Physics 2120 University Physics

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Physics 2120 University Physics

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Title: Physics 2120 University Physics

1
Physics 2120University Physics

Dr. Bill Robertson
Middle Tennessee State University

2
Course Overview

Text Fundamentals of Physics, 8th Edition by
Walker, Halliday, and Resnick.
Web site www.mtsu.edu/wroberts
Office WPS 207
Office Hours Monday Wednesday mornings
Grading
3 Exams (In-class 3 worth 20, 20, 20) 60
Homework 10
Final Exam 30

3
Electrostatics and charge

How was the concept of electric charge
discovered? History Earliest experiments on
charge involved simple static attraction and
repulsion effects with dielectric rods rubbed on
cloth or fur. From these experiments a number of
basic terms and a law of attraction (Coulombs
law) was derived.

4
Charge

The electrostatic effect were attributed to the
fact that objects could become charged.
There were two types of charge positive and
negative.
Like charges repel and opposite charges attract.
Charge is measured in Coulombs
Smallest unit of charge, e 1.6 x 10-19 C

5
Conductors and insulators

In general terms materials fall into the category
of
Insulators materials in which charge cannot move
freely (rubber, plastic, pure water..)
Conductors materials in which charge can move
freely (metals, water with dissolved impurities,
bunnies)
We now understand that conduction occurs because
of the movement of electrons (negative charges).

6
Example

Induced charge A charged insulating rod held
close to one end of a neutral metal rod attracts
the metal rod. Why?

7
Save the bunny

The physics is all wrong, but
http//www.youtube.com/watch?v3K1YznzxQmw

8
Coulombs law

Charges were observed to attract or repel,
Coulombs law quantified the size and direction
of the force between charges.
Similar to Newtons gravitational law, inverse
square dependence on distance.
k 8.99x109 Nm2/C2 1/4peo

9
Example

What is the force on an electron situated 1 cm
away from a 0.1 C positive charge?

10
Example (leave the math!)

Two otherwise identical metal spheres carry
charges Q1 and Q2. When their centers are a
distance 1.19 m apart, the spheres attract one
another with a force of magnitude 0.0853 N. The
spheres are then briefly put into contact with
one another, and again separated to a distance of
1.19 m. The spheres are then found to repel one
another with a force of magnitude 0.0196 N. What
were the original charges on the spheres if
sphere 1 was initially positive?

11
Example

Three charges Q1, Q2, and Q3 are attached to the
corners of an equilateral triangle of side s
0.50 m. Find the net electrical force acting on
the charge Q2 if Q1 2.0 mC, Q2 7.0 mC, and Q3
4.0 mC.

12
Circuits

The practical side of the electromagnetism.
We will cover some basic concepts that are
required for the lab work. We will define these
terms and then reconcile more completely with the
Coulomb force and electric field material as the
semester progresses.

13
Current

Current is the rate of flow of charge past a
point in space (e.g. in a wire or a beam of
charged particles).
Typically given the symbol i or I.
Mathematically
Unit of current is the Ampere (amp) 1 Amp 1 C/s
Current can flow in a conductor but not an
insulator
If the current is constant and 5 C passes through
a wire in 10 seconds what is I?

14
EMF and Voltage

In order to get charges to move around a circuit
there needs to be some force that causes them
to move. (EMF stands for Electromotive Force, an
olde worlde term no longer popular).
An EMF source maintains a potential energy
difference between its terminals.
The EMF source of initial interest is the
battery. More generally called a dc-power supply.
dc direct current as opposed to ac alternating
current

15
EMF and Voltage

EMF is defined in terms of the work done on a
charge that travels from one terminal to the
other.
EMF is defined as the work done per unit charge.
Units of EMF are work/charge i.e. Joules/Coulomb
Volt (1 Volt 1 Joule per Coulomb)

16
Examples

How much work is done when a steady current of 5
mA flows for 3 minutes out of a 9 Volt battery?
What is the instantaneous power expended by the
battery during this time?
Review Power Work done per unit time and is
measured in Watts.

17
Energy measured in electron volts
Power from a battery

Power from batteryVoltage x Current

The unit of the Volt is energy per coulomb thus
we can express energy as charge times voltage.
When a an electron moves through a voltage of 1
volt it acquires an increase in energy of 1
electron volt.

18
Charge accelerator

Electrons are accelerated (in vacuum) by a
voltage of 20 kV. What is the energy of an
electron in electron volts and in joules? How
fast is the electron traveling?

19
Resistance

We have said that there are two classes of
materials conductors and insulators.
A perfect conductor lets charge flow freely
whereas an insulator will not let charge flow at
all.
In practice materials, and their geometry (e.g.
thin wire versus thick wire), offer some
impediment to the flow of charge. This property
is known as resistance.

20
Resistance and Ohms Law

A perfect conductor would have zero resistance
A perfect insulator would have infinite
resistance
How is resistance defined?
This relation is known as Ohms law. (I tend to
remember it as VIR)
The unit of resistance is the Ohm (W) (1 volt per
amp equal 1 Ohm)

21
Circuit Symbols

The resistor
The battery (positive terminal long line,
negative short line). Current always flows from
positive to negative.
The ground connection

22
Example

A 9 V battery is attached to a 250 Ohm resistor.
What current flows in the circuit?
Circuit diagrams Which is the positive terminal
of the battery? Which direction does current
flow?

23
Example

A 15V battery is connected end-to-end with a
1.2 kW resistor. The negative terminal of the
battery is grounded.
(a) Draw the circuit diagram, label the circuit
elements, and draw in and label the current.
(b) Wires used to connect circuit elements have a
negligible resistance within a circuit (compared
to other resistances in that circuit). Discuss
the consequences of this fact when connecting a
circuit and analyzing its behavior.
(c) Find the value of the current in the circuit.
(d) Plot a graph of Voltage vs. Position around
the circuit
(e) Plot a graph of Current vs. Position around
the circuit

24
Solving single loop circuits

Rule 1 The sum of the potential around a closed
loop of any circuit must equal zero.
Across a battery the potential change is positive
from the negative to the positive terminal
negative otherwise.
The potential drop across a resistor is negative
if the path goes in the same direction as the
current across the resistor positive otherwise.
Rule 2 The sum of the currents into a junction
equals the sum of currents out of a junction.

25
Example

Solve for the current in the circuit below.

26
Resistors in parallel and in series

What is the one resistance that could replace the
two resistors in the following circuits?
What is common (current or voltage) for the (a)
series and (b) parallel resistors?

27
Combining resistors summary

Resistors in parallel
Resistors in series

28
Solving circuits

If possible see if the resistors can be combined
using the parallel and series combination rules.
Simplifying the circuit by replacing parallel and
series resistors by their equivalent values can
allow the circuit parameters to be determined.

29
Example

Solve the total current drawn from the battery
and the current in R3. R1 R3 30W, R2 40 W
R4 60 W. V 12 V.

30
Real batteriesinternal resistance

Ideally a battery has a given EMF value. When
current is drawn from a real battery the voltage
between the terminals falls from the ideal EMF
value. The larger the current the more the
reduction from the ideal EMF value. This effect
is modeled as an internal series resistance
within the battery.

31
Real batteries

A 9 V battery gives a voltage of 8.7 V when a
current of 250 mA is drawn from it. What is the
internal resistance of the battery? What voltage
would there be if 25 mA were drawn from the
battery?

32
Multiple loop circuits

Apply the loop potential rule around all the
loops of the circuit. Each loop will give one
equation relating the potentials and the loop
currents. Use simultaneous equations to solve for
the quantity of interest.

33
Example

Find the value of the current and its direction
for each resistor in the circuit shown below.
(b) What would be the reading on a voltmeter if
its black lead were connected to point A and its
red lead were connected to point B?

V1 34 V V2 20 V R1 4.0 W R2
7.0W R3 10W R4 9.0 W
34
Example for you to ponder

What is the diagonal resistance of a cube of
resistors each with resistance of 1 W?

35
Power dissipation in a resistor

When a current I flows through a resistor what is
the power generated?
Every charge, q, changes its energy as it crosses
the resistor by a value of q DV where DV is the
voltage drop across the resistor. By Ohms law
DVIR, and the charge that flows per second is I.
Thus the energy change per second is I2R.
Power dissipated I2R
How else can we write this using Ohms Law?

36
Capacitance

A capacitor is a device that stores charge.
A capacitor consists of two conductors separated
by an insulator.
The simplest capacitor consists of a pair of
parallel metal plates.
When charge is moved from one plate to the other
a voltage develops between the plates. Why?

37
Capacitance

The voltage difference between the plates, V, and
the charge on the plates,Q, are related by
Q CV
The units of capacitance are Coulombs per Volt
which is named the Farad (1 F 1 C/V).
Capacitance is determined by the geometry of the
conductors (e.g. area of plates and their
separation).

38
RC discharge

Imagine a charged capacitor connected in series
with a switch and a resistor. If the capacitor
initially hold a charge Q0 ,what is capacitor
charge Q as a function of time after the switch
is closed?

39
Charging RC circuit

We could similarly derive the equation for the
charging of a capacitor as
The quantity RC is called the time constant often
given the symbol t. Note Ohms times Farads equals
seconds

40
Energy stored in a capacitor

A capacitor, C, that holds a charge Q stores
potential energy U
How else can this expression be written (remember
QCV)

41
R1 100 kW, R2 50 kW, C 20 mF, Vin 50 V

Consider the circuit shown in the diagram. At
t0 the switch is thrown to position A the
capacitor is initially uncharged. (a) What is the
current in the circuit immediately after the
switch is closed? (b) At what time, t0, is the
capacitor charge 90 of its maximum value? (c)
What is the voltage across the capacitor at
t0?(d) At what rate is energy being delivered by
the voltage source at t0?

42
R1 100 kW, R2 50 kW, C 20 mF, Vin 50 V

At time to, the switch is thrown to position B.
(e) How long does it take after the switch is
thrown to position B for the charge on the
capacitor to be reduced by 90? Call this time
t1. (f) At what rate is energy being lost due to
Joule heating at time t1?(g) At what rate is
energy being delivered by the capacitor at time
t1? (Does this result make sense?)

43
Electric Field

The electric field is the force field that a
single charge or a collection of charges creates
in the surrounding space.
The Electric field is defined as the force per
unit charge i.e. the E-field at a point in space
is equal to the force that a 1 Coulomb charge (a
unit charge) would feel at that point.

44
E-field due to a point charge

From Coulombs law the force between two charges
is
If one charge (say q2) is a unit charge then E
due to q1 is defined as the force per unit charge

45
E-field is a vector field

The electric field is a vector fieldit has a
magnitude and a direction at every point.
The E-field vector points away from a positive
charge and towards a negative charge.
The electric field at a point due to a collection
of charges is the vector sum of the E-field
created by every charge.
A charge does not see its own E-field.

46
Field Line representation

Maxwell came up with the field line
representation as a way to visualize the electric
field.
The field lines show the direction of the E-field
and the density of lines is related to the
strength of the field.
Field lines cannot cross!
The field line model is a useful representation
rather than a quantitative method

47
E-Field due to a Point Charge

Drawing not so good!
Lines should be uniformly spaced and emanate from
the center of the charge

48
E-field due to a sheet of charge

What will the E-field due to an infinite sheet of
charge look like?
We wont get a quantitative answer (yet) but we
will figure out the direction of the field.

49
Example

Find the field at a distance r along the x-axis
of two opposite charges spaced by a distance d
(see figure). Show that in the limit that rgtgtd
the field is

50
Charge density distributions

In many cases the charge is distributed along a
line, over a surface, or in a volume.
The charge is defined as a linear, areal, or
volume density
E.g. A 1 m2 surface has 0.01 C of charge evenly
distributed. s0.01/1 C m-2
The charge in an infinitesimal area dA sdA

A line of charge of length L has a nonuniform
linear charge density given by l Ax, where A is
a constant. The line is situated along the
positive x-axis, as shown in the diagram below.
(a) What are the SI units of the constant A?
(b) Find an expression for the total line charge,
Q.
(c) Find an expression for the x-component of the
electric field at the point P, a distance d from
the end of the line.

52
Example

What is the linear charge density?
Calculate the E-field at a distance L
perpendicular to the circle of charge, Q.
In the limit of very large L does the result make
sense?

53
Example

Find the surface charge density and the E-field
at the point A. Examine the case x?8. What is E
as R? 8? (Infinite plane of charge).

54
Electric Field and Gausss Law

Gausss law relates the flux of the electric
field through a closed surface to the total
charge enclosed.
Define flux
Define closed surface and surface integral
Dielectric permittivity eo

55
Flux

A measure of the flow of electric field through
a surface.
Analogy imagine the flow of water through wire
loop. Can you see how the flow depends on the
orientation of the loop and the direction of the
flow of water? When is the flow the greatest?

56
Flux

The electric field flux, fe, through a surface is
given by the surface integral
What is the flux through a 1 cm2 loop in a
uniform E-field is the area of the loop is (a)
parallel to E, (b) 45 degrees to E and (c) 90
degrees to E?
Note the direction of dA is outward from a closed
surface

57
Example

What is the flux through the shaded area in the
figure due to an E-field given by

58
Gausss law for a point charge

We know the E-field (direction and magnitude) for
a point charge.
Lets examine the E-field flux through a closed
spherical surface that has the point charge Q at
its center.
What does Gausss law give for the value of E?

59
E-field due to a non-conducting sheet of charge

Imagine a large non-conducting sheet of charge
with surface charge density of s C m-2. Use
Gausss law to find an expression for the E-field
above and below the charged sheet.
Consider a pill box Gaussian surface

60
E-field due to capacitor plates

Capacitor plates (when charged) can be
represented by two parallel sheets of opposite
charge. Using the result of the E-field due to a
single sheet of charge figure out the field above
below and in between two capacitor plates.

61
E-field due to a charged conductor

Inside a conductor the E-field must be zero. Why?
Charges in a conductor are free to move, if there
is an E-field they will move! They keep moving
until E0 inside the conductor.
This argument means that any excess charge on a
conductor resides on the surface and that E is
perpendicular to the surface of the conductor.

62
E-field due to charged conductor

A sphere of radius a has a charge Q distributed
uniformly throughout its volume. The sphere is
surrounded by a conducting spherical shell of
inner radius b and outer radius c. (See picture
on the following slide). The conducting shell
carries charge 5Q
Find an expression for the charge density of the
inner sphere.

63
E-field

Find E for rlta, altrltb, bltrltc, rgtc
What is the charge on the inner and outer surface
of the conducting shell?

64
Example

A solid, non-conducting sphere of radius R has a
non-uniform volume charge density given by
where a is a constant. Find E(r) in the range
0 lt r lt R.

65
Spherical co-ordinates

Volume element
dVr2sinqdqdf

66
Cylindrical symmetry

A long straight wire of radius a carries a charge
per unit length l. What is the E field around the
wire for rlta and for rgta?

67
Example

A long, non-conducting cylindrical shell of
inner radius a and outer radius b has a
non-uniform charge density given by
where ro is a constant.
(a) Find the electric field in the region r lt a.
(b) Find the electric field in the region a lt r lt
b.
(c) Find the electric field in the region b lt r.

68
Electrostatic potential

The potential approach to electrostatics uses
work and energy instead of force and
acceleration. Compare this approach to the two
techniques used in mechanics forces/accelerations
etc versus potential and kinetic energy.
Which approach is more fundamental?
Why two approaches?

69
Definition of potential

In any volume of space where there is an E-field
we can define an electric potential between two
points as the negative of the work done per unit
charge by the E-field to move from one point to
the other.

70
The point charge

Where is a good choice for zero potential?
What is the potential at a radius R?

71
Potential due to charge distributions

Single point charge
Charge distributions

72
Example

Find the potential in the middle of the square of
charges.

73
Example

A line of charge of length L is situated along
the x-axis as shown. The line has a linear
charge density given by l(x) ax, where a is a
constant. What is the electrostatic potential at
point P, a distance D from the end of the line?

74
Example

A solid sphere of radius R has a total charge Q
distributed uniformly throughout its volume.
What is the electrostatic potential at the center
of the sphere (relative to infinity)?

75
Finding E from V

The electric field at a point in space can be
found from the gradient of the potential V.
Gradient is given by the partial differentiation
In words, the component of E in any direction is
the rate at which V changes in that direction.

76
Surface of a conductor

The surface of a conductor must be an
equipotential. Why? If V changes then there is a
gradient of V leading to an electric field E,
leading to a force on the surface charges of the
conductor.

77
Example

V as a function of position in Cartesian
coordinates is given by
What is E at the point (2,-1,3)

78
Capacitance

We have already defined capacitance earlier as
the ratio of charge to voltage for a pair of
conductors carrying opposite charges Q. CQ/V
The voltage difference between conductors can be
found by
which means we can determine how C depends on
conductor geometry.

79
Finding C of pairs of conductors

Assume each conductor has equal magnitude charge
but opposite sign.
Find E (Gausss law usually) in the region
between the conductors
Find the potential difference between the
conductors, DV, by integrating E.dl along a path
joining the conductors
Use CQ/DV to find an expression for C.

80
Example

Find an expression for the capacitance of a pair
of parallel conducting plates of area, A, and
separation distance, d.
How does this result guide you in determining how
to combine capacitors in parallel?

81
Combining capacitors in series

What quantity is the same for the capacitors in
series? (Hint rhymes with barge.)
What single capacitor CT could replace C1 and C2
in series?

82
Example

Find an expression for the capacitance of two
concentric spheres of radii a and b (b gt a)
What is the capacitance of an isolated metal
sphere?

83
Energy in a capacitor

The stored energy in a capacitor can easily be
shown to be
Energy density in a parallel plate capacitor

84
Dielectrics

Insulating materials (also called dielectrics) in
a capacitor alter the E field.
In insulators the charges are not completely free
to move but they can distort i.e. positive tends
to move in one direction whereas the negative
moves in the opposite. Polarization.

85
Free and bound charges

Use Gausss law to find E in the dielectric
What is q in term so k and q?

86
Example

A coaxial cable consists of a wire of radius a
surrounded by a metal cylinder of radius b. The
intervening space is filled with a dielectric
with k.
What is the capacitance of 1 m of the coaxial
cable?
What is C if a2 mm, b5 mm k9?
What is the free charge if V20 V?
What is the bound charge?

87
Magnetic fields

Electric fields are created by charges
Magnetic fields are created by currents (i.e.
moving charges)
Electromagnets i.e. due to real currents in wires
Spin and angular momentum of electrons in
atomsmagnetic materials
We define E due to the force it exerts on another
charge. Same method for magnetic field.

88
Magnetism

Magnetic field representationsimilar to E-field
a vector field based on the force exerted on
charges (but only moving charges).
No magnetic monopolesi.e. no isolated sources of
magnetic field

89
Force on a moving charge

The magnetic field is given the symbol B.
The force on a moving charge in a magnetic field
B is given by
Can a magnetic field accelerate a particle? (yes)
Can it change a particles speed? (no).

90
Magnetic field, B

Measured in unit of Teslas
1 T 1 Newton second/Coulomb meter 1
Newton/Amp meter

91
Right Hand Rule
92
Example

An electron moves with a velocity of 3 x105 m/s
in the y direction in a region of magnetic field
given by
What is the magnetic force acting on the electron?

93
Example

An ion of mass 3.2 x 10-26 kg and charge e is
accelerated through a voltage of 833 V. The
charge then enters a uniform magnetic field 0f
0.92 T as shown in the figure. What is the radius
of the resulting circular motion? What is the
period and linear frequency?

94
Magnetic force on a wire

Consider the force on each of the charges that
makes up the current in a wire of length L and
cross-sectional area A.
Force on a wire

95
Example

A conducting rod is supported horizontally by two
conducting springs in a uniform horizontal
magnetic field. The linear mass density of the
rod is 0.040 kg/m, and the magnetic field
strength is 3.6 T. Find the current through the
rod that results in zero tension in the support
springs.

96
Force on a wire loop in a B field

Operating basis of many electric motors
N turns of wire in loop. What is the torque t?

97
Magnetic dipole moment

A current loop behaves like a little bar magnet
aligning with a magnetic field.
The magnitude of the dipole moment is
The direction of the dipole moment vector is
given by right hand rule

98
Torque on a dipole

From original definition
Now with mNiA

99
Biot-Savart Law

Moving charges are affected by magnetic fields
similarly moving charges (currents) create
magnetic fields.
Biot-Savart law

100
Example

A wire is configured as shown in the diagram.
What is the magnetic field at P due to a current
I 75 ma. a 1.2 cm b 3.5 cm, qp/3 radians.

101
Test 2 topics

You need to be able to
derive the E-field for planar, cylindrical, and
spherical geometries using Gausss law (with and
without dielectrics)
Integrate E to get the voltage between conductors
and hence find capacitance
Find the potential, V, due to a collection of
charges
Find the force (magnitude direction) on charges
in a magnetic field
Determine the magnetic field due to a current
using the Biot-Savart law (HW questions Ch 29
6,24)

102
Amperes Law

Amperes law is to magnetism what Gausss law is
to electrostatics.
This method works in cases with high symmetry
where the properties of the B field can be
inferred, figured out, whatever.

103
Current enclosed

Current density J is the current per unit area
through a wire.
Example What is J for a 6 mm diameter wire
carrying a uniformly distributed current of 5
Amps?

104
Example

Use the Biot-Savart law to determine the
direction of the magnetic field around a current
in a long-straight wire.
Use Amperes law to find the magnitude of the
magnetic field a distance r from the center of
the wire.
Find the value of the magnetic field magnitude a
distance of 10 cm from a wire carrying a current
of 1.0 A.

105
Example

A current of 2.5 A flows through a solid wire
cable of radius 2.5 cm. Assuming that the
current is distributed uniformly across the cross
section of the wire, find the magnetic field
magnitude inside the wire at a distance of
one-half the wires radius from its central axis.

106
Example

A solenoid consists of loops of wire carrying a
current I. Let the solenoid be wrapped with n
turns-per-unit-length of wire. Find an
expression for the magnetic field inside the
solenoid.

107
Faradays law and Lenzs law

Faradays law describes how magnetic fields can
create voltages i.e. we are now connecting
magnetic and electric phenomena
In words a time varying magnetic flux through a
circuit loop creates a voltage difference between
the ends of the loop.
Lenzs law indicates the polarity of the voltage

108
Faradays law

Vind is the induced voltage between the ends of
the loop, fM is the magnetic flux through the
loop
Flux through 1 loop is given by
Flux through N loops is N fM

109
Lenzs law

The voltage induced is always such as to keep the
flux through the circuit constant. The direction
of the voltage is oriented to create a current in
the loop such that the flux remains the same.
For example, what is the current direction in the
loop below as B increases into the page?

110
Solving Faraday law problems

Draw a picture of the configuration
Calculate an expression for the flux through the
circuit
Determine the voltage across the loop from
Determine the polarity of the voltage from Lenzs
law.

111
Example

A single loop of wire has a rectangular cross
section of area A 8.0 x 104 m2 and contains a
resistor of resistance R 2.0 W. The loop is in
a region of uniform magnetic field that points
perpendicularly into the coil from your
perspective. The magnetic field magnitude
decreases linearly from Bi 2.5 T to Bf 0.50 T
over a time interval of 1.0 s. Find the
magnitude and direction of the current that is
induced in the resistor while the magnetic field
is changing.

112
Example

A small loop of 250 turns and radius r 6.0 cm
is inside a large solenoid with 400 turns/m. The
axis of the small loop is coincident with the
axis of the solenoid. The current in the solenoid
windings varies with time according to
where Io 30 A and a 1.61 s-1. Find the
voltage induced around the small loop at t 1.0
s.

113
Motional EMF

A metal rod moving through a uniform B field as
shown. The motion creates a force on the charges
in the rod that causes them to move in the rod.
What is the voltage between the ends of the rod?
(2 methods)

114
Example

A metal rod of length L has one end a distance a
from a long straight wire carrying a current I.
The rod has a velocity that is parallel to the
current in the wire. Find the induced voltage
across the rod and specify the polarity.

115
Faradays law big picture

The fundamental point of Faradays law is that a
time-varying magnetic flux, fM, leads to an
induced voltage and thus an E-field.
In the briefest of terms
A changing magnetic field produces an electric
field.

116
Inductance

Earlier we defined capacitance as a ratio of
stored charge to voltage for 2 conductors.
Here we define a similar quantity, inductance,
that relates magnetic flux through circuit, NfM,
to the current, i.

117
Inductance of a solenoid

A solenoid has a length L, cross-sectional area,
A, and a total of N turns. What is the
inductance?
Note that inductance only depends on the
geometrical properties of the object.

118
Inductors in circuits

The definition of inductance says
Faradays law says
Thus, in terms of inductance
Sign of VL depends on i increasing or decreasing

119
RL circuit

When the switch is closed what does the circuit
do? What is the direction of VL?

120
RL behavior

With voltage source
Without voltage source
What do these equations look like graphically?

121
Energy stored in an inductor

Consider the circuit below. By the loop rule
Multiply both sides by i interpret each term
Conclusion

122
Energy density in a B field

Consider a solenoid. Inductance per unit length
is Lmon2A
Now use the energy stored in an inductor formula
UB and rearrange to find the energy density uB
(i.e. energy per unit volume).

123
Energy density in E and B fields

Compare the energy density in E and B fields
Remember energy density is equivalent to pressure.

124

A circuit contains 2 resistors, a power source,
inductor and switch as shown. At t 0, the
switch is thrown from neutral to A. Data R1
4.0 W R2 7.0 W L 8.0 mH V 6.0 V
(a) What is the time constant of this circuit?
(b) What is the maximum current that can flow in
this circuit?
(c) What is the current in the circuit at to
250 ms?
(d) What is the rate at which energy is being
stored in the magnetic field of the inductor
coils at time to?
(e) At time to the switch is set to B. How much
later has the rate at which energy loss due to
Joule heating in the resistors is down by a
factor of 10 from its value when the switch was
set to position B?

125
LC oscillations

LC circuit Apply loop rule to get

126
Example

Show that the total energy in an LC circuit (that
is, the energy in the electric field between the
capacitor plates and the magnetic energy in the
magnetic field around the inductor coils) is a
constant.

127
Example

An LC circuit with inductor L80 mH and capacitor
C5.0 mF. The initial charge on the capacitor and
current through the inductor at t0 are Qo1.2 mC
and Io 6.7 mA. Find
(a) the natural frequency of oscillation of the
circuit.
(b) the phase constant.
(c) the charge amplitude.
(d) the current amplitude.
(e) the period of the current oscillations.
(f) the charge on the capacitor plates when t
2.0 ms.
(g) the current through the inductor coils when t
2.0 ms.
(h) the time at which the energy stored in the
magnetic field around the inductor coils first
goes to zero after t 0.
(i) the rate at which the energy being stored in
the electric field between the capacitor plates
is changing at t 2.0 ms.

128
Maxwells Equations

Maxwell added one item to the effects we have
studied so fara changing E field can act like a
current and create a B field. Compare this with a
changing B creating an E field (Faradays law).
The final four

129
The wave equation

Maxwell combined the 4 equations to show that in
a charge free and current free region (Q0 and
I0) the equations combined to predict a coupled
electromagnetic wave. The E and B of this wave in
vacuum are described by

130
Wave properties

E and B are perpendicular and they are in phase
The direction of the wave is described by
The wave speed v (c in vacuum) is given by
EcB

131
Poynting Vector

The flow of energy in an EM wave is described by
the Poynting vector S defined by
We can show that the wave intensity, I, is given
by

132
Energy density pressure

Imagine an EM wave carrying an energy U in a time
Dt onto an absorbing surface. What is the force
on the surface?

133
Example

A laser of average power output 10 mW produces a
coherent beam of radius r 0.80 mm.
(a) What is the average output intensity of the
laser?
(b) What is the average energy density in the
beam?
(c) What is the electric-field amplitude of the
light wave produced by the laser?
(d) What is the magnetic-field amplitude in the
output beam?

134
Example

The intensity of solar radiation at the earths
position is I 1000 W/m2. The radius of the
earth is RE 6.37 x 106 m, the masses of the
earth and sun are ME 5.98 x 1024 kg and MS
1.99 x 1030 kg, the distance from the earth to
the sun is D 1.496 x 1011 m, and the universal
gravitational constant is G 6.67 x 1011 N.
m2/kg2.
(a) What is the average power radiated by the
sun?

135
Example (continued)

The albedo of a planet is defined to be the
ratio of the total light reflected from it to the
total light incident on it. The approximate
albedo of Earth 0.34.
(b) What approximate total force acts on the
earth due to radiation pressure?
(c) What is the ratio of the gravitational force
exerted on the earth by the sun to the total
force due to radiation pressure?

136
Introduction to Optics

Optics is generally the study of a narrow part of
the entire EM spectrumprimarily the part we can
see (wavelengths from 700 nm to 400 nm)

137
Wave basics

In optics the wavelength (rather than the
frequency) is generally used to describe light of
a fixed color.
Of course wavelength and frequency are related by
Red light 650 nm, green light 540 nm, blue 470 nm.

138
Geometrical Optics

Light is a wave and waves diffract.
Diffraction is negligible if the apertures and
objects that the radiation interacts with are
much larger than a wavelength.
Geometrical optics describes light propagation
where diffraction is not important.
Light travels as rays. (Also called ray optics).

139
Index of refraction

Light in vacuum travels at c (3 x 108 m/s)
In transparent materials (dielectrics) the speed
of light slows. The extent of slowing depends on
the materials and it is described by the
refractive index, n, of the material.
Glass n1.5 (approximately) i.e. vglassc/n
Water n1.33
Picture of a wave in a materialwhat changes?

140
Chromatic dispersion

The refractive index in a material changes with
the wavelength of the radiationthis effect is
called dispersion.
Normal dispersion means that the index rises with
decreasing wavelength.
Dispersion causes a prism to split white light
into its colors and causes different colors to
focus at different distances from a lens.

141
Example

Orange light of wavelength 600 nm in air enters
water having an index of refraction of 1.33.
(a) What is the frequency of this light?
(b) What is the speed of the light in the water?
(c) What is the wavelength of the light in the
water?
(d) If a person with normal vision were swimming
under water and looked at this light,
approximately what color would the person see?

142
Refraction

When a ray of light moves from one material to
another the change in velocity causes the ray to
deviate. Snells law

143
Total-internal-reflection

Consider a ray traveling from a high refractive
index material into a low refractive index
material. Above what angle of incidence will all
of the light be reflected? Use the example of
glass (ng1.5) and air (n1)

144
Example

A small fish is swimming 1.2 m below the surface
of a calm pond. You are standing on a small
walking bridge over the pond looking directly
down at the fish. How far beneath the waters
surface does the fish seem to be to you, given
that the index of refraction of the pond water is
1.35?

145
Example

A narrow beam of white light is incident at an
angle of 50o from the normal of a 60o prism made
of fused quartz. Find the angular dispersion of
the light emerging from the far side of the
prism.
n(656nm)1.4564
n(588nm)1.4585
n(486nm)1.4631

146
Example

A small dot is placed at the center of a piece of
paper. Glass of thickness 1.26 cm and index of
refraction 1.48 is placed on top of the paper.
What is the smallest radius of a coin that, when
placed on top of the glass and centered over the
dot, prevents anyone from being able to see the
dot from above the glass?

147
Lenses and image formation

Lenses are created by making one or both surfaces
of a glass plates spherically curved.
By applying Snells law to rays hitting the lens
parallel rays of light can be brought to a focus.
http//www.fhsu.edu/ktrantha/JavaOptics/javalens.
html

148
Light from objects

Light from illuminated objects diverges from
every point of the object. Every point of the
object is a source of scattered light rays
traveling in all directions.
Light rays from distant objects is essentially
parallel. Thus, direct sunlight consists of
parallel rays of light.

149
Lens fundamentals

Convex Lensconverging lens

150
Lens Fundamentals

Concave lensdiverging lens (note F1 and F2
reversed)

151
Lenses and image formation

A lens intercepts a selection of the scattered
light from an object and focuses the rays. In
order to determine the position of an image
formed by a lens we consider only 3 easy to
calculate rays.
Ray 1 A ray leaving the tip of the object
traveling parallel to the optical axis will pass
through the focal point F2 after passing through
the lens.
Ray 2 A ray leaving the tip of the object and
passing through the focal point F1 will emerge
from the lens traveling parallel to the optical
axis.
Ray 3 The ray leaving the tip of the object and
passing through the center of the lens will
emerge from the lens undeviated.

152
Real and virtual images

If the rays after the lens converge to a point
then the image is real. Real means that it can be
displayed on a screen placed at the point where
the rays converge.
If the rays after the lens diverge then the image
is said to be virtual. A virtual image cannot be
displayed on a screen but they can be observed by
eye. The lens in the eye makes a real image on
the retina.

153
The lens formula

The positions of the image and object positions
are given by
f is the focal length (positive for converging
lens negative for diverging lens)
di is positive for a real image, negative for a
virtual image
do and di are positive on left and right of lens
respectively

154
Magnification

The magnification of the lens is given by how
much bigger the image is compared to the object
By examining the center ray it should be clear
that

155
Example

An object is placed 10 cm from a 15-cm focal
length converging lens.
(a) Find and describe the image analytically.
(b) Find and describe the image using a ray
diagram.

156
Example

A diverging lens has a focal length of magnitude
15.2 cm. You view an object of height 3-cm
through the lens when it is 10 cm from the center
of the lens. Locate and describe the image using
analytical means, and then draw a rough ray
diagram to help support your calculations and
conclusions.

157
Mirrors

The ray reflection from a mirror the angle of
incidence is equal to the angle of reflection. qi
qr

158
Example

You are looking at your image in a plane mirror
mounted flat on the wall 1 meter away directly in
front of you. The mirror does not come all the
way down to floor level yet you can just see your
shoes in the image from the mirror. How high off
the floor is the mirror (assume you are 1.6 m
tall).

159
Spherical mirrors

Curved mirrors (concave and convex) can form
images just like lenses
For a spherical mirror with radius of curvature
10 cm, at what point is the focal length?

160
The 3 rays of happiness for mirrors

Ray 1 The ray leaving the tip of the object
traveling parallel to the optical axis will pass
through the focal point after reflecting from the
mirror.
Ray 2 The ray leaving the tip of the object and
passing through the focal point will reflect from
the mirror traveling parallel to the optical
axis.
Ray 3 The ray leaving the tip of the object and
passing through the center point of the mirror
will be reflected from the mirror undeflected.

161
Ray diagram
di and do are positive on the reflecting side of
the mirror.
162
Example

A 1.00 cm-high object is placed 10.0 cm from a
concave mirror whose radius of curvature is 30.0
cm.
(a) Draw a ray diagram to approximately locate
and describe the image.
(b) Locate and describe the image using
analytical methods.

163
Multi-lens systems

Apply the lens formula to the lens nearest the
objectfind the image. Use that image as the
object for the second lens to find the image of
the compound lens system.
The magnification of a two lens system is just
the product of the magnifications of successive
lenses
mtotal m1 m2 m3

164
Example

A compound microscope consists of two converging
lenses. The objective lens is a short
focal-length lens that is closest to the object
being studied. The eyepiece is the lens through
which the viewer looks to see the enlarged image
of the object. The distance between the two
lenses should be substantially greater than the
sum of the two focal lengths of the two lenses,
and the object is typically placed just outside
the focal point of the objective lens.
In this problem we will study the magnification
of an ant using a compound microscope. The
objective lens has a focal length of 1.0 cm, and
the eyepiece has a focal length of 2.5 cm. The
ant being studied is placed 1.1 cm in front of
the objective lens, which is 13.4 cm from the
eyepiece. The ant is 0.2 mm wide.
Locate and describe the image of the ant as
viewed through this microscope.

165
Pinhole

How does the pinhole allow imaging?

166
Wave nature of light

EM radiation, including light, is a wave
phenomenon.
The wave nature of light (or any wave phenomenon)
does not become apparent until the light
interacts with openings, barrier, etc that are on
the order of size of the wavelength of the
radiation.
Wave effects diffraction interference

167
Properties of waves

Principle of superposition 2 parts
Two or more waves will pass through one another
without their direction or speed being changed.
Waves dont collide off each other like particles
do.
Where two waves overlap the amplitude at a point
in space is just the sum of the individual wave
amplitudes at that point.
The second point leads to wave interfere.

168
Interference

When two single frequency waves combine the
relative phase between them determines the extent
of interference.
Two extreme cases are when the waves are exactly
in phaseamplitudes add leading to constructive
interference.
When waves are exactly out of phase the
amplitudes canceldestructive interference.

169
Huygens Principle

Huygens, developed a method of predicting the
propagation of waves. Each point of a wave front
becomes a secondary source of new waves. This
method illustrates (but does not really explain)
effects like diffraction.

170
Demos

http//www.ngsir.netfirms.com/englishhtm/Diffracti
on.htm
http//physics.uwstout.edu/PhysApplets/a-city/phys
engl/huygensengl.htm

171
Path length difference phase

If two waves travel different length paths to
between two points the path difference can be
expressed as a phase difference.

172
Path phase

If the path difference is Dx then the phase
difference (for waves of wavelength l) is
Constructive interference occurs if Dx is 0, l,
2l ie Df0, 2p, 4p ..
Destructive interference occurs if Dx is l/2,
3l/2, 5l/2 ie Dfp, 3p, 5p ..

173
Youngs double slit

Demonstrated light was a wave
Bright fringe
Dark fringe

174
Intensity of the two slit diffraction

Phasor concept
At any point on the screen the time varying
E-field from the two slits is given by
The phase difference f is found from the path
difference at angle q.

175
Phasor sum

Individual phasors (left) and summed phasors
(right)

176
Intensity

The intensity of light is given by the square of
the total E-field at any point on the screen
The E-field varies across the screen because of
interference
Phasor picture and a little bit of mathematical
jiggery-pokery

177
Example

Light of wavelength 587.5 nm is incident normally
on a set of two slits separated by a distance of
0.20 mm, and then projected onto a distant
screen. The second-order maximum of the
interference pattern thus produced is found to be
at the position y2 2.0 mm. Find the distance
from the slits to the screen.

178
Single slit diffraction pattern

Derivation of the single slit diffraction
equation
Minima given by

179
Intensity for single slit

Phasors, but with a whole bunch of sources side
by side across the opening.
EM is the sum of all phasors end to end
Eq is the amplitude we seek.
I(q)Eq2

180
Phase, f

The phase, f, in the diagram is the difference in
phase between the paths to the screen from
opposite ends of the slit opening.
Path difference a sinq
Phase difference

181
Intensity for a single slit

Final result
This is the sinc function. What is its value for
a0?

182
Double slit / slit width
183
Double slit
184
Full double slit formula

Double slit with slit width, a, and slit
separation, d.

185
Example

Light from a green laser (540 nm) shines through
a set of double slits and is incident on the
board at the front of the room.
(a) By inspection of the pattern of laser light
formed on the board, but without performing any
distance measurements, estimate the ratio of the
slit separation to the slit width.
(b) Use distance measurements to help estimate
the separation of the slits and the width of each
slit.

186
Diffraction from a Grating
187
Gratings

Grating are usually specified by the number of
rulings or grooves per unit length. For example,
300 lines per mm. You can get d easily from this
definition.
Diffraction orders are labeled m0, 1, 2
Grating diffraction leads to much narrower
well-defined bright diffraction spots because of
the larger illuminated aperture.
Resolution

188
Example

Light from a green laser (540 nm) shines through
a diffraction grating of width 4.5 cm and is
incident on the board at the front of the room.
(a) What is the separation between adjacent
grooves?
(b) What is the linear groove density in the
grating?
(c) What is the total number of grooves in the
grating?

189
Thin film interference

An everyday example of thin film interference is
the colorful pattern created by gasoline films on
water in parking lot puddles.
The effect is due to interference between light
reflected from the top and bottom surfaces of the
thin gas layer. Cancellation of light occurs when
the phase difference between the 2 reflected rays
differs by p, 3p, 5p
The effect also occurs in any situation where
there are two closely spaced reflecting surfaces.

190
Phase change on reflection

Whenever light hits an interface between 2 media
with different refractive indices some light is
reflected and some transmitted.
If the light is reflected from a low-index to
high-index transition then the reflected light is
inverted on reflection (i.e. it suffers a phase
change of p radians).
Zero phase changes occurs for a high n to low n
transition.
No phase change for transmitted light.

191
Path difference

In a thin film interference problems
figure out the path difference between the two
rays and
account for phase changes on reflection, if any.
If the total phase change is 0, 2p, 3p.. the
interference is constructive (bright fringe). If
total phase is p, 3p/2, 5p/2 the phase change
is destructive (dark fringe).

192
Example

Thin films of material are often used as
non-reflective coatings on camera lenses. A
thin film of magnesium fluoride having an index
of refraction of 1.38 coats a glass lens having
an index of refraction of 1.55. The film has a
thickness of 0.73 mm.
What wavelengths in the visible region of the
electromagnetic spectrum can be clearly seen upon
reflection from the thin film?

193
Final Exam

7 problems
Gausss law
Circuits, R, RL, RC
Mirrors/lenses and imaging
Covers everything up to thin films but not
polarization

194
Example

One glass plate is positioned on top of another
with the end of a hair between the plates at one
end. The plates are illuminated from above with
light of wavelength 589.0 nm from a sodium vapor
lamp. An interference pattern is observed due to
the variations in the thickness of the air layer
between the glass plates. Use the interference
pattern to estimate the diameter of the hair.

195
Polarization

Polarization refers to the orientation of the
E-field vector in an electromagnetic wave.
Most light is unpolarized, i.e. the E-field of
the light is equally distributed over all angles.
A polarizer is a filter that allows one direction
of the E-field pass through.

196
Polarizer

E-field vector component parallel to the
polarizer direction is allowed through.

197
Intensity

We measure intensity not E-field by eye and using
light meters.
What intensity of unpolarized light is
transmitted through a polarizer? What is its
polarization angle after transmission?
What is the total incident intensity?
What intensity is transmitted?

198
Polarized light transmission

If linearly-polarized light is incident on a
polarizer what is the intensity of transmission
as a function of angle, q, between the E-field
and the polarizer?
Law of Malus

199
Example

If unpolarized light of intensity 30 mW/m2 falls
on a horizontally oriented polarizer, what
intensity is transmitted and what is the
orientation of the transmitted lights E-field?
If a second polarizer is added at 45 degrees to
the horizontal, what intensity is transmitted
through the combination and what is the
orientation of the E-field?

200
Polarization on reflection

Brewsters angle red p-pol. blue s-pol.

201
Brewsters angle

The angle of minimum reflection of p-polarized
light is given by

202
Example

Discuss with as much detail as possible the
Polaroid sunglasses commercial on TV in which
swimmers beneath the waters surface in a
swimming pool cannot be seen due to glare from
the suns light reflected off of the water
surface, but when Polaroid sunglasses are placed
over the TV-camera lens, the swimmers can be seen
clearly.

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