Even Functions
The equation, f(-x)=f(x), is used to define an even function.
For every input, (x) or (-x), the output (y) will always be the same.
- The x can be either negative or positive but the y will come out the same.
This results in the graph being symmetrical about the y-axis.
- A graph in Quadrant 1 would be reflected onto Quadrant 2, as if it was flipped by a mirror. (Also, can work for Quadrant 3 and 4.)
Example:
The graph above is x^2.
If 2 was plugged in, (x) , then the result will be 4, (y).
If -2 was plugged in, (-x), then the result will still be 4, (y).
Odd Functions
The equation, f(-x)=-f(x) , can be used to define an odd function.
The graph will be symmetrical about the origin.
- A graph in Quadrant 1 would be reflected onto Quadrant 3, as if it was flipped diagonally. (Also, can work for Quadrant 2 and 4.)
Example:
The graph above is x^3.
If 2 was plugged in, (x), then the result will be 8, (y).
If -2 was plugged in, (-x), then the result would be -8, (-y).
If (x,y) exists on the graph, then point ( -x, -y) also has to exist.
- This goes for the same for (-x,y) and (x, -y).
wow! this is like the most thorough explanation ive seen all day thanks!
ReplyDeletehey cool! like it,,,right to the point.
ReplyDeleteWow. I agree w/ Ruben. Great job Javier. Simple and sweet.
ReplyDelete