Chapter 3.4, Problem 9E

a.

To determine

To find:The time during which the particle moves forward, moves backward, speeds up and slows down.

Answer to Problem 9E

The particle moves forward when $t\in (0,1)\cup (5,7)$ , backward when $t\in (1,5)$ , speeds up when $t\in (1,2)\cup (5,6)$ and slows down when $t\in (0,1)\cup (3,5)\cup (6,7)$ .

Explanation of Solution

Given Information:A figure showing the velocity $v=f(t)$ of a particle moving on a co-ordinate line is given.

The particle moves forward when the velocity is positive, i.e., when $t\in (0,1)\cup (5,7)$ .

The particle moves backward when the velocity is negative, i.e., when $t\in (1,5)$ .

Now, $speed=\left|velocity\right|$ .

The particle speeds up when the slope of the graph of speed v/s time is positive, i.e., when $t\in (1,2)\cup (5,6)$ .

The particle slows down when the slope ofthe graph of speed v/s time is negative, i.e., when $t\in (0,1)\cup (3,5)\cup (6,7)$ .

b.

To determine

To find:The time during which the particle’s acceleration is positive, negative and zero.

Answer to Problem 9E

The acceleration of the particle is positive when $t\in (3,6)$ , negative when $t\in (0,2)\cup (6,7)$ and zero when $t\in (2,3)\cup (7,9)$ .

Explanation of Solution

Given Information:A figure showing the velocity $v=f(t)$ of a particle moving on a co-ordinate line is given.

The acceleration of the particle is positive when the slope of the given graph is positive, i.e., when $t\in (3,6)$ ; negative when slope is negative, i.e., when $t\in (0,2)\cup (6,7)$ and zero slope is zero, i.e., when $t\in (2,3)\cup (7,9)$ .

c.

To determine

To find:The time during which the particle is moving at its greatest speed.

Answer to Problem 9E

The speed is greatest when $t\in \left\{0\right\}\cup (2,3)$ .

Explanation of Solution

Given Information:A figure showing the velocity $v=f(t)$ of a particle moving on a co-ordinate line is given.

  $Speed=\left|Velocity\right|$

The speed is greatest when $t=0$ and when $t\in (2,3)$ , i.e., when $t\in \left\{0\right\}\cup (2,3)$ .

d.

To determine

To find:The time during which the particle stands still for more than an instant.

Answer to Problem 9E

The particle stands still for more than an instant when $t\in (7,9)$ .

Explanation of Solution

Given Information:A figure showing the velocity $v=f(t)$ of a particle moving on a co-ordinate line is given.

From figure, it is clear that when $t\in (7,9)$ , then the particle stands still for more than an instant.