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DinkydauSet — Hyperbolic Tiling by-nc-nd

#julia #mandelbrot #morphing #set
Published: 2017-03-01 03:44:10 +0000 UTC; Views: 775; Favourites: 10; Downloads: 13
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Description Mandel Machine, Mandelbrot Set

Magnification:
2^9528.267
1.96867349951058992570457297689 E2868

Coordinates:
Re = -1.756926777409492279550453516495033723680351314953727395189360515872146184591843562929235041931276915749278160980520618316430599415871996902596926862598035021255584780359396262195103803279188180322259185975758433064602552132685902087782172582697356951487949384199914512284706456295101378315964083825951399277140166495225573492107519435864376928215101754797308748653099155323500424032515503632943877540941269937753219332750031155997257007735630645001804442494410344515171761780837965521161145949929385718344997107345020550112919948961776859937561972610049462772673335327304076258007953562870277113009300095418403488865446349624538390601042906279212763227314317435836759464838665317512652364017941034905174924357215221204412825712886336785669960838326527167258178587327065912252216028873559063409529104931584692692134500802150917626258500072268676549828758054461099056624613561703907079114304441411645828874052609665087901806396679444769247624090395246295253991570412343388604004228551841070267194030149177053404030605049345402940003155186390145782038650457446514434143500620447691056585881261459299655399711689790193599046270438809240136354557216550198429382400223984533617303572588546333699081610972834933870340626327227263873972664302680491326889621766208985008128206782094777594759485937754618957774578011783469515555545589306785745131557049793598172372628494023058772990695301360598724233455573022856897294006377351644177790133565707507320517431312476992791655581495922606709237008260182963609026759904161533774943402149720247272619923789975954280408132982418523090357503950064049810275381455304812332611350772290023476349067342931280822650230215451088932235710819532125730515032718349973852039569381182780047071649999399010950402577732485884190229681745419899889400324258788221257745234332145712783319239143114542893397101480859243364440301724727539622960259114680337152700404342874878426944283206273252760074773693036543212057025886887184210438227745286516107498097379609380921624120125638294600743948376535275530028775460284706427375237177253858497182810864024185817898464458162536358678634664962216774612516892956062678968512625084441519452084642854447687123445565402152976805297583810123560650437547261665838721410557278761057329124085308304846206848035626113648381337565971204297522336234154437496733374391060530615816492542543185608666755611758563298984351255027866346971195557308627955342611839593122193130280933752639661289656890845254627729546830059608959698693685882283635741094038710656351875177620274636737097273520995463005583999891795889737123171928382263589714042966825778450326600903644812462386347339829431921919614685922225375584676585319678165881856852547109600616024576212020711822798011026463969302026843165277638119904827380877940569423848435757288129323983896603638162129032258462412091695918682819311830223063151636183984138597787668138578909122470

Im = 0.012173908090694117400914028111513437604936625482559659771763603873726107072844590000997222527757260109756238544155095317797354921317153228278646602801899836587359600289016682881969739277575609714449846813696853644277143319225719429734905270796374493631327669643407072832477468553858376876047739549059229204230481890995557454928684116818917908841711930809580148937066867557111016049458821584211227380986860548098232560049241966240668016534282351712772881929807250108661153334088891739857925891616283637900108882656126086660868515711210462511729758370998371753785213305318129950589451414140362283199762949263436322258150962827033016254824862776177013979401337028590483766614416603748376422613894001072716270443441587668136602203441400353803359385851855832308545875866661472016769156456868870760089480424298692580538537298090244522433214997971841405991936459236000878840378754437340870042851202147353784580582808116639853985830377410201535810803146558591131181606899703522345623558621485663672592232162595734481686658421658043774043245563004415507002567760602114568230071541296927687324564562784656460580447242769508348958685254206490784636428403685165861212226303491130794510137029492112779660686168529497617368030714445621049616297876442204707552942501720121200715531362769275256022229166299995448826011594963843360252142309211818070033852674433077159095081275281592576654503459467456900425381503132020470305413769890910232500283814694113160082298282780749747434686106130509408222964374402817061281789597926038965877316706757563363235088857021142872627893792650320347644967766669152668910345913823318485953145481142503405645013957188119769477791576161811615237398972421643902938351114464158849972331643331148154660038023745502416572757145463591041949943669425354093159591452347457156096624143498530037866025869926358777814654094339505287708258587787133721583847850034390162442232719058889755416116938967486109723646090990431066068865161031201851597179576189485819278493816779568754333864787935247755423704813914068845546044406988595707877429586486930681135691094419372220630765480089115679848721929957956854554471136637563280776261415252436732671019025854069683667032186222719308892164153266112380104376630942236638743302379898275762055307478414075700188394767262774171094901380097042646763821249469694582592264349876549235026653552636890202631074555353817163007744407482438367209415103560731916448403086113850747115391249442471118288779996925913291011219901901661911960578659718607263302004803662353800075865694645156759284590114615859664698554936479130117387490848851563453834706014424225649411612534577334904017516071175010449910725583894062148982783636280890963028842851287764076610389225531347910126520319758204277458861345653900349154882400101803499507349838984412398256455818451804263636797366761377809257490764190751471526021050045949333829014431020368677285241365402
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Comments: 3

bryceguy72 [2018-01-24 10:31:19 +0000 UTC]

It does indeed resemble a hyperbolic tessellation despite the underlying math being so different.  The M-set never ceases to amaze.  Incredible magnification on this, great work.

👍: 0 ⏩: 1

DinkydauSet In reply to bryceguy72 [2018-01-24 16:37:59 +0000 UTC]

Thanks. I agree. That's why I started to like the Mandelbrot set so much.

👍: 1 ⏩: 0

ADAPTERR [2017-10-03 16:25:37 +0000 UTC]

Oh wow N!CE 

👍: 0 ⏩: 0