Coupled Horizontal Spring Mass Oscillator: Difference between revisions

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</math>
</math>


<math>\text {So using maple i was able to obtain the eigenvalues and eigenvectors.}\,</math>
<math>\text {So using Maple I was able to obtain the eigenvalues and eigenvectors.}\,</math>


<math>\text {Eigenvalues.}\,</math>
<math>\text {Eigenvalues.}\,</math>
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<math>\ x=c_1</math><math>\begin{bmatrix}-1 \\-2\sqrt(10) \\1 \\2\sqrt(10)\end{bmatrix}\,</math><math>e^{2\sqrt{10}}+ c_2</math><math>\begin{bmatrix}-1 \\2\sqrt(10) \\1 \\-2\sqrt(10)\end{bmatrix}\,</math><math>e^{2*-2\sqrt{10}}+ c_3</math><math>\begin{bmatrix}1 \\2\sqrt(5) \\1 \\2\sqrt(5)\end{bmatrix}\,</math><math>e^{3*2\sqrt{5}}+ c_4</math><math>\begin{bmatrix}1 \\-2\sqrt(5) \\1 \\-2\sqrt(5)\end{bmatrix}\,</math><math>e^{4*-2\sqrt{5}}\,</math>
<math>\ x=c_1</math><math>\begin{bmatrix}-1 \\-2\sqrt(10) \\1 \\2\sqrt(10)\end{bmatrix}\,</math><math>e^{2\sqrt{10}}+ c_2</math><math>\begin{bmatrix}-1 \\2\sqrt(10) \\1 \\-2\sqrt(10)\end{bmatrix}\,</math><math>e^{2*-2\sqrt{10}}+ c_3</math><math>\begin{bmatrix}1 \\2\sqrt(5) \\1 \\2\sqrt(5)\end{bmatrix}\,</math><math>e^{3*2\sqrt{5}}+ c_4</math><math>\begin{bmatrix}1 \\-2\sqrt(5) \\1 \\-2\sqrt(5)\end{bmatrix}\,</math><math>e^{4*-2\sqrt{5}}\,</math>




==Solve with the Matrix exponential==
==Solve with the Matrix exponential==
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<math>\tilde{x}=\,</math><math>\begin{bmatrix}-1&-1&1&1 \\-2\sqrt(10)&2\sqrt(10)&2\sqrt(5)&-2\sqrt(5) \\1&1&1&1 \\2\sqrt(10)&-2\sqrt(10)&2\sqrt(5)&-2\sqrt(5)\end{bmatrix}\begin{bmatrix}e^{2\sqrt{10}t}&0&0&0 \\0&e^{-2\sqrt{10}t}&0&0 \\0&0&e^{2\sqrt{5}t}&0 \\0&0&0&e^{-2\sqrt{5}t}\end{bmatrix}</math><math>\begin{bmatrix}-.25&-.039528&.25&.039528 \\-.25&.039528&.25&-.039528 \\.25&.055902&.25&.055902 \\.25&-.055902&.25&-.055902\end{bmatrix}\tilde{x}(0)\,</math>
<math>\tilde{x}=\,</math><math>\begin{bmatrix}-1&-1&1&1 \\-2\sqrt(10)&2\sqrt(10)&2\sqrt(5)&-2\sqrt(5) \\1&1&1&1 \\2\sqrt(10)&-2\sqrt(10)&2\sqrt(5)&-2\sqrt(5)\end{bmatrix}\begin{bmatrix}e^{2\sqrt{10}t}&0&0&0 \\0&e^{-2\sqrt{10}t}&0&0 \\0&0&e^{2\sqrt{5}t}&0 \\0&0&0&e^{-2\sqrt{5}t}\end{bmatrix}</math><math>\begin{bmatrix}-.25&-.039528&.25&.039528 \\-.25&.039528&.25&-.039528 \\.25&.055902&.25&.055902 \\.25&-.055902&.25&-.055902\end{bmatrix}\tilde{x}(0)\,</math>


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Created By: Mark Bernet

Latest revision as of 19:32, 9 December 2009

Coupled Oscillator Spring Mass Oscillator: State Space

Problem Statement

Two 4 Kg Weights are suspended between two walls. They are connected by a spring between them with a spring constant k2. They are connected to the walls by two springs k1 and k3 with k1=k3. m1 is a distance x1 form m2 and m2 is x2 from the wall.


Solution

Things we know

=


=




,,,

Solve with the Matrix exponential



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Created By: Mark Bernet