Oscillator driving frequencies

AI Thread Summary
The discussion centers on the behavior of graphs depicting oscillation amplitude in relation to external frequency. It highlights that while some graphs start at zero, others, particularly those with constant force amplitude, do not. At low frequencies, the amplitude of oscillations approaches F/k, explaining why it does not drop to zero as frequency decreases. The conversation also notes that different plotting methods can represent various physical situations, affecting how frequency is depicted. Ultimately, the nature of the force applied influences the graph's starting point.
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I've attached a graph to this post. Why is it that the periodic external frequency applied never starts at 0 on graphs like these?
 

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It does start at 0 on the graph you posted.
##\omega_A## is the input frequency (or periodic external frequency). When ##\omega_A = 0##, the frequency ratio ##\omega_A\omega_0 = 0##.
 
Sorry my bad I meant the amplitude of the oscillations.
 
If the force has constant amplitude, at low frequencies the ##m\ddot x## term is small compared with the ##kx## term in the equation of motion, so the amplitude is approximately ##F/k##. That is why the amplitude doesn't go to 0 as the frequency goes to 0.

Note, these type of plots can be drawn in different ways, corresponding to different physical situations:

1. The force has constant amplitude, like your attachment
2. The force amplitude is proportional to the frequency
3. The force amplitude is proportional to the frequency squared (for example the unbalanced force on a rotating object)

You can also plot how the velocity, and acceleration of the system changes with frequency.

Most of those plots do go to 0 when the frequency is 0.
 
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