Class Syllabus for Math 338 Spring 1998
Text: Introductory Linear Algebra 6th edition, by Bernard Kolman
Professor: John Verzani
This is suggested homework to accompany the lectures. Time during class will be made to go over these homework questions. It is expected that you will work on these problems during or just after the material is covered in class. If changes are to be made they will be announced in class. Homework will not be collected or graded, however you all know that your performance in class will be related to the number of problems you try and make a serious effort on. There is a mixture of problems from computations, theoretical and MATLAB based.
Chapter 1. Linear Equations and Matrices:
| 1.1) | 6,10,14,15,20 | T4 | |
| 1.2) | 3,4,5,6 | T3 | |
| 1.3) | 5,6,9,16,18,24 | T6 | ML1,ML2,ML3,ML4,ML5,ML6 |
| 1.4) | 8,10,13,19 | T6 | |
| 1.5) | 1,2,6,8,11,15,27 | T7,T11 | ML1,ML3,ML13 |
| 1.6) | 3,5,9bc,11,16,18 | T5,T7 | ML1,ML3 |
Chapter 2. Determinants:
llll 2.1) & 8,9,10,11 & T5,T10 & ML3
2.2) & 1,2,3,8,14abc,16 & T1,T7 & ML2,ML5
2.3) & skip
Chapter 3. Vectors in $R^2$ and $R^n$:
| 3.1) | 1,2,6,12,15,19,21,25,26 | T8 | |
| 3.2) | 1,9,12,15,16,17,20,25,35 | T10 | ML7 |
| 3.3) | 1,4,5,7,10,13,15,19,21 | T8 | |
| 3.4) | 1,2,3,4 | ML1 | |
| 3.5) | 6,7 | ||
| 3.6) | 1,5,9,21 | T3,T5 |
Chapter 4. Real Vector Spaces:
| 4.1) | 1,2,3,4,11,17,20 | T2,T5 | |
| 4.2) | 1,2,5,6,8,14,18,22 | T3,T6,T12 | ML3,ML6 |
| 4.3) | 1,2,4,6,8,10,15 | T2,T3,T7 | |
| 4.4) | 1,4,6,11,26,30 | T1,T4,T7,t10,t14 | |
| 4.5) | 1,3,6,9,15,16 | T1 | ML1,ML2 |
| 4.6) | 1,2,4,9,13,16,17,26 | T4,T7,T12 | ML4 |
| 4.7) | 1,3,5,7,13,14,19 | ML4 | |
| 4.8) | 3,5,7,9,12 | T3,T5,T6 | ML2 |
| 4.9) | 1,2,4 | T3,T4 | ML1 |
Chapter 5. Eigenvalues and Eigenvectors:
| 5.1) | 4,5,6,7,8,12,13,17,20 | T2,T3,T4,T14 | ML1 |
| 5.2) | 2a,5,7,9,11,13 | T4,T8 | ML1 |
Chapter 6. Linear Transformations and Matrices:
| 6.1) | 1,3,5,17 | T3,T4 | |
| 6.2) | 1,3,5,10,17 | ||
| 6.3) | 1,2,3,4,5 |