Location in the mandelbrot set
Computed with Kalles fraktaler
Gradient designed in Fractal extreme
Image rendered with SeryZone's KFB map visualiser
Now this is really something else! It's an S-shape that, troughout the whole shape, contains trees and smaller S-shapes. Who would have thought it was possible to find this? This is beyond what even I held possible, yet it is so logical. Of course it must exist. The rules predict that it exists. As always, it remains true that the deeper you go, the more interesting shapes can be found. I think it is highly unlikely that this shape can be found any less deep than 2^3000, so it pays off to go that far, having a plan and knowing where you want to go. The enormous amount of detailed rings is one of the effects of zooming deep. At this zoom level, even julia sets start to get the effect of rings normally being typical for minibrots. Can you imagine how dense it must be at the minibrot of this thing? I am amazed
again by what the mandelbrot set has to offer. Mind=blown
For this one it is really worth to click the image to go to deviantart, where you can see the full image at a resolution of 7411 × 3332.
Coordinates:
Re = -1.768810140193920927700537436478379780231782536779484136840246680988909350504844409087599472183814506044542147847003260559917168049498774932668620947524898626908243646575331384330696421404620317570218220146028752385526710532920625483597572807682842148558891607348408630120823502285690236684981782484279076543082934693052739367300251174890350023410591157549518730891524067607412212262454745290694635229299599611518149781065980523858416588870973604939483569246291200355844342801363965663785776686440135254911181924839834072427866027924556066109018291537863267526719397168321210857815635658856811479887279136128160052224928080909674117245714000584768111373124874519715185492601745340723389215900132106204282752459032762143468037265935826119291598787420618228725206172394584705637878670314037744304078950523898673729427861921228959575295970758268899770641352188254441313611298075690268964369773214128673901813169780106099095236090611025906623971087536199960337624998
Im = 0.002346970932485313320278195530923493260066798172502077145348647805480333809288042821816024495796999130575186819498556425937030534879381155770770122290047057688567361975079215353664461876856878384413745782863766771277193253431115551314215939510112327611462175434698827964462257938612514737617083622495125091983915350546879818502668686930092741920731410355048485009448151644467079284113377415928906059376809427811615980847072054219677531995900583182546341619227749142205316169481989486089930876037814809512987516476542052151975134673907383489988544051323183294635675276320247215449373884715470359891251361672035997254796933098343564696233601568269269454276823826829303019960482672861617531675045544498622733619128231551699681737721594841432820328239044870813284302122563581664558476595121049030012040715377753929201091176893688452907867021730221053942884962873308912038352440181577777753193069338020239386872172787796809716472012116695045554800891318230243923611
Magnification:
2^3086.5
1.3461133050996718194242838336278 E929