Instructor: Professor Markos Katsoulakis, LGRT 1423G, E-mail: markos [at] math umass edu
Lectures: Tuesdays, Thursdays, 1:000PM-2:15PM, Room Goessmann 051.
Office Hours: Tu, Th, 11:30AM-1PM.
TAs: Simon Burhoe,
TAs: Cory Ward,
TAs: Joy Yu,
TAs: Haitan Yue,
TA Office Hours:
-
Monday: Joy Yu (6-7pm), Haitian Yue (4-6pm) in LGRC A301.
- Tuesday: Cory Ward (4-6pm), Simon Burhoe (4-5pm) in LGRC A301.
- Wednesday: Joy Yu (4-6pm), Haitian (4-5pm) in LGRC A301.
- Thursday: Simon Burhoe (4-6pm), Cory Ward (4-5pm) in LGRC A301.
Tutoring:
Textbook
-
Advanced Engineering Mathematics, Author: Erwin Kreyszig, Publisher: Wiley, Edition: 10th, Year Published: 2010
Grading
- Final Exam 34%, Midterm 33%, Homework 33%.
- The final exam will be cumulative, with more emphasis on topics covered after the Midterm.
Exams
- Midterm: Wednesday, March 11, 5-7PM, LGRT123 .
- Material: Chapter 1: 1.1-1.5, 1.7. Chapter 2: 2.1 and 2.2.
- The date and time of the final exam will be scheduled by the
university.See SPIRE.
- Make-up exams will only be given in the case of family or medical
emergency. Both situations will require official documentation. No
make-up exams will be given for any other reason.
Homework
There will be (almost) weekly homework assigned that is to be done using
webwork. NOTE: I will not accept late homework.
You can login into your account on Webwork from here: webwork.
Your user name is the part of your SPIRE username ( UMass email address appearing before the '@' symbol and usually your NetID).
Your default password is your 8 digit UMass SPIRE ID number. Please make sure you change your password once you login for the first time. Write-up/Print your solutions, and keep them, say in a binder, so that you may easily reference that when you are studying for an exam.
Announcements
Class Material by Section
- Chapter 1: 1.1-1.5, 1.7
- Chapter 2: All sections except 2.3 and 2.5
- Chapter 3: Elastic Beam example and higher-order ODEs
- Chapter 4: All sections except 4.5-4.6
- Chapter 6: All sections except 6.5-6.7
- Time-permitting a selection from Chapter 11: Fourier Series and Forced Oscillations