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What is the probability of Drawing 4 aces from a deck of cards?
Wiki User
∙ 12y ago
If you don't replace the cards then it's:
(4/52 x 3/51 x 2/50 x 1/49)
Couldn't be bothered working it out
Wiki User
∙ 12y ago
Anonymous
1/52 1/51 1/50 1/49
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What is the probability of drawing an ace in a deck of 52 cards?
there are 4 aces in a deck, and 52 cards, so the probability is 4/52
What is the probability of drawing an ace or a king?
There are 52 cards in a deck there are 4 aces and 4 kings which makes a total of 8 kings and aces. Assuming that the deck is full and shuffled the probability of drawing an aces or a king is 8/52 which simplifies to 2/13
What is the probability of drawing 3 cards that are all aces from a deck of cards?
4/52 X 3/51 x 2/50.
In a standard deck of 52 playing cards what is the probability of drawing an ace on one draw?
The probability of drawing one of the four aces on one draw in a standard deck of 52 cards is 1 in 13 (7.7 percent). This is calculated as such: there are 4 ace cards in a deck, which means the chances are 4/52, which reduces to 1/13.
What is the probability of drawing an ace from a deck of cards?
1 in 13 4 aces 4 divided by 4= 1 52 cards 52 divided by 4=13
What is the probability of drawing an ace in a deck of 52 cards?
there are 4 aces in a deck, and 52 cards, so the probability is 4/52
What is the probability of drawing an ace from a pinochle deck?
A pinochle deck consists of 48 cards. Eight of these cards are aces (2 aces per suit * 4 suits = 8 aces). So, for a random drawing from a complete pinochle deck, the probability of drawing an ace is 8/48 = 1/6.
What is the probability of drawing a ace from a normal deck of cards?
Since there are 4 aces is a normal deck of 52 cards, the probability of drawing an ace is 4 in 52, or 1 in 13.
What is the probability of drawing 2 aces from a deck of cards?
The probability is 4/52*3/51 ~= 0.0045 = 0.45%
The probability that two cards drawn from a deck of cards are both aces?
The probability of drawing two Aces from a standard deck of 52 cards is 4 in 52 times 3 in 51, or 12 in 2652, or 1 in 221, or about 0.00452.
What is the probability of drawing two consecutive aces from a deck of fifty two cards?
If you are drawing only two cards, the probability that they will both be aces is one in 221. ( (52 / 4) * (51 / 3) ) If you are drawing all the cards in the deck, one at a time, the probability that you will draw at least two aces in a row is much better than that, but how much better I leave for someone else to answer.
What is the probability of drawing two aces in a row from a full deck?
The probability of drawing one ace from a deck of 52 cards is 13 to 1 as there are 4 aces in a deck of 52 cards. The probability of then taking another ace is then 17 to 1 as there are now 3 aces in a deck of 51 cards. The total probability for the two events in succession would now be: (13 x 17) to (1 x 1) which is 221 to 1.
What is the probability of drawing an ace or a king?
There are 52 cards in a deck there are 4 aces and 4 kings which makes a total of 8 kings and aces. Assuming that the deck is full and shuffled the probability of drawing an aces or a king is 8/52 which simplifies to 2/13
What is the probaility of drawing a ace from a deck of cards?
Probability is 4 aces/52 total cards = 1/13 = .07692
What Probability of drawing a spade or ace from 52 card deck?
The probability of drawing a spade or an ace from a 52 card deck of standard playing cards is 16 / 52 or approximately 30.8%. There are 13 spades in a standard deck of cards. There are four aces in a standard deck of cards. One of the aces is a spade. So, 13 + 4 - 1 = 16 spades or aces to choose from. Since we have a total of 52 cards, the probability of selecting an ace or a spade is 16 / 52 or approximately 30.8%.
What is the probability of drawing 3 cards that are all aces from a deck of cards?
4/52 X 3/51 x 2/50.
What is the probability of not drawing a card 6 or greater from a standared deck of cards?
The answer depends on whether aces are high or low. With aces low, the probability is 5/13 on a single random draw.
