I once sat a physics exam that had a question that relied on this result, and it prefixed the claim with "as all physicists know, and many mathematicians believe, the most efficient way to pack spheres is..."

I love James Grime, he's one of my fav people in numberphile videos. You have to admit, though, that "Doctor Grime" would be an excellent name for a Captain Planet villain.

"He invented the potato and other lies." True story.

Ah yes the grand mathematical properties of a ball pit

Can you talk more about the formal mathematical language used for a computer to check a proof conclusively? A nice number/computerphile crossover

I love how number 6 of Hilbert's problems just says "physics" 7:12

The computer screen displays a few lines from the first paragraph of the Wikipedia article "Sphere packing" in a hexadecimal representation. "In geometry, a sphere packing is an arrangement of non-overlapping spheres within a containing space. The spheres considered are usually all of identical size, and the space is usually three-dimensional Euclidean space. However, sphere packing problems can be generalised to consider unequal spheres, n-dimensional Euclidean space (where the problem becomes circle packing in two dimensions, or hypersphere packing in higher dimensions) or to non-Euclidean spaces such as hyperbolic space. A typical sphere packing problem is to find an arrangement in which the spheres fill as large a proportion of the space as possible. The proportion of space filled by the spheres is calle"

Farmers have been using this packing for as long as agriculture yields spherical edibles, but now it's actually proved in mathematics.

The "bit of Pythagoras": Let's call the radius of a sphere 1. (Call it R if you are unhappy with this; it works out the same.) First application of Pythagoras: the distance from the top center of the half-sphere to the corner of the box is 2 (it's two radii). The distance from the corner of the box to the midpoint of the edge is 1. So the distance from the edge midpoint to the top of the half-sphere is root 3. Second application: The distance from the edge midpoint to the center of the bottom of the box is just 1. The previously result gave us the hypotenuse of this new triangle, so the height is root 2.

I love how easy you explain everything..always learning something new! Thank you!

The moment when numberphile comes in clutch for the chemistry test

Best trilogy of all time: -Halo- -Star Wars- -Hitchhiker's Guide to the Galaxy- Dr. James Grime's Sphere Trilogy

And here goes a Fields Medal!

I love Dr. Grime. Never fails to get me interested in the subject matter and he’s always a joy to watch.

0:41 "slightly unsatisfying" - he must've just noticed the rubik's cube back there.

Honestly this video helped me understand my Gen Chem homework better than any TA ever could. And I could say the same about any video from this channel really. I love how they're filmed as if the instructor is talking directly to the viewer, it makes hard concepts really easy to understand

Lover your work. Bucky Fuller was a “closest-packed sphere” expert. Surprised you didn’t mention his work. Also, Penrose was big into tiling space, so not being an expert but a dilettante in all their work, I would’ve thought they might have addressed some of these ideas. You should do some videos on their work.

The animations are perfect - they clarify what's being said so well. Great video.

Maryna Viazovska winning the 2022 Fields Medal brought me here.

2 James video in a row *I HAPPY*

For those watching a few years later, Ukrainian Maryna Viazovska solved the sphere packing problem in 8 dimensions and in 24 dimensions. Her proofs were apparently much simpler than the proof for 3 dimensions explained in this video. She won a Fields medal for this in 2022, making her the second woman to ever win a Fields medal.

I'm so glad James is still around! I think he was in the very first Numberphile video.

There are some inaccuracies in the video. The triangular pyramid is in fact exactly the same as the square pyramid, but they are not the same as the hexagonal one. The two types of packing have the same packing factor but a fundamentally different structure. Google FCC and HCP for more info. Also table salt, NaCl, is not fcc or hcp, it is a simple cubic lattice and is therefore not a perfectly packed.

Surprisingly some of the most relevant content towards my major! I'm a freshman at university for materials science and engineering and this is exactly how we address close packed arrays of atoms in metal materials! (Also for ceramic materials but those include different sizes of ions)

Why all the mathematics? Just look at my gut after I eat 12 bags of Maltesers.

I love the animations in this video. They seem to be next level.

“Everyone should have a mathematician...” Oh, James!

11:08 My parents when I try to explain how I was going to do my homework at 10:00 but can't because it's now 10:01

How does disproving a finite of number counter-examples count as a proof? They have to demonstrate first that any potential counter-example is essentially equal to one of the five thousand or one hundred. Have they? Edit: As has been pointed out in responds to this, it might be that Dr. Grime glossed over this point to keep the level of mathematics involved understandable to laypeople. I understand that and it is perfectly understandable and fine, I would have just preferred this detail at least to be mentioned in the video, considering that the reduction from infinitely many cases to finitely many is both a necessary condition and that it being possible is an interesting fact, if true. Instead not a single word is spent on wether these 5000 examples cover all cases. One sentence would have been enough, but this way there is something missing.

Very nice. I've learned some applications for this in a mineralogy class, but it's cool to see the mathematics behind it.

"...looked for the best way to pack his CANNIBALS." Oh, i think i misheared that part.

Looked through the comments, surprised I didn't say any MatSci students or alumni, this close packing (HCP and FCC) is something you learn in your first MatSci class, we didn't discuss the proof but it's taken as fact.

I watched this a couple times and only now am I beginning to understand. I feel a lot denser than 74.05% so I guess Im not an assembly of spheres.

"Can be applied to how we transmit messages on the internet today" "I can't see any LINK there!" so underappreciated

Thank you so much, I learned so much from this clip!! How about sphere packing in higher dimensions? 4, 5? N?

I love how James can tell a joke without breaking his explanation at all

wait... you just make a finite list of possible counterexamples and just cause you could not find a better packing you conclude you found the best packing?!

I love your videos. Could you do one on how irrational sine values are found, both by ancients such as Ptolemy and Ulugh Beg, as well as by modern calculators using power series?

please do a video on michael atiyah and the riemann hypothesis thing

"To be continued" at the end 😂

Will you mention Viazovska's recent result in 8- and 24-dimensional space?

Checking in to acknowledge how awesome James Grime is. Love his enthusiasm

*I wonder why always, that rubiks cube always remain unsolved*

Wow this made me remember my course in material science back in the days. Some materials form other crystal lattices than others. The best ones, you guessed it, fill 74% of the space :)

10:00 What is the formal proof language they used? COQ or similar?

I seriously love this kind of videos!

As a material engineer I am a bit annoyed by the distinction between "aluminium and copper, or crystals like tablesalt". If aluminium or copper have a regular packing they ARE crystals ;)

0:37 - 0:58 That is such a hitchhiker's guide to the galaxy way of solving that.

5:45 What is this "bit of Pythagoras"? - It's Monday morning and my brain hasn't woken up

im so glad that james is back

Your statement that 74% is the value for structures like "copper and table salt" is pretty inaccurate; let me explain why. The max possible packing factor is 0.74 (or if you prefer 74% of the "structure" that contains the particles), this factor competes only to the monoatomic metallic elements like copper or aluminium (of course under some simplifying hypothesis). NaCl or "table salt" is a binary ionic salt formed by two different atomic species (sodium and chlorine) with opposite charges, so in order to stabilize the entire structure they will dispose themselves in different position leaving different voids. So in conclusion the packing factor isn't 0.74 , it's around 0.67.

Wish you made this video a year ago. Would have helped me and friends with materials engineering since you’re describing different atom packing structures. Absolutely great video!!

I’m curious about the framed paper on the wall in the background, was that a signed copy of the sheet used in a Graham’s number video?

Nice to see another video with Ol' Grimey

I have a solution for problem #25. Where can i collect my million dollar reward?

This answer always seemed intuitively correct to me. You take a sphere, you bring a second sphere as close as possible (touching), then another as close as possible to both (triangle), then another (tetrahedron). That's the tightest small configuration you can make. Any additional spheres you add will at best locally replicate this tetrahedron, so the best you can pack them is in this repeated tetrahedron. I'm stunned it took so long to prove and then an additional 15 years to _really_ be sure.

Under 301 club Limit: Well... 300 We have food and drinks, come on in and.. Party?

Sphere packing in n dimensions is my favorite problem in mathematics. Thanks for covering this!

dump em in let em roll

I read in some book a similar problem, where you pack spheres into boxes. Basically you wonder what is the smallest box that can contain n spheres. For low number, square packing is best (i.e. 8 spheres are best fit by placing them in corners of a box), hexagonal eventually takes over. But for something like 59 spheres, there is a proof that even better packing exists, some random-looking structure is supposed to be even more efficient, even though the proof does not create such packing, just says there must be one.

Handy information for jugglers. 😉

the atomic packing factor for a FCC or HCP unit cell is 0.74, but at around the 4:30 mark you show a BCC unit cell (atomic packing factor is 0.68)

How did they come up with the 5000 potential counter examples and how did they know that there weren't better alternatives out there?

In this packing the centers of the spheres are close to the vertices and the center of regular icosahedron. But the radius of a circumscribed sphere is about 5% less that the edge length of a regular icosahedron. Therefore it is impossible to make a perfect 3D tetrahedral lattice. It may be a bit counterintuitive because it is possible to make a perfect infinite triangular lattice in 2D.

11:08 That right there has meme potential.

Blown my mind once again!!

I remember when you pack this in 4D or even like 10D you can pack a larger sphere inside a sphere.

This is the last video before going to sleep

Shove it all in until it works!

I’m 74.05% sure I should go to bed already.

Can someone please tell me how the height was root2 I can't seem to figure it out....

Always happy to see James Grime :)

12th chemistry

I learnt this in first year engineering physics. Something related to atomic packing, packing factor, simple cubic, fcc, bcc, etc etc etc.

Make a video on the Riemann Hypothesis proof

Oh, that ending is pure gold, sooo sinematic.

You are 🔥🔥🔥 Seeing you helping students in education has inspired me to come out of my comfort zone and start my own KZbin channel to help more students.. Love you sir

The first of the trilogy in the SPCU (Sphere Packing Cinematic Universe)

At first, i heard "...packing cannibals."

Imagine working on a question to ask a computer for 15 years just to finally plugging it in and it responding "yup"

"24: Pick up dry-cleaning 25: Buy milk 26: Send invoice!" Hahahaha For those wondering, Hilbert only set 23 problems (only one of which is also among the seven Millennium Prize Problems, namely the Riemann Hypothesis). I don't think there's a monetary reward for the problems, especially since they're more of a guideline for where mathematical research should expand in the 1900s rather than concrete problems.

He invented the potato and then you look at my name and realise how wrong that sounds

Oi mate! 'Ave you got you'self a loicense fo them fancy maths bruv?

When I saw that I would have to wait for a part 2 of this episode, I was sphurious.

Pause the video and go to 0:00

The link between telecommunications and sphere packing could be either shannon s theorem of information or symbol mapping/modulation in digital telecommunications due to the nature of Gaussian noise.

You mean the best way to park squares, Parker squares that is

Reminds me of that Kurt Vonnegut story. The physicist is looking at the ways cannonballs are stacked in order to get inspiration to find a new way to make ice. Ice is dense H2O molecules. Dude finds a new way to structure the crystals so that when it comes into contact with water it immediately freezes in the same pattern, accidentally freezing the whole planet and everyone on it. Think the book was Slapstick or Cat's Cradle

First (sorry I had to)

Can't wait for part 2 and 3!

And in Apr 2020 KZbin recommends this video to remind me about 8:08 social distancing!

Usually, when you combine factors into a number (for example: factors of 4: 41216), and divide it by the number, you get something based off of 1002, or 10002, etc

the fact that he hanged the paper which graham wrote his number... amazing!

The animation is on point in this video 💯🔥🔥

a note for those who want to understand the math in regards to finding the height of the cubic unit as root 2. The visual 3D model in this video is incorrect, because it does not take the assumed shape of a cube - therefore, you will not be able to calculate the height as root 2. Instead, what the cubic unit (of densely packed spheres) should be made up of is 4 divided spheres (refer to stand-up math's video w/oranges or google cubic unit of densely packed spheres). After doing this, you will be able to use the assumed properties of a cube to calculate the height as root 2. Hope this helps :)

beautiful explenations !

Where is he at? I love how simplistic it is. If that is his home this would be my dream. A brown simple home decorated minimally.

Now I have been playing with the problem in other contexts. The problem of weather it is 12 or 13 that fits around a sphere is not trivial. Newton only counted 12 AROUND the central sphere; but if you count the sphere actually included (surrounded) in the ball it gives 13. That is why Iron is the atom with the lowest binding energy in the nucleus of all! Iron has the atomic number of 26 = 2 *13. The doubling of 13 is due to the fact, that the basic building block of atomic nuclei is not hydrogen, but actually helium with an atomic number of 2 and 2 neutrons, thus in essense an alpha particle. There is virtually no helium except helium 4. Now helium is not 2 protons and 2 neutrons it is 12 quarks tied together by the strong nuclear force - which is not at all mystic - given a few basic assumptions. A regular dodecahedron has 12 faces. And could hypothetically contain another quark in the center, but as quarks don't exist in isolation and can only be torn out by pouring energy enough for a replacement (plus an anti-quark). The iron nucleous is more lucky in so far as there is room for a helium nucleus in the center - hence 13 helium nuclei! 12 faces plus one in the center. Now 13 times 4 is 52 and the - by far - the most common iron-isotope is 56 thus relegating 4 neutrons as hangers on - actually iron 54 (the second most common isotope) and the two neutrons i presume are as far away from each other as possible. I could go into more detail, but won't as my work would be nicked and I would get no money. Remember Newton? He got so pissed off by someone who cheated him for money that he got 26 forgerers executed under torture - not that he bothered seeing them squirm. But then you would have to get a nuclear physicist in on the game as well, because it is quite illumination to the nature of the strong nuclear force.

A hint on combinatorics, Hamming distance, and error detection and correction?

Matt Parker, James Grime, and Clifford Stoll are the holy trinity of Numberphile