The alpha series is a series of numbers from \(f_0(10)\) to \(f_{10^{24}}(10)\) defined using the fast-growing hierarchy (i.e. beginning from zeralum and up to yottalum).[1] The numbers were coined by wiki user Denis Maksudov.
List of numbers on the series
Name of number | Fast-growing hierarchy (exact equality) |
---|---|
Zeralum | \(f_0(10) = 11\) |
Unalum | \(f_1(10) = 20\) |
Balum | \(f_2(10) = 10,240\) |
Tralum | \(f_3(10)\) |
Quadralum | \(f_4(10)\) |
Quintalum | \(f_5(10)\) |
Sextalum | \(f_6(10)\) |
Septalum | \(f_7(10)\) |
Octalum | \(f_8(10)\) |
Nonalum | \(f_9(10)\) |
Dekalum | \(f_{10}(10)\) |
Hektalum | \(f_{100}(10)\) |
Kilalum | \(f_{1000}(10)\) |
Megalum | \(f_{10^6}(10)\) |
Gigalum | \(f_{10^9}(10)\) |
Teralum | \(f_{10^{12}}(10)\) |
Petalum | \(f_{10^{15}}(10)\) |
Exalum | \(f_{10^{18}}(10)\) |
Zettalum | \(f_{10^{21}}(10)\) |
Yottalum | \(f_{10^{24}}(10)\) |