Laplace transforms:Series RLC circuit: Difference between revisions

Laplace Transform Example: Series RLC Circuit

Problem

Given a series RLC circuit with ${\displaystyle R=10Ohms}$, ${\displaystyle L=0.1H}$, and ${\displaystyle C=10^{-5}F}$, having power source ${\displaystyle v(t)=10cos(20t)}$, find an expression for ${\displaystyle i(t)}$ if ${\displaystyle i(0)=0A}$ and ${\displaystyle v_{c}(0)=0V}$.

Solution

We begin with the general formula for voltage drops around the circuit:

${\displaystyle v(t)=Ri+L{\dfrac {di}{dt}}+{\dfrac {1}{C}}\int {idt}}$

Substituting numbers, we get

${\displaystyle 10cos(20t)=10i+0.1{\dfrac {di}{dt}}+10^{5}\int {idt}}$

${\displaystyle \Rightarrow cos(20t)=i+0.01{\dfrac {di}{dt}}+10000\int {idt}}$

Now, we take the Laplace Transform and get

${\displaystyle {\dfrac {s}{s^{2}+20^{2}}}=I+0.01[sI-i(0)]+10000{\dfrac {I}{s}}}$

Using the fact that ${\displaystyle i(0)=0A}$, we get

${\displaystyle {\dfrac {s}{s^{2}+400}}=I+0.01sI+10000{\dfrac {I}{s}}}$

${\displaystyle \Rightarrow {\dfrac {s^{2}}{s^{2}+400}}=sI+0.01s^{2}I+10000I}$

${\displaystyle \Rightarrow {\dfrac {s^{2}}{s^{2}+400}}=(0.01s^{2}+s+10000)I}$

${\displaystyle \Rightarrow I(s)={\dfrac {s^{2}}{(s^{2}+400)(0.01s^{2}+s+10000)}}}$

Using partial fraction decomposition, we find that

${\displaystyle I(s)={\dfrac {1.0004-4.003*10^{-8}s}{0.01s^{2}+s+10000}}+{\dfrac {4.003*10^{-6}s-0.04002}{s^{2}+400}}}$

${\displaystyle \Rightarrow I(s)={\dfrac {100.04-4.003*10^{-6}s}{s^{2}+100s+1000000}}+{\dfrac {4.003*10^{-6}s-0.04002}{s^{2}+400}}}$

${\displaystyle \Rightarrow I(s)={\dfrac {100.04-4.003*10^{-6}s}{(s+50)^{2}+997500}}+{\dfrac {4.003*10^{-6}s-0.04002}{s^{2}+400}}}$

${\displaystyle \Rightarrow I(s)={\dfrac {100.038}{(s+50)^{2}+(50{\sqrt {399}})^{2}}}-{\dfrac {4.003*10^{-6}s+.002}{(s+50)^{2}+(50{\sqrt {399}})^{2}}}+{\dfrac {4.003*10^{-6}s}{s^{2}+20^{2}}}-{\dfrac {0.04002}{s^{2}+20^{2}}}}$

${\displaystyle \Rightarrow I(s)={\dfrac {10.038}{50{\sqrt {399}}}}{\dfrac {50{\sqrt {399}}}{(s+50)^{2}+(50{\sqrt {399}})^{2}}}-4.003*10^{-6}{\dfrac {s+50}{(s+50)^{2}+(50{\sqrt {399}})^{2}}}+4.003*10^{-6}{\dfrac {s}{s^{2}+20^{2}}}-{\dfrac {0.04002}{20}}{\dfrac {20}{s^{2}+20^{2}}}}$

Finally, we take the inverse Laplace transform to obtain

${\displaystyle i(t)=0.01e^{-50t}sin(998.8t)-(4.003*10^{-6})e^{-50t}cos(998.8t)+(4.003*10^{-6})cos(20t)-0.002sin(20t)\,}$

which is our answer.

Written by Nathan Reeves Checked by