There are three basic, linear passive lumped analog circuit components: the resistor (R), the capacitor (C), and the inductor (L). These may be combined in the RC circuit, the RL circuit, the LC circuit, and the RLC circuit, with the acronyms indicating which components are used. These circuits, among them, exhibit a large number of important types of behaviour that are fundamental to much of analog electronics. In particular, they are able to act as passive filters. This article considers the RC circuit, in both series and parallel forms, as shown in the diagrams below.

The simplest RC circuit consists of a resistor and a charged capacitor connected to one another in a single loop, without an external voltage source. Once the circuit is closed, the capacitor begins to discharge its stored energy through the resistor. The voltage across the capacitor, which is time-dependent, can be found by using Kirchhoff's current law. The current through the resistor must be equal in magnitude (but opposite in sign) to the time derivative of the accumulated charge on the capacitor. This results in the linear differential equation

${\displaystyle C{\frac {dV}{dt}}+{\frac {V}{R}}=0\,,}$ 

where C is the capacitance of the capacitor.

Solving this equation for V yields the formula for exponential decay:

${\displaystyle V(t)=V_{0}e^{-{\frac {t}{RC}}}\,,}$ 

where V₀ is the capacitor voltage at time t = 0.

The time required for the voltage to fall to V₀/e is called the RC time constant and is given by,^[1]

${\displaystyle \tau =RC\,.}$ 

In this formula, τ is measured in seconds, R in ohms and C in farads.

The complex impedance, Z_C (in ohms) of a capacitor with capacitance C (in farads) is

${\displaystyle Z_{C}={\frac {1}{sC}}}$ 

The complex frequency s is, in general, a complex number,

${\displaystyle s=\sigma +j\omega \,,}$ 

where

• j represents the imaginary unit: j² = −1,
• σ is the exponential decay constant (in nepers per second), and
• ω is the sinusoidal angular frequency (in radians per second).

Sinusoidal steady state

Sinusoidal steady state is a special case in which the input voltage consists of a pure sinusoid (with no exponential decay). As a result, ${\displaystyle \sigma =0}$  and the impedance becomes

${\displaystyle Z_{C}={\frac {1}{j\omega C}}=-{\frac {j}{\omega C}}\,.}$ 

By viewing the circuit as a voltage divider, the voltage across the capacitor is:

${\displaystyle V_{C}(s)={\frac {\frac {1}{Cs}}{R+{\frac {1}{Cs}}}}V_{\mathrm {in} }(s)={\frac {1}{1+RCs}}V_{\mathrm {in} }(s)}$ 

and the voltage across the resistor is:

${\displaystyle V_{R}(s)={\frac {R}{R+{\frac {1}{Cs}}}}V_{\mathrm {in} }(s)={\frac {RCs}{1+RCs}}V_{\mathrm {in} }(s)\,.}$ 

Transfer functions

The transfer function from the input voltage to the voltage across the capacitor is

${\displaystyle H_{C}(s)={\frac {V_{C}(s)}{V_{\mathrm {in} }(s)}}={\frac {1}{1+RCs}}\,.}$ 

Similarly, the transfer function from the input to the voltage across the resistor is

${\displaystyle H_{R}(s)={\frac {V_{R}(s)}{V_{\rm {in}}(s)}}={\frac {RCs}{1+RCs}}\,.}$ 

Poles and zeros

Both transfer functions have a single pole located at

${\displaystyle s=-{\frac {1}{RC}}\,.}$ 

In addition, the transfer function for the voltage across the resistor has a zero located at the origin.

Gain and phase

The magnitude of the gains across the two components are

${\displaystyle G_{C}={\big |}H_{C}(j\omega ){\big |}=\left|{\frac {V_{C}(j\omega )}{V_{\mathrm {in} }(j\omega )}}\right|={\frac {1}{\sqrt {1+\left(\omega RC\right)^{2}}}}}$ 

and

${\displaystyle G_{R}={\big |}H_{R}(j\omega ){\big |}=\left|{\frac {V_{R}(j\omega )}{V_{\mathrm {in} }(j\omega )}}\right|={\frac {\omega RC}{\sqrt {1+\left(\omega RC\right)^{2}}}}\,,}$ 

and the phase angles are

${\displaystyle \phi _{C}=\angle H_{C}(j\omega )=\tan ^{-1}\left(-\omega RC\right)}$ 

and

${\displaystyle \phi _{R}=\angle H_{R}(j\omega )=\tan ^{-1}\left({\frac {1}{\omega RC}}\right)\,.}$ 

These expressions together may be substituted into the usual expression for the phasor representing the output:

${\displaystyle {\begin{aligned}V_{C}&=G_{C}V_{\mathrm {in} }e^{j\phi _{C}}\\V_{R}&=G_{R}V_{\mathrm {in} }e^{j\phi _{R}}\,.\end{aligned}}}$ 

Current

The current in the circuit is the same everywhere since the circuit is in series:

${\displaystyle I(s)={\frac {V_{\mathrm {in} }(s)}{R+{\frac {1}{Cs}}}}={\frac {Cs}{1+RCs}}V_{\mathrm {in} }(s)\,.}$ 

Impulse response

The impulse response for each voltage is the inverse Laplace transform of the corresponding transfer function. It represents the response of the circuit to an input voltage consisting of an impulse or Dirac delta function.

The impulse response for the capacitor voltage is

${\displaystyle h_{C}(t)={\frac {1}{RC}}e^{-{\frac {t}{RC}}}u(t)={\frac {1}{\tau }}e^{-{\frac {t}{\tau }}}u(t)\,,}$ 

where u(t) is the Heaviside step function and τ = RC is the time constant.

Similarly, the impulse response for the resistor voltage is

${\displaystyle h_{R}(t)=\delta (t)-{\frac {1}{RC}}e^{-{\frac {t}{RC}}}u(t)=\delta (t)-{\frac {1}{\tau }}e^{-{\frac {t}{\tau }}}u(t)\,,}$ 

where δ(t) is the Dirac delta function

Frequency-domain considerations

These are frequency domain expressions. Analysis of them will show which frequencies the circuits (or filters) pass and reject. This analysis rests on a consideration of what happens to these gains as the frequency becomes very large and very small.

As ω → ∞:

${\displaystyle G_{C}\to 0\quad {\mbox{and}}\quad G_{R}\to 1\,.}$ 

As ω → 0:

${\displaystyle G_{C}\to 1\quad {\mbox{and}}\quad G_{R}\to 0\,.}$ 

This shows that, if the output is taken across the capacitor, high frequencies are attenuated (shorted to ground) and low frequencies are passed. Thus, the circuit behaves as a low-pass filter. If, though, the output is taken across the resistor, high frequencies are passed and low frequencies are attenuated (since the capacitor blocks the signal as its frequency approaches 0). In this configuration, the circuit behaves as a high-pass filter.

The range of frequencies that the filter passes is called its bandwidth. The point at which the filter attenuates the signal to half its unfiltered power is termed its cutoff frequency. This requires that the gain of the circuit be reduced to

${\displaystyle G_{C}=G_{R}={\frac {1}{\sqrt {2}}}}$ .

Solving the above equation yields

${\displaystyle \omega _{\mathrm {c} }={\frac {1}{RC}}\quad {\mbox{or}}\quad f_{\mathrm {c} }={\frac {1}{2\pi RC}}}$ 

which is the frequency that the filter will attenuate to half its original power.

Clearly, the phases also depend on frequency, although this effect is less interesting generally than the gain variations.

As ω → 0:

${\displaystyle \phi _{C}\to 0\quad {\mbox{and}}\quad \phi _{R}\to 90^{\circ }={\frac {\pi }{2}}{\mbox{ radians}}\,.}$ 

As ω → ∞:

${\displaystyle \phi _{C}\to -90^{\circ }=-{\frac {\pi }{2}}{\mbox{ radians}}\quad {\mbox{and}}\quad \phi _{R}\to 0\,.}$ 

So at DC (0 Hz), the capacitor voltage is in phase with the signal voltage while the resistor voltage leads it by 90°. As frequency increases, the capacitor voltage comes to have a 90° lag relative to the signal and the resistor voltage comes to be in-phase with the signal.

Time-domain considerations

This section relies on knowledge of e, the natural logarithmic constant.

The most straightforward way to derive the time domain behaviour is to use the Laplace transforms of the expressions for V_C and V_R given above. This effectively transforms jω → s. Assuming a step input (i.e. V_in = 0 before t = 0 and then V_in = V afterwards):

${\displaystyle {\begin{aligned}V_{\mathrm {in} }(s)&=V\cdot {\frac {1}{s}}\\V_{C}(s)&=V\cdot {\frac {1}{1+sRC}}\cdot {\frac {1}{s}}\\V_{R}(s)&=V\cdot {\frac {sRC}{1+sRC}}\cdot {\frac {1}{s}}\,.\end{aligned}}}$ 

Partial fractions expansions and the inverse Laplace transform yield:

${\displaystyle {\begin{aligned}V_{C}(t)&=V\left(1-e^{-{\frac {t}{RC}}}\right)\\V_{R}(t)&=Ve^{-{\frac {t}{RC}}}\,.\end{aligned}}}$ 

These equations are for calculating the voltage across the capacitor and resistor respectively while the capacitor is charging; for discharging, the equations are vice versa. These equations can be rewritten in terms of charge and current using the relationships C = Q/V and V = IR (see Ohm's law).

Thus, the voltage across the capacitor tends towards V as time passes, while the voltage across the resistor tends towards 0, as shown in the figures. This is in keeping with the intuitive point that the capacitor will be charging from the supply voltage as time passes, and will eventually be fully charged.

These equations show that a series RC circuit has a time constant, usually denoted τ = RC being the time it takes the voltage across the component to either rise (across the capacitor) or fall (across the resistor) to within 1/e of its final value. That is, τ is the time it takes V_C to reach V(1 − 1/e) and V_R to reach V(1/e).

The rate of change is a fractional 1 − 1/e per τ. Thus, in going from t = Nτ to t = (N + 1)τ, the voltage will have moved about 63.2% of the way from its level at t = Nτ toward its final value. So the capacitor will be charged to about 63.2% after τ, and essentially fully charged (99.3%) after about 5τ. When the voltage source is replaced with a short circuit, with the capacitor fully charged, the voltage across the capacitor drops exponentially with t from V towards 0. The capacitor will be discharged to about 36.8% after τ, and essentially fully discharged (0.7%) after about 5τ. Note that the current, I, in the circuit behaves as the voltage across the resistor does, via Ohm's Law.

These results may also be derived by solving the differential equations describing the circuit:

${\displaystyle {\begin{aligned}{\frac {V_{\mathrm {in} }-V_{C}}{R}}&=C{\frac {dV_{C}}{dt}}\\V_{R}&=V_{\mathrm {in} }-V_{C}\,.\end{aligned}}}$ 

The first equation is solved by using an integrating factor and the second follows easily; the solutions are exactly the same as those obtained via Laplace transforms.

Integrator

Consider the output across the capacitor at high frequency, i.e.

${\displaystyle \omega \gg {\frac {1}{RC}}\,.}$ 

This means that the capacitor has insufficient time to charge up and so its voltage is very small. Thus the input voltage approximately equals the voltage across the resistor. To see this, consider the expression for ${\displaystyle I}$  given above:

${\displaystyle I={\frac {V_{\mathrm {in} }}{R+{\frac {1}{j\omega C}}}}\,,}$ 

but note that the frequency condition described means that

${\displaystyle \omega C\gg {\frac {1}{R}}\,,}$ 

so

${\displaystyle I\approx {\frac {V_{\mathrm {in} }}{R}}}$ 

which is just Ohm's Law.

Now,

${\displaystyle V_{C}={\frac {1}{C}}\int _{0}^{t}I\,dt\,,}$ 

so

${\displaystyle V_{C}\approx {\frac {1}{RC}}\int _{0}^{t}V_{\mathrm {in} }\,dt\,,}$ 

which is an integrator across the capacitor.

Differentiator

Consider the output across the resistor at low frequency i.e.,

${\displaystyle \omega \ll {\frac {1}{RC}}\,.}$ 

This means that the capacitor has time to charge up until its voltage is almost equal to the source's voltage. Considering the expression for I again, when

${\displaystyle R\ll {\frac {1}{\omega C}}\,,}$ 

so

${\displaystyle {\begin{aligned}I&\approx {\frac {V_{\mathrm {in} }}{\frac {1}{j\omega C}}}\\V_{\mathrm {in} }&\approx {\frac {I}{j\omega C}}=V_{C}\,.\end{aligned}}}$ 

Now,

${\displaystyle {\begin{aligned}V_{R}&=IR=C{\frac {dV_{C}}{dt}}R\\V_{R}&\approx RC{\frac {dV_{in}}{dt}}\,,\end{aligned}}}$ 

which is a differentiator across the resistor.

More accurate integration and differentiation can be achieved by placing resistors and capacitors as appropriate on the input and feedback loop of operational amplifiers (see operational amplifier integrator and operational amplifier differentiator).

The parallel RC circuit is generally of less interest than the series circuit. This is largely because the output voltage V_out is equal to the input voltage V_in — as a result, this circuit does not act as a filter on the input signal unless fed by a current source.

With complex impedances:

${\displaystyle {\begin{aligned}I_{R}&={\frac {V_{\mathrm {in} }}{R}}\\I_{C}&=j\omega CV_{\mathrm {in} }\,.\end{aligned}}}$ 

This shows that the capacitor current is 90° out of phase with the resistor (and source) current. Alternatively, the governing differential equations may be used:

${\displaystyle {\begin{aligned}I_{R}&={\frac {V_{\mathrm {in} }}{R}}\\I_{C}&=C{\frac {dV_{\mathrm {in} }}{dt}}\,.\end{aligned}}}$ 

When fed by a current source, the transfer function of a parallel RC circuit is:

${\displaystyle {\frac {V_{\mathrm {out} }}{I_{\mathrm {in} }}}={\frac {R}{1+sRC}}\,.}$ 

It is sometimes required to synthesise an RC circuit from a given rational function in s. For synthesis to be possible in passive elements, the function must be a positive-real function. To synthesise as an RC circuit, all the critical frequencies (poles and zeroes) must be on the negative real axis and alternate between poles and zeroes with an equal number of each. Further, the critical frequency nearest the origin must be a pole, assuming the rational function represents an impedance rather than an admittance.

The synthesis can be achieved with a modification of the Foster synthesis or Cauer synthesis used to synthesise LC circuits. In the case of Cauer synthesis, a ladder network of resistors and capacitors will result.^[2]

• RC time constant
• RL circuit
• LC circuit
• RLC circuit
• Electrical network
• List of electronics topics
• Step response

• Bakshi, U.A.; Bakshi, A.V., Circuit Analysis - II, Technical Publications, 2009 ISBN 9788184315974.
• Horowitz, Paul; Hill, Winfield, The Art of Electronics (3rd edition), Cambridge University Press, 2015 ISBN 0521809266.