Question: In MATLAB 3. One famous nonlinear dynamical system has a infinite set of points that solutions approach instead of a handful of equilibrium points. Known

In MATLAB

3. One famous nonlinear dynamical system has a infinite set of points that solutions approach instead of a handful of equilibrium points. Known as the Lorenz butterfly, this system is x' 10(y - x) y' = x(28-2)-y z' = xy-82/3 Use ode45 and plot3 to graph solutions to this system from three different initial conditions. generated by the equations

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