Meet yourself in 105 degrees Celsius is a series of 150 numbers defined by googology user HaydenTheGoogologist2009.[1][2][3]. Note that the four numbers in the series based off Oblivion are ill-defined.
List of numbers[]
| # | Name | Value | FGH approximation [note 1] |
|---|---|---|---|
| 1 | Keep the change! | 2 | \(f_0(1)\) (exact) |
| 2 | I needed this! | 8 | \(f_1(4)\) (exact) |
| 3 | Yummy! | 24 | \(f_2(3)\) (exact) |
| 4 | What about me?! | 2,048 | \(f_3(2)\) (exact) |
| 5 | This isn't my order! | 14,748,323,954,031,385,743,830,204,859,409,103,394,492,049,202,150,623,574,820,193,713 | \(f_2(205)\) |
| 6 | You're so slow! | \(10^{10^{366}}\) | \(f_2^2(1206)\) |
| 7 | I'm late for class! | \(10^{10^{10^{6789}}}\) | \(f_2^3(22539)\) |
| 8 | I'm late for the bus! | \(10^{3 \times 10^{1.11111111112} + 3} \approx 5.58 \times 10^{41}\) | \(f_2(131)\) |
| 9 | Googology trains up your IQ by understanding abstract concepts and solving problems. | \(10^{10^{999999999}}\) | \(f_2^3(25)\) |
| 10 | Want to improve googology? Don’t just read it! Do it. | \(17 \uparrow\uparrow 17\) | \(f_3(17)\) |
| 11 | Seeing a hard question? Think, think and think! Don’t just ask or copy. | \((\text{Want to improve googology? Don’t just read it! Do it.}) \uparrow\uparrow\uparrow (\text{Want to improve googology? Don’t just read it! Do it.})\) | \(f_4(f_3(17))\) |
| 12 | Improvement = You can do something that you were unable to do in the past. | \((\text{Seeing a hard question? Think, think and think! Don’t just ask or copy.}) \uparrow\uparrow\uparrow\uparrow (\text{Seeing a hard question? Think, think and think! Don’t just ask or copy.})\) | \(f_5(f_4(f_3(17)))\) |
| 13 | Go to “Level II” of googology lead you success in your googology career. | \((\text{Improvement = You can do something that you were unable to do in the past.}) \uparrow^5 (\text{Improvement = You can do something that you were unable to do in the past.})\) | \(f_6(f_5(f_4(f_3(17))))\) |
| 14 | When you see a hard question, don’t be afraid. It’s a good time to level up yourself. | \((\text{Go to “Level II” of googology lead you success in your googology career.}) \uparrow^6 (\text{Go to “Level II” of googology lead you success in your googology career.})\) | \(f_7(f_6(f_5(f_4(f_3(17)))))\) |
| 15 | Always link your website as a source in googology. | \((\text{When you see a hard question, don’t be afraid. It’s a good time to level up yourself.}) \uparrow^7 (\text{When you see a hard question, don’t be afraid. It’s a good time to level up yourself.})\) | \(f_8(f_7(f_6(f_5(f_4(f_3(17))))))\) |
| 16 | Googology formula can be memorised easily by doing exercise. | \((\text{Always link your website as a source in googology.}) \uparrow^8 (\text{Always link your website as a source in googology.})\) | \(f_9(f_8(f_7(f_6(f_5(f_4(f_3(17)))))))\) |
| 17 | Googology revision = Do exercise + Check answer + Correction + … | \((\text{Googology formula can be memorised easily by doing exercise.}) \uparrow^9 (\text{Googology formula can be memorised easily by doing exercise.})\) | \(f_{10}(f_9(f_8(f_7(f_6(f_5(f_4(f_3(17))))))))\) |
| 18 | Do you know that googology provides links for newbies? | \((\text{Googology revision = Do exercise + Check answer + Correction + …}) \uparrow^{10} (\text{Googology revision = Do exercise + Check answer + Correction + …})\) | \(f_{11}(f_{10}(f_9(f_8(f_7(f_6(f_5(f_4(f_3(17)))))))))\) |
| 19 | Feeling googology difficult? Read the rules of the notation. | \((\text{Do you know that googology provides links for newbies?}) \uparrow^{11} (\text{Do you know that googology provides links for newbies?})\) | \(f_{12}(f_{11}(f_{10}(f_9(f_8(f_7(f_6(f_5(f_4(f_3(17))))))))))\) |
| 20 | Spend 15 minutes to read the rules before creating a new article. | \((\text{Feeling googology difficult? Read the rules of the notation.}) \uparrow^{12} (\text{Feeling googology difficult? Read the rules of the notation.})\) | \(f_{13}(f_{12}(f_{11}(f_{10}(f_9(f_8(f_7(f_6(f_5(f_4(f_3(17)))))))))))\) |
| 21 | Use your hand to do it | \(\{42,42,1,2\}\) in BEAF | \(f_{\omega+1}(42)\) |
| 22 | This number is rather messy | \(\{\text{Use your hand to do it},\text{Use your hand to do it},2,2\}\) in BEAF | \(f_{\omega+2}(f_{\omega+1}(42))\) |
| 23 | Statistical googology | \(\{\text{This number is rather messy},\text{This number is rather messy},5,2\}\) in BEAF | \(f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42)))\) |
| 24 | Solution | \(\{\text{Statistical googology},\text{Statistical googology},10,2\}\) in BEAF | \(f_{\omega+10}(f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42))))\) |
| 25 | It literally takes more than 5 weeks to finish, now I need to start over again oh my god | \(\{\text{Solution},\text{Solution},1,3\}\) in BEAF | \(f_{\omega2}(f_{\omega+10}f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42)))))\) |
| 26 | Exam today! | \(\{\text{It literally takes more than 5 weeks to finish, now I need to start over again oh my god},\text{It literally takes more than 5 weeks to finish, now I need to start over again oh my god},1,4\}\) in BEAF | \(f_{\omega3}(f_{\omega2}(f_{\omega+10}f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42))))))\) |
| 27 | I’m the GRAND F..I..N..A..L CHAMPION!!! | \(\{\text{Exam today!},\text{Exam today!},1,5\}\) in BEAF | \(f_{\omega4}(f_{\omega3}(f_{\omega2}(f_{\omega+10}f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42)))))))\) |
| 28 | Yet another exam | \(\{\text{I’m the GRAND F..I..N..A..L CHAMPION!!!},\text{I’m the GRAND F..I..N..A..L CHAMPION!!!},10,10\}\) in BEAF | \(f_{\omega9}(f_{\omega4}(f_{\omega3}(f_{\omega2}(f_{\omega+10}f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42))))))))\) |
| 29 | Googology education | \(10 \downarrow^5 51\) in Down-arrow notation | \(f_4(51)\) |
| 30 | Let’s learn! | \(\{\text{Yet another exam},\text{Yet another exam},10,10\}\) in BEAF | \(f_{\omega^2}(f_{\omega9}(f_{\omega4}(f_{\omega3}(f_{\omega2}(f_{\omega+10}f_{\omega+5}(f_{\omega+2}(f_{\omega+1}(42)))))))))\) |
| 31 | 大丈夫、まだ勉強中です! | \(\{63,65 [1 [1 [1 [1 [1 \backslash 2 \neg 3] 2 \neg 4] 2 \neg 5] 2 \neg 6] 2] 2\}\) in BAN | \(f_{\psi_0(\Omega_2+\psi_1(\Omega_2 2+\psi_1(\Omega_2 3+\psi_1(\Omega_2 4+\Omega))))}(65)\) |
| 32 | 非常に近いです、あなたはまだ学んでいます! | \(a\text{*}(48,72 \{1!1!2\} 2)\) in Almighty array notation | \(f_{\zeta_0}(72)\) |
| 33 | 心配はいりません。学習はプロセスです。 | \(\text{E}10000\#10000\) in Hyper-E notation | \(f_{3}(10000)\) |
| 34 | Googol translate | \(\text{E}10000\#\#10000\) in Extended Hyper-E notation | \(f_{\omega}(10000)\) |
| 35 | Grand culture | \(\text{E}10000\#\text{^}\#10000\) in Cascading-E notation | \(f_{\omega^{\omega}}(10000)\) |
| 36 | Googology laws VS physics laws | \(\text{E}10000\#<\#\text{^}\#>\#\text{^}\#10000\) in Expand-E notation | \(f_{\varphi(\omega,0)}(10000)\) |
| 37 | Ultimate theorem number | \(\text{E}10000\#\text{^^^^}\#>\#\text{^^^^}(\#+\#)100\) in Extended Cascading-E notation | \(f_{\varphi(2,0,\varphi(2,0,\omega2))}(10000)\) |
| 38 | You are going to write a G64 page assay on googology | \(\text{E}10000\#\{\#\{\#\{\#\{\#\text{^^^^^}\#\text{^^^^}\#\text{^^^}\#\text{^^}\#\text{^}\#\#+\#\}\#\}\#\}\#\}\#10000\) in Hyper-Extended Cascading-E notation | \(f_{\varphi(\varphi(\varphi(\varphi(\varphi(3,\varphi(2,\varphi(1,\varphi(\varepsilon_0,\omega^{\omega2}+\omega),0),0),0),0,0),0,0),0,0),0,0)}(10000)\) |
| 39 | Clouds of gloom | \(\text{E}10000\text{****}\&(\{\#,\#+1,1,2\})10000\) in Hyper-Hyper-Extended Cascading-E notation | \(f_{\varphi(4,0,0,\varphi(1,0,0,0))}(10000)\) |
| 40 | Microscopical data | \(\text{E}10000\#(x\text{^}\#)\text{^}\#10000\) in Solious-Extended Cascading-E notation | \(f_{\psi_0(\Omega^{\Omega^\omega})}(10000)\) |
| 41 | METAHyper invent invest invade | \(L(((1234)))=10\uparrow^{10^{1234}}10^{1234}\) in Hyper-L notation | \(f_{\omega}(10^{1234})\) |
| 42 | Electricity has been nuked | \(375 \rightarrow 853 \rightarrow 453 \rightarrow 2\) in Chained arrow notation | \(f_{\omega+1}(853)\) |
| 43 | Boomers VS Zommers | \(999 \rightarrow_2 999\) in Peter Hurford's extension of chained arrows | \(f_{\omega^2}(999)\) |
| 44 | Organization of classroom | \(1000000[\&\&]\) in Ampersand notation | \(f_{\omega2}(1000000)\) |
| 45 | Crazy ZALGO number | \(777777777[777\#777]\) in Copy notation | \(f_{\omega+775}(777)\) |
| 46 | Outside time = 0 microseconds | \(\frac{1}{\text{Clouds of gloom}}\) | \(f_{\varphi(4,0,0,\varphi(1,0,0,0))}(10000)^{-1}\) |
| 47 | Photo googoler | \(123[456[789]]\) in SMN | \(f_{788}(f_{455}(123))\) |
| 48 | Tree of thoughts | \(3C1/1/1/3\) in C function | ??? |
| 49 | Solidarity | \(71[1\{1 \{1 \backslash 3\}\backslash 2\}2]71\) in DLMAN | \(f_{\psi(I(1,0,0,0))}(71)=f_{\psi(M^{M^2})}(71)\) |
| 50 | Omnes | \(71[1\{1 \backslash\{\{1\}\}2\}2]71\) in DLMAN | \(f_{\psi(\Omega_{M+1})}(71)\) |
| 51 | Prometheus | \(71[1\{1 \{1 \{1 \backslash 1 \backslash 2\} 3 \backslash 1 \backslash 2\} 2 \backslash 1 \backslash 2\}2]71\) in DLMAN | \(f_{\psi(I^{I^2})}(71)=f_{\psi(\Phi(1,0,0,0))}(71)\) |
| 52 | Never gonna give you up | \(\{69,69 [2] 1 [2] 2\}\) in BAN | \(f_{\omega^{\omega2}}(69)\) |
| 53 | Never gonna let you down | \(\{420,420 [69] 1 [69] 1 [69] 2\}\) in BAN | \(f_{\omega^{\omega^{68}3}}(420)\) |
| 54 | The camera will never stop | \(24<7>365\) in Fast array notation | \(f_8(365)\) |
| 55 | Yamete kudasai!! | \([7,8,9,10]\) in Graham Array Notation | \(f_{\omega+1}(10)\) |
| 56 | Happy birthday!!! | \(\text{E}203\{\#\text{^^^}\#\&\#\}4096\) | \(f_{\psi_0(\Omega_2^{\Omega_2})}(4096)\) (climbing) |
| 57 | Are you a noob? | 3 -0-0-0- 3 in Greek letter notation | \(f_{\omega^{11}}(3)\) |
| 58 | Alt + F4 | \(\{3, 4 [5 [6] 7] 8\}\) in BAN | \(f_{\omega^{\omega^{\omega^{\omega^5}6+\omega}}}(4)\) |
| 59 | Grand theft duty[note 2] | \(\text{BB}(99999)\) | Uncomputable naive extension |
| 60 | Great theft duty[note 2] | \(\text{BB}(\text{Grand theft duty})\) | Uncomputable naive extension |
| 61 | Gigantic theft duty[note 2] | \(\text{BB}(\text{Great theft duty})\) | Uncomputable naive extension |
| 62 | Gorged theft duty[note 2] | \(\text{BB}(\text{Gigantic theft duty})\) | Uncomputable naive extension |
| 63 | Gulp theft duty[note 2] | \(\text{BB}(\text{Gorged theft duty})\) | Uncomputable naive extension |
| 64 | *Gasp* theft duty[note 2] | \(\text{BB}(\text{Gulp theft duty})\) | Uncomputable naive extension |
| 65 | Ginormous theft duty[note 2] | \(\text{BB}(\text{*Gasp* theft duty})\) | Uncomputable naive extension |
| 66 | Gargantuan theft duty[note 2] | \(\text{BB}(\text{Ginormous theft duty})\) | Uncomputable naive extension |
| 67 | Googondo theft duty[note 2] | \(\text{BB}(\text{Gargantuan theft duty})\) | Uncomputable naive extension |
| 68 | Golden theft duty[note 2] | \(\text{Rayo}(\text{Googondo theft duty})\) | Uncomputable naive extension |
| 69 | Gratuitous golden theft duty[note 2] | \(\text{Rayo}^{\text{Golden theft duty}}(\text{Golden theft duty})\) | Uncomputable naive extension |
| 70 | Greedy golden theft duty[note 2] | \(\text{Rayo}^{\text{Gratuitous golden theft duty}}(\text{Gratuitous golden theft duty})\) | Uncomputable naive extension |
| 71 | Grinning golden theft duty[note 2] | \(\text{Rayo}^{\text{Greedy golden theft duty}}(\text{Greedy golden theft duty})\) | Uncomputable naive extension |
| 72 | Golden golem theft duty[note 2] | \(\text{Rayo}^{\text{Grinning golden theft duty}}(\text{Grinning golden theft duty})\) | Uncomputable naive extension |
| 73 | Grueling golden theft duty[note 2] | \(\text{Rayo}^{\text{Golden golem theft duty}}(\text{Golden golem theft duty})\) | Uncomputable naive extension |
| 74 | *Gasp* golden theft duty[note 2] | \(\text{Rayo}^{\text{Grueling golden theft duty}}(\text{Grueling golden theft duty})\) | Uncomputable naive extension |
| 75 | Ginormous golden theft duty[note 2] | \(\text{Rayo}^{\text{*Gasp* golden theft duty}}(\text{*Gasp* golden theft duty})\) | Uncomputable naive extension |
| 76 | Googondo golden theft duty[note 2] | RayoRayoRayo...RayoGinormous golden theft duty(Ginormous golden theft duty)...(Ginormous golden theft duty)(Ginormous golden theft duty)(Ginormous golden theft duty) with Ginormous golden theft duty Rayo's | Uncomputable naive extension |
| 77 | True nothing | \(0^0\) (undefined (see zero to the power of zero)) | Undefined number in formalized system |
| 78 | True virtual | \(i\) (complex number) | Complex number |
| 79 | Loop triangle | \(\cos\)\((\text{E}100(\{\#,\#,1,2\})\{\#\}\#100) = \cos(280^\circ)\) in degrees[note 3] | N/A |
| 80 | Kawaii | \(15(1)(2)(3)...(100)15\) in Hayden's array notation | \(f_{\omega^{100}100+\omega^{99}99+\omega^{98}98+...+\omega^{2}2+\omega}(15)\) |
| 81 | Sugoi | \(23[1 [1 [1 [2 \backslash_4 2] 2] 2] 2]_2 53\) in HEAN | \(f_{\psi_0(\Omega^{\omega}_3)}(53)\) |
| 82 | Senpai | \(H\text{*}(16,16,16,...16)\) with 16,000 16's in H* function | \(f_{16002}(16)\) |
| 83 | Baka | \(3(2-2)11\) in HDAN | ??? |
| 84 | Daijobu | \(((( ... (124!1)!2)!3) ... )!124\) in Hyperfactorial array notation | \(f_{126}(...f_5(f_4(f_3(120)))...)\) |
| 85 | Imooto | \(K7,63,3,10(100)\) in K notation | \(f_{\omega^3 100+\omega^2 3 +\omega63+7}(100)\) |
| 86 | Tomodachi | \((22 \{4,4\} 37)\) in Notation array notation | \(f_{\omega^2+\omega3}^37(23)\) |
| 87 | Ureshiii | \([48]\) in PlantStar's debut notation | \(f_2(260)\) |
| 88 | Otaku | \(\#\text{*}((1))\text{*}((2246))\text{*}22\) in Pound-star notation | \(f_2^2(9956)\) |
| 89 | มีนั้งแดงละจะกิงน้ำส้วง | \(89\{X > X > X\}82\) in X-sequence hyper-exponential notation | \(f_{\varepsilon_{\varepsilon_{\omega}}}(82)\) |
| 90 | มีนั้งส้วงละจะกิงน้ำแดง | \(82\{X >> X\}89\) in X-sequence hyper-exponential notation | \(f_{\zeta_0}(89)\) |
| 91 | รถกูไม่แรงแต่กูทำมึงง่วง | \(z(3000,3000)\) in Zillion notation | ??? |
| 92 | ฉี่กูไม่ม่วงแต่กูยังมีแรง | \(A(10,9,8,7,6,5,4,3,2,1)\) in Taro's multivarible Ackermann function | \(f_{\omega^9 10 +\omega^8 9+\omega^7 8+\omega^6 7+\omega^5 6+\omega^4 5 +\omega^3 4+\omega^2 3+\omega2}(10)\) |
| 93 | อั๊วหัวแดงแต่ก็ทำลื้อร่วง | \((0,0)(1,1)(2,2)(3,3)(4,4)(5,5)(6,6)(7,7)(8,8)(9,9)(10,10)[7]\) in Bashicu matrix system with respect to version 2.3 | \(f_{\psi_0(\Omega_{10})}(7)\) |
| 94 | เอามึงไปคั่วอยู่ในพริกแกง | \(365$[[0]_4]\) in Dollar function | \(f_{\psi_0(\Omega_3)}(365)\) |
| 95 | เดี๋ยวเธอท่าหมาเดี๋ยวเธอท่าตะแคง | \(444[444,444,444,444]\) in Extensible illion system | \(f_{\omega444+2}^{443}(444)\) |
| 96 | เอาไงกังวะอ่ายเหี้ย | \(I<50000000,2>\) in Infra notation | \(f_3(50000000)\) |
| 97 | 私はあなたのためにここにいます | \(Q<94,3,2,1>\) in Quick array notation | \(f_{\omega+2}(3)\) |
| 98 | 必要なだけ時間がかかる | \(r(7,678,6438,2,2,2)\) in Rampant array notation | \(f_{\omega^4 2+\omega^3 2+\omega^2 2+\omega2+6438}(678)\) |
| 99 | 不快になるようなことをする必要はありません | \(\text{s}(3,3 \{1 \{1 \{1 ,,` 1 \{1 \{1 \{1 ,,` 1 ,, 2 ^{,,}\} 2 ,,` 1 \{1 ,,` 1 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 1 ,, 2 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 1 \{1 \{1 \{1 ,,` 1 ,, 2 ^{,,}\} 2 ,,` 1 \{1 ,,` 1 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 1 ,, 2 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 2\} 2\} 2 ^{,,}\} 2 ,,` 1 \{1 ,,` 1 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 1 ,, 2 \{1 ,,` 1 ,,` 2 ^{,,}\} 2 ^{,,}\} 2\} 2)\) in SAN | \(f_{C(\Omega_2 +C(\Omega_2 2+C(\Omega_2 2,0),0),0),0)}(3)\)[note 4] |
| 100 | すべてうまくいく | \(13[0 \{0 ,_1 0 ,_1 2\} 1]666\) in UNAN | \(f_{\zeta_1}(666)\) [note 5] |
| 101 | 私はあなたが狂っているとは思わない | \(h_{73}(235)\) in Accelerated hierarchy | ??? |
| 102 | これはあなたの責任ではないです | \(14169@265359\) in @ notation | \(f_{\omega}^2(14169^{265359})\) |
| 103 | Ending fastium | \(f_{\varphi(1,1,0)}(100)\) in FGH | \(f_{\varphi(1,1,0)}(100)\) (exact) |
| 104 | Ender fastium | \(f_{\varphi(1,2,0)}(100)\) in FGH | \(f_{\varphi(1,2,0)}(100)\) (exact) |
| 105 | God ender fastium | \(f_{\varphi(1,3,0)}(100)\) in FGH | \(f_{\varphi(1,3,0)}(100)\) (exact) |
| 106 | Godder end fastium | \(f_{\varphi(2,0,0)}(100)\) in FGH | \(f_{\varphi(2,0,0)}(100)\) (exact) |
| 107 | More godder end fastium | \(f_{\varphi(3,0,0)}(100)\) in FGH | \(f_{\varphi(3,0,0)}(100)\) (exact) |
| 108 | Even more godder end fastium | \(f_{\varphi(1,0,0,0)}(100)\) in FGH | \(f_{\varphi(1,0,0,0)}(100)\) (exact) |
| 109 | Super even more godder end fastium | \(f_{\varphi(1,0,0,0,0)}(100)\) in FGH | \(f_{\varphi(1,0,0,0,0)}(100)\) (exact) |
| 110 | Mega super even more godder end fastium | \(f_{\psi_0(\Omega^{\Omega^{\omega}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega^{\Omega^{\omega}})}(100)\) (exact) |
| 111 | Omega mega super even more godder end fastium | \(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(100)\) (exact) |
| 112 | Ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(100)\) (exact) |
| 113 | Godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega}}}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega}}}})}(100)\) (exact) |
| 114 | Absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2)}(100)\) (exact) |
| 115 | True absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 2)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 2)}(100)\) (exact) |
| 116 | Never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 3)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 3)}(100)\) (exact) |
| 117 | Santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega)}(100)\) (exact) |
| 118 | End santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega2)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega2)}(100)\) (exact) |
| 119 | Godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega3)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega3)}(100)\) (exact) |
| 120 | More godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega^2)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega^2)}(100)\) (exact) |
| 121 | Even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega^3)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega^3)}(100)\) (exact) |
| 122 | Super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega^{\Omega})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega^{\Omega})}(100)\) (exact) |
| 123 | Mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \Omega^{\Omega^{\Omega}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \Omega^{\Omega^{\Omega}})}(100)\) (exact) |
| 124 | Omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2 \psi_1(\Omega_2))}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2 \psi_1(\Omega_2))}(100)\) (exact) |
| 125 | Ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2^2)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2^2)}(100)\) (exact) |
| 126 | Godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2^3)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2^3)}(100)\) (exact) |
| 127 | Absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2^{\Omega})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2^{\Omega})}(100)\) (exact) |
| 128 | True absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2^{\Omega_2})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2^{\Omega_2})}(100)\) (exact) |
| 129 | Never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_2^{\Omega_2^{\Omega_2}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_2^{\Omega_2^{\Omega_2}})}(100)\) (exact) |
| 130 | Santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_3)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_3)}(100)\) (exact) |
| 131 | End santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_4)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_4)}(100)\) (exact) |
| 132 | Godder end santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_5)}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_5)}(100)\) (exact) |
| 133 | More godder end santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_{\omega})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_{\omega})}(100)\) (exact) |
| 134 | Even more godder end santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_{\Omega})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_{\Omega})}(100)\) (exact) |
| 135 | Super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Omega_{\Omega_{\Omega}})}(100)\) in FGH[note 6] | \(f_{\psi_0(\Omega_{\Omega_{\Omega}})}(100)\) (exact) |
| 136 | Mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end santanic never true absolute godly ultimate omega mega super even more godder end fastium | \(f_{\psi_0(\Lambda)}(100)\) in FGH[note 6] where \(\psi_0(\Lambda)\) denotes the countable limit of extended Buchholz's function, and \(\Lambda\) denotes the least omega fixed point. | \(f_{\psi_0(\Lambda)}(100)\) (exact) |
| 137 | True of Real[note 7] | Defined as 'the largest number defined using no more than a Mega Super Even More Godder End Santanic Never True Absolute Godly Ultimate Omega Mega Super Even More Godder End Santanic Never True Absolute Godly Ultimate Omega Mega Super Even More Godder End Fastium symbols in some K(Mega Super Even More Godder End Santanic Never True Absolute Godly Ultimate Omega Mega Super Even More Godder End Santanic Never True Absolute Godly Ultimate Omega Mega Super Even More Godder End Fastium) system', where a 'K(n) system' is a 'complete and well-defined system of mathematics that can be described with no more than n symbols'. | Ill-defined, uncomputable, unformalised |
| 138 | [Truest of Real[note 7] | Defined as 'the largest finite number that can be uniquely defined using no more than a True of Real symbols in some K(True of Real) system in some K2(True of Real) 2-system in some K3(True of Real) 3-system in some K4(True of Real) 4-system in some ......... KTrue of Real(True of Real) True of Real-system where the number True of Real 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, unformalised |
| 139 | Truest of Cycles[note 7] | Defined as 'the largest finite number that can be uniquely defined using no more than a Truest of Real symbols in some K(Truest of Real) system in some K2(Truest of Real) 2-system in some K3(Truest of Real) 3-system in some K4(Truest of Real) 4-system in some ......... KTruest of Real(Truest of Real) Truest of Real-system, with Truest of Real cycles, where the number Truest of Real 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, and 'cycles' can be represented using complete recursion-based diagonalization under the fundamental sequence 'True of Real, Truest of Real, ...'.
This number is intended to be far larger than Utter oblivion and Hayden's Ultimate Oblivion. |
Ill-defined, uncomputable, unformalised |
| 140 | Truest of Everything[note 7] | Defined as 'the largest finite number that can be uniquely defined using no more than a Truest of Real symbols in some K(Truest of Cycles) system in some K2(Truest of Cycles) 2-system in some K3(Truest of Cycles) 3-system in some K4(Truest of Cycles) 4-system in some ......... KTruest of cycles(Truest of Cycles) Truest of Cycles-system, with Truest of Cycles phrases, where the number Truest of Cycles 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, and 'phrases' can be represented using complete recursion-based diagonalization under the fundamental sequence 'Truest of Cycles, ...'.
This number is intended to be far larger than Truest of Cycles. |
Ill-defined, uncomputable, unformalised |
| 141 | Red Alcohol | \(\text{E}258\#\{\&\}\#258\) in Collapsing-E notation | \(f_{\varphi(1,0,0,0)}(258)\) |
| 142 | Rulan | \(\text{E}258\#\{\&+1\}\#258\) in Collapsing-E notation | \(f_{\varphi(1,1,0,0)}(258)\) |
| 143 | Zixia | \(\text{E}258\#\{\&+\#\}\#258\) in Collapsing-E notation | \(f_{\varphi(1,\omega,0,0)}(258)\) |
| 144 | Refresh | \(\text{E}258\#\{\&+\&\}\#258\) in Collapsing-E notation | \(f_{\varphi(2,0,0,0)}(258)\) |
| 145 | Midsummer | \(\text{E}258\#\{\&\&\}\#258\) in Collapsing-E notation | \(f_{\varphi(1,0,0,0,0)}(258)\) |
| 146 | Leilegent | \(\text{E}258\#\{\&\text{^}\&\}\#258\) in Collapsing-E notation | \(f_{\psi_0(\Omega^{\Omega^{\Omega}})}(258)\) |
| 147 | Bosom | \(\text{E}258\#\{\&\text{^}\&\text{^}\&\}\#258\) in Collapsing-E notation | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega}}})}(258)\) |
| 148 | Sweetie | \(\text{E}258\#\{\&\text{^}\&\text{^}\&\text{^}\&\text{^}\&\}\#258\) in Collapsing-E notation | \(f_{\psi_0(\Omega^{\Omega^{\Omega^{\Omega^{\Omega^{\Omega}}}}})}(258)\) |
| 149 | Diversium | \(\text{E}258\#\{\&_2\}\#258\) in Extended Collapsing-E notation | \(f_{\psi_0(\Omega_2)}(258)\) |
| 150 | Innovazione | \(\text{E}258\#\{\&_{64}\}\#258\) in Extended Collapsing-E notation | \(f_{\psi_0(\Omega_{64})}(258)\) |
Footnotes[]
- ↑ 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.
- ↑ 2.00 2.01 2.02 2.03 2.04 2.05 2.06 2.07 2.08 2.09 2.10 2.11 2.12 2.13 2.14 2.15 2.16 2.17 Naive extension of an uncomputable function.
- ↑ Irrational number.
- ↑ With fundamental sequences for Taranovsky's notation.
- ↑ Since numbers using Username5243's Array Notation (UNAN) are ill-defined with respect to the original definition by the reason explained here, the following approximation was said to be given with respect to intended values of the first alternative definition, using intended FGH ordinals based on User:Username5243/Introduction and analysis of UNAN, but it is ill-defined due to a similar issue explained here. Later, the creator replaced the explanation here that the following approximation was given with respect to the second alternative definition, but it does not seem to be precise because the second alternative definition was given only after the approximation was given. We note that the second alternative definition is also ill-defined by a similar issue explained here.
- ↑ 6.00 6.01 6.02 6.03 6.04 6.05 6.06 6.07 6.08 6.09 6.10 6.11 6.12 6.13 6.14 6.15 6.16 6.17 6.18 6.19 6.20 6.21 6.22 6.23 6.24 6.25 6.26 Using the Extended Buchholz's function for the \(\psi\) function for the expression \(\psi_0\).
- ↑ 7.0 7.1 7.2 7.3 Ill-defined uncomputable number (see Oblivion and Utter Oblivion).
Sources[]
- ↑ Hayden's Big Numbers - Meet yourself in 105 degrees Celsius. Retrieved 2023-01-14.[dead link]
- ↑ Hayden's Big Numbers - Meet yourself in 105 degrees Celsius. Retrieved 2023-10-23.[dead link]
- ↑ Hayden's Big Numbers - Meet yourself in 105 degrees Celsius. Retrieved 2024-04-05.