Frequency of a falling persons scream

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The discussion revolves around a physics problem involving the frequency of a scream from a person free-falling off a cliff. Part A is straightforward, but Part B presents challenges since the scream occurs while the person is falling, complicating the Doppler effect due to their acceleration. The key point is that the observer at the top hears screams that were emitted earlier, as sound takes time to travel. Participants express confusion about how the changing distance and speed of the falling person affect the frequency heard by the observer. The conversation highlights the intricacies of applying the Doppler effect in scenarios involving acceleration rather than constant velocity.
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Homework Statement


Someone is free falling off a cliff. 20 m below the clifftop they scream with a frequency f. a) What does a person standing at the top of the cliff hear? b) what will they hear when the person is 40 m below the cliff?


Homework Equations


f'=f(v+-v_d)/(v-+v_s)


The Attempt at a Solution



I have no problem whatsoever with part a, but our professor gave us part b to think about over the weekend and said it would likely be on our midterm that's coming up. I looked at it and at first thought it easy as well, but he pointed out that they started screaming at 20 m below, not at 40 m. So they have already been screaming for the last 20 m. I can't fathom what this does to the frequency though. Does anyone have any idea where to start on something like this?
 
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The person is falling at a faster speed at 40 meters than at 20 meters, because of gravity.
 
Yeah but my professor said it was a very tricky problem, and i feel like that is too obvious :S
 
The speed of the sound is about 340 m/s. The sound emitted at distance h needs t=h/340 m time to reach the observer. When the falling person is 40 m deep, the observer on the cliff top hears his earlier scream.

ehild
 
I thought of that too, but then wouldn't the answer to part A be the observer hears no sound since it technically hasn't traveled to him yet? So I feel like that isn't it. We took part A up in class so I know that's it.

I know the whole nature of the doppler equation comes from stuff moving away/towards each other at constant velocities, could the fact that the source is now accelerating make this different? But then what makes it different from Part A? This is why I posted here I am at a total loss of where to start on this.
 
Question a) does not refer to the time. It asks the frequency heard from the first scream - at any time.
Question b) asks the frequency of the scream heard at that time instant when the falling man is at 40 m depth. It is at t=sqrt(2h/g) s after he dropped from the cliff. But the sound heard that time instant came from an earlier stage of fall, when the man was at depth h'.

ehild
 
Ah actually you are right..I still feel like that's too simple though, I just wrote the question out by memory though. I'll double check and get back to you :)

Thanks for the quick replies
 
It is not that simple...

ehild
 

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