User:Hanchao12345/how to count up to infinity

How to Count up to Infinity                       Han Chao            Qian LiXin the Using Machine:the love effect of people+DNA with neruon with ultra-high-speed tachyon singular point computer. Internal Memory:3.1556952*10^(10^10^10^10^1.1+53)[3.675514*10^(10^10,000,000+918)[3*10^(10^10,000,000+194)]3.675514*10^(10^10,000,000+918)]3.1556952*10^(10^10^10^10^1.1+53) 1 byte=8 bits,no matter hoe long or how short,per symbol and unit(including number),need to accounted for a bit. Operational Speed:3*10^(10^10,000,000+194)[3*10^(10^10,000,000+194)[3*10^(10^10,000,000+194)]3*10^(10^10,000,000+194)]3*10^(10^10,000,000+194) Symbols' Number:infinity Counting System: Where α0=f(0)f(0)(187196)(1)(Where f(0)(θ)=3↑↑↑...↑↑3,tere are θs'↑),α1=f(1)f(1)(187196)(1)(Where f(1)(θ)=α0↑↑↑...↑↑α0,tere are θs'↑),...,αβ=f(β)f(β)(187196)(1)(Where f(β)(θ)=αβ-1↑↑↑...↑↑αβ-1,there are θs'↑),...,α10^(10^10^10^10^1.1+10^10,000,000+699)=f(10^(10^10^10^10^1.1+10^10,000,000+699))f(10^10^(10^10^10^10^1.1+10^10,000,000+699))(187196)(1)(Where f(10^(10^10^10^10^1.1+10^10,000,000+699))(θ)=α10^(10^10^10^10^1.1+10^10,000,000+699)-1↑↑↑...↑↑α10^(10^10^10^10^1.1+10^10,000,000+699)-1,there are θs'↑).Where α10^(10^10^10^10^1.1+10,000,000+699)+7=10,modified bin method α10^(10^10^10^10^1.1+10^10,000,000+699)+7's system,when we see the 10 in the next(including internal memory,operational speed,),they are all equal to α10^(10^10^10^10^1.1+10^10,000,000+699)+7. smaller than 10^3  direct scale to express 10^3---10^10^10       the power's scale to express                     D1               10^^3(10^10^10)---10^^10^^10(10[5]3)    tetration scale to express 10[5]3---10[6]3(10[5](10[5]10))        pentation scale to express ...              10[β]3---10[β+1]3(10[β](10[β]10))       level β operation scale to express                               D2               ... fω1(β)=β[β[β]β]β=fβ(β) fω2(β)=(β→β→β)→(β→β→β)→(β→β→β) fω3(β)=(β→β→β→β)→(β→β→β→β)→(β→β→β→β)→(β→β→β→β) fwβ(β)=(β→β→β→...→β→β)→(β→β→β→...→β→β)→...→(β→β→β→...→β→β)(Both the brackets and the parentheses have βs'→) fω^2(β)=C3(β)(C2(β)=β→β→β→...→β→β,there are βs'→,C3(β)=β→β→β→...→β→β,there are c2(β)s'→,...,Cα(β)=β→β→β→...→β→β,there are Cα-1(β)s'→) fω^3(β)=C6(β) fω^4(β)=C12(β) ...              fω^α(β)=C3*2^α-2(β) fω^(fω^10)(fω^10)=A fω^(fω^A)(fω^A)=B ...              fω^(fω^Y)(fω^Y)=Z fω^(fω^Z)(fω^Z)=a fω^(fω^a)(fω^a)=b ...              fω^(fω^y)(fω^y)=z fω^(fω^z)(fω^z)=h(0) fω^(fω^h(0)(fω^h(0)(fω^h(0)(...(fω^h(0)(fω^h(0)))...)))(fw^h(0)(fω^h(0)(fω^h(0)(...(fω^h(0)(fω^h(0)))...)))=h(1)(there are h(0)s' in the per) fω^(fω^h(1)(fω^h(1)(fω^h(1)(...(fω^h(1)(fω^h(1)))...)))(fω^h(1)(fω^h(1)(fω^h(1)(...(fω^h(1)(fω^h(1)))...)))=h(2)(there are h(1)s' in the per) ...              fω^(fω^h(β)(fω^h(β)(fω^h(β)(...(fω^h(β)(fω^h(β)))...)))(fω^h(β)(fω^h(β)(fω^h(β)(...(fω^h(β)(fω^h(β)))...)))=h(β+1)(there are h(β)s'  in the per)                  uncertain-level operation scale to expresss                                   D3               hhh...hh(0)(0)...(0)(0)(0)=q(0)(there are h(0)s' h(0)) hhh...hh(1)(1)...(1)(1)(1)=q(1)(there are h(1)s' h(1)) ...              hhh...hh(β)(β)...(β)(β)(β)=q(β)(there are h(β)s' h(β)) ...              qqq...qq(0)(0)...(0)(0)(0)=s(0)(there are q(0)s' q(0)) qqq...qq(1)(1)...(1)(1)(1)=s(1)(there are q(1)s' q(1)) ...              qqq...qq(β)(β)...(β)(β)(β)=s(β)(there are q(β)s' q(β)) ...              sss...ss(0)(0)...(0)(0)(0)=2cs(0)(there are s(0)s' s(0)) sss...ss(1)(1)...(1)(1)(1)=2cs(1)(there are s(1)s' s(1)) ...              sss...ss(β)(β)...(β)(β)(β)=2cs(β)(there are s(β)s' s(β)) ...              2cs2cs2cs...2cs2cs(β)(β)...(β)(β)(β)=3cs(β)(there are 2cs(β)s' 2cs(β)) 3cs3cs3cs...3cs3cs(β)(β)...(β)(β)(β)=4cs(β)(there are 3cs(β)s' 3cs(β)) ...              (β-1)cs(β-1)cs(β-1)cs...(β-1)cs(β-1)cs(β)(β)...(β)(β)(β)=βcs(β)(there are (β-1)cs(β)s' (β-1)cs(β))         β times super uncertain-level scale to express             D4               D4(β)=βcs(β) (D4(β))cs(β)=D5(β)        level' 5 operation scale to express (D5(β))cs(β)=D6(β)        level' 6 operation scale to express (D6(β))cs(β)=D7(β)        level' 7 operation scale to express ...              (Dβ-1(β))cs(β)=Dβ(β)       level' β operation scale to express ...              DDβ(β)(β)=(2)Dβ(β) (2)D(2)Dβ(β)(β)=(3)Dβ(β) ...              (β-1)D(β-1)Dβ(β)(β)=(β)Dβ(β)             uncertain-level' operation scale to express ...              ((β)Dβ(β))Dβ(β)=SD0(β) SD0SD0SD0...SD0SD0(β)(β)...(β)(β)(β)=SD1(β)(there are SD0(β)s' SD0(β)) SD1SD1SD1...SD1SD1(β)(β)...(β)(β)(β)=SD2(β)(there are SD1(β)s' SD1(β)) ...              SDβ-1SDβ-1SDβ-1...SDβ-1SDβ-1(β)(β)...(β)(β)(β)=SDβ(β)(there are SDβ-1(β)s' SDβ-1(β)) ...              SDSDβ(β)(SDβ(β))=(2)SDβ(β) (2)SD(2)SDβ(β)((2)SDβ(β))=(3)SDβ(β) ...              (β-1)SD(β-1)SDβ(β)((β-1)SDβ(β))=(β)SDβ(β)          β times super uncertain-level' operation scale to express ...              ((β)SDβ(β))SDβ(β)=U0(β) (U0(β))SDβ(β)=U1(β) (U1(β))SDβ(β)=U2(β) ...              (Uβ-1(β))SDβ(β)=Uβ(β)              uncertain operation scale to express ...              UUβ(β)(β)=SUβ(β) SUSUβ(β)(SUβ(β))=(2)SUβ(β) (2)SU(2)SUβ(β)((2)SUβ(β))=(3)SUβ(β) ...              (β-1)SU(β-1)SUβ(β)((β-1)SUβ(β))=(β)SUβ(β)       β times super uncertain operation scale to express ...              ((β)SUβ(β))SUβ(β)=N0(β) N0N0N0...N0N0(β)(β)...(β)(β)(β)=N1(β)(there are N0(β)s' N0(β)) N1N1N1...N1N1(β)(β)...(β)(β)(β)=N2(β)(there are N1(β)s' N1(β)) ...              Nβ-1Nβ-1Nβ-1...Nβ-1Nβ-1(β)(β)...(β)(β)(β)=Nβ(β)(there are Nβ-1(β)s' Nβ-1(β))    non-name operation scale to express ...              NNβ(β)(β)=SNβ(β) SNSNβ(β)(SNβ(β))=(2)SNβ(β) (2)SN(2)SNβ(β)((2)SNβ(β))=(3)SNβ(β) ...              (β-1)SN(β-1)SNβ(β)((β-1)SNβ(β))=(β)SNβ(β)             β times super non-name operation scale to express When the β of the (β)SNβ(β) reaches the same level of the (β)SNβ(β),the computer executes 1 operation.When the computer need to spend 1 second to execute those operations,and per operation of the computer to execute,the β can reach the largest number of the level of the (β)SNβ(β) to express,the number is called 1 second-unit;When the computer need to spend 2 seconds to execute those operations,and per operation of the computer to execute,the β can reach the largest number of the level of the (β)SNβ(β) to express,the number is called 2 second-units;...;when the computetr need to spend β seconds to execute those operations,and per operation of the computer to execute,the β can reach the largest number of the level of the (β)SNβ(β) to express,the number is called β second-units.When the β of the β second-units reaches 1 second-unit,the number is called 1 2-order-second-unit;when the β of the β 2-order-second-units reaches 1 second-unit,the number is called 1 3-order-second-unit;...;when the first β of the β (β-1)-order-second-units reaches 1 second-unit,the number is called 1 β-order-second-unit.When the β of the 1 β-order-second-unit reaches 1 second-unit,the number is called 1 2-orderplex-second-unit;when the β of the β 2-orderplex-second-units reaches 1 second-unit,the number is called 1 3-orderplex-second-unit;...;when the first β of the β (β-1)-orderplex-second-units reaches 1 second-unit,the number is called 1 β-orderplex-second-unit.When the β of the 1 β-orderplex-second-unit reaches 1 second-unit,the number is called 1 2-super-orderplex-second-unit;when the β of the β 2-super-orderplex-second-units reaches 1 second-unit,the number is called 1 3-super-orderplex-second-unit;...;when the first β of the β (β-1)-super-orderplex-second-units reaches 1 second-unit,the number is called 1 β-super-orderplex-second-unit.When the β of the 1 β-super-orderplex-second-unit reaches 1 second-unit,the number is called 1 2-superplex-orderplex-second-unit;when the β of the β 2-superplex-orderplex-second-units reaches 1 second-unit,the number is called 1 3-superplex-orderplex-second-unit;...;when the first β of the β (β-1)-superplex-orderplex-second-units reaches 1 second-unit,the number is called 1 β-superplex-orderplex-second-unit.When the β of the 1 β-superplex-orderplex-second-unit reaches not smaller than 1 second-unit,the number is needed to use any other symbols of the computer to express.when the unit quantity before the number of one of the syomol to express reaches the smallest number of this symbol to express or larger,the number is called 2-order-something,so again upwards in order as 3-order,4-order,...,β-order,...,upper than the order's is the orderplex,the super-orderplex,and the superplex-orderplex.We need to use another symbol to express the number so again upwards in order as this method,and it can go along with the pattern of the order,the orderplex,the super-orderplex,and the superplex-orderplex,until all of the symbols of the computer is used up.As this way,we can count up to infinity.