This course can be viewed as equivalent to Math 13, but is designed especially for first-year students who have successfully completed a BC calculus curriculum in secondary school. In particular, as part of its syllabus it includes most of the multivariable calculus material present in MATH 8. Topics include vector geometry, equations of lines and planes, and space curves (velocity, acceleration, arclength), limits and continuity, partial derivatives, tangent planes and differentials, the Chain Rule, directional derivatives and applications, and optimization problems. It continues with multiple integration, vector fields, line integrals, and finishes with a study of Green's and Stokes' theorem.
Lectures: |
M, W, F: 12:30pm - 1:35pm |
Kemeny 007 |
Tutorial: |
Su, Tu, Th: 7:00pm - 9:00pm |
Kemeny 008 |
Office Hours: |
Monday, 2:30pm - 3:30pm |
Tuesday, 11:00am - 12:00pm | |
Friday, 9:00am - 10:00am |
TAs: |
Sara Chari |
Christopher Coscia | |
Emma Hartman |
Assignment 1 |
Assignment 2 |
Assignment 3 |
Assignment 4 |
Assignment 5 |
Assignment 6 |
Assignment 7 |
Assignment 8 |
Assignment 9 |
Exam 1: Thursday, October 8
Exam 2: Thursday, October 29
Final Exam: Friday, November 20
Multivariable Calculus, Early Transcendentals (Third Edition)
J. Rogawski & C. Adams
No online code needed.
Homework | 15% |
Exam 1 | 25% |
Exam 2 | 25% |
Final Exam | 35% |