Upload
baldric-wells
View
238
Download
2
Tags:
Embed Size (px)
Citation preview
Capacitors: devices that store electric charge Consist of two isolated conductors (plates) with
equal and opposite charges +Q and −Q; the charge on the capacitor is referred to as "Q".
Ex:Parallel Plate Capacitor
Applications of Capacitors Tune the frequency of radio receivers Used as filters in power supplies Used as energy-storing devices in electronic
flashes (ex: cameras)
Charging a Parallel Plate Capacitor The battery establishes a field on the
plates. This forces the electrons from the wire
to move on to the plate that will become the negative plate.
This continues until equilibrium is achieved(the plate, the wire and the terminal are all at the same potential) and the movement of the electrons ceases.
At the other plate, electrons move away from the plate, leaving it positively charged.
Finally, the potential difference across the capacitor plates is the same as that between the terminals of the battery.
Capacitance: a measure of the capacitor’s ability to store charge
Ratio of the magnitude of the charge on either conductor to the potential difference between the conductors.
The SI unit of capacitance is the farad (F) 1 F = 1 Coulomb/Volt Also see the units pF (10-12) or F (10-6)
QC
V
Factors that affect capacitance Size (Area, distance between
plates) Geometric arrangement
Plates Cylinders Spheres
Material between plates (dielectric) Air Paper Wax
Note:
Capacitance is always positive
The capacitance of a given capacitor is constant. If the voltage changes the charge will change not the capacitance.
Note:
The electric field is uniform in the central region, but not at the ends of the plates. It is zero elsewhere.
If the separation between the plates is small compared with the length of the plates, the effect of the non-uniform field can be ignored.
Capacitance of a Parallel Plate Capacitor
A is the area of each plate Q is the charge on each plate, equal with opposite signs
The capacitance is proportional to the area of its plates and inversely proportional to the distance between the plates
From Gauss's Law EA=Q/
/
o
o
o
Q QC
V Edε
QC
Qd ε A
ε AC
d
A single conductor can have a capacitance. Example: Isolated charged sphere can be
thought of being surrounded by a concentric shell of infinite radius carrying a charge of the same magnitude but opposite sign.
Capacitance of an Isolated Charged Sphere, Cont’d
Assume V = 0 at infinity
Note, the capacitance is independent of the charge and the potential difference.
/
/
4
e
e
oe
QC
VV k Q R
QC
k Q R
RC πε Rk
Capacitance of a Cylindrical Capacitor From Gauss’s Law, the field between the cylinders is
E = 2ke / r, Q/L
V = -2keln (b/a) 2 ln /e
QC
V k b a
b b
bao o oa a
Q Q dr Q bV dr ln
2 rL 2 L r 2 L a