Software Developed by math.tu-berlin.de
Taylor2d v.1.0
Study the Taylor equation with this simulation. Taylor2d help you visualize a Taylor equation in two dimensions. Taylor2d changes the perspective of a normal, three dimensional simulation to a 2D one.Requirements: *
Taylor v.1.0
Study the Taylor equation with this program. Taylor help you visualize and analyze the Taylor equation. This software will help you view a graph of the equation thus helping you with your studies.Requirements: *
Space Curve Explorer v.1.0
Study space curves with this tool. Space Curve Explorer allow users to explore space curves. Things are kept as easy as posible: you just enter the data and let this software compile them. Space Curve Explorer Features: 1. Specification by parametric
Planar Vortices v.1.0
Planar Vortices is a software that will help you investigate the planar vortex flow. Planar Vortices allows you to investigate the planar vortex flow. Random configurations: press the play button press "e", scale or move the image by dragging with
Planar Vector Fields v.1.0
Study planar vector fields with this simulation. Planar Vector Fields help you plot planar vector fields. All you have to do is enter the needed data and let this simulation compile them.Requirements: *
Planar String v.1.0
Explore the evolution of an elastic string moving in the plane. Planar String explore the evolution of an elastic string moving in the plane. Mathematically, it provides some insight into the dynamics of the wave equation. The motion of the string is
Pendulum v.1.0
Explore the evolution of a chain of elastically coupled pendulums. Pendulum allows you to explore the evolution of a chain of elastically coupled pendulums. Mathematically, it provides some insight into the dynamics of the Sine-Gordon equation. The
Minimal Surface Editor v.1.0
Construction of discrete minimal surfaces with boundary conditions. Minimal Surface Editor can construct discrete minimal surfaces from the combinatorics of their curvature lines.
Koebe Polyhedron Editor v.1.0
Construction of the Koebe polyhedron for a given 3-connected planar graph. For each combinatorial type of convex 3-dimensional polyhedra, there exists a unique representative with the following properties: All edges are tangent to the unit sphere.