Parallel ResonanceThe resonance of a parallel RLC circuit is a bit more involved than the series resonance. The resonant frequency can be defined in three different ways, which converge on the same expression as the series resonant frequency if the resistance of the circuit is small.
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Resonance: Impedance MaximumOne of the ways to define resonance for a parallel RLC circuit is the frequency at which the impedance is maximum. The general case is rather complex, but the special case where the resistances of the inductor and capacitor are negligible can be handled readily by using the concept of admittance. |
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Resonance: Phase DefinitionDefining the parallel resonant frequency as the frequency at which the voltage and current are in phase, unity power factor, gives the following expression for the resonant frequency: The above resonant frequency expression is obtained by taking the impedance expressions for the parallel RLC circuit and setting the expression for Xeq equal to zero to force the phase to zero. After about a page of algebra, the above expression emerges. Note that for small values of the resistances, this approaches the series resonant frequency. |
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AdmittanceAlthough the impedance Z is a far more common way to characterize the voltage-current relationships in an AC circuit, there are times when the admittance is avaluable construct. For a given circuit element, the admittance is just the reciprocal of the impedance. The admittance has its most obvious utility in dealing with parallel AC circuits where there are no series elements. The equivalent admittance of parallel elements is the sum of the admittances of the components. |
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