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One Dimensional Kinematics - Chapter Outline

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Title: One Dimensional Kinematics - Chapter Outline

1
One Dimensional Kinematics - Chapter Outline
Lesson 1 Describing Motion with Words Lesson 2
Describing Motion with Diagrams Lesson 3
Describing Motion with Displacement vs. Time
Graphs Lesson 4 Describing Motion with Velocity
vs. Time Graphs Lesson 5 Free Fall and the
Acceleration of Gravity Lesson 6 Describing
Motion with Equations

2
1.Describing Motion with Words

Know the Language of Kinematics
Differentiate Scalars and Vectors
Understand Distance and Displacement
Be able to calculate Speed and Velocity
Be able to calculate Acceleration

3
Introduction to the Language of Kinematics

Mechanics - the study of the motion of objects.
Kinematics is the science of describing the
motion of objects using words, diagrams, numbers,
graphs, and equations. Kinematics is a branch of
mechanics.

4
Scalars and Vectors

Scalars are quantities that are fully described
by a magnitude (or numerical value) alone.
Vectors are quantities that are fully described
by both a magnitude and a direction.

5
Distance and Displacement

Distance is a scalar quantity that refers to "how
much ground an object has covered" during its
motion.
Displacement is a vector quantity that refers to
"how far out of place an object is" it is the
object's overall change in position. Displacement
has a direction.
Example consider the motion depicted in the
diagram below. A physics teacher walks 4 meters
East, 2 meters South, 4 meters West, and finally
2 meters North.

the physics teacher has walked a total distance
of 12 meters, her displacement is 0 meters.
6
example

Use the diagram to determine the resulting
displacement and the distance traveled by the
skier during these three minutes.

The skier covers a distance of (180 m 140 m
100 m) 420 m and has a displacement of 140 m,
rightward.
7
example

What is the coach's resulting displacement and
distance of travel?

The coach covers a distance of (35 yds 20 yds
40 yds) 95 yards and has a displacement of 55
yards, left.
8
Check Your Understanding

1. What is the displacement of the cross-country
team if they begin at the school, run 10 miles
and finish back at the school?
2. What is the distance and the displacement of
the race car drivers in the Indy 500?

The displacement of the runners is 0 miles.
The displacement of the cars is somewhere near 0
miles since they virtually finish where they
started. Yet the successful cars have covered a
distance of 500 miles.

9
Velocity vs. Speed

VELOCITY
change in DISPLACEMENT occurring over time
Includes both MAGNITUDE and DIRECTION
VECTOR
SPEED
change in DISTANCE occurring over time
Includes ONLY MAGNITUDE
SCALAR

10
Average Velocity/Speed Equations

As an object moves, it often undergoes changes in
speed. The average speed during the course of a
motion is often computed using the following
formula

In contrast, the average velocity is often
computed using this formula

d is total displacement

The direction of velocity is the same as the
direction of motion.

11
example

Jim gets on his bike and rides 300 meters west in
60 seconds.
What is his average velocity?
What is his average speed?

12
example

Sally gets up one morning and decides to take a
three mile walk. She completes the first mile in
8.0 minutes, the second mile in 8.5 minutes, and
the third mile in 9.0 minutes. What is her
average speed?

13
example

In a drill during basketball practice, a player
runs the length of the 30.-meter court and back.
The player does this three times in 60. seconds.
What is the average speed of the player during
the drill?

14
example

The physics teacher walks 4 meters East, 2 meters
South, 4 meters West, and finally 2 meters North.
The entire motion lasted for 24 seconds.
Determine the average speed and the average
velocity.

her average speed was 0.50 m/s and her average
velocity of 0 m/s.
15
example

Use the diagram to determine the average speed
and the average velocity of the skier during
these three minutes.

The skier has an average speed of (420 m) / (3
min) 140 m/min and an average velocity of (140
m, right) / (3 min) 46.7 m/min, right
16
example

What is the coach's average speed and average
velocity?

The coach has an average speed of (95 yd) / (10
min) 9.5 yd/min and an average velocity of (55
yd, left) / (10 min) 5.5 yd/min, left
17
Average Speed vs. Instantaneous Speed
Average speed is a measure of the distance
traveled in a given period of time Suppose that
during your trip to school, you traveled a
distance of 5 miles and the trip lasted 0.2 hours
(12 minutes). The average speed of your car could
be determined as
Instantaneous Speed - the speed at any given
instant in time. For example, your speedometer
tells the instantaneous speed. During your trip,
there may have been times that you were stopped
and other times that your speedometer was reading
50 miles per hour. Yet, on average, you were
moving with a speed of 25 miles per hour.
18
Constant speed vs. changing speed
An object with a changing speed would be moving a
different distance each second. The data tables
below depict objects with constant and changing
speed.
Constant speed the object will cover the same
distance every regular interval of time
19
In conclusion

Speed and velocity are kinematics quantities that
have distinctly different definitions. Speed,
being a _______quantity, is the rate at which an
object covers ___________. The average speed is
the _____________ (a scalar quantity) per time
ratio. Speed is ignorant of direction. On the
other hand, velocity is a _________quantity it
is direction-aware. Velocity is the rate at which
the position changes. The average velocity is the
______________ or position change (a vector
quantity) per time ratio.

scalar
distance
distance
vector
displacement
20
Acceleration

Definition how fast the velocity is changing -
change in VELOCITY over TIME
Change in speed (speed up or slow down)
Change in direction
Equation
VECTOR
measured in velocity unit / time unit (m/s2,
mi/hr, etc.)

? (delta) means change ?v vf - vi
21
Anytime an object's velocity is changing, the
object is said to be accelerating it has an
acceleration
In a car, there are three controls that can
create acceleration gas petal, brake, steering
wheel.
According to the data, the velocity is changing
over the course of time. In fact, the velocity is
changing by a constant amount - 10 m/s - in each
second of time. This is a case of constant
acceleration.
22
The Meaning of Constant Acceleration

constant acceleration is when an accelerating
object will change its velocity by the same
amount each second.

Acceleration is constant
Acceleration is changing
Do not confuse constant velocity with constant
acceleration
23
Example
Monty the Monkey accelerates uniformly from rest
to a velocity of 9 m/s in a time span of 3
seconds. Calculate Monty's acceleration.
A child riding a bicycle at 15 meters per second
accelerates at -3.0 meters per second2 for 4.0
seconds. What is the childs speed at the end of
this 4.0-second interval?
24
The Direction of the Acceleration Vector

The direction of the acceleration vector depends
on whether the object is speeding up or slowing
down or changing directions.
If an object is speeding up, then its
acceleration is in the same direction of its
motion.
If an object is slowing down, then its
acceleration is in the opposite direction of its
motion.
If an object is traveling east initially (vi),
then goes west (vf), its acceleration is west
(same as vf)

Positive accelerations don't necessarily indicate
an object speeding up, and negative accelerations
don't necessarily indicate an object slowing down.
25
Example

The instant before a batter hits a 0.14-kilogram
baseball, the velocity of the ball is 45 meters
per second west. The instant after the batter
hits the ball, the balls velocity is 35 meters
per second east. The bat and ball are in contact
for 1.0 102 second. Determine the magnitude
and direction of the average acceleration of the
baseball while it is in contact with the bat.

vi 45 m/s W vf 35 m/s E t 2.0x10-2 s If
East is Then vi -45 m/s, vf 35 m/s
East
26
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27
2. Describing Motion with Diagrams

Know how to interpret motion using Ticker Tape
Diagrams
Know how to interpret motion using Vector
Diagrams

28
Ticker Tape Diagrams

A common way of analyzing the motion of objects
in physics labs is to perform a ticker tape
analysis. A long tape is attached to a moving
object and threaded through a device that places
a tick upon the tape at regular intervals of time
- say every 0.10 second. As the object moves, it
drags the tape through the "ticker," thus leaving
a trail of dots. The trail of dots provides a
history of the object's motion and therefore a
representation of the object's motion.

29
Examples of ticker tape diagram
30
Example

Oil drips at 0.4 seconds intervals from a car
that has an oil leak. Which pattern best
represents the spacing of oil drops as the car
accelerates uniformly from rest?
. . . . . . .
. . . .
. . . . . . .
. . . . . . . . .

31
Example

A spark timer is used to record the position of a
lab cart accelerating uniformly from rest. Each
0.10 second, the timer marks a dot on a recording
tape to indicate the position of the cart at that
instant, as shown.
The linear measurement between t 0 second to t
0.30 is 5.4 cm.
Calculate the average speed of the cart during
the time interval t 0 second to t 0.30
second.

32
Vector Diagrams

Vector diagrams are diagrams that depict the
direction and relative size of a vector quantity
by a vector arrow.

Constant acceleration
Both velocity and acceleration change
33
3. Describing Motion with d-t Graphs

Understand The Meaning of Slope for a d-t Graph
Know The Meaning of Shape for a d-t Graph
Be able to Determine the Slope on a d-t Graph

34
The Meaning of Slope for a d-t Graph
Distance or displacement

The slope of the line on a d-t graph is equal to
the speed/velocity of the object.

35
Slope is speed/velocity in a d-t Graph

If the object is moving with a velocity of 4
m/s, then the slope of the line will be ______.
If the object is moving with a velocity of -8
m/s, then the slope of the line will be _______.
If the object has a velocity of 0 m/s, then the
slope of the line will be ________.

4 m/s
-8 m/s
0 m/s
36
The Meaning of Shape for a d-t Graph
As the slope goes, so goes the velocity
Distance or displacement
Distance or displacement
Slope is Constant, positive, velocity is
constant, positive or speed is constant
Slope is increasing, positive, velocity is
increasing, positive or speed is increasing.
There is acceleration
37
As the slope goes, so goes the velocity
Slow, Positive, Constant Velocity
Fast, Positive, Constant Velocity
displacement
displacement
Fast, Negative, Constant Velocity
displacement
displacement
Slow, Negative Constant Velocity
38
As the slope goes, so goes the velocity
displacement
displacement
Slope is negative, increasing (steeper)
Slope is negative, decreasing (flatter)
velocity is negative, increasing (faster in
negative direction)
velocity is negative, decreasing (slower in
negative direction)
39
Check Your Understanding

Use the principle of slope to describe the motion
of the objects depicted by the two plots below.

displacement
displacement
velocity is positive, increasing (faster in
positive direction)
velocity is negative, increasing (faster in
negative direction)
40
example
displacement
Describe the velocity of the object between 0-5 s
and between 5-10 s.
The velocity is positive constant between 0-5
seconds The velocity is zero between 5-10 seconds
41
example
A cart travels with a constant nonzero
acceleration along a straight line. Which graph
best represents the relationship between the
distance the cart travels and time of travel?
A
B
C
D

42
example

Which graph best represents the motion of a block
accelerating uniformly down an inclined plane?

43
example

The displacement-time graph below represents the
motion of a cart initially moving forward along a
straight line. During which interval is the cart
moving forward at constant speed?

Determining the Slope on a d-t Graph

Displacement (m)

Pick two points on the line and determine their
coordinates.
Determine the difference in y-coordinates of
these two points (rise).
Determine the difference in x-coordinates for
these two points (run).

Divide the difference in y-coordinates by the
difference in x-coordinates (rise/run or slope).
Make sure all your work has units.

45
example
Slope -3.0 m/s
46
example

Determine the velocity (i.e., slope) of the
object as portrayed by the graph below.

The velocity (i.e., slope) is 4 m/s.
47
example

With the given d-t graph of Tom,
describe his motion during 0-5 s, 5-10 s, 10-12.5
s.
What is Toms total displacement in 12.5 seconds?

48
example

The graph represents the relationship between
distance and time for an object. What is the
instantaneous speed of the object at t 5.0
seconds?

49
example

The graph below represents the displacement of an
object moving in a straight line as a function of
time. What was the total distance traveled by the
object during the 10.0-second time interval?

50
4. Describing Motion with v-t Graphs

Know The Meaning of Slope for a v-t Graph
Be able to describe motion with given the Shape
for a v-t Graph
Be able to Determining the Slope on a v-t Graph
Be able to Relate the Shape of d-t graph to the
shape of v-t graph
Know the meaning of the Area on a v-t Graph
Be able to determine the Area on a v-t Graph

51
The Meaning of Slope for a v-t Graph
The slope of the line on a v-t graph is equal to
the ACCELERATION of the object.
The average velocity of constant acceleration can
be determined by
52
Describe motion with given the Shape for a v-t
Graph
The slope of the line on a velocity-time graph
reveals the acceleration of the object.
velocity is constant, Slope is zero, Acceleration
is Zero,
Velocity is Increasing, slope is positive,
constant, acceleration is positive, constant.
53
Direction of velocity

the velocity would be positive whenever the line
lies in the positive region (above the x-axis) of
the graph. Similarly, the velocity would be
negative whenever the line lies in the negative
region (below the x-axis) of the graph. And
finally, if a line crosses over the x-axis from
the positive region to the negative region of the
graph (or vice versa), then the object has
changed directions.

54
speeding up or slowing down?

Speeding up means that the magnitude (or
numerical value) of the velocity is getting
large.

55
Example

Consider the graph at the right. The object whose
motion is represented by this graph is ...
(include all that are true)
moving in the positive direction.
moving with a constant velocity.
moving with a negative velocity.
slowing down.
changing directions.
speeding up.
moving with a positive acceleration.
moving with a constant acceleration.

a, d and h
56
Example
What is constant? What is zero?
v is constant, positive. Slope is zero, a is
zero.
What is constant? What is zero?
v is constant, negative. Slope is zero, a is
zero.
57
What is increasing? What is constant?
What is decreasing? What is constant?
v is increasing, slope is constant, a is
constant. a and v are both positive.
v is decreasing, slope is constant, a is
constant. a is neg. v is pos.
What is increasing? What is constant?
What is decreasing? What is constant?
v is decreasing, slope is constant, a is
constant. a is pos. v is neg.
v is increasing, slope is constant, a is
constant. a and v are both negative.
58
Check Your Understanding

Describe the motion, include the direction of
motion ( or - direction), the velocity and
acceleration and any changes in speed (speeding
up or slowing down) during the various time
intervals (e.g., intervals A, B, and C).

1.
A direction at a constant speed, zero
acceleration B direction, slowing down,
negative acceleration C direction, a
constant speed slower speed than A, zero
acceleration.
59
2.
A direction, slowing down, constant negative
acceleration B zero velocity, zero
acceleration C - direction, speeding up,
constant negative acceleration.
3.
A direction, constant velocity, zero
acceleration B direction, slowing down,
constant negative acceleration C - direction,
speeding up, constant negative acceleration.
Point indicate changing direction
60

Determining the Slope on a v-t Graph

A method for carrying out the calculation is
Pick two points on the line and determine their
coordinates.
Determine the difference in y-coordinates for
these two points (rise).
Determine the difference in x-coordinates for
these two points (run).
Divide the difference in y-coordinates by the
difference in x-coordinates (rise/run or slope).

61
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62
Check Your Understanding

Determine the acceleration (i.e., slope) of the
object as portrayed by the graph.

The acceleration (i.e., slope) is 4 m/s/s.
63
Example
Describe motion from 0 4 s, and 4 8 s with
the given diagram.
From 0 s to 4 s slope 0 m/s2 a 0 m/s2 From
4 s to 8 s slope 2 m/s2 a 2 m/s2
64
Example

The velocity-time graph for a two-stage rocket is
shown below. Determine the acceleration of the
rocket during the listed time intervals.
t 0 - 1 second
t 1 - 4 second
t 4 - 12 second

40 m/s/s
20 m/s/s
-20 m/s/s
65
Relate d-t graph with v-t graph

In d-t graph, the slope is velocity.
In v-t graph, the slope is acceleration.
Motion can be describe by both graphs.
Example an object is moving with positive,
constant velocity.

all graphs represent the same motion
66
example

Graph d-t and v-t graphs for an object moving
with constant, positive acceleration.

all graphs represent same motion
Slope is velocity. Positive acceleration means
increasing velocity in positive direction, which
in turn means increasing slope, in positive
direction.
Slope is acceleration. Positive acceleration
means constant, positive slope.
acceleration is constant, positive.
67
example
Which pair of graphs represents the same motion
of an object?
A
B
C
D

68

example
Which pair of graphs represents the same motion?
A
B
C
D
69
example
Which pair of graphs represents the same motion
of an object?
A
B
C
D
70

The meaning of the Area on a v-t Graph

For velocity versus time graphs, the area bound
by the line and the axes represents the
displacement.
A ½ b x ( h1 h2) Or A ½b2xh2 - ½ b1xh1
A b x h A v x t A displacement
A ½ b x h
71
Determine the area of displacement

Determine the displacement (i.e., the area) of
the object during the first 4 seconds (Practice
A) and from 3 to 6 seconds (Practice B).

90 m
120 m
72
example

Determine the displacement of the object during
the first second (Practice A) and during the
first 3 seconds (Practice B).

5 m
45 m
73
example

Determine the displacement of the object during
the time interval from 2 to 3 seconds (Practice
A) and during the first 2 seconds (Practice B).

25 m
40 m
74
example

The graph below represents the velocity of an
object traveling in a straight line as a function
of time. Determine the magnitude of the total
displacement of the object at the end of the
first 6.0 seconds.

75
5. Free Fall and the Acceleration of Gravity

Understand the meaning of Free Fall
Know The Acceleration of Gravity
Be able to Represent Free Fall by Graphs
Be able to steer clear from The Big Misconception

76
What is Free Fall?

Free-falling objects do not encounter air
resistance.

Ticker tape trace for free fall
As an object free falls, its speed in increasing.
The distance traveled during each second also
increases.
77
Acceleration of gravity

The acceleration for any object moving under the
sole influence of gravity is called acceleration
of gravity
The symbol g is used to represent the
acceleration of gravity.
g 9.81 m/s2, downward
The value of the acceleration of gravity (g) is
different in different gravitational
environments.
On the moon, g 1.6 m/s2
On Mercury, g 3.7 m/s2

78
Acceleration is the rate at which an object
changes its velocity. It is the ratio of velocity
change to time between any two points in an
object's path.

To accelerate at 9.81 m/s/s means to change the
velocity by 9.81 m/s each second.

Time (s) Velocity (m/s)
0 0
1 - 9.81
2 - 19.62
3 - 29.43
4 - 39.24
5 - 49.05

If the velocity and time for a free-falling
object being dropped from a position of rest were
tabulated, then one would note the following
pattern.

Representing Free Fall by Graphs

Velocity is increasing in neg. direction. Slope
is increasing in negative direction.
Acceleration is constant, negative, slope is
constant, negative. Velocity starts from zero,
increase in neg. direction.
velocity
time
80
Graphs of up and down motion
velocity
Upward velocity is big, positive, decreasing,
slope is constant (a -9.8 m/s/s). Top, velocity
is zero. Slope remains the same (acceleration is
still -9.8 m/s/s) Downward velocity increases
in negative direction at the same constant rate
of -9.81 m/s/s (slope remains the same), reaches
the same speed as it started upward.
time
Upward displacement increases, slope is
positive, decreasing (velocity is positive,
decreasing) Top slope 0 (its velocity is
zero) Downward displacement decreases, its slope
increases in negative direction (velocity is
negative, increasing)
position
time
81
The Big Misconception

Does heavy object falls faster than lighter
object?
NO. The acceleration of a free-falling object (on
earth) is 9.81 m/s2. This value (known as the
acceleration of gravity) is the same for all
free-falling objects regardless of
how long they have been falling,
whether they were going up, down or go side ways.
How massive they were.

82
6. Describing Motion with Equations

Know The Kinematics Equations
Be able to apply Kinematics Equations to solve
Problems
Be able to apply Kinematics Equations to solve
problems in Free Fall
Be able to Relate Kinematics Equations and Graphs

83
Kinematics Equations

d - displacement t time a acceleration
- velocity vi - initial velocity vf - final
velocity

84
The strategy for solving problems

Identify and list the given information in
variable form.
Identify and list the unknown information in
variable form.
Identify and list the equation that will be used
to determine unknown information from known
information.
Substitute known values into the equation and use
appropriate algebraic steps to solve for the
unknown information.
Make sure your answer has proper unit

85
Example A

Ima Hurryin is approaching a stoplight moving
with a velocity of 30.0 m/s. The light turns
yellow, and Ima applies the brakes and skids to a
stop. If Ima's acceleration is -8.00 m/s2, then
determine the displacement of the car during the
skidding process. (Note that the direction of the
velocity and the acceleration vectors are denoted
by a and a - sign.)

vi vf ?t a d
30.0 m/s 0.00 m/s 15 m/s -8.00 m/s2 ?
3 sig figs.
86
Example B

Ben Rushin is waiting at a stoplight. When it
finally turns green, Ben accelerated from rest at
a rate of a 6.00 m/s2 for a time of 4.10 seconds.
Determine the displacement of Ben's car during
this time period.

vi vf ?t a d
0.00 m/s 4.10 s 6.00 m/s2 ?
3 sig figs.
87
Example C

A race car starting from rest accelerates
uniformly at a rate of 4.90 meters per second2.
What is the cars speed after it has traveled
200. meters?

vi vf ?t a d
0.00 m/s ? 4.10 s 4.90 m/s2 200. m
88
Kinematics Equations and Free Fall

An object in free fall experiences an
acceleration of -9.81 m/s2. ( downward
acceleration.)
If an object is merely dropped (as opposed to
being thrown) from an elevated height, then the
initial velocity of the object is 0 m/s. (vi 0)
If an object is projected upwards in a perfectly
vertical direction, then it will slow down as it
rises upward. The instant at which it reaches the
peak of its trajectory, its velocity is 0 m/s.
This value can be used as one of the motion
parameters in the kinematics equations for
example, the final velocity (vf) after traveling
to the peak would be assigned a value of 0 m/s.
If an object is projected upwards in a perfectly
vertical direction, then the velocity at which it
is projected is equal in magnitude and opposite
in sign to the velocity that it has when it
returns to the same height. That is, a ball
projected vertically with an upward velocity of
30 m/s will have a downward velocity of -30 m/s
when it returns to the same height.

89
Example A

Luke Autbeloe drops a pile of roof shingles from
the top of a roof located 8.52 meters above the
ground. Determine the time required for the
shingles to reach the ground.

up is positive, down is negative.
vi vf ?t a d
0.00 m/s ? -9.81m/s2 -8.52m
t 1.32 s
90
Example B

Rex Things throws his mother's crystal vase
vertically upwards with an initial velocity of
26.2 m/s. Determine the height to which the vase
will rise above its initial height.

vi vf ?t a d
26.2 m/s 0.00m/s 13.2m/s -9.81m/s2 ?
d 35.0 m
91
Check Your Understanding

An airplane accelerates down a runway at 3.20
m/s2 for 32.8 s until is finally lifts off the
ground. Determine the distance traveled before
takeoff.
A car starts from rest and accelerates uniformly
over a time of 5.21 seconds for a distance of 110
m. Determine the acceleration of the car.
Upton Chuck is riding the Giant Drop at Great
America. If Upton free falls for 2.6 seconds,
what will be his final velocity and how far will
he fall?

d 1720 m
a 8.10 m/ s2
vf -25.5 m/s
92

Kinematics Equations and Graphs
there are now two methods to solve problems
involving the numerical relationships between
displacement, velocity, acceleration and time.
Using equations
Using graphs the slope of the line on a
velocity-time graph is equal to the acceleration
of the object and the area between the line and
the time axis is equal to the displacement of the
object.

93
Using Kinematics Equations and Graphs to solve
problems

An object that moves with a constant velocity of
5.0 m/s for a time period of 5.0 seconds and
then accelerates to a final velocity of 15 m/s
over the next 5 seconds. What is the acceleration
of the object? How far did the object travel in
total of 10 seconds?
Using graph

Slope acceleration t 0 5 s a 0 t 5
10 s a 2 m/s2
Area displacement t 0 5 s d 25 m t 5
10 s d 50 m dtotal 75 m
94

2. Kinematics equations

vi vf ?t a d1
5.0 m/s 5.0 m/s 5.0 m/s 5.0 s 0 ?
t 0 s - 5 s
vi vf ?t a d2
5.0 m/s 15 m/s 10. m/s 5.0 s ? ?
t 5.0 s 10. s
95
practice

A 747 jet, traveling at a velocity of 70. meters
per second north, touches down on a runway. The
jet slows to rest at the rate of 2.0 meters per
second2. Calculate the total distance the jet
travels on the runway as it is brought to rest.
A basketball player jumped straight up to grab a
rebound. If she was in the air for 0.80 second,
how high did she jump?
A rocket initially at rest on the ground lifts
off vertically with a constant acceleration of
2.0 101 meters per second2. How long will it
take the rocket to reach an altitude of 9.0 103
meters?

A spark timer is used to record the position of a
lab cart accelerating uniformly from rest. Each
0.10 second, the timer marks a dot on a recording
tape to indicate the position of the cart at that
instant, as shown. The linear measurement
between t 0 second to t 0.30 is 5.4 cm.
Calculate the magnitude of the acceleration of
the cart during that time interval.

A
97

Rennata Gas is driving through town at 25.0 m/s
and begins to accelerate at a constant rate of
-1.0 m/s2. Eventually Rennata comes to a complete
stop.
Represent Rennata's accelerated motion by
sketching a velocity-time graph. Use the
velocity-time graph to determine this distance.
Use kinematic equations to calculate the distance
that Rennata travels while decelerating.

vf2 vi2 2ad (0 m/s)2 (25.0 m/s)2 2
(-1.0 m/s2)d 313 m d
Area 313 m
98

Otto Emissions is driving his car at 25.0 m/s.
Otto accelerates at 2.0 m/s2 for 5 seconds. Otto
then maintains a constant velocity for 10.0 more
seconds.
Represent the 15 seconds of Otto Emission's
motion by sketching a velocity-time graph. Use
the graph to determine the distance that Otto
traveled during the entire 15 seconds.
Finally, break the motion into its two segments
and use kinematic equations to calculate the
total distance traveled during the entire 15
seconds.

For the 1st 5 second d vit 0.5at2 d
(25.0 m/s)(5.0 s) 0.5(2.0 m/s2)(5.0 s)2 d
150 m
last 10 seconds d vit 0.5at2 d (35.0
m/s)(10.0 s) 0.5(0.0 m/s2)(10.0 s)2 d 350
m 0 m d 350 m
Area 500 m
distance 150 m 350 m 500 m
99

Luke Autbeloe, a human cannonball artist, is shot
off the edge of a cliff with an initial upward
velocity of 40.0 m/s. Luke accelerates with a
constant downward acceleration of -10.0 m/s2 (an
approximate value of the acceleration of
gravity).
Sketch a velocity-time graph for the first 8
seconds of Luke's motion.
Use kinematic equations to determine the time
required for Luke Autbeloe to drop back to the
original height of the cliff. Indicate this time
on the graph.

vf vi atup 0 m/s 40 m/s (-10
m/s2)tup tup 4.0 s 2tup 8.0 s
100

Chuck Wagon travels with a constant velocity of
0.5 mile/minute for 10 minutes. Chuck then
decelerates at -.25 mile/min2 for 2 minutes.
Sketch a velocity-time graph for Chuck Wagon's
motion. Use the velocity-time graph to determine
the total distance traveled by Chuck Wagon during
the 12 minutes of motion.
Finally, break the motion into its two segments
and use kinematics equations to determine the
total distance traveled by Chuck Wagon.

first 10 minutes
d vit 0.5at2 d (0.50 mi/min)(10.0 min)
0.5(0.0 mi/min2)(10.0 min)2 d 5.0 mi
last 2 minutes
Area 5.5 mi
d vit 0.5at2 d (0.50 mi/min)(2.0 min)
0.5(-0.25 m/s2)(2.0 min)2 d 0.5 mi
The total distance 5.5 mi
101

Vera Side is speeding down the interstate at 45.0
m/s. Vera looks ahead and observes an accident
that results in a pileup in the middle of the
road. By the time Vera slams on the breaks, she
is 50.0 m from the pileup. She slows down at a
rate of -10.0 m/s2.
Construct a velocity-time plot for Vera Side's
motion. Use the plot to determine the distance
that Vera would travel prior to reaching a
complete stop (if she did not collide with the
pileup).
Use kinematics equations to determine the
distance that Vera Side would travel prior to
reaching a complete stop (if she did not collide
with the pileup). Will Vera hit the cars in the
pileup? That is, will Vera travel more than 50.0
meters?

vf2 vi2 2ad (0 m/s)2 (45.0 m/s)2 2
(-10.0 m/s2)d 101 m d
Area 101 m
102

Earl E. Bird travels 30.0 m/s for 10.0 seconds.
He then accelerates at 3.00 m/s2 for 5.00
seconds.
Construct a velocity-time graph for Earl E.
Bird's motion. Use the plot to determine the
total distance traveled.
Divide the motion of the Earl E. Bird into the
two time segments and use kinematics equations to
calculate the total displacement.

first 10 seconds d vit 0.5at2 d (30.0
m/s)(10.0 s) 0.5(0.0 m/s2)(10.0 s)2 d 300 m
last 5 seconds d vit 0.5at2 d (30.0
m/s)(5.0 s) 0.5(3.0 m/s2)(5.0 s)2 d 150 m
37.5 m d 187.5 m
Area 488 m
The total distance 488 m
103
vocabulary