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In chapter 2.3.1
natural oscillations of the cantilever in the absence of external
forces are considered. In real systems there always takes place the
dissipation of energy. If energy losses are not compensated outside,
the oscillation will damp in time and eventually stop. Let us consider
the spring pendulum oscillations in a viscous medium.
The frictional
force acting on a body moving in a homogeneous viscous media depends
only on the velocity. At small velocities the frictional force can be
approximated as:
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(1) |
where  – constant positive factor.
Taking into account the frictional force (1), the motion equation of the spring pendulum instead of (1) in chapter 2.3.1 will be written as [1–3]:
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(2) |
where  – damping factor.
There are three types of the equation (2) solution:
- If
 (case of large resistance), the solution to equation (2) is given by
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|
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(3) |
where independent constants  and 
are determined from initial conditions. As can be seen, in this case
oscillations do not occur. Such motion regime is called the aperiodic.
- If
 , the solution to equation (2) is written as:
In this case, the character of
oscillations in the presence of the frictional force is described by a
periodic function with exponentially decreasing amplitude.
- In case
 , a critical damping takes place. Equation (2) solution reads:
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(5) |
where independent constants and are determined as before by initial conditions.
Fig. 1 shows the plot of the oscillation amplitude vs. time for different ratios between parameters  and  .
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Fig. 1. Dependence  for different ratios between natural frequency
and damping factor . |
Frequently, the "quality" of an oscillatory system is characterized by dimensionless parameter  called the quality- or Q-factor. It is proportional to the ratio between stored energy  and energy loss over the period  [3]:
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(7) |
where  – initial magnitude of the oscillator total energy. Then, in accordance with formulas (6) and (7)
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(8) |
 |
(6) |
In case of small damping ( ) the total energy as a function of time is:
Thus, the Q-factor
characterizes the rate of the energy transformation in a system. On the
other hand, by the order of magnitude the quality factor is nothing but
the number of a system oscillations over its characteristic damping
time  .
Notice that the Q-factor not only defines the oscillations damping but
is also an important quantity that determines parameters of forced
oscillations under external periodic force (see chapter 2.3.3).
Summary.
- In the presence of a frictional force, the type of natural oscillations is determined by the ratio between and . At aperiodic regime (3) takes place; at oscillations are periodic with exponentially decreasing amplitude (4); at the regime of critical damping (5) exists.
- The quality factor of an oscillating system is a very important parameter characterizing dissipative processes in a system.
References.
- S.E. Hikin. Mechanics. – Moscow: OGIZ, 1947. – 574 pp. (in Russian)
- D.V. Sivukhin. Mechanics. – Moscow: Nauka, 1989. – 576 pp. (in Russian)
- Carlov N.V., Kirichenko N.A. Oscillations, waves, structures. – Moscow: PHYSMATLIT, 2003. – 496 pp. (in Russian)
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