RLC circuit Guide, Meaning , Facts, Information and Description

An RLC circuit is a kind of electrical circuit composed of a resistor (R), an inductor (L), and a capacitor (C). See RC circuit for the simpler case. A voltage source is also implied. It is called a second-order circuit or second-order filter as any voltage or current in the circuit is the solution to a second-order differential equation.

The resonant or center frequency of such a circuit (in hertz) is:

It is a form of bandpass or bandcut filter, and the Q factor is

There are two common configurations of RLC circuits: series and parallel.

Table of contents

1 Series RLC Circuit 1.1 The ZIR (Zero Input Response) solution 1.1.1 Over damping 1.1.2 Critical damping 1.1.3 Under damping 1.2 The ZSR (Zero State Response) solution 1.2.4 Over Damping 1.2.5 Critical Damping 1.2.6 Under Damping 2 Parallel RLC Circuit 3 See also

Series RLC Circuit

In this circuit, the three components are in series with the voltage source. An RLC series circuit has a resonant frequency and is often used as a model for analysing electronic circuits, such as calculating impedance.

Where the notations in the figure above are:

• V - the voltage of the power source (measured in volts)
• I - the current in the circuit (measured in amperes)
• R - the resistance of the resistor (measured in ohms)
• L - the inductance of the inductor (measured in henries)
• C - the capacitance of the capacitor (measured in farads)

Given the parameters V, R, L, and C, the solution for the current (I) using Kirchoff's voltage law (or KVL) is:

For a time-changing voltage V(t), this becomes

Rearranging the equation will result in the following second order differential equation:

The ZIR (Zero Input Response) solution

Nullifying the input (voltage sources) we get the equation:

with the initial conditions for the inductor current, I_L(0), and the capacitor voltage V_C(0). However, in order to solve the equation properly, the initial conditions needed are I(0) and I'(0).

The first one we already have since the current in the main branch is also the current in the inductor, therefore

The second one is obtained employing KVL again:

We have now a homogeneous second order differential equation with two initial conditions. Usually second order differential equations are written as:

In case of an electrical circuit ω_k > 0 and therefore, there are three possible cases:

Over damping

In this case, the characteristic polynomial's solutions are both negative real numbers. This is called "over damping":

Critical damping

In this case, the characteristic polynomial's solutions are identical negative real numbers. This is called "critical damping":

Under damping

In this case, the characteristic polynomial's solutions are complex conjugate and have negative real part. This is called "under damping":

The ZSR (Zero State Response) solution

This time we nullify the initials conditions and stay with the following equation:

Separate solution for every possible function for V(t) is impossible, however, there is a way to find a formula for I(t) using convolution. In order to do that, we need a solution for a basic input - the Dirac delta function.

In order to find the solution more easily we will start solving for the Heaviside step function and then using the fact our circuit is a linear system, its derivative will be the solution for the delta function.

The equation will be therefore, for t>0:

Assuming λ₁ and λ₂ are the roots of

then as in the ZIR solution, we have 3 cases here:

Over Damping

Two negative real roots, the solution is:

Critical Damping

The two roots are identical (), the solution is:

Under Damping

Two conjugate roots (), the solution is:

(to be continued...)

Parallel RLC Circuit

First we

See also

• Electronic oscillator
• Bandwidth
• Resonant frequency
• Quality factor

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