; Date: Mon, 02 Nov 2009 16:32:03 -0500 ; From: Jim Muth ; Subject: [Fractint] FOTD 02-11-09 (The Root Has It [No Rating]) ; Id: <1.5.4.16.20091102163519.2abf6b62@pop.mindspring.com> ; --------- ; ; FOTD -- November 02, 2009 (No Rating) ; ; Fractal visionaries and enthusiasts: ; ; Another late fractal. I'm still getting caught up. ; ; Today's image lies in the parent fractal that results when the ; formula Z^sqrt(2)+C is calculated a whopping 4321 levels up the ; logarithmic ladder, a level I chose purely on a whim. ; ; It is an unusually good image for such a low exponent of Z. ; ; Since the image was found in a hurry, I could not give it a ; rating, but the calculation time of under 2 minutes means that ; no one will have wasted much time if the image turns out to be ; disappointing. ; ; The name "The Root Has It" came to mind as soon as I shut down my ; brain, (which I am told takes very little effort). ; ; To see the rather dark image, either run the included parameter ; file or visit the FOTD web site at: ; ; ; ; Monday here at Fractal central featured sunny skies, a ; temperature of 57F 19C, and happy cats. My day was quite busy, ; but I still managed a fast FOTD. The next FOTD is due in about ; 6 hours. Check then, but do not be disappointed if it is late. ; Until next FOTD, take care, and be happy in your fractal work. ; ; ; Jim Muth ; jamth@mindspring.com ; jimmuth@aol.com ; ; ; START PARAMETER FILE======================================= The_Root_Has_It { ; time=0:01:58.84-SF5 on P4-2000 reset=2004 type=formula formulafile=allinone.frm formulaname=MandelbrotBC2 center-mag=+0.8737443818\ 611416/-1.340159768589525/9.624077e+009/1/87.5/0 params=1.414213562373/0/4321/0 float=y maxiter=1500 inside=0 logmap=241 periodicity=10 colors=0009AZ7AZ4AZ2AZ0AZ3AY0AW3AV5AT7AS9AQABPCCND\ DMEELGDIHCGJBDK9BL89N76L64K02F0IzzfUU1LI5OK9SNDWPH\ _SLbUPfXTkZXoa`tcdxfhzhlzjpzeltaipYfnTcjP`eLX`HUWC\ RT8OR4LP0II1NG2SF3X84a24e47f5Af6CfAFfFIfKGePEbUPfZ\ RccT`hVYmXVrZSv`PzaMvdWrgeminhhjchfZgcVf_SeXQdTNbQ\ LYMIVJFRFDRCAQ88P58PB8PH8QM8RS8SY8Tb8Zh8cn8ds9er9f\ s9fv9gx9hz9hzAizAizAjzAkzAkzAlzAlvBjrBhmCghCezDdzD\ bzEazE_zFZzFXjGWjGUjGTjFQkFNjELiDIhDFhCDgBAgB8gA9f\ 99f89f8Af7Af6Af6Af8Ff9JfBOfCSgEWhF`iHdjIhkJbgKXcKS\ `LMXMGTMBQN5MN0JNIARJEVJIYKMaKPdLThLXkM`oMcrNgvNky\ NnzMZzLJzK4cL66L76L86LA6LB6LC5ME5MF5MG5MI5MJ5MK5ML\ 6ON7PP8QR8RS9SUATWAUXOXUYZS``PcbNheKmgIriFwkDzmBvl\ CqlCmlChkDejDaiDYhEUgERgEUhGWhHZiJ`iKbiMekNgkPilQl\ mSnnTpnUqpKrqGssDtt9uu6vv7ww8xz8yz9zz9zzAzzAzzBzzC\ zzCzzDzzDzzEzzEzzNzzVzzbzzczzczzczzczzdzzdzzdzzdzz\ ezzezzezzezzfzzfzzfzzfzzc } frm:MandelbrotBC2 { ; by several Fractint users e=p1, a=imag(p2)+100, p=real(p2)+PI q=2*PI*floor(p/(2*PI)), r=real(p2)-q Z=C=Pixel: Z=log(Z) IF(imag(Z)>r) Z=Z+flip(2*PI) ENDIF Z=exp(e*(Z+flip(q)))+C |Z|