Mandel Machine, Mandelbrot set
This is like
Trees Revisited. The difference is that I performed 2 morphings on the tree each time instead of one, which makes it almost 4-fold rotationally symmetric. It was an attempt at making the shape of the 5th power Mandelbrot set but by now I think it's not possible and this is actually as close as it's going to get.
Magnification:
2^6688.163
2.1761002056663295276577091793078 E2013
Coordinates:
Re = -1.768649018251365896963772316363263762083891572884741919382966590572876644010402046782045952918192908979244116960273314987562692245035594515742356409509454088265125320766817868374329236937637975202134316653248107028965617735935168573431232680832118975153801661230947282129891988103392740160442493520803728156684777685157179495463914134431441031473542508679138108081332136349250141260683607285323254644716516611653937822674410361886294523647866924758148366091487446186338747403320214494970205180054571819947538628672163263147632536934777328551682464249373560290598910895395025220078304175044852219089613313998695996096537371989337783010152160519159423544494775132528089756668495195043642633387792626289795259081987920780065715901854447012506368699389162695675288835357936457281317103492181692540518505831504015505257473257560284915411500985593392932752186694550112181693676914602697177195591921491054279929875681385736573811799905659416516235082512986647990684279503670611262428016795936993077576957639410667827707819073320287502206013407437740497959164963859991986380116698326895481462716310922721579926831180118210118259129917666151253982308668364006515050363223018121126004824229363718251008830689069726246808442761058828017481529307696651583791672209316087565842436046344382302367642206519738953789947804867048297129410828416813812228634911186002581967924524966052565944820843234011185573522206572155947741538609011638556601950389955919022351711171082900304192429417337465279109303683819168569245307136690276887012239261742126284820084821090200206276051308154671974631975237477934773405768432859158525619031273872136671739533876103849029506686582669072451474150498493275165320558917930204159723452067863972187013446154824057812847025978063781664918483081148752086964777070157459609888233496217616376079995912325309488604985054550452308439652313728562304935236774689229961342535571275770736674959513039064574673544409053377523239467421807605913710047824346199715521913066103084892029199311323100296593514377260080093953
Im = 0.002272486896887978607112752691903693888258767863366104005466692679879224524172139529460317272203802544880647211517898181495961616479641007288456129716836910702851878530986514121035949300571806820884357641071596564598450377743358533831548568669413136496960283706417841214807372745953164833706810148244897553774414198318559315027344033760614177161816867751806498961805541248221678837184456936883034133317830747496624558290005815362286059136620470455884998407783026301453654822330952330400896501216521201656432554749944387381161265243121720172115530578262525130697395227055468153397719295729397333641217834550019200341007595981977373764075158934684236976428136659618094620530879492537307024962724324140649838671353113990953801257241348873019198140803954675385515897268489186431957641658031612078662447187646869287934534216773566521030240553668756917844960878344834917867781981896058587250908182063513799006724966752554036635174347989266209086543090957015046314036192964441868315526908224049567914220890141194118051393892988765073426423519497069053006456384162359203849605285047053361187028832626662633409909107178667870021204110228711967072906675657969390241891417126059883597754880429959356264849352264826649269434537511312269701954181178180431162661324004461260994564812336748444518493897137399629822308620824538447846390822097719683444044409995941227277595287174361585699580673308658580967472984403685474485500062804841051959312455895624702862760916901026221033076847582857312447688354767299543170116238223622544503855600281093450772027608845791428930298920430665461684713038875728551820321487423615363421336673453514078827900361839776070890584110697044248369060197742183103641975293824401375694894922414622307652838111175092584201432979619139285044596260605369315085276520252939907532777079146180061550009646309798335112869171146881895513784252753793961727464113572583512762280871478981872531135140453178130070455090194465110617144848641570057044925383738783233798606924890270749630297284789491162754038745964990826258