How Does Increasing Damping Impact Resonance in Forced Vibrations?

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Poetria
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Homework Statement



x''+b*x'+k*x=k*y+b*y' y=cos(omega*t)

k is fixed, b - damping constant slowly increases.

How does increasing the damping constant b affect the resonance peak?

2. The attempt at a solution

Well, I thought the answers:
It significantly decreases the height of the resonant peak.
and
It significantly decreases the frequency at which resonance happens.
are correct.

I have found a useful resource - http://physicsnet.co.uk/a-level-physics-as-a2/further-mechanics/forced-vibrations-resonance/

But these answers were marked as wrong. I have no idea why. What have I missed? Is it possible that this option is correct: It does not significantly change the shape nor the location of the resonance peak.?
 
on Phys.org
Poetria said:
x''+b*x'+k*x=k*y+b*y' y=cos(omega*t)
This the literally rendered problem statement ? Why the funny expression on the righthand side ?
 
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Orodruin said:
I suspect there is a comma missing between y' and y.

Yes, a comma is missing. :( There is also a mathlet but of course I can't copy it.

I have got it right eventually. :)

Many thanks. :)
 
BvU said:
I suspect the idea is to look at x''+b*x'+k*x=y
with y=cos(omega*t)

Yes, exactly. You can also adjust omega with the mathlet.
 
BvU said:
I suspect the idea is to look at x''+b*x'+k*x=y
with y=cos(omega*t)
I strongly suspect that this is not the case and that the problem indeed wants a derivative of ##y## on the right-hand side along with the quoted constants, i.e.,
$$
x'' + b x' + kx = k \cos(\omega t) - b \omega \sin(\omega t).
$$
 
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Which would be relevant if ##b## is time dependent. Am I to interpret
Poetria said:
b - damping constant slowly increases.
as "find the steady state solution with ##b## constant and look at how the resonance peak depends on ##b## "?
 
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