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Eigenvalues and Eigenvectors - MIT Mathematics

Chapter 6 Eigenvalues and Introduction to EigenvaluesLinear equationsAxDbcome from steady state problems. Eigenvalues have their greatestimportance indynamic problems. The solution ofdu=dtDAuis changing with time growing or decaying or oscillating. We can t find it by elimination . This chapter enters anew part of linear algebra, based onAxD x. All matrices in this chapter are good model comes from the powersA; A2;A3;:::of a matrix. Suppose you need thehundredth powerA100. The starting matrixAbecomes unrecognizable after a few steps,andA100is very close to :6 :6I:4 :4 : :8 :3:2 :7 :70 :45:30 :55 :650 :525:350 :475 :6000 :6000:4000 :4000 AA2A3A100A100was found by using theeigenvaluesofA, not by multiplying 100 matrices .

growing or decaying or oscillating. We can’t find it by elimination. This chapter enters a new part of linear algebra, based on Ax D x. All matrices in this chapter are square. A goodmodel comesfrom the powers A;A2;A3;:::of a matrix. Supposeyou need the hundredth power A100. The starting matrix A becomes unrecognizable after a few steps,

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  Elimination, Matrices, Eigenvalue

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Transcription of Eigenvalues and Eigenvectors - MIT Mathematics

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