CLASS Connections Template

Calculus III
92.231(203) Fall _Of_2007

Class Schedule

(92:231(203) OS412. Instructor Rida Mirie. Office: Olney 416C.
Phone (978)934-2433. EMail Rida_mirie@uml.edu
Office hours (8:30-9:20 M,W, F),( 10:30-11:20 M,W,TR, F, (M5-6), and by appointment.
(5 EXAMS[50min] 50%) . (>3 quizes[20minutes] 30%). Final(20%).
1 calculator+ 1 sheet allowed in exams, quizes and final.
No CAMERAS or fones usage in class. Coverage rate will Vary.
No makeup. No extra Time.
You are responsible for the material covered in class whether you attend or not.

Topics[O-Z vol. 3]

Section

Practise Problems

Three-Dimensional Space 12.1 # 3, 5, 6, 8, 11, 14, 15, 17

Vectors 12.4 # 5, 7, 9, 17, 19

The Dot Product 12.7 # 11,13, 23,25, 29,31

The Cross Product 12.9 # 1-15 odd

Lines and Planes in Three dimesions
12.8 # 1, 3, 5, 7, 11, 13, 15, 23, 27, 39,40

Vector-Valued Functions
12.5 # 11, 13, 27

Derivatives and Integrals
12.5
# 5, 9, 15, 19, 31

TEST1

Polar Coordinates and poalr Curves.
12.3

1-28(0dd)

Functions o f several Variables
13.1
1-8

Partial Derivatives
13.2
1,3,5,7,9,51-55

Linear Approximation in 1 and several variables
13.3
7,-18odd

Gradient and directional derivatives
13.4
1,3 ,7,9,13,17,21,23,27,30

Higher order derivatives(heat wave and laplace eqns),
The chain rule
13.5
13.7
# 3 - 13 odd, 17, 19
pp.763 #26,27,28,33,34,35

Maxima Minima and Quadratic Approximation
13.6
5,9-29odd

Test2

Integrals. Calculating integrals by integration.
14.2
1-15odd

Integrals over non-rectangular regions
14.3
25,1-17odd, 25,29-41odd

Double integrals in polar coordinates
14.4
1-16odd 18-20,21-30,41

Triple Integrals
14.5
1-10odd

Test3

More Triple Integrals(cylindrical and spherical)
14.6
1-30 odd,31,35,39

Line integrals
16.1
9-15 and 19,21

A fundamental theorem for line integrals
16.2
11-22 23-27 odd

Greens theorem in the plane
16.3
1-9 odd

Surfaces and their parametrization
16.4
1-9odd 15-19 odd

surface integrals
16.5
1-11 odd

derivatives and intgrals of vector field
16.6
11-16

Test4

The divergene theorem
16.7
9-12

Stoke's theorem
16.7
1-7

Graphics & Design by: Thomas Pimental & Michelle Christman
In Association with: CLASS Connections

Topics[O-Z vol. 3]	Section	Practise Problems
Three-Dimensional Space	12.1	# 3, 5, 6, 8, 11, 14, 15, 17
Vectors	12.4	# 5, 7, 9, 17, 19
The Dot Product	12.7	# 11,13, 23,25, 29,31
The Cross Product	12.9	# 1-15 odd
Lines and Planes in Three dimesions	12.8	# 1, 3, 5, 7, 11, 13, 15, 23, 27, 39,40
Vector-Valued Functions	12.5	# 11, 13, 27
Derivatives and Integrals	12.5	# 5, 9, 15, 19, 31
TEST1
Polar Coordinates and poalr Curves.	12.3	1-28(0dd)
Functions o f several Variables	13.1	1-8
Partial Derivatives	13.2	1,3,5,7,9,51-55
Linear Approximation in 1 and several variables	13.3	7,-18odd
Gradient and directional derivatives	13.4	1,3 ,7,9,13,17,21,23,27,30
Higher order derivatives(heat wave and laplace eqns), The chain rule	13.5 13.7	# 3 - 13 odd, 17, 19 pp.763 #26,27,28,33,34,35
Maxima Minima and Quadratic Approximation	13.6	5,9-29odd
Test2
Integrals. Calculating integrals by integration.	14.2	1-15odd
Integrals over non-rectangular regions	14.3	25,1-17odd, 25,29-41odd
Double integrals in polar coordinates	14.4	1-16odd 18-20,21-30,41
Triple Integrals	14.5	1-10odd
Test3
More Triple Integrals(cylindrical and spherical)	14.6	1-30 odd,31,35,39
Line integrals	16.1	9-15 and 19,21
A fundamental theorem for line integrals	16.2	11-22 23-27 odd
Greens theorem in the plane	16.3	1-9 odd
Surfaces and their parametrization	16.4	1-9odd 15-19 odd
surface integrals	16.5	1-11 odd
derivatives and intgrals of vector field	16.6	11-16
Test4
The divergene theorem	16.7	9-12
Stoke's theorem	16.7	1-7