227 



are the submarginal edges (not in triangles) of the fundamental 01 

 primitive. 



The symmetry of a janal subject is modified in various ways by 

 marginal charges, by coronation, or by effacements ordinary and 

 peripolar. 



The modifications are the following : 



On the -zoned heterozone janal subject we construct results, 



1. ^-zoned heterozone, 



2. ^--zoned homozone, 



3. r-ple zoneless monarchaxine janal, 



4. r-ple monaxine moiiozone, 



5. r-ple monaxine contrajanal. 



On the -zoned homozone subject we construct results, 



1 . ^-zoned homozone, 



2. r-ple zoneless monarchaxine janal, 



3. r-ple monaxine contrajanal. 



On the ri-ple zoneless monarchaxine janal subject we construct 



only r-ple monarchaxine janal results. 

 On the n'-ple monaxine monozone subject we construct results, 



1 . r-ple monaxine monozone, 



2. r-ple monaxine contrajanal. 



On the n'-ple monaxine contrajanal subject we construct only r-ple 

 raonaxine contrajanal results. 



In all these cases the constructions are given exactly by inspection 

 of our signatures for every divisor r of ri : and we can both complete 

 the table of perfect janal poles of (P+e)-edra Q-acra which we 

 require, and register the janal results of e ordinary effacements in every 

 possible way upon each of them, for every kind of symmetry. 



Having thus registered the results of ordinary effacement about 

 janal axes in a table of janal poles perfect only in peripolar effaceables, 

 we have next to register the results of peripolar effacement. 



The effect of a peripolar effacement is, that a rhombotomous tes- 

 sarace becomes a rhombotomous triace, and that the secondary zone, 



