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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Lecture 13
Chapter 28
RC Circuits
Course website:http://faculty.uml.edu/Andriy_Danylov/Teaching/PhysicsII
Physics II
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Today we are going to discuss:
Chapter 28:
Section 28.9 RC circuits
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Steady
current
In the preceding sections we dealt with circuits in which the circuits elements were resistors and in which the currents did not vary with time. Here we
introduce the capacitor as a circuit element, which will lead us to the study of time-varying currents.
Time-varying current
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
RC circuit (Charging a Capacitor)
Now, we know Kirchhoff’s rules and let’s apply them
to study an RC circuit
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Charging a Capacitor
Let’s look at the circuit at some arbitrary moment of time t and apply Kirchhoff’s loop rule:
We need to analyze it:
denote RC (the time constant) and (full charge of the capacitor)
The capacitor charge at time t is:
, , ∆ ?
∆ + ∆ + ∆ 0
The figure shows an RC circuit, some time after the switch was closed.
(The resistor current is the rate at which charge is added to the capacitor)
There are two variables I(t),Q(t), which are dependent:
/
0
0
It is not hard to solve, but we just present the solution (see the solution at the end of this presentation)
0
∆1 ⁄
1 ⁄
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Resistor Current and Capacitor VoltageLet’s calculate the resistor current:
⁄
RC ⁄ ⁄
⁄
(https://www.youtube.com/watch?v=jFrVoG-edFc)
No current. Electrons waiting for a switch to be closed.
The first photo of a traveling electron
1 ⁄
This current looks like “The Land Run” of 1893 (the Oklahoma Territory) shown in the movie “Far and Away”
Race begins. Electrons are on the way to their lands.
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A) No light.B) First, it is bright, then dim.C) First, it is dim, then bright.D) Steady bright.
In the circuit shown, the capacitor is originally uncharged. Describe the behavior of the lightbulb from the instant switch S is closed until a long time later.
ConcepTest RC circuit 1
When the switch is first closed, the current is highand the bulb burns brightly. As the capacitor charges,The voltage across the capacitor increases causingthe current to be reduced, and the bulb dims.
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
RC circuit (discharging)
At t = 0, the switch closes and the charged capacitor begins to discharge through the resistor.
We want to analyze the RC circuit:, , ∆ ?
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
RC circuit (discharging)
Kirchhoff’s loop law applied to this circuit clockwise is:
The figure shows an RC circuit, some time after the switch was closed.
The resistor current is the rate at which charge is removed from the capacitor:
Q and I in this equation are the instantaneous values of the capacitor charge and the resistor current.
denote time constant as:
The resistor current 0 ,
where Q0 is the charge at t = 0
The charge on the capacitor of an RC circuit
0
ln
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
RC circuit (discharging)Let’s plot it:
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
RC circuit (discharging)Let’s calculate the resistor current:
I0 is the initial current
The current undergoes the same exponential decay
∆
∆ ∆
Let’s calculate the voltage of the capacitor:
∆ / ∆ ∆/ the voltage across the capacitor
Now we know everything about the circuit [Q(t), I(t), and ΔV(t)]
2.7 0.37
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A) Capacitor A.B) Capacitor B.C) They discharge at the
same rate.D) Can’t say without
knowing the initial amount of charge.
Which capacitor discharges more quickly after the switch is closed?
ConcepTest RC circuit 1
time constant = RC
= 12 µs = 15 µs
So the capacitor A discharges faster than B
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A) 5 sB) 4 sC) 2 sD) 1 sE) The capacitor does not discharge because the resistors cancel each other
What is the time constant for the discharge of the capacitor shown in the figure?
ConcepTest RC circuit 3
time constant by definition = ReqC
+ =
= ReqC =4Ωx1F=4 seconds
How about this?
= ReqCeq
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
My application I used an RC circuit in my paper.
Charging
a Capacito
r
Discharging a Capacitor
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Derivation(charging a capacitor)
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Department of Physics and Applied PhysicsPHYS.1440 Lecture 13 Danylov
Thank you
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A) R1
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Since all resistors are identical, the voltage drops are the sameacross the upper branch and the lower branch.
Thus, the potentials at points aand b are also the same. Therefore, no current flows.
ConcepTest Wheatstone BridgeA) lB) l/2C) l/3D) l/4E) zero
An ammeter A is connected between points a and b in the circuit below, in which the four resistors are identical. The current through the ammeter is:
I
V