129 lines
5.5 KiB
Markdown
129 lines
5.5 KiB
Markdown
---
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title: 26-forced-oscillations-under-friction
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---
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Forced oscillations under friction
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77
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The dissipative function itself has an important physical significance: it
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gives the rate of dissipation of energy in the system. This is easily seen by
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calculating the time derivative of the mechanical energy of the system. We
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have
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aL
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=
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Since F is a quadratic function of the velocities, Euler's theorem on homo-
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geneous functions shows that the sum on the right-hand side is equal to 2F.
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Thus
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dE/dt==2-2F,
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(25.13)
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i.e. the rate of change of the energy of the system is twice the dissipative
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function. Since dissipative processes lead to loss of energy, it follows that
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F > 0, i.e. the quadratic form (25.11) is positive definite.
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The equations of small oscillations under friction are obtained by adding
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the forces (25.8) to the right-hand sides of equations (23.5):
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=
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(25.14)
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Putting in these equations XK = Ak exp(rt), we obtain, on cancelling exp(rt),
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a set of linear algebraic equations for the constants Ak:
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(25.15)
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Equating to zero their determinant, we find the characteristic equation, which
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determines the possible values of r:
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(25.16)
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This is an equation in r of degree 2s. Since all the coefficients are real,
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its roots are either real, or complex conjugate pairs. The real roots must be
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negative, and the complex roots must have negative real parts, since other-
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wise the co-ordinates, velocities and energy of the system would increase
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exponentially with time, whereas dissipative forces must lead to a decrease
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of the energy.
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§26. Forced oscillations under friction
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The theory of forced oscillations under friction is entirely analogous to
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that given in §22 for oscillations without friction. Here we shall consider
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in detail the case of a periodic external force, which is of considerable interest.
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78
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Small Oscillations
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§26
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Adding to the right-hand side of equation (25.1) an external force f cos st
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and dividing by m, we obtain the equation of motion:
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+2*+wox=(fm)cos = yt.
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(26.1)
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The solution of this equation is more conveniently found in complex form,
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and so we replace cos st on the right by exp(iyt):
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exp(iyt).
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We seek a particular integral in the form x = B exp(iyt), obtaining for B
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the value
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(26.2)
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Writing B = exp(i8), we have
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b tan 8 = 2xy/(y2-wo2).
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(26.3)
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Finally, taking the real part of the expression B exp(iyt) = b exp[i(yt+8)],
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we find the particular integral of equation (26.1); adding to this the general
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solution of that equation with zero on the right-hand side (and taking for
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definiteness the case wo > 1), we have
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x = a exp( - At) cos(wtta)+bcos(yt+8)
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(26.4)
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The first term decreases exponentially with time, so that, after a sufficient
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time, only the second term remains:
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x = b cos(yt+8).
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(26.5)
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The expression (26.3) for the amplitude b of the forced oscillation increases
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as y approaches wo, but does not become infinite as it does in resonance
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without friction. For a given amplitude f of the force, the amplitude of the
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oscillations is greatest when y = V(w02-2)2); for A < wo, this differs from
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wo only by a quantity of the second order of smallness.
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Let us consider the range near resonance, putting y = wote with E small,
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and suppose also that A < wo. Then we can approximately put, in (26.2),
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22 =(y+wo)(y-wo) 22 2woe, 2ixy 22 2ixwo, SO that
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B = -f/2m(e-ii))wo
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(26.6)
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or
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b f/2mw01/(22+12),
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tan 8 = N/E.
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(26.7)
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A property of the phase difference 8 between the oscillation and the external
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force is that it is always negative, i.e. the oscillation "lags behind" the force.
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Far from resonance on the side < wo, 8 0; on the side y > wo, 8
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-77.
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The change of 8 from zero to - II takes place in a frequency range near wo
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which is narrow (of the order of A in width); 8 passes through - 1/2 when
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y = wo. In the absence of friction, the phase of the forced oscillation changes
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discontinuously by TT at y = wo (the second term in (22.4) changes sign);
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when friction is allowed for, this discontinuity is smoothed out.
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§26
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Forced oscillations under friction
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79
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In steady motion, when the system executes the forced oscillations given
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by (26.5), its energy remains unchanged. Energy is continually absorbed by
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the system from the source of the external force and dissipated by friction.
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Let I(y) be the mean amount of energy absorbed per unit time, which depends
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on the frequency of the external force. By (25.13) we have I(y) = 2F, where
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F is the average value (over the period of oscillation) of the dissipative func-
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tion. For motion in one dimension, the expression (25.11) for the dissipative
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function becomes F = 1ax2 = Amx2. Substituting (26.5), we have
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F = mb22 sin2(yt+8).
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The time average of the squared sine is 1/2 so that
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I(y) = Mmb2y2. =
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(26.8)
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Near resonance we have, on substituting the amplitude of the oscillation
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from (26.7),
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I(e) =
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(26.9)
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This is called a dispersion-type frequency dependence of the absorption.
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The half-width of the resonance curve (Fig. 31) is the value of E for which
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I(e) is half its maximum value (E = 0). It is evident from (26.9) that in the
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present case the half-width is just the damping coefficient A. The height of
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the maximum is I(0) = f2/4mx, and is inversely proportional to . Thus,
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I/I(O)
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/2
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€
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-1
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a
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FIG. 31
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when the damping coefficient decreases, the resonance curve becomes more
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peaked. The area under the curve, however, remains unchanged. This area
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is given by the integral
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[ ((7) dy = [ I(e) de.
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Since I(e) diminishes rapidly with increasing E, the region where |el is
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large is of no importance, and the lower limit may be replaced by - 80, and
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I(e) taken to have the form given by (26.9). Then we have
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"
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(26.10)
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80
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Small Oscillations
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