User:Inthar/Subgroup names: Difference between revisions
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this was cellularAutomaton's idea, and ground made suggestions. In my preferred scheme, the morphemes go in decreasing order from the highest prime; as the first part is the most recognizable and signals the prime limit, it should represent the highest prime. Subgroups without prime 2 are tentatively formed by removing the -l: 5 = peta, 3.5 = penta, etc. | |||
== 5-lim == | == 5-lim == | ||
* 2.5: | * 2.5: pe tal | ||
* 2.3.5: | * 2.3.5: pe n tal | ||
== 7-lim == | == 7-lim == | ||
* 2.7: | * 2.7: sep al | ||
* 2.5.7: | * 2.5.7: sep t al | ||
* 2.3.7: | * 2.3.7: se(p) m al | ||
* Full limit: | * Full limit: sep ti m al | ||
== 11-lim == | == 11-lim == | ||
* 2.11 | * 2.11 un al | ||
* 2.7.11 | * 2.7.11 un dec al | ||
* 2.5.11 | * 2.5.11 un ci al | ||
* 2.3.11 | * 2.3.11 un m al | ||
* 2.5.7.11 | * 2.5.7.11 un de ci al | ||
* 2.3.7.11 | * 2.3.7.11 un dec m al | ||
* 2.3.5.11 | * 2.3.5.11 un ci m al | ||
* Full limit: | * Full limit: un de ci m al | ||
== 13-lim == | == 13-lim == | ||
* 2.13: | * 2.13: tris al | ||
* 2.11.13: | * 2.11.13: tris kai al | ||
* 2.7.13: | * 2.7.13: tris dec al | ||
* 2.5.13: | * 2.5.13: tris ci al | ||
* 2.3.13: | * 2.3.13: tris m al | ||
* 2.7.11.13: | * 2.7.11.13: tris kai dec al | ||
* 2.5.11.13: | * 2.5.11.13: tris kai ci al | ||
* 2.3.11.13: | * 2.3.11.13: tris kai m al | ||
* 2.5.7.13 | * 2.5.7.13 tris de(c) ci al | ||
* 2.3.7.13 | * 2.3.7.13 tris dec m al | ||
* 2.3.5.13: | * 2.3.5.13: tris ci m al | ||
* 2.5.7.11.13: | * 2.5.7.11.13: tris kai de(c) ci al | ||
* 2.3.7.11.13: | * 2.3.7.11.13: tris kai dec m al | ||
* 2.3.5.11.13: | * 2.3.5.11.13: tris kai ci m al | ||
* 2.3.5.7.13: | * 2.3.5.7.13: tris de(c) ci m al | ||
* Full-limit: | * Full-limit: tris kai de(c) ci m al = tridecimal | ||
Revision as of 22:05, 28 November 2023
this was cellularAutomaton's idea, and ground made suggestions. In my preferred scheme, the morphemes go in decreasing order from the highest prime; as the first part is the most recognizable and signals the prime limit, it should represent the highest prime. Subgroups without prime 2 are tentatively formed by removing the -l: 5 = peta, 3.5 = penta, etc.
5-lim
- 2.5: pe tal
- 2.3.5: pe n tal
7-lim
- 2.7: sep al
- 2.5.7: sep t al
- 2.3.7: se(p) m al
- Full limit: sep ti m al
11-lim
- 2.11 un al
- 2.7.11 un dec al
- 2.5.11 un ci al
- 2.3.11 un m al
- 2.5.7.11 un de ci al
- 2.3.7.11 un dec m al
- 2.3.5.11 un ci m al
- Full limit: un de ci m al
13-lim
- 2.13: tris al
- 2.11.13: tris kai al
- 2.7.13: tris dec al
- 2.5.13: tris ci al
- 2.3.13: tris m al
- 2.7.11.13: tris kai dec al
- 2.5.11.13: tris kai ci al
- 2.3.11.13: tris kai m al
- 2.5.7.13 tris de(c) ci al
- 2.3.7.13 tris dec m al
- 2.3.5.13: tris ci m al
- 2.5.7.11.13: tris kai de(c) ci al
- 2.3.7.11.13: tris kai dec m al
- 2.3.5.11.13: tris kai ci m al
- 2.3.5.7.13: tris de(c) ci m al
- Full-limit: tris kai de(c) ci m al = tridecimal