AMS10 Course Website
Office Hours
Instructor: Tuesdays 3-5pm, 359B Baskin Eng. Office Hours for the week of June 4th are Friday 3-5pm
TA: Matthew Simms
AMS 10
AMS 10
Section Schedule
Location: MingOng computer lab 103
Mon 10am-12pm
Mon 12pm-2pm
Mon 2pm-4pm
Wed 11am-1pm
Wed 1pm-3pm
Bibliography:
[1] Saff and Sneider, Fundamentals of Complex Analysis with applications to Engineering and Science, third edition.
[2] Friedberg, Insel, and Spence, Linear Algebra, second edition.
[3] Chandrasekhariah and Debnath, Continuum Mechanics.
[4] Lipschutz and Lipson, Schaum's Outlines: Linear Algebra, third edition.
HW Statistics
Median | 25-75th percentile | |
HW1 | 76 | 68-88 |
HW2 | 84 | 64-96 |
HW3 | 92 | 80-100 |
HW4 | 84 | 76-100 |
Midterm
Final
Topics | Lecture Notes | Resources | Homework | ||
Week 1 |
Tuesday 4/3/18 |
Introduction to vectors and complex numbers | Lecture1.pdf |
[3]: 1.4 |
|
Thursday 4/5/18 |
Complex Numbers | Lecture2.pdf |
[1]: 1.1-1.5 http://www.stewartcalculus.com
|
(due 4/14/18) |
|
Week 2 |
Tuesday 4/10/18 |
Wrap up complex numbers, Introduction to systems of linear equations | Lecture3.pdf |
[4]: 3.1-3.5
|
|
Thursday 4/12/18 |
Elementary row operations, Echelon form, Triangular form, Introduction to Gaussian elimination | Lecture4.pdf |
[4]: 3.3, 3.5 |
(due 4/21/18) |
|
Week 3 |
Tuesday 4/16/18 |
Gaussian Elimination, Row canonical form |
Lecture5.pdf |
[4]:3.6, 3.7 |
|
Thursday 4/19/18 |
Matrix-vector product representation of a system of linear equations, Introduction to the identity matrix and matrix inverse | Lecture6.pdf |
[3]: 2.4.7 [2]:2.2 [4]: 3.9, 3.10 |
(due 4/28/18) |
|
Week 4 |
Tuesday 4/24/18 |
Matrix-matrix product, Calculating matrix inverse | Lecture7.pdf | [2]:pgs 141-144 | |
Thursday 4/26/18 |
Vector spaces, subspaces, linear dependence/independence | Lecture8.pdf |
[4]:4.4, 4.5,4.7 [2]: 1.2,1.3,1.5 |
(due 5/5/18) |
|
Week 5 |
Tuesday 5/1/18 |
spans, basis, dimension, matrix rank | Lecture9.pdf |
[4]:4.8,4.9 |
|
Thursday 5/3/18 |
Finding basis for column/row space, linear mappings, rank-nullity theorem | Lecture10.pdf |
[4]:4.9,5.1-5.5 |
(due 5/14/18) Solutions to Additional Review Problems.pdf |
|
Week 6 |
Tuesday 5/8/18 |
Computing basis for image and null space, Determinants, Coordinates and change of basis | Lecture 11 can be found in the team drive- invitations have been sent |
Determinants: [4]: Chapter 8 Change of Basis: [4]: 6.1-6.3 |
|
Thursday 5/10/18 |
Transformations, eigenvalues and eigenvectors | Lecture12.pdf | |||
Week 7 |
Tuesday 5/15/18 |
In Class Midterm: Only thing allowed is two sheets of notes front/back. Bring #2 pencil and red ParSCORE f-1712 scantron.
|
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Thursday 5/17/18 |
Properties of eigenvalues and eigenvectors used to compute them | Lecture13.pdf |
(due 5/26/18) |
||
Week 8 |
Tuesday 5/22/18 |
Calculating eigenvalues and eigenvectors | Lecture14.pdf | ||
Thursday 5/24/18 |
Markov Process (application), complex eigenvalue/eigenvector | Lecture15.pdf |
(due 6/2/18) |
||
Week 9 |
Tuesday 5/29/18 |
HW7 discussion, intro to dot product and norm | Lecture16.pdf | ||
Thursday 5/31/18 |
Lecture17.pdf | ||||
Week 10 |
Tuesday 6/5/18 |
6-5Lecture.pdf | |||
Thursday 6/7/18 |
Lecture19.pdf |
Course Syllabus