Figure 1From: Hopf bifurcation and chaos control for a Leslie–Gower type generalist predator modelThe trajectories and graphs of system (1.3) with \(\tau =0\), where \(w_{1}=1.4\), \(w_{2}=5\), \(w_{3}=8\), \(w_{4}=1\), \(w_{5}=0. 16\), \(w_{6}=0. 1\), \(w_{7}=0. 1\), \(w _{8}=0. 5\), \(w_{9}=8\), \(w_{10}=8\). System (1.3) has a chaotic attractorBack to article page