Just how huge are things from Thumbelina's perspective? The answer may be well beyond the powers of Google.
![]() | \(= 2 \uparrow^{10^{100}} 2\) |
![]() | \(=\)Number of particles in the known Universe |
![]() | \(=43^{45^{47^{49^{41^{3}}}}}\) |
![]() | (eg)\(=\)![]() |
![]() | \(=3 \rightarrow 2 \rightarrow 3 \rightarrow 3\) |
![]() | \(=3^{2^{2^{4^{35^{15}}}}}\) |
![]() | \(=\)Graham's number |
![]() | \(=3^{4^{5^{6^{...^{(10^{100})}}}}}\) |
![]() | \(=2 \rightarrow 3 \rightarrow 3 \rightarrow 3\) |
![]() | (eg)\(=\)Largest named number in the Avataṃsaka Sūtra |
![]() | \(=(((10^{100}!)!)!)!\) |
![]() | (eg)\(=13^{315760124882724518}\) |
![]() | \(=20^{270354175698445357}\) |
![]() | \(=A(4,5)\) |
![]() | \(=2 \rightarrow 10^{100} \rightarrow 2\) |
![]() | \(=A(10^{100},10^{100})\) |
![]() | \(=2 \uparrow\uparrow 8\) |
![]() | \(=BB(100)\) |
![]() | \(=\)Number of permutations of these numbers |
![]() | \(=\)Loader's number |
![]() | (eg)\(=\)Largest named number in The Sand Reckoner |
![]() | \(=A(5,1)\) |
![]() | \(=68^{75^{96^{92^{39^{3}}}}}\) |
![]() | \(=2^{38^{64^{20^{57^{13}}}}}\) |
![]() | \(=(10^{100})^{...^{6^{5^{4^{3}}}}}\) |
![]() | (eg)\(=A(BB(99),BB(99))\) |
![]() | \(=\)BIG FOOT + 1 |
![]() | (eg)\(=\)Moser's number |
![]() | \(=3 \uparrow^{10^{100}} 3\) |
Lexicographic rank of this permutation:
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