MATH 3321
Engineering Mathematics
1.
Introduction to
Differential Equations
1.1 Basic Terminology
1.2 n-Parameter
Family of Solutions; General Solution; Particular Solution
1.3 Initial-Value Conditions; Initial-Value
Problems
2.
First Order
Differential Equations
2.1
Linear Equations
2.2
Separable Equations
2.3
Some Applications
2.4
Direction Fields; Existence and Uniqueness
2.5
Some Numerical Methods*
3. Second Order Linear Differential Equations
3.1
Introduction; Basic Terminology and Results
3.2
Homogeneous Equations
3.3
Homogeneous Equations with Constant Coefficients
3.4
Nonhomogeneous Equations
3.5
Nonhomogeneous Equations with Constant
Coefficients; Undetermined Coefficients
3.6
Vibrating Mechanical Systems
4.
4.1
Introduction
4.2
Basic Properties of
4.3
Inverse
4.4
Applications to Discontinuous Functions
4.5
Initial-Value Problems with Piecewise
Continuous Nonhomogeneous Terms
5. Linear Algebra
5.1
Introduction
5.2
Systems of Linear Equations; Some Geometry
5.3
Solving Systems of Linear Equations
5.4
Solving Systems of Linear Equations, Part 2
5.5
Matrices and Vectors
5.6
Square Matrices; Inverse of a Matrix and
Determinants
5.7
Vectors; Linear Dependence and Linear
Independence
5.8
Eigenvalues and Eigenvectors
6.1 Higher-Order
Linear Differential Equations
6.2 Systems
of Linear Differential Equations
6.3
Homogeneous Systems
6.4
Homogeneous Systems with Constant Coefficients
6.5
Nonhomogeneous Systems
6.6
Some Applications
* Optional Section