Science 111

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Science 111

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Title: Science 111

1
Science 111

Chapter 3
Momentum and Energy

2
Why do cannons have long barrels?

Two cannons, same gunpowder, same diameter, same
cannonball, only different in the length of their
barrels
The shell from the cannon with the longer barrel
will come out traveling faster.
Why?

3
Why do cannons have long barrels?

The same force acts in either case and will cause
the same acceleration up to a point.
Once the cannonball exits the barrel, the hot,
exploding gases escape into the air and are no
longer pushing on the shell.
For the longer barrel, we can say either the
force acted over more time or for a greater
distance.

4
Impulse and Momentum

The time during which a force acts multiplied by
the amount of the force gives a quantity we will
call impulse.
The impulse measures the amount of momentum
given to the shell.
The cannon with the longer barrel exerted a
greater impulse and the shell ends up with more
momentum (and hence speed).

5
Work and Energy

The distance over which a force acts multiplied
by the amount of force gives a quantity we will
call work.
The work measures the amount of energy given to
the shell.
The cannon with the longer barrel did a greater
amount of work and the shell ends up with more
energy (and hence speed).

6
Three methods?

So, let me get this straight, now we have three
ways of solving problems?
Acceleration, velocity, position calculations
Impulse and momentum calculations
Work and energy calculations
Uh, yeah, sorry.
But that which doesnt kill you

7
Momentum

The momentum of an object equals
(mass of object) x (velocity of object)
mv
Momentum measures how strongly an object is
moving in a direction.
Momentum is a vector quantity.

8
Impulse

The impulse delivered by a force equals
(amount of force) x (time duration of force)
Ft
It is a measure of the total effect a force has
had in a particular direction.
Impulse, too, is a vector quantity.

9
Section 3.3Impulse-Momentum Relationship

The impulse delivered by a force will equal the
change in momentum of the object acted on by the
force.
Written mathematically as
Ft ?(mv)
? Greek letter delta, used as shorthand to
mean the change in.

10
Impulse-Momentum Relationship

Ft ?(mv)
Results obtained using this formula are the same
as what you would get by, say, using F to
calculate acceleration a, then a and t to figure
out how v changes.
That is, this is equivalent to Newtons 2nd Law
in fact this is close to how Newton originally
wrote the second law.

11
Ft m?v

The change in the momentum on an object is
usually due to a change in velocity, not a change
in mass, so ?(mv) m ?v.
When the momentum of an object changes, it can
always be explained by some force F acting for
the necessary time t.

Stopping a moving truck requires a large change
in momentum, a large impulse.
mV represents a large change in velocity.
The haystack - which exerts a small force - will
have to act over a long time (fT).

Stopping the truck with a sturdy wall will
require the same impulse from the wall as the
haystack.
The wall exerts a very large force over a very
short time (Ft).

14
The cannon

Recall the long-barreled cannon question.
Extending the barrel increases the time that the
force acts on the shell.
A greater impulse is achieved.
So the shell or cannonball gets a greater
increase in its momentum.
Greater mv means greater v.

15
Catching an Egg

How do you catch a thrown egg without it
breaking?
To catch it means bringing it to a stop,
decreasing its momentum to zero.
Some amount of impulse will be required depending
on the eggs mass and approach speed, you cant
change that.

16
Catching an Egg (2)

But that impulse can be delivered as a large
force for a short time, or a small force for a
long time.
It will break if the force is too large.
So, you want a small force for a long time.
Demonstration???

17
Sec. 3.4 - Conservation of Momentum

Two objects interact via a force.
Maybe a bat and a ball.
They exert equal but opposite forces on each
other (Newtons Third Law).
Forces will be for the same length of time.
Bat and ball will receive equal impulses (but in
opposite directions).

18
Equal momentum changes

The ball will gain momentum in one direction
while the bat will gain momentum in the opposite
direction.
The total (vector total) change in momentum is
zero.
The total (vector sum) of momentum does not
change.

19
Conservation of Momentum

Physicists say that momentum is conserved.
The total amount is always the same.
It always works that way, no exceptions.
Again, momentum conservation is a direct
consequence of Newtons third law.

20
Warnings

Momentum conservation works only if
You remember that momentum is a vector quantity.
(Momentum (mv) leftwards plus (mv) rightwards is
equal to zero total momentum.)
You must include everything that is changing
momentum.
(Like bat, ball, and batter.)

21
Another Warning

The same change in momentum is not the same
change in speed.
When the bat hits the ball, for instance, the
ball will likely gain more speed than the bat
loses.
In equal momentum changes, the object with the
least mass will have the greatest change in speed.

22
Example Balloon

Balloon squirting air and moving (like in figure
2.24 in the text).
The balloon gains forward momentum, the air
molecules gain backwards momentum.
The total (vector) change in momentum is zero.

23
Example Rocket

A rocket lifting off the ground.
Explanation the same as for the balloon (they are
both rockets!).
Rockets gain of forward momentum equals the
total gain of reverse momentum by the exhaust.

24
Example Cannon

Before the cannon fires, the total momentum is
zero (nothing is moving)
After the cannon fires, the cannon and cannonball
both have momentum.

25
Cannon (II)

Huh? No momentum before, lots after, that doesnt
sound like momentum conservation!
But it is!
The cannonball has rightward momentum, maybe (20
kg)(50 m/s) 1000 kg m/s.
The cannon has leftward momentum, maybe (500
kg)(2 m/s) 1000 kg m/s.

26
Cannon (III)

The vector total was zero both before and after
the cannon shot.
Individual momenta can change, but every change
in one direction is compensated by an equal
change of something elses momentum in the
opposite direction.

27
Cannon (revisited)

Cannon and cannonball?
Are we missing anything?
Does anything else change momentum here?

28
That Darn Cannon

There were two omissions.
The exhaust gases going forward as well as the
cannonball.
The cannon appeared dug into the ground a bit, so
the whole Earth (!) may have gained momentum
backwards.

29
Example Dropped Ball

A ball is released and falls to the Earth.
It had zero momentum when first released, but
gained downward momentum as it fell.
Where is my momentum conservation now?
Well, urrr, let me think

30
Dropped Ball (II)

Why did the ball fall?
Because the Earth pulled it downwards with
gravity.
So, by Newtons third law, the ball was pulling
upward on the Earth.
The Earth gains upward momentum.

31
Dropped Ball (III)

But the Earth just sits there, it cant gain as
much momentum as the ball did.
Yes, it can.
Because of its huge mass, the Earth has to gain
just a minuscule velocity upward to gain as much
momentum as the ball did.

32
Solving Problems

We can solve problems using Fma, velocities,
positions, etc.
We can also use impulse and momentum.
But the real breakthrough is momentum
conservation.

33
Momentum Conservation

Momentum conservation allows us to solve problems
just by comparing the initial and final states.
We dont have to know what forces acted, or for
how long, or in what directions.
The total momentum before and after must be the
same regardless.

34
Example Car Crashes
35
Head-On Collision

If two cars have the same mass and approach at
the same speed in a head-on collision, then the
total momentum before the collision is zero.
Assuming no significant outside forces act (which
will probably be true), the total momentum after
the collision is zero.

36
Crash

If the cars crumple and merge into one big lump,
the lump will be stationary.
If the cars rebound a bit, they will be moving
away with equal but opposite velocities.
Guaranteed, the total momentum must always be
zero.

37
Uneven Crash

If one car is heavier than the other and they
approach with equal speeds, the total momentum is
not zero.
After the collision, the total momentum will be
the same non-zero value.

38
Uneven Crumple

If the total momentum was non-zero before the
crash and the cars crumple into one big lump,
that lump will be sliding with the speed and
direction that give it the same momentum.
It may then slow due to friction but the Earth
and lump will have the same total amount of
conserved momentum.

39
Work and Energy

Energy
Matter is substance and energy is the mover of
substance.
Anything with the potential to make things move
is said to contain energy.
The transfer of energy into some form of motion
is called work.

40
Work

When something is made to move, we say that work
has been done.
Forces acting on moving objects do work.
If there is no motion, no work is done.
Our technical definition of work may disagree
with your everyday meaning of the word.

41
Calculating Work

The exact amount of work done by a force acting
on a moving object is calculated by
Work (force) x (distance moved) Fd
This work represents how much energy has been
transferred by the body exerting the force to the
moving body.
Unit of work or energy J joule Nm

42
Positive and Negative Work

If the force is pushing the object in the same
direction it is moving, positive work is done.
The object gains energy and the pusher loses
energy.
If the force is opposite the direction of motion,
negative work is done.
Object loses energy, pusher gains energy.
Same direction W Fd
Opposite directions W -Fd

43
Sec. 3.6 Power

The rate at which work is done, or the rate at
which energy is transferred, is the power.
A rate is an amount divided by a time.
Power work/time energy/time
Unit of power W watt J/s

44
What?

Many devices are rated in terms of their power,
their wattage.
A 100-watt light bulb converts electrical energy
into light (and heat) at a rate of 100 joules per
second.
Work is being done, electrical forces exerted by
the power company push on electrons making them
go faster and they hit atoms to make light.

45
Types of Energy

An object contains energy if it can exert forces,
do work, and make things move.
There are a variety of common forms this energy
takes within bodies.
Recognizing these forms is crucial to
understanding how things work.

46
Kinetic Energy

Kinetic energy is energy of motion.
Any moving object contains energy because it can
push against other objects - exerting forces
while making them move.
This is also the form of energy normally gained
when an object has work done on it.

47
Calculating Kinetic Energy

The formula for calculating kinetic energy is KE
(1/2) m v2.
An object of mass (10 kg) moving at a speed of (4
m/s) will have kinetic energy
KE .5 (10) (42) 80 kg m2/s2 80 J
All moving objects have kinetic energy, the more
mass and faster, the more KE.

48
Kinetic Energy vs Momentum

KE is 1/2 mv2 momentum is mv
Moving objects have both.
But they are not the same.
First, kinetic energy is a scalar, just a number
representing the energy of motion.
Momentum is a vector, a magnitude and a direction.

49
KE vs Mtm (II)

Momentum is transferred by forces, the momentum
transfer is the force multiplied by the time
(impulse).
Kinetic energy is transferred by forces, the
energy transfer is the force multiplied by the
distance moved (work).
Both are useful quantities.

50
Potential Energy

Another form of energy is called potential
energy.
It is energy possessed because of the position or
configuration of something.
Work must be done to give an object potential
energy, then the object can do work and transfer
that energy onwards.

51
Gravitational Potential Energy

Objects at a greater height have more potential
energy.
When they fall back down, their potential energy
becomes kinetic energy which may become other
forms depending on what they later run into.
Gravitational PE formula PE mgh
Mass x gravity (9.8 m/s2) x height up

52
Electrical Potential Energy

Electrically charged particles can have potential
energy associated with electrical forces.
The amount of electrical potential energy depends
on the voltage.
Well learn more about this in chapter 9.

53
Thermal Energy

Suppose an object is not moving.
So it has no kinetic energy.
But if you could look at the atoms making up the
object using a powerful microscope, youd see
that the atoms are moving.
The atoms have kinetic energy.

54
Thermal Energy (II)

When the kinetic energy is stored in the random
motions of microscopic components, we dont call
it kinetic energy.
Instead we call it thermal energy.
It is still energy that can be used to do work,
but not as accessible as normal KE.
Temperature is related to the amount of thermal
energy, details in chapter 7.

55
Nuclear Energy

The nuclei of atoms (the protons and neutrons)
can exert potent forces and hence contain
substantial energy.
We wont get into details here (but you may in
Science 112).
The famous formula E mc2 is related to the
stored nuclear energy.

56
Still other forms of energy

Wave Energy
Includes the energy in sound waves and light.
Elastic Potential Energy
Energy stored in the deformation of an object,
like a compressed spring.
Chemical Energy
Energy available if chemicals are allowed to
combine (like gasoline and oxygen).

57
Work-Energy Theorem

The work done on an object equals the change in
its kinetic energy.
Equation Fd ?(KE)
Fd is the work done, it changes the kinetic
energy of the object acted on (increasing it if
positive work, decreasing it if negative).
The KE may later become other forms of energy.

58
Mtm and KE (again)

Force x Time (impulse) change in momentum
Force x Distance (work) change in kinetic
energy
Depending on whether you know the time or the
distance for which the force acted may determine
whether you analyze a problem using momentum or
energy.

59
What did the work on the cannonball?

What actually exerted the force on the
cannonball?
What was touching it?
The hot, expanding gases did the work to push the
cannonball forward.

60
What does work on the ball?

Chemical forces do work on the arm muscle.
The muscle does work on the arm.
The arm does work on the hand.
The hand does the work pushing the ball.

61
What does work on the ball (while it is in the
air)?

Gravity does work, changing the velocity and
kinetic energy during the flight.
Air-resistance will also do some (negative) work
on the ball.

62
What does work to slow the truck
63
But the wall doesnt move.

The wall exerts the force and hence does the work
to stop the truck.
Wait! The wall cant do work because the force is
exerted on something that isnt moving (the front
of the truck).
So, isnt work Fd 0?
Then what does stop the truck?

64
No immovable objects

When things collide, there is always some amount
of give.
Everything will move or deform, at least a
little, when a new force acts on it.
The collision force is enormous, the movement
distance is small, but the product Fd will be
equal to the change in kinetic energy of the
truck.

65
What does the work to hold the lamp atop the
table?

Easy, the table.
No!
No work is done here.
No motion so no work.

66
Lamp on a Table

The table does exert a force on the lamp.
There may have been some work when the lamp was
first placed there and the table deformed a
little.
But no work, no transfer of energy, is occurring
while the lamp just sits there.

67
It feels like work to me

But if you hold a lamp in your outstretched arm,
it certainly feels like you do work.
Yes, but the work is not at your hand, its in
your shoulder and muscles.
There are vibrations and chemical reactions
needed to maintain your arm position
out-stretched - but there is no energy exchange
(work) between your hand and lamp!

68
Sec. 3.9 Conservation of Energy

Whenever one object gains energy (in any form),
another object will lose exactly as much energy.
The total amount of energy is always the same.
Energy cannot be created or destroyed.

69
Conservation of Energy

Energy can change forms.
Energy can move from one body to another.
But the total amount of energy never changes.
Total energy (not kinetic energy) is conserved.

70
Solving Problems

Knowing that the total energy is conserved often
allows one to quickly solve problems.
We will mostly use conservation of energy to
figure things out rather than the work-energy
theorem.
Lets do some examples

71
The falling object converts its gravitational
potential energy into kinetic energy. Gravitation
al PE represents the work that will be done by
gravity as the object moves up or
down. Calculations like this mgh (1/2)mv2
72
Falling, PE gt KE

When the object hits the stake, more forces are
exerted (along with some movement) so there is a
further energy exchange.
The kinetic energy becomes mostly thermal energy
(object and stake get hotter), some energy may
end up in other forms like sound.

73
What are the forms of energy?
74
Inside Sun Nuclear Energy Thermal
Energy Sunlight Light or Wave
Energy Plants Chemical Energy
Fossil Fuels, Animals, Food Chemical
Energy Power Electrical Energy
75
A ball is thrown off a cliff

If the ball is thrown at 50 mph, what direction
should it be thrown so that it will have the
greatest speed when hitting the ground below?
Throw it straight downwards
Throw it straight upwards
Throw it horizontally
Will be the same in all cases

76
Answer (d)

Ignoring air-resistance, conservation of energy
is the key to answering this.
The ball, when thrown, will have both the same
kinetic energy and potential energy no matter
which direction its thrown.
Hence all will have the same kinetic energy (and
speed) when hitting the ground.

77
This time with drag

Now lets include air-resistance.
Air resistance always does negative work because
it acts opposite to the direction the object is
moving through the air.
The longer the path, the more energy that will be
lost to the air (air-resistance causes the air to
get warmer, thermal energy).
So path (a), the shortest, will have the most
energy remaining and the greatest impact speed.

78
Football Sleds

Three football players in practice all do the
same exercise.
The run full speed and hurtle their bodies
against the same heavy sled.
The impact causes the sled to slide a ways.
Given the following information, which player
will probably cause the sled to move the furthest?

79
Player Stats

Player 1
Mass 100 kg Speed 7 m/s
Player 2
Mass 120 kg Speed 5 m/s
Player 3
Mass 80 kg Speed 8 m/s

80
Idea Compare Energies

Whoever can give the most energy to the sled will
cause it to move the furthest, right?
P1 KE (.5)(100 kg)(7 m/s)2 2450 J
P2 KE (.5)(120 kg)(5 m/s)2 1500 J
P3 KE (.5)(80 kg)(8 m/s)2 2560 J
Player 3 has the most energy, and should cause
the sled to go furthest.

81
Wrong? I hate physics!

That analysis would be correct if all the
players kinetic energy could be transferred to
the sled as kinetic energy.
There will be conservation of energy but the
players original KE will end up in a variety of
forms, most notably thermal energy and
deformation (elastic) potential energies.

82
Momentum

The player and sled just before the collision
and just after the collision will have the same
total momentum (since we are considering
only a short time interval, we can be confident
that there are no external impulses messing
up our momentum bookkeeping).

83
Momentum Calculations

Assuming the sled has a mass of 150 kg and the
player and sled move together right after the
collision,
(M)(V) (150 kg)(0) (M150 kg)Vfinal
This gives Vfinal (MV)/(M150)

84
Finishing the Calculation