capacitors
DESCRIPTION
sonhsohnTRANSCRIPT
Capacitors
revision
What is a capacitor?
• Electronic component• Two conducting surfaces separated by an insulating material• Stores charge• Uses
– Time delays– Filters– Tuned circuits
Capacitor construction
• Two metal plates• Separated by insulating
material• ‘Sandwich’ construction• ‘Swiss roll’ structure• Capacitance set by...
d
AC
Defining capacitance
• ‘Good’ capacitors store a lot of charge…• …when only a small voltage is applied• Capacitance is charge stored per volt• Capacitance is measured in farads F
– Big unit so nF, mF and F are used
V
QC
Graphical representation
As the capacitor is charged to higher and higher P.d. ……..
mxy
CVQV
QC
Q
V
Gradient term is the capacitance of the capacitor
Charge stored is directly proportional to the applied voltage
Energy stored by a capacitor
• By general definition E=QV– product of charge and voltage
• By graphical consideration...
QVE2
1
Area term is the energy stored in the capacitor
Q
V
Other expressions for energy
• By substitution of Q=CV
C
QE
CVE
QVE
2
2
2
1
2
12
1
Charging a capacitor
• Current flow• Initially
– High• Finally
– Zero• Exponential model
– Because rate of charge flow depends on ‘how much charge is on plate'
• Charging factors– Capacitance– Resistance in outer
circuit
I
t
Discharging a capacitor• Current flow• Initially
– High– Opposite to charging
• Finally– Zero
• Exponential model– Because rate of charge flow
depends on how much charge is on plate
• Discharging factors– Capacitance– Resistance in outer
circuit
I
t
V or Q
t
V or Q
t
Voltage and charge characteristics
• Charging Discharging
RCt
eQQ
0)1(0RCt
eVV
• Product of– Capacitance of the capacitor being charged– Resistance of the charging circuit– CR
• Symbol ‘Tau’• Unit seconds
• To show units of tau are seconds, use Ohm’s Law to substitute for R and Capacitance definition to substitute for C
Time constant
tCR
tQ
V
V
QCR
When t equals tau during discharge
• Discharging: At t = tau the capacitor has fallen to 37% of its original value.
• Charging :By a similar analysis tau can be considered to be the time taken for the capacitor to reach 63% of full charge.
37.00
10
0
0
eQQ
eQQ
eQQ
RCRC
RCt
Graphical determination of tau
• V at 37%• Q at 37%• Compared to initial
maximum discharge
V
or
Q
t
RtC
RCt
t
Logarithmic discharge analysis
• Mathematical consideration of discharge
• Exponential relationship • Taking natural logs produces
expression of form ‘y=mx+c’• Gradient is -1/Tau
0
0
0
0
ln1
ln
lnln
VtRC
V
RCtVV
eV
V
eVV
RCt
RCt
Logarithmic discharge graph
lnV
t
Gradient term is the -1/Tau