ขนาดวิดีโอ: 1280 X 720853 X 480640 X 360
แสดงแผงควบคุมโปรแกรมเล่น
เล่นอัตโนมัติ
เล่นใหม่
Feature request for "12" logged.
As requested, I dub this an admirable effort :D
Imagine if Sven implementes 12, but not 10, 11 or any other two digit number
The Intro was much more entertaining than expected 😁
ireally enjoyed .videos worth watching thank you for sharing..
30:55 why couldn't 11 be made with 29? It doesn't work in sandwiches, but that's not here.
I came to the comments to see if anyone noticed this. Then it turned out to be a major plot point.
Just a small thing (not sure it will appear later as I am only at 25:18):The renban cross in box 2 has a 4 on it so it can't have a 9 on it.
27:44 is someting I really like about zetamath: "Let's do Sudoku first." He rarely fails to do Sudoku first.
You're right, we could have seen that sooner! I think we were distracted looking at the 17 clue at the time.
I really enjoyed watching this, as usual with zetamath.
At very start of puzzle you assumed the 9 diagonal is 2 or 3 but i saw no reason it couldnt be 421 and the 10 325 maybe you got lucky with this?
That would make the 9 diagonal 4 2 1 2 and in this puzzle digits can’t repeat on an x-sum diagonal!
@@thetiredsaint Thank you
Feature request for "12" logged.
As requested, I dub this an admirable effort :D
Imagine if Sven implementes 12, but not 10, 11 or any other two digit number
The Intro was much more entertaining than expected 😁
ireally enjoyed .videos worth watching thank you for sharing..
30:55 why couldn't 11 be made with 29? It doesn't work in sandwiches, but that's not here.
I came to the comments to see if anyone noticed this. Then it turned out to be a major plot point.
Just a small thing (not sure it will appear later as I am only at 25:18):
The renban cross in box 2 has a 4 on it so it can't have a 9 on it.
27:44 is someting I really like about zetamath: "Let's do Sudoku first." He rarely fails to do Sudoku first.
You're right, we could have seen that sooner! I think we were distracted looking at the 17 clue at the time.
I really enjoyed watching this, as usual with zetamath.
At very start of puzzle you assumed the 9 diagonal is 2 or 3 but i saw no reason it couldnt be 421 and the 10 325 maybe you got lucky with this?
That would make the 9 diagonal 4 2 1 2 and in this puzzle digits can’t repeat on an x-sum diagonal!
@@thetiredsaint Thank you