1/52
there is only one queen of hearts in the deck and there are 52 cards in a deck (not counting jokers).
The answer depends on how many cards are dealt out to you - which depends on how many cards you are dealt.
It is 0.0039 approx.
If only one card is dealt randomly from a deck of cards, the probability is 1/52.
5
11/4165 = 0.002641056... ≈ 0.26%There are 13 hearts in a deck of 52 cards.So when dealing 4 cards, the probability of all 4 to turn out to be hearts is:P(4 hearts in 4 cards) = (13/52)∙(12/51)∙(11/50)∙(10/49) = 0.002641056...≈ 0.26%
The answer depends on how many cards are dealt out to you - which depends on how many cards you are dealt.
The answer depends on how many cards you are dealt!
It is 0.0039 approx.
The probability of being dealt a blackjack hand with an ace and a nine in a standard deck of cards is 4.83.
If only one card is dealt randomly from a deck of cards, the probability is 1/52.
5
There are 13 diamonds. Three cards are dealt. The probability of all of them being diamond is (13/52)(12/51)(11/50) = 1716/132600 = 11/850
If the pack is well shuffled, the probability is 1/52.
the percentage chance is 32 and 100
The odds are 220:1 of being dealt pocket aces.
11/4165 = 0.002641056... ≈ 0.26%There are 13 hearts in a deck of 52 cards.So when dealing 4 cards, the probability of all 4 to turn out to be hearts is:P(4 hearts in 4 cards) = (13/52)∙(12/51)∙(11/50)∙(10/49) = 0.002641056...≈ 0.26%
The answer will depend on the exact situation.If you are dealt a single card, the probability of that single card not being a queen is 12/13 - assuming you have no knowledge about the other cards.Here is another example. If you already hold three queens in your hand (and no other cards have been dealt), the probability of the next card being dealt being a queen is 1/49, so the probability of NOT getting a queen is 48/49 - higher than in the previous example.