I can only update this chart on Wednesdays, Fridays, Satuadays, and Sundays unpredictably randomly. If you want to see the value for today, please check PsiCubed2's Current Value Of PEGG. The page is gone now.
The age of E
This age lasted for 32 days.
This is the first "age" of PEGG. In this age, X is added by 0.01*(The hundredth place of the previous day's DJIA closing price) and PEGG is 10^X.
Therefore, PEGG grows approximately exponentially.
date | what number DJIA on previous day ended with | hundredth place of the DJIA closing value (n) | 0.01*n^2 | X | PEGG value |
---|---|---|---|---|---|
May 8th | (unused) | (unused) | (unused) | 0.00 | 1 |
May 9th | 21012.28 | 8 | 0.64 | 0.64 | 4 |
May 10th | 20975.78 | 8 | 0.64 | 1.28 | 19 |
May 11th | 20943.11 | 1 | 0.01 | 1.29 | 19 |
May 12th | 20919.42 | 2 | 0.04 | 1.33 | 21 |
May 13th | 20896.61 | 1 | 0.01 | 1.34 | 21 |
May 14th | (market closed) | 1 | 0.01 | 1.35 | 22 |
May 15th | (market closed) | 1 | 0.01 | 1.36 | 22 |
May 16th | 20981.94 | 4 | 0.16 | 1.52 | 33 |
May 17th | 20979.75 | 5 | 0.25 | 1.77 | 58 |
May 18th | 20606.93 | 3 | 0.09 | 1.86 | 72 |
May 19th | 20663.02 | 2 | 0.04 | 1.90 | 79 |
May 20th | 20804.84 | 4 | 0.16 | 2.06 | 114 |
May 21st | (market closed) | 4 | 0.16 | 2.22 | 165 |
May 22nd | (market closed) | 4 | 0.16 | 2.38 | 239 |
May 23rd | 20894.83 | 3 | 0.09 | 2.47 | 295 |
May 24th | 20937.91 | 1 | 0.01 | 2.48 | 301 |
May 25th | 21012.42 | 2 | 0.04 | 2.52 | 331 |
May 26th | 21082.95 | 5 | 0.25 | 2.77 | 588 |
May 27th | 21080.28 | 8 | 0.64 | 3.41 | 2570 |
May 28th | (market closed) | 8 | 0.64 | 4.05 | 11220 |
May 29th | (market closed) | 8 | 0.64 | 4.69 | 48977 |
May 30th | (Memorial Day) | 8 | 0.64 | 5.33 | 213796 |
May 31st | 21029.47 | 7 | 0.49 | 5.82 | 660693^{[1]} |
June 1st | 21008.65 | 5 | 0.25 | 6.07 | 1174897^{[2]} |
June 2nd | 21144.18 | 8 | 0.64 | 6.71 | 5128613 |
June 3rd | 21206.29 | 9 | 0.81 | 7.52 | 33113112 |
June 4th | (market closed) | 9 | 0.81 | 8.33 | 213796208 |
June 5th | (market closed) | 9 | 0.81 | 9.14 | 1380384264 |
June 6th | 21184.04 | 4 | 0.16 | 9.30 | 1995262314 |
June 7th | 21136.23 | 3 | 0.09 | 9.39 | 2454708915 |
June 8th | 21173.69 | 9 | 0.81 | 10.20 | 15848931924 |
And something interesting happens. Since X gor over 10, the definition's rule (e) is applied.
- (e-1) Increment the letter in Y by one.
- Y was "E", so Y becomes "F". In this log, it means proceeding to the next age.
- (e-2) Convert the new value of PEGG to the form <the new letter in Y>m
- So we have to convert E10.20 into F. I will use "Lc" for the appreviation of common logarithm.
- E10.20=EELc10.20(~EE1.0086)=EEELcLc10.20(~EEE0.00372)=F(2+LcLc10.20)
- (e-3) int(mK)/K→X
- "m" is what comes after F, which is 2+LcLc10.20 in this case. m starts with 2.003719, so int(mK)=2003. and divide that by K, so X becomes 2.003. (Recall that K=1000)
- (e-4) 0.7xZ→Z
- Z was 0.01, so Z becomes 0.007.
- (e-5) 10K→K
- Now K becomes 10000.
The age of F
This age lasted for 30 days.
It gets slower because Z gets smaller. Each age will take about 1.4 times longer than te previous one.
Starting Values:
- X=2.003
- Y="F"
- Z=0.007
- K=10000
And now, by the definition of Fx, PEGG will grow tetrationally.
date | what number DJIA on previous day ended with | hundredth place of the DJIA closing value (n) | 0.007*n^2 | X | PEGG value |
---|---|---|---|---|---|
June 9th | 21182.53 | 3 | 0.063 | 2.066 | 3.911799621*10^14 ^{[3]} |
June 10th | 21271.97 | 7 | 0.343 | 2.409 | 7.01794444*10^366 ^{[4]} |
June 11th | (market closed) | 7 | 0.343 | 2.752 | 6.77989*10^446035 |
June 12th | (market closed) | 7 | 0.343 | 3.095 | 10^(3.627435693*10^17) |
June 13th | 21235.67 | 7 | 0.343 | 3.438 | 10^(3.43866351*10^551) |
June 14th | 21328.47 | 7 | 0.343 | 3.781 | 10^(9.7976*10^1095181) |
June 15th | 21374.56 | 6 | 0.252 | 4.033 | 10^10^(9.851936791*10^11) |
June 16th | 21359.90 | 10 | 0.700 | 4.733 | 10^10^(4.26682*10^255589) |
June 17th | 21384.28 | 8 | 0.448 | 5.181 | 10^10^10^(7.744211001*10^32) |
June 18th | (market closed) | 8 | 0.448 | 5.629 | 10^10^10^(3.300782*10^18029) |
June 19th | (market closed) | 8 | 0.448 | 6.077 | 10^10^10^10^(4.276104190*10^15) |
June 20th | 21528.99 | 9 | 0.567 | 6.644 | 10^10^10^10^(7.029299*10^25441) |
June 21st | 21467.14 | 4 | 0.112 | 6.756 | 10^10^10^10^(3.70454*10^503086) |
June 22nd | 21410.03 | 3 | 0.063 | 6.819 | 10^10^10^10^(2.4039*10^3906060) |
June 23rd | 21397.29 | 9 | 0.567 | 7.386 | 10^10^10^10^10^(3.33337535*10^270) |
June 24th | 21394.76 | 6 | 0.252 | 7.638 | 10^10^10^10^10^(1.438078*10^22136) |
June 25th | (market closed) | 6 | 0.252 | 7.890 | 10^10^10^10^10^(2.762*10^57872356) |
June 26th | (market closed) | 6 | 0.252 | 8.142 | 10^10^10^10^10^10^(2.314227547*10^24) |
June 27th | 21409.55 | 5 | 0.175 | 8.317 | 10^10^10^10^10^10^(6.70745934*10^118) |
June 28th | 21310.66 | 6 | 0.252 | 8.569 | 10^10^10^10^10^10^(1.1176504*10^5091) |
June 29th | 21454.61 | 1 | 0.007 | 8.576 | 10^10^10^10^10^10^(2.5846872*10^5848) |
June 30th | 21287.03 | 3 | 0.063 | 8.639 | 10^10^10^10^10^10^(4.320149*10^22652) |
July 1st | 21349.63 | 3 | 0.063 | 8.702 | 10^10^10^10^10^10^(1.62497*10^108394) |
July 2nd | (market closed) | 3 | 0.063 | 8.765 | 10^10^10^10^10^10^(3.71883*10^662265) |
July 3rd | (market closed) | 3 | 0.063 | 8.828 | 10^10^10^10^10^10^(1.3981*10^5367432) |
July 4th | 21479.27 | 7 | 0.343 | 9.171 | 10^10^10^10^10^10^10^(2.372060665*10^30) |
July 5th | (Independent Day) | 7 | 0.343 | 9.514 | 10^10^10^10^10^10^10^(3.1518472*10^1844) |
July 6th | 21478.17 | 7 | 0.343 | 9.857 | 10^10^10^10^10^10^10^(8.466*10^15649114) |
July 7th | 21320.04 | 4 | 0.112 | 9.969 | 10^10^10^10^10^10^10^(2.0*10^2046815771) |
July 8th | 21414.34 | 4 | 0.112 | 10.081 | 10^10^10^10^10^10^10^10^(1.080888110*10^16) |
And something interesting happens. Since X gor over 10, the definition's rule (e) is applied.
- (e-1) Increment the letter in Y by one.
- Y was "F", so Y becomes "G". In this log, it means proceeding to the next age.
- (e-2) Convert the new value of PEGG to the form <the new letter in Y>m
- So we have to convert F10.081 into F. I will use "Lc" for the appreviation of common logarithm.
- F10.081=FELc10.081=FE(10^LcLc10.081)=FF(1+LcLc10.081)=FF(10^Lc(1+LcLc10.081))=G(2+(Lc(1+LcLc10.081)))
- (e-3) int(mK)/K→X
- "m" is what comes after G, which is 2+Lc(1+LcLc10.081) in this case. m starts with 2.000659, so int(mK)=20006. and divide that by K, so X becomes 2.0006. (Recall that K=10000)
- (e-4) 0.7xZ→Z
- Z was 0.007, so Z becomes 0.0049.
- (e-5) 10K→K
- Now K becomes 100000.
The age of G
Now it will be twice slower than the age of E.
Starting Values:
- X=2.0006
- Y="G"
- Z=0.0049
- K=100000
And now, by the definition of Gx, PEGG will grow pentationally.
Gx is supposed to be continuous 10^^^x, so let's check the definition for non-integeers:
10^^^x=10^^(10^^^(x-1)) for x>1 and 10^^^x=10^x for x<=1.
date | what number DJIA on previous day ended with | hundredth place of the DJIA closing value (n) | Z*n^2 | X | PEGG value |
---|---|---|---|---|---|
July 9th | (market closed) | 4 | 0.0784 | 2.0790 | (10↑)^38 1.942598686 ^{[5]} |
July 10th | (market closed) | 4 | 0.0784 | 2.1574 | (10↑)^542 1.28314623 ^{[6]} |
July 11th | 21408.52 | 2 | 0.0196 | 2.1770 | (10↑)^1531 8.4872136^{[7]} |
July 12th | 21409.07 | 7 | 0.2401 | 2.4171 | 10↑↑3.306809*10^12583 |
July 13th | 21532.14 | 4 | 0.0784 | 2.4955 | 10↑↑10^(1.918011376*10^22^{[8]}) |
July 14th | 21553.09 | 9 | 0.3969 | 2.8924 | 10↑↑10^10^10^10^10^(4.1648*10^2453549) |
July 15th | 21637.74 | 4 | 0.0784 | 2.9708 | 10↑↑10^10^10^10^10^10^10^(5.70068837*10^172) |
July 16th | (market closed) | 4 | 0.0784 | 3.0492 | 10↑↑10↑↑20 |
July 17th | (market closed) | 4 | 0.0784 | 3.1276 | 10↑↑10↑↑156 |
July 18th | 21629.72 | 2 | 0.0196 | 3.1472 | 10↑↑10↑↑340 |
July 19th | 21574.73 | 3 | 0.0441 | 3.1913 | 10↑↑10↑↑3771 |
July 20th | 21640.75 | 5 | 0.1225 | 3.3138 | 10↑↑10↑↑109191261103530 |
July 21st | 21611.78 | 8 | 0.3136 | 3.6274 | 10↑↑10↑↑10^10^(6.994744708*10^54^{[9]}) |
July 22nd | 21580.07 | 7 | 0.2401 | 3.8675 | 10↑↑10↑↑10^10^10^10^10^(2.74148776*10^222^{[10]}) |
July 23rd | (market closed) | 7 | 0.2401 | 4.1076 | 10↑↑10↑↑10↑↑81 |
July 24th | (market closed) | 7 | 0.2401 | 4.3477 | 10↑↑10↑↑10↑↑(3.512923082*10^48^{[11]}) |
July 25th | 21513.17 | 7 | 0.2401 | 4.5878 | 10↑↑10↑↑10↑↑10^(6.057*10^26709072) |
July 26th | 21613.43 | 3 | 0.0441 | 4.6319 | 10↑↑10↑↑10↑↑10^10^(1.576789697*10^84^{[12]}) |
July 27th | 21711.01 | 1 | 0.0049 | 4.6368 | 10↑↑10↑↑10↑↑10^10^(2.21141585*10^142^{[13]}) |
July 28th | 21796.55 | 5 | 0.1225 | 4.7593 | 10↑↑10↑↑10↑↑10^10^10^(1.933592*10^363689) |
July 29th | 21830.31 | 1 | 0.0049 | 4.7642 | 10↑↑10↑↑10↑↑10^10^10^(2.20015*10^2892618) |
July 30th | (maeket closed) | 1 | 0.0049 | 4.7691 | 10↑↑10↑↑10↑↑10^10^10^(1.694*10^33150873) |
July 31st | (maeket closed) | 1 | 0.0049 | 4.7740 | 10↑↑10↑↑10↑↑10^10^10^(1.02*10^586711890) |
August 1st | 21891.12 | 2 | 0.0196 | 4.7936 | 10↑↑10↑↑10↑↑10^10^10^10^(3.858102576*10^44) |
August 2nd | 21963.92 | 2 | 0.0196 | 4.8132 | 10↑↑10↑↑10↑↑10^10^10^10^(1.0007428*10^1562) |
August 3rd | 22016.24 | 4 | 0.0784 | 4.8916 | 10↑↑10↑↑10↑↑10^10^10^10^10^(1.7480*10^1520194) |
August 4th | 22026.10 | 10 | 0.4900 | 5.3816 | 10↑↑10↑↑10↑↑10↑↑(2.31315717*10^360) |
August 5th | 22092.81 | 1 | 0.0049 | 5.3865 | 10↑↑10↑↑10↑↑10↑↑(1.33704864*10^528) |
August 6th | (market closed) | 1 | 0.0049 | 5.3914 | 10↑↑10↑↑10↑↑10↑↑(1.68094748*10^797) |
August 7th | (market closed) | 1 | 0.0049 | 5.3963 | 10↑↑10↑↑10↑↑10↑↑(6.4675949*10^1242) |
August 8th | 22118.42 | 2 | 0.0196 | 5.4159 | 10↑↑10↑↑10↑↑10↑↑(1.780508*10^10772) |
August 9th | 22085.34 | 4 | 0.0784 | 5.4943 | 10↑↑10↑↑10↑↑10↑↑10^(9.161355741*10^20) |
August 10th | 22048.70 | 10 | 0.4900 | 5.9843 | 10↑↑10↑↑10↑↑10↑↑10^10^10^10^10^10^10^(4.010447*10^26013) |
August 11th | 21844.01 | 1 | 0.0049 | 5.9892 | 10↑↑10↑↑10↑↑10↑↑10^10^10^10^10^10^10^(3.79299*10^479193) |
August 12th | 21858.32 | 2 | 0.0196 | 6.0088 | 10↑↑10↑↑10↑↑10↑↑10↑↑11 |
August 13th | (market closed) | 2 | 0.0196 | 6.0284 | 10↑↑10↑↑10↑↑10↑↑10↑↑14 |
August 14th | (market closed) | 2 | 0.0196 | 6.0480 | 10↑↑10↑↑10↑↑10↑↑10↑↑20 |
August 15th | 21993.71 | 1 | 0.0049 | 6.0529 | 10↑↑10↑↑10↑↑10↑↑10↑↑22 |
August 16th | 21998.99 | 9 | 0.3969 | 6.4498 | 10↑↑10↑↑10↑↑10↑↑10↑↑(6.9659*10^3653774) |
August 17th | 22024.87 | 7 | 0.2401 | 6.6899 | 10↑↑10↑↑10↑↑10↑↑10↑↑10^10^(2.256*10^76284806) |
August 18th | 21750.73 | 3 | 0.0441 | 6.7340 | 10↑↑10↑↑10↑↑10↑↑10↑↑10^10^10^(7.86749023*10^426) |
references
- ↑ first un-Prime-Daifugo-able number
- ↑ prime number
- ↑ 391179962189184
- ↑ 7017944445748437990163875525082332824564119870314768738764095052157489097452200170805248422840206503604886087272063493697848091389039576012600785035515996537642220444560874335056342372240669438935647937455646914364420811496724386849418162412354585368984887602908898538274391428362121292906117738901383562976416882220605438505913840762691121574446029559915935670893407
- ↑ (10↑)^36 (4.1598670*10^87)
- ↑ (10↑)^540 (1.560086989*10^19)
- ↑ (10↑)^1529 (4.18*10^307053226)
- ↑ 19180113762348886986230.594...
- ↑ 6994744708368421428134387313637206190585496763626562296
- ↑ 2741487760317834272315146890497329280655274883912058885010986614883150329969624399269222734265096971246603824909360963285140751369187847209969997649447578702355254254807818609431907246465961942105536817218270196142693302850
- ↑ 3512923082729972084682493074219698336184886920007
- ↑ 1576789697633688421079638675763718292093541817048176879238746618042185578924574926213
- ↑ 22114158540112537695118708748981531871370932924942956905286244709217158262045775801477838275463123025961078652883166603687542930428384897911186