Unfortunately, there does not exist much in the way of functionality to support this, unless you are willing to instead use d6>4! (where you would "pretend 5 is even and 2 is odd"). An API Script could, of course, handle this easily enough. Access to the API is available within games in which the Creator has an active Pro subscription. If you're willing to manually roll exploding dice, here's a possible solution; The inline roll [[ 1 - d6 % 2 ]] resolves to be 0 if the d6 roll is odd, or 1 if the roll is even, highlighting green on a roll of a six (which would prompt you to reuse the macro below). You could use a Roll Query to sum a bunch of these inline rolls together to handle dice pools, e.g. /r ?{Skill Dice|
01, [[ 1-d6%2 ]] |
02, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] |
03, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] |
04, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] |
05, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] |
06, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [6d6] |
07, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [7d6] |
08, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [8d6] |
09, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [9d6] |
10, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [10d6] |
11, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [11d6] |
12, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [12d6] |
13, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [13d6] |
14, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [14d6] |
15, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [15d6] |
16, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [16d6] |
17, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [17d6] |
18, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [18d6] |
19, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [19d6] |
20, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [20d6] |
21, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [21d6] |
22, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [22d6] |
23, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [23d6] |
24, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [24d6] |
25, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [25d6] |
26, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [26d6] |
27, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [27d6] |
28, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [28d6] |
29, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [29d6] |
30, [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] + [[ 1-d6%2 ]] [30d6]
}