Electrically,
impedance is the
sum of a
DC resistance and an
AC reactance. The (DC)
resistance is the
real portion of the impedance, and the
reactance is the
imaginary (j) portion. Impedance is measured in the same units as
resistance,
Ohms.
Suppose one has the following circuit:
i(t)
---------------->
R C L
+--\/\-----|(----@@@----+ R = 1 kΩ
| | C = 1 μF
| + | L = 1 H
(~) v(t) |
| - | v(t) = 10 cos ωt V
| | ω = 2π*60 Hz = 120π rad/s
+-----------------------+
This circuit has a DC resistance contributed solely by the resistor:
R = R = 1kΩ
The capacitor and inductor both contribute to the net reactance:
XC = 1/(jωC) = 1/j(120π*10-6) = -j2652 Ω
XL = jωL = j(120π) = j376 Ω
Reactances can be added when in series, just as resistance, so we obtain:
Xtotal = XC+XL = -j2276 Ω
Now, to obtain the total impedance, Z, of the circuit, add the reactance and the DC resistance, since they are in series:
Z = (1000-j2276) Ω
This can be expressed in exponential notation, and plotted on the polar plane:
Z = |Z|exp(j*arctan(X/R)) = 2485*exp(j(-66°))
R Re
+----->------------------->
|\)Φ |
| \ | X
| \ |
| Y \ |
| \v
| Y = |Z|
| Φ = -66°
|
|
|
v Im
We can now calculate the the current, i(t), through the circuit, using Ohm's Law:
V = IZ => v(t)/Z = i(t)
i(t) = 10/Z cos ωt = (10/2485)*exp(j(66°)) cos ωt = 4.024 cos (ωt + 66°) (mA)
Note that the presence of a reactance introduces a phase shift between the current and the voltage souce.
One may note that the inverse of impedance is admittance, measured in the same units as conductance, Siemens (S).