This vector field visualization populates the domain with points on a uniform grid and then moves them through the field in the direction and speed indicated by the vector field at each point. Each point moves along a short path in the field and then starts over at its original position and repeats. Collectively, this action gives a good idea of the flow of the vector field. The dimensions of the space are $[-2,2]\times[-2,2]\times[-2,2]$. |
| Adjust Field: enter expression in $x$, $y$, and $z$ only, recognizes the usual functions, will crash if you enter incorrect syntax, click update button to use new field |
| $\mathbf{F}(x,y,z) = \langle$ , , $\rangle$ |
| Adjust Speed: slider will adjust the speed of the animation, even reverse it if you move left |
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