🔵=Improbable×4
🟢=Possible ×8
🟠=Probable ×12
Assuming I don't just want to win, but I also would like to maximize the possibility of impressive wins like guessing a 🔵New Fossile Fighters that no one anticipated.
Fig. 1 I arranged the improbables so that getting two of them almost certainly gives me a win. It also maximize es the number of win states they can have because they have the benefit of diagonal wins and the free space.
Fig. 2 I arranged them so that no improbable tiles share columns with another tile, and in the spaces where they meet, I place a Probable tile so that I can also maximize the chances of multiple wins at a time. This has the negative effect of making every win state at least somewhat unlikely because the only way to win is to get at least one Improbable, or three Possibles in a row.
Fig. 3 Increases the chance of getting less than impressive wins like guessing 🟠Luigi's Mansion 2 will appear. But it has the negative effect of making Impressive wins less likely.
Fig. 4 Is arranged so that Improbable tiles share win states, but not all win states. So if I get just one Improbable tile I will probably win.
If you have any advice please let me know! If you think one Fig is better than another please let me know!
Posted by Layman_Ahoy