Title: Electromagnetic Oscillations and Alternating Current
1Electromagnetic Oscillations andAlternating
Current
2Oscillations in an LC Circuit
We will discover that charge sloshes back and
forth. As this happens the current goes one way
then the other. Analogy a block moving on a
spring. Here total energy (kinetic potential)
is constant. For the LC circuit total energy
(electric magnetic) is constant.
3i
i
time
i
i
LC Circuit
i
i
4Analyzing an LC Circuit
Total energy in the circuit
No change in energy
Differentiate
5Analyzing an LC Circuit
Total energy in the circuit
No change in energy
Differentiate
6Analyzing an LC Circuit
Total energy in the circuit
No change in energy
Differentiate
7Analyzing an LC Circuit
Total energy in the circuit
No change in energy
Differentiate
The charge sloshes back and forth with frequency
w (LC)-1/2
8Analyzing an LC Circuit
Current
Current is maximum when charge is zero, and vice
versa.
Energy
9RLC Circuit Damped Oscillations
R
C
L
The change here is that energy is dissipated in
the resistor
A similar analysis gives current and charge that
continue to oscillate but with amplitudes that
decay exponentially
10Alternating Current Circuits
An AC circuit is one in which the driving
voltage and hence the current are sinusoidal in
time.
V VP sin (wt - fv ) I IP sin (wt - fI )
w is the angular frequency (angular speed)
radians per second. Sometimes instead of w we
use the frequency f cycles per second
Frequency ? f cycles per second, or Hertz
(Hz) w 2p f
11Alternating Current Circuits
V VP sin (wt - fv ) I IP sin (wt - fI )
I(t)
Ip
Irms
Vrms
t
fI/w
-Ip
Vp and Ip are the peak current and voltage. We
also use the root-mean-square values Vrms
Vp / and IrmsIp / fv and fI are called
phase differences (these determine when V and I
are zero). Usually were free to set fv0 (but
not fI).
12Example household voltage
In the U.S., standard wiring supplies 120 V at 60
Hz. Write this in sinusoidal form, assuming
V(t)0 at t0.
13Example household voltage
In the U.S., standard wiring supplies 120 V at 60
Hz. Write this in sinusoidal form, assuming
V(t)0 at t0. This 120 V is the RMS amplitude
so VpVrms 170 V.
14Example household voltage
In the U.S., standard wiring supplies 120 V at 60
Hz. Write this in sinusoidal form, assuming
V(t)0 at t0. This 120 V is the RMS amplitude
so VpVrms 170 V. This 60 Hz is the
frequency f so w2p f377 s -1.
15Example household voltage
In the U.S., standard wiring supplies 120 V at 60
Hz. Write this in sinusoidal form, assuming
V(t)0 at t0. This 120 V is the RMS amplitude
so VpVrms 170 V. This 60 Hz is the
frequency f so w2p f377 s -1. So V(t) 170
sin(377t fv). Choose fv0 so that V(t)0 at
t0 V(t) 170 sin(377t).
16Resistors in AC Circuits
EMF (and also voltage across resistor) V
VP sin (wt) Hence by Ohms law, IV/R I
(VP /R) sin(wt) IP sin(wt)
(with IPVP/R)
V
I
V and I In-phase
p
wt
2p
17Capacitors in AC Circuits
Start from q C V
VVpsin(wt) Take derivative dq/dt C
dV/dt So I C dV/dt C VP w cos (wt)
I C w VP sin (wt p/2)
V
This looks like IPVP/R for a resistor (except
for the phase change). So we call Xc
1/(wC) the Capacitive Reactance
V
I
wt
p
2p
The reactance is sort of like resistance in that
IPVP/Xc. Also, the current leads the voltage by
90o (phase difference).
V and I out of phase by 90º. I leads V by 90º.
18Capacitor Example
A 100 nF capacitor is connected to an AC supply
of peak voltage 170V and frequency 60 Hz. What
is the peak current? What is the phase of the
current? What is the dissipated power?
19Inductors in AC Circuits
V VP sin (wt) Loop law V VL 0 where VL
-L dI/dt Hence dI/dt (VP/L)
sin(wt). Integrate I - (VP / Lw) cos (wt)
or I VP /(wL) sin (wt - p/2)
L
V
Again this looks like IPVP/R for a resistor
(except for the phase change). So we call
XL w L the Inductive
Reactance
I
p
wt
2p
Here the current lags the voltage by 90o.
V and I out of phase by 90º. I lags V by 90º.
20Inductor Example
A 10 mH inductor is connected to an AC supply of
peak voltage 10V and frequency 50 kHz. What is
the peak current? What is the phase of the
current? What is the dissipated power?
21Circuit element Resistance or Reactance Amplitude Phase
Resistor R VR IP R I, V in phase
Capacitor Xc1/wC VCIP Xc I leads V by 90
Inductor XLwL VLIP Xc I lags V by 90
22Phasor Diagrams
A phasor is an arrow whose length represents the
amplitude of an AC voltage or current. The phasor
rotates counterclockwise about the origin with
the angular frequency of the AC quantity. Phasor
diagrams are useful in solving complex AC
circuits. The y component is the actual voltage
or current.
Resistor
Vp
Ip
w t
23Phasor Diagrams
A phasor is an arrow whose length represents the
amplitude of an AC voltage or current. The phasor
rotates counterclockwise about the origin with
the angular frequency of the AC quantity. Phasor
diagrams are useful in solving complex AC
circuits. The y component is the actual voltage
or current.
Resistor Capacitor
Vp
Ip
Ip
w t
w t
Vp
24Phasor Diagrams
A phasor is an arrow whose length represents the
amplitude of an AC voltage or current. The phasor
rotates counterclockwise about the origin with
the angular frequency of the AC quantity. Phasor
diagrams are useful in solving complex AC
circuits. The y component is the actual voltage
or current.
Resistor Capacitor Inductor
Vp
Vp
Ip
Ip
Ip
w t
w t
w t
Vp