Transcript Ch10,11

Ch10.1 – Energy and Work
Energy – the ability to produce change.
Ch10.1 – Energy and Work
Energy – the ability to produce change.
Kinetic Energy – energy of motion
KE = ½ m∙v2
Units:
Ex1) What is the kinetic energy associated with a freight train car travelling 2 m/s
with a mass of 1,000 kg?
Ex2) What is the kinetic energy associated with a 10 kg bowling ball
rolling at 20 m/s ?
Ch10.1 – Energy and Work
Energy – the ability to produce change.
Kinetic Energy – energy of motion
KE = ½ m ∙ v2
Units: kg ∙ m2 = kg ∙ m ∙ m = N∙m = J
s2
s2
(Joule)
Ex1) What is the kinetic energy associated with a freight train car travelling 2 m/s
with a mass of 1,000 kg?
Ex2) What is the kinetic energy associated with a 10 kg bowling ball rolling at 20 m/s ?
Ch10.1 – Energy and Work
Energy – the ability to produce change.
Kinetic Energy – energy of motion
KE = ½ m ∙ v2
Units: kg ∙ m2 = kg ∙ m ∙ m = N∙m = J
s2
s2
(Joule)
Ex1) What is the kinetic energy associated with a freight train car travelling 2 m/s
with a mass of 1,000 kg?
KE = ½( 1000 kg )( 2 m/s )2 = 2000 N∙m = 2,000 N.m
Ex2) What is the kinetic energy associated with a 10 kg bowling ball rolling at 20 m/s ?
Ch10.1 – Energy and Work
Energy – the ability to produce change.
Kinetic Energy – energy of motion
KE = ½ m ∙ v2
Units: kg ∙ m2 = kg ∙ m ∙ m = N∙m = J
s2
s2
(Joule)
Ex1) What is the kinetic energy associated with a freight train car travelling 2 m/s
with a mass of 1,000 kg?
KE = ½( 1000 kg )( 2 m/s )2 = 2000 N∙m = 2,000 N.m
Ex2) What is the kinetic energy associated with a 10 kg bowling ball rolling at 20 m/s ?
KE = ½ ( 10 kg )( 20 m/s )2 = 2000 J
Work – force applied over a distance
W=F∙d
Force and distance must be in the same direction
Ex3) How much work is done when a person pushes a shopping cart
with a force of 50 N for 500 meters?
Work – force applied over a distance
W=F∙d
Force and distance must be in the same direction
Ex3) How much work is done when a person pushes a shopping cart
with a force of 50 N for 500 meters?
W = F ∙ d = ( 50N )( 500m ) = 25,000 N∙m
Work – force applied over a distance
W=F∙d
Force and distance must be in the same direction
Ex3) How much work is done when a person pushes a shopping cart
with a force of 50 N for 500 meters?
W = F ∙ d = ( 50N )( 500m ) = 25,000 N∙m
Work – Energy Theorem
W = ∆KE
Ex4) A hockey player hits a puck, applying a force of 4,000 N over a distance
of 0.5 m, accelerating the puck up to 40 m/s. What is the mass of the puck?
Work – force applied over a distance
W=F∙d
Force and distance must be in the same direction
Ex3) How much work is done when a person pushes a shopping cart
with a force of 50 N for 500 meters?
W = F ∙ d = ( 50N )( 500m ) = 25,000 N∙m
Work – Energy Theorem
W = ∆KE
Ex4) A hockey player hits a puck, applying a force of 4,000 N over a distance of 0.5 m,
accelerating the puck up to 40 m/s. What is the mass of the puck?
F = 4000N
d = 0.5m
vF = 40 m/s
vi = 0
m=?
vF2 = vi2 + 2ad
F=m∙a
W = ∆KE
F ∙ d = KEf – KEi
F ∙ d = ½ mvf2 – ½ mvi2
( 4000 )( .5 ) = ½ m( 40 )2
m = 2.5 kg
1. an object is lifted, work is done
overcoming gravity
1
W = (+)
2
3
4
1. an object is lifted, work is done
F d
1
overcoming gravity
W = (+)
2. an object is dropped, gravity does
the work to bring it back down. W = (–)
2
3
4
1. an object is lifted, work is done
F d
1
overcoming gravity
W = (+)
2. an object is dropped, gravity does
the work to bring it back down. W = (–)
3. an object is pushed across a surface,
3
work is done overcoming friction.
2
F d
4
1. an object is lifted, work is done
F d
1
overcoming gravity
W = (+)
2. an object is dropped, gravity does
the work to bring it back down. W = (–)
3. an object is pushed across a surface,
F d
3
work is done overcoming friction.
4. an object is carried horizontally,
no work is done on the object.
4
2
F d
1. an object is lifted, work is done
F d
1
overcoming gravity
W = (+)
2. an object is dropped, gravity does
the work to bring it back down. W = (–)
3. an object is pushed across a surface,
F d
3
work is done overcoming friction.
4. an object is carried horizontally,
F
no work is done on the object.
4
2
F d
d
What about work done in circular motion lab?
Top View
vel
Fc
1. an object is lifted, work is done
F d
1
overcoming gravity
W = (+)
2. an object is dropped, gravity does
the work to bring it back down. W = (–)
3. an object is pushed across a surface,
F d
3
work is done overcoming gravity.
4. an object is carried horizontally,
F
no work is done on the object.
4
So what about in between?
Force at an angle
A tall person pushing a cart:
d
θ
F
W = F.d.cosθ
2
F d
d
Ex5) A sailor pulls a boat 30.0 m along a dock using a rope that makes
a 25° angle with the horizontal. How much work does he do if he exerts a force
of 255 N on the rope?
F = 255 N
25°
d = 30 m
Ex5) A sailor pulls a boat 30.0 m along a dock using a rope that makes
a 25° angle with the horizontal. How much work does he do if he exerts a force
of 255 N on the rope?
F = 255 N
25°
d = 30 m
W = F ∙ d ∙ cosθ = ( 255 N )( 30 m )( cos25° ) = 6933 J
HW #7) An airplane passenger carries a 215 N suitcase up the stairs,
a displacement of 4.20 m vertically and 4.60 m horizontally.
a) How much work does the passenger do?
b) The same passenger carries it back downstairs. How much work now?
4.20m
4.60m
Ch10 HW#1 1 – 8
HW #7) An airplane passenger carries a 215 N suitcase up the stairs,
a displacement of 4.20 m vertically and 4.60 m horizontally.
a) How much work does the passenger do?
b) The same passenger carries it back downstairs. How much work now?
a) W = F..d
4.20m
= 215N.4.20m
= 903 J
4.60m
b) W = - 903 J
Ch10 HW#1 1 – 8
Chapter 10 HW #1
1–8
1. A student lifts a box that weighs 185N. The box is lifted 0.800m.
How much work?
d = .800 m
Fg = 185 N
2. Two students exert a force of 825N in pushing a car 35m. How
much work do they do on the car?
d = 35m
F = 825N
3) A 0.180kg ball falls 2.5m. How much work does the force of gravity do on
the ball?
d = 2.5 m
Fg = 1.8 N
4) A forklift raises a box 1.2m doing 7000J of work on it.
What is the mass of the box?
F d
Fg
5. You and a friend each carry identical boxes to a room one floor above you and
down the hall. You carry your box up a set of stairs then down the hallway. Your
friend carries a box down the hall then up another stairwell. Who does more
work?
6. How much work does the force of gravity do when a 24N object falls a distance
of 3.5m?
W= F∙d
d = 3.5 m
Fg = 24 N
5. You and a friend each carry identical boxes to a room one floor above you and
down the hall. You carry your box up a set of stairs then down the hallway. Your
friend carries a box down the hall then up another stairwell. Who does more
work?
same vertical distance
= same work
6. How much work does the force of gravity do when a 24N object falls a distance
of 3.5m?
W= F∙d
d = 3.5 m
Fg = 24 N
8. A rope is used to pull a metal box 15.0 m across the floor. The rope is held at an
angle of 46.0° with the floor, and a force of 628N is used. How much work is done
on the box?
F = 628 N
46°
Fx
d = 15 m
W = F · d · cosθ
Ch10.2 – Work Under a Varying Force
Work = Area under the Force/Distance graph
Ex1) A bow string is pulled back 0.5 meters.
The force to pull it increases with distance
from 0 N to 20 N as shown.
20
How much work is done?
15
F (N)
10
5
0.1
0.2
0.3
d (m)
0.4
0.5
Ch10.2 – Work Under a Varying Force
Work = Area under the Force – Distance graph
Ex1) A bow string is pulled back 0.5 meters.
The force to pull it increases with distance
from 0 N to 20 N as shown.
20
How much work is done?
Work = Area
15
F (N)
=½b·h
10
= ½ ( .5 m )( 20 N )
5
= 5J
0.1
0.2
0.3
d (m)
0.4
0.5
Ex2) How much work is done by this erratic Force?
Work = Area →
20
15
F (N)
10
5
1
2
3
d (m)
4
5
+
+
Ex2) How much work is done by this erratic Force?
Work = Area →
+
+
= (½ b·h) + (l·w) + (½ b·h)
= ½(2)(10) + (3)(10) + ½(2)(10)
= 50 J
20
15
F (N)
10
10
5
10
1
2
3
d (m)
4
5
Ex3) To compress a large coil spring 10 cm requires a force that increases
linearly from 10 N to 50 N. How much work is done on the spring?
50
40
30
F (N)
20
10
.02
.04
.06 .08
d (m)
.10
Ex3) To compress a large coil spring 10 cm requires a force that increases
linearly from 10 N to 50 N. How much work is done on the spring?
50
Work = Area
= 1 + 2
= ½ b·h + l·w
40
= ½(.1)(40) + (.1)(10)
=3J
40
30
F (N)
20
1
10
2
.02
.04
.06
d (m)
10
.08
.10
Power – the rate at which work is done
Power = work
time
Units:
Ex1)
An electric motor lifts an elevator 9.0 m in 15.0 seconds by exerting
a force of 12,000 N. What power does it produce?
F
d=9m
Fg = 12,000 N
Power – the rate at which work is done
Power = work
time
P = W
t
or
P = F·d
t
or
P = F·v
t
Units: J/s → Watt
Ex1)
An electric motor lifts an elevator 9.0 m in 15.0 seconds by exerting
a force of 12,000 N. What power does it produce?
F
P = F·d = ( 12,000 N )( 9.0 m ) = 7,200 W
t
( 15.0 sec )
d=9m
Fg = 12,000 N
Ex2) Through a set of pulleys, a 10 kg mass is lifted .25 m in 0.5 seconds.
How much power was required?
F
FG
Ch10 HW#2 9 – 12
Ex2) Through a set of pulleys, a 10 kg mass is lifted .25 m in 0.5 seconds.
How much power was required?
F
P = F·d = ( mg )·d = ( 100 N )( .25 m ) = 50 W
t
t
( .5 s )
FG
Ch10 HW#2 9 – 12
Lab10.1 Power
- due tomorrow
- go over Ch10 HW#2 before lab
Ch10 HW#2 9 – 12
9. A 575N box is lifted 20.0m in 10 sec. What is the power required?
10. A 645N rock climber climbs 8.2m in 30 min.
a. How much work?
b. Power?
Ch10 HW#2 9 – 12
9. A 575N box is lifted 20.0m in 10 sec. What is the power required?
P = F·d = (575N)(20.0m) =
t
(10s)
10. A 645N rock climber climbs 8.2m in 30 min.
a. How much work?
W = F·d = (645N)(8.2m) =
b. Power?
P = W = 5280 J =
t
1800s
11. An electric motor develops 65 kw of power as it lifts a loaded elevator 17.5 m
in 35 seconds. How much force does the motor exert?
P = 65,000 W
d = 17. 5 m
t = 35 sec
F=?
P = W
t
P = F·d
t
12. Pushing a stalled car, it takes 210N to get it moving, and the force decreases
at a constant rate until it reaches 40N by 15m.
How much work is done during this interval?
11. An electric motor develops 65 kw of power as it lifts a loaded elevator 17.5 m
in 35 seconds. How much force does the motor exert?
P = 65,000 W
P = W
d = 17. 5 m
t
t = 35 sec
P = F·d
F=?
t
F=
12. Pushing a stalled car, it takes 210N to get it moving, and the force decreases
at a constant rate until it reaches 40N by 15m.
How much work is done during this interval?
200
Work = Area
= 1 + 2
150
= ½ b·h + l·w
F (N)
100
= ½(15m)(170N) + (15m)(40N)
=
1
50
2
5
10
d (m)
15
13. In the tractor pull competition, the trailer is set up so that as the tractor
pulls the trailer, the trailer shifts its mass forward, increasing the drag,
and thus increasing the force required to pull. If ur not sure what I’m
referring to, Youtube it! A graph of the Force required vs distance is shown:
How much work is done by the tractor?
20000
15000
F (N)
10000
5000
10
20 30 40
d (m)
50
13. In the tractor pull competition, the trailer is set up so that as the tractor
pulls the trailer, the trailer shifts its mass forward, increasing the drag,
and thus increasing the force required to pull. If ur not sure what I’m
referring to, Youtube it! A graph of the Force required vs distance is shown:
How much work is done by the tractor?
20000
Work = Area
15000
= 1 + 2
F (N)
= ½ b·h + l·w
10000
= ½(50m)(5000N)+(50m)(15000N)
=
5000
1
2
10
20 30 40
d (m)
50
Ch10.3 – Machines
- make work “feel” easier by changing forces,
either magnitude or direction.
Ch10.3 – Machines
- make work “feel” easier by changing forces,
either magnitude or direction.
- you apply an input force, Fin, the machine multiplies the force lifting
the object, called the output force, Fout.
Ch10.3 – Machines
- make work “feel” easier by changing forces,
either magnitude or direction.
- you apply an input force, Fin, the machine multiplies the force lifting
the object, called the output force, Fout.
- this multiplying of forces is at the expense of distance moved.
The input distance, din, is greater than the output distance, dout.
Ch10.3 – Machines
- make work “feel” easier by changing forces,
either magnitude or direction.
- you apply an input force, Fin, the machine multiplies the force lifting
the object, called the output force, Fout.
- this multiplying of forces is at the expense of distance moved.
The input distance, din, is greater than the output distance, dout.
- Machines conserve energy:
Win = Wout
Fin.din = Fout.dout
Ch10.3 – Machines
- make work “feel” easier by changing forces,
either magnitude or direction.
- you apply an input force, Fin, the machine multiplies the force lifting
the object, called the output force, Fout.
- this multiplying of forces is at the expense of distance moved.
The input distance, din, is greater than the output distance, dout.
- Machines conserve energy:
Win = Wout
Fin.din = Fout.dout
- Machines are rated by their mechanical advantage:
Real Mechanical Advantage:
Ideal Mechanical Advantage:
Fout
RMA 
Fin
d in
IMA 
d out
- as machines become more complex (more moving parts),
they lose efficiency:
Wout
Efficiency =
100%
Win
or
RMA
100%
IMA
- as machines become more complex (more moving parts),
they lose efficiency:
Wout
100%
Efficiency =
Win
or
RMA
100%
IMA
- Six types of simple machines
(On test)
1. Levers (3 classes, Lab10.2)
2. Pulleys (Lab10.3)
3. Incline Planes
4. Wedge
5. Screw
6. Wheel and axle
- Compound Machines – combination of 2 or more simple machines
Exs: axe, bike, block and tackle system
Ex1) A 1st class lever is set up to lift a 10N object as shown.
What does the scale read?
10N
Ex2) A 2nd class lever is set up as shown.
a. What does the scale read?
b. What is the ideal MA?
10N
Ex1) A 1st class lever is set up to lift a 10N object.
as shown. What does the scale read?
6m
.2m
10N
Fin.din = Fout.dout
Fin.(.6m) = (10N).(.2m)
Fin = 3.3N
Fin
Fout
Ex2) A 2nd class lever is set up as shown.
a. What does the scale read?
b. What is the ideal MA?
10N
Ex1) A 1st class lever is set up to lift a 10N object.
as shown. What does the scale read?
6m
.2m
10N
Fin.din = Fout.dout
Fin.(.6m) = (10N).(.2m)
Fin = 3.3N
Fin
Ex2) A 2nd class lever is set up as shown.
a. What does the scale read?
b. What is the ideal MA?
a) Fin.din = Fout.dout
Fin
Fout
din = .8m dout = .3m
10N
Fin.(.8m) = (10N).(.3m)
Fin = 3.75N
b)
d in .8m
IMA 

 2.7
d out .3m
Fout
Ex3) A 3rd class lever is set up as shown.
What does the scale read?
10N
Ex4) A pulley system is set up as shown.
The scale reads ___N when is lifts a 10N
object. The scale moves ___m
when the object moves 0.05m.
a. What is the IMA?
b. What is the RMA?
c. What is the efficiency?
10N
Ex3) A 3rd class lever is set up as shown.
What does the scale read?
Fin.din = Fout.dout
Fin.(.4m) = (10N).(.8m)
Fin = 20N
din =.4m
10N
dout = .8m
Ex4) A pulley system is set up as shown.
The scale reads 3.5N when is lifts a 10N
object. The scale moves .20m
when the object moves 0.05m.
a. What is the IMA?
b. What is the RMA?
c. What is the efficiency?
10N
Fout Fin
Ex3) A 3rd class lever is set up as shown.
What does the scale read?
Fin.din = Fout.dout
Fin.(.4m) = (10N).(.8m)
Fin = 20N
din =.4m
10N
dout = .8m
Ex4) A pulley system is set up as shown.
The scale reads 3.5N when is lifts a 10N
object. The scale moves .20m
when the object moves 0.05m.
d
.2 m
a. What is the IMA?
IMA  in 
4
d out .05m
b. What is the RMA?
F
10 N
RMA  out 
 2.85
Fin 3.5 N
c. What is the efficiency?
Eff 
RMA
2.85
100% 
100%  71%
IMA
4
Ch10 HW#3 13 – 16
10N
Fout Fin
Lab10.2 – Levers
- due tomorrow
- Ch10 HW#3 due at beginning of period
Lab10.3 – Pulleys
- due tomorrow
Ch10 HW#3 13 – 16
13. A sledgehammer drives a wedge into a piece of wood.
The wedge is driven .20m into a log, and the log separates by 0.05m.
A force of 1.9x104 N splits the log. What is the input force?
14. A pulley system raises a 240N carton 16.5m. A force of 129N is exerted on
the rope
and it is pulled 33.0m.
a. What is IMA?
b. What is RMA?
c. Efficiency?
Ch10 HW#3 13 – 16
13. A sledgehammer drives a wedge into a piece of wood. The wedge is driven
.20m into a log, and the log separates by 0.05m. A force of 1.9x104 N splits the
log. What is the input force?
Fin.din = Fout.dout
Fin.(.2m) = (1.9x104N).(.05m)
Fin =
14. A pulley system raises a 240N carton 16.5m. A force of 129N is exerted on
the rope and it is pulled 33.0m.
d in
33m
a. What is IMA?
IMA 


b. What is RMA?
d out 16 .5m
c. Efficiency?
Fout 240 N
RMA 


Fin 129 N
RMA
Eff 
100 % 
IMA
15. A boy exerts a force of 225N on a lever to raise a 1.25x103 N rock
a distance of 13cm. How far did the boy move the lever?
Fin.din = Fout.dout
16. A lab group makes a lever out of a meterstick. The fulcrum is at 30cm.
The object is at the 10cm mark. The scale reads 2.5N and is located at 90cm.
What is the weight of the object?
din = .6m
Fin.din = Fout.dout
dout = .2m
?
Fin = 2.5N
Fout = ?
15. A boy exerts a force of 225N on a lever to raise a 1.25x103 N rock
a distance of 13cm. How far did the boy move the lever?
Fin.din = Fout.dout
(225N).(din) = (1.25x103N).(13cm)
din =
16. A lab group makes a lever out of a meterstick. The fulcrum is at 30cm.
The object is at the 10cm mark. The scale reads 2.5N and is located at 90cm.
What is the weight of the object?
din = .6m
Fin.din = Fout.dout
(2.5N).(60cm) = Fout.(20cm)
Fout =
dout = .2m
?
Fin = 2.5N
Fout = ?
Ch11 – Energy
Kinetic Energy KE = ½ mv2
(Work = ∆KE )
Ex1) An 875 kg car speeds up from 22.0 – 44.0 m/s.
What were the initial and final energies of the car?
How much work was done on the car to increase the speed?
Ch11 – Energy
Kinetic Energy
KE = ½ mv2
(Work = ∆KE )
Ex1) An 875 kg car speeds up from 22.0 – 44.0 m/s.
What were the initial and final energies of the car?
How much work was done on the car to increase the speed?
KEi = ½ ( 875 kg )( 22 m/s )2 = 211,750 J
KEf = ½ ( 875 kg )( 44 m/s )2 = 847,000 J
W = ∆KE = KEF – KEi = 847,000 – 211,750 = 635,250 J
HW #2) A rifle can shoot a 4.20 g bullet at a speed of 965 m/s.
vi = 0
vf = 965 m/s
b. KEf of bullet:
c. What work was done on the bullet?
d. If the work is done over a distance of 0.75 m what was the average force?
e. The bullet comes to rest, penetrating 1.5 cm into metal.
What is the magnitude and direction of the force the metal exerts?
d = .015 m
KEi =____J
KEf = 0 J
vi = 965 m/s
vf = 0
F=?
HW #2) A rifle can shoot a 4.20 g bullet at a speed of 965 m/s.
vi = 0 vf = 965 m/s
KEi = 0
KEf
b. KEf of bullet KEf = ½ mvf2 = ½ ( .0042 kg )( 965 m/s )2 = 1956 J
c. What work was done on the bullet? W = ? W = ∆KE = KEf – KEi = 1956 J
d. If the work is done over a distance of 0.75 m what was the average force?
W = F·d F = W = 1956J = 2608 N
d .75 m
e. The bullet comes to rest, penetrating 1.5 cm into metal.
What is the magnitude and direction of the force the metal exerts?
W = ∆KE = 0 – 1956 J
d = .015 m
W = F·d
KEi = 1956 J
KEf = 0 J
F = W = -1956 J = -130,400 N
vi = 965 m/s
vF = 0
d .015 m
F=?
Potential Energy – stored energy
Gravitational Potential Energy – energy due to the position above the ground
PEG = mgh
(sometimes called Ug)
Ex2) Lift a 2kg book from the floor to a shelf 2.10m up.
a. What is the PEG relative to the floor?
b. What is the PEG relative to your head 1.65 m
above the floor?
Elastic PE – energy stored in a spring.
PES = ½kx2
Ch11 HW#1 1 – 6
Potential Energy – stored energy
Gravitational Potential Energy – energy due to the position above the ground
PEG = mgh
(sometimes called Ug)
Ex2) Lift a 2kg book from the floor to a shelf 2.10m up.
a. What is the PEG relative to the floor? PEG = (2kg)(9.8m/s2)(2.10m)
b. What is the PEG relative to your head 1.65 m
= 41.2 J
above the floor?
PEG = (2kg)(9.8m/s2)(0.45m) = 8.8 J
Elastic PE – energy stored in a spring. PES = ½kx2
Ch11 HW#1 1 – 6
Chapter 11 HW #1 1 – 6
1. A compact car with a mass of 875 kg is traveling at 22 m/s.
a. What is the kinetic energy of the car?
KE = ½ mv2 =
b. If the same car were traveling at 44 m/s, what would be its kinetic energy?
KE = ½ mv2 =
c. If the car doubled its mass to 1750 kg and traveled at 22 m/s,
what would be its kinetic energy?
KE =
d. Which has a bigger effect on KE, doubling the mass or doubling the speed?
2. In class
3. A comet with a mass of 7.85x1011 kg strikes Earth at a speed of 25.0 m/s.
a. Find the kinetic energy of the comet.
KE =
b. Compare that energy to the 4.2x1015 J of energy
that was released from largest nuke every built.
4. A 500 kg boulder sits precariously at the edge of a cliff 50 m tall.
What is its potential energy?
PEg = mgh =
5. You lift a 10 kg weight to a height of 1.5 m.
a. How much potential energy does it now have?
PEg = mgh =
b. Using the formula: W = f·d, how much work did you do on the weight?
W = Fg·d =
( W = ∆PE )
6. A 90 kg climber climbs 45 m up a vertical wall.
a. How much potential energy does the climber now have?
b. If the climber continues climbing to a height of 85 m,
how much potential energy does he now have?
Ch11.2 – Conservation of Energy
Mechanical Energy – combination of PE and KE
If no friction, and no energy lost to heat,
MEi = MEf
PEi + KEi = PEf + KEf
Ex1) A large chunk of ice with a mass of 15kg falls from a roof 8m above the ground.
How fast is it moving when it’s just about to hit the ground?
Ch11.2 – Conservation of Energy
Mechanical Energy – combination of PE and KE
If no friction, and no energy lost to heat,
MEi = MEf
PEi + KEi = PEf + KEf
Ex1) A large chunk of ice with a mass of 15kg falls from a roof 8m above the ground.
How fast is it moving when it’s just about to hit the ground?
PEi
KEf
PEi + KEi = PEf + KEf
PEi = KEf
mgh = ½mvf2
(9.8)(8) = ½vf2
vf = 12.5 m/s
HW#7) A bike rider approaches a hill at a speed of 8.5 m/s.
The total mass is 85kg.
a. Draw
b. Find KE
c. How high up hill?
d. Does mass matter?
h=?
HW#7) A bike rider approaches a hill at a speed of 8.5 m/s. The total mass is 85kg.
a. Draw
PEf
b. Find KE
c. How high up hill?
h=?
d. Does mass matter?
KEi
b. KEi = ½mv2 = ½(85kg)(8.5 m/s)2 = 3070 J
c.
HW#7) A bike rider approaches a hill at a speed of 8.5 m/s. The total mass is 85kg.
a. Draw
PEf
b. Find KE
c. How high up hill?
h=?
d. Does mass matter?
KEi
b. KEi = ½mv2 = ½(85kg)(8.5 m/s)2 = 3070 J
c. PEi + KEi = PEf + KEf
KEi = PEf
½mvi2 = mgh
h = 3.6m
d. Mass cancels
Ex2) What type of energy does the object have at the indicated positions?
1. Pendulum
2. Comet
____
_____
_____
____
HW#12) A moon rock is dropped from a cliff on the moon 50m tall.
Since there is no atmosphere, there’s no air resistance.
How fast when it reaches the bottom of the cliff?
(gm = 1.63 m/s2 )
PEi
KEf
HW#12) A moon rock is dropped from a cliff on the moon 50m tall.
Since there is no atmosphere, there’s no air resistance.
How fast when it reaches the bottom of the cliff?
(gm = 1.63 m/s2 )
Pei
PEi + KEi = PEf + KEf
PEi = KEf
mgh = ½mvf2
(1.63)(50) = ½vf2
vf = 12.8 m/s
KEf
Ch11 HW#2 7 – 12
Lab11.1 – Lab11.1 Conservation of Energy
- due tomorrow
- Ch11 HW#2 7 – 12
Chapter 11 HW #2 7 – 12
7) ( in class )
8) Tarzan, mass of 85 kg, swings down from a vine 4 m above the ground.
a) How fast does he go before he hits the ground?
PEi + KEi = PEf + KEf
PEi
4m
KEF
b) Does the answer depend on his mass? No!
9) A skier starts from rest at top of a 45 m hill, skies down to the bottom,
then up a 40m hill.
PEi
a) How fast is he going at the bottom?
KEi + PEi = KEf + PEf
PE + KE
40m
45m
b) How fast at the top of the second hill?
(use bottom as initial)
KEf = KE + PE
KEf
Chapter 11 HW #2 7 – 12
7) ( in class )
8) Tarzan, mass of 85 kg, swings down from a vine 4 m above the ground.
a) How fast does he go before he hits the ground?
PEi + KEi = PEf + KEf
mgh = ½ mvf2
vf2 = ( 2gh )
vf =
PEi
4m
KEF
b) Does the answer depend on his mass? No!
9) A skier starts from rest at top of a 45 m hill, skies down to the bottom,
then up a 40m hill.
PEi
a) How fast is he going at the bottom?
KEi + PEi = KEf + PEf
PE + KE
40m
45m
b) How fast at the top of the second hill?
(use bottom as initial)
KEf = KE + PE
KEf
Chapter 11 HW #2 7 – 12
7) ( in class )
8) Tarzan, mass of 85 kg, swings down from a vine 4 m above the ground.
a) How fast does he go before he hits the ground?
PEi + KEi = PEf + KEf
mgh = ½ mvf2
vf2 = ( 2gh )
vf =
PEi
4m
KEF
b) Does the answer depend on his mass? No!
9) A skier starts from rest at top of a 45 m hill, skies down to the bottom,
then up a 40m hill.
PEi
a) How fast is he going at the bottom?
KEi + PEi = KEf + PEf
mgh = ½ mvf2
vf2= (2gh) =
45m
b) How fast at the top of the second hill?
(use bottom as initial)
PE + KE
40m
KEf
KEf = KE + PE
½ mvi2 = ½ mvf2 + mgh
½(30)2 = ½vf2 + (10)(40)
vf =
10. A ball is dropped from a roof 6 m high. How fast before it hits the ground?
PEi + KEi = PEF + KEF
PEi
KEf vF = ?
11. A ball is thrown upwards at 20 m/s, how high up will it go?
PEf
PEi + KEi = PEF + KEF
KEi
Ch11.3 – Conservation in Collisions and Explosions
- Momentum is conserved in collisions, KE is not.
Ex1) Lab cart1 has a mass of 2kg and is traveling at 1m/s collides with cart 2,
with a mass of 1kg initially at rest. If the 2 carts stick together,
what is their speed? Compare the KEi to the KEf.
2kg
m1v1i
1kg
+
+ m2v2i
2kg
1kg
= (m1 + m2)vf
Some KE gets converted into Thermal Energy (heat).
Ch11.3 – Conservation in Collisions and Explosions
- Momentum is conserved in collisions, KE is not.
Ex1) Lab cart1 has a mass of 2kg and is traveling at 1m/s collides with cart 2,
with a mass of 1kg initially at rest. If the 2 carts stick together, what is their speed?
Compare the KEi to the KEf.
2kg
m1v1i
(2)(1)
+
+
+
1kg
m2v2i
(1)(0)
2kg
1kg
=
(m1 + m2)vf
=
(3)vf
vf = 0.67 m/s
KEi = ½m1v1i2 + ½m2v2i2
= ½(2)(1)2 + ½(1)(0)2
= 1J
1 - 0.67 =0.33J (lost)
KEf = ½(mTotal)vf2 = ½(3)(.67)2
= 0.67 J
Some KE gets converted into Thermal Energy (heat).
Ex2) In an accident on a slippery road, a car with a mass of 575kg moving
at 15m/s smashes into a car with a mass of 1575kg, moving at 5m/s
in the same direction. The 2 cars stick together, what is their speed?
575
+
1575
m1v1i + m2v2i
Compare the KEi to the KEf.
575
=
1575
(m1 + m2)vf
Ex2) In an accident on a slippery road, a car with a mass of 575kg moving at 15m/s
smashes into a car with a mass of 1575kg, moving at 5m/s in the same direction.
The 2 cars stick together, what is their speed?
575
+
1575
575
1575
m1v1i + m2v2i
=
(m1 + m2)vf
(575)(15) + (1575)(5) =
(2150)vf
vf = 7.7 m/s
Compare the KEi to the KEf.
KEi = ½m1v1i2 + ½m2v2i2
= ½(575)(15)2 + ½(1575)(5)2 = 84,000 J
KEf = ½(mTotal)vf2 = ½(2150)(7.7)2 = 63,000 J
84,000 – 63,000 = 21,000J (lost)
Some KE gets converted into Thermal Energy (heat).
HW#13) A 2g bullet, moving at 538m/s , strikes a 0.250kg piece of wood at rest.
The bullet embeds itself in the wood, and the two move along the table.
If the table is frictionless, what is their final speed?
m1v1i +
m2v2i
=
Find KEi and KEf
What percentage of KE is lost to heat?
(m1 + m2)vf
HW#13) A 2g bullet, moving at 538m/s , strikes a 0.250kg piece of wood at rest.
The bullet embeds itself in the wood, and the two move along the table.
If the table is frictionless, what is their final speed?
m1v1i + m2v2i
(.002)(538) + (.250)(0)
=
(m1 + m2)vf
=
(.252)vf
vf = 4.3 m/s
Find KEi and KEf
KEi = ½m1v1i2 + ½m2v2i2
= ½(.002)(538)2 + ½(.25)(0)2 = 289 J
KEf = ½(mTotal)vf2 = ½(.252)(4.3)2 = 0.67 J
What percentage of KE is lost to heat?
289 J  2.3J
x100%  99%
289 J
Ch11 HW#3 13 – 16
Lab11.2 – Momentum and KE in Collisions
- due tomorrow
- Ch11 HW#3 due @ beginning of period
Ch11 HW#3 13 – 16
13. (In class)
14. An 8g bullet is fired horizontally into a 9kg block of wood at rest.
After the collision, they move off together at 10cm/s .
What was the initial speed of the bullet?
m1v1i
+
m2v2i
=
(m1 + m2)vf
15. Suppose that Superman with a mass of 104kg is at rest, and gets struck
by a 4.2g bullet moving at 835m/s. The bullet drops straight down.
How fast does Superman move?
m1v1i
+
m2v2i
=
m1v1f
+
m2v2f
16. A 10kg bowling ball is rolling at 5 m/s when it collides with a 5kg stationary pin.
The pin flies off at 4m/s, the ball at 2m/s.
a.
KEi =
KEf =
b.
c. Where did the energy go? Heat and sound
Ch11.4 Energy Stored in a Spring
Potential Energy stored in a spring:
PEs = ½k(∆x)2
Ex1) A 0.5 kg lab cart is rolling along at 5 m/s and collides with
a spring, compressing the spring 10 cm. What is the value of
the spring constant of the spring?
5 m/s
.5 kg
(Don’t forget
F = k.d for HW)
Ex2) A 0.5 kg lab cart is pushed up against a spring with a spring constant
of 1000 N/m. The spring is pushed in 5 cm.
a) When released, what speed will the cart roll away at?
b) If there is an incline in front of the cart, how high up the incline will
the cart go up?
h=?
Ch11 HW#4 17 – 20
v=?
.5 kg
Ch11 HW#4 17 – 20
17. A 25g metal ball is pulled back, a distance of 8cm, by the spring-loaded piston
of a pinball game, as shown. The spring in the piston has a spring constant
of 200 N/m.
a. What is the speed of the ball as it leaves the piston?
b. What is the momentum of the ball as it leaves the piston?
18. How much energy is stored in a spring with an elastic constant pf 50 N/m
when compressed 0.05 m?
19. A helical spring is 55-cm long when a load of 100 N is hung from it and 57cm long when the load is 110 N.
a) Find its spring constant.
b) How much potential energy is stored in the spring?
20. A 0.4 kg lab cart is rolling along at 8 m/s and collides with
a stationary 0.5 kg lab cart, initially at rest.
a) If the 2 carts stick together, what speed do they roll off at?
b) The 2 carts then roll into a spring, sticking to it and compressing it.
If the spring has a spring constant of 200 N/m,
how much will the spring compress?
8 m/s
.4kg
.5 kg
Ch10 and 11 Test Review
1. Brutus raises 240kg of weights a distance of 2.35m.
a. How much work is done?
b. How much work done while holding weights above his head?
c. How much work done lowering back down?
d. Does Brutus do any work if he drops the weights?
e. How much power if he lifts them in 2.5s?
Bonus ex) A car with a mass of 500kg speeds up from 20m/s to 40m/s.
How much work is done?
Ch10 and 11 Test Review
1. Brutus raises 240kg of weights a distance of 2.35m.
a. How much work is done?
W= Fd = (2400N)(2.35m) = 5527J
b. How much work done while holding weights above his head?
0J
c. How much work done lowering back down?
W = -5527J
d. Does Brutus do any work if he drops the weights?
0J, gravity does the work
e. How much power if he lifts them in 2.5s?
P =W/t = 5527J/2.5s = 2167W
Bonus ex) A car with a mass of 500kg speeds up from 20m/s to 40m/s.
How much work is done?
Ch10 and 11 Test Review
1. Brutus raises 240kg of weights a distance of 2.35m.
a. How much work is done?
W= Fd = (2400N)(2.35m) = 5527J
b. How much work done while holding weights above his head?
0J
c. How much work done lowering back down?
W = -5527J
d. Does Brutus do any work if he drops the weights?
0J, gravity does the work
e. How much power if he lifts them in 2.5s?
P =W/t = 5527J/2.5s = 2167W
Bonus ex) A car with a mass of 500kg speeds up from 20m/s to 40m/s.
How much work is done?
W = ∆KE = KEf - KEi
= ½mvf2 – ½mvi2
= ½(500)(40)2 – ½(500)(20)2
= 300,000 J
2. Graph of displacement vs time.
Calc work done.
Calc power if work is done in 2s?
40
30
F (N)
20
10
1
2
3
d (m)
4
5
2. Graph of displacement vs time. Calc work done. Calc power if work is done in 2s?
Work = (area)
= ∆1 + ∆2 +
3 +
= ½bh + ½bh + lw + lw
= ½(4)(30) + ½(2)(20)
+ (4)(50) + (1)(20)
= 255J
40
30
F (N)
4
2
20
3
10
b. P = W/t = 255J/2s = 127.5Watts
1
1
2
3
d (m)
4
4
5
3. A pulley system lifts a 1345N weight a distance of 0.975m.
The person pulls the rope a distance of 3.90m.
a. How much force does the person exert?
b. What is the IMA?
4. A 30kg gun fires a 50g bullet with a muzzle velocity of 310 m/s.
a. What is the recoil velocity?
b. What are KE’s of bullet and gun after shot?
5. 420N Kelli is sitting atop a 4m tall slide. How fast at bottom?
3. A pulley system lifts a 1345N weight a distance of 0.975m.
The person pulls the rope a distance of 3.90m.
a. How much force does the person exert? Fin.din
= Fout.dout
Fin.(3.90m) = (1345N).(.975m)
Fin = 336N
3.90m
d in
IMA 

4
d out .975m
b. What is the IMA?
4. A 30kg gun fires a 50g bullet with a muzzle velocity of 310 m/s.
a. What is the recoil velocity?
b. What are KE’s of bullet and gun after shot?
5. 420N Kelli is sitting atop a 4m tall slide. How fast at bottom?
3. A pulley system lifts a 1345N weight a distance of 0.975m.
The person pulls the rope a distance of 3.90m.
a. How much force does the person exert? Fin.din
= Fout.dout
Fin.(3.90m) = (1345N).(.975m)
Fin = 336N
3.90m
d in
IMA 

4
d out .975m
b. What is the IMA?
4. A 30kg gun fires a 50g bullet with a muzzle velocity of 310 m/s.
a. What is the recoil velocity?
m1v1 = m2v2
(30)v1 = (.05)(310)
v1 = .52 m/s
b. What are KE’s of bullet and gun after shot?
5. 420N Kelli is sitting atop a 4m tall slide. How fast at bottom?
3. A pulley system lifts a 1345N weight a distance of 0.975m.
The person pulls the rope a distance of 3.90m.
a. How much force does the person exert? Fin.din
= Fout.dout
Fin.(3.90m) = (1345N).(.975m)
Fin = 336N
3.90m
d in
IMA 

4
d out .975m
b. What is the IMA?
4. A 30kg gun fires a 50g bullet with a muzzle velocity of 310 m/s.
a. What is the recoil velocity?
m1v1 = m2v2
(30)v1 = (.05)(310)
v1 = .52 m/s
b. What are KE’s of bullet and gun after shot?
KEb = ½(.05)(310)2 = 2400J
KEg = ½(30)(.52)2 = 4J
5. 420N Kelli is sitting atop a 4m tall slide. How fast at bottom?
3. A pulley system lifts a 1345N weight a distance of 0.975m.
The person pulls the rope a distance of 3.90m.
a. How much force does the person exert? Fin.din
= Fout.dout
Fin.(3.90m) = (1345N).(.975m)
Fin = 336N
3.90m
d in
IMA 

4
d out .975m
b. What is the IMA?
4. A 30kg gun fires a 50g bullet with a muzzle velocity of 310 m/s.
m1v1 = m2v2
(30)v1 = (.05)(310)
v1 = .52 m/s
a. What is the recoil velocity?
b. What are KE’s of bullet and gun after shot?
KEb = ½(.05)(310)2 = 2400J
KEg = ½(30)(.52)2 = 4J
5. 420N Kelli is sitting atop a 4m tall slide. How fast at bottom?
PEi
KEf
PEi + KEi = PEf + KEf
mgh = ½ mvf2
vf = 8.8 m/s