MP4 | Video: h264, 1280×720 | Audio: AAC, 48 KHz, 2 Ch
Genre: eLearning | Language: English + .srt | Duration: 45 lectures (3 hour, 6 mins) | Size: 3.51 GB
-https://eshoptrip.com
How to understand Group Theory with Sets and Operations?
What you’ll learn
Abstract Algebra
What is Set?
What is Closure Property?
What is Associative Property?
What is Identity Property?
What is Inverse Property?
What is Commutative Property?
Definition of group: When Set is called as Group?
What is Sub group?
Definition of Order of the group
What does it mean by Commutative group?
All Theorems Statements on Cyclic Group
All Theorems Statements on Abilean Group
Quick revision by ing Handwritten notes and Flash cards
What is Ring?
What does it mean by Ring with Unity?
What is Commutative Ring?
Definition of Ring with Zero Divisors
Requirements
Be able to understand set definition
Be able to understand types of numbers
Description
Abstract Algebra|Group Theory|Ring Theory
Update on 15th June 2020: New Video lectures and handwritten flash cards are uploaded
Abstract Algebra with handwritten images like as flash cards in Articles.
Dear students, Algebra is a university level Math topic.B.Sc level students, M.Sc level students study Abstract Algebra.
Set theory plays play key role to understand abstract algebra.
In this course, we will discuss about the definition of set,
What is Binary Operation,
What is Closure property,
What is Associative Property,
What is Identity property,
What is Inverse property,
What is property,
the definition of group with example,
the definition of sub group with example,
The definition of order of the group and order other element in a group
The definition of commutative Group.
Abstract Algebra:Ring Theory
What is Ring?
What does it mean by Ring with Unity?
What is Commutative Ring?
Definition of Ring with Zero Divisors
These concepts are very important to understand ring theory, vector spaces.
More videos will be uploaded soon
Thank you for your support
Abstract Algebra|Group Theory|Ring Theory
Who this course is for:
Begginers of Bachelors Degree Students
College Level Students
University Level Students
-https://eshoptrip.com
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