Chapter 2.3, Problem 6E

a.

To determine

To calculate: the values of $g\left(-2\right),g\left(0\right)$ and $g\left(7\right)$

Answer to Problem 6E

  $\begin{array}{l}g\left(-2\right)=4\\ g\left(0\right)=7\\ g\left(7\right)=4\end{array}$

Explanation of Solution

Given information: the graph of function g is provided,

  

Graph:

  

Interpretation:

In the graph, the value of $g\left(-2\right)$ is the corresponding y- value at x = $-2$ , that is,

  $g\left(-2\right)=4$

Similarly, the corresponding y -values for,

  $g\left(0\right)$ at x = 0 is 7

  $g\left(7\right)$ at x = 7 is 4

Hence,

  $\begin{array}{l}g\left(-2\right)=4\\ g\left(0\right)=7\\ g\left(7\right)=4\end{array}$

b.

To determine

the domain and the range of the provided graph

Answer to Problem 6E

The domain and range of g is [-2,8] and [2,7], respectively.

Explanation of Solution

Given information: the graph of function g is provided,

  

Graph:

  

Interpretaion:

The domain of the function g is all the x -values of the points on the graph, and the range is all the corresponding y -values.

From the graph of g , we see that the domain of g is the interval [-2, 8] and the range of g is the interval [2, 7].

Hence, the domain and range of g is [-2,8] and [2,7], respectively.

c.

To determine

To calculate: the value of x for which g ( x ) = 4

Answer to Problem 6E

the value of x for which g ( x ) = 3 is $-2,2,7$ .

Explanation of Solution

Given information: the graph of function g is provided,

  

Graph:

  

The function value of g ( a ) from the graph of g , is the height of the graph above the x -axis at x = a ,

Therefore, g ( x ) = 4 is the x -value on the x -axis where the height above it is 4, that are,

  $\begin{array}{l}g\left(-2\right)=4\\ g\left(2\right)=4\\ g\left(7\right)=4\end{array}$

hence, the value of x for which g ( x ) = 3 is $-2,2,7$ .

d.

To determine

To calculate: the values for $g\left(x\right)>4$

Answer to Problem 6E

the values of x for $g\left(x\right)>4$ are $-1\le x\le 1$ and x = 8

Explanation of Solution

Given information: the graph of function h is provided,

  

Graph:

  

Interpretation:

When $g\left(x\right)>4$ is expressed in words it means, g ( x ) is more than to 4. From the graph, write all the x -values whose corresponding y -values are more than 4.

Therefore, the x-values from the graph for $g\left(x\right)>4$ ,

  $g\left(-1\right),g\left(0\right),g\left(1\right),g\left(8\right)$

Hence, the values of x for $g\left(x\right)>4$ are $-1\le x\le 1$ and x = 8