Glycogenic Journey of the Britains

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Glycogenic Journey of the Britains is a series of 196 numbers defined by googology user DeepLineMadom.^[1] It is the successor to Flenary of Ukrainian Town.

List of numbers

#	Name	Value	FGH approximation [note 1]
1	La admisible	13,824	\(f_2(10)\)
2	Profundidad del mundo	\(7^{11^{13}}\) = 7^34,522,712,143,931 ~ 2.954*10^29,175,076,368,812	\(f_2^2(39)\)
3	Нигде	1/10^10^100,000,000,000	\(1 ÷ f_2^3(31)\)
4	Бромид натрия	\(10\uparrow\uparrow 50\)	\(f_3(49)\)
5	Зажги его миллионом звезд	1,000,000{1,000,000}1,000,000 in hyperoperator notation	\(f_{\omega}(999999)\)
6	Amore nella sua distruzione	502,592,611,936,843 = 43^9	\(f_2(42)\)
7	Nessun diamante in esplorazione	230230	\(f_2(1792)\)
8	Complimentary	271	\(f_1(135)\)
9	Zilupe	4^^768 & 192 in BEAF tetrational arrays	\(f_{\varepsilon_0}(768)\)
10	Bring em' up, just no damage	52,521,875 = 35^5	\(f_2(21)\)
11	More than just one child will evolve	222,111 = 333*667 = 666th triangular number	\(f_2(13)\)
12	Allies of the Falklands	98,765	\(f_2(12)\)
13	Sorry for my home collapse!	1/E100##100#100 = 1/graatagold	\(f_{\omega+1}(100)^{-1}\)
14	Chemical agency (formerly Chemical bomb)[note 2]	\(10^{(3*10^{10^{1,000}}+3)}\)	\(f_2^3(3310)\)
15	Tuk Tuk	\(10^{10^{10,000}}\)	\(f_2^2(33205)\)
16	Pacific Swarms	34,359,738,368 = 235	\(f_2(30)\)
17	Outlaw	1,152	\(f_2(7)\)
18	Anti-carbon monoxide reactor[note 3]	e^(1/384) ~ 1.002607560454	N/A
19	Bring it!	399	\(f_1(200)\)
20	Buts of carnage	Circle(69) = Pentagon(69) in Steinhaus-Moser notation	\(f_4(70)\)
21	Tapa de la muerte[note 4]	Hexagon(1,200) in Steinhaus-Moser notation	\(f_5(1201)\)
22	Bugonarew	1,000,555,666,555,444,001	\(f_2(57)\)
23	African Panda	979,979	\(f_2(16)\)
24	Yhaaaaaaaaaaaaaaaaqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqq	99[9,9,0,0,0,99,142857,1337,1,1,1,1,1,1,1,1,1,10^^yultillion,69!420] using Extensible Illion System, where yultillion = 10^(3*10^(3*10^(2.4*10^43))+3) (8*10^42-th Tier 3 -illion), and ! indicates the Hyperfactorial array notation	TBC
25	Sultan Nirvana	420£ using BOX_M~'s £ function	TBC
26	Blizzard	135¥ using BOX_M~'s ¥ function	TBC
27	Lightning Fumes	135¥~ using BOX_M~'s ¥~ function	TBC
28	Greenlandillion	1/3^^^3 = 1/3^^7,625,597,484,987 = 1/tritri	\(f_{4}(3)^{-1}\)
29	Fart	55,555	\(f_2(12)\)
30	Inari Suomi	2,304	\(f_2(8)\)
31	The Message	2^^2,048	\(f_3(2044)\)
32	Belarusian Border	Booga(Inari Suomi) = 2,304{2,302}2,304 = 2,304^^^^^...^^^^^2,304 w/ 2,302 arrows	\(f_{\omega}(2303)\)
33	Crying Child of Macedonians	52,947	\(f_2(12)\)
34	Anamona Rabier	A(17,11) using Ackermann function = \(2 \uparrow^{15} 14 - 3\)	\(f_{16}(13)\)
35	Mika-Polska	E(672) using Exploding Tree Function	\(f_{\omega+1}(671)\)
36	Bratislava	A(5,5) using Ackermann function = \(2 \uparrow\uparrow\uparrow 8 - 3\)	\(f_4(8)\)
37	Lake Lubans	10↓↓↓↓↓↓↓↓↓↓10 (10 down arrows) using down-arrow notation	\(f_6(100)\)
38	Super Anamona Rabier	A(Anamona Rabier, Anamona Rabier) using Ackermann function	\(f_{\omega}(f_{16}(13))\)
39	Super Mario Sisters	101012,431 = 10Marioplex	\(f_2^2(41277)\)
40	Minecraftduplex	10^10^10^215 = 10^Minecraftplex	\(f_2^3(708)\)
41	Porcelain	91,125	\(f_2(12)\)
42	Miku Miku the Hard Rave	cg(2,147,483,647) = cg(TNT)	\(f_{\omega^2}(2^{31}-2)\)
43	Hungarian Bezers	7^^^^^^^7	\(f_8(7)\)
44	Darknessful	653 = 274,625	\(f_2(14)\)
45	Toxic Lake	1/Bratislava	\(f_4(8)^{-1}\)
46	Little Duchy	s(99)(99) using Fish's s(n) map	TBC
47	Grand Duchy	m(9)m(8)m(7)m(6)m(5)m(4)m(3)m(2)m(1)(99) using Fish's m(n) map	TBC
48	Great Grand Duchy	m(1,4)m(1,3)m(1,2)m(1,1)(99) using Fish's m(m,n) map	TBC
49	Solar Sandworm	Worm(768)	TBC
50	Irish Hydra	Hydra(420) (Kirby-Paris hydra function)	TBC
51	Maltese British Catholic Church	\(N_{\omega^{\omega^{\omega^{\omega^{\omega^{\omega}}}}}}(100)\) using N-growing hierarchy	\(N_{\omega^{\omega^{\omega^{\omega^{\omega^{\omega}}}}}}(100)\)
52	Dark Jugoslavia	432,157,848	\(f_2(24)\)
53	Ethereal Lumoform	2^^1,048,576	\(f_3(f_2(16))\)
54	Asteroix	999,888,777,666,555,444,333,222,111,000	\(f_2(95)\)
55	Entry of the Hopeless (formerly Entry of the Death)	123,456,789,987,654,321	\(f_2(54)\)
56	Mario World Gods Super Duper Eternal	10^10^10^12,431 = 10^10^Marioplex = 10^Super Mario Sisters	\(f_2^3(41278)\)
57	Minecrafttriplex / Minecraftgargantulene	10^10^10^10^215 = 10^10^Minecraftplex = 10^Minecraftduplex	\(f_2^4(707)\)
58	Yerevan	10↑↑↑1,000,000	\(f_4(999999)\)
59	Rainery	99{99}99 in Bowers' hyperoperator notation = 99^^^^^...^^^^^99 with 99 arrows	\(f_{100}(99)\)
60	Nether Update	\(f_{\omega^\omega}(576)\) using the fast-growing hierarchy	\(f_{\omega^\omega}(576)\) (by definition)
61	Caves and Cliffs	\(f_{\varepsilon_0}(576)\) using the fast-growing hierarchy	\(f_{\varepsilon_0}(576)\) (by definition)
62	The Wild Update	\(f_{\zeta_0}(576)\) using the fast-growing hierarchy	\(f_{\zeta_0}(576)\) (by definition)
63	Mariupol	\(f_{\Gamma_0}(576)\) using the fast-growing hierarchy	\(f_{\Gamma_0}(576)\) (by definition)
64	Białystok	\(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(576)\) using the fast-growing hierarchy (extended Buchholz's function, \(\psi_0(\Omega^{\Omega^{\Omega}})\) denotes the large Veblen ordinal)	\(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(576)\) (by definition)
65	Belgorod	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(576)\) = \(f_{\psi_0(\psi_{1}^5(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(576)\) (by definition)
66	Sevastopol	\(f_{\psi_0(\Omega\uparrow \uparrow 5)}(576) = f_{\psi_0(\psi_1^6(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega\uparrow \uparrow 5)}(576)\) (by definition)
67	Deprived agency (formerly osmium tetroxide)	\(f_{\psi_0(\Omega\uparrow \uparrow 6)}(576) = f_{\psi_0(\psi_1^7(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega\uparrow \uparrow 6)}(576)\) (by definition)
68	Urushiol	\(f_{\psi_0(\Omega\uparrow \uparrow 7)}(576) = f_{\psi_0(\psi_1^8(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega\uparrow \uparrow 7)}(576)\) (by definition)
69	Ice Cream Monolith	\(f_{\psi_0(\Omega\uparrow \uparrow 8)}(576) = f_{\psi_0(\psi_1^9(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega\uparrow \uparrow 8)}(576)\) (by definition)
70	The Icy Wall	\(f_{\psi_0(\Omega\uparrow \uparrow 9)}(576) = f_{\psi_0(\psi_1^{10}(0))}(576)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega\uparrow \uparrow 9)}(576)\) (by definition)
71	Wallis and Futunaillion	Rayo(314π) ~ Rayo(986.46009322719507687727002234976) where π is the "Pi" constant, and Rayo denotes the Rayo function	N/A[note 5]
72	Osuna	\(f_{\varepsilon_\omega}(420)\) using the fast-growing hierarchy	\(f_{\varepsilon_\omega}(420)\) (by definition)
73	Humonurgium	\(f_{\varphi(\omega,0)}(420)\) using the fast-growing hierarchy	\(f_{\varphi(\omega,0)}(420)\) (by definition)
74	Võro	\(f_{\psi_0(\Omega^{\Omega^\omega})}(420)\) using the fast-growing hierarchy (extended Buchholz's function, \(\psi_0(\Omega^{\Omega^{\omega}})\) denotes the small Veblen ordinal)	\(f_{\psi_0(\Omega^{\Omega^\omega})}(420)\) (by definition)
75	Zitrite	\(f_{\psi_0(\Omega^{\Omega^{\Omega^\omega}})}(420) = f_{\psi_0(\psi_1^3(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^\omega}})}(420)\) (by definition)
76	Nightmare Fuel	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}})}(420) = f_{\psi_0(\psi_1^4(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}})}(420)\) (by definition)
77	Delightful Dreams	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}})}(420) = f_{\psi_0(\psi_1^5(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}})}(420)\) (by definition)
78	Zakopane	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}})}(420) = f_{\psi_0(\psi_1^6(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}})}(420)\) (by definition)
79	Midland Ponds	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}})}(420) = f_{\psi_0(\psi_1^7(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}})}(420)\) (by definition)
80	Haunted Rift	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}}})}(420) = f_{\psi_0(\psi_1^8(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}}})}(420)\) (by definition)
81	World Thread	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}}}})}(420) = f_{\psi_0(\psi_1^9(\psi_0(0)))}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\omega}}}}}}}}})}(420)\) (by definition)
82	The U.L.T.I.M.A.T.E Pocket	\(f_{\psi_0(\Omega_2)}(420)\) using the fast-growing hierarchy (extended Buchholz's function, ψ0(Ω_2) denotes the Bachmann-Howard ordinal)	\(f_{\psi_0(\Omega_2)}(420)\) (by definition)
83	The H.Y.P.E.R Pocket	\(f_{\psi_0(\Omega_3)}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_3)}(420)\) (by definition)
84	The M.E.T.A Pocket	\(f_{\psi_0(\Omega_4)}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_4)}(420)\) (by definition)
85	E.V.E.R.Y.T.H.I.N.G Pocket	\(f_{\psi_0(\Omega_\omega)}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_\omega)}(420)\) (by definition)
86	S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket	\(f_{\psi_0(\Omega_{\omega+1})}(420)\) using the fast-growing hierarchy (extended Buchholz's function, \(\psi_0(\Omega_{\omega+1}) = \psi_0(\varepsilon_{\Omega_\omega+1})\) = Takeuti-Feferman-Buchholz ordinal)	\(f_{\psi_0(\Omega_{\omega+1})}(420)\) (by definition)
87	M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket	\(f_{\psi_0(\Omega_{\omega+2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega+2})}(420)\) (by definition)
88	G.I.G.A. M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega 2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega 2})}(420)\) (by definition)
89	T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega 3})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega 3})}(420)\) (by definition)
90	D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega^2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega^2})}(420)\) (by definition)
91	T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega^3})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega^3})}(420)\) (by definition)
92	E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega^{\omega}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega^{\omega}})}(420)\) (by definition)
93	A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\omega^{\omega^{\omega}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\omega^{\omega^{\omega}}})}(420)\) (by definition)
94	C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega)})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega)})}(420)\) (by definition)
95	O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega^2)})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega^2)})}(420)\) (by definition)
96	O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega^{\Omega})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega^{\Omega})})}(420)\) (by definition)
97	U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega^{\Omega^{\Omega}})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega^{\Omega^{\Omega}})})}(420)\) (by definition)
98	M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_2)})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_2)})}(420)\) (by definition)
99	S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_3)})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_3)})}(420)\) (by definition)
100	E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\omega})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\omega})})}(420)\) (by definition)
101	S.U.P.I E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\omega + 1})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\omega + 1})})}(420)\) (by definition)
102	M.E.J.I S.U.P.I E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega)})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega)})})}(420)\) (by definition)
103	G.I.J.I M.E.J.I S.U.P.I E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega)})})})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega_{\psi_0(\Omega)})})})}(420)\) (by definition)
104	E.V.E.R.Y.T.H.I.N.G G.I.J.I M.E.J.I S.U.P.I E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega})}(420)\) (by definition)
105	S.U.P.E.R E.V.E.R.Y.T.H.I.N.G G.I.J.I M.E.J.I S.U.P.I E.V.E.R S.E.M.B.L.A.N.C.E M.U.L.T.I.V.E.R.S.E U.N.I.V.E.R.S.E O.M.I.C.R.O.N O.M.E.G.A C.O.L.L.A.P.S.I.N.G A.N.T.I.C E.P.S.I.L.O.N T.E.A.R.S D.E.S.T.R.U.C.T.I.V.E T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega + 1})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega + 1})}(420)\) (by definition)
106	M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega 2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega 2})}(420)\) (by definition)
107	G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega \omega})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega \omega})}(420)\) (by definition)
108	T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega^2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega^2})}(420)\) (by definition)
109	D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega^{\Omega}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega^{\Omega}})}(420)\) (by definition)
110	T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\psi_1(\Omega_2)})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\psi_1(\Omega_2)})}(420)\) (by definition)
111	E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_2})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_2})}(420)\) (by definition)
112	A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_3})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_3})}(420)\) (by definition)
113	C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\omega}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\omega}})}(420)\) (by definition)
114	O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\psi_0(\Omega_{\Omega})}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\psi_0(\Omega_{\Omega})}})}(420)\) (by definition)
115	O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega}})}(420)\) (by definition)
116	U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega}}})}(420)\) (by definition)
117	M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}})}(420)\) (by definition)
118	S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}})}(420)\) (by definition)
119	E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}})}(420)\) (by definition)
120	S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}}})}(420)\) (by definition)
121	M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}}}})}(420)\) using the fast-growing hierarchy (extended Buchholz's function)	\(f_{\psi_0(\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega_{\Omega}}}}}}}})}(420)\) (by definition)
122	M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..E..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket / M..M..S..S....T..G..M..S..E Pocket	\(f_{\psi_0(\Lambda)}(420) = f_{\psi_0(\Omega_{\Omega_{._{._.}}})}(420)\) with 419 \(\Omega\)'s using the fast-growing hierarchy (extended Buchholz's function, where \(\psi_0(\Lambda)\) denotes the countable limit of Extended Buchholz's function, and \(\Lambda\) denotes the least omega fixed point)	\(f_{\psi_0(\Lambda)}(420) = f_{\psi_0(\Omega_{\Omega_{._{._.}}})}(420)\) with 419 \(\Omega\)'s (by definition)
123	Complicated	{69, 420 ((((1)(1)(1) 1) 1) 1) 2} in BEAF	\(f_{\omega^{\omega^{\omega^{\omega^{\omega^{\omega^{\omega^{\omega 3}}}}}}}}(420)\)
124	Notaire	Sam(Σ(1919)) using busy beaver function and Sam function	Ill-defined uncomputable, unformalised
125	Swiftiesion	101989	\(f_2(6594)\)
126	Swiftiesplexion	10101989	\(f_2^2(6594)\)
127	Maximal Swiftiesion	10^^1989	\(f_3(1987)\)
128	Assiento	X^^Complicated & Swiftiesion in BEAF tetrational array-of function	\(f_{\varepsilon_0}(f_{\omega^{\omega^{\omega^{\omega^{\omega^{\omega^{\omega^{\omega 3}}}}}}}}(420))\)
129	Swifties-infused Notaire	Sam_{Swiftiesion}(Rayo(Complicated)) using Sam function	Ill-defined uncomputable, unformalised
130	Arapaima	Σ∞(Swiftiesplexion) (infinite time Turing machine)	Uncomputable naive extension
131	Qami Qami	E2021#224 in Hyper-E notation	\(f_2^{223}(6701)\)
132	Yan Grrrls	E2023#^(180)(Qami Qami) in Extended Hyper-E notation	\(f_{\omega^{178}}(f_2^{223}(6701))\)
133	Delation	12345679^^^81	\(f_4(80)\)
134	Mitskiillion	{69, 420 ((((1)(1)(1) 1) 1) 1) 2} & Delation in BEAF array-of function	\(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega 3}}}}}}}})}(420)\)[note 6]
135	Fraction of Gratinees	Delation!2 in hyperfactorial array notation	\(f_4^2(80)\)
136	Taser	E2304#{&}#2304 in Collapsing-E notation	\(f_{\varphi(1,0,0,0)}(2304)\)
137	Year 0	{525, 525 (0, 0, 1) 2} in BEAF	\(f_{\omega^{\omega^{\omega^2}}}(525)\)
138	HOT TO GO!	32768 →32768 32768 in Peter Hurford's extension of chained arrows	\(f_{\omega^3}(32767)\)
139	Oho	69 →420 69 in Peter Hurford's extension of chained arrows	\(f_{\omega^3}(419)\)
140	UwU	FOOT^Oho(69420)	Ill-defined uncomputable naive extension, incomplete (see BIG FOOT)
141	Powerful Mitskiillion	Sam^(Mitskiillion)(Notaire) using Sam function	Ill-defined uncomputable function, unformalised
142	Super Powerful Mitskiillion	Sam^(Powerful Mitskiillion)(Mitskiillion) using Sam function	Ill-defined uncomputable function, unformalised
143	Duper Powerful Mitskiillion	Sam^(Super Powerful Mitskiillion)(Powerful Mitskiillion) using Sam function	Ill-defined uncomputable function, unformalised
144	Grrrliest Mitskiillion	Sam^(Yan Grrrls)(Arapaima) using Sam function	Ill-defined uncomputable function, unformalised
145	Divine and Girly Mitskiillion	Sam1(Powerful Mitskiillion) using Sam function	Ill-defined uncomputable function, unformalised
146	Destructive and Powerful Mitskiillion	Samω(Powerful Mitskiillion) using Sam function	Ill-defined uncomputable function, unformalised
147	Let's deal with something derogative	FOOT^(Grrrliest Mitskiillion)(sin(UwU) in degrees)	Ill-defined uncomputable function, unformalised
148	Swiftiesions of Denarii	{10, {10, 1989, 2}, 1, 2} in BEAF	\(f_{\omega+1}(f_3(1987))\)
149	Flopover	20736![[2304768]] in hyperfactorial array notation	TBC
150	The snow glows white on a mountain tonight[note 7]	Tar(Let's deal with something derogative)	N/A
151	Portable Aversion	365![1, 1, 1, 1, 2] in hyperfactorial array notation	\(f_{\varepsilon_0}(365)\)
152	Marvin Gaye[note 8]	(Portable Aversion)]] in hyperfactorial array notation	TBC
153	When the death metal music prevail to Armenian toddlers under five in certain isolated areas and cultural divisions during the clash[note 9]	Tar^(Yan Grrrls)(Fraction of Gratinees)	N/A
154	Kawaiifish	7[24] in Steinhaus-Moser Notation	\(f_{23}(7)\)
155	Anti-folk sentiment to Montenegrins[note 10]	Samζ0(DWhen the death metal music prevail to Armenian toddlers under five in certain isolated areas and cultural divisions during the clash(69420)) using Loader's function and Sam function	Ill-defined uncomputable function, unformalised
156	Farinose Hands	Mega![1, 1, 1, 2] in hyperfactorial array notation	\(f_{\omega^{\omega}}(f_3(256))\)
157	Thank You Swifties	E1989#{&^&}#35 in Collapsing-E notation	\(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(35)\)
158	Vizierillion	103×103×102475+3	\(f_2^3(8208)\)
159	Hyper-Active	(52!)!52 in hyperfactorial array notation	\(f_{54}(f_2(210))\)
160	Drivers License	\(g_{\psi_0(\Omega_2)}(836)\) in the slow-growing hierarchy, using extended Buchholz's function	\(f_{\varepsilon_0}(836)\)
161	Tawny Dariole	\(g_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(175)\) in the slow-growing hierarchy, using extended Buchholz's function	\(f_{\omega^{\omega^{\omega}} + 1}(175)\)
162	Kuvasz	1600![1(1601)2] in hyperfactorial array notation	TBC
163	Oblivion of Immortality	"The largest finite number that can be uniquely defined using no more than a Portable Aversion symbols in some K(Portable Aversion) system in some K2(Portable Aversion) 2-system in some K3(Portable Aversion) 3-system in some K4(Portable Aversion) 4-system in some .........K(Kuvasz)(Portable Aversion) Kuvasz-system where the number oblivion can be represented with one symbol (byte)." where a Km(n) m-system is an arbitrary well-defined system of mathematics that can generate K(m-1)(n) (m-1)-systems and which can be uniquely described in at most n symbols and a K1(n) system is an arbitrary well-defined system of mathematics which can be uniquely described in n symbols.	Ill-defined, uncomputable oblivion-based number, unformalised
164	Even More Devastrating Dismentalized Oblivion	The largest finite number that can be uniquely defined using no more than "Dismentalize the Oblivion symbols in some K(Dismentalize the Oblivion) system in some K2(Dismentalize the Oblivion) 2-system in some K3(Dismentalize the Oblivion) 3-system in some K4(Dismentalize the Oblivion) 4-system in some .........K(Dismentalize the Oblivion)(Dismentalize the Oblivion) Dismentalize the Oblivion-system" with Oblivion of Immortality phases of Dismentalize the Oblivion cycles, where the number Dismentalize the Oblivion can be represented with one symbol (byte).", where a Km(n) m-system is an arbitrary well-defined system of mathematics that can generate K(m-1)(n) (m-1)-systems and which can be uniquely described in at most n symbols and a K1(n) system is an arbitrary well-defined system of mathematics which can be uniquely described in n symbols, "cycles" can be represented using complete first-level recursion-based diagonalization under the fundamental sequence "The True Cycles, Uttery True Cycles, ...", and "phases" can be represented using the complete second-level recursion-based diagonalization under the fundamental sequence "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ...". [note 11]	Ill-defined, uncomputable oblivion-based number, unformalised
165	Multiversal and Powerful Oblivious Explosions	The largest finite number that can be uniquely defined using no more than "Even More Devastrating Dismentalized Oblivion symbols in some K(Even More Devastrating Dismentalized Oblivion) system in some K2(Even More Devastrating Dismentalized Oblivion) 2-system in some K3(Even More Devastrating Dismentalized Oblivion) 3-system in some K4(Even More Devastrating Dismentalized Oblivion) 4-system in some .........K(Even More Devastrating Dismentalized Oblivion)(Even More Devastrating Dismentalized Oblivion) Even More Devastrating Dismentalized Oblivion-system" with Even More Devastrating Dismentalized Oblivion levels of Even More Devastrating Dismentalized Oblivion phases of Even More Devastrating Dismentalized Oblivion cycles, where the number Even More Devastrating Dismentalized Oblivion can be represented with one symbol (byte).", where a Km(n) m-system is an arbitrary well-defined system of mathematics that can generate K(m-1)(n) (m-1)-systems and which can be uniquely described in at most n symbols and a K1(n) system is an arbitrary well-defined system of mathematics which can be uniquely described in n symbols, "cycles" can be represented using complete first-level recursion-based diagonalization under the fundamental sequence "The True Cycles, Uttery True Cycles, ...", "phases" can be represented using the complete second-level recursion-based diagonalization under the fundamental sequence "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ...", and "levels" can be represented using the complete third-level recursion-based diagonalization under the fundamental sequence "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, Even More Devastrating Dismentalized Oblivion, ...". [note 12]	Ill-defined, uncomputable oblivion-based number, unformalised
166	Zzz	263 - 1 = 9,223,372,036,854,775,807	\(f_2(57)\)
167	Oblivious Fast-Fourier Transforms	The largest finite number that can be uniquely defined using no more than Multiversal and Powerful Oblivious Explosions symbols with Multiversal and Powerful Oblivious Explosions stages, where "stages" can be represented using the complete fourth-level recursion-based diagonalization after the third-level "levels", starting from "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ..." [note 13]	Ill-defined, uncomputable oblivion-based number, unformalised
168	Utterly High Five Oblivion Platform	The largest finite number that can be uniquely defined using no more than Oblivious Fast-Fourier Transforms symbols with Oblivious Fast-Fourier Transforms classes, where "classes" can be represented using the complete fifth-level recursion-based diagonalization after the fourth-level "stages", starting from "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ..." [note 14]	Ill-defined, uncomputable oblivion-based number, unformalised
169	Pink Entrails	L(8675309) using Latin square function	TBC
170	Monstrous Jennies	867[0 {0, 1} 1]5309 in Phenol notation	\(f_{\omega^{\omega^{\omega}}}(867)\)
171	Interage	175[1, 0, 2]76923 in Phenol notation	\(f_{\omega^2 + 1}(76922)\)
172	Yulan Infusion	99[1, 0, 0, 1]Interage in Phenol notation	\(f_{\omega^3 + 1}(f_{\omega^2 + 1}(76922))\)
173	Aboriginal Jacket	420[1, 0, 0, 0, 0, 1]Yulan Infusion in Phenol notation	\(f_{\omega^4 + 1}(f_{\omega^3 + 1}(f_{\omega^2 + 1}(76922)))\)
174	Cleavage of Neuroids	1337[1 {1} 2]Aboriginal Jacket in Phenol notation	\(f_{\omega^{\omega} 2 + 1}(f_{\omega^4 + 1}(f_{\omega^3 + 1}(f_{\omega^2 + 1}(76922))))\)
175	Taileron	142857[76923] in Steinhaus-Moser Notation	\(f_{76922}(142858)\)
176	Fansite of Ukrainian Swifties	{1597, 1597 ((1)(1)(1) 1) 2} in BEAF	\(f_{\omega^{\omega^{\omega^{\omega 3}}}}(1597)\)
177	Fansite of Crimean Swifties	{1597, 1597, 2 ((1)(1) 0, 0, 2) 2} in BEAF	\(f_{\omega^{\omega^{\omega^{\omega 2 + 2}}} + 1}(1597)\)
178	Mokita	E[7]7#^#^#^#####17 in Cascading-E notation	\(f_{\omega^{\omega^{\omega^{\omega^5}}}}(17)\)
179	Yaqona	\(f_{\psi_0(\Omega_{\psi_2(\Omega_4)})}(1184)\) in the fast-growing hierarchy, using extended Buchholz's function	\(f_{\psi_0(\Omega_{\psi_2(\Omega_4)})}(1184)\) (by definition)
180	Evaporated Corpse	A(220, 284) in Ackermann function = \(2 \uparrow^{218} 287 -3\)	\(f_{219}(283)\)
181	Stained Ouija	D1729(10) using Loader's D function	N/A[note 15]
182	Havering	112![7] in hyperfactorial array notation	\(f_{\omega + 6}(112)\)
183	Sandcastles	D(2147483647) using Loader's D function	N/A[note 16]
184	Pactionism	5,631,351,470,947,265,625 = 75^10	\(f_2(56)\)
185	Sight of Rodrigian's Vampires[note 17]	129*2^1872 ≈ 4.352528196819 × 10^565	\(f_2(1868)\)
186	Flection	A134217728(5) where A(n) = (n!)n27	\(f_3(134217729)\)
187	Stop holding on to the Q without U[note 18]	Q(99) where U(n) = 23n2 and Q(n) = (U(n7))!1 using hyperfactorial array notation = (23^99^14)!1	\(f_3(f_2^2(87))\)
188	Woo the Flavor of Ammonium Nitrate	cg(cg(144,000))	\(f_{\omega^2}^2(143999)\)
189	Cyanide! Cyanide! Cyanide!	987,654,321![1(1)[21, 1, 1, 2]] = Cyanide![1(1)[21, 1, 1, 2]]	TBC
190	Call Me Maneater	s(4, 4 {1 {1 {3} 2} 2} 2) in strong array notation	\(f_{\omega^{\omega^{\omega^{\omega^{\omega^{\omega^2}}}}}}(4)\)
191	Wuxia of Ataraxia	E[65]65#{&^#}#65 in Collapsing-E notation	\(f_{\psi_0(\Omega^{\Omega^{\omega}})}(65)\)
192	Lewisite	Sam69(420) using Sam function	Ill-defined uncomputable function, unformalised
193	Dissolved Aerolite	{5, 4, 4, 3 (4, 2) 2} in BEAF	\(f_{\omega^{\omega^{\omega 2 + 4}} + \omega 2 + 3}^3(5)\)
194	Mirepoix	12288[1{1 \^(1 \^(1 \^(1 \^(1 \ 2) 2) 2) 2) 2}2]12288 in DeepLineMadom's array notation	\(f_{\psi(M_{M_{M_{M_M}}})}(12288)\)
195	LoveDeath	SCG1521(7)	\(f_{\psi_0(\Omega_{\omega + 1}) + 1}(1521)\)
196	The ugly and awful Baltic national anthems' values for children under five[note 19]	SamOmega one of chess5(LoveDeath + (Cyanide! Cyanide! Cyanide!)Anti-folk sentiment to Montenegrins) using Sam function	Ill-defined uncomputable function, unformalised

Notes

1. Using the Extended Buchholz's function for the \(\psi\) function for the expression \(\psi_0\). Otherwise, using OCFs based on systems of fundamental sequences for the functions collapsing inaccessible and Mahlo cardinals.
2. The two former names ("You're poisoned with carbon monoxide and you died!!!" and "You're poisoned with cyanide and you died!!!" prior) were changed as they were considered to be harmful somewhat.
3. Formerly known as "Chemical bomb". The former name is not considered to be harmful as it refers to the implication of chemical weapons in general.
4. Spanish for "Death cap"
5. Rayo function is ill-defined for non integers.
6. BEAF is ill-defined beyond tetrational arrays, so, the FGH approximation is intended to be comparable to that number.
7. Reference to the song "Let It Go" from the movie Frozen.
8. Reference to the song "Marvin Gaye" by Charlie Puth.
9. Formerly known as "Death metal music shall prevail to Armenian toddlers in another isolated culture". Reference to the hypothetical, advocative scenario in a very specific small country in the world – Armenia, it is not considered to be harmful.
10. Reference to the hypothetical, advocative scenario in a very specific small country in the world – Montenegro, it is not considered to be harmful.
11. Abridged definition: The largest finite number that can be uniquely defined using no more than Dismentalize the Oblivion symbols with Oblivion of Immortality phases, where "phases" can be represented using the complete second-level recursion-based diagonalization after "cycles", starting from "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ..."
12. Abridged definition: The largest finite number that can be uniquely defined using no more than Even More Devastrating Dismentalized Oblivion symbols with Even More Devastrating Dismentalized Oblivion levels, where "levels" can be represented using the complete third-level recursion-based diagonalization after "phases" and "cycles", starting from "The True Cycles, Uttery True Cycles, Dismentalize the Oblivion, ..."
13. Second-round abridged definition: The largest finite number that can be uniquely defined using no more than Multiversal and Powerful Oblivious Explosions symbols with Multiversal and Powerful Oblivious Explosions stages, using level 4 recursion-based diagonalization called "stages"
14. Second-round abridged definition: The largest finite number that can be uniquely defined using no more than Oblivious Fast-Fourier Transforms symbols with Oblivious Fast-Fourier Transforms classes, using level 5 recursion-based diagonalization called "classes"
15. This number is way larger than Loader's number, hence, it's too big to approximate using the fast-growing hierarchy.
16. The specific boundary values of Loader's D function are not fully determined yet.
17. Reference to the song "Vampire" by Olivia Rodrigo.
18. Reference to one of Scrabble's strategies.
19. Full name: "The Baltic national anthems' values for children under the age of five are downright awful, not only since they are considered to be unfair, immoral, and disrespectful for youngest children in general, they also violate the social media platforms' terms of use that would likely result in an imprisonment. Legal guardians should definitely advocate preventing the abusive and profane reaction to such solemn national anthems or otherwise lead to an intensified debate regarding the regional symbols' strict regulation." – This name is referenced to the hypothetical debate regarding extreme stakes, criticisms, and political risks involving decision-making against the value of the solemn national anthems of the Baltic states value for native children under the age of five in that region, which is a heavy scenario in a very specific lesser-globalized region in Europe, namely the Baltic states (Lithuania, Latvia, and Estonia). Also, since the name is referenced to a children's legal caution against heavy symbolisms, it is not considered to be harmful at all. The older names looked harmful at first glance, but they are actually referenced to some nonsensical advocative scenarios in that region, so they are not considered to be harmful as well, just like with the current names.

Sources

1. Pointless Googolplex Stuffs - Glycogenic Journey of the Britains Retrieved 2024-12-31.