V.2 No 1 |
55 |
On complex resonance vibration
systems calculation |
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We see
from (17) and (18) that both parameters K and input have the amplitude K , input and phase K , input parts, and for
different bands of g
variation they differ. In Figures 4 and 5 the typical form of these parameters is shown
for the case when the resonance subsystems contained 10 elastically connected bodies each.
To visualise, under each plot we give the scale of regimes corresponding to the conditions
(17) and (18). It is seen clearly that all these regularities consist of sequentially
alternating regions of the above regimes. All the resonance peaks locate at frequencies
higher than critical for an elastic system as a whole, i.e. higher than the frequency
before which we can consider the system, disregarding the substructure of its elements.
With variation from zero
to the first maximum, the input resistance falls from F0/2s g
to zero. But practically, at this entire band the transfer function modulus is equal to
unity. At frequencies exceeding the boundary frequency for the system as a whole, in
simple models the aperiodical regime of antiphase damping vibrations is usually expected,
but when taking the substructure into account, we see a resonance peaks succession. Each
peak for the parameter K is formed at the joints of aperiodical and complex
aperiodical vibration regimes, and for input at the joints of complex aperiodical and
periodical vibration regimes. The number of these peaks depends on the subsystem size and
is equal to the integer part of the value [(n 1)/2]. This last is determined
by the denominator of the first expression of (7). |
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