What do you think about mine? I found another possible way to solve that. I'm curious about any other capabilities. (first row) --> 33 39 21 39 33, (second row) --> 27 33 45 33 27, (third row) --> 45 21 33 21 45, (fourth row) --> 27 33 45 33 27, (fifth row) --> 33 39 21 39 33,
Well done! But may be an untold condition is that every number has to be unique. So, since all your diagonal elements are the same, perhaps that is why it's not considered although the professor has not replied as yet so couldn't say for sure. But again well done! 👏👏👏😇
Also since there are more variables than equations, hence infinitely many solutions is bound to exist in which case you may find n number of combinations of numbers to satisfy your conditions. But as they say, there's always a method to madness, our dear professor seems to have found one. What an incredible way to solve this problem! I had no clue nor have I seen such kind of a solution before!😱🙏
Just for everyone’s information, this is called a 5x5 magic square in Math. There’s a specific algorithm to complete it for any given number. That’s why you can see the boy is filling out the square in a specific order. Everyone can fill it up easily with a little bit training. If you are interested in this, you can Google the algorithm. There’s also more than one way to fill the square.
There are similar examples - cases, like as "19" in the box instead of 21 and a sum of "155". The critical point is to use a unique number in each box! isn't it so? (Szymon Wojenka used same numbers in boxes) Thanks Emmanuil Kanavos
What do you think about mine? I found another possible way to solve that. I'm curious about any other capabilities.
(first row) --> 33 39 21 39 33,
(second row) --> 27 33 45 33 27,
(third row) --> 45 21 33 21 45,
(fourth row) --> 27 33 45 33 27,
(fifth row) --> 33 39 21 39 33,
No reputations sir
Well done! But may be an untold condition is that every number has to be unique. So, since all your diagonal elements are the same, perhaps that is why it's not considered although the professor has not replied as yet so couldn't say for sure. But again well done! 👏👏👏😇
Also since there are more variables than equations, hence infinitely many solutions is bound to exist in which case you may find n number of combinations of numbers to satisfy your conditions. But as they say, there's always a method to madness, our dear professor seems to have found one. What an incredible way to solve this problem! I had no clue nor have I seen such kind of a solution before!😱🙏
@@imonkalyanbarua Existen millones de soluciones. Si te dan más datos si existiría una solución con todas sus traslaciones o giros correspondientes
Just for everyone’s information, this is called a 5x5 magic square in Math. There’s a specific algorithm to complete it for any given number. That’s why you can see the boy is filling out the square in a specific order. Everyone can fill it up easily with a little bit training. If you are interested in this, you can Google the algorithm. There’s also more than one way to fill the square.
Professor Sir it is Amazing.
Really a brain work than Magic
How did you choose the number twenty-one at first?
Wow that was amazing love your videos
understand the process, trial and error would have taken forever, great challenge
There are similar examples - cases, like as "19" in the box instead of 21 and a sum of "155". The critical point is to use a unique number in each box! isn't it so? (Szymon Wojenka used same numbers in boxes) Thanks Emmanuil Kanavos
Why u use this diagonal system?
Nice one anyway
I learn how to built magic squares from TV, when I was 8 years old. 3x3, 4x4, etc.
How to find 21?
What kind of sorcery is this! 🤯😱
amazing tricks of math....
Thanks
Can you tell mathematics of this trick, because one could do easilyat first without knowing this trick.
Thankyou so much sir😊
like the video!
35 28 21 44 37
36 34 27 25 43
42 40 33 26 24
23 41 39 32 30
29 22 45 38 31 (Reflection)
good
There is no rule by this rule.
Kaedah Siam vs Kaedah Melayu
Hee?😟😲🙁