Vous etes l'un des professeurs rares qui sait comment etre rigolo mais serieux et educatif... Excellent title, pardon my probably inaccurate school level french. Speaking of Cauchy, do you have a video on the formal (w.r.t axiomatic set theory, ZF, like how the integers are constructed by an equivalence relation on the naturals) construction of the real numbers? The wikipedia article is not easy for me to understand.
Hahaha excellent ce titre ! Parfois, les francophones font de l'humour un peu particulier, par exemple la série Kaamelott est difficile à comprendre pour des étrangers. Et inversement, en tant que français je ne comprends pas l'humour anglais xD.
does this build to analytic continuations of functions? your "what is a continuous extension?" video and this one has me excited I'll finally understand why riemann-zeta(-1) = -1/12
It kinda stops here actually, since the playlist is now complete, but I think now you should be able to understand analytic continuation. It’s just a continuous extension that makes the function differentiable/analytic
@@drpeyam well, thank you for wetting my interest. so many questions but i do know how to start learning the answers. you're just so good at organizing the big ideas so the connections seem obvious.
Wow, not gonna lie, the title made me laugh unlike I ever have for some time !!! XXX DDDD Love, from Vaudreuil-Dorion, just South-West from the Montreal island
Next time: Cauchy's Theorem from Complex Analysis and its amazing applications to complex integrals, calculus of residues and all that mumble-jumble; Cauchy's test for infinite series!!
Respected Sir, how to check either f is uniform continuous function or not. Let f: [-1,1] to R define by f(x) = x sin(1/x) , x is non zero real number and f(x)= o , x= 0
Sorry sir I can not understand what you want to say. Also i have watched all your videos on Uniform continuity . So may you suggest me what suitable method apply and also may you give hint for check that function is uniform continuous or not.
As someone who speak french and write in french, I wasn't even aware that there was supposed to be a space between the last word of a sentence and a question mark... Well, we learn everyday I suppose e.e
I love your videos peyam, et le titre m'a fait beaucoup rigolé ! Hello from france ! :D
Hahaha merci!!!
The title instantly becomes one of my favorite puns 😄
This explains several lectures from my analysis class in a perfect 13 minutes and 41 seconds. Dr Peyam is S tier
Honnêtement, c'est l'un des jeux de mots qui m'a le plus fait rire ces dernières semaines, mes félicitations!
Vous etes l'un des professeurs rares qui sait comment etre rigolo mais serieux et educatif... Excellent title, pardon my probably inaccurate school level french. Speaking of Cauchy, do you have a video on the formal (w.r.t axiomatic set theory, ZF, like how the integers are constructed by an equivalence relation on the naturals) construction of the real numbers? The wikipedia article is not easy for me to understand.
Merci!!!! 😁 Yes, check out my playlist on the Real Numbers. There’s some video on Cauchy construction of R
Hahaha excellent ce titre !
Parfois, les francophones font de l'humour un peu particulier, par exemple la série Kaamelott est difficile à comprendre pour des étrangers.
Et inversement, en tant que français je ne comprends pas l'humour anglais xD.
As a french, I approve the title 👌
Félicitations pour ce bon jeu de mots qu'aucun Français n'aurait tenté.
Si, c'est une "blague" récurrente. C'était quand même une bonne idée de titre.
@@darthmath1071 pourtant, j'adore les maths et c'est la première fois que j'entendais ce jeu de mots. 😅
Peyman , you're 👍
Does it apply on Cauchy's criteria for series ????????
does this build to analytic continuations of functions? your "what is a continuous extension?" video and this one has me excited I'll finally understand why riemann-zeta(-1) = -1/12
It kinda stops here actually, since the playlist is now complete, but I think now you should be able to understand analytic continuation. It’s just a continuous extension that makes the function differentiable/analytic
@@drpeyam well, thank you for wetting my interest. so many questions but i do know how to start learning the answers. you're just so good at organizing the big ideas so the connections seem obvious.
Wow, not gonna lie, the title made me laugh unlike I ever have for some time !!! XXX DDDD
Love, from Vaudreuil-Dorion, just South-West from the Montreal island
Salut!!! 😁
Next time: Cauchy's Theorem from Complex Analysis and its amazing applications to complex integrals, calculus of residues and all that mumble-jumble; Cauchy's test for infinite series!!
Excellent titre 😄
What an amazing title!!!!😂😂
Best title ever
Le title est tres bon🤣🤣🤣.
Sorry, im not good at french😅
I don't know why, but this somehow became a meme in my high school 3 years ago.
The title tho ahahahah
Respected Sir, how to check either f is uniform continuous function or not.
Let f: [-1,1] to R define by
f(x) = x sin(1/x) , x is non zero real number and f(x)= o , x= 0
Check out the playlist
Sorry sir I can not understand what you want to say. Also i have watched all your videos on Uniform continuity . So may you suggest me what suitable method apply and also may you give hint for check that function is uniform continuous or not.
Yes, watch all the videos in my playlist and you’ll find the answer
What does the title mean
Cest soir !
Excellent jeu de mot 😂
Acchktually, in French, there is a space between the last word of the sentence and the question mark.
That's how I recognise french people in youtube comments :P
@@mudkip_btw Yeah most of them are too stupid !
No one talks about this in school, so thank you.
As someone who speak french and write in french, I wasn't even aware that there was supposed to be a space between the last word of a sentence and a question mark... Well, we learn everyday I suppose e.e
Hellooooooooo,Its Peyman ,they say maths supposed to heel you ..............
👍👍👍👍👍👍
je veux cauchyer toujours
...ce soir?
C'est soir!!! XD
In the subtitles Cauchy became co she
Yo no hables español
It is not kosher😃😆
Voulez-vous coucher avec moi?
He reminds me of Putin 🤣
:D
What’s the joke in the title?
- Voulez vous Cauchy avec moi? «Do you want to Cauchy with me?»
- Voulez vous coucher avec moi? «Do you want to sleep with me?»
@@cansomeonehelpmeout amazing I love it
Thanks
@@cansomeonehelpmeout I know a little bit of French, but I wasn't entirely sure if he meant for Cauchy to sound like coucher, mdr