Like aufklarung (enlightenment)!...best presentation I have seen on basic conception of manifolds, now I begin to grasp the meaning, I can contemplate theory...
I think it definitely works for finitely many; not sure if you'd run into ordering issues in infinite case but I think that's possible too: like just map each circle to [a, a+1) for whole numbers a
This is a genius explanation...by far the most intuitive I’ve ever found
Loved the explanation. The foundations are set right with this brilliant lecture on Manifolds.
I'm lucky to have stumbled across this. Really clarified things. Thanks!
thank you. I had been wondering about the formal definition and some intuition of what it meant for a while.
Thank you so much sir 🙏🙏
thanks for this doctor!
Thanks for the explanation.
An excellent introduction.
Thank you. It was very helpful
Like aufklarung (enlightenment)!...best presentation I have seen on basic conception of manifolds, now I begin to grasp the meaning, I can contemplate theory...
Beautiful, very practical explanation
Great teaching!
great teaching!
Simply excellent 👌. THANKS
Thank you for the good explenation
Whut this reaction was 2 years ago lol
I ended up with manifolds while on the Shimura-Taniyama-Weil conjecture. Clarified basic concepts but I hoped to learn about Reimann surfaces.
Thanks
I like it
cool
Just Wow
Sphere with plane?
nice sir thanks alot...
Why are there only two circles on a plane r^2 and not infinitely many ? I am not a mathematician, just asking cause I'm curious.
I think it definitely works for finitely many; not sure if you'd run into ordering issues in infinite case but I think that's possible too: like just map each circle to [a, a+1) for whole numbers a
Which book is his reference?
Спасибо мой ребенок теперь лучше рисует круги
cool