-gong is a googological suffix coined by Sbiis Saibian. It is derived from googolgong, which was accidentally coined. -gong has no formal definition, but it loosely means that if \(n = f(100)\) for some function \(f\), then \(n ext{-gong} = f(100000)\). For googolgong, \(f(x) = 10^x\), where googol is \(10^{100}\) and googolgong is \(10^{100000}\). Similarly, if Bowers' giggol is \(^{100}10\), giggolgong is \(^{100000}10\).
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| - -gong is a googological suffix coined by Sbiis Saibian. It is derived from googolgong, which was accidentally coined. -gong has no formal definition, but it loosely means that if \(n = f(100)\) for some function \(f\), then \(n ext{-gong} = f(100000)\). For googolgong, \(f(x) = 10^x\), where googol is \(10^{100}\) and googolgong is \(10^{100000}\). Similarly, if Bowers' giggol is \(^{100}10\), giggolgong is \(^{100000}10\).
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| - -gong is a googological suffix coined by Sbiis Saibian. It is derived from googolgong, which was accidentally coined. -gong has no formal definition, but it loosely means that if \(n = f(100)\) for some function \(f\), then \(n ext{-gong} = f(100000)\). For googolgong, \(f(x) = 10^x\), where googol is \(10^{100}\) and googolgong is \(10^{100000}\). Similarly, if Bowers' giggol is \(^{100}10\), giggolgong is \(^{100000}10\).
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