CHAPTER 1 FIRST ORDER EQUATIONS
1-1 Introduction
1-2 Variables separate
1-3 Geometric interpretation of first order equations
1-4 Existence and uniqueness theorem
1-5 Families of curves and envelopes
1-6 Clairaut equations
CHAPTER 2 SPECIAL METHODS FOR FIRST ORDER EQUATIONS
2-1 Homogeneous equationsβsubstitutions
2-2 Exact equations
2-3 Line integrals
2-4 First order linear equations β integrating factors.
2-5 Orthogonal families
2-6 Review of power series
2-7 Series solutions
CHAPTER 3 LINEAR EQUATIONS
3-1 Introduction
3-2 Two theorems on linear algebraic equations
3-3 General theory of linear equations
3-4 Second order equations with constant coefficients
3-5 Applications
CHAPTER 4 SPECIAL METHODS FOR LINEAR EQUATIONS
4-1 Complex-valued solutions
4β2 Linear differential operators
4-3 Homogeneous equations with constant coefficients
4-4 Method of undetermined coefficients
4-5 Inverse operators
4-6 Variation of parameters method
CHAPTER 5 THE LAPLACE TRANSFORM
5-1 Review of improper integrals
5-2 The Laplace transform
5-3 Properties of the transform
5-4 Solution of equations by transforms
CHAPTER 6 PICARDβS EXISTENCE THEOREM
6-1 Review
6-2 Outline of the Picard method
6-3 Proof of existence and uniqueness
6-4 Approximations to solutions
CHAPTER 7 SYSTEMS OF EQUATIONS
7-1 Geometric interpretation of a system
7-2 Other interpretations of a system
7-3 A system equivalent to M(x, y) dx + N(x, y) dy = 0.
7-4 Existence and uniqueness theorems
7-5 Existence theorem for nth order equations
7-6 Polygonal approximations for systems
7-7 Linear systems
7-8 Operator methods
7-9 Laplace transform methods
IN D E X