Mathematics 263, Section 102

MULTIVARIABLE and VECTOR CALCULUS

Department of Mathematics, University of British Columbia

Prerequisites: One of SCIE 001, PHYS 101, 107, 121, 153 and one of SCIE 101, PHYS 102, 108, 122, 153 and one of SCIE 001, MATH 101, MATH 103, MATH 105, MATH 121.

Corequisites: one of MATH 152, 221, 223.

Instructor

Joel Feldman

E-mail	feldman@math.ubc.ca
Office	Math 221
Phone	604-822-5660
Home page	http://www.math.ubc.ca/~feldman/
Office hours	Tues 9:00-10:00, Tues 15:00-16:00, Thr 15:00-16:00

Class Times and Location

The course meets Monday, Wednesday from 11:00 to 11:50 in room Chemistry 300 and Friday from 10:00 to 11:50 in room Scarfe 100.

Text

Robert A. Adams, Calculus of Several Variables, fifth edition, Pearson Education Canada. The ISBN number is 0201798026.

I will post all handouts, problem sets, etc. on the web here.

Topics

Vectors and the Geometry of Space (§10.1-10.4):
    Three dimensional coordinate systems,
     Vectors, dot and cross products, projections
     Equations of lines and planes.
Vector Functions (§11.1,11.3):
    Vector functions and space curves, parametrization
    Derivatives and integrals of vector functions,
    Arc length, speed, velocity and acceleration. Exclude curvature, normal, binormal, torsion.
Partial Derivatives (§ 10.5, 12.1-12.9, 13.1-13.3, 13.6):
    Functions of several variables: visualizaton, quadrics,
    Limits, partial derivatives,
    Tangent planes and linear approximations,
    Chain rule, directional derivatives, gradient,
    Higher order derivatives, quadratic approximation,
    Local maxima and minima, Lagrange multipliers,
    Newton's method.
Multiple Integrals (§14.1-14.6):
     Double and iterated integrals, polar coordinates, changing the order of integration
     Applications, surface area,
     Triple integrals, changing the order of integration
     Cylindrical and Spherical co-ordinates.
Vector Fields and Line Integrals (§15.1-15.4):
Vector fields, conservative fields, potentials, line integrals.
Surface integrals (§15.5, 15.6):
Surfaces, parametrization, flux integrals, surface area, applications.
Integral Theorems (§16.1-16.6):
Gradient, divergence and curl, vector identities, divergence theorem,
Green's theorem, Stokes' theorem, applications.

Grading

There will be three midterms (September 29, October 27 and November 17), accounting for about 45% of the final mark.
There will be weekly problem sets accounting for about 5% of the final mark.
The final exam will account for about 50% of the final mark.
Grades will probably be scaled.
Fairness across the four sections of the course will be a high priority.

Policies

All midterms and the final examination will be strictly closed book: no formula sheets or calculators will be allowed.
There is no supplemental examination in this course.
Late homework assignments receive a grade of 0.
Missing a midterm normally results in a mark of 0. Exceptions may be granted in two cases: prior consent of the instructor or a medical emergency. In the latter case, the instructor must be notified within 48 hours of the missed test, and presented with a doctor's note immediately upon the student's return to UBC.