$\"\"$

\

First find the minimum point of the graph.

\

Since absolute value function can not be negative,

\

the minimum point of the graph is where $\"\"$ . $\"\"$

\

The original function is $\"\"$ .

\

Set original function $\"\"$

\

$\"\"$

\

$\"\"$

\

$\"\"$ (Add 3 to each side)

\

$\"\"$ (Apply additive inverse property: $\"\"$ )

\

$\"\"$ (Apply additive identity property: $\"\"$ ) $\"\"$

\

Next make at table, fill out the table with values for x > 3 and x < 3.

\

\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \
\
$\"\"$
\
\
$\"\"$
\ \
$\"\"$
\
\
$\"\"$
\ \
$\"\"$
\
\
$\"\"$
\ \
$\"\"$
\
\
0
\ \
$\"\"$
\
\
1
\ \
$\"\"$
\
\
2
\ \
$\"\"$
\
\

\

First, draw a co-ordinate plane.

\

Locate the points on co-ordinate plane and draw the graph through these points.

\

$\"absolute$

\

Observe the graphs, both graphs have same shape and

\

points on $\"\"$ are 3 units right side than the points on $\"\"$ .

\

The graph of $\"\"$ is the graph of $\"\"$ and translated 3 units right. $\"\"$

\

The graph of $\"\"$ is the graph of $\"\"$ and translated 3 units right.