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