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Section 1.6 Polynomial and Rational Inequalities Polynomial Inequalities We said that we can find the solutions (a.k.a. zeros) of a polynomial by setting the polynomial equal to zero and solving. We are going to use this skill to solve inequalities such as: x x 12 0 2 Solving Quadratic Inequalities x 2 x 12 0 x 4x 3 0 x 4x 3 0 x4 x 3 Factor Identify the zeros (critical points) There are now 3 intervals: (-∞,-3), (-3,4), and (4,∞). We will test these three intervals to see which parts of this function are less than (negative) or greater than (positive) zero. Testing Intervals To test, pick a number from each interval and evaluate Instead of evaluating, we can also just check the signs of each factor in our factored form of the polynomial. x 4x 3 0 Solution: (-∞,-3) U (4,∞) Recap of Steps Factor and solve the quadratic to find the critical points Test each interval Determine if (+) or (-) values are desired Solve the Inequality 3m 2 5m 2 3m 2 5m 2 0 3m 1m 2 0 Solution: 1 m and 2 3 x2 – 2x ≥ 1 x 2 2x 1 0 x 2 2 41 1 21 2 2 8 x 2 22 2 x 2 x 1 2 x 2.4and 0.4 Solution: ,1 2 1 2 , x2 + 2x ≤ -3 x2 2x 3 0 2 22 413 x 21 2 8 x 2 x 1 i 2 Test any number to find out if all numbers are true or false. No Real Solutions Solving Rational Inequalities x 1 0 2 64 x x 1 0 8 x 8 x x 1 -8 x 8 Restrictions? x 8 x 8 -1 Solution: (-∞,-8) U (-1,8) 8