Galois Theory

Solutions to Exercises of the book

 Galois Theory

by Ian Stewart

Chapter 1: Classical Algebra

Chapter 2: The Fundamental Theorem of Algebra

Chapter 3: Factorisation of Polynomials

Chapter 4: Field Extensions

Chapter 5: Simple Extensions

Chapter 6: The Degree of an Extension

Chapter 7: Ruler-and-Compass Constructions

Chapter 8: The Idea Behind Galois Theory

Chapter 9: Normality and Separability

Chapter 10: Counting Principles

Chapter 11: Field Automorphisms

Chapter 12: The Galois Correspondence

Chapter 13: A Worked Example

Chapter 14: Solubility and Simplicity

Chapter 15: Solution by Radicals

Chapter 16: Abstract Rings and Fields

Chapter 17: Abstract Field Extensions

Chapter 18: The General Polynomial Equation

Chapter 19: Finite Fields

Chapter 20: Regular Polygons

Chapter 21: Circle Division

Chapter 22: Calculating Galois Groups

Chapter 23: Algebraically Closed Fields

Chapter 24: Transcendental Numbers

Chapter 25: What Did Galois Do or Know?