Exercise 39 Page 163

Let's now identify the increasing and decreasing intervals. We are told that the graph decreases when x<- 2 and when 02.

Notice that now we can tell where the zeros, minimum, and maximum values of our function will be.

• Zeros at - 3, - 1, 1, and 3 — at this points the function is changing sign of the values, this tells us the location of four of the real zeros.
• Minimums at x=- 2 and x=2 — at this points the function is changing from decreasing to increasing, this tells us that no other nearby points can have a lower y-coordinate.
• Maximum at x=0 — at this point the function is changing from increasing to decreasing, this tells us that no other nearby points can have a greater y-coordinate.

We will sketch the graph of the function with only four real zeros. We will plot them on the graph, then draw a curve that passes through those points. Also, be sure to remember that the graph has minimums at x=- 2 and x=2, and a maximum at x=0.

Note that this is only one of the infinitely many graphs with the given characteristics. Any graph with four zeros at - 3, - 1, 1, and 3, which is decreasing and increasing in the given intervals, will be correct.

Degree and Leading Coefficient of f

From the graph we can tell that f(x) approaches positive infinity as x approaches negative infinity and f(x) approaches positive infinity as x approaches positive infinity. f(x) → + ∞ as x → - ∞ f(x) → + ∞ as x → + ∞ From the up-up end behavior of the graph we know, that our polynomial function has an even degree and positive leading coefficient.