We give the definition of a ring homomorphism as well as some examples. www.michael-penn.net www.researchgate.net/profile/... www.randolphcollege.edu/mathem...
This guy is freaky bad-a. He is know his stuff, and I LOOVE the way he explains it. I understand it very well now. Thank you Mike! Keep up the good work in explaining it, and I love the way you present yourself. Don't ever change anything.
Hey thank you for posting this! There is something called a K-algebra ( I don't know the real name in english but it's called a K-algèbre in french) it's the combination of a vector space and a ring (like the space of matricies, you think you will talk about it someday? Great video again ^^
I will cover a bit about k-algebras. These videos are for a course I am teaching and once I am done covering the course material I plan to make some "extra" videos on this topic.
This guy is freaky bad-a. He is know his stuff, and I LOOVE the way he explains it. I understand it very well now. Thank you Mike! Keep up the good work in explaining it, and I love the way you present yourself. Don't ever change anything.
Very helpful videos. Thank you so much!!
At 11:03...not 5-i but 6-i. One thing Michael has to learn is not to rush so much. This causes many of his tiny mistakes.
Hey thank you for posting this! There is something called a K-algebra ( I don't know the real name in english but it's called a K-algèbre in french) it's the combination of a vector space and a ring (like the space of matricies, you think you will talk about it someday? Great video again ^^
I will cover a bit about k-algebras. These videos are for a course I am teaching and once I am done covering the course material I plan to make some "extra" videos on this topic.
@@MichaelPennMath okay I understand!! Looking forward to your next videos !!
Thanks!
You are the best
I love you.
Give an example of a ring homomorphism
f: R S such that S has an identity element
but R does not.