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These tables list the number of throws -- involving only dice #1, #2 and #3 -- that fall into the various horizontal, vertical and chromatic combinations. The first several tables are organized by horizontal combinations, followed by vertical, and the chromatic.

For each possible combination is listed the number of ways it can be thrown, along with an example in which the dice are listed in the alphabetical order of table three.

To reduce distraction, any row or column that would contain only impossible combinations -- hence zeroes -- is omitted.

H3 C111 Total
V111 6
4c-4y-4m 		6
Total 6
6

H21 C21 C111 Total
V21 24
2m-1m-1c 		6
4c-3y-3m 		30
V111 48
1y-3y-1c 		12
2m-2c-5y 		60
Total 72
18
90

H111 C3 C21 C111 Total
V3 6
4c-5c-6c 		12
3c-4y-2y 		6
4c-6m-5y 		24
V21 12
2m-6m-3m 		48
1y-4y-3m 		12
2m-4y-1c 		72
V111 6
4c-2c-6c 		12
1y-6m-4m 		6
4c-6m-2y 		24
Total 24
72
24
120

Totals C3 C21 C111 Total
V3 6
12
6
24
V21 12
72
18
102
V111 6
60
24
90
Total 24
144
48
216

V3 H111 Total
C3 6
4c-5c-6c 		6
C21 12
3c-4y-2y 		12
C111 6
4c-6m-5y 		6
Total 24
24

V21 H21 H111 Total
C3 0
12
2m-6m-3m 		12
C21 24
2m-1m-1c 		48
1y-4y-3m 		72
C111 6
4c-3y-3m 		12
2m-4y-1c 		18
Total 30
72
102

V111 H3 H21 H111 Total
C3 0
0
6
4c-2c-6c 		6
C21 0
48
1y-3y-1c 		12
1y-6m-4m 		60
C111 6
4c-4y-4m 		12
2m-2c-5y 		6
4c-6m-2y 		24
Total 6
60
24
90

Totals H3 H21 H111 Total
C3 0
0
24
24
C21 0
72
72
144
C111 6
18
24
48
Total 6
90
120
216

C3 V3 V21 V111 Total
H111 6
4c-5c-6c 		12
2m-6m-3m 		6
4c-2c-6c 		24
Total 6
12
6
24

C21 V3 V21 V111 Total
H21 0
24
2m-1m-1c 		48
1y-3y-1c 		72
H111 12
3c-4y-2y 		48
1y-4y-3m 		12
1y-6m-4m 		72
Total 12
72
60
144

C111 V3 V21 V111 Total
H3 0
0
6
4c-4y-4m 		6
H21 0
6
4c-3y-3m 		12
2m-2c-5y 		18
H111 6
4c-6m-5y 		12
2m-4y-1c 		6
4c-6m-2y 		24
Total 6
18
24
48

Totals V3 V21 V111 Total
H3 0
0
6
6
H21 0
30
60
90
H111 24
72
24
120
Total 24
102
90
216