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Not to be confused with googocci.

The googoci is equal to \(202^{101}\) = g(2, 101, 202) in the Ackermann's Generalized Exponential Notation.[1] The term was coined by André Joyce. Its full representation is:

69260929262310627579192861447517452726956512255094630796072906358906254379527149373337720354729667260470872810062056869890321501847580318512698465897081376217525538619130339834658128732884091706351184609629241867977340475321931005952

Approximations[]

Notation Lower bound Upper bound
Scientific notation \(6.926\times10^{232}\) \(6.927\times10^{232}\)
Arrow notation \(202\uparrow101\)
Steinhaus-Moser Notation 113[3] 114[3]
Copy notation 6[233] 7[233]
Taro's multivariable Ackermann function A(3,770) A(3,771)
Pound-Star Notation #*((78))*10 #*((79))*10
BEAF {202,101}
Hyper-E notation E[202]101
Bashicu matrix system (0)(0)(0)(0)(0)(0)[4346] (0)(0)(0)(0)(0)(0)[4347]
Hyperfactorial array notation 136! 137!
Fast-growing hierarchy \(f_2(763)\) \(f_2(764)\)
Hardy hierarchy \(H_{\omega^2}(763)\) \(H_{\omega^2}(764)\)
Slow-growing hierarchy \(g_{\omega^{101}}(202)\)

Sources[]

See also[]

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