This course focuses on the fundamental theoretical properties of matrices. Topics will include a rigorous treatment of vector spaces (linear independence, basis, dimension, and linear transformations), orthogonality (inner products, projections, and Gram-Schmidt process), determinants, eigenvalues and eigenvectors (diagonal form of a matrix, similarity transformations, and matrix exponential), singular value decomposition, and the pseudo-inverse. Essential proof writing techniques and logic will be reviewed and then used throughout the course in exams and written assignments. Prerequisite(s): Multivariate calculus
The course materials are divided into 14 modules which can be accessed on the course Home page or by clicking Modules on the course menu. Each module has several items including lectures, readings, group activity and/or discussion, and assignments. Modules begin Mondays at 12:00 am Eastern Time and run for a period of seven (7) days. Please check the Calendar and Announcements regularly for specific assignment due dates and other important information.
To understand the fundamental theorems, tools, and techniques in Linear Algebra and Matrix Theory and to hone logical and mathematical thinking.
Nair, M. T., Singh, A. (2019). Linear Algebra. Singapore: Springer Singapore.
eBook ISBN: 978-981-13-0926-7
Hardcover ISBN: 978-981-13-0925-0
Softcover ISBN: 978-981-13-4533-3
Note: A digital copy of this book is available with your JHU login through the library website (see further information below).
It is expected that each module will take approximately 10–15 hours per week to complete. An approximate breakdown of required activities: reading the assigned sections of the texts as well as other supplementary readings (approximately 2-4 hours per week), watching the lecture videos and working through the in-lecture examples and exercises (approximately 2-4 hours per week), group activities (approximately 1 hour per week), and problem set assignments (approximately 5–6 hours per week). Other recommended activities include: reviewing feedback on previous assignments, working through practice problems, emailing and/or meeting with the professor as needed. This course has the following basic student requirements:
Assignments consist of a problem set that students must solve and write up. Assignments should be done neatly on paper and scanned or completed electronically using LaTeX or a tablet device. Your submission should be uploaded to Gradescope, using the built in tool to assign pages to problems. This gives you a chance to ensure there are no pages missing from your assignment, and it makes it easier for the grader to find your work. Failure to appropriately assign pages to problems may result in a deduction of points. For further information on how to submit an assignment to Gradescope, please visit the Submitting a PDF Gradescope help article.
Collaborations and discussions between students are key ingredients to success in a graduate course. The assignments will be challenging and thought-provoking, and I encourage you to work together on them. However, while you are welcome to discuss how to approach and solve the assigned problems, you are expected to submit a solution that you have written up on your own that reflects your understanding of the problem. If you work with someone, you must make a note at the top of the first page of your assignment (e.g., "Collaborated with Jane Doe").
In addition to collaborating with your peers, you may use the assigned readings and any content on the Canvas site. You may reference other textbooks or general Matrix Theory resources, but you may not search for solutions to assigned problems (for further details, please see the Course Policies section of the Syllabus). Unless explicitly stated otherwise, you should not use computational assistance (e.g., programming languages) to solve assigned problems (beyond checking basic arithmetic). If you have questions or are stuck on an assignment, please reach out to me and I will be happy to help!
Effectively communicating mathematics and proof-writing are a significant focus of this course. In addition to logical and mathematical correctness, there will be an emphasis on clarity of solutions and proper use of notation and vocabulary in the grading.
All assigned problems can be solved using only information from the readings, lectures, and other materials on Canvas up to that point in the course. You should not use results, concepts, or techniques we have not yet covered in your solutions.
Assignments are due according to the dates posted on the Canvas course site. You may check these due dates in the Course Calendar or under the Assignments in the corresponding modules. We will aim to have assignments graded and feedback posted about one week after assignment due dates. Grades for assignments can be viewed on both Canvas and Gradescope, but detailed feedback will be posted exclusively through Gradescope; for further information, please visit the Viewing your Submission Gradescope help article.
Unless you have a previously arranged extension or there are exceptional extenuating circumstances, late submissions will not be accepted and will receive a grade of zero. For further detail on extensions, please see the Course Policies section of the Syllabus.
3C+Q Method
There are two applications discussions: the first taking place in Modules 5-6 and the second taking place in Modules 12-13. Each of these requires students to pick a specific application of matrix theory that interests them, research it, compose a 2-3 paragraph summary, and post their write-up to the appropriate discussion board on Canvas by Friday at 11:59 pm Eastern Time of the second module (Module 6 and Module 13 respectively). Two reply posts engaging with other students who researched different applications must be posted by Sunday at 11:59 pm Eastern Time. Reply posts should follow the 3C+Q method as outlined below:
3C+Q Method
Assignments are due according to the dates posted on the Canvas course site. You may check these due dates in the Course Calendar or the Assignments in the corresponding modules. Grades and feedback will typically be posted about one week after assignments are due.
Effectively communicating mathematics through proof-writing is a significant focus of this course. In addition to logical and mathematical correctness, there will be an emphasis on clarity of solutions and proper use of notation and vocabulary in the grading of assignments.
A grade of A indicates achievement of consistent excellence and distinction throughout the course—that is, conspicuous excellence in all aspects of assignments and discussion in every week. A grade of B indicates work that meets all course requirements on a level appropriate for graduate academic work.
Course grades will be based upon accumulated points as follows:
Score Range | Letter Grade |
---|---|
100-98 | = A+ |
97-94 | = A |
93-90 | = A- |
89-87 | = B+ |
86-83 | = B |
82-80 | = B- |
79-77 | = C+ |
76-73 | = C |
72-70 | = C- |
69-67 | = D+ |
66-63 | = D |
< 63 | = F |
Overall course grades will be determined by the following weighting:
Coursework Category | Percentage of Course Grade |
---|---|
Group Activities | 15% |
Problem Set Assignments | 30% |
Application Discussions | 5% |
Midterm Exam | 20% |
Final Exam | 20% |
Highest grade of the above | 10% |
While the lecture videos, readings, and other provided materials contain all the information you need to solve any assigned problems, you are allowed to consult other references (e.g., other textbooks) to strengthen your understanding of general concepts if you wish (except during exam weeks). Taking or modifying solutions from any source is not permitted. This includes but is not limited to solutions manuals (to any text), websites posting problem solutions (e.g., Chegg, Course Hero, Stack Exchange, etc.), other people, and/or AI resources. Not only does this violate the Academic Integrity policy, it hurts your own learning and understanding. If you need assistance, I am more than happy to provide it!
In the case that you are consulting another textbook for general information and accidentally find a solution to an assigned problem in such a reference, DO NOT read it and work out the solution on your own.
Each student is granted four 24-hour extensions on assignments over the course of the semester, no explanation needed. You may use up to two 24-hour extensions on the same assignment (granting a 48-hour extension). If you wish to use an extension, please notify me (the instructor) via email so that I can add the extension to Gradescope. If Gradescope is not accepting your submission, it is your responsibility to email me your assignment by the extended deadline. Extensions may be applied only to problem set assignments, not to group activities, application discussions, or exams.
If you need extensions beyond the default four 24-hour extensions, you must coordinate them with me (the instructor) BEFORE the assignment is due. Approval of such extensions is not guaranteed.
Deadlines for Adding, Dropping and Withdrawing from Courses
Students may add a course up to one week after the start of the term for that particular course. Students may drop courses according to the drop deadlines outlined in the EP academic calendar (https://ep.jhu.edu/student-services/academic-calendar/). Between the 6th week of the class and prior to the final withdrawal deadline, a student may withdraw from a course with a W on their academic record. A record of the course will remain on the academic record with a W appearing in the grade column to indicate that the student registered and withdrew from the course.
Academic Misconduct Policy
All students are required to read, know, and comply with the Johns Hopkins University Krieger School of Arts and Sciences (KSAS) / Whiting School of Engineering (WSE) Procedures for Handling Allegations of Misconduct by Full-Time and Part-Time Graduate Students.
This policy prohibits academic misconduct, including but not limited to the following: cheating or facilitating cheating; plagiarism; reuse of assignments; unauthorized collaboration; alteration of graded assignments; and unfair competition. Course materials (old assignments, texts, or examinations, etc.) should not be shared unless authorized by the course instructor. Any questions related to this policy should be directed to EP’s academic integrity officer at ep-academic-integrity@jhu.edu.
Students with Disabilities - Accommodations and Accessibility
Johns Hopkins University values diversity and inclusion. We are committed to providing welcoming, equitable, and accessible educational experiences for all students. Students with disabilities (including those with psychological conditions, medical conditions and temporary disabilities) can request accommodations for this course by providing an Accommodation Letter issued by Student Disability Services (SDS). Please request accommodations for this course as early as possible to provide time for effective communication and arrangements.
For further information or to start the process of requesting accommodations, please contact Student Disability Services at Engineering for Professionals, ep-disability-svcs@jhu.edu.
Student Conduct Code
The fundamental purpose of the JHU regulation of student conduct is to promote and to protect the health, safety, welfare, property, and rights of all members of the University community as well as to promote the orderly operation of the University and to safeguard its property and facilities. As members of the University community, students accept certain responsibilities which support the educational mission and create an environment in which all students are afforded the same opportunity to succeed academically.
For a full description of the code please visit the following website: https://studentaffairs.jhu.edu/policies-guidelines/student-code/
Classroom Climate
JHU is committed to creating a classroom environment that values the diversity of experiences and perspectives that all students bring. Everyone has the right to be treated with dignity and respect. Fostering an inclusive climate is important. Research and experience show that students who interact with peers who are different from themselves learn new things and experience tangible educational outcomes. At no time in this learning process should someone be singled out or treated unequally on the basis of any seen or unseen part of their identity.
If you have concerns in this course about harassment, discrimination, or any unequal treatment, or if you seek accommodations or resources, please reach out to the course instructor directly. Reporting will never impact your course grade. You may also share concerns with your program chair, the Assistant Dean for Diversity and Inclusion, or the Office of Institutional Equity. In handling reports, people will protect your privacy as much as possible, but faculty and staff are required to officially report information for some cases (e.g. sexual harassment).
Course Auditing
When a student enrolls in an EP course with “audit” status, the student must reach an understanding with the instructor as to what is required to earn the “audit.” If the student does not meet those expectations, the instructor must notify the EP Registration Team [EP-Registration@exchange.johnshopkins.edu] in order for the student to be retroactively dropped or withdrawn from the course (depending on when the "audit" was requested and in accordance with EP registration deadlines). All lecture content will remain accessible to auditing students, but access to all other course material is left to the discretion of the instructor.