RC and RL Exponential Responses

RC Circuits

Discharging

Consider the following circuit:

File:RC discharge schematic.jpg

In the circuit, the capacitor is initally charged and has voltage ${\displaystyle V_{0}}$ aross it, and the switch is initially open. At time ${\displaystyle t=0}$, we close the circuit and the capacitor will discharage through the resistor. The voltage across a capacitor discharging through a resistor as a function of time is given as:

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

Charging

If the capacitor is initially uncharged and we want to charge it by inserting a voltage source ${\displaystyle V_{s}}$ in the RC cicuit:

File:RC charge schematic.jpg

The voltage across the capacitor is given by:

${\displaystyle v_{C}(t)=V_{s}(1-e^{-{\frac {t}{RC}}})}$

The term RC is the resistance of the resistor multiplied by the capacitance of the capacitor, and known as the time constant, which is a unit of time. The value of the function will be 63% of the final value at ${\displaystyle t=1RC}$, and over 99.99% of the final value at ${\displaystyle t=5RC}$.

The magnitudes of the voltage and current of the capacitor in the circuit above are shown in the graphs below:

RL Circuits

Discharging

In the following circuit, the inductor initally has current ${\displaystyle I_{0}=V_{0}/R}$ flowing through it; we replace the voltage source with a short circuit at ${\displaystyle t=0}$.

File:RL discharge schematic.jpg

The current flowing through the inductor at time t is given by:

${\displaystyle i_{L}(t)=I_{0}e^{-{\frac {R}{L}}t}}$

Charging

If the inductor is initially uncharged and we want to charge it by inserting a voltage source ${\displaystyle V_{s}}$ in the RL cicuit:

File:RL charge schematic.jpg

The current through the inductor is given by:

${\displaystyle i_{L}(t)=I_{0}(1-e^{-{\frac {R}{L}}t})}$

The time constant for the RL circuit is equal to ${\displaystyle L/R}$.

The magnitudes of the voltage and current of the inductor for the circuits above are given by the graphs below: