{1}; {1,2}, {1,3}, {1,4}, {1,5}; 

{1,2,3}, {1,2,4}, {1,2,5}, {1,3,5}, {1,4,7}; 

{1,2,3,4}, {1,2,3,5}, {1,2,3,6}, {1,2,4,5}, 

{1,2,4,6}, {1,2,4,7}, {1,2,5, 6}, {1,3,5,7}   

corresponding, respectively, to the source KLs of the form   

8^*a; 8^*a.b, 8^*a:b, 8^*a:.b, 8^*a::b; 

8^*a.b.c, 8^*a.b:c, 8^*a.b:.c, 8^*a:b:c, 8^*a:.b:.c; 

8^*a.b.c.d, 8^*a.b.c:d, 8^*a.b.c:.d, 8^*a.b:c.d, 

8^*a.b:c:d, 8^*a:b.c:d, 8^*a.b:.c.d, 8^*a:b:c:d,   

given in the Conway notation. The coefficients of 

give the number of different source KLs derived from 8^* for 8 £ n £ 16. We can divide all the vertex bicolorings obtained into equivalence classes, with regard to their symmetry groups, and then consider only their representatives. According to this, for n = 9 we have the representative 8^*a giving 2 source links; for n = 10 the representative 8^*a.b (8^*a:b, 8^*a:.b, 8^*a::b) giving 3 source links; for n = 11 two representatives: 8^*a.b.c (8^*a:b:c, 8^*a:.b:.c) giving 6 source links and 8^*a.b:c (8^*a.b:.c) giving 8 source links; for n = 12 five representatives: 8^*a.b.c.d (8^*a.b:c.d, 8^*.a:b.c:d) giving 10 source links, 8^*a.b.c:d (8^*a.b:c:d) giving 16 source links, 8^*a.b.c:.d giving 12 source links, 8^*a:b:c:d giving 6 source links, and 8^*a.b:.c.d giving 7 source links, where the other members of equivalence classes are given in parentheses. The list of source links derived from these representatives is given in Table 8: