Linear Algebra I

330 LINEAR ALGEBRA I (3+0) 3 credits

Systems of linear equations; matrix algebra; vector spaces: linear independence, bases, dimension, vector subspace configuration; linear maps, their matrix representations and structure theorems. Prerequisite: MATH 283.

Spring 2005

Course Information

Instructor:: Eric Olson
email:: ejolson at unr.edu
Office:: MWF 10am Ansari Business Building AB 614 and by appointment.
Homepage:: http://fractal.math.unr.edu/~ejolson/330/
Text:: Gilbert Strang, Introduction to Linear Algebra, Third Edition, 2003, Wellesley-Cambridge Press.
Section:: 001 Math 330 Linear Algebra I; MWF 11:00-11:50am AB 206

Grading

    6 Quizzes                       10 points each (drop 1)
    6 Homework Assignments          10 points each (drop 1)
    Recitation/Participation        10 points
    2 Exams                         70 points each
    1 Final Exam                   100 points
    -------------------------------------------------------
                                   350 points total

Calendar

#   Date     Chapter     Topic
------------------------------------------------------------------------
1   Jan 19    1.1        Vectors and Linear Combinations
2   Jan 21    1.2        Lengths and Dot Products
3   Jan 24    2.1        Vectors and Linear Equations
4   Jan 26    2.2-2.3    Elimination Using Matrices

    Jan 27    Final date for adding classes; changing from letter grade 
              to S/U; changing from S/U to letter grade; changing from 
              audit to credit.  Final date for late registration and 
              paying registration fees; to receive 100 percent refund if 
              completely withdrawing from the university; to receive 
              refunds for dropping individual classes.

5   Jan 28    2.4-2.5    Matrix Operations and Inverse Matrices
6   Jan 31    2.6        Elimination and LU Factorization
7   Feb 2     2.7        Transposes and Permutations
8   Feb 4                Recitation 1 and Quiz 1
9   Feb 7     3.1        Spaces of Vectors
10  Feb 9     3.2        The Nullspace
11  Feb 11    3.3        The Rank and Row Reduced Forms
12  Feb 14    3.4        The Solution to Ax=b
13  Feb 16    3.5        Independence, Basis and Dimension 
14  Feb 18               Recitation 2 and Quiz 2

    Feb 21    Legal holiday. Offices closed. No classes.

15  Feb 23    3.6        Dimensions of the Four Subspaces 
16  Feb 25    3.6        ...continued
17  Feb 28               Recitation 3
18  Mar 2                Review
19  Mar 4                EXAM 1
20  Mar 7     4.1        Orthogonality of the Four Subspaces
21  Mar 9     4.2        Projections 
22  Mar 11    4.2        ...continued

              Final date for dropping classes.

23  Mar 14    4.3        Least Squares Approximations
24  Mar 16    4.4        Orthogonal Bases and Gram-Schmidt
25  Mar 18               Recitation 4 and Quiz 3
26  Mar 21    5.1        Properties of Determinants
27  Mar 23    5.2        Permutations and Cofactors
28  Mar 25               ...continued

    Mar 26    Spring break holiday. Offices open. No classes.

29  Apr 4     5.3        Cramer's Rule and Inverses
30  Apr 6                ...continued
31  Apr 8                Recitation 5 and Quiz 4
32  Apr 11               Review
33  Apr 13               EXAM 2 
34  Apr 15    6.1        Introduction to Eigenvalues
35  Apr 18    6.2        Diagonalizing a Matrix
36  Apr 20    6.4-6.5    Symmetric and Positive Definite Matrices
37  Apr 22               Recitation 6 and Quiz 5  
38  Apr 25    6.6        Similar Matrices
39  Apr 27    6.7        Singular Value Decomposition
40  Apr 29               SVD continued and Quiz 6
41  May 2                Review

    May 4     Prep day for final exams. Offices open. No classes

Final Exam

The final exam will be held for

Section 001 on Monday, May 9 from 9:45 to 11:45am in AB 206.

The exams for each section will be different. You must go to the final exam corresponding to the section you are enrolled in.

Equal Opportunity Statement

The Mathematics Department is committed to equal opportunity in education for all students, including those with documented physical disabilities or documented learning disabilities. University policy states that it is the responsibility of students with documented disabilities to contact instructors during the first week of each semester to discuss appropriate accommodations to ensure equity in grading, classroom experiences and outside assignments.

Academic Conduct

Bring your student identification to all exams. Work independently on all exams and quizzes. Behaviors inappropriate to test taking may disturb other students and will be considered cheating. Don't talk or pass notes with other students during an exam. Don't read notes or books while taking exams given in the classroom. Homework may be discussed freely. If you are unclear as to what constitutes cheating, please consult with me.

Last updated: Wed Jan 19 08:53:36 PST 2005