Table of Contents
What is the probability of getting at least two kings?
(So the chance for at least two Kings is 1/221. Multiplying the chances for each card gives 1081/270725.
What is the probability of drawing 2 jacks from a pack of card?
If there are 2 Jacks in a pile of 52 cards already, and you add two more Jacks, then your probablilty of drawing out a Jack is 4 out of 54 (or 4/54), and when you divide the numerator and denominator by 2/2 (because it’s a factor of 1, so you don’t change the equation), you get 2/26.
What is the probability that when a hand of 5 cards is drawn from a well shuffled deck of 52 cards?
78*9139 = 712,842 is the total number of five-card hands with exactly two hearts; to find the probability, divide that by the total number of five-card hands, which is 52! / (47! * 5!) = 2,598,960. That works out to 27.42\%+.
What is the probability of getting all kings when a hand of 5 cards is drawn from a well shuffled deck of 52 cards?
The answer is 1/54,145.
What is the probability of getting a Jack from a deck of 52 cards?
soprobability of getting Jack = 4/52 = 1/13.
What is the probability that a five-card poker hand has the following?
The probability is approximately 0.00198079. IF YOU MEAN TO EXCLUDE STRAIGHT FLUSHES, SUBTRACT 4*10 (SEE THE NEXT TYPE OF HAND): the number of hands would then be (4-choose-1)*(13-choose-5)-4*10, with probability approximately 0.0019654.
What is the probability of getting an ace in a 5-card hand?
If, instead, you want the probability of at least one ace appearing in a 5-card hand, we do things differently. The easiest answer is to find the probability of getting n o aces in a 5-card hand. for we have 48 choose 5 possible hands with no aces. 1 − ( 48 5) ( 52 5).
How many 5-card poker hands are in a deck?
The number of 5-card poker hands from a standard deck is (52 | 5) (read: “52 pick 5”) as there are 52 cards and you’re picking 5 of them. [There’s an easier notation for the above, but I dunno how to type it in plain text.] Anyway, that is a combinatorial and calculates out to 2,598,960 unique hands.
How many cards are drawn from a deck with $52$?
Five cards are drawn from a shuffled deck with $52$ cards. Find the probability that b) same as (a)? a) There are $ \\binom {52} {5} = 2,598,960 $ ways of choosing 5 cards.
How many 5-card hands are there in 4*C(13)5?
For any one of the four suits, there are C (13,5) 5-card hands… i.e. the number of combinations of taking 5 cards from 13 distinct cards. But, since there are 4 suits, there are then 4*C (13,5) possible “flushes.”