![SOLVED: Help me in Matlab!!! The well-known van der Pol oscillator is the unforced second-order nonlinear differential equation shown below: (1 - du/dt) + a*u = 0 The solution of this equation SOLVED: Help me in Matlab!!! The well-known van der Pol oscillator is the unforced second-order nonlinear differential equation shown below: (1 - du/dt) + a*u = 0 The solution of this equation](https://cdn.numerade.com/ask_images/c0fdd8c1898d4925a3533b98e455fb79.jpg)
SOLVED: Help me in Matlab!!! The well-known van der Pol oscillator is the unforced second-order nonlinear differential equation shown below: (1 - du/dt) + a*u = 0 The solution of this equation
![SOLVED: Simulate the van der Pol equation using (a) Matlab (or Python) and (b) Simulink: (d^2y)/(dt^2) + a(y^2 - 1)(dy)/(dt) + y = 0 Assume that y(0) = 0.1 and 0 < SOLVED: Simulate the van der Pol equation using (a) Matlab (or Python) and (b) Simulink: (d^2y)/(dt^2) + a(y^2 - 1)(dy)/(dt) + y = 0 Assume that y(0) = 0.1 and 0 <](https://cdn.numerade.com/ask_images/208f4d3944534a218021edb006532074.jpg)
SOLVED: Simulate the van der Pol equation using (a) Matlab (or Python) and (b) Simulink: (d^2y)/(dt^2) + a(y^2 - 1)(dy)/(dt) + y = 0 Assume that y(0) = 0.1 and 0 <
![Van Der Pol Nonlinear System Phase Plane and Flow, Euler's Method Approximation with Mathematica - YouTube Van Der Pol Nonlinear System Phase Plane and Flow, Euler's Method Approximation with Mathematica - YouTube](https://i.ytimg.com/vi/gGHUc5Z6GEc/maxresdefault.jpg)
Van Der Pol Nonlinear System Phase Plane and Flow, Euler's Method Approximation with Mathematica - YouTube
![Mathematics | Free Full-Text | Design of a New Chaotic System Based on Van Der Pol Oscillator and Its Encryption Application Mathematics | Free Full-Text | Design of a New Chaotic System Based on Van Der Pol Oscillator and Its Encryption Application](https://pub.mdpi-res.com/mathematics/mathematics-07-00743/article_deploy/html/images/mathematics-07-00743-g001.png?1566916260)