The circuit above is constructed from several uncharged capacitors, a 9 Volt Battery, and a 1.8 Ohm resistor. Once the switch is closed, what will be the expression that represents the power dissipated by the resistor as a function of time?

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HINT: You will probably want to start this problem by calculating the effective capacitance of the circuit. Make sure to appropriately account for what is in parallel and what is in series as you do; the most straightforward way to do this traditionally is to set up smaller effective capacitors one segment at a time until you have reduced the entire capacitor network to a single effective capacitor, then calculate the time constant.
1.82
2F
HE
1F
9V
1F
1F 1F
2F
The circuit above is constructed
from several uncharged
capacitors, a 9 Volt Battery, and
a 1.8 Ohm resistor. Once the
switch is closed, what will be the
expression that represents the
power dissipated by the resistor
as a function of time?
Transcribed Image Text:1.82 2F HE 1F 9V 1F 1F 1F 2F The circuit above is constructed from several uncharged capacitors, a 9 Volt Battery, and a 1.8 Ohm resistor. Once the switch is closed, what will be the expression that represents the power dissipated by the resistor as a function of time?
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