y 1 equal to x 2 + 8x + 20 and Y 2 equal to 5. Identify the values of which Y 1 < Y 2.
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Solve the inequality by using tables and graph. x 2 – x + 5 < 7 Use a graphing calculator to graph each side of the inequality. Set Y 1 equal to x 2 – x + 5 and Y 2 equal to 7. Identify the values of which Y 1 < Y 2. Check It Out! Example 2a
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Solve the inequality by using tables and graph. 2x 2 – 5x + 1 ≥ 1 Use a graphing calculator to graph each side of the inequality. Set Y 1 equal to 2x 2 – 5x + 1 and Y 2 equal to 1. Identify the values of which Y 1 ≥ Y 2. Check It Out! Example 2b
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Solve the inequality by using algebra. Step 1 Write the related equation. Check It Out! Example 3a x 2 – 6x + 10 ≥ 2 x 2 – 6x + 10 = 2
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Write in standard form. Step 2 Solve the equation for x to find the critical values. x 2 – 6x + 8 = 0 x – 2 = 0 or x – 4 = 0 (x – 2)(x – 4) = 0 Factor. Zero Product Property. Solve for x. x = 2 or x = 4 The critical values are 2 and 4. The critical values divide the number line into three intervals: x ≤ 2, 2 ≤ x ≤ 4, x ≥ 4. Check It Out! Example 3a Continued
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Step 3 Test an x-value in each interval. (1) 2 – 6(1) + 10 ≥ 2 x 2 – 6x + 10 ≥ 2 (3) 2 – 6(3) + 10 ≥ 2 (5) 2 – 6(5) + 10 ≥ 2 Try x = 1. Try x = 3. Try x = 5. Check It Out! Example 3a Continued x –3 –2 –1 0 1 2 3 4 5 6 7 8 9 Critical values Test points
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Shade the solution regions on the number line. Use solid circles for the critical values because the inequality contains them. The solution is x ≤ 2 or x ≥ 4. –3 –2 –1 0 1 2 3 4 5 6 7 8 9 Check It Out! Example 3a Continued
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Solve the inequality by using algebra. Step 1 Write the related equation. Check It Out! Example 3b –2x 2 + 3x + 7 < 2 –2x 2 + 3x + 7 = 2
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Write in standard form. Step 2 Solve the equation for x to find the critical values. –2x 2 + 3x + 5 = 0 –2x + 5 = 0 or x + 1 = 0 (–2x + 5)(x + 1) = 0 Factor. Zero Product Property. Solve for x. x = 2.5 or x = –1 The critical values are 2.5 and –1. The critical values divide the number line into three intervals: x 2.5. Check It Out! Example 3b Continued
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Step 3 Test an x-value in each interval. –2(–2) 2 + 3(–2) + 7 < 2 –2(1) 2 + 3(1) + 7 < 2 –2(3) 2 + 3(3) + 7 < 2 Try x = –2. Try x = 1. Try x = 3. –3 –2 –1 0 1 2 3 4 5 6 7 8 9 Critical values Test points Check It Out! Example 3b Continued x –2x 2 + 3x + 7 < 2
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Shade the solution regions on the number line. Use open circles for the critical values because the inequality does not contain or equal to. The solution is x 2.5. –3 –2 –1 0 1 2 3 4 5 6 7 8 9 Check It Out! Example 3
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A compound inequality such as 12 ≤ x ≤ 28 can be written as {x|x ≥12 U x ≤ 28}, or x ≥ 12 and x ≤ 28. (see Lesson 2-8). Remember!
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Example 4: Problem-Solving Application The monthly profit P of a small business that sells bicycle helmets can be modeled by the function P(x) = –8x 2 + 600x – 4200, where x is the average selling price of a helmet. What range of selling prices will generate a monthly profit of at least $6000?
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1 Understand the Problem Example 4 Continued The answer will be the average price of a helmet required for a profit that is greater than or equal to $6000. List the important information: The profit must be at least $6000. The function for the business’s profit is P(x) = – 8x 2 + 600x – 4200.
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2 Make a Plan Write an inequality showing profit greater than or equal to $6000. Then solve the inequality by using algebra. Example 4 Continued
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Solve 3 Write the inequality. –8x 2 + 600x – 4200 ≥ 6000 –8x 2 + 600x – 4200 = 6000 Find the critical values by solving the related equation. Write as an equation. Write in standard form. Factor out –8 to simplify. –8x 2 + 600x – 10,200 = 0 –8(x 2 – 75x + 1275) = 0 Example 4 Continued
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Solve 3 Use the Quadratic Formula. Simplify. x ≈ 26.04 or x ≈ 48.96 Example 4 Continued
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Solve 3 Test an x-value in each of the three regions formed by the critical x-values. 10 20 30 40 50 60 70 Critical values Test points Example 4 Continued
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Solve 3 –8(25) 2 + 600(25) – 4200 ≥ 6000 –8(45) 2 + 600(45) – 4200 ≥ 6000 –8(50) 2 + 600(50) – 4200 ≥ 6000 5800 ≥ 6000 Try x = 25. Try x = 45. Try x = 50. 6600 ≥ 6000 5800 ≥ 6000 Write the solution as an inequality. The solution is approximately 26.04 ≤ x ≤ 48.96. x x Example 4 Continued
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Solve 3 For a profit of $6000, the average price of a helmet needs to be between $26.04 and $48.96, inclusive. Example 4 Continued
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Look Back 4 Enter y = –8x 2 + 600x – 4200 into a graphing calculator, and create a table of values. The table shows that integer values of x between 26.04 and 48.96 inclusive result in y- values greater than or equal to 6000. Example 4 Continued
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Homework! Holt Chapter 5 Section 7 Page 370 # 19-27 odd, 34, 35, 38, 43, 44 2 Additional Problems
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