1 in 132,600 for a deck of 52 cards (without jokers) 1 in 148,824 for a deck of 54 cards (with jokers)
The probability of drawing 3 cards, all with the value of 9, from a standard 52 card deck, is ~0.018%.
It is a possible but unlikely event.
The probability of drawing 2 sixes from a deck of 52 cards is (4 in 52) times (3 in 51) which is (12 in 2652) or (1 in 221) or about 0.004525.
The probability of drawing 3 sixes from a deck of 52 cards is (4 in 52) times (3 in 51) times (2 in 50) which is (24 in 132600) or (1 in 5525) or about 0.0001810.
Aprox. 0.018%There are 4 queens in a regular deck of 52 cards.The probability of drawing a queen on the first draw is: P(Q1) = 4/52.The probability of drawing a queen on the second draw given that the first card wasa queen is: P(Q2│Q1) = 3/51.The probability of drawing a queen on the third draw given that the first two cardswere queens is: P(Q3│(Q2UQ1)) = 2/50.The probability of drawing 3 queens on the first 3 cards drawn from a deck of cardsis: P(Q1UQ2UQ3) = (4/52)∙(3/51)∙(2/50) = 1.80995... x 10-4 ≈ 0.00018 ≈ 0.018%
4/52 X 3/51 x 2/50.
In a deck of 52 cards, there are four suits. Each suit contains an ace and the numbers two through ten as well as a Jack, Queen, and King. In a modern deck, there are twelve face cards in all.
The queen of spades is looking in a different way than all other queens.
P(8) AND P(8) = 4/52 * 3/51 = 12/2652 = 0.00452.
Likelihood is 1/52 or approximately 1.9%. This is based on: (1) a standard deck has 52 cards, and (2) a standard deck has only one king of clubs. So the chance of drawing that one card out of all 52 cards, on one try is: 1 divided by 52.
If you are drawing only two cards, the probability that they will both be aces is one in 221. ( (52 / 4) * (51 / 3) ) If you are drawing all the cards in the deck, one at a time, the probability that you will draw at least two aces in a row is much better than that, but how much better I leave for someone else to answer.