Below is a phase portrait for a linear system of the form x = Ax, where A is a 2

Question

Below is a phase portrait for a linear system of the form x = Ax, where A is a 2 times 2 mat From the phase portrait, we can conclude that the eigenvalues r1 and r2 of A are . . . both real, distinct, and positive. both real, distinct, and negative. both real and have opposite signs. complex and have positive real part. complex and have with real part equal 0. complex and have negative real part. In the phase portrait from the previous problem, the equilibrium point (0,0) is a ... center. fundamental point. node. saddle point. spiral point.

Explanation / Answer

1 d 2 b

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