The probability of doing so, eventually, is 1. In a single random draw it is 1/52.
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
If you randomly pick a card from a standard deck of cards, that probability will be 1/4, since 1/4 of the cards are heart.
The probability is 12/52 or 1/4 since 12 of the 52 cards are hearts.
In a standard deck of 52 cards - the probability of drawing any single card of two suits is 1:2 or 50%.
If the card is drawn randomly, the probability is 1/4.
The probability of drawing a heart in a standard deck of 52 cards is 13 in 52 or 1 in 4.
A card is drawn from a standard deck of playing cards. what is the probability that a spade and a heart is selected?
13/52
The probability of drawing the queen of hearts is 1 in 52, or about 0.01923.
If the pick is completely random, the deck is a standard deck and there are no jokers or any other cards other than the standard 52, the probability is 1/4
If you randomly pick a card from a standard deck of cards, that probability will be 1/4, since 1/4 of the cards are heart.
You need to state a problem. If for example you ask what is the probability of drawing a heart or diamond in a single draw from a standard deck of 52 cards the answer would be .5
The probability is 12/52 or 1/4 since 12 of the 52 cards are hearts.
In a standard deck of 52 cards - the probability of drawing any single card of two suits is 1:2 or 50%.
If the card is drawn randomly, the probability is 1/4.
Well, if you include the jokers, you have 52 cards total. There are four suits, so that's four "5" cards in the deck, which gives you a 4 in 52 (or 2 in 21, simplified) probability. Each suit has 13 cards, so you have a 13 in 52 chance of pulling a card of any particular suit (13 is a prime number, and can't be simplified).
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