Graph the piecewise-defined function. \[ f(x)=\left\{\begin{array}{rr} 3+3 x & \text { if } x<-4 \\ -2 x & \text { if }-4 \leq x \leq 5 \\ 3 x & \text { if } x>5 \end{array}\right. \]
Solution
Step 1 :To graph the piecewise-defined function, we need to graph each piece separately and then combine them.
Step 2 :First, we graph the function \(3+3x\) for \(x<-4\). This is a straight line with slope 3 and y-intercept 3. However, we only graph this line for \(x<-4\).
Step 3 :Next, we graph the function \(-2x\) for \(-4 \leq x \leq 5\). This is a straight line with slope -2 and y-intercept 0. We only graph this line between \(x=-4\) and \(x=5\), inclusive.
Step 4 :Finally, we graph the function \(3x\) for \(x>5\). This is a straight line with slope 3 and y-intercept 0. We only graph this line for \(x>5\).
Step 5 :Combining these three graphs gives us the graph of the piecewise-defined function. We can see that the function is continuous, as the end of one piece meets the start of the next piece.
