In advanced linear algebra, one proves the Cayley Hamilton Theorem, which states that a square matrix A satisfies its 7 characteristic equation that is, if c0 c1 Icirc raquo c2 Icirc raquo 2 cn 1 Icirc raquo n 1 Icirc raquo n 0 is the characteristic equation of A, then c0I c1A c2A2 cn 1An 1 An 0 Verify this result for 013 10 001

Question: In advanced linear algebra, one proves the Cayley-Hamilton Theorem, which states that a square matrix A satisfies its 7. characteristic equation; that is, if c0

In advanced linear algebra, one proves the Cayley-Hamilton Theorem, which states that a square matrix A satisfies its 7. characteristic equation; that is, if
c0 + c1Î» + c2Î»2 + ˆ™ ˆ™ ˆ™ + cn-1Î»n-1 + Î»n = 0
is the characteristic equation of A, then
c0I + c1A + c2A2 + ˆ™ ˆ™ ˆ™ + cn-1An-1 +An = 0
Verify this result for

013 10 001

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