The discussion revolves around estimating the natural frequency (ωn) and damping ratio (ζ) from the magnitude and phase plot of an atomic force microscope (AFM). Participants explore methods for deriving these values, including the use of -3dB bandwidth and the characteristics of underdamped systems.
Participants generally agree on the approach to estimate ωn and ζ from the phase and magnitude plots, but there are differing views on the specifics of the calculations and the implications of the phase behavior, indicating that the discussion remains unresolved.
Some assumptions about the system's behavior, such as its underdamped nature and the modeling as a second-order system, are present but not universally accepted. The relationship between Q, ζ, and the -3dB bandwidth is discussed but not fully clarified.
NascentOxygen said:
Because the system is so underdamped, the natural frequency is practically equal to the frequency where the response peaks. (Which looks suspiciously co-incident with that 90° crossing on the phase plot, though off-hand I can't say that's right.) I suppose you are approximating this to a second-order system?Loppyfoot said:
NascentOxygen said:
Most likely. Though there is an equation relating frequency at the peak and ζ back to Ѡn if you really wanted to be precise.Loppyfoot said: