You can graph a Quadratic Equation using the Function Grapher, but to really understand what is going on, you can make the graph yourself. Read On!
The simplest Quadratic Equation is:
And its graph is simple too:
This is the curve f(x) = x 2
It is a parabola.
Now let us see what happens when we introduce the "a" value:
Now is a good time to play with the
"Quadratic Equation Explorer" so you can
see what different values of a, b and c do.
Before graphing we rearrange the equation, from this:
f(x) = ax 2 + bx + c
In other words, calculate h (= −b/2a), then find k by calculating the whole equation for x=h
The wonderful thing about this new form is that h and k show us the very lowest (or very highest) point, called the vertex:
And also the curve is symmetrical (mirror image) about the axis that passes through x=h, making it easy to graph
Lets see an example of how to do this:
First, let's note down:
Now, what do we know?
Next, let's calculate h:
h = −b/2a = −(−12)/(2x2) = 3And next we can calculate k (using h=3):
k = f(3) = 2(3) 2 − 12·3 + 16 = 18−36+16 = −2So now we can plot the graph (with real understanding!):
We also know: the vertex is (3,−2), and the axis is x=3
What if we have a graph, and want to find an equation?
Just knowing those two points we can come up with an equation.
Firstly, we know h and k (at the vertex):
So let's put that into this form of the equation:
Then we calculate "a":
We know the point (0, 1.5) so: f(0) = 1.5 And a(x−1) 2 + 1 at x=0 is: f(0) = a(0−1) 2 + 1 They are both f(0) so make them equal: a(0−1) 2 + 1 = 1.5 Simplify: a + 1 = 1.5And here is the resulting Quadratic Equation:
Note: This may not be the correct equation for the data, but it’s a good model and the best we can come up with.