- #1
FaraDazed
- 347
- 2
This is not coursework; I am preparing for an exam and this question is from a past paper. We have access to past papers but we are not given the answers to them.
1. Homework Statement
Two waves are generated on a string of length 2m, to produce a three-loop standing wave with an amplitude of 2cm. The wave speed is 50m/s.
A: What is the resonant frequency of the wave in Hz.
B: If the equation for one of the waves is of the form y(x,t)=y_m \sin(kx+ \omega t) , what are the values of y_m , k and \omega for the second wave?
C: What is the sign in front of \omega for the second wave.
<br /> L=\frac{n \lambda}{2} \\<br /> k=\frac{2 \pi}{\lambda} \\<br /> v= \lambda f = \frac{\omega}{k} \\<br />
Other related equations
The question does not specify whether the ends are open or closed (fixed) so I am assuming they are both open ends.
A:
I have no come across the terminology "Three-loop" before but after searching the web I think it means the same thing as being in the third harmonic, if so then this is what I have done.
<br /> L=\frac{n \lambda}{2} \\<br /> 2=\frac{3 \lambda}{2} \\<br /> \lambda = (\frac{2}{3})(2) = \frac{4}{3}m \\<br /> f = \frac{v}{\lambda} = \frac{50}{4/3}=37.5Hz<br />
And that is the frequency of the third harmonic so the first harmonic would be 37.5/3=12.5 Hz
EDIT: I just noticed I didn't need to use n=3 and could have just done it with n=1 from the beginning. Why is there any need to tell me its in the third-harmonic?
B:
Bit unsure of part B, I think it may be a bit of a trick question as throughout the course we have only dealt with standing waves where the two constituent waves have the same magnitude of amplitude wave-number and angular frequency, only have the phases differed.
So if its a trick question and they're both the same then I think this part is no problem. Oh and for part C, wouldn't it be the opposite, i.e. it would be negative.
1. Homework Statement
Two waves are generated on a string of length 2m, to produce a three-loop standing wave with an amplitude of 2cm. The wave speed is 50m/s.
A: What is the resonant frequency of the wave in Hz.
B: If the equation for one of the waves is of the form y(x,t)=y_m \sin(kx+ \omega t) , what are the values of y_m , k and \omega for the second wave?
C: What is the sign in front of \omega for the second wave.
Homework Equations
<br /> L=\frac{n \lambda}{2} \\<br /> k=\frac{2 \pi}{\lambda} \\<br /> v= \lambda f = \frac{\omega}{k} \\<br />
Other related equations
The Attempt at a Solution
The question does not specify whether the ends are open or closed (fixed) so I am assuming they are both open ends.
A:
I have no come across the terminology "Three-loop" before but after searching the web I think it means the same thing as being in the third harmonic, if so then this is what I have done.
<br /> L=\frac{n \lambda}{2} \\<br /> 2=\frac{3 \lambda}{2} \\<br /> \lambda = (\frac{2}{3})(2) = \frac{4}{3}m \\<br /> f = \frac{v}{\lambda} = \frac{50}{4/3}=37.5Hz<br />
And that is the frequency of the third harmonic so the first harmonic would be 37.5/3=12.5 Hz
EDIT: I just noticed I didn't need to use n=3 and could have just done it with n=1 from the beginning. Why is there any need to tell me its in the third-harmonic?
B:
Bit unsure of part B, I think it may be a bit of a trick question as throughout the course we have only dealt with standing waves where the two constituent waves have the same magnitude of amplitude wave-number and angular frequency, only have the phases differed.
So if its a trick question and they're both the same then I think this part is no problem. Oh and for part C, wouldn't it be the opposite, i.e. it would be negative.
Last edited:
