The odds of any card pulled from an ordinary deck of 52 cards being an Ace is 4 in 52 (4 aces in a deck of 52). This can be reduced to a 1 in 13 chance of any random card pulled from the deck being an Ace (or any other specific value, for that matter).
That 13th last card dealt in a hand is no different than picking a random card out of the pack, regardless of what cards you deal before (face down or blindfolded or even face up, it doesn't matter).
A more interesting question would be "what would the probability be of ANY of those 13 cards being an Ace?" Any takers?
1/13
It is approx 4.62*10-7.
If the pack is well shuffled, the probability is 1/52.
The minimum number of cards that must be dealt, from an arbitrarily shuffled deck of 52 cards, to guarantee that three cards are from some same suit is 9.The basis for 9 is that the first four cards could be from four different suits, the next four cards could be from four different suits, and the ninth card is guaranteed to match the suit of two of the previously dealt cards. The minimum number, without the guarantee, is 3, but the probability of that is only 0.052, or about 1 in 20.
The answer depends on how many cards you are dealt!
1/13
6/49
It is approx 4.62*10-7.
If dealt from a randomly shuffled pack it is 0.0399, approx.If dealt from a randomly shuffled pack it is 0.0399, approx.If dealt from a randomly shuffled pack it is 0.0399, approx.If dealt from a randomly shuffled pack it is 0.0399, approx.
i got 1000000000000000000000000k0000000000000000000k000000000000 robux in roblox i am so rich than you l
There are 52 cards of which 26 (a half) are black. So he probability that the first card is black is 26/52= 1/2
The probability of drawing two diamonds from a deck of cards is (13 in 52) times (12 in 51), or 156 in 2,652, or 78 in 1,327.
If the pack is well shuffled, the probability is 1/52.
The minimum number of cards that must be dealt, from an arbitrarily shuffled deck of 52 cards, to guarantee that three cards are from some same suit is 9.The basis for 9 is that the first four cards could be from four different suits, the next four cards could be from four different suits, and the ninth card is guaranteed to match the suit of two of the previously dealt cards. The minimum number, without the guarantee, is 3, but the probability of that is only 0.052, or about 1 in 20.
The answer depends on how many cards are dealt out to you - which depends on how many cards you are dealt.
The answer depends on how many cards you are dealt!
1/2. or 50%. You can draw a red card, or you can draw a black card.However, if you have already drawn 10 black cards and 0 red cards then the probability of drawing a black is:16(remaning black cards)/42(remaning cards)=38%