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Status: In-development though at random times so no exact time this will be finished

If you have not read 0!⌬0, I recommend you do, otherwise, this won't make sense to you.

Note 0: This blog may end up being over 400k bytes when completed so beware of that.

Note 0.5: This blog will be a bit outdated for a while, mainly due to being such a headache to edit, but also due to there being 3 chapters (2 currently) that were made to not lag the crap out of people's devices. If chapter 2 is complete, this blog will update. The same goes for Chapter 3.

Chapter 1 and Chapter 2

Hello. It appears you've stumbled upon a list, a list to say. It's completely separate from any variations of The List Of Numbers including the original so you could say this list is taking a different path. Regardless, the List is a list of numbers featuring ⌀ as the main number and input of the List.

This is not like The List Of Numbers. Instead of using Classes to categorize these numbers, Segments are being use to categorize these numbers instead. Why? Classes can't be effectively used to categorize these numbers as is beyond the biggest of classes. Regiments could be used but no Regiment can classify these numbers like Classes. Rather, the List IS the Regiment, Regiment to say. A regiment separate from The List Of Numbers. Remote. Separated from Main Land. You get the idea.

is something to note. What it is, is a number. It's the definition of a new beginning, as if it was 0 all over again. isn't 0 but rather, a new beginning to start a new route of FG beyond Danger Class and Numkerous Order. Welcome to the List.

Note: Any numbers with a "?" is an unconfirmed placement, therefore it may be inaccurate to their placement. As such, they may need to be compared with one another for a definitive answer. And even then, their placement may not be *exactly* accurate. This only applies to the First Segment. Later Segments are not affected by this statement.

Note 2: Since this first segment is data from older versions of both The List Of Numbers and Spiral of Numbers, it may be inaccurate (plz update those, ESPECIALLY Spiral of Numbers).

Segment 1 (Normal)[]

These are numbers that are additive to a number. The slowest segment out of all. This goes from ⌀ to ⌀+⌀.

  1. ⌀+1
  2. ⌀+2
  3. ⌀+3
  4. ⌀+π
  5. ⌀+10
  6. ⌀+Infinity
  7. ⌀+Absolute Infinity
  8. ⌀+Absolute Pi
  9. ⌀+Absolutely Eternal
  10. ⌀+Infininity
  11. ⌀+Absility
  12. ⌀+Terminus
  13. ⌀+Terminus (Upper bound)
  14. ⌀+The Real Final Point (???[3])
  15. ⌀+The Endipoint
  16. ⌀+LIMIT OF EXTENDING
  17. ⌀+ABSOLUTE BREAKDOWN
  18. ⌀+Tyrant
  19. ⌀+Ultimate blah blah blah Limit (too bored to configure it out)
  20. ⌀+I.I.U.U.I.I.T.L.
  21. ⌀+P.I.E.L.
  22. ⌀+T.A.I.L.
  23. ⌀+Ψ⛛〔x〕Λ།
  24. ⌀+Atrociously Boosted Number
  25. ⌀+Suvri Propellant
  26. ⌀+V-Lock
  27. ⌀+Post-Writing??? (Unsure)
  28. ⌀+Post-Potential??? (Unsure)
  29. ⌀+Hard-V-Lock
  30. ⌀+N/A (cleared)
  31. ⌀+RFEN/A(Infinity) (Usually tied to OBRVTtUC)
  32. ⌀+The Next Level (TNL is a sub-input of Omniexistential Beyond Reality Value Trans-transcendental Ultra Coverer due to being in the same area as OBRVTtUC. But if OBRVTtUC is at RFEN/A(Infinity), then The Next Level would be somewhere around or equal to RFEA0(OBRVTtUC) which would be more accurate for TNL, given that itself is considered an entry by RFEN/A(). It basically uses A_0 to gain an advantage against its opponents. Otherwise, it's unknown.)
  33. ⌀+The Chronic Ineffability Breakdown
  34. ⌀+The Fictional Lock
  35. ⌀+0!⌬0
  36. ⌀+0!⌬1
  37. ⌀+0!⌬2
  38. ⌀+0!⌬3
  39. ⌀+0!⌬LOCK
  40. ⌀+1!⌬0
  41. ⌀+...!⌬0
  42. ⌀+LOCK!FINALITYLOCK
  43. ⌀+⌀ (SEGMENT TERMINATOR)

End of Segment 1[]

Segment 2 (Googology)[]

These are numbers that use notations already present in Googology. This goes from ⌀+⌀+1 to Ω.

  1. ⌀+⌀+1
  2. ⌀+⌀+10
  3. ⌀+⌀+Absolute Infinity
  4. ⌀+⌀+I.I.U.U.I.I.T.L.
  5. ⌀+⌀+The Fictional Lock
  6. ⌀+⌀+⌀
  7. ⌀+⌀+⌀+Absolute Infinity
  8. ⌀+⌀+⌀+⌀
  9. ⌀+⌀+⌀+⌀+⌀
  10. ⌀+⌀+⌀+⌀+⌀+⌀
  11. ⌀*10
  12. ⌀*100
  13. ⌀*Infinity
  14. ⌀*Terminus
  15. ⌀*P.I.E.L.
  16. ⌀*0!⌬0
  17. ⌀*⌀
  18. ⌀*⌀*⌀
  19. ⌀*⌀*⌀*⌀
  20. ⌀^5
  21. ⌀^10
  22. ⌀^Absolute Infinity
  23. ⌀^Hard-V-Lock
  24. ⌀^⌀
  25. ⌀^⌀^⌀
  26. ⌀^⌀^⌀^⌀
  27. ⌀^^10
  28. ⌀^^⌀
  29. ⌀^^⌀^^⌀
  30. ⌀^^^⌀
  31. ⌀^^^^⌀
  32. ⌀{⌀}⌀
  33. ⌀{⌀{⌀}⌀}⌀
  34. ⌀{{⌀}}⌀
  35. ⌀{{{⌀}}}⌀
  36. {⌀, ⌀, ⌀, ⌀}
  37. {⌀, ⌀, ⌀, ⌀, ⌀}
  38. {⌀, ⌀[2]⌀}
  39. {⌀, ⌀[⌀]⌀}
  40. {⌀, ⌀[⌀, ⌀]⌀}
  41. {⌀, ⌀[⌀, ⌀, ⌀]⌀}
  42. {⌀, ⌀[⌀[2]⌀]⌀}
  43. {⌀, ⌀[⌀[⌀]⌀]⌀}
  44. {⌀, ⌀[⌀[⌀[⌀]⌀]⌀]⌀}
  45. {⌀, ⌀[1\2]⌀}
  46. {⌀, ⌀[⌀[⌀]⌀\2]⌀}
  47. {⌀, ⌀[⌀\3]⌀}
  48. {⌀, ⌀[⌀\⌀]⌀}
  49. {⌀, ⌀[⌀\⌀[⌀]⌀]⌀}
  50. {⌀, ⌀[⌀\⌀\⌀]⌀}
  51. {⌀, ⌀[⌀\⌀\⌀\⌀]⌀}
  52. {⌀, ⌀[1-2]⌀}
  53. {⌀, ⌀[1\2-2]⌀}
  54. {⌀, ⌀[1-2-2]⌀}
  55. {⌀, ⌀[1-2-2-2]⌀}
  56. {⌀, ⌀[1-3]⌀}
  57. {⌀, ⌀[1-⌀]⌀}
  58. {⌀, ⌀[⌀-⌀]⌀}
  59. {⌀, ⌀[⌀-⌀-⌀]⌀}
  60. {⌀, ⌀[⌀-⌀-⌀-⌀]⌀}
  61. {⌀, ⌀[1/22]⌀}
  62. {⌀, ⌀[⌀/2⌀]⌀}
  63. {⌀, ⌀[⌀/3⌀]⌀}
  64. {⌀, ⌀[⌀/⌀]⌀}
  65. {⌀, ⌀[⌀/⌀/⌀]⌀}
  66. {⌀, ⌀[⌀/⌀/⌀/⌀]⌀}
  67. {⌀, ⌀[⌀/⌀/⌀/⌀/⌀]⌀}
  68. Tar(⌀)
  69. Rayo(⌀)
  70. Infinity
  71. א
  72. ω
  73. ε
  74. ζ
  75. η
  76. Ω (SEGMENT TERMINATOR)

End of Segment 2[]

Segment 3 (Speedup)[]

These are numbers that use a special notation to reach numbers that are more potent than Absolutely Eternal or even Terminus at ⌀ level. This goes from ω→{Ψ⛛〔x〕Λ།} to ε→{0}. Although these numbers don't show ω→{}, they still work as intended even if this special notation was meant for ω in an expansion to reach numbers being ω far past Absolutely Eternal.

  1. Ψ⛛〔⌀〕Λ = ω→{Ψ⛛〔x〕Λ།}
  2. 0!⌬0 = ω→{0!⌬0}
  3. LOCK!FINALITYLOCK = ω→{LOCK!FINALITYLOCK}
  4. ω→{⌀}
  5. = ω→{ω→{⌀}}
  6. ... x4 = ω→{ω→{ω→{ω→{⌀}}}} = ω→{⌀, 4}
  7. 1⌀ = ⌀... x⌀ = ω→{⌀, ω→{⌀, 1}} = ω→{⌀, ⌀, 1}
  8. 2⌀ = 1... x1 = ω→{⌀, ω→{⌀, 2}}
  9. 3⌀ = 2... x2 = ω→{⌀, ω→{⌀, 3}}
  10. ⌀ = ω→{⌀, ω→{⌀, ⌀}}
  11. ⌀ = ω→{⌀, ω→{ω→{⌀}, ⌀}}
  12. ⌀ = ω→{⌀, ω→{ω→{ω→{⌀}}, ⌀}}
  13. 1⌀ = ...⌀ x⌀ = ω→{⌀, ω→{⌀, ω→{⌀, 1}}} = ω→{⌀, ⌀, 2}
  14. 1⌀ = ...⌀ x⌀ = ω→{⌀, ω→{⌀, ω→{⌀, ω→{⌀, 1}}}} = ω→{⌀, ⌀, 3}
  15. 1⌀ = ω→{⌀, ⌀, 4}
  16. ω→{⌀, ⌀, 5}
  17. ω→{⌀, ⌀, 6}
  18. ω→{⌀, ⌀, 7}
  19. ω→{⌀, ⌀, 10}
  20. ω→{⌀, ⌀, IIUUIITL}
  21. ω→{⌀, ⌀, ⌀}
  22. ω→{⌀, ⌀, ω→{⌀, ⌀, ⌀}}
  23. ω→{⌀, ⌀, ω→{⌀, ⌀, ω→{⌀, ⌀, ⌀}}}
  24. ω→{⌀, ⌀, {{4}}}
  25. ω→{⌀, ⌀, {{5}}}
  26. ω→{⌀, ⌀, {{10}}}
  27. ω→{⌀, ⌀, {{⌀}}}
  28. ω→{⌀, ⌀, {{ω→{⌀, ⌀, {{⌀}}}}}}
  29. ω→{⌀, ⌀, {{ω→{⌀, ⌀, {{ω→{⌀, ⌀, {{⌀}}}}}}}}}
  30. ω→{⌀, ⌀, {{{3}}}}
  31. ω→{⌀, ⌀, {{{⌀}}}}
  32. ω→{⌀, ⌀, {{{ω→{⌀, ⌀, {{{⌀}}}}}}}}
  33. ω→{⌀, ⌀, {{{{2}}}}}
  34. ω→{⌀, ⌀, {{{{⌀}}}}}
  35. ω→{⌀, ⌀, {{{{{⌀}}}}}}
  36. ω→{⌀, ⌀, {{{{{{⌀}}}}}}}
  37. ω→{⌀, ⌀, ⌀, 10}
  38. ω→{⌀, ⌀, ⌀, 100}
  39. ω→{⌀, ⌀, ⌀, ⌀}
  40. ω→{⌀, ⌀, ⌀, ω→{⌀, ⌀, ⌀, ⌀}}
  41. ω→{⌀, ⌀, ⌀, {{⌀}}}
  42. ω→{⌀, ⌀, ⌀, {{ω→{⌀, ⌀, ⌀, {{⌀}}}}}}
  43. ω→{⌀, ⌀, ⌀, {{{⌀}}}}
  44. ω→{⌀, ⌀, ⌀, ⌀, ⌀}
  45. ω→{⌀, ⌀, ⌀, ⌀, {{⌀}}}
  46. ω→{⌀, ⌀, ⌀, ⌀, ⌀, {{⌀}}}
  47. ω→{⌀, ⌀, ⌀, ⌀, ⌀, ⌀, {{⌀}}}
  48. ω→{⌀,,10 {{⌀}}}
  49. ω→{⌀,,⌀ {{⌀}}}
  50. ω→{⌀,,ω→{⌀,,⌀ {{⌀}}} {{⌀}}}
  51. ω→{⌀,,⌀,⌀ {{⌀}}}
  52. ω→{⌀,,⌀,ω→{⌀,,⌀,⌀ {{⌀}}} {{⌀}}}
  53. ω→{⌀,,⌀,⌀,⌀ {{⌀}}}
  54. ω→{⌀,,⌀,⌀,⌀,⌀ {{⌀}}}
  55. ω→{⌀,,⌀,,⌀ {{⌀}}}
  56. ω→{⌀,,⌀,,ω→{⌀,,⌀,,⌀ {{⌀}}} {{⌀}}}
  57. ω→{⌀,,⌀,,⌀,⌀ {{⌀}}}
  58. ω→{⌀,,⌀,,⌀,,⌀ {{⌀}}}
  59. ω→{⌀,,⌀,,⌀,,⌀,,⌀ {{⌀}}}
  60. ω→{⌀,,⌀,,⌀,,⌀,,⌀,,⌀ {{⌀}}}
  61. ω→{⌀,,,10 {{⌀}}}
  62. ω→{⌀,,,⌀ {{⌀}}}
  63. ω→{⌀,,,ω→{⌀,,,⌀ {{⌀}}} {{⌀}}}
  64. ω→{⌀,,,⌀,⌀ {{⌀}}}
  65. ω→{⌀,,,⌀,,⌀ {{⌀}}}
  66. ω→{⌀,,,⌀,,⌀,,⌀ {{⌀}}}
  67. ω→{⌀,,,⌀,,,⌀ {{⌀}}}
  68. ω→{⌀,,,⌀,,,⌀,,,⌀ {{⌀}}}
  69. ω→{⌀,,,⌀,,,⌀,,,⌀,,,⌀ {{⌀}}}
  70. ω→{⌀,,,,⌀ {{⌀}}}
  71. ω→{⌀,,,,ω→{⌀,,,,⌀ {{⌀}}} {{⌀}}}
  72. ω→{⌀,,,,⌀,⌀ {{⌀}}}
  73. ω→{⌀,,,,⌀,,⌀ {{⌀}}}
  74. ω→{⌀,,,,⌀,,,⌀ {{⌀}}}
  75. ω→{⌀,,,,⌀,,,,⌀ {{⌀}}}
  76. ω→{⌀,,,,,⌀ {{⌀}}}
  77. ω→{⌀,,,,,⌀,,,,,⌀ {{⌀}}}
  78. ω→{⌀,,,,,,⌀ {{⌀}}}
  79. ω→{⌀,,,,,,,⌀ {{⌀}}}
  80. ω→{⌀,,,,,,,,⌀ {{⌀}}}
  81. ω→{⌀,,,,,,,,,⌀ {{⌀}}}
  82. ω→{⌀,.10.,⌀ {{⌀}}}
  83. ω→{⌀,.⌀.,⌀ {{⌀}}}
  84. ω→{⌀,.ω→{⌀,.⌀.,⌀ {{⌀}}}.,⌀ {{⌀}}}
  85. ω→{⌀,.{2}.,⌀ {{⌀}}}
  86. ω→{⌀,.{10}.,⌀ {{⌀}}}
  87. ω→{⌀,.{⌀}.,⌀ {{⌀}}}
  88. ω→{⌀,.{ω→{⌀,.{⌀}.,⌀ {{⌀}}}}.,⌀ {{⌀}}}
  89. ω→{⌀,.{{2}}.,⌀ {{⌀}}}
  90. ω→{⌀,.{{⌀}}.,⌀ {{⌀}}}
  91. ω→{⌀,.{{{⌀}}}.,⌀ {{⌀}}}
  92. ω→{⌀,.{{{{⌀}}}}.,⌀ {{⌀}}}
  93. ω→{⌀,.{{{{{⌀}}}}}.,⌀ {{⌀}}}
  94. ω→{⌀,.[10].,⌀ {{⌀}}}
  95. ω→{⌀,.[⌀].,⌀ {{⌀}}}
  96. ω→{⌀,.[ω→{⌀,.[⌀].,⌀ {{⌀}}}].,⌀ {{⌀}}}
  97. ω→{⌀,.[[⌀]].,⌀ {{⌀}}}
  98. ω→{⌀,.[[[⌀]]].,⌀ {{⌀}}}
  99. ω→{⌀,.(⌀).,⌀ {{⌀}}}
  100. ω→{⌀,.((⌀)).,⌀ {{⌀}}}
  101. ω→{⌀,.\⌀\.,⌀ {{⌀}}}
  102. ω→{⌀,./⌀/.,⌀ {{⌀}}}
  103. ω→{⌀,.|⌀|.,⌀ {{⌀}}}
  104. ω→{⌀,.?⌀?.,⌀ {{⌀}}} ?=100th symbol
  105. ω→{⌀,.?⌀?.,⌀ {{⌀}}} ?=⌀th symbol
  106. ω→{⌀,.?2⌀?2.,⌀ {{⌀}}} ?2=ω→{⌀,.?⌀?.,⌀ {{⌀}}} ?=⌀th symbol
  107. ω→{⌀,.?3⌀?3.,⌀ {{⌀}}}
  108. ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}
  109. ω→{⌀,.?ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}⌀?ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}.,⌀ {{⌀}}}
  110. ω→{⌀,.?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} x3
  111. ω→{⌀,.?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} x4
  112. ω→{⌀,.?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} x⌀
  113. ω→{⌀,.?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} xω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}
  114. ω→{⌀,.?2⌀?2.,⌀ {{⌀}}} = ω→{⌀,.?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} xω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}
  115. ω→{⌀,.?3⌀?3.,⌀ {{⌀}}} = ω→{⌀,.?2ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?2ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} xω→{⌀,.?2ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}⌀?2ω→{⌀,.(?...)⌀(?...).,⌀ {{⌀}}}.,⌀ {{⌀}}} repeated ω→{⌀,.?2ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}⌀?2ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}.,⌀ {{⌀}}} times.
  116. ω→{⌀,.?4⌀?4.,⌀ {{⌀}}}
  117. ω→{⌀,.?5⌀?5.,⌀ {{⌀}}}
  118. ω→{⌀,.?⌀?.,⌀ {{⌀}}}
  119. ω→{⌀,.??⌀??.,⌀ {{⌀}}} ?? = "ALL OF THE NUMBERS AND ITS ENDLESS VARIATIONS(+) BELOW ω→{⌀,.??⌀??.,⌀ {{⌀}}}. THIS INCLUDES ω→{⌀,.??⌀??.,⌀ {{⌀}}} - 1, ω→{⌀,.??⌀??.,⌀ {{⌀}}} - 2, ω→{⌀,.??⌀??.,⌀ {{⌀}}} - 3, etc."th symbol
  120. ω→{⌀,.??...⌀??....,⌀ {{⌀}}} x3 ??... x3 = Same concept as previous number.
  121. ω→{⌀,.??...⌀??....,⌀ {{⌀}}} x4
  122. ω→{⌀,.??...⌀??....,⌀ {{⌀}}} x⌀
  123. ω→{⌀,.??...⌀??....,⌀ {{⌀}}} xω→{⌀,.??⌀??.,⌀ {{⌀}}} (?^^x)
  124. ω→{⌀,.?{?}?⌀?{?}?.,⌀ {{⌀}}}
  125. ω→{⌀,.??⌀??.,⌀ {{⌀}}}
  126. ω→{⌀,....?⌀...?.,⌀ {{⌀}}} x3 (The beginning of a Cycle)
  127. ω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀
  128. ω→{⌀,....?⌀...?.,⌀ {{⌀}}} xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀
  129. ω→{⌀,....?⌀...?.,⌀ {{⌀}}} . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀ . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀
  130. Cycleω 5
  131. Cycleω 10
  132. Cycleω
  133. Cycleω ω→{⌀,....?⌀...?.,⌀ {{⌀}}} . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀ . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀
  134. Cycleω Cycleω
  135. Cycleω Cycleω Cycleω
  136. Cycleω ... Cycleω ⌀ x10
  137. Cycleω ... Cycleω ⌀ x⌀
  138. Cycleω ... Cycleω ⌀ xCycleω
  139. Cycleω ... Cycleω ⌀ xCycleω ... Cycleω ⌀ x⌀
  140. Cycleω ... Cycleω ⌀ xCycleω ... Cycleω ⌀ xCycleω ... Cycleω ⌀ x⌀
  141. Cycleω ... Cycleω ⌀ x... Phraseω 1
  142. Cycleω ... Cycleω ⌀ x... Phraseω 2
  143. Cycleω ... Cycleω ⌀ x... Phraseω 10
  144. Cycleω ... Cycleω ⌀ x... Phraseω ⌀
  145. Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x...
  146. Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x...
  147. Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x... Phraseω Cycleω ... Cycleω ⌀ x...
  148. ... Cycleω ...
  149. ... Cycleω ... xCycleω ...
  150. ... Cycleω ... xCycleω ... xCycleω ... It goes on and on and on, forever... actually forever. It's undefinable how many times this repeats, and even then, using undefinable isn't the right word to use, as there's no *right* word to use for this cycle. It's that potent of a Cycle that's a ⌀ Cycle. Yet, there is something after this. Welcome to ⌀ list.
  151. ε→{0} (SEGMENT TERMINATOR)

End of Segment 3[]

Segment 4 (Iteration)[]

These are numbers that expand the special notation even further, providing an iterating effect that reaches FAR beyond NEVER and ENDLESS or even TRUE FINALE ENDING at ⌀ level. This goes from ε→{0} to Ω0

  1. ε→{0}
  2. ε→{1}
  3. ε→{2}
  4. ε→{10}
  5. ε→{Ω}
  6. ε→{IIUUIITL}
  7. ε→{0!⌬0}
  8. ε→{⌀}
  9. ε→{ω→{⌀}}
  10. ε→{ω→{⌀, ⌀}}
  11. ε→{ω→{⌀, ⌀, ⌀}}
  12. ε→{ω→{⌀, ⌀, ⌀ {{⌀}}}}
  13. ε→{ω→{⌀,,⌀ {{⌀}}}}
  14. ε→{ω→{⌀,,,⌀ {{⌀}}}}
  15. ε→{ω→{⌀,.⌀.,⌀ {{⌀}}}}
  16. ε→{ω→{⌀,.{⌀}.,⌀ {{⌀}}}}
  17. ε→{ω→{⌀,.[⌀].,⌀ {{⌀}}}}
  18. ε→{ω→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}}
  19. ε→{ω→{⌀,.?2⌀?2.,⌀ {{⌀}}}}
  20. ε→{ω→{⌀,.??⌀??.,⌀ {{⌀}}}}
  21. ε→{ω→{⌀,.??⌀??.,⌀ {{⌀}}}}
  22. ε→{ω→{⌀,....?⌀...?.,⌀ {{⌀}}} . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀ . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀}
  23. ε→{Cycleω ⌀}
  24. ε→{Cycleω ... Cycleω ⌀ xCycleω ⌀}
  25. ε→{Cycleω ... Cycleω ⌀ x... Phraseω ⌀}
  26. ε→{ε→{0}}
  27. ε→{ε→{ε→{0}}}
  28. ε→{⌀, ⌀}
  29. ε→{⌀, ⌀, ⌀}
  30. ε→{⌀, ⌀, ⌀ {{⌀}}}
  31. ε→{⌀,,⌀ {{⌀}}}
  32. ε→{⌀,,,⌀ {{⌀}}}
  33. ε→{⌀,.⌀.,⌀ {{⌀}}}
  34. ε→{⌀,.{⌀}.,⌀ {{⌀}}}
  35. ε→{⌀,.[⌀].,⌀ {{⌀}}}
  36. ε→{⌀,.(?⌀)⌀(?⌀).,⌀ {{⌀}}}
  37. ε→{⌀,.?2⌀?2.,⌀ {{⌀}}}
  38. ε→{⌀,.??⌀??.,⌀ {{⌀}}}
  39. ε→{⌀,.??⌀??.,⌀ {{⌀}}}
  40. ε→{⌀,....?⌀...?.,⌀ {{⌀}}} . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀ . xω→{⌀,....?⌀...?.,⌀ {{⌀}}} x⌀}
  41. Cycleε
  42. Cycleε ... Cycleε ⌀ xCycleε
  43. Cycleε ... Cycleε ⌀ x... Phraseε ⌀
  44. ζ→{0}
  45. ζ→{⌀}
  46. ζ→{⌀,.{⌀}.,⌀ {{⌀}}}
  47. Cycleζ
  48. Cycleζ ... Cycleζ ⌀ xCycleζ
  49. Cycleζ ... Cycleζ ⌀ x... Phraseζ ⌀
  50. η→{0}
  51. η→{⌀,.??⌀??.,⌀ {{⌀}}}
  52. Cycleη ... Cycleη ⌀ x... Phraseη ⌀
  53. 5th Infinity = 5thI (Not 5i)
  54. 6th Infinity = 6thI
  55. 7th Infinity
  56. 8th Infinity
  57. 9th Infinity
  58. 10th Infinity = 10thI
  59. ωth Infinity
  60. Ωth Infinity
  61. IIUUIITLth Infinity
  62. 0!⌬0th Infinity
  63. ⌀th Infinity = ⌀thI
  64. ω→{⌀}th Infinity
  65. ε→{⌀}th Infinity
  66. ζ→{⌀}th Infinity
  67. η→{⌀}th Infinity
  68. 5th Infinityth Infinity = 5thIthI
  69. 10th Infinityth Infinity = 10thIthI
  70. ⌀th Infinityth Infinity
  71. 5th Infinityth Infinityth Infinity = 5thIthIthI
  72. ⌀th Infinityth Infinityth Infinity = ⌀thIthIthI
  73. ⌀th Infinityth Infinityth Infinity
  74. ⌀th Infinityth Infinityth Infinityth Infinity
  75. ⌀th Infinityth Infinityth Infinityth Infinityth Infinity
  76. ⌀th Infinityth Infinityth Infinityth Infinityth Infinityth Infinity
  77. ⌀th Infinityth Infinityth Infinityth Infinityth Infinityth Infinityth Infinity
  78. Infinityth10 Infinity
  79. Infinityth Infinity
  80. Infinityth⌀th Infinity Infinity
  81. InfinitythInfinityth Infinity Infinity
  82. Infinityth^^⌀th Infinity Infinity
  83. Infinityth^^^⌀th Infinity Infinity
  84. ⌀th ∞{⌀th ∞}⌀th ∞th Infinity
  85. (⌀th ∞th) Infinity
  86. ...(⌀th ∞th) Infinity
  87. ...(⌀th ∞th) Infinity x2
  88. ...(⌀th ∞th) Infinity x3
  89. ...(⌀th ∞th) Infinity x10
  90. ...(⌀th ∞th) Infinity x⌀
  91. ...(⌀th ∞th) Infinity x(⌀th ∞th) Infinity
  92. (1st ⌀th ∞th) Infinity
  93. (10th ⌀th ∞th) Infinity
  94. (⌀th ⌀th ∞th) Infinity
  95. ...(⌀th ∞th) Infinity x(⌀th ⌀th ∞th) Infinity
  96. (1st ⌀th ⌀th ∞th) Infinity
  97. (⌀th ⌀th ⌀th ∞th) Infinity
  98. (⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  99. (⌀th ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  100. (⌀th (2) ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  101. (⌀th (3) ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  102. (⌀th (⌀) ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  103. (⌀th (1/2) ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  104. (⌀th (1-2) ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  105. (⌀th [1[1\2[2]2-2]2] ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  106. (⌀th [⌀/⌀/⌀] ⌀th ⌀th ⌀th ⌀th ∞th) Infinity
  107. (⌀th2 ∞th) Infinity
  108. (⌀th ⌀th2 ∞th) Infinity
  109. (⌀th ⌀th ⌀th2 ∞th) Infinity
  110. (⌀th (1-2) ⌀th ⌀th ⌀th2 ∞th) Infinity
  111. (⌀th2 ⌀th2 ∞th) Infinity
  112. (⌀th (1-2) ⌀th ⌀th ⌀th2 ⌀th2 ∞th) Infinity
  113. (⌀th2 ⌀th2 ⌀th2 ∞th) Infinity
  114. (⌀th2 ⌀th2 ⌀th2 ⌀th2 ∞th) Infinity
  115. (⌀th2 ⌀th2 ⌀th2 ⌀th2 ⌀th2 ∞th) Infinity
  116. (⌀th2 [2] ⌀th2 ⌀th2 ⌀th2 ∞th) Infinity
  117. (⌀th2 [1[1\2[2]2-2]2] ⌀th2 ⌀th2 ⌀th2 ∞th) Infinity
  118. (⌀th3 ∞th) Infinity
  119. (⌀th ⌀th3 ∞th) Infinity
  120. (⌀th2 ⌀th3 ∞th) Infinity
  121. (⌀th2 ⌀th2 ⌀th3 ∞th) Infinity
  122. (⌀th2 ⌀th2 ⌀th2 ⌀th3 ∞th) Infinity
  123. (⌀th3 ⌀th3 ∞th) Infinity
  124. (⌀th3 ⌀th3 ⌀th3 ∞th) Infinity
  125. (⌀th3 [1[1\2[2]2-2]2] ⌀th3 ⌀th3 ⌀th3 ∞th) Infinity
  126. (⌀th4 ∞th) Infinity
  127. (⌀th ⌀th4 ∞th) Infinity
  128. (⌀th2 ⌀th4 ∞th) Infinity
  129. (⌀th3 ⌀th4 ∞th) Infinity
  130. (⌀th4 ⌀th4 ∞th) Infinity
  131. (⌀th4 ⌀th4 ⌀th4 ∞th) Infinity
  132. (⌀th4 ⌀th4 ⌀th4 ⌀th4 ∞th) Infinity
  133. (⌀th5 ∞th) Infinity
  134. (⌀th4 ⌀th5 ∞th) Infinity
  135. (⌀th5 ⌀th5 ∞th) Infinity
  136. (⌀th6 ∞th) Infinity
  137. (⌀th7 ∞th) Infinity
  138. (⌀th8 ∞th) Infinity
  139. (⌀th9 ∞th) Infinity
  140. (⌀th10 ∞th) Infinity
  141. (⌀thΩ ∞th) Infinity
  142. (⌀thTAIL ∞th) Infinity
  143. (⌀th ∞th) Infinity
  144. (⌀th10th Infinity ∞th) Infinity
  145. (⌀th⌀th ∞th) Infinity Probably bigger than NEVER on ⌀ level
  146. (⌀th⌀th2 ∞th) Infinity
  147. (⌀th⌀th3 ∞th) Infinity
  148. (⌀th⌀th10 ∞th) Infinity
  149. (⌀th⌀th ∞th) Infinity
  150. (⌀th⌀th⌀th ∞th) Infinity
  151. (⌀th⌀th⌀th⌀th ∞th) Infinity
  152. (⌀th⌀th⌀th⌀th⌀th ∞th) Infinity
  153. (⌀th⌀th⌀th⌀th⌀th⌀th ∞th) Infinity
  154. (⌀th... ∞th) Infinity x10
  155. (⌀th... ∞th) Infinity
  156. (⌀th... ∞th) Infinity xIIUUIITL
  157. (⌀th... ∞th) Infinity xTRL
  158. (⌀th... ∞th) Infinity x0!⌬0
  159. (⌀th... ∞th) Infinity x⌀
  160. (⌀th... ∞th) Infinity x⌀th Infinity
  161. (⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  162. (⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  163. (⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  164. (⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  165. (⌀th... ∞th) Infinity . x10 . x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  166. (⌀th... ∞th) Infinity . x⌀ . x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  167. (⌀th... ∞th) Infinity . x(⌀th ∞th) Infinity . x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity
  168. (⌀th... ∞th) Infinity . x(⌀th... ∞th) Infinity . x(⌀th... ∞th) Infinity x(⌀th ∞th) Infinity Cycle 1 = Cycle... 1 = The Smallest Cycle bigger than any layering of NEVER at ⌀ level
  169. Cycle... 1.1
  170. Cycle... 1.2
  171. Cycle... 2
  172. Cycle... 2.4
  173. Cycle... 4
  174. Cycle... 10
  175. Cycle...
  176. Cycle... (⌀th ∞th) Infinity
  177. Cycle... (⌀th... ∞th) Infinity
  178. Cycle... ... Phrase... 1
  179. Cycle... ... Phrase... 1.1
  180. Cycle... ... Phrase... 1.2
  181. Cycle... ... Phrase... 2
  182. Cycle... ... Phrase... 2.4
  183. Cycle... ... Phrase... 4
  184. Cycle... ... Phrase... 10
  185. Cycle... ... Phrase...
  186. Cycle... ... Phrase... (⌀th ∞th) Infinity
  187. Cycle... ... Phrase... (⌀th... ∞th) Infinity
  188. Cycle... ... Phrase... ... Advance... 1 = The Smallest Advance bigger than any layering of continuous Cycle...s and Phrase...s in an endless loop
  189. Cycle... ... Phrase... ... Advance... ... Accelerate... 1 = ???
  190. 5Meta... 1 = Beyond ???
  191. 6Meta... 1
  192. 7Meta...
  193. 8Meta...
  194. 9Meta...
  195. 10Meta...
  196. Meta...
  197. Cycle...Meta...
  198. Cycle... ... Phrase...Meta...
  199. 5Meta...Meta...
  200. 10Meta...Meta...
  201. Meta...Meta...
  202. 5Meta...Meta...Meta...
  203. Meta...Meta...Meta...
  204. Meta...Meta...Meta...Meta...
  205. Meta...Meta...Meta...Meta...Meta...
  206. ...Meta... ⌀ x⌀
  207. ...Meta... ⌀ x...Meta... ⌀ xMeta...
  208. ...Meta... ⌀ . xMeta... ⌀ . xMeta...
  209. Cycle...2 1 = The First Iterated First Cycle bigger than [REDACTED]
  210. Cycle...2 ⌀ = ????
  211. Cycle...2 Cycle...
  212. Cycle...2 Meta...
  213. Cycle...2 Cycle...2
  214. Phrase...2 ⌀ = The First Iterated First Phrase bigger than... what anymore?
  215. Advance...2
  216. Accelerate...2
  217. Meta...2
  218. Cycle...3
  219. Accelerate...3
  220. Meta...3
  221. Meta...4
  222. Meta...5
  223. Meta...10
  224. Meta...
  225. Meta...Meta...
  226. Meta...Meta...2
  227. Meta...Meta...
  228. Meta...Meta...Meta...
  229. Meta...Meta...Meta...Meta...
  230. Meta...Meta...Meta...Meta...Meta...
  231. Meta...... ⌀ x⌀
  232. Meta...... ⌀ xMeta...
  233. Meta...... ⌀ . xMeta... ⌀ . xMeta...
  234. Cycle...FINALITY 1 = Smallest FINALITY Cycle within the Iterations of Endless Iterating bigger than... what exactly? I don't know anymore.
  235. Cycle...FINALITY
  236. Cycle...FINALITY Cycle...FINALITY
  237. Phrase...FINALITY
  238. Advance...FINALITY
  239. Accelerate...FINALITY
  240. FINALITYMeta...FINALITY
  241. FINALITYMeta...FINALITY ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...
  242. The countless iterations of this will never end. It simply is FINALITY of the iterations and thus, cannot stop iterating itself whatsoever. It's so uncomprehendable at this stage we may as well consider it beyond ENDLESS or even beyond T.R.U.E. F.I.N.A.L.E. E.N.D.I.N.G. at ⌀ level if we're gonna step it up a notch. Whatever functions(BEYOND) are an attempt to apply to this, it won't do anything as iterating this much is ineffably beyond ineffable to comprehend or even give an accurate depiction and definition of what kind of iteration this would be.
  243. So, as long as the iterations keep continuing, this will reign supremum over all other ⌀s before Ω0 where it's the first uncountably timeless number that's not affected by time entirely. Fortunately for you, you get to see the final number of Segment 4 before progressing to Segment 5. And that number would be none other than
  244. Ω0 (SEGMENT TERMINATOR)

End of Segment 4[]

Segment 5 (Hyper-fold)[]

These are numbers that literally break NO!'s videos on a level unexplainable, surpassing NO!'s Stages and Classes at ⌀ level. This goes from Ω0 to Reb⌀rn ⌀.

  1. Ω0
  2. Ω→(ω→{0})0
  3. Ω→(ω→{⌀})0
  4. Ω→(ω→{⌀,.{⌀}.,⌀ {{⌀}}})0
  5. Ω→(Cycleω ⌀)0
  6. Ω→(Cycleε ... Cycleε ⌀ xCycleε ⌀)0
  7. Ω→(Cycle... ... CycleΩ... ⌀ x... Phrase... ⌀)0
  8. Ω→(Meta... ⌀)0
  9. Ω→(Meta...2 ⌀)0
  10. Ω→(Meta... ⌀)0
  11. Ω→(Meta...... ⌀ x⌀)0
  12. Ω→(FINALITYMeta...FINALITY ⌀)0
  13. Ω→(FINALITYMeta...FINALITY ⌀ x... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...)0
  14. Ω→(Ω0)0
  15. Ω→(Ω→(Meta... ⌀)0)0
  16. Ω→(Ω→(Ω0)0)0
  17. Ω→(Ω→(Ω→(Ω0)0)0)0
  18. Ω→(Ω→(Ω→(Ω→(Ω0)0)0)0)0
  19. Ω→(...)0 x6 Ω0
  20. Ω→(...)0 x10 Ω0
  21. Ω→(...)0 xΩ Ω0
  22. Ω→(...)0 x⌀ Ω0
  23. Ω→(...)00 Ω0
  24. Ω→(...)0→(...)00 Ω0
  25. Ω→(...)0 x... xΩ00 Ω0
  26. Ω0Cycle 1
  27. Ω0Cycle 10
  28. Ω0Cycle
  29. Ω0Cycle Ω0Cycle 1
  30. Ω0Cycle ... Ω0Cycle 1
  31. Ω0Cycle ... Ω0Phrase 1
  32. Ω0Cycle ... Ω0Phrase ... Ω0Advance 1
  33. Ω010Meta 1
  34. Ω0Ω0MetaMeta 1
  35. Ω0Ω0Ω0MetaMetaMeta 1
  36. Ω0...Meta xΩ0Meta
  37. Ω0Cycle2 1
  38. Ω0Meta2
  39. Ω0Meta3
  40. Ω0Meta
  41. Ω0Meta... ⌀ xΩ0Meta
  42. Ω0CycleFINALITY
  43. Ω0PhraseFINALITY
  44. Ω0AdvanceFINALITY
  45. Ω0AccelerateFINALITY
  46. Ω0FINALITYMetaFINALITY ⌀ ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...
  47. This is the same pattern as before but to a much more powerful extent. We're not even 1/4th of the way to completing this segment. But as usual, this next number will be:
  48. Ω1 The first uncountably Super-Timeless number that's not affected by any Super-Time entirely. The Successor of Ω0.
  49. Ω1
  50. Ω→(ω→{0})1
  51. Ω→(Meta... ⌀)1
  52. Ω→(Ω0)1
  53. Ω→(...)1 x10 Ω0
  54. Ω1(Ω0Cycle 1) = Ω1(Ω00% Finished)
  55. Ω1(Ω0Meta ⌀) = Ω1(Ω014.0000000000000...% Finished)
  56. Ω1(Ω0CycleFINALITY ⌀) = Ω1(Ω020% Finished)
  57. Ω1(Ω0FINALITYMetaFINALITY ⌀ ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...) = Ω1(Ω050% Finished)
  58. Ω→(Ω1)1
  59. Ω→(Ω→(Meta... ⌀)1)1
  60. Ω→(Ω→(...)1 x10 Ω0)1
  61. Ω→(Ω1(Ω0Cycle 1))1
  62. Ω→(Ω1(Ω0CycleFINALITY ⌀))1
  63. Ω→(Ω→(Ω1)1)1
  64. Ω→(Ω→(Ω→(Ω1)1)1)1
  65. Ω→(Ω→(Ω→(Ω→(Ω1)1)1)1)1
  66. Ω→(...)1 x⌀ Ω1
  67. Ω→(...)11 Ω1
  68. Ω→(...)1→(Ω1)1 Ω1
  69. Ω→(...)1→(...)1→(Ω1)1 Ω1
  70. Ω→(...)1 x... xΩ→(Ω1)1→(Ω1)1 Ω1
  71. Ω1Cycle ⌀ = Ω11% Finished
  72. Ω1Phrase ⌀ = Ω12% Finished
  73. Ω110Meta ⌀ = Ω13% Finished
  74. Ω1Meta ⌀ = Ω14% Finished
  75. Ω1...Meta xΩ1Meta ⌀ = Ω17% Finished
  76. Ω1Cycle2 ⌀ = Ω110% Finished
  77. Ω1Accelerate2 ⌀ = Ω111% Finished
  78. Ω1Cycle3 ⌀ = Ω112% Finished
  79. Ω1Cycle ⌀ = Ω114% Finished
  80. Ω1Cycle... xΩ1Cycle ⌀ = Ω117% Finished
  81. Ω1...Meta... xΩ1Cycle ⌀ = Ω119% Finished
  82. Ω1CycleFINALITY ⌀ = Ω120% Finished
  83. Ω1FINALITYMetaFINALITY ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... = Ω150% Finished
  84. Ω1100% Finished
  85. Ω2 The first uncountably Mega-Timeless number that's not affected by any Mega-Time entirely. The Successor of Ω1. At this point, iteration is already beginning to emerge once again, but when this is a Hyper-Fold Segment, it's more than just iteration. It's no iteration no more but beyond iteration.
  86. Ω→(Ω0)2
  87. Ω→(Ω1)2
  88. Ω→(Ω11% Finished)2 = Ω2(Ω11% Finished)
  89. Ω→(Ω12% Finished)2
  90. Ω→(Ω110% Finished)2
  91. Ω→(Ω120% Finished)2
  92. Ω→(Ω150% Finished)2
  93. Ω→(Ω1100% Finished)2
  94. Ω→(Ω2)2
  95. Ω→(Ω→(Ω2)2)2
  96. Ω→(...)2→(Ω2)2
  97. Ω21% Finished
  98. Ω22% Finished
  99. Ω23% Finished
  100. Ω25% Finished
  101. Ω27% Finished
  102. Ω210% Finished
  103. Ω215% Finished
  104. Ω220% Finished
  105. Ω225% Finished
  106. Ω235% Finished
  107. Ω250% Finished
  108. Ω275% Finished
  109. Ω290% Finished
  110. Ω295% Finished
  111. Ω298% Finished
  112. Ω299% Finished
  113. Ω299.9999999999...% Finished
  114. Ω2100% Finished
  115. Ω3 The first uncountably Giga-Timeless number that's not affected by any Giga-Time entirely. The Successor of Ω2. You get the idea.
  116. Ω→(Ω3)3
  117. Ω31% Finished
  118. Ω310% Finished
  119. Ω350% Finished
  120. Ω3100% Finished
  121. Ω4
  122. Ω41% Finished
  123. Ω4100% Finished
  124. Ω5
  125. Ω6
  126. Ω7
  127. Ω8
  128. Ω9
  129. Ω10 (At this point, things will start to speed up dramatically (as in, it's going to get even more powerful))
  130. ΩΩ
  131. Ω
  132. Ω⌀+⌀
  133. ΩΩ0 The first transuncountable number that isn't based on any and all variants and subvariants of Time itself. That includes Time-warping, Time-traveling, Time-ascending, etc. etc. etc. whatever you name it. The ⌀mni-successor to ΩΩ0
  134. ΩΩΩ0
  135. ΩΩΩΩ0
  136. Ω...0
  137. Ω......0
  138. Ω→xX10
  139. Ω→xXΩ0
  140. Ω→xXΩ...0
  141. Ω→xX xXΩ0
  142. Ω→xX xX xXΩ0
  143. Ω→xX xX xX xXΩ0
  144. →xXΩ→) x10
  145. →xXΩ→) xΩ
  146. →xXΩ→) x⌀
  147. →xXΩ→) xΩ0
  148. →xXΩ→) xΩΩ0
  149. →xXΩ→) xΩ...0
  150. →xXΩ→) xΩ......0
  151. →xXΩ→) xX10
  152. →xXΩ→) xX⌀
  153. →xXΩ→) xXΩ0
  154. →xXΩ→) xXΩ...0
  155. →xXΩ→) xX xX⌀
  156. →xXΩ→) xX xX xX⌀
  157. →xXΩ→) xX xX xX xX⌀
  158. →xXΩ→) xX xX xX xX xX⌀
  159. ((Ω→xXΩ→)xXΩ→) x10
  160. ((Ω→xXΩ→)xXΩ→) x⌀
  161. ((Ω→xXΩ→)xXΩ→) xΩ0
  162. ((Ω→xXΩ→)xXΩ→) xXΩ0
  163. ((Ω→xXΩ→)xXΩ→) xX xXΩ0
  164. ((Ω→xXΩ→)xXΩ→) xX xX xXΩ0
  165. (((Ω→xXΩ→)xXΩ→)xXΩ→) xΩ0
  166. (((Ω→xXΩ→)xXΩ→)xXΩ→) xX xXΩ0
  167. ((((Ω→xXΩ→)xXΩ→)xXΩ→)xXΩ→) xΩ0
  168. (((((Ω→xXΩ→)xXΩ→)xXΩ→)xXΩ→)xXΩ→) xΩ0
  169. ((((((Ω→xXΩ→)xXΩ→)xXΩ→)xXΩ→)xXΩ→)xXΩ→) xΩ0
  170. →xXΩ→} x10
  171. →xXΩ→} xΩ0
  172. →xXΩ→} xΩ...0
  173. ({Ω→xXΩ→}xXΩ→) xΩ0
  174. (({Ω→xXΩ→}xXΩ→)xXΩ→) xΩ0
  175. ((({Ω→xXΩ→}xXΩ→)xXΩ→)xXΩ→) xΩ0
  176. {{Ω→xXΩ→}xXΩ→} xΩ0
  177. ({{Ω→xXΩ→}xXΩ→}xXΩ→) xΩ0
  178. {{{Ω→xXΩ→}xXΩ→}xXΩ→} xΩ0
  179. {{{{Ω→xXΩ→}xXΩ→}xXΩ→}xXΩ→} xΩ0
  180. {{{{{Ω→xXΩ→}xXΩ→}xXΩ→}xXΩ→}xXΩ→} xΩ0
  181. →xXΩ→] xΩ0 (Speedup from here)
  182. ([Ω→xXΩ→]xXΩ→) xΩ0
  183. {[Ω→xXΩ→]xXΩ→} xΩ0
  184. [[Ω→xXΩ→]xXΩ→] xΩ0
  185. [[[Ω→xXΩ→]xXΩ→]xXΩ→] xΩ0
  186. →xXΩ→/ xΩ0
  187. →xXΩ→\ xΩ0
  188. →xXΩ→| xΩ0
  189. →xXΩ→, xΩ0
  190. →xXΩ→. xΩ0
  191. →xXΩ→; xΩ0
  192. →xXΩ→: xΩ0
  193. →xXΩ→? xΩ0 ?=100th symbol = 100?⟨1⟩Ω→xXΩ100?⟨1⟩ xΩ0
  194. →xXΩ→? xΩ0 ?=G64th symbol = G64?⟨1⟩Ω→xXΩG64?⟨1⟩ xΩ0
  195. →xXΩ→? xΩ0 ?=Ωth symbol = Ω?⟨1⟩Ω→xXΩΩ?⟨1⟩ xΩ0
  196. →xXΩ→? xΩ0 ?=⌀th symbol = ?⟨1⟩Ω→xXΩ?⟨1⟩ xΩ0
  197. →xXΩ→? xΩ0 ?=Ω0th symbol = Ω0?⟨1⟩Ω→xXΩΩ0?⟨1⟩ xΩ0
  198. (?2)Ω→xXΩ→(?2) xΩ0 ?2=?Ω→xXΩ→? xΩ0 ?=Ω0th symbol = 2?⟨2⟩Ω→xXΩ2?⟨2⟩ xΩ0
  199. (?3)Ω→xXΩ→(?3) xΩ0 ?3=(?2)Ω→xXΩ→(?2) xΩ0 ?2=?Ω→xXΩ→? xΩ0 ?=Ω0th symbol = 3?⟨2⟩Ω→xXΩ3?⟨2⟩ xΩ0
  200. ?2Ω→xXΩ→?20 ?2=?(?-1)Ω→xXΩ→?(?-1) xΩ0 ?(?-1)=?(?-2)Ω→xXΩ→?(?-2) xΩ0 ... = 2?⟨3⟩Ω→xXΩ2?⟨3⟩ xΩ0
  201. ??Ω→xXΩ→??0 ??=BEYOND-... %- Accurate = ??⟨3⟩Ω→xXΩ??⟨3⟩ xΩ0
  202. ?→xXΩ?? xΩ0 ??=__???? %- Accurate = ??⟨4⟩Ω→xXΩ??⟨4⟩ xΩ0
  203. ??Ω→xXΩ→??0 ??=No Accuracy Detected_ = ??⟨5⟩Ω→xXΩ??⟨5⟩ xΩ0
  204. ?→xXΩ?? xΩ0 ??=_..._ = ??⟨6⟩Ω→xXΩ??⟨6⟩ xΩ0
  205. ??⟨7⟩Ω→xXΩ??⟨7⟩ xΩ0
  206. ??⟨8⟩Ω→xXΩ??⟨8⟩ xΩ0
  207. ??⟨9⟩Ω→xXΩ??⟨9⟩ xΩ0
  208. ??⟨10⟩Ω→xXΩ??⟨10⟩ xΩ0
  209. ??⟨Ω⟩Ω→xXΩ??⟨Ω⟩ xΩ0
  210. ??⟨⌀⟩Ω→xXΩ??⟨⌀⟩ xΩ0
  211. ??⟨Ω0⟩Ω→xXΩ??⟨Ω0⟩ xΩ0
  212. ??⟨??⟨1⟩⟩Ω→xXΩ??⟨??⟨1⟩⟩ xΩ0
  213. ??⟨??⟨100⟩⟩Ω→xXΩ??⟨??⟨100⟩⟩ xΩ0
  214. ??⟨??⟨⌀⟩⟩Ω→xXΩ??⟨??⟨⌀⟩⟩ xΩ0
  215. ??3⟨1⟩Ω→xXΩ??3⟨1⟩ xΩ0
  216. ??4⟨1⟩Ω→xXΩ??4⟨1⟩ xΩ0
  217. ??5⟨1⟩Ω→xXΩ??5⟨1⟩ xΩ0
  218. ??⟨1⟩Ω→xXΩ??⟨1⟩ xΩ0 = UNDEFA_X____X?_+_@_%No---_ (Beyond the Reference Sheet of Ω→0 to Absolutely Eternal (Ө) used for Segment 5 but modified) = Iterati⌀n(0) (Start of another, you know, cycle...) = Iter*Θe% Finished
  219. ???⟨1⟩Ω→xXΩ???⟨1⟩ xΩ0 (The Tri Trideration (TTT))
  220. ...?...⟨...⟩Ω→xXΩ...?...⟨...⟩ xΩ0 x?... (Uncalculatable to describe) = Iterati⌀n(1)
  221. Iterati⌀n(1) = Iterations are at ⌀ level, hyper-folding them to such points in FG that they're considered out of their own world-like area. As such, trying to place this number or any future numbers in any list is completely inaccurate. Iter*Θe% Finished
  222. Iterati⌀n(2)
  223. Iterati⌀n(10)
  224. Iterati⌀n(⌀)
  225. Iterati⌀n(Iterati⌀n(1))
  226. Iterati⌀n(⌀)
  227. Iterati⌀n{Iterati⌀n}Iterati⌀n(⌀)
  228. Iterati⌀nIterati⌀n(⌀)
  229. Iterati⌀n...(⌀) xIterati⌀nIterati⌀n(⌀)
  230. (Iterati⌀n...(⌀) xXIterati⌀n...(⌀)) xIterati⌀nIterati⌀n(⌀)
  231. |Iterati⌀n...(⌀) xXIterati⌀n...(⌀)| xIterati⌀nIterati⌀n(⌀)
  232. ??⟨10⟩Iterati⌀n...(⌀) xXIterati⌀n...(⌀)??⟨10⟩
  233. ...?...⟨...⟩Iterati⌀n...(⌀) xXIterati⌀n...(⌀)...?...⟨...⟩ = SuperIterati⌀n(1)
  234. SuperIterati⌀n(1)
  235. SuperIterati⌀n(10)
  236. SuperIterati⌀n(⌀)
  237. SuperIterati⌀n(SuperIterati⌀n(1))
  238. SuperIterati⌀nIterati⌀n(⌀)
  239. SuperIterati⌀nSuperIterati⌀n(⌀)
  240. ...?...⟨...⟩SuperIterati⌀n...(⌀) xXSuperIterati⌀n...(⌀)...?...⟨...⟩ = MegaIterati⌀n(1)
  241. MegaIterati⌀n(⌀)
  242. MegaIterati⌀nMegaIterati⌀n(⌀)
  243. ...?...⟨...⟩MegaIterati⌀n...(⌀) xXMegaIterati⌀n...(⌀)...?...⟨...⟩ = GigaIterati⌀n(1)
  244. GigaIterati⌀nGigaIterati⌀n(⌀)
  245. TeraIterati⌀n(1)
  246. PetaIterati⌀n(⌀)
  247. ExaIterati⌀n(⌀)
  248. ZettaIterati⌀n(⌀)
  249. YottaIterati⌀n(⌀)
  250. HyperIterati⌀n(⌀)
  251. RealityIterati⌀n(⌀)
  252. 12Iterati⌀n(⌀)
  253. 100Iterati⌀n(⌀)
  254. Iterati⌀n(⌀)
  255. Iterati⌀n(⌀)Iterati⌀n(⌀)
  256. Iterati⌀n(⌀)
  257. Iterati⌀n{Iterati⌀n}Iterati⌀n Iterati⌀n(⌀)
  258. Iterati⌀nIterati⌀n Iterati⌀n(⌀)
  259. Iterati⌀nIterati⌀n Iterati⌀n(⌀) Iter0% Finished
  260. (Iterati⌀n→xXIterati⌀n→) xIterati⌀nIterati⌀n Iterati⌀n(⌀) Iterati⌀n(⌀)
  261. |Iterati⌀n→xXIterati⌀n→| xIterati⌀nIterati⌀n Iterati⌀n(⌀) Iterati⌀n(⌀)
  262. ??⟨10⟩Iterati⌀n→xXIterati⌀n??⟨10⟩ xIterati⌀nIterati⌀n Iterati⌀n(⌀) Iterati⌀n(⌀)
  263. ...?...⟨...⟩Iterati⌀n→xXIterati⌀n...?...⟨...⟩ xIterati⌀nIterati⌀n Iterati⌀n(⌀) Iterati⌀n(⌀) = Iter*Θe% Finished (Still)
  264. Iter*Θe% Finished = At this point. there's no clear outcome for the Iterations that literally hyper-folded themselves to overpower itself past godly iteration to the point where anything that's ultimately time will have no effect on the repeating iteration. For this one moment, here are a few entries to compare the true scale of why it's *Θe% Finished.
  265. Iterati⌀2n(⌀)
  266. Iterati⌀...n(⌀)
  267. Iterati⌀Finalityn(⌀) = Still Iter*Θe% Finished. No amount of Finality and future iterations will ever get past *Θe%. Why? It's beyond the Iterati⌀ns of Iterati⌀ns. Trans-Iterati⌀ns? Not gonna cut it. Trans-Trans-Iterati⌀ns?? Too weak to compare. You see, even extensions of Iterati⌀ns won't get you breaking the *Θe% barrier because it's that indescribable of being this weak on the ⌀ List. But, the next entry will break that *Θe% barrier and eventually end up meeting a number in the past (that had been hyper-folded-buffed to ⌀ level to a point hyper-folded-buffed is pathetically weak compared to what is up ahead.)
  268. Iter*Θe% Finished
  269. IterSignic Absence% Finished
  270. IterAbsence ( )% Finished
  271. IterUndefined (...)% Finished
  272. IterPoint Blank (#)% Finished
  273. IterMissing Number()% Finished
  274. IterChaos% Finished
  275. IterBranoro (-=-=-)% Finished
  276. IterTutanoro ([0-0])% Finished
  277. IterGihenoro ([*--*])% Finished
  278. IterJiwanoro (/.,.,.\)% Finished
  279. IterKodanoro ("'^'")% Finished
  280. IterArrunoro (Qg3#)% Finished
  281. IterHegirondo (([{}]))% Finished
  282. IterUnderscore (_)% Finished
  283. Iter0% Finished (Originally supposed to be used for approximations earlier)
  284. IterTRULLN-Signia% Finished
  285. IterTRULLPermanence Inacquirementification Extremity Limit% Finished
  286. IterTRULLThe Real Final Point ???[3]% Finished
  287. IterTRULLN E V E R% Finished
  288. IterTRULLTerminus% Finished
  289. IterTRULLAbsolutely Eternal% Finished
  290. IterTRULLAbsolute Infinity% Finished
  291. IterTRULLOmega% Finished
  292. IterTRULLGoogol% Finished
  293. IterTRULLTrillion% Finished
  294. IterTRULL1% Finished
  295. IterTRULL0% Finished
  296. IterNegative Beyond Cardinal Unit% Finished
  297. IterEpsilon% Finished
  298. IterDelta_1% Finished
  299. IterDelta_omega% Finished
  300. IterDelta% Finished
  301. Iter1% Finished
  302. Iter2% Finished
  303. Iter3% Finished
  304. Iter5% Finished
  305. Iter7% Finished
  306. Iter10% Finished
  307. Iter15% Finished
  308. Iter20% Finished
  309. Iter25% Finished
  310. Iter35% Finished
  311. Iter50% Finished
  312. Iter65% Finished
  313. Iter75% Finished
  314. Iter90% Finished
  315. Iter95% Finished
  316. Iter97% Finished
  317. Iter98% Finished
  318. Iter99% Finished
  319. Iter99.9% Finished
  320. Iter99.999999% Finished
  321. Iter99.9999999999999999...% Finished
  322. Iter100% Finished = At this point, it may have been completed, but we're still not even close to what the mentioned past number is. But, since this is for, you know... let's explore...
  323. TruelvlA) = ΩAThe smallest True level Absolute A at ⌀ level that encompasses everything below regardless of any continuous, continuum, constantly, etc. whatever you name it. Here, a new *function* has appeared to boost Segment 5 at hyper-fold levels. Get ready cause it's going to be insanely powerful, more powerful than anything those could have conceived of.
  324. A→xXΩA→| xΩA0
  325. ΩAIterati⌀n(⌀)
  326. ΩASuperIterati⌀n(⌀)
  327. ΩAIterati⌀2n(⌀)
  328. ΩAIterati⌀Finalityn(⌀)
  329. ΩAIter*Θe% Finished
  330. ΩAIter0% Finished
  331. ΩAIter10% Finished
  332. ΩAIter100% Finished
  333. TruelvlA+1)
  334. ΩA+1SuperIterati⌀n(⌀)
  335. ΩA+1Iterati⌀Finalityn(⌀)
  336. ΩA+1Iter*Θe% Finished
  337. ΩA+1Iter100% Finished
  338. TruelvlA+2)
  339. ΩA+2Iterati⌀Finalityn(⌀)
  340. ΩA+2Iter100% Finished
  341. TruelvlA+3)
  342. TruelvlA+3) ΩA+3Iter100% Finished
  343. TruelvlA+4)
  344. TruelvlA+5)
  345. TruelvlA+7)
  346. TruelvlA+10)
  347. TruelvlA+Ω)
  348. TruelvlA+A)
  349. TruelvlAA)
  350. TruelvlAA)
  351. TruelvlAA)
  352. TruelvlA→A)
  353. TruelvlA→...A→A)
  354. TruelvlA→... xXΩA→A)
  355. Truelvl((ΩA→xXΩA→) xΩA→A)
  356. Truelvl(|ΩA→xXΩA→| xΩA→A)
  357. Truelvl(?ΩA→xXΩA→? xΩA→A)
  358. Truelvl(ΩA→0% Finished) = Without that, the true scale of this segment would be like the previous *cycles* and stuff like that but on a more repeating scale, to the point that it can't be theoretically typed on a keyboard due to how insane these numbers will be.
  359. Truelvl(ΩA→1% Finished)
  360. Truelvl(ΩA→10% Finished)
  361. Truelvl(ΩA→100% Finished)
  362. TruelvlB)
  363. TruelvlB+10)
  364. TruelvlBB)
  365. TruelvlB→... xXΩB→B)
  366. Truelvl(?ΩB→xXΩB→? xΩB→B)
  367. Truelvl(ΩB→1% Finished)
  368. Truelvl(ΩB→100% Finished)
  369. TruelvlC)
  370. TruelvlCC)
  371. Truelvl(?ΩC→xXΩC→? xΩC→C)
  372. Truelvl(ΩC→100% Finished)
  373. TruelvlD)
  374. Truelvl(ΩD→100% Finished)
  375. TruelvlE)
  376. TruelvlF)
  377. TruelvlG)
  378. TruelvlH)
  379. TruelvlI)
  380. TruelvlM)
  381. TruelvlT)
  382. TruelvlZ)
  383. Truelvl(1Ω) = Undefinably Undefinitively Undefinable from ⌀TruelvlZ). Without that, the number would break beyond not just cycles but layering inside itself even and more that it's undefinably undefinitively undefinable to describe. Truly ineffable without this *function*.
  384. Truelvl(2Ω) = Truly more ineffable than ⌀Truelvl(1Ω) without this *function*
  385. Truelvl(3Ω)
  386. Truelvl(10Ω)
  387. Truelvl(ΩΩ)
  388. Truelvl(ΩAΩ)
  389. Truelvl(1ΩΩ)
  390. Truelvl(ΩΩΩ)
  391. Truelvl(ΩΩΩΩ)
  392. Truelvl(ΩΩΩΩΩ)
  393. Truelvl(...Ω xΩΩ)
  394. Truelvl(...Ω xXΩΩ)
  395. Truelvl((...Ω xX...Ω) xΩΩ)
  396. Truelvl(?...Ω xX...Ω? xΩΩ)
  397. Truelvl(1/Ω)
  398. Truelvl(?...1/Ω xX...1/Ω? x1/ΩΩΩ)
  399. Truelvl(2/Ω)
  400. Truelvl(?...2/Ω xX...2/Ω? x2/ΩΩΩ)
  401. Truelvl(3/Ω)
  402. Truelvl(4/Ω)
  403. Truelvl(5/Ω)
  404. Truelvl/Ω)
  405. Truelvl(ΩΩ/Ω)
  406. Truelvl(1/0/Ω)
  407. Truelvl(1/?...Ω xX...Ω? xΩΩ/Ω)
  408. Truelvl(2/0/Ω)
  409. Truelvl(3/Ω/Ω)
  410. Truelvl/Ω/Ω)
  411. Truelvl(1/0/0/Ω)
  412. Truelvl(1/0/1/Ω)
  413. Truelvl(1/1/0/Ω)
  414. Truelvl(2/Ω/Ω/Ω)
  415. Truelvl/Ω/Ω/Ω)
  416. Truelvl/Ω/Ω/Ω/Ω)
  417. Truelvl/Ω/Ω/Ω/Ω/Ω)
  418. Truelvl//Ω)
  419. Truelvl/Ω//Ω)
  420. Truelvl//Ω//Ω)
  421. Truelvl//Ω//Ω//Ω)
  422. Truelvl///Ω)
  423. Truelvl////Ω)
  424. Truelvl/////Ω)
  425. Truelvl/{Ω}/Ω)
  426. Truelvl/{Ω/{Ω}/Ω}/Ω)
  427. Truelvl/{Ω/{Ω/{Ω}/Ω}/Ω}/Ω)
  428. Truelvl/{{Ω}}/Ω)
  429. Truelvl/{{{Ω}}}/Ω)
  430. Truelvl/{...{Ω}...}/Ω)
  431. Truelvl/1//Ω)
  432. Truelvl/1///Ω)
  433. Truelvl/1/{{Ω}}/Ω)
  434. Truelvl/2//Ω)
  435. Truelvl/4//Ω)
  436. Truelvl//Ω)
  437. Truelvl/1/0//Ω)
  438. Truelvl/1/Ω//Ω)
  439. Truelvl/0//Ω)
  440. Truelvl/1/0/0//Ω)
  441. Truelvl///Ω)
  442. Truelvl/{{Ω}}//Ω)
  443. Truelvl//1///Ω)
  444. Truelvl///1////Ω)
  445. Truelvl///...///Ω xΩ)
  446. Truelvl///...///Ω xΩ///Ω)
  447. Truelvlπ = Ω///...///Ω xXΩ///Ω) = Absolute Pi at True ⌀ Level. N E V E R at ⌀ level is weak compared to this. At ⌀ Level is weaker than At True ⌀ Level due to the trueness of ⌀ and this list. Anything at ⌀ level is to estimate what it would be if it was compared to something at normal level. With True Level, we're essentially comparing what it would look like if the ⌀ List never used the ⌀Truelvl(x) *function* which, would be many infeffables normally. So, we've shrunken the amount of entries the ⌀ List would previously look like had ⌀Truelvl(x) not been created nor existed.
  448. Truelvl = Ωπ///...///Ωπ xXΩπ///Ωπ)
  449. Truelvl = Ω田///...///Ω田 xXΩ田///Ω田)
  450. Truelvl(Mathis Absolutes (This goes from Absolute Pi to Absolute XITYA Limit))
  451. Truelvl(Absolutely Eternal (Ө)) = The point where normally (yata yata you know the deal), this number is so ineffable it's ineff-ineffably ineff-ineffable where no amount of ζ Zetaphile Regiment's Cosmonumber Classes can contain such an elegant yet, destructive number.
  452. Truelvl(1🔁)
  453. Truelvl(2🔁)
  454. Truelvl(3🔁)
  455. Truelvl(10🔁)
  456. Truelvl(🔁🔁)
  457. Truelvl(🔁x🔁)
  458. Truelvl(🔁xX🔁)
  459. Truelvl(🔁→{🔁,,🔁 {{🔁}}})
  460. Truelvl(🔁→🔁)
  461. Truelvl(...?🔁→xX🔁→...? x🔁→🔁)
  462. Truelvl(🔁A)
  463. Truelvl(🔁π)
  464. Truelvl(Ʊ)
  465. Truelvl(⊞)
  466. Truelvl(ῷ)
  467. Truelvl(①)
  468. Truelvl(ധ)
  469. Truelvl(⅊)
  470. Truelvl(ⅇ)
  471. Truelvl(⏦)
  472. Truelvl(Λ)
  473. Truelvl(☉) = Terminus at True ⌀ Level. At this level, things get... weird. To put it in perspective, let's say this functi⌀n never existed. How would we reach Terminus at True ⌀ Level? Short answer, you can't. Why? Without that functi⌀n, it would collapse our universe, collapse any form of writing, post-writing, post-post-writing, etc. Even any form of potential, post-potential, etc. would collapse under this one number. Time to speed things up so we can get to ⌀
  474. Truelvl(⌺)
  475. Truelvl(♈︎)
  476. Truelvl(♉)
  477. Truelvl(-finity[☉])
  478. Truelvl(-finity[[]] x-finity[10])
  479. Truelvl(-finity[[1]])
  480. Truelvl(-finity[[[10]]])
  481. Truelvl(-finity.[[[10]]].)
  482. Truelvl(-finity(10))
  483. Truelvl(-finity?10?)
  484. Truelvl(‡)
  485. Truelvl(‡ {x^‡} ‡)
  486. Truelvl(‡ {x(‡)‡} ‡)
  487. Truelvl(‡ .{x^‡}. ‡)
  488. Truelvl(‡ (x^‡) ‡)
  489. Truelvl(‡ ?x^‡? ‡)
  490. Truelvl(Ɒ)
  491. Truelvl(Ø) (This is Corrupfinity, NOT ⌀. It's rotated 90 degrees)
  492. Truelvl(ᴕ)
  493. Truelvl(₪)
  494. Truelvl(℘)
  495. Truelvl(⟐)
  496. Truelvl(⟐ {x^⟐} ⟐)
  497. Truelvl(⟐ {xX^⟐} ⟐)
  498. Truelvl(⟐ {x...X^⟐} ⟐ x⟐)
  499. Truelvl(⟐ {x{^x1}} ⟐)
  500. Truelvl(⟐ {x{^x{^x⟐}}} ⟐)
  501. Truelvl(⟐ {{x^⟐}} ⟐)
  502. Truelvl(⟐ .{x^⟐}. ⟐)
  503. Truelvl(⟐ ?x^⟐? ⟐)
  504. Truelvl(⟐ {.x^⟐.} ⟐)
  505. Truelvl(⟐ ..x^⟐.. ⟐)
  506. Truelvl(⟐ {(x^+)x⟐} ⟐)
  507. Truelvl(⟐ {x^+}xX⟐ x⟐} ⟐)
  508. Truelvl(⟐ {((x^+)xX(x^+)xX⟐) x⟐} ⟐)
  509. Truelvl(⟐ {?(x^+)xX(x^+)xX⟐? x⟐} ⟐)
  510. Truelvl(ῼ)
  511. Truelvl(Ῥ)
  512. Truelvl(ᾮ)
  513. Truelvl(Ὀ)
  514. Truelvl(Ψ)
  515. Truelvl(Ψ {((x+^)xXΨ) xΨ} Ψ)
  516. Truelvl(Ψ {(|(x+^)xXΨ|) [⟲] xΨ} Ψ)
  517. Truelvl(Ψ {(|(x+^)xXΨ|) [[→] xΨ⟲] xΨ} Ψ)
  518. Truelvl(Ψ {(|(x+^)xXΨ|) [[→2] xΨ⟲] xΨ} Ψ xΨ)
  519. Truelvl(Ψ {(|(x+^)xXΨ|) [[→2] xΨ⟲] xΨ} Ψ)
  520. Truelvl(Ψ {(|(x+^)xXΨ|) [[→] xΨ⟲] xΨ} Ψ)
  521. Truelvl(P)
  522. Truelvl(Π‌)
  523. Truelvl(Ξ)
  524. Truelvl(Ͷ)
  525. Truelvl(Ͷ {[⨂xͶ]} Ͷ)
  526. Truelvl(Ͷ {|⨂xͶ|} Ͷ)
  527. Truelvl(Ͷ {⨂x⨂} Ͷ)
  528. Truelvl(Ͷ {|⨂|} Ͷ)
  529. Truelvl(Ͳ)
  530. Truelvl(Ͱ)
  531. Truelvl(∫)
  532. Truelvl(∮)
  533. Truelvl(֍)
  534. Truelvl(𝔈)
  535. Truelvl(S.N.T.A.G.U.O.M.S.E.M.G.E)
  536. Truelvl(Endingteration(𝔈))
  537. Truelvl(Superendingteration (𝔈))
  538. Truelvl(Endingterationthendingteration (𝔈))
  539. Truelvl(𝔈←Endingteration (𝔈))
  540. Truelvl(𝔈←Endingteration←Endingteration (𝔈))
  541. Truelvl(𝔈←Endingteration𝔈 (𝔈))
  542. Truelvl(𝔈←←Endingteration (𝔈))
  543. Truelvl(𝔈←(𝔈)←Endingteration (𝔈))
  544. Truelvl(𝔈←|𝔈|←Endingteration (𝔈))
  545. Truelvl(𝔈←?𝔈?←Endingteration (𝔈))
  546. Truelvl(𝔈←???𝔈𝔈???←Endingteration (𝔈))
  547. Truelvl(𝔈←???𝔈→{𝔈, 𝔈, 𝔈}???←Endingteration (𝔈))
  548. Truelvl(𝔈←???{𝔈, 𝔈, 𝔈}←𝔈???←Endingteration (𝔈))
  549. Truelvl(Cycle: 𝔈←???{{{𝔈}} 𝔈,.|?...?|𝔈|?...?|.,𝔈}←𝔈???←Endingteration (𝔈))
  550. Truelvl(Phrase: 𝔈←???{{{𝔈}} 𝔈,.|?...?|𝔈|?...?|.,𝔈}←𝔈???←Endingteration (𝔈))
  551. Truelvl(ↇ) = N E V E R at True ⌀ Level. This is the smallest number bigger than any set of Segments that are normally on the ⌀ List. So you could say this number is bigger than Segment 10 normally. At this point, we will get to NO!'s numbers and surpass that at True ⌀ Level so we can go beyond all numbers, even numbers that could theoretically exist in one way or another, even numbers that don't seem to link to other numbers, whatever you name it.
  552. Truelvl(⟠)
  553. Truelvl(Eta Hyper One Cardinal)
  554. Truelvl(THE END)
  555. Truelvl(THE ULTIMATE REBIRTH)
  556. Truelvl(Ultimate Loop #1)
  557. Truelvl(Paradoxmeility)
  558. Truelvl(True Cycle)
  559. Truelvl(Axiomatic Limit)
  560. Truelvl(Small Ignorance Ordinal)
  561. Truelvl(The True Cardinal)
  562. Truelvl(The Phrase Function)
  563. Truelvl(Fillifinitillity)
  564. Truelvl(Circliumize One of Numbers)
  565. Truelvl(Transilimizized of Numbers)
  566. Truelvl(THE MYSTERIOUS)
  567. Truelvl(F.I.N.A.L.)
  568. Truelvl(T.H.E. F.I.N.A.L. E.N.D.I.N.G.)
  569. Truelvl(THE E...N...D...)
  570. Truelvl(T-H-E E-N-D)
  571. Truelvl(Mastery One)
  572. Truelvl(Mastery Two)
  573. Truelvl(Milliliniunium)
  574. Truelvl(New Number+ - 10)
  575. Truelvl(Metaprestige of Numbers+)
  576. Truelvl(Omnivssunians)
  577. Truelvl(Finitausmitnuiansutjizataimetafiniziizium)
  578. Truelvl(GOODBYE OF NUMBERS)
  579. Truelvl(THE F-I*N!A]L)
  580. Truelvl(The Real Final Point (???[3]))
  581. Truelvl(The Force Limit of Ends)
  582. Truelvl(INDERPOWERILIN-CLASS-FINITE)
  583. Truelvl(LIMIT OF EXTENDING)
  584. Truelvl(ABSOLUTE BREAKDOWN)
  585. Truelvl(B.E.Y.O.N.D.)
  586. Truelvl(P.A.R.A.L.L.E.L.)
  587. Truelvl(OMEGATION)
  588. Truelvl(Another version of EX[])
  589. Truelvl(The Maxionumfinity)
  590. Truelvl(Omnimonstrity)
  591. Truelvl(The Toxicaion)
  592. Truelvl(The Endfimidian Breakdown)
  593. Truelvl(Absolute Fictional Numbers)
  594. Truelvl(THE GALACITY METIORFINIEN)
  595. Truelvl(The Entri-End)
  596. Truelvl(Breakifaunt Pantilitol)
  597. Truelvl(The Section Dialations)
  598. Truelvl(Tyrant) (I'm only referring to this number due to previous number claiming it's smaller than Tyrant on its infobox.)
  599. Truelvl(IIUUIITL) What kind of logic would this give off? At this point, it would absolutely demolish the entirety of NO!'s Season 1 and possibly Season 2 entirely. We're going all around now...
  600. Truelvl(PIEL)
  601. Truelvl(TAIL)
  602. Truelvl(ABN (uncollapsed, intentional))
  603. Truelvl(Survi Propellant)
  604. Truelvl(B.P.U.U.T.L.A.N.U.L.) The two (Survi Propellant and B.P.U.U.T.L.A.N.U.L.) aren't exactly sure of which is larger than the other.
  605. Truelvl(V-Lock)
  606. Truelvl(True Real Limitless)
  607. Truelvl(O.B.R.V.T.U.C.) :trol: (From here, the entries may be inaccurate due to their individual pages not having up-to-date information on what goes beyond or not.)
  608. Truelvl(Concept Infinity?)
  609. Truelvl(Hard-V-Lock)
  610. Truelvl(The RFEN/A(x) Function)
  611. Truelvl(The Next Level)
  612. Truelvl(The Fictional Lock (Absolute Normal Entry Terminator))
  613. Truelvl(0!⌬0)
  614. Truelvl(The Chronic Ineffability Breakdown?) (The Last Non-⌀ entry before ⌀)
  615. Truelvl(⌀) It starts over again. From here, entries are now accurate. But, from here, it gets to a point where in its normal form, it would completely end the ⌀ List, finishing it for good. But, that can be pushed even further with this functi⌀n. It is the super-qualificantance of time itself, establishing absolute time within its domain, far more supremum than any time alongside its qualificantance.
  616. Truelvl(⌀+⌀) The mega-qualificantance of time itself, establishing super-absolute time within its domain, far more supremum than any super-time alongside its super-qualificantance.
  617. Truelvl(⌀^⌀) The tera-qualificantance of time itself, ... you know what comes next... right?
  618. Truelvl({⌀, ⌀[⌀]⌀})
  619. Truelvl)
  620. Truelvl) The absolute-qualificantance of time itself, proving its dominance and supremum over all, establishing everything within its domain, absolute supremum at its best.
  621. Truelvl(⌀) The ⌀-qualificantance of time itself, proving its truly ⌀-dominance and ⌀-supremum over all, ⌀-establishing what had already been established within its ⌀-domain, ⌀-supremum at its ⌀-best. Ascension, Transcension, Recursion, what comes after recursion? ⌀ as the last and first index of the list... it is ⌀-immortal.
  622. Truelvl(ω→{⌀, ⌀, ⌀})
  623. Truelvl(ω→{⌀,.?⌀?.,⌀ {{⌀}}})
  624. Truelvl(Cycleω ⌀)
  625. Truelvl(ε→{0})
  626. Truelvl(ζ→{0})
  627. Truelvl((⌀th ∞th) Infinity)
  628. Truelvl(Cycle... ⌀)
  629. Truelvl(Meta... ⌀)
  630. Truelvl(FINALITYMeta...FINALITY ⌀)
  631. Truelvl0)
  632. Truelvl1)
  633. TruelvlΩ0)
  634. Truelvl((Ω→xXΩ→) xΩ0)
  635. Truelvl(?Ω→xXΩ→? xΩ0)
  636. Truelvl(Iterati⌀n(1))
  637. Truelvl(Iter*Θe% Finished)
  638. TruelvlA)
  639. Truelvl(⌀TruelvlA+1)) The layering of ⌀Truelvl(x) begins
  640. Truelvl(⌀TruelvlB))
  641. Truelvl(⌀Truelvl/Ω))
  642. Truelvl(⌀Truelvlπ))
  643. Truelvl(⌀Truelvl))
  644. Truelvl(⌀Truelvl))
  645. Truelvl(⌀Truelvl(Ө))
  646. Truelvl(⌀Truelvl(☉))
  647. Truelvl(⌀Truelvl(⟐))
  648. Truelvl(⌀Truelvl(Ψ))
  649. Truelvl(⌀Truelvl(֍))
  650. Truelvl(⌀Truelvl(𝔈))
  651. Truelvl(⌀Truelvl(ↇ))
  652. Truelvl(⌀Truelvl(⟠)) Remember that one entry? It is exactly 100 entries away.
  653. Truelvl(⌀Truelvl(THE ULTIMATE REBIRTH))
  654. Truelvl(⌀Truelvl(T.H.E. F.I.N.A.L. E.N.D.I.N.G.))
  655. Truelvl(⌀Truelvl(The Real Final Point (???[3])))
  656. Truelvl(⌀Truelvl(ABSOLUTE BREAKDOWN))
  657. Truelvl(⌀Truelvl(OMEGATION))
  658. Truelvl(⌀Truelvl(Omnimonstrity))
  659. Truelvl(⌀Truelvl(Absolute Fictional Numbers))
  660. Truelvl(⌀Truelvl(The Section Dialations))
  661. Truelvl(⌀Truelvl(IIUUIITL)) No explanation needed
  662. Truelvl(⌀Truelvl(Survi Propellant))
  663. Truelvl(⌀Truelvl(True Real Limitless))
  664. Truelvl(⌀Truelvl(The Fictional Lock))
  665. Truelvl(⌀Truelvl(0!⌬0))
  666. Truelvl(⌀Truelvl(The Chronic Ineffability Breakdown?))
  667. Truelvl(⌀Truelvl(⌀)) 52 entries later, it's not just undescribable, it's ⌀-describable, infinite thoughts aren't enough. No amount of normal thought and OLD Reality Layers could comprehend such a number.
  668. Truelvl(⌀Truelvl(⌀))
  669. Truelvl(⌀Truelvl((⌀th ∞th) Infinity))
  670. Truelvl(⌀Truelvl0))
  671. Truelvl(⌀TruelvlA))
  672. Truelvl(⌀Truelvl(⌀Truelvl(Ө)))
  673. Truelvl(⌀Truelvl(⌀Truelvl(☉)))
  674. Truelvl(⌀Truelvl(⌀Truelvl(ↇ)))
  675. Truelvl(⌀Truelvl(⌀Truelvl(⟠)))
  676. Truelvl(⌀Truelvl(⌀Truelvl(T.H.E. F.I.N.A.L. E.N.D.I.N.G.)))
  677. Truelvl(⌀Truelvl(⌀Truelvl(The Real Final Point (???[3]))))
  678. Truelvl(⌀Truelvl(⌀Truelvl(Absolute Fictional Numbers)))
  679. Truelvl(⌀Truelvl(⌀Truelvl(The Fictional Lock)))
  680. Truelvl(⌀Truelvl(⌀Truelvl(⌀))) And again... it repeats
  681. Truelvl(⌀Truelvl(⌀Truelvl0)))
  682. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(☉))))
  683. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⟠))))
  684. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(The Real Final Point (???[3])))))
  685. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(The Fictional Lock))))
  686. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀)))) Let's just get this over with
  687. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⟠)))))
  688. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀)))))
  689. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀))))))
  690. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀)))))))
  691. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀))))))))
  692. Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀Truelvl(⌀)))))))))
  693. Truelvl(. x10
  694. Truelvl(. x⌀
  695. Truelvl(. x⌀Truelvl(⌀)
  696. Truelvl(. x⌀Truelvl(. x⌀
  697. Truelvl(. xX⌀
  698. (⌀Truelvl(. xX⌀Truelvl(.) x⌀
  699. ((⌀Truelvl(. xX⌀Truelvl(.)xX⌀Truelvl(.) x⌀
  700. {⌀Truelvl(. xX⌀Truelvl(.} x⌀
  701. [⌀Truelvl(. xX⌀Truelvl(.] x⌀
  702. /⌀Truelvl(. xX⌀Truelvl(./ x⌀
  703. |⌀Truelvl(. xX⌀Truelvl(.| x⌀
  704. ?⌀Truelvl(. xX⌀Truelvl(.? x⌀
  705. ??⟨⌀⟩⌀Truelvl(. xX⌀Truelvl(.??⟨⌀⟩ x⌀
  706. TruelvlIterati⌀n(⌀)
  707. Truelvl⌀Iterati⌀n(⌀)
  708. TruelvlΩA
  709. Super ⌀Truelvl(⌀)
  710. Super ⌀Truelvl(. xX⌀
  711. |Super ⌀Truelvl(. xXSuper ⌀Truelvl(.| x⌀
  712. SuperTruelvlIterati⌀n(⌀)
  713. SuperTruelvlΩA = M⌀TLA)
  714. M⌀TLA)
  715. M⌀Truelvl(. xX⌀
  716. MTLΩA = G⌀TLA) or Giga ⌀TruelvlA)
  717. GTLΩA = T⌀TLA) or Tera ⌀TruelvlA)
  718. TTLΩA = P⌀TLA) or Peta ⌀TruelvlA)
  719. E⌀TLA)
  720. Z⌀TLA)
  721. Y⌀TLA)
  722. 100[1]⌀TL(⌀) = A new function. 100 represents 100th-⌀TL(x), [1] is similar to BAN, and ⌀TL(⌀) is the initial value.
  723. 1000[1]⌀TL(⌀)
  724. TL(⌀)[1]⌀TL(⌀)
  725. S⌀TL(⌀)[1]⌀TL(⌀)
  726. M⌀TL(⌀)[1]⌀TL(⌀)
  727. G⌀TL(⌀)[1]⌀TL(⌀)
  728. 100[1]⌀TL(⌀)[1]⌀TL(⌀)
  729. ⌀[1]⌀TL(⌀)
  730. ⌀[1]⌀TL(⌀)[1]⌀TL(⌀)
  731. ⌀[1]⌀TL(⌀)[1]⌀TL(⌀)[1]⌀TL(⌀)
  732. 100[2]⌀TL(⌀)
  733. ⌀[2]⌀TL(⌀)
  734. ⌀[1]⌀TL(⌀)[2]⌀TL(⌀)
  735. ⌀[2]⌀TL(⌀)[2]⌀TL(⌀)
  736. ⌀[2]⌀TL(⌀)[2]⌀TL(⌀)[2]⌀TL(⌀)
  737. ⌀[2]⌀TL(⌀)[2]⌀TL(⌀)[2]⌀TL(⌀)[2]⌀TL(⌀)
  738. ⌀[3]⌀TL(⌀)
  739. ⌀[3]⌀TL(⌀)[3]⌀TL(⌀)
  740. ⌀[3]⌀TL(⌀)[3]⌀TL(⌀)[3]⌀TL(⌀)
  741. ⌀[4]⌀TL(⌀)
  742. ⌀[4]⌀TL(⌀)[4]⌀TL(⌀)
  743. ⌀[5]⌀TL(⌀)
  744. ⌀[5]⌀TL(⌀)[5]⌀TL(⌀)
  745. ⌀[6]⌀TL(⌀)
  746. ⌀[7]⌀TL(⌀)
  747. ⌀[8]⌀TL(⌀)
  748. ⌀[9]⌀TL(⌀)
  749. ⌀[10]⌀TL(⌀)
  750. ⌀[⌀]⌀TL(⌀)
  751. ⌀[⌀[⌀]⌀TL(⌀)]⌀TL(⌀)
  752. 3[[1]]⌀TL(⌀)
  753. ⌀[[1]]⌀TL(⌀)
  754. ⌀[[1]]⌀TL(⌀)[[1]]⌀TL(⌀)
  755. ⌀[[2]]⌀TL(⌀)
  756. ⌀[[2]]⌀TL(⌀)[[2]]⌀TL(⌀)
  757. ⌀[[3]]⌀TL(⌀)
  758. ⌀[[4]]⌀TL(⌀)
  759. ⌀[[⌀]]⌀TL(⌀)
  760. ⌀[[⌀[⌀]⌀TL(⌀)]]⌀TL(⌀)
  761. ⌀[[⌀[[⌀]]⌀TL(⌀)]]⌀TL(⌀)
  762. ⌀[[[1]]]⌀TL(⌀)
  763. ⌀[[[2]]]⌀TL(⌀)
  764. ⌀[[[⌀]]]⌀TL(⌀)
  765. ⌀[[[⌀[[[⌀]]]⌀TL(⌀)]]]⌀TL(⌀)
  766. ⌀[[[[⌀]]]]⌀TL(⌀)
  767. ⌀[[[[[⌀]]]]]⌀TL(⌀)
  768. ⌀[[[[[[⌀]]]]]]⌀TL(⌀)
  769. ⌀[[[[[[[⌀]]]]]]]⌀TL(⌀)
  770. 10(1)⌀TL(⌀)
  771. 100(1)⌀TL(⌀)
  772. ⌀(1)⌀TL(⌀)
  773. ⌀[1]⌀TL(⌀)(1)⌀TL(⌀)
  774. ⌀(1)⌀TL(⌀)(1)⌀TL(⌀)
  775. ⌀(2)⌀TL(⌀)
  776. ⌀(4)⌀TL(⌀)
  777. ⌀(⌀)⌀TL(⌀)
  778. ⌀(⌀(⌀)⌀TL(⌀))⌀TL(⌀)
  779. ⌀((1))⌀TL(⌀)
  780. ⌀((⌀))⌀TL(⌀)
  781. ⌀((⌀((⌀))⌀TL(⌀)))⌀TL(⌀)
  782. ⌀(((⌀)))⌀TL(⌀)
  783. ⌀((((⌀))))⌀TL(⌀)
  784. 10{1}⌀TL(⌀)
  785. ⌀{1}⌀TL(⌀)
  786. ⌀{1}⌀TL(⌀){1}⌀TL(⌀)
  787. ⌀{2}⌀TL(⌀)
  788. ⌀{⌀}⌀TL(⌀)
  789. ⌀{⌀{⌀}⌀TL(⌀)}⌀TL(⌀)
  790. ⌀{{1}}⌀TL(⌀)
  791. ⌀{{⌀}}⌀TL(⌀)
  792. ⌀{{{⌀}}}⌀TL(⌀)
  793. ⌀{{{{⌀}}}}⌀TL(⌀)
  794. 10/1/⌀TL(⌀)
  795. ⌀/1/⌀TL(⌀)/1/⌀TL(⌀)
  796. ⌀/2/⌀TL(⌀)
  797. ⌀/⌀/⌀TL(⌀)
  798. ⌀//⌀//⌀TL(⌀)
  799. ⌀///⌀///⌀TL(⌀)
  800. ⌀|⌀|⌀TL(⌀)
  801. ⌀||⌀||⌀TL(⌀)
  802. ⌀?⌀?⌀TL(⌀)
  803. ??⟨⌀⟩⌀??⟨⌀⟩⌀TL(⌀)
  804. ??⟨⌀⟩⌀??⟨⌀⟩⌀TL(⌀)
  805. Iterati⌀n?⌀?⌀TL(⌀)
  806. ...?⌀?⌀TL(⌀)
  807. TL(0)-1 Each number is ⌀-scaled to be more ⌀-ineffable than the previous
  808. TL(1)-1 More ⌀-ineffable than the previous
  809. TL(2)-1
  810. TL(⌀)-1
  811. ⌀[1]⌀TL(⌀)-1
  812. ⌀|1|⌀TL(⌀)-1
  813. TL(0)-1-1 It's beyond ⌀-scaling now
  814. Iterati⌀nTL(0)-1
  815. TL(0)-1-1-1
  816. TL(0)-1-1-1-1
  817. TL(0)--1
  818. TL(0)---1
  819. TL(0)-(⌀)-1
  820. TL(0)-(⌀TL(0)-(⌀)-1)-1
  821. TL(0)-{⌀}-1
  822. TL(0)-|⌀|-1
  823. TL(0)-?⌀?-1
  824. Iterati⌀nTL(0)-?⌀?-1
  825. ...TL(0)-?⌀?-1
  826. TL(0)-2 Each number is indecipherable, indescribable, ineffable, etc. (+)(*)(^)(etc.) (⌀), etc. etc. etc......--Closer to 𝕋𝕙𝕖 𝕋𝕣𝕦𝕖 𝕃𝕚𝕞𝕚𝕥 than before by a huge margin.
  827. Iterati⌀nTL(⌀)-2
  828. TL(⌀)-2-1
  829. Iterati⌀nTL(⌀)-2-1
  830. TL(⌀)-2--1
  831. Iterati⌀nTL(⌀)-2-...?⌀?...-1
  832. TL(⌀)-2-2
  833. Iterati⌀nTL(⌀)-2-2
  834. TL(⌀)-2-2-1
  835. TL(⌀)-2-2--1
  836. TL(⌀)-2-2-?⌀?-1
  837. TL(⌀)-2-2-2
  838. TL(⌀)--2
  839. TL(⌀)-?⌀?-2
  840. TL(⌀)-3-1
  841. TL(⌀)-3--1
  842. TL(⌀)-3-2
  843. TL(⌀)-3--2
  844. TL(⌀)-3-3
  845. TL(⌀)--3
  846. TL(⌀)-4
  847. TL(⌀)-4-3
  848. TL(⌀)-4--3
  849. TL(⌀)-4-4
  850. TL(⌀)--4
  851. TL(⌀)-5
  852. TL(⌀)--5
  853. TL(⌀)-6
  854. TL(⌀)-7
  855. TL(⌀)-8
  856. TL(⌀)-9
  857. TL(⌀)-10
  858. TL(⌀)-⌀
  859. TL(⌀)-⌀TL(⌀)-1
  860. TL(⌀)-⌀TL(⌀)-⌀TL(⌀)-1
  861. TL(⌀)--(10)
  862. TL(⌀)--(⌀)
  863. TL(⌀)--(⌀TL(⌀)--(⌀))
  864. TL(⌀)---(⌀)
  865. TL(⌀)----(⌀)
  866. TL(⌀)-(⌀)-(⌀)
  867. TL(⌀)-|⌀|-(⌀)
  868. TL(⌀)--{⌀}
  869. TL(⌀)--[⌀]
  870. TL(⌀)--/⌀/
  871. TL(⌀)--|⌀|
  872. TL(⌀)--?⌀?
  873. TL(⌀)--??⟨⌀⟩⌀??⟨⌀⟩
  874. Iterati⌀nTL(⌀)--?⌀?
  875. TL{1} A new kind of layering now begins.
  876. TL{10}
  877. TL{⌀}
  878. TL{⌀TL{⌀}}
  879. S⌀TL{⌀}
  880. M⌀TL{⌀}
  881. TL{⌀}[1]⌀TL{⌀}
  882. TL{⌀}|1|⌀TL{⌀}
  883. TL{⌀}[1]⌀TL{⌀}
  884. TL{0}-1
  885. TL{0}--1
  886. TL{0}-2
  887. TL{0}-3
  888. TL{0}-⌀
  889. TL{0}-⌀TL{0}-⌀
  890. TL{0}--(⌀)
  891. TL{0}--{⌀}
  892. TL{0}--|⌀|
  893. Iterati⌀nTL{⌀}--?⌀?
  894. TL[1]
  895. TL[⌀TL[⌀]]
  896. TL[⌀][1]⌀TL[⌀]
  897. TL[0]-1
  898. TL[0]--[⌀]
  899. TL/1/
  900. TL/0/-⌀TL/0/-⌀
  901. TL|1|
  902. TL?0?
  903. TL??⟨⌀⟩0??⟨⌀⟩
  904. Iterati⌀nTL??⟨⌀⟩0??⟨⌀⟩
  905. ...TL??⟨⌀⟩0??⟨⌀⟩
  906. 1-⌀TL(1) Welcome to the final layering of ⌀Truelvl(x). After this, we've practically broken the ⌀ List in its normal form. There are so many forms the ⌀ List can take, but ⌀ is all of those forms so best assure you that this is the most efficient form to reach large gargantuan numbers. This will be a quick one I promise.
  907. 1-⌀TL{1}
  908. 1-⌀TL|1|
  909. 1-1-⌀TL(1) Follow the same pattern as before
  910. 1--⌀TL(1)
  911. 1---⌀TL(1)
  912. 2-⌀TL(1)
  913. 2-2-⌀TL(1)
  914. 2--⌀TL(1)
  915. 3-⌀TL(1)
  916. 4-⌀TL(1)
  917. ⌀-⌀TL(1)
  918. (⌀)--⌀TL(1)
  919. |⌀|-⌀TL(1)
  920. ??⟨⌀⟩⌀??⟨⌀⟩-⌀TL(1)
  921. Trueverati⌀n(3)
  922. Trueverati⌀n(4)
  923. Trueverati⌀n(⌀)
  924. Trueverati⌀n(Trueverati⌀n(⌀))
  925. Trueverati⌀n(. xXTrueverati⌀n(⌀)
  926. Trueverati⌀n(⌀)[1]Trueverati⌀n(⌀)
  927. Trueverati⌀n(⌀)-Trueverati⌀n(⌀)
  928. Trueverati⌀n{⌀}
  929. 1-Trueverati⌀n(⌀)
  930. 1-Trueverati⌀n{⌀}
  931. 1-1-Trueverati⌀n(⌀)
  932. Trueverati⌀n(⌀)-Trueverati⌀n(⌀)
  933. SuperTrueverati⌀n(⌀)
  934. SuperTrueverati⌀n(. xXSuperTrueverati⌀n(⌀)
  935. 1-SuperTrueverati⌀n(⌀)
  936. MegaTrueverati⌀n(⌀)
  937. GigaTrueverati⌀n(⌀)
  938. TeraTrueverati⌀n(⌀)
  939. PetaTrueverati⌀n(⌀)
  940. TrueveTrueverati⌀n(⌀)
  941. TrueveTrueveTrueverati⌀n(⌀)
  942. Trueve...Trueverati⌀n(⌀)
  943. Trueverati⌀n2(⌀)
  944. SuperTrueverati⌀n2(⌀)
  945. TrueveTrueverati⌀n2(⌀)
  946. Trueverati⌀n3(⌀)
  947. Trueverati⌀n...(⌀)
  948. 2Trueverati⌀n(⌀)
  949. 3Trueverati⌀n(⌀)
  950. ...Trueverati⌀n(⌀)
  951. ...⟨10⟩Trueverati⌀n(⌀)
  952. ...⟨100⟩Trueverati⌀n(⌀)
  953. ...⟨⌀⟩Trueverati⌀n(⌀)
  954. ......⟨⌀⟩Trueverati⌀n(⌀)⟩Trueverati⌀n(⌀)
  955. ...⟨...⟩Trueverati⌀n(⌀)
  956. FINALITY⟨FINALITY⟩Trueverati⌀n(⌀)
  957. SUPER FINALITY⟨SUPER FINALITY⟩Trueverati⌀n(⌀)
  958. ABSOLUTE FINALITY⟨ABSOLUTE FINALITY⟩Trueverati⌀n(⌀)
  959. ⌀ FINALITY⟨⌀ FINALITY⟩Trueverati⌀n(⌀)
  960. FINAL⌀ITY⟨FINAL⌀ITY⟩Trueverati⌀n(⌀)
  961. ???⟨???⟩Trueverati⌀n(⌀)
  962. ...⟨...⟩Trueverati⌀n(⌀)
  963. ___⟨___⟩Trueverati⌀n(⌀)
  964. ⟨ ⟩Trueverati⌀n(⌀) At this point, it is IRREVERSIBLE. It cannot be reverted back to its original form. If you tried to put this number on the original ⌀ list, it would be the upper bound of the limit of FG. Way beyond NO!, way beyond any season, any episode, any segment, it's all coming together. It is out of reach from any segment of the original ⌀ List BEFORE Segment 5 because it's just that inaccessible. All past statements are effectively pointless when compared to this number. It's just that unreachable. Good luck TRYING to get past this. But otherwise, you're here to see the last entries of Segment 5.
  965. Trueverati⌀n-0% Finished This is WAY beyond that it's unable to be written its information
  966. Trueverati⌀n*Θe% Finished Refer to the above statement
  967. Trueverati⌀n0% Finished
  968. Trueverati⌀nTRULLTrueverati⌀n0% Finished% Finished
  969. Trueverati⌀nTRULL0% Finished
  970. Trueverati⌀nNegative Beyond Cardinal Unit% Finished
  971. Trueverati⌀n1% Finished
  972. Trueverati⌀n10% Finished
  973. Trueverati⌀n99.99999...Trueverati⌀n99.99999...% Finished% Finished
  974. Trueverati⌀n100% Finished
  975. Trueverati⌀nUnrecognizable% Finished
  976. Trueverati⌀n% Finished
  977. Trueverati⌀nFINALITY% Finished
  978. Trueverati⌀n...% Finished
  979. Trueverati⌀n___% Finished
  980. Trueverati⌀n  % Finished You know what you're here for. The end of Segment 5 is now...
  981. Reb⌀rn ⌀ (SEGMENT TERMINATOR & CHAPTER TERMINATOR) This marks the end of Segment 5 and Chapter 1 of the ⌀ List. Chapter 2 will range from Segment 6 (Ultra Power) to Segment 10 (Finale) and will be even more powerful than Chapter 1 so keep an eye for that.

End of Segment 5[]

Segment 6 (Ultra-Power)[]

These are numbers that are so powerful they are unrecognizable to be concluded a static value. This goes from Reb⌀rn ⌀ to ???.

  1. Reb⌀rn ⌀

End of Segment 6[]

Segment 7 (Beyond ???)[]

These are numbers that break itself, leading to an even greater value of theirs that they can't be notated. This goes from ??? to ???.

  1. ???

End of Segment 7[]

Segment 8 (Undefinable)[]

These are numbers that literally can't be defined normally in any way other than themselves. This goes from ??? to ???.

  1. ???

End of Segment 8[]

Segment 9 (Unstable)[]

These are numbers that are even more undefined than the previous, proving their stability levels are decreasing. This goes from ??? to ???

  1. ???

End of Segment 9[]

Segment 10 (Finale Segment)[]

These are numbers that are so unstable, layering Ψ⛛〔x〕Λ། inside one another is more stable, and are on the brink of eventual COLLAPSE! This goes from ??? to ???.

  1. ???

End of Segment 10[]

Beyond Segments[]

These are numbers that literally break segments at a level unprecedented to earlier numbers. They can't be ranked accurately on the List of Numbers anymore as they're past the ζ Zetaphile Regiment. This ranges from ??? to ???.

  1. ???

End of Beyond Segments[]

The Segments Collapse[]

These are numbers that are not even supposed to be here as they're the Meta of the ⌀ List. This ranges from ??? to ???.

  1. ???

End of The Segments Collapse[]

The Penultimate of Segments[]

These are numbers that are the PENULTIMATE to what is coming up next. In this area, numbers are literally uncalculatable, unexplainable, and so much more to come that even saying etc. and anything similar is a massive understatement. This ranges from ??? to ???.

  1. ???

End of The Penultimate of Segments[]

The 3 End-⌀ Trials[]

The 3 End-⌀ Trials are as it follows. They are the Ascended Challenges to what is leading to the Grand Finale of the ⌀ List. Dare challenge these ⌀ Ascendeds?

𝔸𝕤𝕔𝕖𝕟𝕕𝕖𝕕 𝕋𝕣𝕚𝕒𝕝 ω[]

Your Bravery will end right here. Confidence will drop to levels unprecedented by human nature itself. Good luck getting out of this one, if you even can.

  1. ???

𝔸𝕤𝕔𝕖𝕟𝕕𝕖𝕕 𝕋𝕣𝕚𝕒𝕝 🔗[]

Persistence isn't your friend no more. Rather, your Determination will collapse on itself so you won't gain the upper advantage. You're not escaping this one, if you even can by any unprecedented logic(+).

  1. ???

𝔸𝕤𝕔𝕖𝕟𝕕𝕖𝕕 𝕋𝕣𝕚𝕒𝕝 ⌀[]

Your existence crumbles and collapses upon encountering what you thought to be easy numbers. Why are you even here? You should've gone back! There's no way back, only forward to your everlasting fall upon humanity. Bad luck not escaping your soul and spirit(+) sooner than you can manage to have a permanence of Existence.

  1. ???

End of The 3 End-⌀ Trials[]

The Grand Finale of ⌀[]

These are numbers that mark the end of The ⌀ List. To put it simply, it's game over. These numbers are close to marking the end of FG as a whole. Range can't be determined anymore. This is your absolute stopping point.

  1. ???

End of The ⌀ List![]