Q: What is the probability of drawing a king of hearts from a regular deck of cards?

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The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.

The probability of drawing the Five of Hearts from a standard deck of 52 cards is 1 in 52, or about 0.01923.

There are 13 Hearts (including a King) and 3 extra Kings (a total of 16 cards) in the 52 card pack, so the probability of drawing a Heart or a King is 16/52 = 4/13 = 0.3077 or 30.77%

What is the probability of drawing 3 red cards (hearts or diamonds) from a standard 52-card deck? Enter your answer as a number rounded to 2 decimal places.

The probability of getting two hearts in a row: P(Getting a hearts on the first draw)*P(Getting another hearts given the first one was a hearts) The first probability is simple: there are 13 hearts in a deck of 52 cards. The probability is 13/52=1/4. The second probability is trickier: there are now 12 hearts left in a deck of 51 cards! The probability of getting another hearts is therefore 12/51=4/17. Now compute (1/4)*(4/17) and get 1/17, which is the probability of drawing two hearts from a deck of fifty-two playing cards.

Related questions

The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.

The probability of drawing the two of hearts is 1/52. The probability of drawing two cards that are hearts depends on whether or not the first card is replaced. If it is replaced, then the probability is (1/4)*(1/4) = 1/16 = 0.0625 while if it is not, the probability is (1/4)*(12/51) = 3/51 = 0.0588 (approx).

The probability of drawing the Five of Hearts from a standard deck of 52 cards is 1 in 52, or about 0.01923.

(question not clear) , as far to my understanding it is 4 over 52 simplified , so answer is = 1 over 13. (probability of a king drawn from a pack of cards)

In order to determine the probability of drawing 2 hearts and then a spade, in that order, from a deck of 52 cards, start by considering the first card. The probability of drawing a heart is 1 in 4. Since you have now reduced the number of hearts and the number of cards in the deck by one, the probability of drawing another heart is 4 in 17. Since you have further reduced the number of cards by one, the probability of drawing a spade is 13 in 50. Multiply these probabilities together, (1/4) (4/17) (13/50), and you get about 0.0153, or about 153 in 10000.

There are 13 Hearts (including a King) and 3 extra Kings (a total of 16 cards) in the 52 card pack, so the probability of drawing a Heart or a King is 16/52 = 4/13 = 0.3077 or 30.77%

The probability of drawing a heart from a fair deck is 1 in 4. If the card is replaced then the probability is again 1 in 4. The probability of drawing a card other than a heart is 3 in 4. Once again if the card is replaced then the probability remains 3 in 4

What is the probability of drawing 3 red cards (hearts or diamonds) from a standard 52-card deck? Enter your answer as a number rounded to 2 decimal places.

The probability of getting two hearts in a row: P(Getting a hearts on the first draw)*P(Getting another hearts given the first one was a hearts) The first probability is simple: there are 13 hearts in a deck of 52 cards. The probability is 13/52=1/4. The second probability is trickier: there are now 12 hearts left in a deck of 51 cards! The probability of getting another hearts is therefore 12/51=4/17. Now compute (1/4)*(4/17) and get 1/17, which is the probability of drawing two hearts from a deck of fifty-two playing cards.

It is 1/13.

The probability of drawing two specific cards from a standard deck of 52 cards is (1 in 52) times (1 in 51), or 1 in 2652, or about 0.0003771.

On a random draw of a single card, the probability is 3/4.