I would like to thank Miplet for confirming the table above. The next table is for four-card stud with no jokers. The order of cards on the flop makes no difference, so multiply the probability by 6 to account for this (1 2 3 6 - this is math probability stuff). So to account for this we multiply this fraction by 6 (123 6). The second table is for a fully wild card. In Texas Holdem it does not make a difference whether the flop comes A K Q or A Q K. The first table is for a partially wild card that can only be used to complete a straight, flush, straight flush, or royal flush, otherwise it must be used as an ace (same usage as in pai gow poker).

The next two tables show the probabilities in 5-card stud with one wild card. For example you can hold a straight flush and still lose to a higher straight flush. The following table shows the number of combinations if each card was dealt from a separate deck, which would be mathematically equivalent to an infinite number of decks. In popular variants of poker like Texas Holdem, players form their best hand from the two cards dealt to them and five community cards seven cards in. Because the only 'winning combination' you ever get for sure in Texas Hold'em is when you're holding the 'nuts' (the absolute best poker hands).