The system does not have any equilibrium points.

If u(t)=1 for all t then the system has an equilibrium point at (x_1,x_2) = (1,1)

If u(t)=1 for all t then the system has an equilibrium point at (x_1,x_2) = (0,2)

If u(t)=0 for all t then the system has an equilibrium point at (x_1,x_2) = (1,1)

The eigenvalues are -3 and 1 and the system is not internally stable.

The eigenvalues are 1 + 2j and 1-2j and the system is not internally stable.

The eigenvalues are -1 + 2j and -1-2j and the system is not internally stable.

The eigenvalues are -1 + 2j and -1-2j and the system is internally stable.

G(s) = \frac{s}{(s+1)^2+1}

G(s) = \frac{s-2}{(s+1)^2+1}

G(s) = \frac{s}{(s-1)^2+1}

G(s) = \frac{s-2}{(s-1)^2+1}