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What is the probability of getting 3 red cards?

What is the probability of getting 3 red cards?

what is the probability of getting 3 red cards? If memory serves: Probability of first red card is 26/52 (1/2) for the second (25/52) and the third is (24/52) which is just slightly less than 1/8.

What is the probability of the event that 3 selected cards from 52 cards are of the different Colours?

Since the ball drawn is not replaced, the total number of balls decreases as does the number of balls drawn of that color. RRB = 8/20 * 7/19 * 9/18 = 8*7*9 / 20*19*18 = 504 / 6840 = . 07368 = 7.368 \% probability. Thus the combined probability of all three possibilities is 22.204\% of being chosen.

What is the probability of not drawing a face card from a standard deck of 52 cards?

In a deck, there are 12 face cards (4 kings, 4 queens, and 4 jacks). Thus, there are (52–12) non-face cards. Thus, the probability of getting a non-face card is the number of non-face cards/number of cards in a deck, which is 40/52 or 10/13.

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How many ways are there to pick 3 cards from a standard deck of 52 cards?

1 Expert Answer To answer a), we note that there 52 ways to choose the first card, 51 ways to choose the second card, and 50 ways to choose the third card, for a total of 52*51*50=132,600 ways.

What is the probability of getting 3 from a deck of cards?

A standard deck of playing cards has four suits — each suit has 3 face cards. That means a standard deck already contains twelve face cards, so the probability of getting three is 100\%. If that’s the case, then you calculate 12/52 * 11/51 * 10/50 to get your answer. It depends.

How many cards are randomly drawn from a deck of cards?

Three cards are randomly drawn from a standard deck of 52-playing cards without replacement. What is the probability of drawing three queens? For the first draw, there are 52 cards, so that is your denominator and because you have four queens in the deck, this is your nominator. Therefore, the probability of the first draw is 4 52 = 1 13

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What is the probability of getting a full hand with 52 cards?

So you have 52 choices out of 52 cards (because no matter what card you draw you can get a full hand of the same suite). Your second card, has to be the same suit as your first card, so probability of that is $\\frac{12}{51}$because there are 13 of each suite and you have to subtract 1 for the one card you have drawn.

What is the probability of drawing two face cards in a row?

The probability of drawing a second face card is therefore 11 51. The probability of drawing two face cards in a row is 12 52 ⋅ 11 51 = 12 ⋅ 11 52 ⋅ 51. We’re starting to see a solution, I hope?