Math 240 Section 003 - Fall 2007
Notes
Chapter 10
10.1/10.2
System of differential equations
Chapter 5
5.2
Method of Frobenius
5.1
Series solutions about ordinary points
Chapter 4
4.4
Other Laplace Properties
4.3
Translation Theorems
4.2
Inverse Laplace and transform of derivatives
4.1
Laplace Transform
Chapter 3
3.8
Springs
3.7
Nonlinear first order o.d.e.
3.6
Cauchy Euler
Chapter 2
2.5
Solving first order o.d.e by substitution
Chapter 9
9.17
Change of Variables
9.16
Divergence Theorem
9.15
Triple Integrals
9.14
Stokes' Theorem
9.13
Surface Integral
9.12
Green's Theorem
9.11
Double Integrals in Polar
9.10
Double Integrals
9.9
Independence of Path
9.8
Line Integrals
9.7
Divergence and Curl
9.1
Vector Functions
Chapter 8
8.12
Diagonalization
8.10
Orthogonal matrices
8.9
Powers
of a matrix
8.8
Eigenvalues / Eigenvectors
8.7
Cramer's Rule
8.6
Matrix inverse
8.4/8.5
Determinant
8.3
Rank
of a Matrix
8.2 Solving systems of equations by
Gaussian Elimination
8.2
Circuits
8.1
Matrix Introduction