The \(y\)-intercept for the function is : \(\left( {0,P\left( 0 \right)} \right) = \left( {0,0} \right)\). In this case the point is also an \(x\)‑intercept. This will happen on occasion so we’ll need to deal with it.

The coefficient of the 5^th degree term is positive and so we know that the polynomial will increase without bound at the right end and decrease without bound at the left end.

Next, we need to pick a couple of points to graph. We’ll pick one point on the left and right end and it doesn’t matter which points to pick here so just pick one close to the zero on either end. We’ll also pick a point between each pair of zeroes and again it doesn’t really matter which points to pick so we’ll just pick points that are near the middle of each pair of zeroes.

Here are the function evaluations for this polynomial. We’ll leave it to you to verify the evaluations.

For the point at the right end point we chose 4.1 because the graph got very large very fast and this was the only way to keep the scale of the graph reasonable.

Finally, here is a quick sketch of the polynomial.

Note that your graph may not look quite like this one.

This is a computer generated graph and as such is very accurate. Using only Algebra techniques it can be quite difficult to approach this kind of accuracy. That is especially true in this case with the portion of the graph between \(x = 2\) and \(x = 4\). You’d only get it that portion correct if you’d chosen to check the point at \(x = 3\) which is not necessarily the obvious choice.

As long as the basic behavior of your graph is correct and you’ve got the extra points correctly graphed then you should have something that is close enough to the actual graph to work for a quick sketch.

For those interested, there are several techniques from a Calculus class that allow for a much more accurate sketch of the polynomial!