Graphing Absolute Values

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We discuss how to graph absolute values, as well as some key features of the graph.

Graphing absolute values may seem difficult at first glance, but as we’ll see, the process is one we’ve actually already discussed.

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Graphing absolute values is actually the same process as graphing piecewise functions. Upon further reflection, this shouldn’t actually be surprising, since absolute values are - as we’ve seen - really just shorthand for a piecewise function. So, the process of graphing absolute values is essentially just a matter of converting the absolute value to the piecewise definition, and then graphing that as any other piecewise function.

Consider the function $f(x) = |3x-2| + 1$ . The first step is to convert this to its piecewise form, which means we want to set the inside of the absolute values greater than or equal to 0 and solve to get: $3x-2 \geq 0$ , thus $x \geq \frac {2}{3}$ . Thus, in this case we have that:

$f(x) = \begin {cases} - 3x + 3 & x < \frac {2}{3} \\ 3x - 1 & \frac {2}{3} \leq x \end {cases}$

Now we graph this function as normal, in particular we want to graph the segment that is left of the transition point $x = \frac {2}{3}$ and then the segment to the right of the transition point.

Notice that the graph appears to “bounce” off some horizontal line - specifically the line where the absolute value is 0. With a quick computation we can see that if the inside of the absolute value is zero, then $f(x) = |0| + 1 = 1$ is the horizontal line that the absolute value graph seems to “bounce” off of, as we can see more clearly here:

This kind of reflection making a sharp corner is indicative of an absolute value graph.

Also notice that, although absolute values always make things positive, that doesn’t mean the graph has to be positive. Consider the function $g(x) = -2\left \vert \frac {1}{2}x + 1\right \vert - 2$ . The piecewise function form is then:

$g(x) = \begin {cases} x & x < -2 \\ -x - 4 & -2 \leq x \end {cases}$

Graphing this gives:

Notice that the graph is not only entirely negative, but it is also pointing down, but it still has that tell-tale sharp corner where it appears to “bounce” off the relevant line.