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| Shape |
| Sequential |
| Parallel |
| Singularity |
| Strings |
| Magnification |
| Evolution |
| Similarity |
| Boundaries |
| Imaginary numbers |
| Gallary |
| About |
| Acknowledgements |
4D doesn't that mean time?
The answer depends on the observer.
In this case we do not include time but portray a choice from an infinte amount of parallel variations at the same place.
The Bristor Set
Parallel
The parallel variations of the [Mandelbrot set] are drawn by taking a series of rotated planes though a tube that pass the center axis. I have called them parallel from a visual perspective, by the fact that they are all generally the same shape, yet all unique bar for the exception when a plane is the planar axis. On these two planes, when i = 0 and j = 0 the Mandelbrot Set is drawn.
The parallel images are produce in the same manner as the [parallel planes], by taking a series of rotated planes that pass the center axis and using the 4th dimension to add depth to each plane. So each plane is the middle cross section of each image. I have called them parallel from a visual perspective, by the fact that they are all generally the same shape, yet all unique bar for the exception when a shape is drawn on the planar axis and therefore its values equals zero. These produce the [Bristor set].