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  • Well, I wanted to show you an interesting sequence of numbers.

  • [Go on] So here we go I'm going to start here

  • Well, you might notice that I'm missing out a couple here and there

  • ...29...30...33...34... and so on

  • Most of them are here but if you look carefully you'll see that here we are missing four and five...

  • and down here we should be missing thirteen and fourteen; 23 and 22; 31 and 32.

  • Well, there's a supposition, or a conjecture, that all of these numbers can be written as a sum of three cubes of integers.

  • Most probably best done by example

  • If I take this number here for example, 29, it means that I can write this as a sum of three cubes of integers

  • And in this case it can be written as three cubed plus one cubed, so three cubed is 27, plus one cubed is 28, plus one cubed is 29.

  • So it's thought that all of the other integers have a similar representation

  • And I should point out you are allowed to represent your number by negative numbers as well

  • So you're allowed to take sums of three cubes in which one of the.. or more of the integers is a negative number

  • What's quite striking is that for some of the numbers, even on this very list,

  • it's actually surprisingly difficult to write down the solution to the problem

  • To illustrate what I mean we just have to go a little bit along the line here to number 30, and I'm going to need a little bit more space,

  • but maybe you would care to hazard a guess as to what the solution to this problem is...?

  • [Is it an easy one? is it a hard one? ...] -laughing

  • It's a hard one. I should say that this was only discovered in 1999

  • It was discovered by computer, it's actually quite surprising I think.

  • So, are you ready? [I'm ready] OK, let's go

  • I have had to write this down, but let's go

  • Two... two, two, zero... four, two, two, nine, three, two... all cubed,

  • plus minus two, one, two, eight.... [That was a negative number] This is the negative number

  • And there's one more negative number here: minus two eight three comma, zero five nine comma, nine five six. All cubed

  • [That's amazing!] Yes it's quite striking I think

  • [29 was so simple, and 30 was so difficult]

  • That's right. So, as you carry on up the list you'll find this phenomena continuing

  • So, some occasions where you'll be able to find very small solutions,

  • and then just next door to it there'll be a number cropping up which seems to have enormously large solutions

  • [Are there many other unsolved ones or...?]

  • Sadly, yes. I'm going to come back to these ones, but the next eligible one is this number 33

  • And, in fact, we still don't know an answer to that one.

  • So we've not yet been able to find any integers which when you sum their cubes you can get 33.

  • Search has been pretty thorough, so far they've gone up to...

  • I think they've gone up to the numbers of size ten to the fourteen; so it's one with fourteen zeros after it

  • Within that range, there are no solutions.

  • [The question people are going to have then is... I mean, maybe this number doesn't belong on the list! Why is the number on the list if we haven't got a solution?]

  • That's a very good question, and there have been some attempts to prove that this number isn't on the list...

  • but, those attempts have failed. Therefore it is, and it's perfectly allowable that the first solution might just be ginormous.

  • [But there are numbers that are off the list]

  • There are numbers that are off the list. Let me tell you about the numbers off the list

  • So I'll just write them down again: so we had four, five, thirteen, fourteen, 22, 23, 31, 32.

  • So you might wonder what those numbers have in common

  • [What have they done wrong?] -laughing

  • Well, ah, their great crime is that they can all be written as nine times an integer, so nine times an integer, K, plus four, or nine times an integer K plus five

  • So for example four is clearly nine times zero, plus four

  • And for example, 31 here is nine times three, which is 27, plus four

  • So they all meet this criteria

  • And indeed, if you write down any number which is of this shape, nine times K plus four, or nine times K plus five

  • It will never be written as the sum of three cubes. And that's something we can actually prove.

  • I mean, what's going on here, we're looking at equations of this shape, for example A cubed, plus B cubed, plus C cubed equal to, say for example, 33

  • So this is an example of what's called a Diophantine equation - and this is a very central topic in number theory

  • It's been studied, I would say, for lots of years, so they're named after someone called Diophantus, who lived in about 250AD, a Greek

  • But thinking about problems like this goes back even further, some 4000 years, to the Babylonians

  • But the question is, if you have a polynomial equation like this, can you first of all decide whether it has solutions in integers - that's what we're trying to do in this special case

  • If it does have solutions you could even ask how many are there - are there infinitely many, or just, oh you know, just a handful?

  • And if there are infinitely many, can you describe their frequency in some sense?

  • And this is the sort of area of research that I'm actively engaged with.

  • So we do not have a proof that this has solutions, in integers.

  • It is conjectured that this has solutions in integers

  • All that we can hope to do, at the moment, is just use a computer and try and find them

  • [This is not something that can ever be proven by brute force, 'cause there's always another number isn't there?]

  • Absolutely, yes. Absolutely

  • So I just wanted to go back to the first number on the list that we had up here, actually, number one.

  • You know, we're not going to have to spend too much time scratching our heads to come up with a solution to this one.

  • Right? We could take... you want to have a guess? - laughs [Yep, one cubed, zero cubed, zero cubed]

  • OK so that was easy. So there's at least one solution, and you might ask, you know, are there others?

  • I'm going to write another solution: you can write one as ten cubed, plus nine cubed, minus twelve cubed.

  • So people that have seen your taxi cab video might get a bit excited about that particular one but... let's not go into that here...

  • [Alright, so you've got... so there are two ways to do this!] Two ways to do this! And in fact there are infinitely many ways to do this in this particular case.

  • And it's not hard to write down what's called a parametric solution.

  • So I'm writing one as one plus nine M cubed, all cubed,

  • plus nine M to the four, all cubed,

  • plus minus nine M to the four minus three M, all cubed

  • and the point of this is that this is valid for any M.

  • Yeah, so in the first case if I put in M equal to zero, I get one, zero, zero

  • If I put M equal to one, I get ten, nine, and minus twelve.

  • But you could put anything in, and you'd just get tonnes and tonnes of solutions.

  • So yeah, in the list that I started with one is a bit special, in that, in fact, it's...

  • there's this parametric family of solutions, and there are infinitely many different ways of writing one as a sum of three cubes.

  • There are relatively few examples where we actually have these parametric solutions

  • And if we go back to one of the examples we saw before, so for example, this number 30

  • It's suspected that there are not parametric solutions

  • - although in fact it is suspected that there are in fact infinitely many solutions,

  • but... they just get big very very quickly

  • And so as you measure their density there are very few solutions overall.

  • The whole point about a parametric solution is that there is a formula for the solutions.

  • You can just plug in numbers and it'll give you some answers

  • That's not the case for these other examples...

  • or, it's suspected to not be the case for these other examples - you have to work quite hard to find them.

Well, I wanted to show you an interesting sequence of numbers.

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A2 初級

33的無解問題 - 數字愛好者(Numberphile) (The Uncracked Problem with 33 - Numberphile)

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    林宜悉 發佈於 2021 年 01 月 14 日
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