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This is an easy card trick because it requires no sleight-of-hand to work—just simple math. Even without an understanding of how the math works, you can still perform this "magic" trick to impress all your friends!
Steps
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Hand your friend a stack of twenty-one playing cards. Instruct them to pick one out, without showing or telling you which card they chose, and to place the card back into the stack at random.
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Deal the cards out face-up in three columns , working row-by-row (1st column-2nd column-3rd column, 1-2-3, 1-2-3, etc). You should have three columns of seven cards in front of you. Have your friend tell you which pile contains their card (without telling you which card it is, of course). [1] X Research sourceAdvertisement
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Gather the three columns into one stack of cards again . This time, be sure to put the pile that holds their card in the middle of the three piles. [2] X Research source For example, if the first pile contained their card, then you could pick up the third pile first, then the first pile (containing the card) and then the second pile—or the second pile, then the first, then the third. It is very important that the pile containing their card goes into the middle.
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Repeat the past two steps two more times. When done, you will have dealt the cards out a total of 3 times. If you have done the card trick correctly their card with be the 11th card in the pile of cards. [3] X Research source Do not flip the deck over at the end, or else you won't be correct.
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Deal two piles of cards from a deck of 52 into equal piles of 26 each. This is a complete deck without the jokers. You may want to go through the deck beforehand to make sure it's complete and there aren't any duplicates.
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Give the spectator one of these piles and you keep the other. If they'd like to have more control, let them pick which pile they want.
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Let the spectator know that you are going to make the number of red cards in your pile equal to the number of black cards in his pile. The mathematics behind this is fairly simple, however, most people will not think beyond the trick, or try to figure it out.
- The catch of this trick,is that any deck of cards in which you deal out two piles of 26 cards will ALWAYS have one pile of red cards equal to the black cards in the other pile. For example, if your pile of 26 cards has 10 red cards, then the remaining 16 cards must be black. Therefore, the spectator's pile of 26 cards MUST contain the remainder of 16 red cards (to your 10 red cards) and a remainder of 10 black cards (to your 16 black cards). So, as can be seen, the number of red cards in your pile (10) equals the number of black cards (10) in the spectator's pile.
- And, of course, the reverse is true: The number of black cards (16) in your pile, does equal the number of red cards (16) in the spectator's pile. Pile A always equals pile B in terms of red and black cards.
- The catch of this trick,is that any deck of cards in which you deal out two piles of 26 cards will ALWAYS have one pile of red cards equal to the black cards in the other pile. For example, if your pile of 26 cards has 10 red cards, then the remaining 16 cards must be black. Therefore, the spectator's pile of 26 cards MUST contain the remainder of 16 red cards (to your 10 red cards) and a remainder of 10 black cards (to your 16 black cards). So, as can be seen, the number of red cards in your pile (10) equals the number of black cards (10) in the spectator's pile.
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Make the trick interesting by building it up any way you desire. This presents more of a show and gets the spectator more entertained and intrigued, not knowing how you do it. Make it interesting and fun by being dynamic and exciting yourself.
- You can vary this trick by making three piles, and it will add another dimension to the overall effect by creating a diversion. Then, you might say that the number of red cards in your 2 piles will equal the number of black cards in their single pile.
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Amaze them with your magic trick. Have your spectator flip over their cards and then slowly, dramatically, flip over yours. Wave your hands a little, indicating the magic air you've cast over the deck. How did you do it? You'll never tell.
- And can you do it twice in a row? Why, yes. Yes, you can. Would they like to see?
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Community Q&A
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QuestionWhat is the math to the first card trick?Community AnswerThe first card trick relies on placing their card in the middle repeatedly. As we place their card back in the middle over and over, we get a better movement of the card from anywhere to the absolute center: 11 in this case.
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QuestionWhat is the math behind the second card trick?Community AnswerTo put it simply, the deck has 52 cards (minus jokers). Of those 52, there are 4 suites. Two of them are red, two of them are black. Because each suite has an equal number of cards, and there are only two colors, 26 of the cards must be black, and the other 26 must be red. When the deck is divided randomly in half; you can count how many of either color card you have, and it will correspond to the opposite color card count the other person has. If I have 14 black cards, the other person has 14 red cards, because out of my 26 cards, if 14 are black, that means 12 are red, and 26-12=14 which is the number of black cards I have.
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QuestionCan I do the first trick with more cards? If so, what number of cards?Community AnswerAs stated in the Tips section above, you can use any multiple of 3 cards.
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Tips
- You can vary this trick by using a different size stack, as long as the number of cards is a multiple of 3 (3, 6, 9, 12, 15, 18, 21, 24, 27, 30, etc.).
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Things You'll Need
- A deck of cards
- A table or other flat surface
- A willing friend
References
About This Article
Thanks to all authors for creating a page that has been read 295,676 times.
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