∃! Sveta writes "Slogan" Take a direct sum Use the 3rd Sylow Thm Define a group action Sveta gives example #0 Prove something is torsion- free Prove surjectivity Use 1st Isom Thm Sveta mentions that we only work with comm. rings Sveta writes "EXR" in red Sveta writes the symbol for proper subset Say that Zorn's Lemma is logically AC Sveta writes "R- module" Adjoin x to a ring Find counterexample Prove injectivity Prove kernel = 0 Say that one element divides another Prove a group is cyclic Prove a group is Abelian Sveta says "finitely generated" Prove a biconditional Prove a group is not Abelian ∃! Sveta writes "Slogan" Take a direct sum Use the 3rd Sylow Thm Define a group action Sveta gives example #0 Prove something is torsion- free Prove surjectivity Use 1st Isom Thm Sveta mentions that we only work with comm. rings Sveta writes "EXR" in red Sveta writes the symbol for proper subset Say that Zorn's Lemma is logically AC Sveta writes "R- module" Adjoin x to a ring Find counterexample Prove injectivity Prove kernel = 0 Say that one element divides another Prove a group is cyclic Prove a group is Abelian Sveta says "finitely generated" Prove a biconditional Prove a group is not Abelian
(Print)
∃!
Sveta writes "Slogan"
Take a direct sum
Use the 3rd Sylow Thm
Define a group action
Sveta gives example #0
Prove something is torsion-free
Prove surjectivity
Use 1st Isom Thm
Sveta mentions that we only work with comm. rings
Sveta writes "EXR" in red
Sveta writes the symbol for proper subset
Say that Zorn's Lemma is logically AC
Sveta writes "R-module"
Adjoin x to a ring
Find counterexample
Prove injectivity
Prove kernel = 0
Say that one element divides another
Prove a group is cyclic
Prove a group is Abelian
Sveta says "finitely generated"
Prove a biconditional
Prove a group is not Abelian
