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Introductory Physics Homework Help
Finding the directions of eigenvectors symmetric eigenvalue problem
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[QUOTE="Andrew1235, post: 6467527, member: 687476"] [B]Homework Statement:[/B] In the symmetric eigenvalue problem, K~v=w2v where K~=M−1/2KM−1/2, where K and M are the stiffness and mass matrices respectively. [B]Relevant Equations:[/B] K~v=w2v where K~=M−1/2KM−1/2 In the symmetric eigenvalue problem, Kv=w^2*v where K~=M−1/2KM−1/2, where K and M are the stiffness and mass matrices respectively. The vectors v are the eigenvectors of the matrix K~ which are calculated as in the example below. How do you find the directions of the eigenvectors? The negatives of the eigenvectors of a matrix are also eigenvectors of the matrix. [/QUOTE]
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Introductory Physics Homework Help
Finding the directions of eigenvectors symmetric eigenvalue problem
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