It's my 14th Birthday! I'm going to create a list of numbers to celebrate my Birthday!
Note: Many numbers are in base 203 (2 means February and 03 means the day, since my Birthday is 3rd February)
Birthday's Science = 2.03 * 10^203 in Scientific notation (Class 2)
Birthday's Arrows = 203^[203]203 = 203^^^ ... ^^^203 (203 ^'s) in Arrow notation (Class 7: Up-arrow notation level)
Birthday's Arrows but Gloomy and Lonely = 203v[203]203 = 203vvv ... vvv203 (203 v's) in Down-arrow notation (Class 7: Up-arrow notation level)
Birthday of Gods = a*(203, 203 {1 ! 2} 2) in Almighty Array Notation (part 5) (Class 15: Iterated Cantor normal form level)
Birthday of Super Gods = a*(203, 203 {1 ! 1 ! 2} 2) in Almighty Array Notation (part 6) (Class 16: Epsilon level)
Birthday of Hyper Gods = a*(203, 203 {1 !! 2} 2) in Almighty Array Notation (part 7) (Class 17: Binary phi level)
Birthday of Mega Gods = a*(203, 203 {1 <1 ! 2> 2} 2) in Almighty Array Notation (part 8) (Class 17: Binary phi level)
Birthday's BEAF = 203^^^203 & 203 in BEAF (pentational arrays) (Class 17: Binary phi level)
Birthday's BAN = {203, 203 [1 [1 [2 /(2, 2) 2] 2] 2] 2} in BAN (Class 19: Higher computable level)
Birthday's E = E203#203 in Hyper-E notation (Class 6: Tetration level)
Birthday's Cascade = E203#^#203 in Cascading-E notation (Class 10: Polynomial omega level)
Birthday's Extend = E203#^^^^#>#^^^^#203 = E203#^^^^##3 in Extended Cascading-E Notation (Class 18: Bachmann's collapsing level)
Birthday's L = L(((203))) = 10 {203} 203 in Hyper-L Notation (Class 7: Up-arrow notation level)
Birthday's Chain = 203 -> 203 -> 203 -> 203 in Chained arrow notation (Class 8: Linear omega level)
New Birthday's Chain = 203 ->_{2} 203 in Peter Hurford's extension of chained arrows (Class 8: Linear omega level)
Birthday's Fire Chain = 203 ->_{203} 2023 in Peter Hurford's extension of chained arrows (Class 9: Quadratic omega level)
Birthday's Spirit Chain = 203 ->^{203} 2023 in Cookiefonster's extension of chained arrows (Class 10: Polynomial omega level)
Birthday's Ampersand = 203[1] = 203^203 in Ampersand Notation (Class 2)
Birthday's All Ampersand = 203[&] = 203[203] in Ampersand Notation (Class 7: Up-arrow notation level)
Birthday's Almighty Ampersand = 203[&_&] = 203[&_203] in Ampersand Notation (Class 10: Polynomial omega level)
Birthday's Copy = 203[203] = 203203203 ... 203 (203 203's) ~ 2.03 * 10^608 in Copy notation (Class 2)
Birthday's Paste = 203[203, 203, 203] in Copy notation (Class 8: Linear omega level)
Birthday's Cut = 203[203#203] in Copy notation (Class 8: Linear omega level)
Birthday's Find = 203[203### ... #203] (203 #'s) in Copy notation (Class 8: Linear omega level)
Birthday's Polygon = 203[203] in Steinhaus-Moser Notation (Class 7: Up-arrow notation level)
Birthday's C = 203C203 = 203 * 203 = 41,209 in C function (Class 1)
Newborn's Birthday = 203[0]203 = 203 + 1 = 204 in DeepLineMadom's Array Notation (part 0) (Class 1)
Infant's Birthday = 203[203, 203]203 in DeepLineMadom's Array Notation (part 1) (Class 8: Liear omega level)
Toddler's Birthday = 203[203 {203} 203]203 in DeepLineMadom's Array Notation (part 2) (Class 12: Exponentiated polynomial omega level)
Children's Birthday = 203[203 {203 / 203} 203]203 in DeepLineMadom's Array Notation (part 3) (Class 16: Epsilon level)
Teenager's Birthday = 203[203 {203 <203 / 203> 203} 203]203 in DeepLineMadom's Array Notation (part 4) (Class 18: Bachmann's collapsing level)
Young Adult's Birthday = 203[203 {203 // 203} 203]203 in DeepLineMadom's Array Notation (part 5) (Class 19: Higher computable level)
Adult's Birthday = 203[203 {203 /// ... /// 203} 203]203 (203 /'s) in DeepLineMadom's Array Notation (part 6) (Class 19: Higher computable level)
Old Adult's Birthday = 203[203 {203 \ 203, 203} 203]203 in DeepLineMadom's Array Notation (part 7) (Class 19: Higher computable level)
THE END's Birthday = 203[203 {203 \ 203 \ 203} 203]203 in DeepLineMadom's Array Notation (part 8) (Class 19: Higher computable level)
Birthday's Graham = [203, 203, 203, 203] in Graham Array Notation (Class 8: Linear omega level)
Birthday's G = G203 in Graham sequence (Class 8: Linear omega level)
Ancient Greece's Birthday = 203AAA ... AAA203 (203 A's) in Greek Letter Notation (Class 9: Quadratic omega level)
Hayden's Birthday = 203(203)(203)(203) ... (203)203 (203 (203)'s) in Hayden's Array Notation (Class 10: Polynomial omega level)
Hayden's Birthday Extension = 203[1 \ 1, 203]_{2}203 in Hayden's Extended Array Notation (Class 16: Epsilon level)
H-illion Birthday = H*(203, 203, 203, ..., 203) (203 203's) in H* function (Class 7: Up-arrow notation level)
Hyperdimensional Birthday = 203(203)203 in Hyperdimensional Array Notation (Class 10: Polynomial omega level)
Birthday's Factorial = 203![1(1)2] in Hyperfactorial array notation (Class 17: Binary phi level)
Birthday's Factorial Wish = 203![1]w(1)/203 in Hyperfactorial array notation (Class 18: Bachmann's collapsing level)
Birthday's K = K203, 203, 203, ..., 203(203) (203 203's) in K Notation (Class 10: Polynomial omega level)
Birthday's Debut = [203] = 48^203 ~ 1.9587 * 10^341 in PlantStar's Debut Notation (Class 2)
Birthday's X = 203{((X^^X)^^X)^^X}203 = 203{X > 3}203 in X-Sequence Hyper-Exponential Notation (Class 16: Epsilon level)
Birthdayillion = z(203, 203) = (203th Tier 203 -illion) in Zillion Notation (Class 5)
Birthday's Taro-Ackermann = A(203, 203, 203, ..., 203) (203 203's) in Taro's multivarible Ackermann function (Class 10: Polynomial omega level)
Birthday's BMS = (0, 0)(1, 1)(2, 2) ... (203, 203)[203] = Pair(203) in Bashicu matrix system (Class 19: Higher computable level)
Birthday's s(n) = s(1)^{203}(λx.x + 1)(203) in s(n) map (Class 7: Up-arrow notation level)
Birthday's s(n) Hyperion = s(203)f(203) in s(n) map (Class 10: Polynomial omega level)
Birthday's m(n) = m(203)m(202)m(201) ... m(1)(203) in m(n) map (Class 15: Iterated Cantor normal form level)
Birthday's m(m, n) = m(203, 2)m(203, 1)(203) in m(m, n) map (Class 16: Epsilon level)
Birthday's s(n) Ultimate = s'(203)f(203) in s'(n) map = Σ'_{ω^202}(203) where Σ'_α is the oracle Busy Beaver function (Class 20: Uncomputable Numbers)
Birthday's m(m, n) Omnized = m(203, 2)m(203, 1)(203) in m(m, n) map (from Fish Number 7) (Class 20: Uncomputable Numbers)
Birthday's Alphabet = (birthday) in Alphabet Notation (???)
Birthday's Dollar = 203$[[0]_[0]] = 203$[[0]_203] in Dollar function (Class 19: Higher computable level)
Birthday's Extended -illion = 203[203, 0, 0, 0, ..., 1] (203 0's) in Extensible Illion System (Class 8: Linear omega level)
Birthday's Infra = I<203, 203> in Infra Notation (Class 7: Up-arrow notation level)
Quick Birthday = Q<203, 203, 203, 203> in Quick array notation (Class 9: Quadratic omega level)
Birthday's Rampant = r(203, 203, 203, 203) in Rampant Array Notation (Class 10: Polynomial omega level)
Strong Birthday = s(203, 203 {1 {2^`} 2} 2) in Strong Array Notation (Class 17: Binary phi level)
Stronger Birthday = s(203, 203 {1 {1 ,, 3 ^,,} 2} 2) in Strong Array Notation (Class 19: Higher computable level)
Strongest Birthday = s(203, 203 {1 ,,, ... ,,, 2} 2) (203 ,'s) in Strong Array Notation (Class 19: Higher computable level)
Absolute Birthday Unknown = 203[0{0{0,_1 1}_1 1}1]203 in Username5243's Array Notation (Class 17: Binary phi level)
Small Diagonalizing Birthday = f_{ψ(χ(ω, 0))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Large Diagonalizing Birthday = f_{ψ(χ(Ω, 0))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Small Generalized Birthday = f_{ψ(T^T^ω)}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Birthday's Back Stage = f_{ψ(T_ω)}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Millennials' Birthday = f_{ψ(Y)}(203) = f_{ψ(χ(1 ;;;; 0))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Birthday's Small Meta = f_{ψ(Y^Y^ω)}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Zoomers' Birthday = f_{ψ(Z)}(203) = f_{ψ(χ(1 ;;;;; 0))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Birthday's Dropping = f_{ψ(χ(1{ω}0))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Radiantium Colossalium Finalium Equivalentium Intereonium Extremium Parallelium UltimatiumOmegium Unrealiablium Octanium Intereonium Ascendiumed Corruptiumed Hyperium Insanium Parallelium Breakdownium Godlium Enormousium Omegium Centurium Superium Ultrium Absolutium Ultimatium Endiuming Breakiumed Prestigiumed Ascendiumed Transcendiumed Scaliumed Masteriumed Metiumed Stariumized Omniumized Godlium Finalium everium corruptiumed Hyperionium Utterium Fortunium Endlessium Absolutestium Intereonium Corrupousium Godousium Breakdownium Absolutium Foreverium Hyperium Omnium Gigium Megium Allium Truium Endium Multium Mejium Supium Everium Semblancium Multiversium Universium Omicronium Omegium Collapsiuming Anticium Epsilonium Tearsium Destructivium Terium Gigium Megium Superium Everythingium Satanicium Neverium Truium Absolutium Godlium Ultimatium Omegium Megium Superium Evenium Morium Godderium Endiuming Radiant Colossal Final Equivalent Intereon Extreme Parallel Ultimate Omega Unrealiable Octane Intereon Ascended Corrupted Hyper Insane Parallel Breakdown Godly Enormous Omega Century Super Ultra Absolute Ultimate Ending Breaked Prestiged Ascended Transcended Scaled Mastered Metaed Starized Omnized Godly Final ever corrupted Hyperion Utter Fortune Endless Absolutest Intereon Corrupous Godous Breakdown Absolute Forever Hyper Omni Giga Mega All True End Multi Meji Supi Ever Semblance Multiverse Universe Omicron Omega Collapsing Antic Epsilon Tears Destructive Tera Giga Mega Super Everything Satanic Never True Absolute Godly Ultimate Omega Mega Super Even More Godder Ending Birthday (shortened to R.C.F.E.I.E.P.U.O.U.O.I.A.C.H.I.P.B.G.E.O.C.S.U.A.U.E.B.P.A.T.S.M.M.S.O.G.F.C.H.U.F.E.A.I.C.G.B.A.F.H.O.G.M.A.T.E.M.M.S.E.S.M.U.O.O.C.A.E.T.D.T.G.M.S.E.S.N.T.A.G.U.O.M.S.E.M.G.E.R.C.F.E.I.E.P.U.O.U.O.I.A.C.H.I.P.B.G.E.O.C.S.U.A.U.E.B.P.A.T.S.M.M.S.O.G.F.C.H.U.F.E.A.I.C.G.B.A.F.H.O.G.M.A.T.E.M.M.S.E.S.M.U.O.O.C.A.E.T.D.T.G.M.S.E.S.N.T.A.G.U.O.M.S.E.M.G.E.B) = f_{ψ(χ(1(:_2)1))}(203) in Fast-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Birthday's Hardy = H_{ζ_20}(203) in Hardy Hierarchy (Class 16: Epsilon level)
Slow Birthday = g_{ψ_0(Ω_10)}(203) in Slow-growing Hierarchy with this system of fundamental sequences (Class 19: Higher computable level)
Accelerated Birthday = h_{203}(203) in Accelerated Hierarchy (???)
Birthday's @ = 203@203 (Class 8: Linear omega level)