I would also mention that English is not my first language. So, I would appreciate comments on how to better this text from that point of view. Thanks.
Here are the specific parameters of the formula:
Odd-even Type | This is the choice between the three corresponding original Barnsley formulas. |
Choices | First (default), Second, Third, Fourth, Fifth, Sixth, Real, Imag, Real*imag, Real+imag, Diff, Angle, Magnitude, Path, Iteration |
Comments | The First option corresponds to the Barnsley 1, the Second
to the Barnsley 2 and the Third to the Barnsley 3.
The Fourth, Fifth and Sixth options corresponds on fantasies on the first three ones. The other options are like following:
|
Odd-even Factor | This is a factor that must be applied to determine if we have an odd or even number. |
Choices | Ceil (default), Floor, Trunc, Round |
Comments | Only integer numbers may be odd or even and with fractals, numbers
have always a decimal part. So, we must remove this one and there are four
ways to do it: ceiling, flooring, truncating and rounding.
|
Apply Odd-even Sign? | By this option, we may ask to consider or not the sign of the number to be turned as an integer |
Choices | Enabled, Not enabled (default) |
Comments | Results of removing the decimal part are different if we take care of the sign or not. See above the examples for the four different ways to get an integer number. |
Seed | This is just a set of two numbers you may use to modify the formula in the Julia version. The meaning is purely mathematical. |
Choices | You may use any number. |
Comments | This number can be determined by using instead the Mandelbrot version and the switch mode. |
Starting Point | This is just a set of two numbers you may use to start the calculation in the Mandelbrot version. The meaning is purely mathematical. |
Choices | You may use any number. |
Odd-even Function | This is the function that can be applied. |
Choices | All the standard functions you may use in UF parameters. Default is ident, which means no function applied. |
The other parameters are part of the Epsilon Range Parameter Toolbox and the Bailout Parameters Toolbox.