If eigen vectors are linearly dependent can we find diagonal matrix
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Step-by-step explanation:
If we can find n linearly independent eigenvectors for an n × n matrix A, then weknow the matrix is diagonalizable. ... So if A is similar to a diagonal matrix D (that is, if A is diagonalizable), then the eigenvalues of D must be the eigenvalues of A.
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If we can find n linearly independent eigenvectors for an n × n matrix A, then weknow the matrix is diagonalizable. ... So if A is similar to a diagonal matrix D (that is, if A is diagonalizable), then the eigenvalues of D must be the
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