Work, Energy, and Power Name:

Work
Read from Lesson 1 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l1a.html
http://www.physicsclassroom.com/Class/energy/u5l1aa.html

MOP Connection: Work and Energy: sublevel 1

1. An impulse is a force acting over some amount of time to cause a change in momentum. On the
other hand, work is a ______________ acting over some amount of ___________________ to cause a
change in __________________.

2. Indicate whether or not the following represent examples of work.

Work Done?
a. A teacher applies a force to a wall and becomes exhausted.
Explanation: Yes or No?

b. A weightlifter lifts a barbell above her head.

Explanation: Yes or No?

c. A waiter carries a tray full of meals across a dining room at a

constant speed. Yes or No?
Explanation:

d. A rolling marble hits a note card and moves it across a table.

Explanation: Yes or No?

e. A shot-putter launches the shot.

Explanation: Yes or No?

3. Work is a ______________; a + or - sign on a work value indicates information about _______.

a. vector; the direction of the work vector
b. scalar; the direction of the work vector
c. vector; whether the work adds or removes energy from the object
d. scalar; whether the work adds or removes energy from the object

4. Which sets of units represent legitimate units for the quantity

work? Circle all correct answers.
a. Joule b. N x m
c. Foot x pound d. kg x m/sec
e. kg x m/sec2 f. kg x m2/sec2

© The Physics Classroom, 2020 Page 1

Work, Energy, and Power

The amount of work (W) done on an object by a given force can be calculated using
the formula
W = F d cos Q
where F is the force and d is the distance over which the force acts and Q is the
angle between F and d. It is important to recognize that the angle included in the
equation is not just any old angle; it has a distinct definition that must be
remembered when solving such work problems.

5. For each situation below, calculate the amount of work done by the applied force. PSYW

A 100 N force is applied to A 100 N force is applied at an An upward force is applied to

move a 15 kg object a angle of 30o to the horizontal to lift a 15 kg object to a height of
horizontal distance of 5 meters move a 15 kg object at a 5 meters at constant speed.
at constant speed. constant speed for a horizontal
distance of 5 m.

6. Indicate whether there is positive (+) or negative (-) work being done on the object.
a. An eastward-moving car skids to a stop across dry pavement.
b. A freshman stands on his toes and lifts a World Civilization book to the top shelf of his locker.
c. At Great America, a roller coaster car is lifted to the peak of the first hill on the Shock Wave.
d. A catcher puts out his mitt and catches the baseball.
e. A falling parachutist opens the chute and slows down.

7. Before beginning its initial descent, a roller coaster car is always pulled up the first hill to a high
initial height. Work is done on the car (usually by a chain) to achieve this initial height. A coaster
designer is considering three different angles at which to drag the 2000-kg car train to the top of the
60-meter high hill. Her big question is: which angle would require the most work?
_______________ Show your answers and explain.
Angle Force Distance Work
35° 1.15 * 104 N 105 m

45° 1.41 * 104 N 84.9 m

55° 1.64 * 104 N 73.2 m

© The Physics Classroom, 2020 Page 2

Work, Energy, and Power Name:

8. The following descriptions and their accompanying free-body diagrams show the forces acting upon
an object. For each case, calculate the work done by these forces; use the format of force •
displacement • cosine(Q). Finally, calculate the total work done by all forces.
Forces Doing Work on the Object
Free-Body Diagram Amount of Work Done by Each Force
a. A 10-N force is applied to push a
block across a frictionless surface for a
displacement of 5.0 m to the right. Wnorm = • • cos( )= J

Wapp = • • cos( )= J

Wgrav = • • cos( )= J

Wtotal = J

b. A 10-N frictional force slows a

moving block to a stop along a
horizontal surface after a displacement Wnorm = • • cos( )= J
of 5.0 m to the right.
Wgrav = • • cos( )= J

Wfrict = • • cos( )= J

Wtotal = J

c. A 10-N forces is applied to push a

block across a frictional surface at Wnorm = • • cos( )= J
constant speed for a displacement of
5.0 m to the right. Wapp = • • cos( )= J

Wgrav = • • cos( )= J

Wfrict = • • cos( )= J

Wtotal = J

d. A 2-kg object is sliding at constant

speed across a frictionless surface for a
displacement of 5.0 m to the right.
Wnorm = • • cos( )= J

Wgrav = • • cos( )= J

Wtotal = J

© The Physics Classroom, 2020 Page 3

Work, Energy, and Power

Forces Doing Work on the Object

Free-Body Diagram Amount of Work Done by Each Force
e. A 2-kg object is pulled upward at
constant speed by a 20-N force for a
vertical displacement of 5.0 m.
Wtens = • • cos( )= J

Wgrav = • • cos( )= J

Wtotal = J

f. A 2-kg tray of dinner plates is held

in the air and carried a distance of 5.0
m to the right.
Wapp = • • cos( )= J

Wgrav = • • cos( )= J

Wtotal = J

9. When a force is applied to do work on an object, does the object always accelerate? __________
Explain why or why not.

10. Determine the work done in the following situations.

a. Jim Neysweeper is applying a 21.6-N force downward at an angle of 57.2° with the horizontal
to displace a broom a distance of 6.28 m.

b. Ben Pumpiniron applies an upward force to lift a 129-kg barbell to a height of 1.98 m at a
constant speed.

c. An elevator lifts 12 occupants up 21 floors (76.8 meters) at a constant speed. The average mass
of the occupants is 62.8 kg.

© The Physics Classroom, 2020 Page 4

Work, Energy, and Power Name:

Power
Read from Lesson 1 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l1e.html
MOP Connection: Work and Energy: sublevel 2
Review:
1. A force acting upon an object to cause a displacement is known as _____.
a. energy b. potential c. kinetic d. work
2. Two acceptable units for work are ________. Choose two.
a. joule b. newton c. watt d. newton•meter
Power as a Rate Quantity:
3. Power is defined as the _______ is done.
a. amount of work which b. direction at which work
c. angle at which work d. the rate at which work
4. Two machines (e.g., elevators) might do identical jobs (e.g., lift 10 passengers three floors) and yet
the machines might have different power outputs. Explain how this can be so.

5. There are a variety of units for power. Which of the following would be fitting units of power
(though perhaps not standard)? Include all that apply.
a. Watt b. Joule c. Joule / second d. hp
6. Two physics students, Will N. Andable and Ben
Pumpiniron, are in the weightlifting room. Will lifts
the 100-pound barbell over his head 10 times in one
minute; Ben lifts the 100-pound barbell over his head
10 times in 10 seconds. Which student does the most
work? ______________ Which student delivers the
most power? ______________ Explain your answers.

7. During the Powerhouse lab, Jack and Jill ran up the hill. Jack is twice as massive as Jill; yet Jill
ascended the same distance in half the time. Who did the most work? ______________ Who
delivered the most power? ______________ Explain your answers.

8. An often-used equation for power is

Power = force x velocity
Express an understanding of the meaning of this equation by
using it to explain what type of individuals would be the best
choice for a lineman on a football team.

© The Physics Classroom, 2020 Page 5

Work, Energy, and Power

Work and Power Calculations

Read from Lesson 1 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l1aa.html
http://www.physicsclassroom.com/Class/energy/u5l1e.html
MOP Connection: Work and Energy: sublevels 1 and 2

1. Bart runs up a 2.91-meter high flight of stairs at a constant speed in 2.15 seconds. If Bart's mass is
65.9 kg, determine the work which he did and his power rating. PSYW

2. On a recent adventure trip, Anita Break went rock-climbing. Anita was able to steadily lift her 80.0-
kg body 20.0 meters in 100 seconds. Determine Anita 's power rating during this portion of the
climb. PSYW

3. A physics teacher owns a family of

squirrels. The squirrels have been
trained to do push-ups in
repetitive fashion. Being
connected to an electrical
generator, their ongoing exercise is
used to help power the home.
There are 23 squirrels in the family
and their average mass is 11 kg. They do work on the "up" part of the push-up, raising their body an
average distance of 5.0 cm. If the squirrels average 71 push-ups per minute, then determine the total
amount of work done in one minute and the power generated by their activity. PSYW

4. An elevator motor lifts 715 kg of mass to the height of the fourth floor of an office building (11.0
meters above ground level) at a constant speed in 9.35 seconds. Determine the power rating of the
motor. PSYW

© The Physics Classroom, 2020 Page 6

Work, Energy, and Power Name:

Energy
Read from Lesson 1 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l1b.html
http://www.physicsclassroom.com/Class/energy/u5l1c.html
http://www.physicsclassroom.com/Class/energy/u5l1d.html
MOP Connection: Work and Energy: sublevels 3 and 4
1. Read each of the following statements and identify them as having to do with kinetic energy (KE),
potential energy (PE) or both (B).
KE, PE or B? Statement:
1. If an object is at rest, it certainly does NOT possess this form of energy.
2. Depends upon object mass and object height.
3. The energy an object possesses due to its motion.
4. The amount is expressed using the unit joule (abbreviated J).
5. The energy stored in an object due to its position (or height).
6. The amount depends upon the arbitrarily assigned zero level.
7. Depends upon object mass and object speed.
8. If an object is at rest on the ground (zero height), it certainly does NOT
possess this form of energy.
2. A toy car is moving along with 0.40 joules of kinetic energy. If its speed is doubled, then its new
kinetic energy will be _______.
a. 0.10 J b. 0.20 J c. 0.80 J d. 1.60 J e. still 0.40 J
3. A young boy's glider is soaring through the air, possessing 0.80 joules of potential energy. If its
speed is doubled and its height is doubled, then the new potential energy will be _______.
a. 0.20 J b. 0.40 J c. 1.60 J d. 3.20 J e. still 0.80 J

4. Which would ALWAYS be true of an object possessing a kinetic energy of 0 joules?

a. It is on the ground. b. It is at rest. c. It is moving on the ground
d. It is moving. e. It is accelerating. f. It is at rest above ground level
g. It is above the ground. h. It is moving above ground level.

5. Which would ALWAYS be true of an object possessing a potential energy of 0 joules?

a. It is on the ground. b. It is at rest. c. It is moving on the ground
d. It is moving. e. It is accelerating. f. It is at rest above ground level
g. It is above the ground. h. It is moving above ground level.

6. Calculate the kinetic energy of a 5.2 kg object moving at 2.4 m/s. PSYW

7. Calculate the potential energy of a 5.2 kg object positioned 5.8 m above the ground. PSYW

8. Calculate the speed of a 5.2 kg object that possesses 26.1 J of kinetic energy. PSYW

© The Physics Classroom, 2020 Page 7

Work, Energy, and Power

9. The total mechanical energy of an object is the ______.

a. KE minus the PE of the object b. PE minus the KE of the object
c. the initial KE plus the initial PE of the object
d. KE plus the PE of the object at any instant during its motion
e. final amount of KE and PE minus the initial amount of KE and PE

10. If an object moves in such a manner as to conserve its total mechanical energy, then ______.
a. the amount of kinetic energy remains the same throughout its motion
b. the amount of potential energy remains the same throughout its motion
c. the amount of both the kinetic and the potential energy remains the same throughout its motion
d. the sum of the kinetic energy and the potential energy remains the same throughout its motion

11. Determine the total mechanical energy (TME) of the objects at positions A, B, C and D.

A: B: C: D:

12. Calculate the total mechanical energy (TME) of a 5.2 kg object moving at 2.4 m/s and positioned 5.8
m above the ground. PSYW

13. Read the following descriptions and indicate whether the objects' KE, PE and TME increases,
decreases or remains the same (=). If it is impossible to tell, then answer ???.
a. A marble begins at an elevated position on top of an inclined ruler and rolls down to the
bottom of the ruler.
KE: PE: TME:
b. A marble is rolling along a level table when it hits a note card and slides to a stop.
KE: PE: TME:
c. A cart is pulled from the bottom of an incline to the top of the incline at a constant speed.
KE: PE: TME:
d. A physics student runs up a staircase at a constant speed.
KE: PE: TME:
e. A force is applied to a root beer mug to accelerate it from rest across a level countertop.
KE: PE: TME:
f. A pendulum bob is released from rest from an elevated position and swings to its lowest
point.
KE: PE: TME:
g. A car skids from a high speed to a stopping position along a level highway.
KE: PE: TME:

© The Physics Classroom, 2020 Page 8

Work, Energy, and Power Name:

Work-Energy Relationships
Read from Lesson 2 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l2a.html
MOP Connection: Work and Energy: sublevel 5

Important Background: As an object moves, either its total mechanical energy is conserved or
mechanical energy is transferred to non-mechanical forms (such as thermal energy, light energy, electrical
energy, etc.). Whether there is an energy transfer or an energy conservation depends on whether or not
external (a.k.a. non-conservative) forces are doing work. If external forces (or non-conservative forces)
are doing work, then the total mechanical energy of the object is not conserved - energy is transferred
between mechanical and non-mechanical forms. On the other hand, if external forces do not do work, the
total mechanical energy of the object is conserved.

1. Categorize the following force types as being either internal or external forces: Fgrav; Fnorm;
Ffrict; Fair; Fapp; Ftens; and Fspring.
Internal Forces External Forces

2. Identify the following as being either always true (AT), never true (NT) or might be true (MBT).
AT, NT, MBT? Statement:
a. If gravity does work upon an object, then its total mechanical energy
(TME) is conserved.
b. If gravity is the only force doing work upon an object, then its total
mechanical energy (TME) is conserved.
c. If a normal force acts upon an object, then its TME will change.
d. If sliding friction does work upon an object, then its TME will decrease.
e. If only external forces are doing work upon an object, then its TME will be
conserved.
f. If both internal and external forces are doing net work upon an object,
then more information is needed to tell if its TME will be conserved.
g. If a quantity such as the total mechanical energy is conserved, then that
means that it does not change over the course of a motion.

3. Consider the three situations below. Identify whether or not the total mechanical energy (TME) is
being conserved. Then indicate if external forces (non-conservative) are doing work.

TME Conserved? TME Conserved? TME Conserved?

Ext. forces doing work? Ext. forces doing work? Ext. forces doing work?

© The Physics Classroom, 2020 Page 9

Work, Energy, and Power

4. For each statement, identify which forces (Fgrav; Fnorm; Ffrict; Fair; Fapp; Ftens; and Fspring)
are doing work. Then state whether the total mechanical energy will be conserved.
a. A bungee jumper rapidly b. A girl releases a softball
decelerates as he reaches from rest from a height of 2
the end of his spring-like meters above the ground;
bungee cord Ignore the the ball free-falls to the
effect of air resistance. ground.

Forces doing work? Forces doing work?

TME Conserved? Yes No TME Conserved? Yes No
c. A weightlifter briskly d. A swimmer pushes off the
raises a 200-pound blocks to accelerate forward
barbell above his head. at the beginning of a race.

Forces doing work? Forces doing work?

TME Conserved? Yes No TME Conserved? Yes No

For questions #5-#14, a physical situation is described. For each situation determine whether the total
mechanical energy (TME) of the object (in bold-face text) is conserved, increases, or decreases.
5. A force is applied to a root beer mug to accelerate it across a level countertop.
a. TME conserved b. TME increases c. TME decreases

6. A force is applied to a cart to raise it up an inclined plane at constant speed.

a. TME conserved b. TME increases c. TME decreases

7. A marble starts from rest and rolls down an inclined plane. Ignore friction.
a. TME conserved b. TME increases c. TME decreases

8. A physics student runs up a flight of stairs at constant speed.

a. TME conserved b. TME increases c. TME decreases

9. A baseball makes its flight through the air. (Neglect Fair.)

a. TME conserved b. TME increases c. TME decreases

10. A coffee filter is released from rest and falls with a terminal velocity.
a. TME conserved b. TME increases c. TME decreases

11. A car skids to a stop while traveling down a steep hill.

a. TME conserved b. TME increases c. TME decreases

12. A pendulum bob is tied to a string and swings back and forth. (Neglect Fair.)
a. TME conserved b. TME increases c. TME decreases

13. A marble hits a note card and slides to a stop.

a. TME conserved b. TME increases c. TME decreases

© The Physics Classroom, 2020 Page 10

Work, Energy, and Power Name:

Work-Energy Bar Charts

Read from Lesson 2 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l2c.html
MOP Connection: Work and Energy: sublevel 6

The work-energy relationship is the most important relationship of the unit. The work done by external
forces (Wext) is related to the total mechanical energy of the initial (TMEi) and of the total energy of the
final state (TMEf) of a system as follows:

TMEi + Wext = TMEf

Your goal should be to combine your understanding of kinetic energy, potential energy, and work with
the above equation in order to analyze physical situations involving energy changes and transformations
and to solve computational problems involving work and energy. One tool that will assist in the analysis
of physical situations is a work-energy bar chart. A work-energy bar chart represents the amount of
energy present in a system by means of a vertical bar. The length of a bar is representative of the amount
of energy present; a longer bar representing a greater amount of energy. According to the work-energy
theorem, the initial mechanical energy (kinetic and potential) plus the work done on the system by
external forces equals the final mechanical energy (kinetic and potential). Consequently, the sum of the
bar heights for any initial condition must equal the sum of the bar heights for the final condition.

Complete the following work-energy bar charts based on the given statement. Then cross out or cancel
any terms in the work-energy equation that are either zero or the same on each side.
1. A ball falls from the top of a
pillar to the ground below. The
initial state is the ball at rest at
the top of the pillar and the
final state is the ball just prior to
striking the ground. Ignore
Fair.

KEi + PEi + Wext = KEf + PEf

2. A car skids from a high speed to a stop with its

brakes applied. The initial state is the car
traveling at a high speed and the final state is the
car at rest. The force of friction does work on the
car, thus changing the total mechanical energy.

KEi + PEi + Wext = KEf + PEf

© The Physics Classroom, 2020 Page 11

Work, Energy, and Power

3. A skier starts from rest on top of hill A and skis

into the valley and back up onto hill B. The skier
utilizes her poles to propel herself across the
snow, thus doing work to change her totThe
initial state is on top of hill A and the final state is
on top of hill B. Ignore frictional forces.

KEi + PEi + Wext = KEf + PEf

4. A Hot Wheels car starts from rest on top of an

inclined plane and rolls down the incline through
a loop and along a horizontal surface. The initial
state is the car at rest on top of the hill and the
final state is the car in motion at the bottom of the
hill. Friction and air resistance have a significant
effect on the car.

KEi + PEi + Wext = KEf + PEf

5. A moving cross-country skier skis from the top of

a hill down into a valley and up a second smaller
hill. The initial state is the skier in motion on top
of the first hill and the final state is the skier in
motion on top the second hill. He uses his poles
to propel himself. Ignore the effect of friction and
air resistance.

KEi + PEi + Wext = KEf + PEf

6. Ben Laborin applies a force to push a crate from

the bottom of an inclined plane to the top at a
constant speed. The initial state is the crate in
motion at the bottom of the hill and the final state
is the crate in motion at the top of the hill. Ignore
frictional effects.

KEi + PEi + Wext = KEf + PEf

© The Physics Classroom, 2020 Page 12

Work, Energy, and Power Name:

Energy Concepts
Read from Lesson 2 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l2b.html
http://www.physicsclassroom.com/Class/energy/u5l2bb.html
http://www.physicsclassroom.com/Class/energy/u5l2bc.html
MOP Connection: Work and Energy: sublevel 7, 8, 9 and 10

1. Consider the falling motion of the ball in the following two frictionless situations. For each
situation, indicate the forces doing work upon the ball. Indicate whether the energy of the ball is
conserved and explain why. Finally, simplify the work-energy equation and use it to find the kinetic
energy and the velocity of the 2-kg ball just prior to striking the ground.

Forces doing work? Forces doing work?

TME Conserved: Yes or No? TME Conserved: Yes or No?

Explanation: Explanation:

KEi + PEi + Wext = KEf + PEf KEi + PEi + Wext = KEf + PEf

2. Use the work-energy relationship to fill in the blanks for the following system (m=2 kg). Neglect
frictional forces. Finally, darken in the bars of the bar chart in order to demonstrate the amount of
kinetic energy (KE), potential energy (PE) and total mechanical energy (TME).

© The Physics Classroom, 2020 Page 13

Work, Energy, and Power

3. A dart is launched from a dart gun and subsequently

follows a parabolic path typical of any projectile.
Five positions in the trajectory of the dart are marked
and labeled in the diagram at the right. For each of
the five positions and for position Z, fill in the work-
energy bar chart in the space below.
Z: position of dart when springs are compressed.
A: position of dart after release from springs.

4. A 2-kg ball moving at 2 m/s is rolling towards an inclined plane. It eventually rolls up the hill to a
position near the top where it momentarily stops prior to rolling back down he incline. Assume
negligible friction and air resistance. Construct a energy bar chart for the ball.

Simplify the equation below by canceling terms that are either zero or constant. Then use the
equation to determine the height to which the ball rises along the incline before stopping.
1 2 1 2
2 • m • vi + m • g • hi + F • d • cos Q = 2 • m • vf + m • g • hf

5. Three identical balls approach three different "frictionless" hills with a speed of 2 m/s. In which case
- A, B, or C, (or a tie) - will the ball roll the highest? ________ Explain your answer.

© The Physics Classroom, 2020 Page 14

Work, Energy, and Power Name:

6. Fill in the blanks in the following sentence:

An object starts from rest with a potential energy of 600 J and free-falls towards the ground.
After it has fallen to a height of one-fourth of its original height, its total mechanical energy is
_______ J, its potential energy is _______ J, and its kinetic energy is _______ J.

Consider the diagram at the right in answering the

next three questions. Five locations along a roller
coaster track are shown. Assume that there are
negligible friction and air resistance forces acting upon
the coaster car.

7. Rank the five locations in order of increasing

TME (smallest to largest TME). Use < and or
= signs between the blanks.
8. Rank the five locations in order of increasing
PE (smallest to largest PE). Use < and or =
signs between the blanks.
9. Rank the five locations in order of increasing
KE (smallest to largest KE). Use < and or =
signs between the blanks.

10. Use the law of conservation of energy (assume no friction nor air resistance) to determine the kinetic
and potential energy at the various marked positions along the roller coaster track below. Finally,
fill in the bars of the bar charts for positions A, B, C, D, and E.

© The Physics Classroom, 2020 Page 15

Work, Energy, and Power

11. Use the law of conservation of energy (assume no friction) to fill in the blanks at the various marked
positions for a 1000-kg roller coaster car.

12. In a physics lab, a 3.0-kg cart was pulled at a constant

speed along an inclined plane (with a force parallel
to the plane) to a height of 0.500 m. The angle of
incline was altered in each consecutive trial. It was
found that each angle required the same amount of
work to elevate the cart to the same height. Use your
understanding of work, energy and dynamics to fill
in the following table. (HINT: Fapp = Fparallel =
m*g*sin Q.)

Q h DPE Fparallel (N) d Work

(°) (m) (J) (m) (J)

a. 15 0.500 m

b. 20 0.500 m

c. 25 0.500 m

d. 35 0.500 m

e. 45 0.500 m

Show sample calculations below:

© The Physics Classroom, 2020 Page 16

Work, Energy, and Power Name:

13. A wrecking ball is raised above its highest point (State A), possessing 6000 J of PE relative to its
lowest location (State B). The wrecking ball strikes a building and comes to a resting position (State
C). Determine the kinetic energy of the wrecking ball at state B. __________________ Determine
the work done on the wrecking ball in going from State B to State C. __________________

State A State B State C

14. Pete Zaria applies a 4.0-N force to a 1.0-

kg mug of root beer to accelerate it over
a distance of 1.0-meter along the
countertop. Determine the work done
by Pete on the mug and the mug's final
kinetic energy and final velocity. PSYW

15. A 600-kg roller coaster car (includes passenger mass) is

moving at 20.0 m/s. The hydraulic braking system in
the track applies an external force to slow the car to a
speed of 5.0 m/s over a distance of 20.0 meters.
Determine the force that acts upon the car. PSYW

16. Construct work-energy bar charts for problems #14 and #15.
Problem #14 Problem #15

© The Physics Classroom, 2020 Page 17

Work, Energy, and Power

17. Vera is driving her 1000-kg car at

a speed of 8.0 m/s. When Vera
slams on the brakes, the ground
exerts a 8000-N frictional force to
bring the car to a stop.
Determine the initial kinetic
energy of the car, the work done
by friction on the car, and the stopping distance of the car. PSYW

18. If Vera's speed (in question #17) were increased to 24.0 m/s, then what would be the new stopping
distance? __________ In other words, how many times greater is the stopping distance if the speed
is tripled? __________ Explain.

19. A 0.750-kg peach can is at rest in

a shopping cart at the edge of a
hill. A strong wind sets it into
motion, sending down a 6.32-
meter high hill. The cart hits a
tree stump. But the peach can,
being in motion, continues in
motion until it finally collides
with a car. Upon impact, the
peach can exert an average force of 721 N upon the car body. Fill in the blanks and determine the
depth of the dent.

20. A 56.9 kg sledder

descends an 8.21-meter
high hill, encountering a
friction force of 11.7 N.
Fill in the blanks and
determine the speed of
the sledder after
traveling the 31.7 meters
to the bottom of the hill.

© The Physics Classroom, 2020 Page 18

Work, Energy, and Power Name:

Work-Energy Calculations
Study Lesson 2 of the Work, Energy and Power chapter at The Physics Classroom:
http://www.physicsclassroom.com/Class/energy/u5l2bc.html

For the following questions, begin with the work-energy equation, cancel terms, substitute and solve.
1. A glider is gliding through the air at a height of 416 meters with a speed of 45.2 m/s. The glider
dives to a height of 278 meters. Determine the glider's new speed.
KEi + PEi + Wext = KEf + PEf

2. A box with mass m is sliding along on a friction-

free surface at 9.87 m/s at a height of 1.81 m. It
travels down the hill and then up another hill.
a. Find the speed at the bottom of the hill.
KEi + PEi + Wext = KEf + PEf

b. Find the maximum vertical height to which the box will rise on the opposite hill.
KEi + PEi + Wext = KEf + PEf

3. A 1423-kg car is moving along a level highway with a speed of 26.4 m/s. The driver takes the foot
off the accelerator and the car experiences a retarding force of 901-N over a distance of 106 m.
Determine the speed of the car after traveling this distance.
KEi + PEi + Wext = KEf + PEf

4. A sledder starts from rest atop a 5.0-m

high hill (A). She sleds to the bottom and
up to the top of the adjacent 3.0-m high
hill. How fast is the sledder going at
point B? Ignore friction.
KEi + PEi + Wext = KEf + PEf

© The Physics Classroom, 2020 Page 19

Work, Energy, and Power

5. A 4768-kg roller coaster train full of riders approaches the loading dock at a speed of 17.1 m/s. It is
abruptly decelerated to a speed of 2.2 m/s over a distance of 13.6 m. Determine the retarding force
that acts upon the roller coaster cars.
KEi + PEi + Wext = KEf + PEf

6. A catcher's mitt recoils a distance of 12.9 cm in bringing a 142-gram baseball to a stop. If the applied
force is 588 N, then what was the speed of the baseball at the moment of contact with the catcher's
mitt?
KEi + PEi + Wext = KEf + PEf

7. An unknown force is applied to a 12 kg mass. The force acts at an angle of 30 degrees above the
horizontal. Determine the force acting if the force acts for a horizontal displacement of 22 meters
and increases the 12 kg mass's speed from 11 m/s to 26 m/s.
KEi + PEi + Wext = KEf + PEf

8. A physics teacher exerts a force upon a 3.29-kg pile of snow to both lift it and set it into motion. The
snow leaves the shovel with a speed of 2.94 m/s at a height of 0.562 m. Determine the work done
upon the pile of snow.
KEi + PEi + Wext = KEf + PEf

9. A 250.-gram cart starts from rest and rolls down an inclined plane from a height of 0.541 m.
Determine its speed at a height of 0.127 m above the bottom of the incline.
KEi + PEi + Wext = KEf + PEf

10. A 4357-kg roller coaster car starts from rest at the top of a 36.5-m high track. Determine the speed of
the car at the top of a loop that is 10.8 m high.
KEi + PEi + Wnc = KEf + PEf

© The Physics Classroom, 2020 Page 20