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trautlein
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Homework Statement
I am trying to figure out the equation to represent the motion of a weighted car attached to an ideal spring that is on an inclined plane (represented by Figure 1. Note, the car in my problem is attached to a spring , whereas in that picture it is attached to a string.)
Using a motion detector and the program Logger Pro, I graphed the position function of the car against time and got the graph that is represented here in Figure 2.
For my equations I determined that my initial amplitude was .1145 by taking maximum and minimum values of the hight of two points of the sinusoidal function.
In an earlier experiment we had determined the 'k' value of the spring to be 27.43, giving me an [tex]\omega_{0}[/tex] value of 4.278.
The mass of my car is 1.499kg.
Homework Equations
For my equation I was using a [tex]\tau[/tex] of 1.69 calculated from the [tex]\omega_{0}[/tex]
[tex]\tau\,=\frac{m}{b}[/tex]
The Attempt at a Solution
I have tried to fit the curve using the curve fitter in Logger Pro, however none of the equations match mine, and when I try to define a function the program says:
I am assuming that the position function will be given by [tex]x(t)=A^{2}_{0}\ast\,e^{-t/\tau}\astcos(\omega\,t+\delta)[/tex]
This is assuming that [tex]\tau\,=\frac{m}{b}[/tex]
This is the equation that I am trying to find and get to fit to my graph.
Does [tex]\textbf{F}\,_{d}\,=-bv[/tex] ?
Is there anyway that we can graph the theoretical position with the variables that we have here?
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