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 Solving Quadratic Inequalities Algebraically   Education The quadratic inequalities are to replace the in-equal symbol with an equal symbol and then solve the resultant equations. The result for the equations allows establishing the given interval for the inequality. Select any one of the number from each interval and to check for their originality. If the number from that interval is true and then that interval is the resultant interval is the solution for the inequality. The example for the quadratic inequalities are x^2+17 x+19greater than 0. Examples for the solving quadratic inequalities algebraically: Example 1 for solving quadratic inequalities algebraically: Solve the quadratic inequality equation x^2 -x- 42 greater than0 Solution: The given quadratic inequality equation is x^2 -x- 42 greater than0 The given equation is in the inequality equation. So replace the in- equal symbol as the equal symbol. Find the solution for the equality equation. x^2 -x- 42 greater than0...