![MathType on X: "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 MathType on X: "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](https://pbs.twimg.com/media/EvnYO45XEAIQSvt.jpg:large)
MathType on X: "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
![5.IV. Jordan Form 5.IV.1. Polynomials of Maps and Matrices 5.IV.2. Jordan Canonical Form. - ppt download 5.IV. Jordan Form 5.IV.1. Polynomials of Maps and Matrices 5.IV.2. Jordan Canonical Form. - ppt download](https://images.slideplayer.com/16/5181908/slides/slide_13.jpg)
5.IV. Jordan Form 5.IV.1. Polynomials of Maps and Matrices 5.IV.2. Jordan Canonical Form. - ppt download
![jcf examples.pdf - The Jordan Canonical Form Examples Example 1: Given A = 0 1 1 2 find its JCF and P . 1 1 J = . 0 1 chA t = t 1 2 Here: A 1 = | Course Hero jcf examples.pdf - The Jordan Canonical Form Examples Example 1: Given A = 0 1 1 2 find its JCF and P . 1 1 J = . 0 1 chA t = t 1 2 Here: A 1 = | Course Hero](https://www.coursehero.com/thumb/f7/08/f708d1c2d8671b68330dcd7321058b4bff66f61b_180.jpg)