Vertex: (0,- 1) Axis of Symmetry: x=0 Transformations:
A vertical compression by a factor of 34.
A vertical translation down by 1 unit.
Practice makes perfect
To identify the key features of the transformed function, let's first consider the general form of an absolute value function.
y= a|x- h|+ k
In this general form, | a| is the stretch or compression factor, h is a horizontal translation, and k is a vertical translation. Because translations shift an entire function, the vertex of a translated absolute value function is located at ( h, k) and the axis of symmetry is the line x= h.
y=3/4|x|-1 ⇔ y= 3/4|x- 0|+( - 1)
In this case, we have a vertex of ( 0, - 1) and an axis of symmetry of x= 0. Next, let's look at all of the possible transformations so that we can more clearly identify what is happening to our function.
Transformations of y=|x|
Vertical Translations
Translation up k units, k>0
y=|x|+ k
Translation down k units, k>0
y=|x|- k
Horizontal Translations
Translation right h units, h>0
y=|x- h|
Translation left h units, h>0
y=|x+ h|
Vertical Stretch or Compression
Vertical stretch, a>1
y= a|x|
Vertical compression, 0< a<1
y= a|x|
Horizontal Stretch or Compression
Horizontal stretch, 0< b<1
y=| bx|
Horizontal compression, b>1
y=| bx|
Reflections
In the x-axis
y=- |x|
In the y-axis
y=|- x|
Using the table, we can now describe the transformations.
