I'm going to have nightmares of cartoon James pulling an infinite number of rabbits from a hat.

Matt Parker came with a very similar trick few years ago. The only difference was that his version sometimes works and sometimes doesn't.

Cartoon James looks like he just rearranged something in my house in ascending order and is waiting for me to notice what it was

James: *Goes on Penn and Teller "Fool Us." does trick fools Penn and Teller but immediately explains the math behind it.*

2:59 Did James do something to upset the animator?

I love the framed section of brown paper from the Graham's Number episode!

Whoever drew the cartoons did my boy James dirty, they did him dirty they did

I appreciate the penrose tiled card backing.

James grime still looks better in real life

So the video goes into this at length, but letting the the participant choose 10 cards, show you and then letting them divide into piles of 5 each. You write down your prediction then, turn them over and order them, find and sum the differences. Letting them have complete control over the cards is usually really impressive for a 1 on 1 trick.

2:58 Here’s your free Cartoon-James-pulling-bunnies-out-of-a-hat button

Reminds me of the story that Gauß as a child was ordered by the teacher to summarize all numbers from 1 to 100 to keep him busy. After a minute little Gauß came back with 5050. He arranged the numbers from 1 to 100 like 1+100+2+99+3+98+...49+52+50+51 = 101*50 = 5050.

I think that the beginning and the middle are great, but you could improve the "prediction". For example, you could put the James of hearts in the 25th position in the deck and you leave all red aces until nines beneath it. So when you are subtracting the values of the 5 pairs, you just take cards that are below the James of hearts. He will then be in the 25th position after taking the red cards out and you can say that James of hearts knew it and chose that place. If you really want to improve it you could also learn some false shuffles, so you leave James of hearts in the 25th position from the top and do some false shuffles, so that the spectator thinks its totally random where James is. Don't forget that before showing the 25th card, you should remember the spectator that the deck and the spades were shuffled and that he chose which cards would be his and which cards would be yours. You could also let the spectator choose what suit you will use for the trick, so they believe even more that they chose everything. The only tricky thing would be to arrange the deck not knowing what suit they were going to choose, so you would have to arrange it after they said it. Hope you could understand everything and if you have any questions,feel free to ask

This is the one of the best mathematical card trick I've ever seen.

Great! Used this on my friends, they were mind-blown when they saw my prediction card in his backpack (I put it in there beforehand)!! I put the wrong answer under the "J" card and told him to actually check his bag for my REAL prediction :D sneaky sneaky....

At this very instant, Penn and Teller are shivering in their boots!

This was a question in Indian RMO(Regional math Olympiad)

I love you James! You’re the best

Grimy is the best Numberphile by far.

okay cool, but why did you make animated james nightmare fuel?

James and Magic? I think we all know who to call Brian Brushwood

I propose we make 'A James Heart' the opposite statement to 'the Parker Square'

Ah, cartoon James is even holding his Little Professor.

I knew I had seen that singing banana before

Great video as always. The idea that a lot of magic tricks are dressed up mathematical effects is really intriguing, it would be interesting to see more videos exploring this idea.

Wait, so this just boils down to the associative and communicative properties? If the smalls are always negative (subtracted) and the bigs are always positive, then it doesn't matter what order they're arranged in, of course they'd come out to the same value. The way they're dealt only affects one meaningful thing in the whole problem, and it's the sign applied to each number, but because the way they're dealt and then ordered, you're guaranteeing the big-small pairing and therefore guaranteeing the signs of the numbers. Crazy how simple the math is once you strip it down to the basics. Great presentation here.

I liked this a lot not because of its magic trick feature but because it had an interesting fact about sets of numbers. As James mentioned the effect works no matter what the colection of 2n numbers is - and you can have repeats and non-integers as well. The answer is always the sum of the n big numbers minus the sum of the n small numbers. If there are repeats these two subcollections may overlap but it doesn't matter.

2:30 Is that Graham's Number on the wall?

Amazing! I've seen a very similar concept as a proof for some exponential equations using groups as multiplication

7:23 gotta love the subtle flex of the million sub plaque

It works the same with any even number of card. Difference between them. 2 = 1 4 = 4 6 = 9 8 = 16 10 = 25 12 (J = 11, Q = 12) = 36 14 (K = 13, Joker = 14) = 49

I think the trick will be more amazing if a spectator could pick up random, let's say, 10 cards and after some mental calculation you can make a prediction based on those cards; and then you perform the trick.

Once again: James is magic! Thanks!

Why was 6 afraid to go camping with 7? Because 7 1ted 2 bring 3 knives 4 sur5al, but 6 knew that 7 secretly h8ted him and did not have be9 in10tions

Cool trick! Numberphile always has new things to learn

To make it more impresive you can handle cards to spectator at the begining and tell them to make 5 pairs. Also you don't have to only write your prediction, it can be anything from turned card in deck on 25th position to something like 25 cards left in deck (and others just be gone).

A problem which seems interesting at the start became absolutly trivial after the explanation. wow!

I really enjoyed this video and nice explanation. thank you so much.

If you take all the large numbers in one set and all the small one in another the differences becomes the consecutive odd integers and you get as a corollary the well-known fact that the sum of the first N odd integers is N^2.

that's some nice math, and it satisfies Poincaré's saying : "A true mathematics concept must be elegant"

The main thing you could do to dress it is not TELL them that you're using only the spades, infact I would use as many suits and colour as possible but do a false shuffle, stack the deck so that you get Ace through ten.

The "average difference" is 5. What I mean by that is with 5 cards you always get 5*5 with 5 cards because when your difference is 7 for example there has to be a difference that is 3 so you get two pairs of 5 and so on until you are left with one difference that is 5.

Love the framed Graham's Number in the background

This is how I understand it: By sorting decks in reverse order and by taking the difference of two numbers we undermine their separation in two decks, Those two operations just move all half high card in one deck and all others move to the other deck. The result is going to be sum(sort(arr)[n/2+1:n) - sum(sort(arr)[1:n/2])

“Mom can we have a Numberphile mathematician?” “We already have James Grime at home” James Grime at home: 2:59

Well, I solved this problem quite some days before. It is published in crux mathematicorum from which I think the inspiration is taken from

Seeing Lulu made it completely worth sitting through the ad!

I kept your beginning but added at the end to add 2-5 and made my prediction the seven card (controlled). Fun trick.

You should take a machines learning program and place a tube with a steady single vibration going down it and train the program to separate the output of a fluid going through it into two tubes of separate temperatures by adding structure. Then see how far you can go.

James showed how you can't have two small/large numbers paired up so you're always left with groups of (large)-(small). Using the associative property of addition you can rearrange the numbers to have all the addition of large numbers on one side and all the subtracted small numbers on the other side (treat subtraction as addition of negative numbers so the property holds). You'll end up with 10+9+8+7+6-5-4-3-2-1 =(10+9+8+7+6)-(5+4+3+2+1) =40-15 =25

Found a different, more graphical, but more complex way to prove it: Imagine the cards laying on the table in order. Then you mark half of them blue and the other half red(for the two sides). You know that the cards will each find a partner of the other colour and you know that they are going to start matching from the longest distance to the shortest(if you do the counting in the same order as they did in the video). We will count the connections between the cards for the result. So lets start with an example: no matter what colour the Ace has, it´s connection will always go over the middle, because the other 4 spots between the ace and the middle are not enough for the 5 cards of the opposite colour to fill and the ace will connect to the highest of them. So at least one connection going between 5-6 from the ace. The same will happen with the 2: 3 spots left and 4 cards of the opposite colours to fill. So another guaranteed crossing over the middle(between 5 and 6) this works until we reach 5. So we know that 5 connection go over the middle point, resulting in a value of 5. The same game will work for the connection between 4 and 5, except for the last connection(with the 5 involved) resulting in 4 connections between 4 and 5. this goes down until we reach 1 - 2 so it´s 5 + 4 + 3 + 2 + 1 for one half. because the situation is symmetrical the total has the be 1+2+3+4+5+4+3+2+1 = 25 If we spin this further with other numbers than 5, we can explain why raising x in x^2 will raise the result of mentioned formula by 2x + 1

I was watching a Numberphile card trick video from 2012 while this was uploaded/publicized. Eerie

I love how they've got the peper from graham's number episode signed and framed on wall

If the numbers don't have to be consecutive, you can have the audience member grab any even number of cards from a single suit. You'd have to devise some way of knowing which cards were selected (marking them? sneaking a peek at the remaining cards?), and memorize some mnemonic to help you calculate the prediction quickly, then write down the prediction after the cards are selected and cover it somehow. This may be too much sleight-of-hand for a math-based trick, but on the other hand, you'd be able to perform the same trick multiple times in a row with different predictions each time, to mislead the audience into thinking it's not fixed.

Since the value is always fixed no matter the cards, how about a variation where you calculate the value as you and the volunteer pick cards at random?

The effect can be increased using two volunteers I think. Either they choose alternating a card or bring more fake randomness by letting them play rock paper scissors each time.

I would love a follow up video on how to build the formula for the general case - i.e. when you pick any number of cards and/or any values of cards

Love me some Penrose card backs

I came after 3 years to watch this . Thanks to Eddie Woo . This Channel is great ✨

Love it ❤️ love your channel too 👍keep em coming 👍

You can use the second characteristic of the Staistical Mean to explain this. The sum of n number is equal to the mean of the n number multiplied for n

Should be easy to calculate the number for N cards. Since we know the end total is the same for all different ways the cards come out we can solve for the easiest set. Assuming one person gets all the small numbers and the other person gets all the big cards then the smallest small card will be matched with the smallest big card. The difference between them is N/2 (i.e. the smallest small card will be 1 and the smallest big card will be (N/2)+1). The next pair will be the same since on both sides the values increase by 1. So the end result will be N^2/4 (N/2 multiplied by the number of pairs which is also N/2, so N^2/4).

3:38 why is it 126 ways or arranging the cards? shouldn't it 10C5 = 252 ways? Edit: I think I get it. Is it cos when u choose 1 combination, ur actually choosing 2 combinations and aligning these. So the cards in a sense have rotational symmetry

2:59 this will be in my dreams one day and im looking forward of waiting for it.

You've intrigued me now. Perhaps I can come up with an effect that uses this? Perhaps controlling a selected card to the 25th position of a deck, and using that sum to find it?

I recognized this right away since I do loads of kakuru. 30 in 4 places is always 6,7,8,9.15 in 5 places is always 1,2,3,4,5. The only factor you added was a 10. So 40-15=25.

Clever, and very well explained.

3:33 Are there really 126 ways to arrange the cards? I can't arrive at this result, although I do notice that 126 = (10 choose 5)/2. If we start with cards distributed to each player, each player can order them in (5!) = 120 different ways, giving (120)^2 = 14,400 ways to arrange the cards.

Boy at school: Where do I need math? Teacher: To do magic tricks.

0:14 it is Alfred E. Neuman

This is in the same family of tricks as one based on the following : Think of any 2 digit number. Sum the digits and subtract from the original number. The result is always the first digit times 9. Eg, 64, sum of the digits is 10, subtract from 64 gives 54 equals 6 x 9. There was a magician's web page which did a mind reading trick on the viewer, based on this fact.

Amazing-- thanks for sharing!

James Grime is a treasure

Here’s a version I just thought of : You ask the person the choose a set, and from this set to pick a card that you’ll remove. You are then left with 12 cards, and ask the person to shuffle them while you make a prediction. You then go on with the trick as shown in the video, you just deal six cards to each instead of five, rearrange them and add the differences, and surprise : this was your prediction. Now how to calculate the prediction regarding the card they chose to remove : It is really easy, if the value of the card is smaller or equal to 7, the prediction should be 35 + the value of said card, and if the value is higher or equal to 7, then the prediction should be 49 - the value of the card.

You know how you can do completing the square for quadratics...can you find a way to complete the cube for a cubic?

Perhaps incorporate a "Magic Square" with the resulting combinations, lines diagonals and sets, adding up to *25*

I kind of picked up on this from discrete mathematics. Your card set has no duplicates so you can rely on the properties of a set.

At 1:58 that 4 of diamonds has a mistake on it.

The very first time I tried this, my pairs were...10-1=9; 8-2=6; 6-5=A; 7-4=3; 9-3=6: I only have one 6 card. Do I use the 4 &2??? (They still add up to 25.)

I'm proud because even if I'm not able to explain it mathematicaly, I found out the answer at the begining of the video.

Numberphile knows how to make mathematician look cool

It's easier to understand as a difference of magnitude So if we take big cards as >5 we have 6,7,8,9,10 And small cards would be 1,2,3,4,5 As red cards are difference in magnitude,so we can consider it's big card's minus the small card's number So big cards are always positive and small are always negative Hence 10+9+8+7+6-5-4-3-2-1=25

Gm sir... Even know the answer... Always eager that what and how will you explain... You always explain v very nicely... Thank you..

This is really incredible. How did James find that out?

i'd love to be able to buy a replica of that deck

he also counted the ace as low or 1 as opposed to high or 10

You could have a card selected. Look through the deck to find all of a suit (not the same suit as the selected card) taking them out of the deck. As you look, you count down to the 24th card and catch a break. Continue removing the cards until you get all ten cards. Keep the break as you hold the deck in one hand. Cut the deck at the break and have your spectator place the card in the 25th place. Do a few false cuts/shuffles. Place the deck aside and do your mathematical bit like in this video. Then, miraculously, find the card in the position indicated by the sum you found!

Feel like there needed to be just a little more emphasis on the "I don't know what the value will be" - important distinction from the consecutive set, the answer is not simply N^2 at that point, and you'll have to do the maths properly to determine your value.

for this to be used in a magic trick i feel that there are too many fixed things to have to work through, but with at least a force it can be made work a bit better

James is a decent-looking guy but cartoon James is an ogre

Three minutes in, I'm not working out the details in my head, but it is clear that it does not matter how the cards are shuffled or how they are distributed on the table, because the differences of the cards individually are unaffected by their position on the table, and presumably all of the differences that result (the middle cards) will result in 25. since there are 5 cards from 1 to 10. But instead of adding pairs of numbers in that way that yields the n(n+1)/2 formula, we have the difference of pairs. Clearly, that must always be 25 (using 10 cards).

Please explain 'negative times of negative is positive ' without using distributive law

I thought I got a heart ❤️ from numberphile but then I realized the video title had a heart in it.

This is a scaled down version of what Gauß did in School. He was told to add every number from 1 to 100.

Assuming each integer is unique, so there won’t ever be 0’s

Just learned from the Numberphile podcast that James isn't going to read this comment, but I do really look forward to his Numberphile videos!

Really cool card trick!

Beautiful

I figured out another proof, if you take two cards that are consecutive and on oppisite sides, f.ex. 6 and 7 in the first example and swap them over both sets of cards are still correctly ordered and the sum of the differences is unchanged. You can swap the cards until you have only consecutive numbers on each side, meaning one side has 1,2,3,4,5 and the other 6,7,8,9,10 and thus sum of the differences is always the same. This proof also works for any ordered set of even length, swaping elements which are adjacent according to the order-relation.

☼ Get 25 scantily clad models, and a saw that is intent on cutting them in half, if the audience member chooses wrong. That's as far as I have got, what do you think so far?