STAT 309: MATHEMATICAL COMPUTATIONS I FALL 2013 LECTURE 5 1. Jordan canonical form • if A is not diagonalizable and we want so
![SOLVED: Suppose N L(FG is nilpotent and with respect to the standard basis v1, 02, U3, V4, U5, V6 we have M(N) Find a Jordan basis for N. Let T € C(V) SOLVED: Suppose N L(FG is nilpotent and with respect to the standard basis v1, 02, U3, V4, U5, V6 we have M(N) Find a Jordan basis for N. Let T € C(V)](https://cdn.numerade.com/ask_images/89f994bceac3480c99e7f3055b798e4a.jpg)
SOLVED: Suppose N L(FG is nilpotent and with respect to the standard basis v1, 02, U3, V4, U5, V6 we have M(N) Find a Jordan basis for N. Let T € C(V)
![SOLVED: Determine the Jordan canonical form of the following linear operator for each 3x3 matrix For each matrix; find a basis g such that [TIf is in Jordan canonical form: Suppose the SOLVED: Determine the Jordan canonical form of the following linear operator for each 3x3 matrix For each matrix; find a basis g such that [TIf is in Jordan canonical form: Suppose the](https://cdn.numerade.com/ask_images/50cfd4a459c6491a882b8e4f8f142646.jpg)
SOLVED: Determine the Jordan canonical form of the following linear operator for each 3x3 matrix For each matrix; find a basis g such that [TIf is in Jordan canonical form: Suppose the
![Week 41 - LinAlg - 2.III Basis and Dimension - <77neurons-Project Perelman> A Mathematics Project by Jad Nohra and Tom Lahore Week 41 - LinAlg - 2.III Basis and Dimension - <77neurons-Project Perelman> A Mathematics Project by Jad Nohra and Tom Lahore](https://sites.google.com/site/77neuronsprojectperelman/_/rsrc/1360278066592/retired/weeks/3-linear-algebra-by-hefferon-weeks-32-present-abstractions-better-brains-better-attitude-and-methods-less-baby-sitting/week-41---linalg---2-iii-basis-and-dimension/Screen%20shot%202012-01-15%20at%203.14.26%20PM.png?height=253&width=400)
Week 41 - LinAlg - 2.III Basis and Dimension - <77neurons-Project Perelman> A Mathematics Project by Jad Nohra and Tom Lahore
![SOLVED: Problem 1: The matrix -2 -2 1 A = 5 -2 -3 2 5 -2 -4 3 has the characteristic polynomial t(t 1)3. 1) Find a Jordan basis of A. Find the Jordan normal form of A and the minimal polynomial of A SOLVED: Problem 1: The matrix -2 -2 1 A = 5 -2 -3 2 5 -2 -4 3 has the characteristic polynomial t(t 1)3. 1) Find a Jordan basis of A. Find the Jordan normal form of A and the minimal polynomial of A](https://cdn.numerade.com/ask_images/fdde8b2730cd4a948f49aa863cd37bf3.jpg)
SOLVED: Problem 1: The matrix -2 -2 1 A = 5 -2 -3 2 5 -2 -4 3 has the characteristic polynomial t(t 1)3. 1) Find a Jordan basis of A. Find the Jordan normal form of A and the minimal polynomial of A
4.10.3 A real algorithm for finding the real Jordan form Referring to the last example, if we write Z = [ A I4 −I4 A ], then Z
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