MAT 211: Introduction to Linear Algebra

Fall 2016


Instructor's Contact Details:
Instructor: Dr. Luigi Lombardi
E-mail: luigi.lombardi AT
Office: Math Tower 3-120
Office hours: Monday 2-3pm and Tuesday 12-1pm in Math Tower 3-120
            Tuesday 3-4pm in MLC
            By appointment

Lecture (location and time):
Location: Library W4540
Time: Monday-Wednesday-Friday 12pm-12:53am

Otto Bretscher "Linear Algebra with Applications", 5th edition, Pearson Prentice Hall
(Optional) Student solutions manual for Linear Algebra with Applications, Otto Bretscher, 5th edition

Course Description:
Introduction to the theory of linear algebra with some interesting applications; vectors, vector spaces, bases and dimension, applications to geometry, linear transformations and rank, eigenvalues and eigenvectors, determinants and inner products. It may not be taken for credit in addition to AMS 210.

Homework comes in two flavors. Both will be posted in Bb (Black Board – see below for information on this) each week, usually on a Sunday and will be due on Monday the following week (after the weekend). Practice Problems: These are not to be handed but are essential to master the course and similar problems may appear on the Midterm Exams and Final. These are designated P. If you have the Student Solutions Manual, you can find complete solutions to these problems. NOTE: The Manual may solve problems in a different way than we do in class. Either solution is acceptable. Problems to hand in: These should be done after you’ve mastered the practice problems. These will be designated as H These will be graded. Late assignments cannot be accepted. Homework that appears to be copied from someone else will receive a grade of 0 and may result in charges of academic dishonesty.

Midterms and Final Exam:
Midterm 1: TBA
Midterm 2: TBA
Final Exam: Wednesday December 14th, 11:15am - 1:45pm

Course Grading:
25% Midterm 1
25% Midterm 2
35% Final Exam
15% Homework

Academic Integrity:
Each student must pursue his or her goals honestly and be personally accountable for all submitted work. Representing another person's work as your own is always wrong. Instructors are required to report any suspected instances of academic dishonesty to the Academic Judiciary. For more comprehensive information on academic integrity, including categories of academic dishonesty, see the academic judiciary web site at