SOLUTION: Solving Quadratic Equations by graphing; there is either 1, 2, or no real solutions... can you help me with this? x^2-2x-24=0

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Question 235130: Solving Quadratic Equations by graphing; there is either 1, 2, or no real solutions... can you help me with this?
x^2-2x-24=0
Answer by solver91311(24713) About Me  (Show Source):
You can put this solution on YOUR website!


First you want to graph the function

Then you want to find the one place that the graph of the function is tangent to the -axis, meaning that you have 1 real solution (actually, you would say that the equation has one real root with a multiplicity of two), or you want to find the two places that the graph intersects the -axis, meaning that you have two distinct real solutions, or you want to discover that the graph never touches the -axis, meaning that the equation has no real solutions.

What you are doing is answering the question, "What number or numbers can I substitute for so that ?" The function has a value of zero at the -axis.



Compare this to:



Notice two things: 1. The function is a perfect square trinomial. 2. The graph is tangent to the axis. One root with a multiplicity of 2.

No compare to:



Notice that the graph does not touch the -axis at all. No real solutions.





John