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MATT: OK, so I'm going to do a card trick based
on the number 27.
And this is my all-time favorite maths card trick.
And I'm going to show it for you today, and I'm going to
explain it.
I found this trick in an old 1950's math book written by
Martin Gardner.
And for me it is the maths card trick with the most
beautiful maths behind it out of all of them.
And because it is a math card trick, it does involve a lot
of long tedious counting.
But bear with us here.
So this involves 27 cards, so I'm going to take 27 off.
And this is a genuine count.
One, two, three, four, five, six, seven, eight, nine, 10.
27 is actually one of my favorite numbers--
One, two, three, four, five, six, seven, eight, nine, 10--
because it's a cubed number.
One, two, three, four, five, six, seven.
OK, that's 27 cards.
And this works with any 27 cards, and none of this trick
is slight-of-hand.
None of it is YouTube magic where I'm using something
sneaky, or a sneaky edit.
And I'll explain the trick afterwards, so it's OK.
But this is how works--
You get 27 cards, you shuffle them up.
I'm actually going to get Brady to both
film and be the volunteer.
So I'll flick through, do you want to tap which one you
want, which one of these?
OK that one there.
Do you want to show you the camera that card?
Don't let me see it, obviously.
And do you want to put it back in wherever you want?
Thank you.
Now all he needs to do is just remember what that card was,
and believe me, people in the comments will mention
afterwards if you don't.
Brady what's your favorite number from 1 to 27, if you
had to pick a number?
BRADY: 10.
MATT: 10, any particular reason why 10?
BRADY: I just like how it looks.
MATT: You like it?
OK.
Are you looking for your card by the way?
What I want you to do is have a look, and see if you can
spot which pile your card goes into.
And people may have seen this trick done before.
It's a variation, in fact, it's a generalization on a 21
card trick.
Which pile is it in?
BRADY: It's in that pile.
MATT: In the middle pile there?
OK, I'm going to pick them up from the
viewer's right to left.
And what people tend to do is they do this tedious counting
out each time.
And what I'm actually doing is last time I
memorized all the cards.
And so I when you told me which pile, I had narrowed it
down to nine possible cards it could be.
If I do it again, because of the way I'm dealing it out, if
you tell me which pile it's in this time, I will narrow it
down to one of three possible cards.
Which pile is it in this time?
BRADY: This time it is in the middle pile.
MATT: The middle one again, there we are.
OK purely coincidence, I'll pick them up again.
And then we'll do it one last time again dividing by 3, and
this is why 27 is 3 cubed.
If you say which one it's in I will know, having memorized
all the cards, exactly one in one, or I will know precisely
which card it is.
And that's just the pure information of this trick.
Which one's it in?
BRADY: That one.
MATT: That one over there.
Cool, OK.
So now to be fair all of that wasn't true.
Well the numbers were true, and the number of cards it
could've been going from 27 to nine, to three, to one, that
is completely accurate.
I wasn't bothering to memorize them though, I was doing
something else slightly different.
What was your card?
You can tell me now.
BRADY: It was the king of hearts.
MATT: King of hearts, and what was your favorite number?
BRADY: 10.
MATT: OK.
Watch this.
Here we go.
Ready?
One, two, three, four, five, six, seven, eight, nine, 10.
King of hearts.
So this trick, you can put the card-- even though you don't
know what it is-- as long as they tell you which pile it's
in, you can put it anywhere in that deck.
So if you say any number, after three lots of dealing it
out, I can put the card into that position.
And that is my all-time favorite
maths based card trick.
Do you want to know how it works?
BRADY: Yes please.
MATT: This is brilliant.
OK, so can I have some of your famous brown paper?
OK, excellent.
Now let's look at why this trick works.
Now you're going to have to bear with me here.
I'm going to set up a slightly unusual way
to look at the cards.
Because when you get the 27 cards, the very last step-- if
we go from the end of the trick--
I pick them up into three piles of nine cards.
From now on I'm going to call the top one the 0th pile, and
then the first pile, and the second pile.
And there's a reason for that in a moment, but just bear
with me while I set up some notation.
So when the cards go back together there are nine cards
in the top pile one, two, three, four, five, six, seven,
eight, nine.
So that was why I called the 0th pile on top.
Then there was one, two, three, four, five, six, seven,
eight, nine in the first pile.
And the bottom one-- one, two, three, four, five, six, seven,
eight, nine, that was the second pile.
And as it turns out your one was the king of hearts.
That ended up being the 10th card down.
Because you said at the very beginning your favorite number
is 10, and your king of hearts ended up there.
And so now when you think about it these top three from
the final pile-- because this is the very last top, middle,
and bottom pile--
that top one came from the previous top pile.
That was the previous 0th pile, that was the previous
middle pile, that was the previous bottom pile.
That was the previous top, middle, bottom.
Top, middle, bottom.
And so actually if you watch it you can
see how that happens.
Because I've picked them up from the second time.
I've got the top, the middle, and the bottom packets.
Each are nine cards, I've put them together.
I deal out the next three piles, and the first three
come from that top pack of nine.
And then the next three come from that top pack of nine,
and then the next three from the same top pack of nine.
So that's why over here the top three come from the
previous top 0th pile.
The next three of each one come from the middle pile.
So that's the first three off the middle, next three off the
middle, next three off the middle.
And I've got nine left, that was the previous bottom pile.
That's why now I get three from the bottom, three from
the bottom, three from the bottom.
So they end up going down like that.
And if you get some cards and you start playing around with
this, within the final ordering it turns out from the
very, very first time you put them together this is the top,
the middle, the bottom.
The top, the middle, the bottom.
The top, the middle, the bottom.
And don't lose too much sleep over exactly why this happens.
If you get a pack of cards and deal it, you'll
start to see why.
And what you end up here is this is the ordering from the
first time we dealt the cards out.
That's the ordering from the second time we dealt the cards
out, and that's the ordering from the third time we dealt
the cards out.
And to get it here at 10th, I can see that to get this
position here it's the 0th 0 first.
Or top, top, middle.
And so each time Brady pointed to where his card was the
first time I put that pile back on top, the second time I
put that pile back on top, The third time I put that pile in
the middle.
The first time I put that pile back on top.
The second time I put that pile back on top.
The third time I put that pile in the middle.
In fact, Brady, do you want to pick a different number?
BRADY: So say I told you my favorite number was 13, what
would you have done?
MATT: OK so 13, I need to put 12 cards on top of that, and
12 is one 9, one 3, and no units.
So I'm going to put that on the top,
the middle, the middle.
13 is, nine, 10, 11, 12, 13.
Yeah see?
0, top, middle, middle.
But the way I work it out is I'm actually
working it out in base-3.
Because this whole trick uses base-3 ternary numbers, which
I think are absolutely amazing.
And the first time you put the piles back together you're
doing the units column of your base-3 number.
The next time you put them back together you doing 3's
column, and then the last time you're doing the 9's column.
And so when you give me your number I work out that number
in base-3, and then that tells me how to put
the piles back together.
OK so now we're going to redo the very first trick I did in
almost slow motion, in annotated mode if you will.
And so you had a look at one card, and then I started
dealing these.
And then I talked to you about your favorite number,
and you said 10.
You're looking for the king of hearts, and I'm thinking how
am I going to get that king of hearts?
Well I don't know what card it is.
How'm I going to get whatever the card
is to the 10th position?
And 10, nine goes into that once.
And so I want to get nine cards on top.
So I actually have to put it in the top, the top, and then
the middle.
So has the king of hearts gone past?
Where was it?
BRADY: It was there.
MATT: OK so I now know it has to go top, top, middle.
So when I pick them up from left to right-- these two I
don't care about-- that can be bottom, that can be middle.
The king of hearts is in this one, so it has to go on top.
Which means it's going to be one of the first nine
to get dealt out.
And so it's going to be either the top card of the next
piles, or the second card of the next piles, which it
happens to be, or the third card.
And then the rest we actually don't care about.
Because those other two piles I know it wasn't in those.
These are just padding to get it into the correct position.
So now which one was it in?
The middle one?
OK so again it's top, top, middle.
So it has to go top again.
And if you watch, when I pick them up I still pick them up
in the same order.
But I put them together in a different order.
So that goes on top, and then I'll get this last one, and
I'll just shove it underneath.
So now I know it's on top.
In fact I know it's in the top three of the top pile.
So when I go down this time it has to be the top
card, there it is.
And then the rest go on top, and then the last time it has
to go in the middle.
And so you can see what's going to happen now.
Because if it goes in the middle it's going to get nine
cards put on top of it.
It's going to be the top card in the middle pile, it's going
to be the 10th card.
So it was in this one?
Well how about that?
Pick that one up first, pick that one up and put it
underneath.
So it was the middle one, put that one underneath like that,
and so now it has to be the 10th card.
One, two, three, four, five, six, seven, eight, nine, boom.
So in fact one way you can think about it is I like
drawing a time versus card height diagram.
So the first time you do it-- this is the first
time you deal out--
you've got the bottom pack, you've got the middle pack,
and you've got the top pack when you
put them back together.
And the reason I use 0, one, and two is actual units column
in ternary.
The second time you've got the bottom pack, you've got the
middle pack, you've got the top pack, and again that's 0,
one, and two.
And that's the second time you deal.
And then the third time you deal, again you've got the
bottom, the middle pack, and the top, and
that's 0, one, and two.
So there are the three packs when you
put them back together.
And in fact this is your units column, or
that your 1's column.
That there's your 3's column, and that
there's your 9's column.
So if you want to put 15 on top, to get 15 you're going to
need two 3's, one 9, and no units.
So it's going to go top, bottom, middle.
To put 15 cards on top.
And it'll end up being the 16th card.
BRADY: If someone at home wants to do this trick do they
have to be pretty good at maths?
MATT: You have two options.
You can either be pretty good at maths, or you can spend a
lot of your free time practicing until your brain
gets used to doing this.
Which to be fair, are both exactly the same thing.
Maths is all about practicing something, and developing a
new way of thinking for your brain to get used to it.
So either option, learn maths, of learn card tricks.
You're ending up with the same skill set to be honest.
BRADY: You said at the start this was your favorite trick
to some extent.
MATT: It is.
BRADY: There are lots of tricks.
What is it about that one that resonates with you?
MATT: People know the 21 card trick, where you put it back
in the middle each time, and then it ends up being the
middle card.
And so people kind of know that, but they
don't know why it works.
Whereas this one you know why it works, and then you can do
so much more with it.
And there's a huge difference in math-- indeed in anything--
between just memorizing the steps so you know how to do
it, versus knowing why those steps get you
where you want to be.
And so this utilizes the advantage of knowing why the
steps are doing something, and then you can
tweak it as you go.
So instead of always putting it in the middle you can put
it anywhere you want, because you understand how it works.
Because you're putting three piles back together three
times there are 27 possible arrangements of putting it
back across the trick, which correspond to
all 27 possible positions.
In fact you can do this trick with a lot more cards if you
really want to.
It's the number of piles to the power of how many times
you deal the cards out.
If you get 10 billion cards, which is a lot of cards, and
you deal them out into 10 piles 10 times, you can put
any of those 10 billion cards into any position
just through 10 deals.
Although admittedly you are dealing a million cards into
each pile, so it does take a very long time.
In fact in Martin Gardner's book Magic, Maths, and Mystery
he describes that if you want to do the 10 billion card
version his recommendation is to be very, very careful as
you're doing the 10 piles of 10 each time.
Because if you make a mistake very few audiences will sit
through that trick for a second time.