Eigenvalues & Eigenvectorseasy
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Consider the discrete system xn+1=Axn\mathbf{x}_{n+1} = A\mathbf{x}_n where AA is diagonalizable with eigenvalues λ1=0.3\lambda_1 = 0.3, λ2=0.7\lambda_2 = -0.7, λ3=0.5\lambda_3 = 0.5. Starting from any nonzero initial vector x0\mathbf{x}_0, what happens as nn \to \infty?