Laplace transforms: Critically Damped Motion: Difference between revisions
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<math>\text {k=4}\,</math> |
<math>\text {k=4}\,</math> |
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<math>\text { |
<math>\text {C=2}\,</math> |
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<math>\text {x(0)=0}\,</math> |
<math>\text {x(0)=0}\,</math> |
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<math>\dot{x}(0)=-3</math> |
<math>\dot{x}(0)=-3</math> |
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<math>\text {Standard equation: }\,</math> |
<math>\text {Standard equation: }\,</math> |
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<math>m\frac{d^2x}{dt^2}+C\frac{dx}{dt}+khx=0</math> |
<math>m\frac{d^2x}{dt^2}+C\frac{dx}{dt}+khx=0</math> |
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===Solving the problem=== |
===Solving the problem=== |
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<math>\mathcal{L}^{-1}[-\frac{3}{(s+4)^2}]</math><br /><br /> |
<math>\mathcal{L}^{-1}[-\frac{3}{(s+4)^2}]</math><br /><br /> |
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<math>\text {and we get}\,</math> |
<math>\text {and we get, by using the table of transforms on p. 515 of the text bokk}\,</math> |
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<math>\mathbf {x}(t)=-3te^{-4t}</math><br /><br /> |
<math>\mathbf {x}(t)=-3te^{-4t}</math><br /><br /> |
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<math>\text {A break point is located at any value where s = what is being added to it. }\,</math> |
<math>\text {A break point is located at any value where s = what is being added to it. }\,</math> |
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<math>\text {So for this transfer function its at s=4 (that is also the asymptotes location). }\,</math> |
<math>\text {So for this transfer function its at s=4 (that is also the asymptotes location). }\,</math> |
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<math>\text {The convolution equation is as follows: }\,</math> |
<math>\text {The convolution equation is as follows: }\,</math> |
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<math>\text {Not exactly the same but remember initial conditions arnt used}\,</math> |
<math>\text {Not exactly the same but remember initial conditions arnt used}\,</math> |
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=State Space= |
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<math>\text {Using state equatons is just another way to solve a system modeled by an ODE }\,</math> |
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<math>\text {First we need to add an applied force so u(t)=2N }\,</math> |
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<math>m=\frac{8}{32}=\frac1 4 slugs</math> |
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<math>\text {k=4}\,</math> |
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<math>\text {C=2}\,</math> |
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<math>\text {x(0)=0}\,</math> |
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<math>\dot{x}(0)=-3</math> |
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<math>\ddot{x}(0)=0</math> |
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<math>\begin{bmatrix} \dot{x} \\ \ddot{x} \end{bmatrix}=\begin{bmatrix} 0 & 1 \\ -k/m & -C/m \end{bmatrix} \begin{bmatrix} x \\ \dot{x} \end{bmatrix} + \begin{bmatrix} 0 \\ 1/m \end{bmatrix}u(t)</math> |
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Latest revision as of 15:58, 18 November 2009
Using the Laplace Transform to solve a spring mass system that is critically damped
Problem Statement
An 8 pound weight is attached to a spring with a spring constant k of 4 lb/ft. The spring is stretched 2 ft and rests at its equilibrium position. It is then released from rest with an initial upward velocity of 3 ft/s. The system contains a damping force of 2 times the initial velocity.
Solution
Things we know
Solving the problem
Apply the Initial and Final Value Theorems to find the initial and final values
- Initial Value Theorem
- Final Value Theorem
Applying this to our problem
Bode Plot of the transfer function
Transfer Function
Bode Plot
==Break Points and Asymptotes==
Convolution
State Space
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Written By: Mark Bernet
Error Checked By: Greg Peterson