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Chapter 1.7

Chapter 1.7. Inequalities. An inequality says that one expression is greater than, or greater than or equal to, or less than, or less than or equal to, another. As with equations, a value of the variable for which the inequality is true is a solution of the inequality.

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Chapter 1.7

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  1. Chapter 1.7 Inequalities

  2. An inequality says that one expression is greater than, or greater than or equal to, or less than, or less than or equal to, another. As with equations, a value of the variable for which the inequality is true is a solution of the inequality. Two inequalities with the same solution set are equivalent.

  3. Properties of Inequality For real numbers a, b, and c: If a<b, then a + c < b + c, If a<b, and if c> 0 then ac < bc, If a<b, and if c< 0 then ac > bc.

  4. Properties of Inequality Multiplication may be replaced by division in properties 2 and 3. Always remember to reverse the direction of the inequality symbol when multiplying or dividing by a negative number.

  5. Linear Inequalities in One Variable A linear inequality in one variable is an inequality that can be written in the form ax + b > 0

  6. Example 1 Solving a Linear Inequality Solve -3x + 5 > -7

  7. The original inequality is satisfied by any real number less than 4. The solution set can be written {x| x < 4}. A graph of the solution set is shown in Figure 9, where the parenthesis is used to show that 4 itself does not belong to the solution set.

  8. Open Interval (a

  9. Open Interval )b (a

  10. Open Interval )b

  11. Half-open Interval [a

  12. Half-opened Interval ]b (a

  13. Half-opened Interval )b [a

  14. Half-open Interval ]b

  15. Closed Interval ]b [a

  16. All real numbers

  17. Example 2 Solving a Linear Inequality Give the solution set in interval notation and graph it.

  18. -5 -4 -3 -2 -1 0 1 2 3 4 5 [ Interval Notation

  19. Three-Part Inequalities The inequality -2 < 5 +3x < 20 is the next example that 5 + 3x is between -2 and 20. This inequality is solved using an extension of the properties of inequality given earlier, working with all three expressions at the same time.

  20. Example 3 Solving a Three-Part Inequality Solve -2 < 5 +3x < 20

  21. -5 -4 -3 -2 -1 0 1 2 3 4 5 Graph

  22. A product will break even, or begin to produce a profit, only if the revenue from selling the product at least equals the cost of producing it. If R represents revenue and C is cost, then the break-even point is the point where R = C.

  23. Example 4 Finding the Break-Eve Point If the revenue and cost of a certain product are given by R = 4x and C = 2x + 1000 where x is the number of units produced and sold, at what production level does R at least equal C?

  24. Example 4 Finding the Break-Eve Point If the revenue and cost of a certain product are given by R = 4x and C = 2x + 1000 where x is the number of units produced and sold, at what production level does R at least equal C?

  25. Quadratic Inequality A quadratic inequality is an inequality that can be written in the form ax2 + bx + c < 0

  26. Example 5 Solving a Quadratic Inequality Solve x2 – x - 12

  27. y x

  28. Example 6 Solving a Quadratic Inequality

  29. y x

  30. Example 7 Solving a Problem Involving the Height of a Projectile If a projectile is launched from ground with an initial velocity of 96 ft per sec. its height in feet t seconds after launching is s feet, where s = -16t2 + 96 t When will the projectile be greater than 80 ft above ground level.

  31. Rational Inequalities Inequalities involving rational expressions such as are called rational inequalities, and are solved in a manner similar to the procedure for solving quadratic inequalities.

  32. Example 8 Solving a Rational Inequality

  33. y x

  34. Example 9 Solving a Rational Inequality

  35. y x

  36. Example 9 Solving a Rational Inequality

  37. y x

  38. Homework Section 1.7 # 1 - 52

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