The odds of being dealt exactly a full house are 694 to 1 against, which equates to a probability of 0.00144. The probability of all 5 card hands can be found, along with explanations of how to derive the probabilities, can be found at http://www.microcentrics.com/fivecard.aspx.
The answer depends on how many cards are dealt out to you - which depends on how many cards you are dealt.
2,598,960.
In a standard deck of 52 playing cards, there are 13 clubs. The probability of being dealt a club is calculated by dividing the number of clubs by the total number of cards. Thus, the probability is 13/52, which simplifies to 1/4 or 25%.
It is 0.0039 approx.
The probability that the first four cards are face cards is (16/52)*(15/51)*(14/50)*(13/49) = 43680/6497400 = approx 0.0067
The probability of being dealt a blackjack hand with an ace and a nine in a standard deck of cards is 4.83.
The probability of being dealt a straight with the cards ace, two, three, four, and five in a standard 52-card deck is 0.0000154, or approximately 0.00154.
The answer depends on how many cards are dealt out to you - which depends on how many cards you are dealt.
2,598,960.
There are 13 clubs in a standard deck of 52 cards. The probability, then, of drawing club is 13 in 52, or 1 in 4, or 0.25.
In a standard deck of 52 playing cards, there are 13 clubs. The probability of being dealt a club is calculated by dividing the number of clubs by the total number of cards. Thus, the probability is 13/52, which simplifies to 1/4 or 25%.
Bridge uses a standard deck of 52 cards -- four suits (clubs, diamonds, hearts, spades) of 13 cards each. The four players are each dealt 13 cards.
The answer depends on how many cards you are dealt!
The probability, if the cards are dealt often enough, is 1.On a single deal, the prob is 3.69379*10^-6
It is 0.0039 approx.
The probability that the first four cards are face cards is (16/52)*(15/51)*(14/50)*(13/49) = 43680/6497400 = approx 0.0067
The odds of being dealt a pair in a standard 52-card deck are approximately 1 in 17.