Chapter 2.7, Problem 1E

Use the given graph to estimate the value of each derivative. Then sketch the graph of f'.

(a) f'(–3)

(b) f' (–2)

(c) f'(–1)

(d) f'(0)

(e) f'(l)

(f) f'(2)

(g) f'(3)

To determine

To estimate: The value of $f^{\prime }\left(-3\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(-3\right)$ is $-0.2$.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=-3$.

The calculation of the slope at $x=-3$ is as follows,

From the Figure 1,

$\begin{array}{c}m=\frac{-1.9+1.7}{-3+4}\\ =-0.2\end{array}$

Thus, $f^{\prime }\left(-3\right)=-0.2$.

To determine

To estimate: The value of $f^{\prime }\left(-2\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(-2\right)$ is 0.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=-2$.

From the Figure 2, tt is clear that the tangent to the graph at $x=-2$ is horizontal.

Thus, $f^{\prime }\left(-2\right)=0$

To determine

To estimate: The value of $f^{\prime }\left(-1\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(-1\right)$ is 1.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=-1$.

From the Figure 3, Slope of AB

$\begin{array}{c}m=\frac{-1+2}{-0.5+1.5}\\ =1\end{array}$

Thus, $f^{\prime }\left(-1\right)=1$.

To determine

To estimate: The value of $f^{\prime }\left(0\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(0\right)$ is 2.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=0$.

From the Figure 4, Slope of AB

$\begin{array}{c}m=\frac{-1-1}{-0.5-1.5}\\ =2\end{array}$

Thus, $f^{\prime }\left(0\right)=2$.

To determine

To estimate: The value of $f^{\prime }\left(1\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(1\right)$ is 1.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=1$.

From the Figure 5, Slope of AB

$\begin{array}{c}m=\frac{2-1}{1.5-0.5}\\ =1\end{array}$

Thus, $f^{\prime }\left(1\right)=1$.

To determine

To estimate: The value of $f^{\prime }\left(2\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(2\right)$ is 0.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=2$.

From the Figure 6, it is clear that the tangent to the graph at $x=2$ is horizontal.

Thus, $f^{\prime }\left(2\right)=0$.

To determine

To estimate: The value of $f^{\prime }\left(3\right)$ using the graph of f.

Answer to Problem 1E

The value of $f^{\prime }\left(3\right)$ is $0.2$.

Explanation of Solution

Estimation:

Draw the slope of the tangent at the point $x=3$.

From the Figure 7, Slope of AB

$\begin{array}{c}m=\frac{1.6-2}{4-2}\\ =-0.2\end{array}$

Thus, $f^{\prime }\left(3\right)=-0.2$.

To Sketch the graph of $f^{\prime }$, use the information from above parts to draw the graph of $f^{\prime }\left(x\right)$ as shown in Figure 8

From Figure 1, it is observed that the graph of $f^{\prime }\left(x\right)$ is an even function.