There are 4 kings in a deck of 52 cards, so the probability of any one card being a king is 4/52 = 1/13.
The probability of getting at least one king is 1 - (12/13)5, in other words 1 minus the probability of not getting a king 5 times. This comes to 0.3298, or approximately 1 in 3.
If you want the probability of getting exactly 1 king, then the calculation is 5*(1/13)*(12/13)4 = 0.2792, or roughly 7/25.
The odds of getting a royal flush in five card stud is the same as in any poker game with five cards involved, i.e. 649,740 to 1.
In poker a Flush is a hand where you need to have five cards that are of the same suit for example 8,5,4,3,2, each card being clubs. The odds of receiving a flush are 1 in 273.1 which is why poker players refer to them as "fat flushes."
poker & cheat
Five card is one found among the most popular. Probably because it is very simplistic. Another is seven card draw, or seven card stud. These are the tops of the poker world.
Poker is a five-card game. There is no such hand as three pairs.
In five card draw, once.
The probability of getting 3 aces in the order AAABB is; P(AAABB) = (4/52)∙(3/51)∙(2/50)∙(48/49)∙(47/48) = 0.0001736... There are 5C3 = 5!/(3!∙(5-3)!) = 10 different ways in which the aces can come out. So the probability of getting exactly three aces in a five card poker hand dealt from a 52 card deck is, P(3A) ~ 10∙(0.0001736) ~ 0.001736 ~ 0.1736%
Texas Hold'em, World Series of Poker, Five Card Draw, and Video Poker are all popular computer poker games. All of these games can be played free online.
1 in 298,000
I will assume you numbers are correct, and the odds of NOT getting a royal flush is 649740 to 1, then the odd of a royal flush is the reciprocal of that. When we speak of odds in probability it has a very specific meaning. If P is the probability of an even , then the odds in favor of P are P/(1-P). For example, the odds of getting a 6 when we throw a die is not 1/6, it is 1/6 divided by 1-(1/6) or 1/6 divided by 5/6 which is 1/5 or 1 in 5. The odds of not getting a 6 is 1/(1/5)=5 to 1 So your given odds are 649740/1 and the odd of getting the royal flush are 1/649740.
No.
A straight flush is the second best hand.