List of applets
- Applet: Bacteria doubling (Animation, Interactive)
A bacteria population that doubles every time step illustrates a discrete dynamical system. - Applet: Fitting a linear model to bacteria population at next time step as a function of density
- Applet: Fitting a linear model to bacteria population at next time step as a function of density
- Applet: Bifurcation diagram using a cubic
- Applet: Bifurcation diagram using a quadratic
- Applet: Cartesian coordinates in the plane (Interactive)
Illustration of the Cartesian coordinates of a movable point - Applet: Cartesian coordinates of a point in three dimensions (Interactive)
Illustration of the Cartesian coordinates of a movable three-dimensional point - Applet: Three-dimensional Cartesian coordinate axes
A representation of the three axes of the three-dimensional Cartesian coordinate system. - Applet: The chain rule for linear functions (Interactive)
Illustration of the chain rule as giving the product of the slopes of linear functions. - Applet: The chain rule as multiplying slopes (Interactive)
Illustration of the chain rule as giving the product of the slopes of tangent lines. - Applet: Parallelepiped approximation underlying volume transformation calculation (Interactive)
To estimate the volume of a small box under a map, one can approximate the image of the box as a parallelepiped. - Applet: Volume transformation for change of variables in triple integrals (Interactive)
Illustration of how a change of variables map changes the volume and shape of a box. - Applet: Model of chemical pollution in a lake (Interactive)
Interactive plot of the evolution of chemical waste in a lake showing how the parameters influence the movement toward equilibrium. - Applet: Circling sphere in rotating vector field (Animation)
The circling motion of a sphere in a fluid flow demonstrates macroscopic circulation not curl. - Applet: Circling sphere in a vector field with zero curl (Animation)
The circling motion of a sphere in a fluid flow demonstrates macroscopic circulation even in a vector field with zero curl. - Applet: Cobwebbing by dragging points (Interactive)
- Applet: Cobweb function with n fixed points
- Applet: Cobweb graph
- Applet: Cobweb graph multiple
- Applet: Cobwebbing and linear approximations around equilibria (Interactive)
Using cobwebbing to visualize how a linear approximation to a function captures its behavior around equilibria.
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