MathType - An nxn #matrix is non-diagonalizable if it has less than n linearly independent eigenvectors. The #Jordan normal (or canonical) form allows to obtain an almost diagonal matrix and is often
![linear algebra - Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange linear algebra - Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange](https://i.stack.imgur.com/QRfSr.png)
linear algebra - Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange
![Jordan Block Under what conditions a given matrix is diagonalizable ??? Therorem 1: REMARK: Not all nxn matrices are diagonalizable A similar to. - ppt download Jordan Block Under what conditions a given matrix is diagonalizable ??? Therorem 1: REMARK: Not all nxn matrices are diagonalizable A similar to. - ppt download](https://slideplayer.com/slide/13314021/80/images/4/Jordan+Normal+Form+Theorem+1%3A+Theorem+1%3A.jpg)
Jordan Block Under what conditions a given matrix is diagonalizable ??? Therorem 1: REMARK: Not all nxn matrices are diagonalizable A similar to. - ppt download
![SOLVED: 7.2 (Jordan normal form). Consider the matrix A = Compute the characteristic and minimal polynomial of A: (6) Is this matrix diagonalizable? If so diagonalize it, otherwise compute its Jordan normal SOLVED: 7.2 (Jordan normal form). Consider the matrix A = Compute the characteristic and minimal polynomial of A: (6) Is this matrix diagonalizable? If so diagonalize it, otherwise compute its Jordan normal](https://cdn.numerade.com/ask_images/c36bfdd793234d959445dad77d3679b1.jpg)
SOLVED: 7.2 (Jordan normal form). Consider the matrix A = Compute the characteristic and minimal polynomial of A: (6) Is this matrix diagonalizable? If so diagonalize it, otherwise compute its Jordan normal
![An Algorithm for Numerical Computation of the Jordan Normal Form of a Complex Matrix | Semantic Scholar An Algorithm for Numerical Computation of the Jordan Normal Form of a Complex Matrix | Semantic Scholar](https://d3i71xaburhd42.cloudfront.net/ff46541919062bf56109d396cfe3550ebea82054/16-Figure1-1.png)