Draw from the bottom?
The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.
The probability depends on:whether the cards are drawn randomly,how many cards are drawn, andwhether the cards are replaced before drawing the next card.If only 2 cards are drawn randomly, and without replacement, the probability is 0.00075 approximately.
The answer depends on whether or not the first card is replaced before drawing the second.
2 in 52, or 1 in 26, or about 0.03846.
Clearly, it is necessary to draw at least two cards. How many are drawn? Are the cards drawn at random? Is the first replaced before drawing the second? Please edit the question to include more context or relevant information.
The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.The answer depends on how many cards are drawn and whether or not each is replaced before drawing the next card.
If only two cards are drawn from a standard deck of cards, with the first card replaced before drawing the second, the answer is 0.005917 (approx). If the first card is not replaced, the probability increases to 0.006033.
The answer depends on:whether or not the cards are drawn at random,whether or not the cards are replaced before drawing another,how many cards are drawn.If 45 cards are drawn, without replacement, the event is a certainty.
The answer will depend on:whether the cards are drawn at random andwhether or not the first card is replaced before drawing the second.It also depends on how many times the experiment - of drawing two cards - is repeated. If repeated a sufficient number of times the probability will be so close to 1 as to make no difference from a certainty.
The probability depends on:whether the cards are drawn randomly,how many cards are drawn, andwhether the cards are replaced before drawing the next card.If only 2 cards are drawn randomly, and without replacement, the probability is 0.00075 approximately.
The answer depends on whether or not the first card is replaced before drawing the second.
2 in 52, or 1 in 26, or about 0.03846.
The probability of drawing three black cards from a standard pack depends on:whether the cards are drawn at random,whether or not the drawn cards are replaced before the next card is drawn,whether the probability that is required is that three black cards are drawn after however many draws, or that three black cards are drawn in a sequence at some stage - but not necessarily the first three, or that the first three cards cards that are drawn are black.There is no information on any of these and so it is not possible to be certain about the answer.The probability of drawing three black cards, in three random draws - without replacement - from a standard deck, is 0.1176 approx.
Clearly, it is necessary to draw at least two cards. How many are drawn? Are the cards drawn at random? Is the first replaced before drawing the second? Please edit the question to include more context or relevant information.
The answer depends on: whether the first card is replaced before drawing the second card,whether one or both cards need to be face cards.
Be clear about the purpose of the experiment.
Since drawing was invented before writing, we'll never know.