P(club) + P(QS) 1/4 + 1/52 = .25 + .0192 = .269
The probability of drawing the Four of Spades from a standard deck of 52 cards is 1 in 52, or about 0.01923.
about 0.04%
1 in 52
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
There are 52 cards in a deck and 1 ace of spades. So the probability is 1/52 or unlikely.
The probability of drawing the Four of Spades from a standard deck of 52 cards is 1 in 52, or about 0.01923.
Reason:There are only 2 cards in the deck of 52 which could be either a Queen of Clubs or Queen or Spades, So there is a 2 out of 52 chance, or 3.8461538 % chance.
about 0.04%
1 in 52
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
There are 52 cards in a deck and 1 ace of spades. So the probability is 1/52 or unlikely.
1/52, or One over Fifty-Two. The odds are so because there are fifty-two cards in a deck, and there is only one Queen of Spades. The chances of you picking a Queen of Spades is One in Fifty-Two tries. If you are using jokers, 1/54, because there are 2 extra.
There are 13 spades in a deck of cards, so the probability of drawing a spade is 13/52 or 1/4.
There are 52 cards in the deck.The probability of drawing the ace of spades on the first draw is 1/52 .Since you don't put the first card back, there are then 51 cards in the deck.The probability of drawing the 4 of spades on the second draw is 1/51 .The probability of both occuring is (1/52) x (1/51) = 1/2,652 = 0.037707 % (rounded)
The probability of drawing a spade in a standard 52 card deck is 13 in 52, or 1 in 4. The probability of drawing a second spade, assuming the first spade was not replaced back into the deck, is 12 in 51. The probability, then, of drawing two spades is the product of those two probabilities, or 12 in 204, or 1 in 17.
In my head it's one in 256. one chance in 44th
There are 26 black cards in a deck of cards (13 spades and 13 clubs) There are 52 cards total in a deck of cards Therefore, the probability of drawing a black card from a deck of 52 cards: 26/52 0.5