When he was a lad he did 4 dozen trials every morning to help with the proof, And now that he's grown he does 5 dozen trials on his quest for mathematical truuuth!! 💪
There's still loads of awards going for a similar idea of "Erdos tried" puzzles. You even get the choice of accepting the monetary award or a cheque signed by Erdos to frame in your study
The youngest of the ‘Euler’s Spoilers’ is no more. He was 103. Indian mathematical genius, Sharadchandra Shankar Shrikhande, who along with his mentor late RC Bose and their colleague late ET Parker disproved way back in 1959 an 18th century mathematical conjecture, passed away at Vijaywada on April 21, bringing curtains to a glorious chapter from the world of statistics and mathematics.
14:02 "Never arrange a ping-pong tournament with six team members" -- I first understood "with sixteen members", I went crazy! WTF?!? And then I turn on the subtitles.
it was in this positionerino agadmatorino Hey you're not commenting on Agadmator's recent videos. What's wrong? I really enjoyed your work during the MC Invitational.
This video is like a tribute to SS Shrikhande who was part of the "Euler's Spoilers" - a bunch of three people at UNC-CH who disproved Euler's generalisation of this problem - who sadly passed away on the day of the release of this video.
@Aleksandr A. Adamov that's weird because I clearly remember seeing the news where SSS's death was reported and a few hours later this video released... Could it be possible they had reuploaded/changed the video later?
When he described the puzzle, I paused it, got some paper and a pen, and figured it out. And I solved it, hooray! It really is like doing double sudoku, lol. Cheers for the interesting video and fun little puzzle, Numberphile :)
Haha, I was so intrigued so I pulled out a stack of cards for this 😁 I did AKDB first, then it was easy to rearrange for ♠️♥️♦️♣️. Enjoyed it thoroughly!
It would have been nice to talk about the link between this and magic squares: say instead of AKQJ and 1234 we used two sets of 0123, and made them into the same arrangement, we could then read off each number as a two-digit number in base 4, then those would be a valid magic square (excluding diagonals) or we could add 1 to every number and it would still work. For a 3x3 example (since I know that one well), [21,00,12;02,11,20;10,22,02] (excuse the formatting) becomes [7,0,5;2,4,6;3,8,1] or [8,1,6;3,5,7;4,9,2] which is a magic square. This logic works for all sizes too.
@@HansLemurson No. The assertion is wrong. There are 6x6 magic squares but no 6x6 magic squares that take that form. You always end up with a square that repeats one of the base 6 digits in the rows.
If you can construct a double Latin square then you can use that to create a magic square. Euler's methods for creating double Latin squares can be used to create forms of magic square but won't find all of them, just a subset.
Back in high school (late '70s, early '80s), our math teacher had a large, handmade, quilt hanging from one of the walls, with a 10 x 10 Euler square as the pattern. Him telling the story behind is was the first time I heard about Euler.
I do too! I'm a little concerned that they don't seem to be too socially distanced in their videos though. I don't want any of my Maths friends to get sick.
and each time the word " sudoku " is repeated more emphasis can be placed upon that work in the sentence until it can become a very happy shouting match !
Oh man this remind me of playing around with multidimension Karnaugh maps. I love this channel so much, thank you guys for keeping science available for all
What a coincidence....just when the Indian Mathematician who debunked Euler's Theory passed away! P.S. - He died today at the age of 103! His name was Shrikhande !
The video showed an Indian Raj Bose as completing it successfully in the 1950's, '54 I believe it was. This Strickhande was he in the '20s that were later disproven until Bose, or was Strickhande later?
This was an excellent presentation as all of yours are. Having taught statistics for years I never thought of using this with setting an Experiment thank you.
watching this while currently having in sudoku mood. I suddenly thought of this sudoku variant, 2 sudokus (normal sudoku and wordoku) in one grid following regular rules with the extra rules mention in this video (each cell must have a unique combination of a letter and a number) would be interesting tho (and hard)
I bet after it was disproven, Euler's viewers started using the term to describe anything that was given a go but had something wrong in it. As in, "Oh look at that square number magic square Matt Parker came up with, it's such an Euler square of a solution!"
Just completed one with each row, column and corner diagonal. It's also nice to see the centre 4 are also one of each, as is each corner, including many 4 place patterns like B1, C1, B4 & C4 for example! :)
The four corners also constitute a four card set, as do the central four cards and each four card quadrant, plus others. If you were given all these conditions to meet at the start, it would seem more difficult to solve, but actually makes it easier.
Throughout history there have been teachers that, through a combination of their passion and understanding for the subject and the way they present it, make learning easy to digest. James Grime is one of those and I envy the students that have studied under him.
In 2012, this channel uploaded a video about a "special magic square" that remains magic after rotation or reflection. But this video provides the explanation. It is really two orthogonal 4x4 Latin squares with the digits 1, 2, 5, and 8: one for the tens place and one for the units place. These digits rotate or reflect to give 1, 5, 2, and 8, respectively, so the Latin square property still holds. So the total of every row, column, and diagonal must be 1 + 2 + 5 + 8 = 16 for both the unit and tens digits, giving a total 160 + 16 = 176, invariant under reflection or rotation by 180 degrees.
This reminds me of "The Schoolgirl Problem Puzzle" : In a boarding school there are fifteen schoolgirls who always take their daily walks in groups of three. How can it be arranged so that each schoolgirl walks in a group with two different companions every day for a week (7 days)?
3:43 Beautiful! I see that you've done more than Euler asked for, because you also have all four suits and all four denominations in 1) each diagonal broken two & two 2) each 2x2 quadrant 3) the central 2x2, and the four corners 4) the corners of each 3x3 block. (To get utterly magic square nerdy: your square is "complete", in magic square jargon, because any two cards that are two diagonal steps from one another are either two major suits (spades, hearts) or two minor, and either two high cards (ace, king) or two low.)
I’ve had a puzzle like this ever since I was a child, with colours and numbers instead of card values and suits. Never knew it was called an Euler square :)
There are more symmetries in your first working example: top middle two, bottom middle two; corner cards, left middle two, right middle - all of them fulfill the rule. And a few more.
@Je dagelijkse braintraining *** wiskunde-puzzels 6 team members with 2 teams make 12. As opposed to 6 player with 2 teams of 3 team members. The ping pong tournament described had 2 teams. I also misheard it as 16 though.
I got really into these a couple of years ago. and I found another type of puzzle that is also cool. It's basically the same except instead of an n by n grid with 1 of n items in each row and column you have a 2n by 2n grid with exactly 2 of each item in each row and column. I was trying to figure out how many different possibilities there are, but it's harder to compute than the euler squares.
I got to learn about latin hypercubes last semester in order to determine a reasonably random uniform selection of a multidimensional variable selection. I had to create 200 points distributed through 5 dimensions down the 'diagonal'. Then randomly swapped values between points along the same dimension. Ie n=2,x=2 swaps with n=10,x=10. The reason to do this was interesting. It meant that we could do a constant set of tests for whatever number of variables we came up with to test. The variables were being chosen to run a simulation between a parasite living off a population and succeeded or failed if they reached equilibrium or died/became unbounded.
The rules don’t work out for a 6 by 6 Flat Torus, unless you Nash-isometric-embed it, with extra curled up squares/corrugations, into something like a Hévéa Torus. Hey, don’t knock it, they do those tortuous sleights of hand in String Theory all the time. 😀 As a fun-filled alternative: One might be able to make a 6 by 6 square work, if the surface was a special (holographic-like) 2D section of a 6D Calabi-Yau manifold. If nothing else it would be an interesting little exercise.
I got goosebumps the second he showed his first solution because it was the solution I came up with right after pausing the video to see if I could do.
Extra footage at: th-cam.com/video/HuIrUeODtVQ/w-d-xo.html
Patreon: www.patreon.com/numberphile
Sadly, sharadchandra shankar shrikhande one of the co-authors of the Euler's spoiler paper passed away recently.
deepak pradhan Wow, that's sad.
Wait i thought BOTH diagonals had to be different but for the 3x3 you have one diagonal as A A A ..at 8:20 isnt that wrong?
Also at 8:35 you have the same number in the diagonal...that's inconsistent too..cant have all 3s or all 1s..should be one of each..
@@leif1075 He explicitly says the diagonal restriction is only for the 4x4 cards puzzle and not for the general Latin Squares puzzle.
Moral of story:
_Even when Euler's wrong, he _*_still_*_ gets things named after him._
(That's gotta make Matt Parker feel better.)
What a Parker naming system.
Even things, which doesnt exists, need a name, so that everyone knows, what you are talking about :P
The Euler Square O.O I can't believe that went over my head.
nah, the moral of the story is that people who name discoveries after people are idiots.
@@sumdumbmick Because people don't deserve being recognized for their work ?
10:52 No-one brute-forces a problem like Gaston!
When he was a lad he did 4 dozen trials every morning to help with the proof,
And now that he's grown he does 5 dozen trials on his quest for mathematical truuuth!! 💪
🤓
K.o.R take my upvote
K.o.R are you a Ben and hollys little kingdom fan?
Literally egghead Gaston.
4:00 "We don't actually need to match up the diagonals."
4:30 *diagonals match up anyway*
The Anti-Parker Square
So we have Parker (dud), Non-Parker (works), and Anti-Parker (works even in ways not required by original requirements).
@@PanduPoluan Gold
@@PanduPoluan Is there the Anti Non-Parker?
@@mati.benapezo so it fails even in ways not required? that's just a regular Parker
@@aidentoman-sager5527 may be one that doesn't work for trivial requirements
In fact so special that Euler got involved xD
We should award puzzles with the 'Euler tried' award
The Parkeuler
Now that I think about it, I just noticed how the title "Euler Squares" must have been a deliberate reference to the Parker Square, nice!
Yeah, this should be a thing. xD
There's still loads of awards going for a similar idea of "Erdos tried" puzzles. You even get the choice of accepting the monetary award or a cheque signed by Erdos to frame in your study
Instead of 'college try' we should change it to 'Euler try'.
The youngest of the ‘Euler’s Spoilers’ is no more. He was 103. Indian mathematical genius, Sharadchandra Shankar Shrikhande, who along with his mentor late RC Bose and their colleague late ET Parker disproved way back in 1959 an 18th century mathematical conjecture, passed away at Vijaywada on April 21, bringing curtains to a glorious chapter from the world of statistics and mathematics.
indian mathematicians are amazing... if anyone has a nice long documentary with a bunch of indian mathematicians, please link!
@@alveolate there is a documentary on SC Shrikhande tho. I saw it at a college. I don't recall the name. Try googling.
+
Respect
Title: Euler
Thumbnail: James Grime
Me: visible excitement
Euler didn't respond to their calls :(
Hotel: Trivago
Is that the speaker's name? I honestly don't know
@@darkphoenix0808 yes it is he is the best out here I guess I mean his accent presence is awesome 😎🔥
??
This was one of the best Numberphiles in a while for me! James really knows how to give information succinctly and interestingly. Bravo, chaps!
3:33 I realise not only the rows columns and diagonals, but the four 2×2 sub-squares also have one of each rank and suit!
That makes it even more like a sudoku! Hooray!
also the middle 2x2 square
Which surly means that the "difficult" 6 by 6 example surly could be solved by doing the sub 3x3 sub squares no?
It follows by definition, since the other 3 squares of the sub-square are on the row, column and diagonal of the corner square.
Also the 4 corners.
14:02 "Never arrange a ping-pong tournament with six team members" -- I first understood "with sixteen members", I went crazy! WTF?!? And then I turn on the subtitles.
Sad player "F" was the giveaway.
James Grime: Oiler Spoilers
Me, an intellectual: Euler Speulers
I cannot stop giggling. Thank you.
That brown paper on Graham's number signed by the very own Ron Graham is just amazing! 0:25
Agreed! I'd like that to hang on my wall as well
Wow, I didn't even notice, that is too cool
The first thing I noticed also :)
The ping pong letters and numbers are adorable
I thought that too until I saw their tiny white pupils and now I think I'll have nightmares....
@@auroralong5437 damn, you're right
Yay but 4
Nooooooooo
Watch #4, it looks like it's teabagging
After so many years I still get a smile when I see James Grime
5:45 I'm mostly here for the twerking 4
i noticed that too
ikr
@@Son-Of-Gillean no....
it was in this positionerino agadmatorino Hey you're not commenting on Agadmator's recent videos. What's wrong? I really enjoyed your work during the MC Invitational.
@@leadnitrate2194 Thanks, I'm still commenting every video but he gets a lot of comments so you probably have to scroll down to find them
This video is like a tribute to SS Shrikhande who was part of the "Euler's Spoilers" - a bunch of three people at UNC-CH who disproved Euler's generalisation of this problem - who sadly passed away on the day of the release of this video.
Amazing coincidence.
@@numberphile your video --killed him-- satisfied his lifelong ambition of getting obliquely referenced in a numberphile video.
@Aleksandr A. Adamov that's weird because I clearly remember seeing the news where SSS's death was reported and a few hours later this video released... Could it be possible they had reuploaded/changed the video later?
When he described the puzzle, I paused it, got some paper and a pen, and figured it out. And I solved it, hooray! It really is like doing double sudoku, lol. Cheers for the interesting video and fun little puzzle, Numberphile :)
Check out the 2016 United States Puzzle Championship :)
Haha, I was so intrigued so I pulled out a stack of cards for this 😁 I did AKDB first, then it was easy to rearrange for ♠️♥️♦️♣️. Enjoyed it thoroughly!
It would have been nice to talk about the link between this and magic squares: say instead of AKQJ and 1234 we used two sets of 0123, and made them into the same arrangement, we could then read off each number as a two-digit number in base 4, then those would be a valid magic square (excluding diagonals) or we could add 1 to every number and it would still work. For a 3x3 example (since I know that one well), [21,00,12;02,11,20;10,22,02] (excuse the formatting) becomes [7,0,5;2,4,6;3,8,1] or [8,1,6;3,5,7;4,9,2] which is a magic square. This logic works for all sizes too.
Wait, so does that mean there are no 6x6 magic squares?
@@HansLemurson No. The assertion is wrong. There are 6x6 magic squares but no 6x6 magic squares that take that form. You always end up with a square that repeats one of the base 6 digits in the rows.
If you can construct a double Latin square then you can use that to create a magic square. Euler's methods for creating double Latin squares can be used to create forms of magic square but won't find all of them, just a subset.
I love that you've got the paper from the video with Ron Graham hung up on the wall. RIP
Squares in order of importance
1. Parker Square
2. Euler Square
3. The Square
4. 2^2
@@RogueLich lol😂
@@RogueLich 5. 1
Times Square should be #1.
On second thought, make that #2.
I love how team member "4" is animated at 5:46
hes a little silly
James talks about something from Euler, can there be something better?
@Carey Hunt what?
You mean there's a square named after some other mathematician? Sounds almost exciting, but not quite
Yes, there is something better. Matt Parker talking about squares.
@@kasajizo8963 that's also cool, but like a Parker Square not perfect xD
@Carey Hunt Thanks random guy from the Internet
Grime's passion is always very enjoyable to listen to and watch
This lockdown really hasn't cramped the style of the animator. Full marks. I love it.
Back in high school (late '70s, early '80s), our math teacher had a large, handmade, quilt hanging from one of the walls, with a 10 x 10 Euler square as the pattern. Him telling the story behind is was the first time I heard about Euler.
I love how you never cease to stop making innovative animations
One of your best videos in quite a while. Really enjoyable. James really knows how to explain things. Thanks!
I love NumberPhile! I watch it all the time. It's one of the only this getting me through lockdown! 😀
Mood
I do too! I'm a little concerned that they don't seem to be too socially distanced in their videos though. I don't want any of my Maths friends to get sick.
esotericVideos
I’m sure it was filmed well before the lockdown.
Dr. James Grime is such a joy to listen and watch at. Always with a big smile. We need more enthusiastic people like him :)
I like the framed brown paper for Graham's number hanging in the background.
It's great to see James again - I feel like I haven't seen him in a NP video for ages!
Do you have notifications on for our videos? Bash that bell 🔔
Classic James. What a mad lad. We gotta have Numberphile live-streams some time.
What a power move by Euler!
"I cannot do it, therefore it is impossible!"
3:14 you think James is sped up here, but actually this is his normal speed, the rest of the video is slowed down
James got me interested in teaching myself better math skills that have laid dormant for years.....BIG THANKS!!!!
I heard of the latin square design by learning about experimental design, nice to see math at work!
"it's so difficult Euler got involved"
That four day tournament was the greatest event of my life - the first game on the second day was just the bomb!
James Grime is such a wonderful communicator.
Thanks!
I always love when different pronunciations clash like one is correcting the other straight away... “ohh it’s a Sudoku” ... “yes a sudoku”
and each time the word " sudoku " is repeated more emphasis can be placed upon that work in the sentence until it can become a very happy shouting match !
Oh man this remind me of playing around with multidimension Karnaugh maps. I love this channel so much, thank you guys for keeping science available for all
11:12 "To be fair, he was a proper mathematician. But he also checked every case." Shaking my head
Brady’s animations are so underrated
What a coincidence....just when the Indian Mathematician who debunked Euler's Theory passed away!
P.S. - He died today at the age of 103!
His name was Shrikhande !
Amazing coincidence!!!
@@numberphile Also, a video tributing Conway's departure is visibly missing..
The video showed an Indian Raj Bose as completing it successfully in the 1950's, '54 I believe it was. This Strickhande was he in the '20s that were later disproven until Bose, or was Strickhande later?
This was an excellent presentation as all of yours are. Having taught statistics for years I never thought of using this with setting an Experiment thank you.
watching this while currently having in sudoku mood. I suddenly thought of this sudoku variant, 2 sudokus (normal sudoku and wordoku) in one grid following regular rules with the extra rules mention in this video (each cell must have a unique combination of a letter and a number) would be interesting tho (and hard)
Love James Grime ❤️
I bet after it was disproven, Euler's viewers started using the term to describe anything that was given a go but had something wrong in it. As in, "Oh look at that square number magic square Matt Parker came up with, it's such an Euler square of a solution!"
Just completed one with each row, column and corner diagonal. It's also nice to see the centre 4 are also one of each, as is each corner, including many 4 place patterns like B1, C1, B4 & C4 for example! :)
oh boy that 4 sure is disturbing
:)
😂
The four corners also constitute a four card set, as do the central four cards and each four card quadrant, plus others. If you were given all these conditions to meet at the start, it would seem more difficult to solve, but actually makes it easier.
Can we talk about that 4 for a second?
4 really went 4 it
4 goodness sake...
4 4 a second*
I love the music and fireworks animation when it was falsely revealed that those cases were impossible.
thanks JAMES
your first.
Throughout history there have been teachers that, through a combination of their passion and understanding for the subject and the way they present it, make learning easy to digest. James Grime is one of those and I envy the students that have studied under him.
In my head I'm just singing to the "ABC Song" by Jackson 5:
A B C pair them with 1 2 3.
A B C 1 2 3, that's how easy maths can be!
LoL
In 2012, this channel uploaded a video about a "special magic square" that remains magic after rotation or reflection. But this video provides the explanation. It is really two orthogonal 4x4 Latin squares with the digits 1, 2, 5, and 8: one for the tens place and one for the units place. These digits rotate or reflect to give 1, 5, 2, and 8, respectively, so the Latin square property still holds. So the total of every row, column, and diagonal must be 1 + 2 + 5 + 8 = 16 for both the unit and tens digits, giving a total 160 + 16 = 176, invariant under reflection or rotation by 180 degrees.
I am a simple man ,I see James. I suddenly love math... Until the video ends.
James grime is so engaging I love it when he’s in the videos
I see Euler and James grime in title, i click.
This video was a mental rollercoaster ride
This reminds me of "The Schoolgirl Problem Puzzle" :
In a boarding school there are fifteen schoolgirls who always take their daily walks in groups of three.
How can it be arranged so that each schoolgirl walks in a group with two different companions every day for a week (7 days)?
ZaphoD Beeblebrox Isn’t that an instance of a Steiner Triple system of order 15, where there would be (15*14)/6, or 35 triples?
Let's give Kirkman due credit for this problem.
Another Numberphile video, perhaps?
@@rosiefay7283 sounds like one for Cliff. He loves Euler and stuff about taking walks.
3:43 Beautiful! I see that you've done more than Euler asked for, because you also have all four suits and all four denominations in 1) each diagonal broken two & two 2) each 2x2 quadrant 3) the central 2x2, and the four corners 4) the corners of each 3x3 block.
(To get utterly magic square nerdy: your square is "complete", in magic square jargon, because any two cards that are two diagonal steps from one another are either two major suits (spades, hearts) or two minor, and either two high cards (ace, king) or two low.)
Omg!! James Grime!! (The earliest I've been)
What a great story - so many twists - a strange pattern - thanks James
I’ve had a puzzle like this ever since I was a child, with colours and numbers instead of card values and suits. Never knew it was called an Euler square :)
Mathematicians know humor: "They're called 'Euler Spoilers.' I think it's kind of a joke."
5:40 that four was flapping his privates LOL
There are more symmetries in your first working example: top middle two, bottom middle two; corner cards, left middle two, right middle - all of them fulfill the rule. And a few more.
14:04 Fs in the chat
F
F
F
F
F
I see Grime, I click. I see Grime and Euler, I double click.
14:04 you better don't want a tournement with 12 members (A, B, C, D, E, F, 1, 2, 3, 4, 5, 6), not 16.
I think he said 6 team members not 16
@@abhijiths5237 6 players do work because that is 3x3.
Sorry if i missheard.
@@jedagelijksebraintraining 3 by 3 is nine. What they said was 6 by 6 won't work.
@Je dagelijkse braintraining *** wiskunde-puzzels 6 team members with 2 teams make 12. As opposed to 6 player with 2 teams of 3 team members. The ping pong tournament described had 2 teams. I also misheard it as 16 though.
@@abhijiths5237 That's make sense. I am confused for a minute thinking I do not understand the problem.
great that numberphile keeps uploading turring the lockedown. love this video.
I'd be interested in a way of judging "how wrong" a square is, and then seeing how many 6 squares exist that are the "least wrong"
I love this guy. The excitement, the energy, everything
You can say one thing about Euler, he sure greased the wheels of progress. 🤣
Dr. Grime videos are probably the easiest to follow. I wish my school had professors like him
I got really into these a couple of years ago. and I found another type of puzzle that is also cool. It's basically the same except instead of an n by n grid with 1 of n items in each row and column you have a 2n by 2n grid with exactly 2 of each item in each row and column. I was trying to figure out how many different possibilities there are, but it's harder to compute than the euler squares.
I like how, in the 4x4 solutions, each quadrant also still somehow maintains the limitation that each suit and each rank only appear once.
James 👏 Grime 👏 makes 👏 my 👏 day 👏
thank you so much James Grime, finally I´ve understood it!
Somewhere near the 3:20 mark a chipmunk solves the puzzle.
I feel like those dancing letters and numbers are gonne stay stuck in my mind for quite a long time. I'm not sure whether I should complain about it.
It's charming that James has a framed bit of numberphile paper in his house.
And not just any framed bit, but the paper from one of Numberphile's most iconic videos, signed by Ronald Graham himself. :-)
I think that's Brady's house.
I got to learn about latin hypercubes last semester in order to determine a reasonably random uniform selection of a multidimensional variable selection. I had to create 200 points distributed through 5 dimensions down the 'diagonal'. Then randomly swapped values between points along the same dimension. Ie n=2,x=2 swaps with n=10,x=10. The reason to do this was interesting. It meant that we could do a constant set of tests for whatever number of variables we came up with to test.
The variables were being chosen to run a simulation between a parasite living off a population and succeeded or failed if they reached equilibrium or died/became unbounded.
I reckon they should have called them “Speulers”
You are the best host of numberphile.💖💖
14:52 wait, *that* adam savage? or just someone coincidentally named adam savage?
Adam Savage is a massive fan of Numberphile, so I wouldn't be surprised if it was the actual guy himself.
Yes.
"I reject your identity, and substitute my own."
I mean, the dude díd just recently do a video with Matt Parker.
Some people say it's him, I say it's a Myth :D
euler gets hundreds of problems right: ok
euler gets a few questions wrong: everything blows up...
12:45 I would love to have that thing hanging on my wall! Upvote for new merch!
↑
Never arrange a ping-pong tournament with *36 members
Ping-pong player B did literally nothing and still won the tournament. Impressive.
The rules don’t work out for a 6 by 6 Flat Torus, unless you Nash-isometric-embed it, with extra curled up squares/corrugations, into something like a Hévéa Torus. Hey, don’t knock it, they do those tortuous sleights of hand in String Theory all the time. 😀 As a fun-filled alternative: One might be able to make a 6 by 6 square work, if the surface was a special (holographic-like) 2D section of a 6D Calabi-Yau manifold. If nothing else it would be an interesting little exercise.
7:12
Number 2 in third place
*logic*: wait, that's illegal!
Waltlab Channel Zero based?
I got goosebumps the second he showed his first solution because it was the solution I came up with right after pausing the video to see if I could do.
I know probably no one really cares, but I solved it all on my own and I'm really proud.
00:02 James' puzzles always get me going
What a ride.
4:25 I like how he managed to get the diagonals anyway even though he didn't need to