-How to apply the Quadratic Formula to quadratic equations, along with the parabolas that accompany them (along with the memorization of the formula);
-Imaginary numbers, what they are, what they mean and how to apply them in mathematics.
So, to dive right in--
The Quadratic Formula
As I'm sure you have heard before, the Quadratic Formula is a formula that allows you to plug in values "a", "b", and "c" from an equation, solve it, and from there obtain your x values.
Here it is:
This equation is used to find the value of x in a quadratic example.
a=coefficient of x^2
b=coefficient of middle term x
c=third term
You simply plug these values in for a particular equation, solve it, and out comes your (usually) two x values.
An Example:
The first step of this is to determine the value of y. Say y is zero, and the rest is easy. Here are the values for a, b, and c:
a=1
b=-10
c=9
Then, you plug these values into the quadratic equation (above). This comes out to:
x=(10 +/- sqrt[100-36])/2
x= (10+/- 8)/2
x= 9, 1
I hope this quick overview of the Quadratic Formula has helped in solidifying your understanding.
Quadratics in Parabolas
Every quadratic equation, when graphed, comes out to a parabola; meaning that it resembles some kind of a "half-pipe" in its line. There are three kinds of parabolas in quadratics (disregarding sideways vs vertical), displayed below:
Let's take a look at the graph of the quadratic solved previously in the post;
As you can see, the quadratic x^2-10x+9 is a parabola as it resembles a half-pipe. If you take a look at where the line intersects the x-axis, you'll see that those points are the two solutions of the equation. This applies to all quadratics looking for an x value.
The number of solutions a quadratic has (one, two, or zero) is based on the discriminant in the Quadratic Formula. This is the b^2-4ac, of course with the a, b, and c values plugged in the with the relative equation.
Here is a chart developed in class that distinguishes between one, two, or zero solutions in a quadratic:
Note that the "one x-intercept (solution)" side includes two intercepts as well. No x-intercepts include negative square roots.
Contrary to its name (and the several puns that accompany it; I'll spare them here, for the most part) imaginary numbers are very much real.
They are represented by i; an abbreviation for a definition that is actually very simple:
i=sqrt(-1).
Yup, that's it.
Here is a list that we brainstormed in class about imaginary numbers and what they mean (after a quick internet source on our fancy imaginary--I mean i--Pads).
Here is a diagram with the explanation of what "complex numbers" really are (we didn't seem to understand it at first):
And some quick work with i and its exponents, following a remarkable pattern:
i=i
i^2=-1
i^3=-i
i^4=1
i^5=i
I hope this post has helped your understanding of Quadratics, Parabolas, and our newly-discovered topic of imaginary numbers.
--Peter
I like your media mix, it was well put together and it's interesting. I can tell you put a lot of work into it.
ReplyDeleteThe pictures were abundant and helpful and their explanations were thorough, this will definitely be helpful for reviewing!
ReplyDelete