10.5 Rc circuits

University physics volume 2 Page 1 / 5

By the end of the section, you will be able to:

Describe the charging process of a capacitor
Describe the discharging process of a capacitor
List some applications of RC circuits

When you use a flash camera, it takes a few seconds to charge the capacitor that powers the flash. The light flash discharges the capacitor in a tiny fraction of a second. Why does charging take longer than discharging? This question and several other phenomena that involve charging and discharging capacitors are discussed in this module.

Circuits with resistance and capacitance

An RC circuit is a circuit containing resistance and capacitance. As presented in Capacitance , the capacitor is an electrical component that stores electric charge, storing energy in an electric field.

[link] (a) shows a simple RC circuit that employs a dc (direct current) voltage source $ε$ , a resistor R , a capacitor C , and a two-position switch. The circuit allows the capacitor to be charged or discharged, depending on the position of the switch. When the switch is moved to position A , the capacitor charges, resulting in the circuit in part (b). When the switch is moved to position B , the capacitor discharges through the resistor.

Part a shows an open circuit with three branches, left branch is a voltage source with upward positive terminal connected to point A, the middle branch is a short circuit with point B and right branch is a resistor with a capacitor. Part b shows circuit of part a with first branch connected to third branch. Part c shows circuit of part a with second branch connected to third branch. — (a) An RC circuit with a two-pole switch that can be used to charge and discharge a capacitor. (b) When the switch is moved to position A , the circuit reduces to a simple series connection of the voltage source, the resistor, the capacitor, and the switch. (c) When the switch is moved to position B , the circuit reduces to a simple series connection of the resistor, the capacitor, and the switch. The voltage source is removed from the circuit.

Charging a capacitor

We can use Kirchhoff’s loop rule to understand the charging of the capacitor. This results in the equation $ε - V_{R} - V_{c} = 0 .$ This equation can be used to model the charge as a function of time as the capacitor charges. Capacitance is defined as $C = q / V,$ so the voltage across the capacitor is $V_{C} = \frac{q}{C}$ . Using Ohm’s law, the potential drop across the resistor is $V_{R} = I R$ , and the current is defined as $I = d q / d t .$

\begin{matrix} ε - V_{R} - V_{c} = 0, \\ ε - I R - \frac{q}{C} = 0, \\ ε - R \frac{d q}{d t} - \frac{q}{C} = 0. \end{matrix}

This differential equation can be integrated to find an equation for the charge on the capacitor as a function of time.

\begin{matrix} ε - R \frac{d q}{d t} - \frac{q}{C} = 0, \\ \frac{d q}{d t} = \frac{ε C - q}{R C}, \\ \int_{0}^{q} \frac{d q}{ε C - q} = \frac{1}{R C} \int_{0}^{t} d t . \end{matrix}

Let $u = ε C - q$ , then $d u = − d q .$ The result is

\begin{matrix} - \int_{0}^{q} \frac{d u}{u} = \frac{1}{R C} \int_{0}^{t} d t, \\ ln (\frac{ε C - q}{ε C}) = - \frac{1}{R C} t, \\ \frac{ε C - q}{ε C} = e^{− \frac{t}{R C}} . \end{matrix}

Simplifying results in an equation for the charge on the charging capacitor as a function of time:

q (t) = C ε (1 - e^{- \frac{t}{R C}}) = Q (1 - e^{- \frac{t}{τ}}) .

A graph of the charge on the capacitor versus time is shown in [link] (a). First note that as time approaches infinity, the exponential goes to zero, so the charge approaches the maximum charge $Q = C ε$ and has units of coulombs. The units of RC are seconds, units of time. This quantity is known as the time constant :

τ = R C .

At time $t = τ = R C$ , the charge is equal to $1 - e^{−1} = 1 - 0.368 = 0.632$ of the maximum charge $Q = C ε$ . Notice that the time rate change of the charge is the slope at a point of the charge versus time plot. The slope of the graph is large at time $t = 0.0 s$ and approaches zero as time increases.

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Source: OpenStax, University physics volume 2. OpenStax CNX. Oct 06, 2016 Download for free at http://cnx.org/content/col12074/1.3

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