64/425, or approximately .151
P(exactly 3 hearts)=(13/52)*(12/51)*(11/50)=11/850
P(exactly 2 hearts)=(13/52)*(12/51)*(39/50)+(13/52)*(39/51)*(12/50)+(39/52)*(13/51)*(12/50)=3*(13/52)*(12/51)*(39/50)=117/850
P(at least 2 hearts)=P(exactly 3 hearts)+P(exactly 2 hearts)=11/850+117/850=128/850=64/425, or approximately .151
If only two cards are drawn randomly from a standard deck, the probability is .00037, approx.
The probability of drawing the Five of Hearts from a standard deck of 52 cards is 1 in 52, or about 0.01923.
1/52
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
The probability of drawing a king of hearts from a regular deck of cards is 1 in 52 because there is only one king of hearts in the standard 52 card deck.
If only two cards are drawn randomly from a standard deck, the probability is .00037, approx.
The probability of drawing the Five of Hearts from a standard deck of 52 cards is 1 in 52, or about 0.01923.
1/52
The probability of picking a 23 of hearts in a standard 52 card deck of cards is zero, because there is no 23 of hearts. If you meant to ask about the probability of picking a 2 or a 3 of hearts, then the probability is 2 in 52, or 1 in 26, or about 0.03846.
The answer depends on how many cards are drawn, whether or not at random, from an ordinary deck of cards, with or without replacement. The probability for a single card, drawn at random, from a normal deck of playing cards is 1/52.
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
The probability of drawing a Queen of Hearts from a standard deck is 1 in 52, or about 0.01923. The probability of drawing a blue card from a standard deck is zero, because there are no blue cards. Simply add them together 0.01923 + 0 = 0.01923.
The probability of drawing a king of hearts from a regular deck of cards is 1 in 52 because there is only one king of hearts in the standard 52 card deck.
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 answer depends on how many cards are drawn, whether they are drawn at random and whether they are replaced before drawing the next card. If three cards are drawn, at random and without replacement, the probability that they are hearts is (13/52)*(12/51)*(11*50) = 1716/132600 = 0.0129
In a standard deck of 52 cards, there are 13 clubs and 1 seven of hearts. The probability of drawing a club or the seven of hearts, then, is 14 in 52, or 7 in 26.
It is 0.0039 approx.