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A polynomial function where the highest exponent is 2 is called a quadratic function. The graph of a quadratic function is called a parabola. It looks either like a happy smile, or a sad frown. You can see different parabolas below.
Theory
The quadratic function looks like this:
where , and are constants. The constants and are called coefficients. The term is called a second-degree term or quadratic term, the term is called a first-degree term or linear term, and is called the constant term.
Below you see a picture of the graphs of four different quadratic functions. Note that all have either a maximum or minimum.
Rule
When : The graph is smiling, and the function has a minimum (vertex).
When : The graph is sad, and the function has a maximum (vertex).
Example 1
You have the quadratic function
Determine if the parabola has a maximum or a minimum.
You see that the coefficient in front of is a positive number (). Therefore, the graph smiles and have a minimum.
Example 2
You have the quadratic function
Determine if the parabola has a maximum or a minimum.
In this case, the coefficient in front of is a negative number (). Therefore, the graph will face downwards and have a maximum, as in the figure below:
There are several methods to use to find the maximum or minimum. You can use the derivative, a sign chart, or the method that follows here:
Rule
When you have the quadratic function
you can find the -values and -values of the vertex like this:
The -value of the maximum or minimum point:
-value of the maximum or minimum point:
Example 3
Determine if the graph of has a maximum or a minimum, and find this point
The function has , and . Since in the expression, you know that the graph is smiling and you have a minimum.
First, find the -value, and then the -value, of this minimum:
Upon inspection of , you can see that this is a square and therefore has only one zero. In this case, the zero and the minimum are the same point.