List of tier-4 illion numbers

is all we have to go on. None the less, even from this small list of examples a rule can be obtained. We simply drop the last vowel in the Class 3 Group, and follow it with the Class 4 Separator with the leading consonant removed. This practice may even eliminate potential ambiguities, because it strongly implies that the group and its following separator are linked. One ambiguity that could result from my suggestion would be something like meji-daka-kalillion. Is this the 1,000,010th Class 3 Separator followed by the 1000th? or is it the 1,010,000th Class 3 Separator. This could be avoided by altering "daka" as "daki" to imply it is part of a continuing sequence, but Bowers' system works too. As far as I can tell this is it. We now have all the rules to complete Bowers' system. If ambiguities should be present, we can change "a"s to "i"s in the Tier 3 roots to imply continuation. We can now construct the Tier 4 root table. This table will not be completely filled out, and we will need to set up a special set of rules for how they work, since they don't follow the usual pattern. None the less here it is: