Math 221: Analytic Geometry - Calculus I; Summer 2019.
Instructor:
Dr. Stefan Forcey
- Office: CAS 275
- Office Phone: 330 972 6779
- Email is sforcey (AT) uakron.edu (...this is the best way to get a hold of
me)
- Office hours:
- If you can't make my office hours, let me know and we can
set up
a time to meet. Here is my schedule
for the summer semester.
Textbook: Required: Calculus Early Transcendentals, J. Stewart, edition 8E.
Course Syllabus.
The syllabus will include information about grading
policies, exam schedules and policies, etc.
Schedule
Course Outline with dates:
• June 10: Day one.
• Chapter sections 1.5-2.8.
• June 17: Last day to drop.
• TEST 1. June 27. After studying quizzes, here are some additional
Review questions and
Review answers.
• Chapter sections 3.1-3.11
• July 5: Last day to w/draw.
• TEST 2. July 18 After studying quizzes, here are some additional
Review questions and
Review answers 1-2 and
Review answers 3-10.
• Chapter sections 4.1-4.9.
• Chapter sections 5.1-5.5.
• Test 3 (final). Aug 1 After studying quizzes, here are some additional
Review questions and
Review answers.
• Aug 1: Last day.
Homework and Quizzes
Homework problems will be posted here. Homework will be assigned but usually NOT graded.
However we will have one or two quizzes almost every week, and the quiz problems will be either exactly or almost exactly right off the homework.
No makeup quizzes will be
given, but 15 quiz/homework points will be dropped.
- Prequiz: not graded. Here's the pre-quiz to try, and here are the
answers.
- Homework 1: Not to be turned in. Quiz 1 based on these problems: June 11 (take home, due June 13).
- 1.5 p. 66: 35, 37, 39, 41
- 2.1 p. 82: 3
- Homework 2: Not to be turned in. Quiz based on these problems: June 13 (take home, due June 17).
- 2.2 p. 92: 1, 5, 7, 9, 11, 17
- 2.3 p. 102: 2, 3, 5, 11, 13, 17, 21
- Homework 3: Not to be turned in. Quiz 3 based on these problems: June 18(take home, due June 20).
- 2.4 p. 113: 5, 7, 11
- 2.5 p. 124: 3a, 7, 17, 19, 21, 23, 29, 37, 39
- 2.6 p. 137: 3, 7, 9, 15, 17, 25, 35
- Homework 4: Not to be turned in, we'll go over it in class.
- 2.7 p. 148: 5, 7, 9, 31
- 2.8 p. 160: 3, 21, 23, 27, 41
TEST 1 ENDS HERE
- Homework 5: Not to be turned in. Take home quiz July 2, due July 8.
- 3.1: p. 180 Odd 3–35, 45, 47
- 3.2: p. 188 Odd 1–31, 41, 43, 45, 47, 51, 53
- 3.3: p. 196 Odd 1–15, 21, 25, 31, 33, 49
- 3.4 p. 204: Odd 1–53
- 3.5 p. 215: Odd 5–19, 25, 27, 35
- 3.6 p. 223: Odd 3–31, Odd 39–49
- Homework 6:
Not to be turned in. Quiz 5 based on these problems: July 9 (take home, due July 11).
- 3.9 p. 249: 3, 5, 7, 10, 11, 13, 15
- 3.10 p. 256: 1, 3, [find both differentials: 11, 13], 15, 17
TEST 2 ENDS HERE
- Homework 7:
Not to be turned in. Quiz 6 based on these problems: July 16(take home, due July 22).
- 4.1 p. 283: 3, 4, 5, 7, 9, 11, 13, Odd 15–61
- 4.3 p. 300: 1, 5, 7, Odd 9–21, 25, 27, 29, Odd 33–51
- 4.4 p. 311 Odd 7–23
- 4.5 p. 321 Odd 1–29
- Homework 8:
Not to be turned in. Quiz 7 based on these problems: July 23 (take home, due July 25).
- 4.7 p. 331 7, 11, 13, 15, 19, 37, 43, 45, 54, 55, 70
- 4.8 p. 342 5, 7, 11, 13, 15, 17
- 4.9 p. 348 Odd 1–51, Odd 59–65, 69
- Homework 11:
Not to be turned in. Quiz 8 based on these problems: July 25 (take home, due July 29).
- 5.4 p. 408 Odd 1–45, 53, 59
- 5.3 p. 399 Odd 5–47, 55, 57, 61
- 5.5 p. 418 Odd 1–47, Odd 53–73, 79
RESOURCES:
MOOCulus is a nice open online calc 1 course from OSU, by Jim Fowler.
WebAssign has
online practice problems, tutorials, ebook and more.
Here's the link to the text website .
Here is the student solution manual
(buy or rent)
..and the study guide .
...while looking for these I noticed that cramster/Chegg
has answers to problems in Stewarts.
In Bierce, lower floor, there will also be available tutoring .
For integration, you can't beat wolfram alpha ,
now providing 3d graphs of surfaces while finding
indefinite double integrals
and
definite double integrals .
Step by step solutions are available too: 3 a day with free account signup.
Here is another with e.
Here is an example with variable limits (non-rectangular domain of
integration ).
Here is a triple integral.
Here is one with polar coordinates .
CREDIT:
The text of this page was adapted, with permission, from an original course site by J.P. Cossey.