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Transcript
Ch 26.4 – Energy Stored in a Capacitor – charging a capacitor
Switch goes shut.
 Battery establishes E-field in wires, charge
builds up on the capacitor.
Chemical energy in battery goes down and
electrical potential energy stored in capacitor
goes up.
Electrical potential energy results from charge
separation across capacitor’s plates
Ch 26.4 – Energy Stored in a Capacitor – charging a capacitor
To charge the capacitor, an external agent (battery) must do work to separate
the charges.
Step by step, the battery “grabs” a small amount of charge dq off one
capacitor plate and move it to the other.
At first, this requires no work, because the uncharged capacitor has no
electric field to resist the movement of charge.
But, once dq has been transferred, the capacitor starts to develop a potential
difference.
Now, to move more charge from one plate to the other, the battery must do
some amount of work “dW,” to overcome the rising potential difference
across the plates.
As more and more charge is transferred, the work required to transfer the
same amount of charge, dq, goes up.
Ch 26.4 – Energy Stored in a Capacitor – charging a capacitor
Suppose q is the amount of charge on the capacitor at some instant during
the charging process.
At the same instant, the potential difference across the capacitor is ΔV = q/C
The amount of work necessary to transfer dq amount of charge across this
potential difference is
dW = ΔVdq = (q/C)dq
Ch 26.4 – Energy Stored in a Capacitor
Thus, the total amount of work required to charge the capacitor from q = 0
to a final charge of q = Q is
Q
q
1 Q
Q2
W   dq   qdq 
C
C 0
2C
0
But, in an isolated system with no non-conservative forces, total mechanical
energy must be conserved.
Therefore, the work done to charge the capacitor must equal the change in
the system’s potential energy.
Ch 26.4 – Energy Stored in a Capacitor
Q2 1
1
2
U
 QV  C V 
2C 2
2
Energy stored in a charged capacitor
Ch 26.4 – Energy Stored in a Capacitor
Q2 1
1
2
U
 QV  C V 
2C 2
2
-It’s not obvious, but the potential energy stored in the capacitor actually resides in
its electric field.
-This implies we should be able to solve the density of the energy stored in the field
(J/m3).
-For a parallel plate capacitor, we already know: V  Ed
 A
-and, its capacitance is just: C  0
d
-Substituting these into the purple equation,
1 0 A 2 2 1

U
E d    0 Ad E 2
2 d
2
-Dividing by the volume in between the plates of the capacitor (V=Ad), we
get
1
uE   0 E 2
2
Energy per unit volume in
a capacitor (J/m3)
Ch 26.4 – Energy Stored in a Capacitor
-We don’t attempt it here, but it can be shown that this result is valid for any electric
field!
1
uE   0 E 2
2
Energy per unit volume in
an electric field.
-In a very real sense, electric fields “carry” energy.
EG 26.4 – Rewiring two Charged Capacitors
Two capacitors, C1 and C2 (C1 > C2), are charged to the same initial potential difference, ΔVi.
The charged capacitors are removed from the battery, and their plates are connected with
opposite polarity, as shown. The switches, S1 and S2, are then closed.
(a) Find the final potential difference ΔVf between a and b after the switches are closed.
(b) Find the total energy stored in the capacitors before and after the switches are closed and
determine the ratio of the final energy to the initial energy.
Ch 26.5 – Capacitors with dielectrics
A dielectric is something you stick in between the plates of a capacitor to change
(increase) it’s capacitance.
The term comes from the fact that, at the atomic level, such materials can be
polarized into arrays of dipoles.
Ch 26.5 – Capacitors with dielectrics
Common dielectric materials are: wax, paper, oil, polymers, fluid (electrolyte), etc.
Dielectrics are insulators.
Since you stick the dielectric material into the region of the capacitor’s E-field, it
changes how “good” the capacitor is at establishing the E-field
 ΔV↓ for the same amount of Q on the capacitor plate.
What happens?
Ch 26.5 – Capacitors with dielectrics
Consider parallel-plate capacitor where ΔV0 = Q0/C0
Assume no battery is connected  Q can’t change
When you stick a dielectric in between the plates 
Ch 26.5 – Capacitors with dielectrics
Consider parallel-plate capacitor where ΔV0 = Q0/C0
Assume no battery is connected  Q can’t change
When you stick a dielectric in between the plates 
-where κ is a dimensionless
constant called the
“dielectric constant”
V0
V 

Ch 26.5 – Capacitors with dielectrics
-Q on the capacitor does not change
-Therefore:
C
Q0
Q0

V V0
C  C0
-the capacitance is changed
by a factor of κ.
-as κ goes up, C goes up.


Q0
V0
Ch 26.5 – Capacitors with dielectrics
-For a parallel plate capacitor
C0 
0 A
d
C 
0 A
d
To make capacitance ↑
-decrease d
-increase A
-increase κ
- Only limited by
“dielectric strength” of the
dielectric
Example values of dielectric constant
“Dielectric strength” is the
maximum field in the
dielectric before breakdown.
(a spark or flow of charge)
E max  Vmax / d
EG 26.5 – Energy stored before and after
A parallel-plate capacitor is charged with a battery to a charge of Q0. The battery is
then removed, and a slab of material that has a dielectric constant κ is inserted
between the plates. Identify the system as the capacitor and the dielectric.
Find the energy stored in the system before and after the dielectric is inserted.
EG 26.4 – Rewiring two Charged Capacitors
A parallel-plate capacitor is charged with a battery to a charge of Q0. The battery is
then removed, and a slab of material that has a dielectric constant κ is inserted
between the plates. Identify the system as the capacitor and the dielectric.
Find the energy stored in the system before and after the dielectric is inserted.
Before:
Q02
U0 
2C0
After:
Q02
U0 
2C
Q02
U
U0 
 0
2C0 
Where did the energy go?
Ch 26.6 – Electric Dipole in an Electric Field
The combination of two equal charges of opposite sign, +q and –q,
separated by a distance 2a
Every dipole can be characterized by it’s “dipole moment.”
- vector which points from –q to +q
-magnitude p = 2aq
p1
p2
p  p1  p2
Ch 26.6 – Electric Dipole in an Electric Field
What happens when we pop this baby in an external E-field?
Ch 26.6 – Electric Dipole in an Electric Field
What happens when we pop this baby in an external E-field?
-external field exerts F=qE on each charge
-net torque about the dipole’s center
-dipole rotates to “align” with the field
Ch 26.6 – Electric Dipole in an Electric Field
What happens when we pop this baby in an external E-field?
-external field exerts F=qE on each charge
-net torque about the dipole’s center
-dipole rotates to “align” with the field
   Fa sin 
   Fa sin 
Ch 26.6 – Electric Dipole in an Electric Field
 net  2Fa sin 
but,
F  qE and p  2aq
Thus:
  2aqE sin   pE sin 
Ch 26.6 – Electric Dipole in an Electric Field
 net  2Fa sin 
but,
F  qE and p  2aq
Thus:
  2aqE sin   pE sin 
 
  p E

Ch 26.6 – Electric Dipole in an Electric Field
The dipole and the external field are a system
-electric force is an internal conservative force
we can describe its work using a potential
energy
In other words, different configurations of the
dipole-field system have different potential
energies.
Ch 26.6 – Electric Dipole in an Electric Field
As the dipole aligns with the field, the
system’s potential energy goes down.
Ch 26.6 – Electric Dipole in an Electric Field
-Work must be done to “un-align” the dipole
from the field.
-in an isolated system, the work input must
correspond to an increase in potential energy.
Ch 26.6 – Electric Dipole in an Electric Field
-Work must be done to “un-align” the dipole
from the field.
-in an isolated system, the work input must
correspond to an increase in potential energy.
W = ΔK + ΔU
Ch 26.6 – Electric Dipole in an Electric Field
-To rotate the dipole through some small angle dθ, an amount dW of work must
be done.
dW  d
but,
  pE sin 
Ch 26.6 – Electric Dipole in an Electric Field
-To rotate the dipole through some small angle dθ, an amount dW of work must
be done.
dW  d
but,
  pE sin 
-so, to rotate the dipole from θi to θf, the change in potential energy is:
f
f
f
i
i
i
U f  U i   d   pE sin d  pE  sin d

 pE[ cos  ]if  pE (cos i  cos  f )
Ch 26.6 – Electric Dipole in an Electric Field
Let’s define the zero potential energy as being when the dipole is at θ = 90,
Ui  0
when
i  90
Ch 26.6 – Electric Dipole in an Electric Field
Let’s define the zero potential energy as being when the dipole is at θ = 90,
Ui  0
when
i  90
We’ll use this reference energy as an anchor point.
At any time, we can write the system’s
instantaneous potential energy, U, with respect to
the zero-point potential energy.
U  U f  U i  U f  U  90  U f  0
Ch 26.6 – Electric Dipole in an Electric Field
Let’s define the zero potential energy as being when the dipole is at θ = 90,
Ui  0
when
i  90
We’ll use this reference energy as an anchor point.
At any time, we can write the system’s
instantaneous potential energy, U, with respect to
the zero-point potential energy.
U  U f  U i  U f  U  90  U f  0
But, we already know

 pE[ cos  ]if  pE (cos i  cos  f )   pE cos  f
U   pE cos 
Ch 26.6 – Electric Dipole in an Electric Field
Let’s define the zero potential energy as being when the dipole is at θ = 90,
Ui  0
when
i  90
We’ll use this reference energy as an anchor point.
At any time, we can write the system’s
instantaneous potential energy, U, with respect to
the zero-point potential energy.
U  U f  U i  U f  U  90  U f  0
But, we already know

 pE[ cos  ]if  pE (cos i  cos  f )   pE cos  f
U   pE cos 
 
U  pE
EG 26.6 – The Water Molecule
A water molecule has an electric dipole moment of 6.3x10-30 Cm. A sample
contains 1021 water molecules. All of the dipoles are oriented in the direction
of an external E-field, which has a magnitude of 2.5x105 N/C.
How much work is required to rotate all the dipoles from this orientation (θ = 0) to
one in all the dipoles are perpendicular to the external field (θ = 90)?
EG 26.6 – The Water Molecule
A water molecule has an electric dipole moment of 6.3x10-30 Cm. A sample
contains 1021 water molecules. All of the dipoles are oriented in the direction
of an external E-field, which has a magnitude of 2.5x105 N/C.
How much work is required to rotate all the dipoles from this orientation (θ = 0) to
one in all the dipoles are perpendicular to the external field (θ = 90)?
U  W
W  U 90  U 0  ( NpE cos 90)  ( NpE cos 0)
 NpE  (1021 )(6.3 1030 C  m)(2.5 105 N / C )
 1.6 10 3 J
Example P26.9
When a potential difference of 150 V
is applied to the plates of a parallelplate capacitor, the plates carry a
surface charge density of 30.0
nC/cm2. What is the spacing between
the plates?
Q 
d
0  V 

0 A
 V 
d
8.85 10
12

 30.0  10
9
C cm
C2 N m
2
2
 150 V 
1.00  10
4
cm
2
m
2

 4.42 m
Example P26.21
Four capacitors are connected as
shown in Figure P26.21.
(a) Find the equivalent capacitance
between points a and b.
(b) Calculate the charge on each
capacitor if ΔVab = 15.0 V.
1
1
1


C s 15.0 3.00
Q  C V   5.96 F 15.0 V   89.5 C
Q 89.5  C

 4.47 V
C 20.0 F
15.0  4.47  10.53 V
V 
C s  2.50 F
C p  2.50  6.00  8.50 F

1
1 
C eq  

 8.50 F 20.0 F 
1
 5.96 F
Q  C V   6.00 F  10.53 V   63.2  C on 6.00 F
89.5  63.2  26.3 C
Example P26.27
Find the equivalent capacitance
between points a and b for the
group of capacitors connected as
shown in Figure P26.27. Take C1 =
5.00 μF, C2 = 10.0 μF, and C3 =
2.00 μF.
1 
 1
Cs  

 5.00 10.0
1
 3.33 F
C p1  2 3.33  2.00  8.66 F
C p2  2 10.0  20.0 F
1 
 1
C eq  

 8.66 20.0
1
 6.04 F
Example P26.35
A parallel-plate capacitor is charged and then
disconnected from a battery. By what fraction
does the stored energy change (increase or
decrease) when the plate separation is doubled?
d2  2d1
,
C2 
1
C1
2
. Therefore, the
stored energy doubles
Example P26.43
Determine (a) the capacitance and (b)
the maximum potential difference that
can be applied to a Teflon-filled
parallel-plate capacitor having a plate
area of 1.75 cm2 and plate separation of
0.040 0 mm.
C
 0 A
d


1.75 10
2.10 8.85  1012 F m
4
5
4.00  10

m
Vm ax  Em axd  60.0  106 V m
m
2
  8.13 10
11
 4.00 10
5

F  81.3 pF
m  2.40 kV
Example P26.59
A parallel-plate capacitor is constructed
using a dielectric material whose dielectric
constant is 3.00 and whose dielectric strength
is 2.00 × 108 V/m. The desired capacitance
is 0.250 μF, and the capacitor must withstand
a maximum potential difference of 4 000 V.
Find the minimum area of the capacitor
plates.
  3.00
Em ax  2.00  108 V m 
C
A
 0 A
d


Vm ax
d
 0.250  106 F


0.250  106  4 000
C Vm ax
Cd


 0.188 m
 0  0 Em ax 3.00 8.85  1012 2.00  108

2