Explores the dynamics of a simple pendulum and the intriguing Lorenz equations, highlighting sensitivity to initial conditions and the transition to chaos.
Explores the conservation of mechanical energy and stability of equilibrium points in dynamic systems, illustrated with examples like the mathematical pendulum and looping motion.
Explores reducing the Hodgkin-Huxley model to 2 dimensions by exploiting similarities between variables and discussing the nonlinear integrate-and-fire model.
