Yeah, I know --The_Epicstarlord--, it sucks... :) click the green flag... I'm gonna upload the song again and try to get better sound. SCRATCH CAN'T CALCULATE THE AREA OF A CIRCLE WITH MORE THEN ~200 DIGITS OF PI, SORRY.
Song: https://www.youtube.com/watch?v=eDiSYp_51iY PI: http://www.piday.org/million/ Synced by me. I found this on the web: "An amateur mathematician, Hagar Dronbecker, has discovered that Pi repeats itself at the hyper-thousandth level. The idea came upon him while he was eating an heirloom green and red tomato sandwich drizzled with balsamic vinegar and olive oil. (Note: the photo above is not the actual sandwich but an approximation.) Apparently, the meta-fractal pattern of the Green Stripe and the Brandywine tomatoes led him to infer that Pi would indeed repeat itself at the hyper-thousandth level, due to the fact that Pi could not be any more random than the quasi-repeated scalene curve of the organically-grown fruit. "More specifically, the point of repetition in Pi occurs when it starts to move into a controversial set of numbers mathematicians call "NLNcHT Numbers" or New Large Numbers Considered to be in the Hyper-Thousands. The repeating sequence consists of the following numerals: "949700010007949". Some have argued that this is not a true repetition per se, but rather a numerical palindrome. Undaunted, Dronbecker will be submitting the sequence for review to The International Society for Large Numbers and Sequences, for official verification." The string 666,666,666 occurs at position 45,681,781. This string occurs 1 times in the first 200M digits of Pi.* The string 777,777,777 occurs at position 24,658,601. This string occurs 1 times in the first 200M digits of Pi.* The string 888,888,888 occurs at position 46,663,520. This string occurs 1 times in the first 200M digits of Pi.* The string 121,212,121 occurs at position 191,229,345. This string occurs 1 times in the first 200M digits of Pi.* *counting from the first digit after the decimal point. The 3. is not counted. 4115 digits of pi: PI ≈ 3.141592653589793238462643383279502884197169399375105820974944592307816406286208998628034825342117067982148086513282306647093844609550582231725359408128481117450284102701938521105559644622948954930381964428810975665933446128475648233786783165271201909145648566923460348610454326648213393607260249141273724587006606315588174881520920962829254091715364367892590360011330530548820466521384146951941511609433057270365759591953092186117381932611793105118548074462379962749567351885752724891227938183011949129833673362440656643086021394946395224737190702179860943702770539217176293176752384674818467669405132000568127145263560827785771342757789609173637178721468440901224953430146549585371050792279689258923542019956112129021960864034418159813629774771309960518707211349999998372978049951059731732816096318595024459455346908302642522308253344685035261931188171010003137838752886587533208381420617177669147303598253490428755468731159562863882353787593751957781857780532171226806613001927876611195909216420198938095257201065485863278865936153381827968230301952035301852968995773622599413891249721775283479131515574857242454150695950829533116861727855889075098381754637464939319255060400927701671139009848824012858361603563707660104710181942955596198946767837449448255379774726847104047534646208046684259069491293313677028989152104752162056966024058038150193511253382430035587640247496473263914199272604269922796782354781636009341721641219924586315030286182974555706749838505494588586926995690927210797509302955321165344987202755960236480665499119881834797753566369807426542527862551818417574672890977772793800081647060016145249192173217214772350141441973568548161361157352552133475741849468438523323907394143334547762416862518983569485562099219222184272550254256887671790494601653466804988627232791786085784383827967976681454100953883786360950680064225125205117392984896084128488626945604241965285022210661186306744278622039194945047123713786960956364371917287467764657573962413890865832645995813390478027590099465764078951269468398352595709825822620522489407726719478268482601476990902640136394437455305068203496252451749399651431429809190659250937221696461515709858387410597885959772975498930161753928468138268683868942774155991855925245953959431049972524680845987273644695848653836736222626099124608051243884390451244136549762780797715691435997700129616089441694868555848406353422072225828488648158456028506016842739452267467678895252138522549954666727823986456596116354886230577456498035593634568174324112515076069479451096596094025228879710893145669136867228748940560101503308617928680920874760917824938589009714909675985261365549781893129784821682998948722658804857564014270477555132379641451523746234364542858444795265867821051141354735739523113427166102135969536231442952484937187110145765403590279934403742007310578539062198387447808478489683321445713868751943506430218453191048481005370614680674919278191197939952061419663428754440643745123718192179998391015919561814675142691239748940907186494231961567945208095146550225231603881930142093762137855956638937787083039069792077346722182562599661501421503068038447734549202605414665925201497442850732518