Matrix Algebra
Fall 2018
CRN 17706
MW 9:00-10:20, LART 101; 3 credit hours
Other resources
- Grades
- Homework and reading assignments
- This syllabus in pdf
- Graphing calculators:
- Desmos for 2-dimensional graphing
- math3d.org seems to be the most useful 3-dimensional graphing software for our purposes, because you can graph more than one plane at a time. However, it may take some effort to learn.
- On MacOS X, the built-in Grapher app can graph in 2 or 3 dimensions. It is simpler, but less powerful than the others.
- If you find graphing software that you think is worth sharing, let me know; if I agree, I'll put it up here.
- Evidence you can't multitask:
Syllabus
Please feel free to come by my office any time during scheduled
office hours.
You are welcome to
visit at other times, but in that case you might want to make
an appointment, just to make sure that I will be there then. You can
make an appointment simply by talking to me before or after class, by
calling me at
my office
or at home, or by sending
e-mail.
You may also ask any questions directly via phone or e-mail. If I'm
not in when you call, please leave a message on the voice-mail or
answering machine with your name, number, and a good time for me to
call you back. I will try to respond to your phone or e-mail message
as soon as possible.
Prerequisites:
Calculus II (Math 1312). This is entirely a mathematical maturity requirement,
as we will use no calculus in this course.
COURSE OBJECTIVES:
This course is concerned with matrices and vectors. In one setting,
matrices and vectors merely serve as efficient devices for storing
the coefficients and solutions of systems of linear equations. The
solutions of many such systems, though, are hard to even describe
without the right language. This is the language of vector spaces, where
matrices serve as functions turning vectors into other vectors. We will
then spend most of our time examining vector spaces, and especially
various vector spaces we can naturally assign to a matrix. In this setting,
eigenvalues and eigenvectors of a matrix arise naturally, and we end the
course examining these.
Upon successful completion of this course, you will be able to solve
and analyze systems of linear equations. You will be able to find and
describe the various vector spaces associated to a matrix, and you will be
prepared to study more abstract vector spaces. You will be able to compute
eigenvalues and eigenvectors of a matrix, and know
what they are good for. You will be able to do all of this equally well
with the symbolic/numerical description of matrices and vectors as
arrays of numbers, and with the geometrical description of matrices and
vectors, using the powerful organizing concept of dimension, even in dimensions
higher than 3.
Textbook:
Introduction to Linear Algebra, 5th ed.,
Johnson, Riess, Arnold, Chs. 1-4.
We will skip some sections, as announced in class.
The textbook is required at all class meetings.
Required Reading:
Read each section that we cover in class, both before and after class.
Skim the section before class, even if you don't understand it fully,
to have some idea of what we'll be doing in class. Read it more
carefully after class to clarify and fill in details you missed in
class.
Warning:
Sometimes, we will not "cover" all the material from a section, but
instead focus on a particular aspect of the section. In such cases, I
will point out in class (and at this
website) which other
parts of the section I expect you to read on your own.
Grades:
Quizzes (16.7%):
Suggested homework problems will be assigned
most class days and will generally be discussed at the next class.
There will be approximately biweekly quizzes, with problems taken from
the homework. Quizzes are closed-book, closed-notes. Missed quizzes
cannot be made up, but your lowest quiz score will be
dropped.
It is very important that you do your homework before it is discussed
in class. You will only learn the material by doing it yourself, not
by watching others do it for you.
Exams (16.7% each):
There will be three in-class exams on the following days:
- Ch. 1: Wed. 26 Sep.
- Chs. 2, 3: Wed. 7 Nov.
- Ch. 4: Wed. 28 Nov.
Final (33.3%)
The final exam will be comprehensive over all material we discuss in class.
Wed. 12 Dec., 10:00 a.m.-12:45 p.m.
Makeup exams can be given only in extraordinary and unavoidable
circumstances, and with advance notice.
Once you begin an exam, you will not be allowed to leave the classroom until you have finished the exam. There will be no bathroom breaks. If you have a medical reason for needing more frequent bathroom breaks, please provide documentation in advance.
POLICIES:
Academic dishonesty:
It is UTEP's policy, and mine, for all suspected cases or acts of alleged scholastic dishonesty to be referred to the Office of Student Conduct and Conflict Resolution for investigation and
appropriate disposition. See Section II.1.2.2.1 of the Handbook of Operating Procedures.
Attendance:
I strongly encourage you to attend every class, though there is no particular grade penalty for absences. You are responsible to find out any assignment that must be made up if you are absent. My goal is for class meetings and activities to complement, rather than echo, the textbook, and thus for every class to be worth attending.
Drop date:
The deadline for student-initiated drops with a W is Friday, November 2. After this date, you will not be able to drop the class (as per the Dean's office). Furthermore, a grade of incomplete is only for extraordinary circumstances, such as a missed exam.
I hope everyone will complete the course successfully, but if you are having doubts about your progress, I will be happy to discuss your standing in the course to help you decide whether or not to drop. You are only allowed three enrollments in this course, and students enrolled after Fall 2007 are only allowed six withdrawals in their entire academic career, so please exercise the drop option judiciously.
Courtesy:
We all have to show courtesy to each other, and the class as a whole, during class time. Please arrive to class on time (or let me know when you have to be late, and why); do not engage in side conversations when one person (me, or another student) is talking to the whole class; turn off your cell phone (or, for emergencies, at least set it to not ring out loud), and do not engage in phone, email, or text conversations during class.
Disabilities:
If you have, or suspect you have, a disability and need an accommodation, you should contact the Center for Accommodations and Support Services (CASS) at 747-5148, cass@utep.edu, or Union East room 106. You are responsible for presenting to me any CASS accommodation letters and instructions.
Exceptional circumstances:
If you anticipate the possibility of missing large portions of class time, due to exceptional circumstances such as military service and/or training, or childbirth, please let me know as soon as possible.