1863.] 379 



6. One zoneless 2-ple monaxine heteroid, with amphigrammic axis. 



7. Four monozones, of which 



2 have the zone Z={4, 2, 0, O 3 }, 



1 has the zone Z={2, 2, 0, 0}, 



1 has the zone Z={4, 4, O 2 , O 2 }. 



8. Two asymmetric 12-edra 8-acra. 



Table B. 

 Homozone polar edges'. 



(33)^410=2, Z={2.2, 2.1, 0,, O p , O 21 }. 

 Heterozonej anal polar edgei 

 (33)jr*4lO=l, 



Z={2,+2.2, ..,0*}, Z'={2 p , 2.2, 0*}, Z"={2 1 ,+2 1 ,,..,0 2 - 2 }. 

 Janal zoneless polar edges : 



(33)* a 410=l, (33)^,410= k 



Table C. 

 Zoned non-polar faces : 



3^511=10, Z={4, 4, O 2 , O 2 }; 

 3^511=3, Z={2, 4, O 2 }; 

 3 W 5H=5, Z={4, 2, O 2 , O 2 }; 

 3 m '5H=l, Z={4, 2, O 3 , 0}; 

 3^511=3, Z={2, 2, 0, 0}; 

 3 m 5H=l, Z={6, 2, 0, 05}. 

 Objanal monozone faces : 



3^511=2, Z={2.2, 2.2, 2 *, O 2 ^}, 

 which are also above entered. 

 Asymmetric face : 



3,511=55. 



Table D, 



not comprising the edges in the above Table B. 

 Zoned polar edges: 



(33)1^.410=2, Z={2.2, 2.2, O 2 - 1 }, 



(33)1^.410=2, Z={2.3, 2.1, P , O p , O 21 }, 

 Z's=-[21 21 OJ- 



