Reflection across the xaxis: $y = f(x)$
Reflection Across the XAxis
Before we get into reflections across the yaxis, make sure you’ve refreshed your memory on how to do simple vertical and horizontal translations.
How to Reflect Over XAxis:
One of the most basic transformations you can make with simple functions is to reflect it across the xaxis or another horizontal axis. In a potential test question, this can be phrased in many different ways, so make sure you recognize the following terms as just another way of saying “perform a reflection across the xaxis”:
1) Graph $y = f(x)$
2) Graph $f(x)$
3) Reflect over $x$ axis
In order to do this, the process is extremely simple: For any function, no matter how complicated it is, simply pick out easytodetermine coordinates, divide the ycoordinate by (1), and then replot those coordinates. That’s it!
The best way to practice drawing reflections across the yaxis is to do an example problem:
Example:
Given the graph of $y = f(x)$ as shown, sketch $y = f(x)$.
Remember, the only step we have to do before plotting the $f(x)$ reflection is simply divide the ycoordinates of easytodetermine points on our graph above by (1). When we say “easytodetermine points” what this refers to is just points for which you know the x and y values exactly. Don’t pick points where you need to estimate values, as this makes the problem unnecessarily hard. Below are several images to help you visualize how to solve this problem.
Step 1: Know that we’re reflecting across the xaxis
Since we were asked to plot the –f(x) reflection, is it very important that you recognize this means we are being asked to plot the reflection over the xaxis. When drawing reflections across the $x$ and $y$ axis, it is very easy to get confused by some of the notations. So, make sure you take a moment before solving any reflection problem to confirm you know what you’re being asked to do.
Step 2: Identify easytodetermine points
Remember, pick some points (3 is usually enough) that are easy to pick out, meaning you know exactly what the x and y values are. In this case, let’s pick (2 ,3), (1 ,0), and (0,3).
Step 3: Divide these points by (1)
While the $x$ values remain the same, all we need to do is divide the $y$ values by (1)!
Step 4: Plot the new points
And that’s it! Simple, right?
What is the Axis of Symmetry:
In some cases, you will be asked to perform horizontal reflections across an axis of symmetry that isn’t the xaxis. But before we go into how to solve this, it’s important to know what we mean by “axis of symmetry”. The axis of symmetry is simply the horizontal line that we are performing the reflection across. It can be the xaxis, or any horizontal line with the equation $y$ = constant, like $y$ = 2, $y$ = 16, etc.
How to Find the Axis of Symmetry:
Finding the axis of symmetry, like plotting the reflections themselves, is also a simple process. In this case, all we have to do is pick the same point on both the function and its reflection, count the distance between them, divide that by 2, and count that distance away from one of the graphs. This is because, by it’s definition, an axis of symmetry is exactly in the middle of the function and its reflection.
The best way to practice finding the axis of symmetry is to do an example problem.
Example:
Find the axis of symmetry for the two functions shown in the images below.
Again, all we need to do to solve this problem is to pick the same point on both functions, count the distance between them, divide by 2, and then add that distance to one of our functions. Let’s pick the origin point for these functions, as it is the easiest point to deal with.
Now, by counting the distance between these two points, you should get the answer of 2 units. The last step is to divide this value by 2, giving us 1. Now we know that our axis of symmetry is exactly one unit below the top function’s origin or above the bottom functions origin. Looking at the graph, this gives us $y$ = 5 as our axis of symmetry! Let’s take a look at what this would look like if there were an actual line there:
And that’s all there is to it! For further study with transformations of a functions with regards to trigonometric functions, see the helpful links here and here.
Reflection across the xaxis: $y = f(x)$
Lessons

a)
Sketch the following functions:
$y = {\left( {x  4} \right)^3}$ VS. $ y = {\left( {x  4} \right)^3}$ 
b)
Compared to the graph of $y = {\left( {x  4} \right)^3}$:
• the graph of $ y = {\left( {x  4} \right)^3}$ is a reflection in the ___________________.


a)
$y =  f\left( x \right)$

b)
In conclusion:
• $\left( y \right) \to \left( {  y} \right)$: reflection in the ____________________ $\Rightarrow$ all $y$ coordinates ______________________________.
