There's only one Ace of spades in a 52 card deck so it's 1/52 times the probability of drawing a heart (there are 13 hearts in the same deck, but now there are 51 cards because we already drew one out). That makes it 1/52 * 13/51 = 13/2652 = 1/204 This is if you want the Ace first, then the heart, if order doesn't matter, you add this to the probability of drawing the heart first, then the Ace of Spades which is (13/52*1/51) =1/204 notice is the same as the first one. So if order doesn't matter, the probability is 1/204 + 1/204 = 2/204 = 1/102 Bring Science Home A counting challenge from Science Buddies Key concepts Mathematics Probability Chance Strategy Cards Introduction Have you ever been playing cards and wished you could use psychic powers to draw the card you wanted? You may not be psychic, but you can still have the power of probability on your side. In this activity you'll investigate the probabilities of drawing specific types of cards from a deck. You'll discover how math can help you avoid the dreaded phrase, "Go fish!"Background When you draw a card from a deck, you have a certain chance of getting a specific type of card, such as a spade or face card, or one particular card, such as the queen of hearts. Consider the game "Go Fish" with a regular card deck. The goal is to get the most four-of-a-kind sets by asking your opponent for matching cards or by drawing them from the deck. To win, you can rely on chance or you can increase your probability of getting matching cards, but how? By understanding how chance is related to math, you can play with a winning strategy. For example, if you have three kings and one queen in your hand and it's your turn to ask for a card, which one should you ask your opponent for? You might think you should ask for a king, but it's actually better to take a queen! Why? Because you have a better chance of getting it. There are four kings and four queens in the deck, and with three kings and one queen in your hand, there's one king and three queens left. This gives you only one chance to get a king, but three chances to get a queen out of the remaining cards.Materials • Standard deck of playing cards • Piece of paper • Pencil or pen • CalculatorPreparation • Count the cards in the deck and make sure it is complete. (There should be 54 cards total.) Take out the two jokers. Shuffle the deck three times and set aside. • Pick four types of cards to investigate, such as a color, suit, number or face card, and a specific one. For example, you could investigate red cards, spades, kings and the queen of hearts. • Draw a table to in which to record your data. Make a column for each card type you'll investigate. In the first row write how many of that type of card are in the deck. For example, there are 26 red cards in a deck, 13 spades, four kings and one queen of hearts. Make 10 rows below this one for the 10 trials you will be doing.Procedure • Decide which type of card you will investigate first. Draw cards from the top of the deck and flip them over one at a time, counting as you go, and stop when you see that type of card. How many cards did you draw until you reached that card? Write down the answer in your table. • Shuffle the deck again and repeat this process, flipping over the cards and looking for the same type of card. How many cards did it take this time? Write down the answer in your table. Repeat this for a total of 10 times for one type of card. • Repeat this process for each of the four types of cards you picked to investigate. This means that you will have looked for each type of card a total of 10 times. • Calculate the average number of cards you drew to reach each type of card. Label the last row in your table "Averages" and write them in this row. • Which types of cards were the easiest to draw? Which were the most difficult? How do you think the chances of drawing a card relate to the total number of that card type in the deck? • Based on what you saw in this activity, how do you think probability can help you choose the right strategy in a card game? • Extra: A more advanced way of showing the results of your experiment would be to make histograms, which are a type of graph to show distributions. Try making a separate histogram for each type of card you tested by graphing the number of cards drawn for each trial separately in a bar graph. When all of the bars are lined up next to each other, what does the overall shape of the distribution look like? • Extra: The probability of drawing a particular type of card also depends on the number of cards drawn each time. Try doing this activity again but draw samples of three, five or seven cards at a time. Do your chances improve as more cards are taken? • Extra: Probabilities can change your strategies for playing a card game. Can you design an experiment to show how probabilities can help you choose cards and win "Go Fish"? What about other popular card games? Can you invent your own game based on probabilities? Observations and results More to explore Unraveling Probability Paradoxes from Scientific American Calculating the Probability of Simple Events from neoK12 4 Great Math Games from Scholastic, Inc. Classified Index of Card Games from John McLeod Pick a Card, Any Card from Science Buddies This activity brought to you in partnership with Science Buddies Discover world-changing science. Explore our digital archive back to 1845, including articles by more than 150 Nobel Prize winners. Subscribe Now!
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What is the probability of drawing a heart and then a spade in 2 successive draws from a standard deck of cards? Do we consider these as independent events thus yielding: $$\Pr(\text{Spade and Heart})=\Pr(\text{Spade})\times\Pr(\text{Heart})\rightarrow\frac{13}{52}\times\frac{13}{52}$$ or conditional so that: $$\Pr(\text{Spade then Heart})=\Pr(\text{Spade})\times\Pr(\text{Heart})\rightarrow\frac{13}{52}\times\frac{13}{51}$$ $\endgroup$ 2 |