Math 235 : Introduction to Linear Algebra

Fall 2016

This is the course-wide webpage. Please consult your section webpage for additional information.


Overrides

Students needing an override in order to enroll in the course should contact the course chair Paul Hacking hacking@math.umass.edu with the following information: (1) sections of the course which conflict with other courses from your academic schedule, and (2) preferred section of the course. (Unfortunately, in order to keep the sections balanced we cannot guarantee that you will be assigned to your preferred section.)


Sections

235.1. Ava Mauro, MWF 9:05AM--9:55AM.
235.2. Ava Mauro, MWF 11:15AM--12:05PM.
235.3. Matthew Dobson, TuTh 2:30PM--3:45PM.
235.4. Alexei Oblomkov, TuTh 1:00PM--2:15PM.
235.6. Paul Hacking, TuTh 11:30AM--12:45PM.
235.7. Aaron Gerding, MWF 1:25PM--2:15PM.


Textbook and Online homework

The course text is Linear algebra and its applications (5th edition) by David Lay, Steven Lay, and Judi McDonald.

MyMathLab is required for this course. An electronic copy of the textbook is included in your purchase of MyMathLab ($75). Go to www.mymathlab.com (link) and use the Course ID for your own section (provided by your section's instructor).

Online homework and quizzes will be assigned through MyMathLab by your instructor.


Syllabus and weekly schedule

This is an introductory course on linear algebra, covering systems of linear equations, matrices, linear transformations, determinants, vector spaces, eigenvalues and eigenvectors, and orthogonality.

The schedule below gives the topics from the course text to be covered each week. (This is only a guideline, and may be modified by your instructor as necessary.)


9/6--9/9: 1.1 Systems of linear equations; 1.2 Row reduction and echelon forms; 1.3 Vector equations.

9/12--9/16: 1.3 (continued); 1.4 The matrix equation Ax=b; 1.5 Solution sets of linear systems.

9/19--9/23: 1.7 Linear independence; 1.8 Introduction to linear transformations.

9/26--9/30: 1.9 The matrix of a linear transformation; 2.1 Matrix operations.

10/3--10/7: 2.2 The inverse of a matrix; 2.3 Characterizations of invertible matrices.

10/11--10/14: 3.1 Introduction to determinants; 3.2 Properties of determinants.

10/17--10/21: 3.2 (continued); 3.3 Cramer's rule, volume, and linear transformations; 4.1 Vector spaces and subspaces.

10/24--10/28: 4.2 Null spaces, column spaces, and linear transformations; 4.3 Linearly independent sets and bases.

10/31--11/4: 4.4 Coordinate systems; 4.5 The dimension of a vector space.

11/7--11/10: 4.6 Rank; 5.1 Eigenvectors and eigenvalues.

11/14--11/18: 5.1 (continued); 5.2 The characteristic equation.

11/21--11/25: Thanksgiving break.

11/28--12/2: 5.3 Diagonalization; 5.5 Complex eigenvalues.

12/5--12/9: 6.1 Inner product, Length, and Orthogonality; 6.2 Orthogonal sets.

12/12--12/14: 6.3 Orthogonal projections; 6.4 The Gram--Schmidt process.


Exams

There will be two midterm exams and a final exam. Past exams are available here.

You are allowed one 8.5" x 11" sheet of notes (both sides). Calculators and the textbook are not allowed on the exams. You should bring your student ID (UCard) to each exam.

If you have a documented conflict for one of the exams, in order to take the make-up exam you must give the course chair Paul Hacking hacking@math.umass.edu at least one weeks' written notice for a midterm exam and at least two weeks' written notice for the final exam. Other make-up exams (for example due to medical emergencies) will be handled by your section instructor. Make-up exams will not be given to accommodate travel plans.

First midterm exam

The first midterm will be held on Tuesday 10/18/16, 7:00PM--9:00PM, at the following locations:

235.1 and 235.2. (Mauro) MARC0131
235.3. (Dobson) HAS0134
235.4. (Oblomkov) HASA0124
235.6. (Hacking) HASA0126
235.7. (Gerding) ILCS131

The syllabus for the first midterm is the following sections of the textbook: 1.1, 1.2, 1.3, 1.4, 1.5, 1.7, 1.8, 1.9, 2.1, 2.2, 2.3.

Please work through the practice exam here. Solutions to the practice exam are here.

Second midterm exam

The second midterm will be held on Tuesday 11/15/16, 7:00PM--9:00PM, at the following locations:

235.1 and 235.2. (Mauro) MARC0131
235.3. (Dobson) HAS0134
235.4. (Oblomkov) HASA0124
235.6. (Hacking) HASA0126
235.7. (Gerding) ILCS131

The syllabus for the second midterm is the following sections of the textbook: 3.1, 3.2, 3.3, 4.1, 4.2, 4.3, 4.4, 4.5.

Please work through the review questions here. Solutions to the review questions are here.

Final Exam

The final exam will be held on Tuesday 12/20/16, 10:30AM-12:30PM, in Boyden gym.

The syllabus for the final exam is the following sections of the textbook: 4.5, 4.6, 5.1, 5.2, 5.3, 5.5, 6.1, 6.2.

Please work through the review questions here. Solutions to the review questions are here.


Grading

Your course grade will be computed as follows: First midterm exam 25%; Second midterm exam 25%; Final exam 25%; Homework, quizzes, and class participation 25% (determined by your section instructor).

Grades will be assigned to course percentages according to the following scale:

A : 87--100
A- : 83--86
B+ : 78--82
B : 75--77
B- : 72--74
C+ : 68--71
C : 62--67
C- : 59 -- 61
D+ : 55 -- 58
D : 50 -- 54
F : 0 -- 50


Accommodation Policy Statement

UMass Amherst is committed to providing an equal educational opportunity for all students. A student with a documented physical, psychological, or learning disability on file with Disability Services may be eligible for academic accommodations to help them succeed in this course. If you have a documented disability that requires an accommodation, please notify your instructor during the first two weeks of the semester so that we can make appropriate arrangements.




This page is maintained by Paul Hacking hacking@math.umass.edu