Chapter 2.6, Problem 22E

Solution

To find: all real zeros of the function.

The real zeros of the function $\frac{2}{3},2,$ and $4$ .

Given information: 

The $f\left(x\right)=-3x^3+20x^2-36x+16$ .

  

Formula used:

The Rational Zero Theorem:

If $f\left(x\right)=a_n{x}^n+\cdots +a_{1}x+a_0$ consists of integer coefficients, then the shape of each rational zero of $f$ is as follows:

  $\frac{p}{q}=\frac{\text{ factor of constant term }{a}_0}{\text{ factor of leading coefficient }{a}_n}$

Calculation:

Consider the function

  $f\left(x\right)=-3x^3+20x^2-36x+16$

List the possible rational zeros of $\text{f}$ :

  $\pm \frac{1}{1},\pm \frac{2}{1},\pm \frac{4}{1},\pm \frac{8}{1},\pm \frac{16}{1},\pm \frac{1}{3},\pm \frac{2}{3},\pm \frac{4}{3},\pm \frac{8}{3},\pm \frac{16}{3}$

Choose reasonable values from the list above to check using the graph of the function.

For $f$ , the values $\begin{array}{l}x=\frac{2}{3},\\ x=2\end{array}$ and $x=4$ are reasonable based on the graph.

Check the values using synthetic division until a zero is found.

  $\frac{2}{3}$ is a zero.

  $\begin{array}{l}\frac{2}{3}\overline{)\begin{array}{llll}-3\hfill & 20\hfill & -36\hfill & 16\hfill \\ \hfill & -2\hfill & 12\hfill & -16\hfill \end{array}}\\ \begin{array}{lllll}\hfill & -3\hfill & 18\hfill & -24\hfill & 0\hfill \end{array}\end{array}$

Factor out a binomial using the result of the synthetic division.

Write a product of factors.

Factor $-3$ out of the second factor.

Multiply the first factor by $-3$ .

  $\begin{array}{c}\left(x-\frac{2}{3}\right)\left(-3x^2+18x-24\right)\\ \left(x-\frac{2}{3}\right)(-3)\left(x^2-6x+8\right)\\ (-3x+2)\left(x^2-6x+8\right)\end{array}$

Repeat the steps above for $g\left(x\right)=x^2-6x+8$ .

The graph shows that $2$ may be a zero.

Until a zero is discovered, use synthetic division to check the values.

  $2$ is a zero.

  

Utilizing the output of the synthetic division, factor out a binomial.

Write a product of factors.

  $\left(-3x+2\right)\left(x-2\right)\left(x-4\right)$

Use the zero-product property.

  $\begin{array}{c}0=\left(-3x+2\right)\left(x-2\right)\left(x-4\right)\\ -3x+2=0\\ x-2=0,\\ x-4=0\end{array}$

Solve for $x$ .

The real zeros of $f$ are $\frac{2}{3},2,$ and $4$ .