Question: (1 point) Consider the differential equation dx = Ax(t) dt where A is a given matrix. Determine whether the equilibrium (0, 0) is a stable

(1 point) Consider the differential equation dx = Ax(t) dt where A is a given matrix. Determine whether the equilibrium (0, 0) is a stable node (sink), an unstable node (source), or a saddle point. -15 -1 A = -15 The equilibrium (0, 0) is a ? C 13 -3 A = - 3 13 The equilibrium (0, 0) is a ? C A The equilibrium (0, 0) is a ? C

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