Is there any 2x2 matrix with all non-zero entries, that is not diagonalizable but invertible? If not, why can't there be one?
Is there any 2x2 matrix with all non-zero entries, that is not diagonalizable but invertible? If not, why can't there be one?
Chapter7: Systems Of Equations And Inequalities
Section7.6: Solving Systems With Gaussian Elimination
Problem 4SE: Can a matrix whose entry is 0 on the diagonal be solved? Explain why or why not. What would you do...
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Is there any 2x2 matrix with all non-zero entries, that is not diagonalizable but invertible?
If not, why can't there be one?
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