The Cayley-Hamilton Theorem states that every square matrix satisfies its characteristic equation; that is, if M is an nxn matrix whose characteristic equation is 2" +c,a"- +L c„A+c, = 0, then M" +c,M" +L C„-M +c, = 0 . Verify the Cayley-Hamilton Theorem for the following matrix. -B 1 A M =| 0 -1 C 0 0

Course: Linear Algebra

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Question:

Consider these Values: A=32

B= 15 and C= 17  for Metrix A,B,C

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The Cayley-Hamilton Theorem states that every square matrix satisfies its characteristic equation; that is, if M is an nxn matrix whose characteristic equation is 2" +c,a"- +L c„A+c, = 0, then M" +c,M" +L c„-M +c, = 0 . Verify the Cayley-Hamilton Theorem for the following matrix. A -B M = 0 -1 C 0 0