\[
f(x)=\sqrt[3]{x}+5
\]
Plot five points on the graph of the function, as follows.
- Plot the first point using the $x$-value that satisfies $\sqrt[3]{x}=0$.
- Plot two points to the left and two points to the right of the first point.
Then click on the graph-a-function button.

Step 1 ：First, find the x-value that satisfies \(\sqrt[3]{x}=0\). The cube root of 0 is 0, so the first point is (0,5), because when we substitute x=0 into the function, we get f(0)=5.

Step 2 ：Next, find two points to the left and two points to the right of the first point. Choose x-values that are less than 0 and greater than 0, respectively. For simplicity, choose x=-1 and x=-2 for the points to the left, and x=1 and x=2 for the points to the right.

Step 3 ：Substitute these x-values into the function to find the corresponding y-values. This will give the coordinates of the points to plot on the graph.

Step 4 ：The five points to plot on the graph of the function are \((-2, 3.74), (-1, 4.0), (0, 5.0), (1, 6.0), (2, 6.26)\)

Step 5 ：\(\boxed{\text{Final Answer: The five points to plot on the graph of the function are } (-2, 3.74), (-1, 4.0), (0, 5.0), (1, 6.0), (2, 6.26)}\)