Chapter 2.4, Problem 5E

a.

To determine

To calculate: The graph of the function.

Explanation of Solution

Given information:

The points in the form of table are shown below.

t	s(t)
0	12.5
0.5	26
1	36.5
1.5	44
2	48.5
2.5	50
3	48.5
3.5	44
4	36.5

Calculation:

The graph from the given points is shown below.

  

Conclusion: The graph has been plotted.

b.

To determine

To calculate: The velocity from the distance time graph.

Answer to Problem 5E

The values are $s^{\prime }\left(1\right)=18$ , $s^{\prime }\left(2.5\right)=0$ and $s^{\prime }\left(3.5\right)=-12$ .

Explanation of Solution

Given information:

The points in the form of table are shown below.

t	s(t)
0	12.5
0.5	26
1	36.5
1.5	44
2	48.5
2.5	50
3	48.5
3.5	44
4	36.5

At $t=1$ , $t=2.5$ , $t=3.5$

Concept used:

The formula that can be used to calculate velocity is $\frac{\text{Distance}}{\text{Time}}$ .

Calculation:

The distance time graph is shown below.

  

The velocity at $t=1$ is calculated as shown below.

  $\begin{array}{c}{s}^{\prime }\left(1\right)=\frac{44-26}{1.5-0.5}\\ =\frac{18}{1}\\ =18\end{array}$

The velocity at $t=2.5$ is calculated as shown below.

  $\begin{array}{c}{s}^{\prime }\left(2.5\right)=\frac{48.5-48.5}{3-2}\\ =\frac{0}{1}\\ =0\end{array}$

The velocity at $t=3.5$ is calculated as shown below.

  $\begin{array}{c}{s}^{\prime }\left(3.5\right)=\frac{36.5-48.5}{4-3}\\ =-\frac{12}{1}\\ =-12\end{array}$

Conclusion: The velocity at $t=1$ is $18$ , $t=2.5$ is $0$ and $t=3.5$ is $-12$ .