The min delta choice is very helpful in places where we have two or more functions which we want to combine somehow in the limit. I remember you did this in the f+g is continuous video as well. The choice of delta makes sense because then both functions' conditions will be satisfied as the region on the real line covered by a smaller delta is covered by a larger delta. So it's like letting the "strictness" of the limit be same for one function and reducing the strictness for others (as their delta is now reduced)
Thank you so much for the proof! It would be great a video for the proof of the limit of a composite function theorem! There's no rigorously information about that in UA-cam! ¡Saludos, Dr. πm!
Delta Epsilon always is hard for me to understand so bear with me for a moment. How do the statements involving delta imply the statements involving epsilon. I know that this goes back to how limits work fundamentally but I still don't understand it fully. If you could recommend a good video on delta epsilon I would appreciate it thanks
@@martinsanchez-hw4fi Yes, the carabinieri are a type of policemen who, at least in the collective imagination, accompany the arrested people two at a time to the police station, one on each side. So the idea is that f and h are the two carabinieri accompanying g to its limit value. Of course it's a jargon name, a kind of nickname, it's not the name it's officially called in the books.
I was so lost from 0:06 to 0:15
Lol! Me too
Me too
my lungs
0:45 I swear i thought you were gonna say "The bluetooth device is ready to pair" 😂😂
"Der Einschnürungssatz" . one of the most German words i heard as a German xD
"Teorema del Sandwich", Gracias por el video. Sus presentaciones son realmente claras y precisas.
The min delta choice is very helpful in places where we have two or more functions which we want to combine somehow in the limit. I remember you did this in the f+g is continuous video as well. The choice of delta makes sense because then both functions' conditions will be satisfied as the region on the real line covered by a smaller delta is covered by a larger delta. So it's like letting the "strictness" of the limit be same for one function and reducing the strictness for others (as their delta is now reduced)
The one dislike is from the function G cuz it didn’t want to be squeezed
Hahahaha
Really great video. The proof itself is really easy and you presented it very well. Thank you very much for that!
U are such a good teacher, ur students must be proud of u. U explain math so nicely 😀😀
Thanks for the great video! As always they're fantastic!
Thank you 😊
you're my hero.
Thanks for the proof, sir
Finally got it and gave myself a squeeze
So so gr8 Dr payem
thank you sir
Thank you so much for the proof! It would be great a video for the proof of the limit of a composite function theorem! There's no rigorously information about that in UA-cam! ¡Saludos, Dr. πm!
Check out my video: Composition is continuous
Dr Peyam Gracias!
Delta Epsilon always is hard for me to understand so bear with me for a moment. How do the statements involving delta imply the statements involving epsilon. I know that this goes back to how limits work fundamentally but I still don't understand it fully. If you could recommend a good video on delta epsilon I would appreciate it thanks
Check out the playlist!
Great video sir.
awesome.it is really very helpful
is there anything like the squeeze theorem for continuity and uniform continuity?
That was a great hint I got for the proof for seuences. However, how do we know that the epsilon are the same for h(x) and f(x)?
Because epsilon is arbitrary, it’s ok to have the same epsilon for both, it’s the delta that’s different
Thanks a lot sir
"Teorema dei due carabinieri" in Italian
For real?
@@martinsanchez-hw4fi Yes, the carabinieri are a type of policemen who, at least in the collective imagination, accompany the arrested people two at a time to the police station, one on each side. So the idea is that f and h are the two carabinieri accompanying g to its limit value. Of course it's a jargon name, a kind of nickname, it's not the name it's officially called in the books.
@@VideoFusco that is a very cool name.
So great mate, ;-)
Dr Peyam you should do an integration bee kinda competition with blackpenredpen
that is the delta epsilon proof... not squeeze theorem?
That is the epsilon delta proof of the squeeze theorem
Teorema de sanduíche, famoso ksksk
I call this sandwich theorem
Wooooow 0 dislike
Face this text to the mirror.
ε = Γ\15