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Mass on a Spring

Consider a mass m on a spring with spring constant k, as shown in Fig. 3.5. In addition to the spring force acting on the mass (-kx), we will also assume that dissipative forces act on the mass. These dissipative forces could be generated within the spring itself, or due to the fluid through which the mass moves. We will assume that the dissipative forces can be written as tex2html_wrap_inline360 where v is the velocity of the mass.

   


Figure: Mass on a spring

We can write F=ma for the mass:

  eqnarray5

This is a second order differential equation whose general solution should have two functions with two arbitrary constants. We can solve by rewriting Eq. (3.2) as follows:

  equation19

where the operator tex2html_wrap_inline366 acts on all terms to the right of it. The general solution of Eq. (3.3) is the sum of solutions obtained from setting the result of each of each first order operation on x equal to zero.

We can set tex2html_wrap_inline370 and tex2html_wrap_inline372 giving:

eqnarray64

which gives for x(t):

  equation70

Clearly q can be complex (for example, take b=0, corresponding to the case where there is no damping). We can distinguish three different regimes for different possible values of q

  1. Overdamped (q real > 0)
    Here x(t) is a decaying function of time with two different decay time constants: tex2html_wrap_inline388 and tex2html_wrap_inline390. tex2html_wrap_inline392 and tex2html_wrap_inline394 are determined by the intial conditions (such as position and velocity). For example, if the initial velocity is zero, then tex2html_wrap_inline396 (you should check this) and tex2html_wrap_inline398.

  2. Critically Damped (q real = 0)
    Here q=0. Since the two first order equations are the same, they only give one function and constant. Since we need two independent functions and constants to satisfy possible boundary conditions we return to the original equation with q=0.

    equation80

    We substitute

    displaymath212

    giving

    eqnarray88

    Integrating both sides with respect to time gives

    eqnarray101

  3. Underdamped (q imaginary)
    With q imaginary, we can write tex2html_wrap_inline414 where

    displaymath220

    where tex2html_wrap_inline418 would be the oscillation frequency of the system in the absence of damping.

    We can rewrite the general solution [Eq. (3.8)] for x(t):

    eqnarray113

    but x is real (after all it is the position of an object), therefore tex2html_wrap_inline424 (x equals its complex conjugate). This gives:

    displaymath232

    Therefore:

    eqnarray123

    We can write

    eqnarray129

    giving:

    eqnarray137


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Next: Experiment Up: Damped Harmonic Motion Previous: Damped Harmonic Motion