Harmonic Resonance Frequency


Statistics – Harmonic Resonance Frequency


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Harmonic Resonance Frequency represents a signal or wave whose frequency is an integral multiple of the frequency of a reference signal or wave.

Formula

${ f = frac{1}{2 pi sqrt{LC}} } $

Where −

  • ${f}$ = Harmonic resonance frequency.

  • ${L}$ = inductance of the load.

  • ${C}$ = capacitanc of the load.

Example

Calculate the harmonic resonance frequency of a power system with the capcitance 5F, Inductance 6H and frequency 200Hz.

Solution:

Here capacitance, C is 5F. Inductance, L is 6H. Frequency, f is 200Hz. Using harmonic resonance frequency formula, let”s compute the resonance frequency as:

${ f = frac{1}{2 pi sqrt{LC}} \[7pt]
implies f = frac{1}{2 pi sqrt{6 times 5}} \[7pt]
, = frac{1}{2 times 3.14 times sqrt{30}} \[7pt]
, = frac{1}{ 6.28 times 5.4772 } \[7pt]
, = frac{1}{ 34.3968 } \[7pt]
, = 0.0291 }$

Thus harmonic resonance frequency is $ { 0.0291 }$.

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