Math 16B: Integral Calculus
  Winter quarter, 2019

Instructor Ben Morris

e-mail: morris at math dot ucdavis dot edu
Office: 2105 MSB
Office hours: W 11:00 a.m.-12:00 p.m., F 1:10 p.m.-2:10 p.m.
Lectures: MWF 12:10 p.m.-1:00 p.m., 2205 Haring.

Exams

There will be two in-class midterms and a final. There will be no makeup exams, and no alternative times for exams. If you have an official reason that prevents you from attending a midterm, you must contact me by e-mail before the exam takes place, and you must receive a response giving you permission to miss the midterm. Your course grade will then be determined by your performance on the remaining midterm and the final. If you miss a midterm for unforeseen reasons beyond your control, please contact me as soon as possible.

Although not recommended, four-function calculators will be permitted in the exams. No other electronic devices are allowed in any of the exams.

Midterm 1

Midterm 1: Monday, February 4, in class. 

Midterm 2

Midterm 2: Monday, March 4, in class. 

Final Exam

Final Exam: Friday, March 22, 1:00p.m.-3:00 p.m., in class.

Homework

Homework assignments will be due on Mondays. The homework is due at 04:00 PM on each due date.

We use WeBWork for your homework grading. To get started with WeBWorK, go to the WeBWork Wiki page and follow the instruction there. If you are already familiar with the system, then go directly to the  Homework page. You can view homework assignments by going to "Homework Sets" on the left.

Course Grade  

The course grade will be based on (weights in parentheses):

Text for Math 16B

Calculus: An applied approach, Larson and Edwards, 7th or 9th edition.

There are some differences between the 7th and 9th editions, as shown in the table below. Note that there are
some sections in the 7th edition that were not included in the 9th edition. You can click on the links in the table
to find pdf versions of those sections.

Topic
Seventh edition
Ninth edition
Numerical integration
Section 6.5
Section 6.3
Improper integrals
Section 6.6
Section 6.4
Solids of revolution

Section 5.7


Substitution
Section 6.1
Partial Fractions
Section 6.3
L'Hopital's rule
Section 8.6

The central topic of the course is integration. We will cover roughly Chapters 4-6 of the text

A detailed syllabus is  here.