One can solve the critical point. To do so we need to solve the system\({\bf{x}}'{\bf{ = 0,y}}'{\bf{ = 0}}\), so one has

\(\begin{array}{c}{\bf{0 =  - 2x - y}}\\{\bf{0 = 3x - y}}\end{array}\)

The first equation gives us that\({\bf{y =  - 2 x}}\), so substituting this into the second equation one gets that\({\bf{5 x = 0}}\).

So, one has that \({\bf{x = 0, y = 0}}\) and the critical point is\(\left( {{\bf{x, y}}} \right){\bf{ = }}\left( {{\bf{0,0}}} \right)\).

Comparing this picture with the Figure \({\bf{5}}{\bf{.12}}\) in the Textbook one can conclude that the critical point \(\left( {{\bf{0,0}}} \right)\) is an asymptotically stable spiral point.