350 [Jan. 8, 



Table B. 

 Homozone polar face : 



3^37=1, 8 Z={2.1, 2(1^+1), 2 -i}, 

 = 6 {O p } (art. XXII.). 



This 3-zoned secondary pole of the regular octaedron is regis- 

 tered as the termination of a homozone axis ; for all janal construc- 

 tions upon it will be homozones. The six poles registered in the 

 zonoid signature are here zoned amphigrammic poles of 2-ple repeti- 

 tion. To see this, we need only crown the hexagon 123456 with a 

 triace above on 135, and with a triace below on 246 : the axis this 

 constructed is the reciprocal of the one here recorded. 



Janal zoned polar edgei 



(33)^26=1, 



Table C. 

 Zoned non-polar faces : 



3 m 37=l, Z={2, 2,0, 0}; 

 3 W0 3?=1, Z={4, 2,0 3 , 0}. 

 Asymmetric face : 



337=1. 



Table D. 

 Zoned polar edges : 



(33)Xr26= 2, Z ={2.1,2.1, P , 0,}, 

 Z'={2.2,2.1,0 f ,0 p , 

 Zonal edge : 



(33)z 26=l, Z={4, 2, O 3 , 0}. 



Asymmetric edges: 



Registration of^-edra S-acra. 



Table A. 



1. Two 2-zoned monaxine heteroids, having each an edrogrammic 

 axis, one terminated by the polar hexagon, and the other by the 

 polar tetragon, first below written. 



2. Two 2-ple zoneless monaxine heteroids, with edrogrammic axes, 

 both terminated by tetragons. 



