LNA: Difference between revisions

Ben Henry LNA Homework

HW#5

The below problem, although simple, is done with variables so values can be plugged in afterwords. Thus, one can see how the problem progresses and see where the initial conditions end up at the end.

PROBLEM STATEMENT:

Solve for current i(t) in CIRCUIT A below using Laplace Transforms. ${\displaystyle V_{t}(0)=7v}$, Failed to parse (syntax error): {\displaystyle r=40Ω} , ${\displaystyle c=2F}$, ${\displaystyle V_{c}(0)=3v.}$

The two circuits (A and B below) are the same circuit. B is the same as A, only it shows are current when we use KVL and after we have moved the circuit into the "S" domain.

Write Each Components in Laplace Form

Go from the "t" to the "s" domain right off the bat. Using KVL and assuming the current from ground through the voltage source>resister>capacitor>back to ground.

Voltage Source in Volts: ${\displaystyle v(t)}$ -> - ${\displaystyle V_{t}}$(0)/S

Resister in OHMs: r -> R

Capacitor in Farads: c -> 1/(CS) - ${\displaystyle V_{c}}$(0) Where ${\displaystyle V_{c}}$ is the initial voltage of the cap.

Apply KVL to Circuit B in S Domain

-${\displaystyle {\tfrac {V_{t}(0)}{S}}}$+I(s)(R+${\displaystyle {\tfrac {1}{CS}}}$)-${\displaystyle V_{c}}$(0)=0

Solving for I(S)

${\displaystyle I(S)={\cfrac {V_{t}(0)+V_{c}(0)}{S(R+{\tfrac {1}{CS}})}}={\cfrac {(V_{t}(0)+V_{c}(0))}{SR+{\tfrac {1}{C}}}}{\frac {\tfrac {1}{R}}{\tfrac {1}{R}}}={\cfrac {\tfrac {V_{t}(0)+V_{c}(0)}{R}}{S+{\tfrac {1}{RC}}}}}$

Performing the inverse Laplace

${\displaystyle L^{-1}(I(S))=L^{-1}({\cfrac {\tfrac {V_{t}(0)+V_{c}(0)}{R}}{S+{\tfrac {1}{RC}}}})=i(t)={\frac {V_{t}(0)+V_{c}(0)}{r}}e^{(-{\tfrac {1}{rC}}t)}}$

Apply Initial Conditions

${\displaystyle V_{t}(0)=7v}$

Failed to parse (syntax error): {\displaystyle r = 40 Ω}

${\displaystyle c=2F}$

${\displaystyle V_{c}(0)=3v}$

${\displaystyle i(t)={\frac {V_{t}(0)+V_{c}(0)}{r}}e^{(-{\tfrac {1}{rC}}t)}={\frac {7+3}{40}}e^{(-{\tfrac {1}{40*2}}t)}={\tfrac {1}{4}}e^{-{\tfrac {1}{40}}t}}$