Resonance

Series Resonant Circuits

Consider the series resonant circuit shown in Fig. 1. We can calculate the total impedance seen by the source ${\displaystyle v_{S}}$, as:

${\displaystyle Z=R_{L}+j\omega L+{\frac {1}{j\omega C}}}$

(1)

Combining the imaginary terms of the impedance, we get:

${\displaystyle Z=R_{L}+j\left(\omega L-{\frac {1}{\omega C}}\right)}$

(2)

We can see that the imaginary component of the impedance becomes zero at the resonant frequency, ${\displaystyle \omega _{0}}$, equal to:

${\displaystyle \omega _{0}={\frac {1}{\sqrt {LC}}}}$

(3)

Note that the cancellation is narrowband, since perfect cancellation occurs only at a single frequency. Thus, from the point of view of the voltage source ${\displaystyle v_{S}}$, the impedance ${\displaystyle Z}$ is purely real. We can then calculate the current, ${\displaystyle i_{S}}$ as:

${\displaystyle i_{S}={\frac {v_{S}}{R_{L}}}}$

(4)

We then use this current to calculate the voltage across the inductor and capacitor:

${\displaystyle v_{L}=i_{S}\cdot j\omega _{0}L={\frac {v_{S}}{R_{L}}}\cdot j\omega _{0}L=v_{S}\cdot jQ_{S}}$

(5)

${\displaystyle v_{C}=i_{S}\cdot {\frac {1}{j\omega _{0}C}}=-{\frac {v_{S}}{R_{L}}}\cdot j{\frac {1}{\omega _{0}C}}=-v_{S}\cdot jQ_{S}}$

(6)

Where ${\displaystyle Q_{S}}$ is the series circuit quality factor:

(7)

Note that:

1. For small values of ${\displaystyle R_{L}}$ results in large values of ${\displaystyle Q}$, leading to large voltages across the inductor and capacitor.
2. The voltage across the inductor is exactly out of phase with the capacitor voltage, thus cancelling each other out.

Parallel Resonant Circuits