The parent absolute value function f\left(x\right) = \left|x\right| takes an input and gives an output of the absolute value of that number. The equation of absolute value function contains a variable expression inside absolute value bars; a function of the form f\left(x\right) = a\left|x - h\right| + k.
The absolute value function f\left(x\right)=\left|x\right| has two cases to consider:
As a result, the graph of an absolute value function looks like two rays that meet at a common point, called its vertex.
Consider the function f\left(x\right) = \left|x - 1\right| + 2
Describe the transformations used to get from the graph of y = \left|x\right| to the graph of this function.
Draw a graph of the function
State the coordinates of the vertex
State the domain and range of the function, using interval notation.
Consider the absolute value graph shown below:
Describe the transformations used to get from the graph of y = \left|x\right| to the graph of this function.
Determine an equation for the function shown in the graph