Does anyone know a good place to learn about sequence convegence proofs of the form $$(\forall \epsilon 0)(\exists N \in \mathbb{N})(\forall n \in \mathbb{N})(nN = |x_{n} - L|

Question

Does anyone know a good place to learn about sequence convegence proofs of the form $$(\forall \epsilon> 0)(\exists N \in \mathbb{N})(\forall n \in \mathbb{N})(n>N => |x_{n} - L| <\epsilon)$$? I tried to find a MIT video but I could not.

anonymous · Answer

Have you tried the MIT group here? Or! Paul's notes or Khan academy.

zzr0ck3r · Answer

Any time I try to find it all I get is stuff about ratio test, comparison test....

zzr0ck3r · Answer

MIt group here?

anonymous · Answer

Yes! Hold on and I'll get you the link. :)

anonymous · Answer

http://openstudy.com/study#/groups/MIT%2018.02%20Multivariable%20Calculus%2C%20Fall%202007 (OCW) http://openstudy.com/study#/groups/OCW%20Scholar%20-%20Multivariable%20Calculus http://openstudy.com/study#/groups/MIT%2018.01%20Single%20Variable%20Calculus%20%28OCW%29 Do you think any of these will help you?

zzr0ck3r · Answer

So its the same deal you just ask a question?

anonymous · Answer

Yes sir. :) It will take a while longer for answers in those groups because there are not as many users, but they are like demi-Einsteins. 
If you want to look through more groups, there are blue words in the upper left that say "Find more subjects" and we have a lot you can look through. :)

anonymous · Answer

http://science.kennesaw.edu/~plaval/math4381/seqlimthm.pdf I hope that will help you !

zzr0ck3r · Answer

great ty both