User blog:GamesFan2000/The Maidengiga

You may have noticed that in all of my theorizing, I’ve never once defined any specific number. That will change with this post. I’ve derived this from my ECMCF function... and my all-time favourite band. I’ve gotten creative for this one. My all-time favourite band is Iron Maiden. They are THE premier active heavy metal band, and they’ve been doing it for 43 years and counting, beginning on Christmas Day of 1975. Now, how exactly can I derive a number from a band? Well, there are multiple ways to look at it.

Deriving a number to base this on
I could use the number of albums they’ve released, being 16. But, that’s not big enough for me. I could also use the number of songs they’ve released, which is more than 200. I still feel that’s too small. So, I’ve decided to do something creative and use the combined RUNNING TIME of those 16 albums in seconds. That comes out to be:

37:35+38:18+39:11+45:18+51:12+51:18+43:51+43:42+57:58+70:54+53:22+66:57+67:57+71:53+76:34+92:11=908:59

908*60=54480+59=54539 seconds

The Maidengiga
With the combined running time of the 16 Iron Maiden albums calculated, I can now define the number I have in mind. I call this the Maidengiga.

The number is 54539[54539[54539[...[54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], 54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], ...54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]]]...]]][54539[54539[...[54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], 54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], ...54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]]]...]]]...[54539[54539[...[54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], 54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]], ...54539[54539[54539, 54539, ...54539], 54539[54539, 54539, ...54539], ...54539[54539, 54539, ...54539]]]...]]]

Description and Explanation
We have 54539 followed by 54539 recursors. Within each recursor are 54539 variables. Each of these variables consists of 54539 levels of recursors. Every integer used in this is equal to 54539. You start with the first level having 54539 54539’s, each of which are followed by 54539 54539’s on the second level, and so on. In other words, the number of 54539’s in each recursor is 54539+54539^54539+54539^^3...+54539^^54539, where each equation is refering to a level equal to b if the general expression for tetration is a^^b. For each group of 54539’s on each level, you put a pair of brackets around them. Yeah... that’s quite big. You can find out how this notation works in my blog post on the ECMCF.