Spring 2020  MATH 152 D300
Calculus II (3)
Class Number: 3781
Delivery Method: In Person
Overview

Course Times + Location:
Mo, We, Fr 8:30 AM – 9:20 AM
WMC 3253, Burnaby 
Exam Times + Location:
Apr 14, 2020
8:30 AM – 11:30 AM
GYM WEST, Burnaby

Instructor:
Brenda Davison
bdavison@sfu.ca
1 778 7826991

Prerequisites:
MATH 150 or 151; or MATH 154 or 157 with a grade of at least B.
Description
CALENDAR DESCRIPTION:
Riemann sum, Fundamental Theorem of Calculus, definite, indefinite and improper integrals, approximate integration, integration techniques, applications of integration. Firstorder separable differential equations and growth models. Sequences and series, series tests, power series, convergence and applications of power series. Students with credit for MATH 155 or 158 may not take this course for further credit. Quantitative.
COURSE DETAILS:
Math 152 D300 Special Lectures:
How to apply:
Students seeking to participate in these special lectures must:
1) register in MATH152 Section D100 during the normal registration period;
2) complete a written application submitted to the Department of Mathematics (application form);
3) meet a minimum grade requirement of A in either MATH150 or MATH151.
Students selected for these special lectures (Section D300) will be notified prior to the start of term, and informed about the classroom location.
Chapter 5  Integrals
1. Areas and Distances
2. The Definite Integral
3. The Fundamental Theorem of Calculus
4. Indefinite Integrals
5. Substitution Rule
Chapter 6 Applications of Integration
1. Areas between Curves
2. Volumes
3. Volumes by Cylindrical Shells
5. Average Value of a Function (optional)
Chapter 7 Techniques of Integration
1. Integration by Parts
2. Trigonometric Integrals
3. Trigonometric Substitution
4. Integration of Rational Functions by Partial Fractions
5. Strategy for Integration
6. Integration Using Tables and Computer Algebra Systems
7. Approximate Integration
8. Improper Integrals
Chapter 8  Further Applications of Integration
1. Arc Length
2. Area of a Surface of Revolution
Chapter 10  Parametric Equations and Polar Coordinates
2. Calculus with Parametric Curves
4. Areas and Lengths in Polar Coordinates
Chapter 11  Infinite Sequences and Series
1. Sequences
2. Series
3. The Integral Test and Estimates of Sums
4. The Comparison Tests
5. Alternating Series
6. Absolute Convergence and the Ratio and Root Tests
7. Strategy for Testing Series
8. Power Series
9. Representations of Functions as Power Series
10. Taylor and McLaurin Series
11. Applications of Taylor Polynomials
Chapter 9  Differential Equations
1. Modeling with Differential Equations
2. Direction Fields
3. Separable Equations
4. Models for Population Growth
Grading
 Midterm 1 15%
 Midterm 2 15%
 Final Exam 50%
 Assignments 10%
 Online Assignments 5%
 Clickers 5%
NOTES:
THE INSTRUCTOR RESERVES THE RIGHT TO CHANGE ANY OF THE ABOVE INFORMATION.
Students should be aware that they have certain rights to confidentiality concerning the return of course papers and t he posting of marks.
Please pay careful attention to the options discussed in class at the beginning of the semester.
REQUIREMENTS:
**For these Math152 special lectures a grade of at least A is required in either MATH150 or MATH151, and special permission of the Department of Mathematics must be granted.
You cannot enroll in this course during the enrollment period. If you apply and are accepted you will be transferred from the D100 section to this section (D300) by the Math Department.**
Materials
MATERIALS + SUPPLIES:
9781464120152
Required, and available at the SFU Bookstore
REQUIRED READING:
Calculus: Early Transcendentals, 8th Edition Textbook, by James Stewart, packaged with Multiterm Enhanced WebAssign [Text + EWA/eBook]
Available through the SFU Bookstore
This package can also be purchased directly from the publisher (with free shipping) at the following link:
http://nelsonbrain.com/micro/SFUmath150_151_152_251
*Please Note: If you have purchased the above package within the last 5 years, do not purchase again!
ISBN: 9781305597624
Registrar Notes:
SFU’s Academic Integrity web site http://www.sfu.ca/students/academicintegrity.html is filled with information on what is meant by academic dishonesty, where you can find resources to help with your studies and the consequences of cheating. Check out the site for more information and videos that help explain the issues in plain English.
Each student is responsible for his or her conduct as it affects the University community. Academic dishonesty, in whatever form, is ultimately destructive of the values of the University. Furthermore, it is unfair and discouraging to the majority of students who pursue their studies honestly. Scholarly integrity is required of all members of the University. http://www.sfu.ca/policies/gazette/student/s1001.html
ACADEMIC INTEGRITY: YOUR WORK, YOUR SUCCESS