Transcript Document

Chapter 24 Capacitance and
Dielectrics
•Capacitance and dielectrics
•Capacitors in series and parallel
•Energy storage in capacitors
and electric field energy
•Dielectrics
•Molecular model / polarization
C 2012 J. Becker
(sec. 24.1)
(sec. 24.2)
(sec. 24.3)
(sec. 24.4)
(sec. 24.5)
Learning Goals - we will learn: Ch 24
• The nature of capacitors, and how to
calculate their ability to store charge.
• How to analyze capacitors connected
in a network.
• How to calculate the amount of energy
stored in a capacitor.
• What dielectrics are, and how they make
capacitors more effective.
A "charged" capacitor
can store charge.
When a capacitor is
being charged, negative
charge is removed from
one side of the
capacitor and placed
onto the other, leaving
one side with a negative
charge (-q) and the
other side with a
positive charge (+q).
Any two conductors insulated from one
another form a CAPACITOR.
Q = C V
where C = eo A / d
for a parallel plate capacitor,
where eo is the permittivity of
the insulating material
(dielectric) between plates.
A charged parallel
plate capacitor.
Recall that we used Gauss's Law
to calculate the electric field (E)
between the plates of a charged
capacitor:
E = s / eo where there is a
vacuum between the plates.
Vab = E d, so E = Vab /d
The unit of capacitance is called the Farad (F).
1
1
1 / Ceq = 1 / C1 + 1 / C2
Two capacitors in series and
the equivalent capacitor.
V = V1 + V2 and Q = C V
Ceq = C1 + C2
Two capacitors in parallel and
the equivalent capacitor.
Q = Q1 + Q2 and Q = C V
Capacitors can store charge and ENERGY
DU = q DV and the potential V increases as the
charge is placed on the plates (V = Q / C).
Since the V changes as the Q is increased, we
have to integrate over all the little charges
“dq” being added to a plate: DU = q DV leads to
U =  V dq =  q/C dq = 1/C oQ q dq = Q2 / 2C.
And using Q = C V, we get
U = Q2 / 2C = C V2 / 2 = Q V / 2
ENERGY STORED IN A CAPACITOR
The potential energy stored in the system of
positive charges that are separated from the
negative charges is like a stretched spring
that has potential energy associated with it.
ELECTRIC FIELD ENERGY
Here's another way to think of the energy
stored in a charged capacitor: If we consider
the space between the plates to contain the
energy (equal to 1/2 C V2) we can calculate an
energy DENSITY (Joules per volume).
The volume between the plates is area x plate
separation (A d). Then the energy density u is
u = 1/2 C V2 / A d = eo E2 / 2
Substituting C = eo A / d and V = E d
u = 1/2 (eo A/d) (Ed)2 /Ad =
C 2012 J. F. Becker
eo
E2/2
Energy density:
u =
e o E2 / 2
This is an important result because it tells us
that empty space contains energy if there is
an electric field (E) in the "empty" space.
If we can get an electric field to travel
(or propagate) we can send or transmit
energy and information through
empty space!!!
C 201 2 J. F. Becker
DIELECTRIC
CONSTANT:
K = C / Co
= ratio of the
capacitances
V = Vo / K
Effect of a dielectric between the plates of a
parallel plate capacitor.
Note – the charge is constant !
A dielectric is added between the plates of a
charged capacitor (battery not connected):
Q = Qo, therefore Q = C V and Qo = Co Vo
Co Vo = C V,
and if Vo decreases to V, Co must increase to
C to keep equation balanced, and
V = Vo Co/C
Definition of DIELECTRIC CONSTANT:
K = C / Co = ratio of the capacitances
V = Vo / K
C 2012 J. F. Becker
Q24.18
You slide a slab of dielectric between the plates of a parallel-plate
capacitor. As you do this, the charges on the plates remain
constant.
What effect does adding the dielectric have on the energy stored
in the capacitor?
A. The stored energy increases.
B. The stored energy remains the same.
C. The stored energy decreases.
D. not enough information given to decide
The charges induced on the surface of the
dielectric (insulator) reduce the electric field.
“Polarization” of a
dielectric in an
electric field E gives
rise to thin layers of
bound charges on
the dielectric’s
surfaces, creating
surface charge
densities
+si and –si.
A neutral sphere
B in the electric
field of a charged
sphere A is
attracted to the
charged sphere
because of
polarization.
For each problem:
Draw a clear and carefully labeled diagram.
Write the necessary equations in terms of variables.
Explicitly show all steps in calculations, including units.
“Polarization” of a dielectric in
an electric field E.