User:Wythagoras/Saibian's naming system

This page is about the following question: How many numbers can be named using Saibian's naming system.

xE#
There are 16,777,216 numbers nameable using the xE# naming system.

Under deutero-godgahlah
Using the carta- operator, we can make a godgahlah group with 16,777,216 numbers, a gotrigahlah group with 16,777,216 numbers, a gotergahlah group with 16,777,216 numbers, ...

In total, there are 10 groups, that means 167,772,160 numners nameable under godgoldgahlah.

We can append all these numbers to godgoldgahlah, gotrigoldgalah, gotergoldgalah, ....

In total, there are 10 groups, that means 1,677,721,600 numners nameable under godthroogahlah.

And that can also be done for godthroogahlah, godteroogahlah, ... giving a total of 167,772,160,000,000,000 numbers.

An example is:

tristo-yotti-ecti-teristo-peti-pesto-teri-tristo-thrinorgolthra-carta-gotrigahlah-carta-gotergoldgalah-carta-godthroogalah. The value of this number is E100#^#*##100#^#*#100#^#*#100#^#*#100#^#100#^#100########100########100######100##### 100#####100#####100####100####100####100####100###100###100##100##100##8

Under gridgahlah
The deutero-godgahlah group will multiply the total by \(10^{10}\).

The trito-godgahlah group will do the same

And all other groups also, giving a total of \(16777216 \cdot 10^{110}\)

Under kubikahlah
The deutero-gridgahlah group will multiply the total by \(10^{10}\).

The trito-gridgahlah group will do the same.

And all other groups also, giving a total of \(16777216 \cdot 10^{220}\)

Under godgathor
All 24 groups will do the same as the gridgahlah and the kubikahlah group

A total of \(16777216 \cdot 10^{2640}\) is reached.

Under godgathordeus
This group will do the same as the previous group.

A total of \(16777216 \cdot 10^{5280}\) is reached.

Under gralgathor
Every -deus, -truce, ... group multiplies the total with \(10^{2640}\)

A total of \(16777216 \cdot 10^{21120}\) is reached.

Under godtothol
Every gral, thrael, ... group multiplies the total with \(10^{21120}\)

A total of \(16777216 \cdot 10^{168960}\) numbers is reached.

Under gotertathol
Every gral, thrael, ... group multiplies the total with \(10^{168960}\)

A total of \(16777216 \cdot 10^{1351680}\) numbers is reached.

Under tethrathoth
Every group reaches the total to the power of eight.

A total of \(16777216 \cdot 10^{44291850240}\) numbers is reached.