Part 1: https://scratch.mit.edu/projects/440158795 Part 2: https://scratch.mit.edu/projects/447264357 Part 3: https://scratch.mit.edu/projects/754405467 Part 4: https://scratch.mit.edu/projects/754955356 Part 5: https://scratch.mit.edu/projects/760812782 Part 6: https://scratch.mit.edu/projects/790026881 Part 7: https://scratch.mit.edu/projects/790514465 Part 8: https://scratch.mit.edu/projects/790881588 Part 9: https://scratch.mit.edu/projects/791195357 Part 10: https://scratch.mit.edu/projects/792304332 Part 11: https://scratch.mit.edu/projects/792334745 Part 12: https://scratch.mit.edu/projects/792916950 Part 13: https://scratch.mit.edu/projects/826512434 Part 14: Part 15: Part 16: Part 17: Part 18: Part 19:
This is the 20th part of my 2048 tile pack, the last part of the main sequence. This is not the end of the series, the end of the series will be when we have reached the 2^10001 tile or the 39901262337615167697674843253671701676469936637723849097040178997058877660443893263839923368072389195798662258846418248543112982698827562235187571864192647915711460093587589053530493102532119791041100173836386623085017216921236209371018149732179249776180979789676018507883266515701243136618947805113824776130450193287748882093519743253970906445737076323388631551259281525673761521464457070183282952367912762917938927798821681921072535642129242854666788073051131299061206285360469938800671868633302918595546559331551212345164062815988396359214756491367524560074605770974503801668929162909301115859202829667843231469176278514190759538238555601653915471348888246124037515672651005456647578541420747605732786062856266482803248391343381148122839308684649277602497712294610414863984519223592500261985720483416681615211864640322536984576992511682625688123073477902974228512630222179491028406627640405863281915192929512020811691683132144089925734033030123841262008372844551817341801149212835713903822912110136502500812015039684523796118474236108889576145812790485096678443965414808946324753521693226067557412079606826394266987309245401126339874911016483561945621966582628807143755049537019714553875852866443198799753773321616737675676055286565550344547315145489568224588779467621723214846506583949626240395208356563931394951796329062516868271919725568260256370812566953298177381042095161765231647923971540244814088661166151738078639209206809946313166417344211826601807505646831079490788795430514910581020424621894643221506949651481550547972696596996681513875911293277243749138998558033144207402728866271634428623582796445967691694668880541928365702010145855496729101157269002201705975624778947857399081668692317614087918237971630291558354287239397456262918967566404162949964343716022778142456501811653634872441154951842835307431375451229809165809984922057260163071166616260203975351712468687077910818351246801689775052325287137297667038927440754586480188912493846508700801356054547675510752813453797272482074982821933437114101518196200493579760356543851906762564843908056605518816897910029353336779395993772483272626752787806746911602815273483755422110768451478998220372936439393163302970260988444739895429526138310936435365752400725554515447562730663222393622561585338963774402597287321537103279721069204595743115035894770492738893846175788531896434016102240644730992576338071478242736676787183512837467701021940543227830879181983196309308834672623313872062244499875939998453563464716046223725289150598271516350016399678472569230499762177920464488724347543236172714030936968117244659585707751246973112881073925244037927142057624723135025086676606540058195337301137114315011033455037798388259422675380299832362630343088015457301146379114901840660370609694227636630814648106638076924168072843527407823101279578001485707344392561806955949066640936737591737160475904437258240161485639102635896315248896597036923019409776054549443149376263189500819464230160996380911606833653899574282632126421372783023363548609585193418752 tile.
