The syllabus and calendar are in the corresponding Canvas course on pipeline

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- Homework #0
- Homework #1 | Matlab notes
- Homework #2 | Matlab notes
- Homework #3 | Matlab notes
- Homework #4 | Matlab notes
- Homework #5 | Matlab notes
- Homework #6 | Matlab notes
- Homework #7 | Matlab notes
- Homework #8 | Matlab notes
- Homework #9 | Matlab notes

- Lec #0: Motivation Blank Notes | Completed Notes

- Test #1 Material
- Lec #1: Review of Vectors Blank Notes | Completed Notes
- Lec #2: Gaussian Elimination Blank Notes | Completed Notes
- Lec #3: Independent Vectors Blank Notes | Completed Notes
- Lec #4: Matrices and Operations on Them Blank Notes | Completed Notes
- Lec #5: Invertible Matrices Blank Notes | Completed Notes
- Lec #6: LU Factorization Blank Notes | Completed Notes
- Lec #7: Transposes Blank Notes | Completed Notes
- Lec #8: Null Space of a Matrix Blank Notes | Completed Notes
- Lec #9: Vector Subspaces Blank Notes | Completed Notes

- Test #2 Material
- Lec #10: The General Solution for Ax = b Blank Notes | Completed Notes
- Lec #11: Fundamental Spaces, Basis, Dimension Blank Notes | Completed Notes
- Lec #12: Orthogonality and FTLA Blank Notes | Completed Notes
- Lec #13: FTLA Application: Circuits Blank Notes | Completed Notes
- Lec #14: Projection onto C(A) Blank Notes | Completed Notes

- Test #3 Material
- Lec #15: Regression Blank Notes | Completed Notes
- Lec #16: QR Factorization Blank Notes | Completed Notes
- Lec #17: Fourier Series Blank Notes | Completed Notes
- Lec #18: Properties of Determinants Blank Notes | Completed Notes
- Lec #19: Cofactors and Consequences Blank Notes | Completed Notes
- Lec #20: Determinant Applications Blank Notes | Completed Notes
- Lec #21: Eigenvalues and Eigenvectors Blank Notes | Completed Notes

- Test #4 Material
- Lec #22: Diagonalization Blank Notes | Completed Notes
- Lec #23: Markov Matrices Blank Notes | Completed Notes
- Lec #24: Systems of Differential Equations Blank Notes | Completed Notes
- Lec #25: Spectral Theorem Blank Notes | Completed Notes
- Lec #26: Positive Definite Matrices Blank Notes | Completed Notes
- Lec #27: SVD and Pseudoinverse Blank Notes | Completed Notes

- Final Exam Material includes Lecture #1 to #27 AND Lec #28 and #29.
- Lec #28: Linear Transformations Blank Notes | Completed Notes
- Lec #29: Change of Basis Blank Notes | Completed Notes