Class[]
We have \(10^{301030} < 2^{million+2} = 2^{1000002} < 10^{301031}\), and therefore \(10^{10^6} < 10^{10^{301030}} < micryllion = 10^{2^{million+2}} = 10^{2^{1000002}} < 10^{10^{301031}} < 10^{10^{1000000}} = 10^{10^{10^6}}\). The micryllion is therefore a Class-3 number. --84.61.189.220 12:19, August 13, 2013 (UTC)
- There is a good point to note the difference between two numbers: \(2^{10^{1000000}}\) and \(10^{2^{1000000}}\). The first one is roughly \(10^{3*10^{999999}}\), while the second is about \(10^{10^{301029}}\). We need to square \(10^{2^{1000000}}\) millions of times in order to get to \(2^{10^{1000000}}\). Ikosarakt1 (talk ^ contribs) 17:05, August 13, 2013 (UTC)
Fixing approx. please?[]
Please fix \(10^{3.9960083721 \times 10^{30,103}}\) because 101030,103 is closer to 22100,000 than 221,000,000 (apparently the topmost exponent is off (\(10^{30,103}\)) rather than \(10^{301,030}\)), same goes to Picyllion, Femtyllion, Attyllion, Zeptyllion and Yoctyllion.
ARsygo (talk) 11:27, November 11, 2017 (UTC)
- Okay. I'll fix it. Unknown95387 (talk) 13:16, November 11, 2017 (UTC)