Graphing

There are numerous ways to solve quadratic equations. This unit will cover graphing, using square roots, factoring, the quadratic formula, and completing the square.

When solving a quadratic equation, there will be two, one or no real solutions. When there are no real solutions the solutions can be represented by the imaginary number i. Since , the complex number i is defined as . This number can help to define any square root of a negative number.

Example 1

Simplify

, the square roots can be simplified to 4i.

Example 2

Simplify

, the square roots can be simplified to.

In general, graphing provides a good way of approximating solutions to quadratic equations as long as the graph has x-intercepts. When a quadratic equation is written in the form ax² + bx + c = 0, the solutions will be the value(s) of x when y = 0. Another name for these solutions are x-intercepts or roots. A graphing calculator can be used to estimate these solutions. Remember, quadratic equations can have two, one, or no real solutions. Therefore, the graphs will have two, one, or no x -intercepts.

Embracing Mathematics, Assessment & Technology in High Schools; A Michigan Mathematics & Science Partnership Grant Project

Holt, Rinehart & Winston, "Quadratic Equations and Functions." http://my.hrw.com/math06_07/nsmedia/homework_help/alg1/alg1_ch09_05_homeworkhelp.html (accessed 7/18/2010).