Circuit Theory/Transients Summary and Study guide

This cover the basics of transients, the analysis of circuit response that goes away after a long time.

RC or LC Circuits

General solution steps for RL and LC circuits with a voltage source (with out voltage source Vc=0):

Use KVL and KCL, get 1st order differential equation
Find particular solution (Forcing Function) $Y_{p}$ (Table is at bottom of page)
The complete solution is the particular + the complementary.

$y (x) = Y_{p} + y_{c}$

$y_{c} (x) = K_{1} + K_{2} e^{s x}$

Substitute solution into differential equation to find $K_{1}$ and s. (Or find $K_{1}$ by solving in steady state.)
Use the given initial conditions to find $K_{2}$
Write final solution

Concept	Formula	notes
Damping Coefficiant (series LC)	$α = \frac{R}{2 L}$
Damping Coefficiant (parallel LC)	$α = \frac{1}{2 R C}$
Undamped resonant frequency	$ω_{0} = \frac{1}{\sqrt{L C}}$
General Form	$f (t) = \frac{d^{2} i (t)}{d t^{2}} + 2 α \frac{d i (t)}{d t} + ω_{0}^{2} i (t)$
Characteristic equation	$s^{2} + 2 α s + ω_{0}^{2} = 0$
Roots Characteristic eqn	$s_{1, 2} = - α \pm \sqrt{α^{2} - ω_{0}^{2}}$
Damping ratio	$ζ = \frac{α}{ω_{0}}$
Overdamped	$x_{c} (t) = K_{1} e^{s_{1} t} + K_{2} e^{s_{2} t}$	roots real and distinct $ζ > 1$ $α > ω$
Critically damped	$x_{c} (t) = K_{1} e^{s_{1} t} + K_{2} t e^{s_{1} t}$	roots real and equal $ζ = 1$ $α = ω$
Natural Frequency	$ω_{n} = \sqrt{ω_{0}^{2} - α^{2}}$
Underdamped	$x_{c} (t) = K_{1} e^{- α t} \cos ω_{n} t + K_{2} e^{- α t} \sin ω_{n} t$	roots complex $ζ < 1$ $α < ω$