| Date |
Sections from Lay |
Sections from Bretscher |
Topics |
Prerequisite Skills |
Student Learning Outcomes
|
| Week 1
|
1.1 and 1.2
|
1.1
|
Introduction to Linear Systems of Equations
|
|
- Using elimination to find solutions of linear systems
- The Geometrical interpretation of solutions to linear systems
|
| Week 2
|
1.3, 1.4, and 1.5
|
1.2 and 1.3
|
Vectors and Matrices
Gauss-Jordan Elimination
|
|
- Vectors and vector addition
- Matrix notation
- The Gauss-Jordan method for solving a linear system of equation
- The rank of a matrix
- Sums of Matrices
- The product Ax (where A is a matrix and x is a vector)
- The Dot product
- Linear Combinations
|
| Week 3
|
2.1
|
2.3
|
Matrix Algebra and Matrix Multiplication
|
|
- Matrix Operations
- Matrix products by columns
- Matrix products using the dot product
|
| Week 3
|
2.2 and 2.3
|
2.4
|
The Inverse of a Linear Transformation
|
|
- The Identity matrix
- The Inverse of a Matrix
- Various characterizations for an invertible matrix
|
| Week 4
|
1.8 and 1.9
|
2.1
|
Introduction to Linear Transformations
|
|
- Linear Transformations
- Requirements for a transformation to be linear
|
| Week 5
|
1.7, 2.8, and 2.9
|
3.2
|
Subspaces of Rⁿ and Linear Independence
|
|
- Definition of a subspace of Rⁿ
- Defining linear independence for a set of vectors
- Definition of a basis for a subspace
|
| Week 6
|
4.1
|
4.1
|
Introduction to Vector Spaces
|
|
- Definition of a vector space(or linear space)
- Subspaces of vector spaces
- Linear combinations and bases for vector spaces
- Examples of vector spaces of functions
|
| Week 6
|
4.2
|
3.1
|
The Column Space and Nullspace of a Linear Transformation
|
|
- The image (or column space) of a linear transformation
- The kernel (or nullspace) of a linear transformation
- Properties of the kernel
|
| Week 7
|
4.3 and 4.5
|
3.3 and 4.1
|
The Dimension of a Vector Space
|
|
- The number of vectors in a basis of Rn
- Dimension of a subspace in Rⁿ
- The dimension of a vector space
- The dimension of the nullspace (or kernel) and the column space (or image)
- The Rank-nullity Theorem
|
| Week 8
|
6.1 and 6.2
|
Appendix A and 5.1
|
Dot Products and Orthogonality
|
|
- Orthogonal vectors
- Length (or magnitude or norm) of a vector
- Unit vectors
- Orthonormal vectors
- Orthogonal projections
- Orthogonal complements
- Cauchy-Schwarz inequality
- The angle between vectors
|
| Week 9
|
6.3 and 6.4
|
5.2 and 5.3
|
Orthonormal Bases and the Gram-Schmidt Process
Orthogonal Transformations and Orthogonal Matrices
|
|
- Orthogonal transformations
- Orthonormal Bases
- Orthogonal matrices
- The transpose of a matrix
- The Gram-Schmidt Process
- QR factorization
|
| Week 10
|
6.5 and 6.6
|
5.4
|
The Least-squares Solution
|
|
- The orthogonal complement of the image is equal to the left nullspace (or kernel of the transpose) for all matrices
- The least-squares solution for a linear system
- Data fitting using the least-squares solution
|
| Week 11
|
3.1 and 3.2
|
6.1 and 6.2
|
Introduction to Determinants
Cramer's Rule
|
|
- The determinant of 2 by 2 and 3 by 3 matrices
- The determinant of a general n by n matrix
- The determinant of a triangular matrix
- Properties of the determinant
- The determinant of the transpose
- Invertibility and the determinant
|
| Week 12
|
3.3
|
6.3
|
The Geometric Interpretation of the Determinant
|
|
- Cramer's Rule
- The adjoint and inverse of a matrix
- The area of a parallelogram and the volume of a parallelepiped
|
| Week 13
|
The beginning of 5.3 as well as the sections 5.1 and 5.2
|
7.1, 7.2 and the beginning of 7.3
|
Eigenvalues and Eigenvectors
|
|
- The requirement for a matrix to be diagonalizable
- Definition of an eigenvector
- The characteristic equation used to find eigenvalues
- Eigenvalues of a triangular matrix
- Eigenspaces for specific eigenvalues
|
| Week 14
|
5.3 and 5.4
|
3.4 and 7.3
|
Diagonalization of Matrices
|
|
- Similar matrices
- Diagonalization in terms of linearly independent eigenvectors
- Algebraic and geometric multiplicity for a specific eigenvalue
- The strategy for diagonalization
|
