What is the resonant frequency of a plucked wire in a closed brass tube?

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The discussion revolves around calculating the resonant frequency of a plucked wire in a closed brass tube. Participants clarify the application of the formula f=nv/4L for the air column's frequency and f=nv/2L for the wire's frequency. There is confusion regarding the correct lengths and the calculation of the speed of sound in the string versus air. Ultimately, the correct approach involves recognizing the relationship between the frequencies of the wire and the air column due to resonance. The final calculations lead to a resolution of the problem, confirming the correct methodology for determining tension in the wire.
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Homework Statement



A brass tube of mass 23 kg and length 1.5 m is closed at one end. A wire of mass 9.9 g and length 0.39 meters is stretched near the open end of the tube. When the wire is plucked, it oscillates at its fundamental frequency. By resonance, it sets the air column in the tube oscillating at the column's fundamental frequency.

a) What is the frequency of oscillation of the air in the tube?

b) What is the tension in the wire?

Homework Equations



f=nv/4L

The Attempt at a Solution



I've been pretty much stuck on this one. When I asked my teacher, she wrote:

"A plucked wire in part (A) will oscillate at it's fundamental frequency. In f=nv/4L, you know v is the speed of sound in air, n=1, and they give you L. Plug n chug to get f."

I tried this and it didn't work, my answer was 219.8717Hz. And I plugging something in wrong?
 
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Which frequency were you looking for, frequency of the air column or frequency of the wire? Did you plug in the right number corresponding to that frequency? :)
(you have 2 lengths here!)
 
Oh I see! I put in the wrong length. So I did speed of sound divided by 4, divided by the length of the tube.

Now for part b I know the equation v=sqrt(T/mu).
I've always struggled with solving for mu. Is it M/L? Of what?
 
What do you think? Whose sound speed is that? :)
 
It's the string's...? So I'd use v=343m/s.
But when I solve using the string's mass divided by the string's length, it doesn't work.
 
v=343m/s? It's the speed of sound in the air. Be careful! :)
So how would you find sound speed of the string? Look at the problem again. You miss some important detail about the vibration of the string :)
 
Oh okay. So I see that it goes at it's fundamental frequency.
Do we use L=.25(lambda)? (We use the L from the string right? Or the tube?)
How do we get the velocity from that??
 
From the string of course, because you are finding the speed in the string.
L = 0.25 lambda = 0.25 v/f. You have L and f then you can solve for v. What do you think about f (frequency in the string)? How is it related to the frequency in the air column? Notice that the vibration in the air column is forced vibration - it is excited by the vibration of the string!
 
The frequencies are the same, right? Since the problem says, "By resonance, it sets the air column in the tube oscillating at the column's fundamental frequency"?

So for v I get .027288 m/s.
When I try plugging it into the equation v=sqrt(T/(M/L)), I get an incredibly small number (1.89e-5) that is incorrect. What the heck! What else could I possibly be missing?
 
  • #10
How did you calculate v?
 
  • #11
((length of string)/.25)*(Answer from part a) = v.
 
  • #12
Answer from part a: f = 57 Hz (did you get the same answer?)
Is f = nv/4L still right for the string? For the air in the tube, whose one end is closed and the other is open, the closed end is always a node and the open one is always an antinode. On the other hand, for the string whose both ends are firmly held, the two ends are always nodes. You see the difference? How would the equation be for the string? :)
 
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  • #13
Yes I did get that answer.
Oh, so for the string it's f=nv/2L, correct?
But when I plug this value into the same equation as above, it doesn't work.
 
  • #14
v = 44m/s, do you get the same answer?
 
  • #15
Yes!
I think I got it!
I did the frequency from a times 2 times the length of the string to get the velocity.
Then I plugged it into the equation v=sqrt(T/mu)!
Thanks!
 

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