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Description
Playing with the exponent in my compass formula, z -> z^d - da^(d-1) z. See my journal Fractal CompassesNow, my dear readers, I wanna promote the article,
27) Compasses
in my Chaotic series. Along with this journal there are four deviations uploaded,
Compass_d=2
Compass_d=3
Compass_d=4
Compass_d=5
The “d” is the exponent in the iterated polynom p(z) = z^d - da^(d-1) z, the a-plane plotted and “z” initialized to the critical point z = +a. Why this formula is called the “Compass formula”? Well, just look at the above deviations, especially for d = 3 and higher For d = 3 we actually have z^3 - 3a^2 z whic
The exponent "d" in this motive is set to 0.875+0.005i, the added 0.005 to the imaginary making the spiralling effect

Also playing with Diff-bailout coloring 1-periodig components according to the number of iterations required to take the variable to a fix point.
This routine in htese images also give rise to artifacts which is used by me in these images, the artifacts depending of the Dbailout ..

Software: Ultra Fractal.
Formula: Extended Compasses (adding a parameter "b". the full parameter space becoming a four dimensional hyper space).

TryingToSpiralItself {
fractal:
title="Trying to Spiral Itself" width=800 height=600 layers=1
credits="Ingvar Kullberg;5/31/2019"
layer:
caption="Background" opacity=100 method=multipass
mapping:
center=-9.472525288149521601e-11/2.2427201109859011775e-11
magn=6.8431697E9
formula:
maxiter=10000 percheck=off filename="ik3.ufm"
entry="ExtendedCompasses" p_exponent=0.875/0.005
p_PlottedPlane="1.(a-real,a-imag)" p_hide=yes p_areal=0.0
p_aimag=0.0 p_breal=0.0 p_bimag=0.0 p_xrot=0.0 p_yrot=0.0
p_xrott=0.0 p_yrott=0.0 p_zrot=0.0 p_LocalRot=no p_diff=yes
p_bailout=10000000 p_dbailout=1E-21
inside:
transfer=none
outside:
density=0.1 transfer=linear
gradient:
smooth=yes rotation=-125 index=5 color=16579582 index=14
color=3026462 index=54 color=223 index=72 color=255 index=-249
color=57075 index=-38 color=16777212 index=-7 color=1709847
opacity:
smooth=no index=0 opacity=255
}

Description
Playing with the exponent in my compass formula, z -> z^d - da^(d-1) z. See my journal Fractal CompassesNow, my dear readers, I wanna promote the article,
27) Compasses
in my Chaotic series. Along with this journal there are four deviations uploaded,
Compass_d=2
Compass_d=3
Compass_d=4
Compass_d=5
The “d” is the exponent in the iterated polynom p(z) = z^d - da^(d-1) z, the a-plane plotted and “z” initialized to the critical point z = +a. Why this formula is called the “Compass formula”? Well, just look at the above deviations, especially for d = 3 and higher For d = 3 we actually have z^3 - 3a^2 z whic
The exponent "d" in this motive is set to 0.875+0.005i, the added 0.005 to the imaginary making the spiralling effect

Also playing with Diff-bailout coloring 1-periodig components according to the number of iterations required to take the variable to a fix point.
This routine in htese images also give rise to artifacts which is used by me in these images, the artifacts depending of the Dbailout ..

Software: Ultra Fractal.
Formula: Extended Compasses (adding a parameter "b". the full parameter space becoming a four dimensional hyper space).

TryingToSpiralItself {
fractal:
title="Trying to Spiral Itself" width=800 height=600 layers=1
credits="Ingvar Kullberg;5/31/2019"
layer:
caption="Background" opacity=100 method=multipass
mapping:
center=-9.472525288149521601e-11/2.2427201109859011775e-11
magn=6.8431697E9
formula:
maxiter=10000 percheck=off filename="ik3.ufm"
entry="ExtendedCompasses" p_exponent=0.875/0.005
p_PlottedPlane="1.(a-real,a-imag)" p_hide=yes p_areal=0.0
p_aimag=0.0 p_breal=0.0 p_bimag=0.0 p_xrot=0.0 p_yrot=0.0
p_xrott=0.0 p_yrott=0.0 p_zrot=0.0 p_LocalRot=no p_diff=yes
p_bailout=10000000 p_dbailout=1E-21
inside:
transfer=none
outside:
density=0.1 transfer=linear
gradient:
smooth=yes rotation=-125 index=5 color=16579582 index=14
color=3026462 index=54 color=223 index=72 color=255 index=-249
color=57075 index=-38 color=16777212 index=-7 color=1709847
opacity:
smooth=no index=0 opacity=255
}