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2 Given the matrix A, below, the system below has a nontrivial solution corresponding to the eigenvalue 0.8 -0.6 i. Solve the first equation for x₂ in terms of x₁, and from that produce the eigenvector y = eigenspace corresponding to λ=0.8 -0.6i. [...] -4+ i -1.6 -1.2 (-2.4+0.6 i)x₁ - 5.1 3.2 A = 1.2x₂ = 0 5.1x₁ + (2.4+0.6i)x₂ = 0 Solve the first equation, (-2.4+0.6i)x₁ -1.2x₂=0 for x₂ in terms of x₁. ix₁ 2 How is the eigenvector y obtained from the solution to the system? Select the correct choice below and fill in the answer box within your choice. x₂ = -2x₁ + O A. Since the system represents the matrix equation (0.8 -0.6 i)Ax=0, the solutions x₁ and x₂ are the components of an eigenvector of A, which is y when x₁ = ⒸB. Since the system represents the matrix equation [A-(0.8 -0.6 i)I]x=0, the solutions X₁ and x₂ are the components of an eigenvector of A, which is y when x₁ = OC. Since the system represents the matrix equation [I-(0.8 -0.6 i)A]x=0, the solutions x₁ and x₂ are the components of an eigenvector of A, which is y when x₁ = O D. Since the system represents the matrix equation Ax=0, the solutions x₁ and x₂ are the components of an eigenvector of A, which is y when x₁ = matrix A. Show that this y is a complex multiple of the vector v₁ -8-2i 17 which is a basis for the