Considers a dynamic system continuous over time: do 2) dat (0-2)2 f() = -2()e 202 Where f (.) Defines the vector field, i.e., to each point in the state space it assigns a vector f($) For each of the vector fields, investigate the influence of the parameters on the qualitative behavior of the solution x(t) when t-> Calculate the fixed points (or equilibrium points) of the system. ii) Determine the stability of the fixed points. iii) Draw the different possible phase portraits. iv) Draw the bifurcation diagram (s). What or what points of bifurcation? v) Classify the type of fork