Verify that ; is an eigenvalue of A and that x; is a corresponding eigenvector. 2...

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Verify that λ; is an eigenvalue of A and that x; is a corresponding eigenvector. 2₁ = 5, x₁ = (1, 0, 0) 22₂ = 3, x₂ = (1, 2, 0) 23 = 4, X3 = (-3, 1, 1) AX1 = A = Ax2 = 5 -1 4 0 3 1 I 0 04 5 -1 4 1 0 0 31 04 0 04 ↓ 1 5 -1 4 1 ~·B·0- 31 2 = Ax3 = 0 3 1 = 0 04 [1] - 5 0 = = 3 = 21x1 1 5 -1 4 -3 1 = -34- 1 = 22x2 -3 -41- = = 13x3 = Verify that λ; is an eigenvalue of A and that x; is a corresponding eigenvector. 2₁ = 5, x₁ = (1, 0, 0) 22₂ = 3, x₂ = (1, 2, 0) 23 = 4, X3 = (-3, 1, 1) AX1 = A = Ax2 = 5 -1 4 0 3 1 I 0 04 5 -1 4 1 0 0 31 04 0 04 ↓ 1 5 -1 4 1 ~·B·0- 31 2 = Ax3 = 0 3 1 = 0 04 [1] - 5 0 = = 3 = 21x1 1 5 -1 4 -3 1 = -34- 1 = 22x2 -3 -41- = = 13x3 =

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AT 1A2110 1A211 52 14 0 321 C 5 Eigen values 25 0 5x 3X 42004110 4 0 032 52 3242 0 0 5x 12... View the full answer