Demonstrate the Cayley-Hamilton Theorem for the matrix A given below. 04-1 H A = -1 4 1 00 1 STEP 1: Find and expand the characteristic equation. STEP 2: Compute the required powers of A. STEP 3: Write a matrix version of the characteristic equation by replacing 2 with A. (Use I for the 3x3 identity matrix.) STEP 4: Substitute the powers of A into the matrix equation from step 3, and simplify. Is the matrix equation true? O Ves No

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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The Cayley-Hamilton Theorem states that a matrix satisfies its characteristic equation. For example, the characteristic equation of the matrix shown below is as follows.
x² - 6x + 11 = 0
1 -3
A =
2 5
and by the theorem you have
A² - 6A + 111₂ = 0
Demonstrate the Cayley-Hamilton Theorem for the matrix A given below.
0 4 -1
A = -1 4 1
00 1
STEP 1: Find and expand the characteristic equation.
STEP 2: Compute the required powers of A.
STEP 3: Write a matrix version of the characteristic equation by replacing with A. (Use I for the 3x3 identity matrix.)
STEP 4: Substitute the powers of A into the matrix equation from step 3, and simplify. Is the matrix equation true?
O Ves
O No
Transcribed Image Text:The Cayley-Hamilton Theorem states that a matrix satisfies its characteristic equation. For example, the characteristic equation of the matrix shown below is as follows. x² - 6x + 11 = 0 1 -3 A = 2 5 and by the theorem you have A² - 6A + 111₂ = 0 Demonstrate the Cayley-Hamilton Theorem for the matrix A given below. 0 4 -1 A = -1 4 1 00 1 STEP 1: Find and expand the characteristic equation. STEP 2: Compute the required powers of A. STEP 3: Write a matrix version of the characteristic equation by replacing with A. (Use I for the 3x3 identity matrix.) STEP 4: Substitute the powers of A into the matrix equation from step 3, and simplify. Is the matrix equation true? O Ves O No
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