The Field of Fractions
In this video, we discuss, with constructive proof, the field of fractions for an arbitrary integral domain. The notion of a prime field is also introduced. This is lecture 15 (part 1/1) of the lecture series offered by Dr. Andrew Misseldine for the course Math 4230 - Abstract Algebra II at Southern Utah University. A transcript of this lecture can be found at Dr. Misseldine's website or through his Google Drive at: https://drive.google.com/file/d/1UyZe... This lecture is based upon Section 18.1 of Abstract Algebra: Theory and Applications (http://abstract.ups.edu/) by Tom Judson. Please post any questions you might have below in the comment field and Dr. Misseldine (or other commenters) can answer them for you. Please also subscribe for further updates.
Field of fractions, Noetherian rings 1
The Oldest Unsolved Problem in Math
Taylor series | Chapter 11, Essence of calculus
The field of fractions
We're 99.9% sure this pattern is true, but no one can prove it
Gil Strang's Final 18.06 Linear Algebra Lecture
The Integral Explained Better Than School Ever Did
The Riemann Hypothesis, Explained
When CAN'T Math Be Generalized? | The Limits of Analytic Continuation
A Tribute to Euler - William Dunham
Billionaire's WARNING: I'm SELLING. The Crash Is Already Here!
Abstract Algebra | The field of fractions of an integral domain.
Fraction Fields
But what is a Laplace Transform?
Why Science Doesn’t Make Laws Anymore
The Integral That Changed Math Forever
Intro To Math Proofs (Full Course)
The Strange Math That Predicts (Almost) Anything
Прохоров Ю.Г. - Алгебра. Часть 1 - 17. Поле частных для многочленов
