Math, asked by viveksinghal3950, 11 months ago

A matrix is diagonalizable if and only if it has linearly independent eigen vector

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Answered by armansinghdhaliwal60
0

Answer:

If the eigenvalues of A are all distinct, their corresponding eigenvectors are linearly independent and therefore A is diagonalizable. It is possible for a matrix A to have n linearly independent eigenvectors while it has eigenvalues with multiplicities grater than one.

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