| Week | Monday | Wednesday | Thursday | Friday |
| 0 | Sep 26
No homework due |
Sep 27: 1.1,1.2
Review of vector spaces |
||
| 1 | Sep 30: 1.3
Subspaces |
Oct 2: 1.4, 1.5
Linear systems; Linear independence |
Oct 3
No homework due |
Oct 4: 1.5, 1.6
Linear independence; Bases |
| 2 | Oct 7: 1.6
Dimension |
Oct 9: 1.6
Lagrange interpolation |
Oct 10
Assignment 1 due |
Oct 11: 2.1
Linear transformations |
| 3 | Oct 14: 2.1
Null spaces |
Oct 16: 2.1,2.2
Range; co-ordinate bases |
Oct 17
Assignment 2 due |
Oct 18: 2.2,2.3
Matrix representation; composition |
| 4 | Oct 21: 2.3
Matrix multiplication |
Oct 23: 2.4
Invertibility |
Oct 24
Assignment 3 due |
Oct 25: 2.4
Isomorphisms |
| 5 | Oct 28: 2.5
Co-ordinate change |
Oct 30
Leeway/Review |
Oct 31
Assignment 4 due |
Nov 1
Midterm |
| 6 | Nov 4: 3.*-4.*
Review of matrices |
Nov 6: 4.4
Review of determinants |
Nov 7
Assignment 5 due |
Nov 8: 5.1
Diagonal matrices |
| 7 | Nov 11
Veteran's day |
Nov 13: 5.1
Eigenvalues and eigenvectors |
Nov 14
Assignment 6 due |
Nov 15: 5.2
Diagonalization |
| 8 | Nov 18: 5.2
Characteristic polynomials |
Nov 20
Leeway |
Nov 21
Assignment 7 due |
Nov 22: 6.1
Inner products |
| 9 | Nov 25: 6.1,6.2
Norms; orthogonal bases |
Nov 27: 6.2
Gram-Schmidt orthogonalization; complements |
Nov 28
Thanksgiving |
Nov 29
Thanksgiving |
| 10 | Dec 2: 6.3
Adjoints |
Dec 4: 6.4
Normal and self-adjoint operators |
Dec 5
Assignment 8 due |
Dec 6
Leeway/Review |
The final is at Tuesday, Dec 10, 8-11 a.m (exam code 06), at a room to be announced.
Note this schedule may change slightly as the quarter progresses, due to lecture overruns or other Acts of God.