Math V21A Start Page, Spring 2009
Introduction and Announcements
Welcome to the start page for Math V21A (Calculus/Analytic Geometry I) at Ventura College. Michael Bowen (email) will be teaching this course during the spring 2009 semester.
Important note: This web page is not a substitute for attending class; regular attendance is an expectation of this course. Modifications to homework assignments, and other important news announced in class, may not appear on this page for several days. You are still responsible for all assignments and in-class announcements even if they do not appear here! If you wish to verify information on this page, please contact the instructor.
Textbook Information
The ISBN number is provided as a convenience if you wish to purchase this item online. The VC bookstore may stock a different ISBN number; either may be used for the course. If you buy from the bookstore, obtain the least expensive version you can find; do not pay extra for MyMathLab, WebAssign, or other software. Exception: You may wish to purchase the textbook bundled with the student edition of Maple; although we will not use it this semester, your V21B or V21C instructors may use it later. If you obtain the book from another source, please be sure to obtain the correct edition, as noted below. Older editions are, of course, much less expensive, but the homework problems are different. This will place you at a disadvantage relative to your classmates on quizzes, which are taken directly out of the homework problems in the current edition.
This text is required:
- Author: J. Stewart
- Title: Calculus: Early Transcendentals, Sixth Edition
- ISBN-10: 0-495-01166-5
- ISBN-13: 978-0-495-01166-8
This additional text is optional:
- Author: J. Stewart
- Title: Study Guide for Stewart's Single Variable Calculus: Early Transcendentals, Sixth Edition
- ISBN-10: 0-495-01239-4
- ISBN-13: 978-0-495-01239-9
Holidays
Classes at Ventura College will meet Monday through Friday each week of the semester, excepting only the dates listed below.
- Monday 19 Jan 2009 (King's Birthday)
- Friday 13 Feb through Monday 16 Feb 2009 (Presidents' Day)
- Friday 3 Apr through Friday 10 Apr 2009 (Spring break)
Homework Club (Office Hours) During Finals Week
- Monday 11 May 2009: 7:00 to 8:30 p.m. at Math Center (SCI-223)
- Tuesday 12 May 2009: 2:00 to 3:00 p.m. at Tutorial Center (first floor of LRC building)
- Wednesday 13 May 2009: 1:00 to 2:30 p.m. at Tutorial Center (first floor of LRC building)
- Thursday 14 May 2009: 11:15 a.m. to 12:15 p.m. at Math Center (SCI-223)
- Saturday 16 May 2009: 10:00 to 11:00 a.m. at Math Center (SCI-223)
Final Examination
Date/time: Monday 18 May 2009, 10:00 a.m.
Be sure that your big party to celebrate the end of finals occurs after the appropriate date. Requests for administration of early or late finals that require the instructor to reschedule his work or make a special trip to campus are subject to a deduction of points, regardless of the reason for the request.
Grading Status
Check whether final grades are posted yet for your course.
Current Assignments
- These are listed in reverse chronological order.
- Note: "EOO" (every other odd) means to do problems
1, 5, 9, 13, 17, 21, 25, 29, 33, 37, 41, 45, 49, 53, 57, 61, etc. - Note: Please do "E.C." (extra credit) problems on a separate sheet of paper from the regular assignment.
| Due Date |
§ | Title | Problems | E.C. |
|---|---|---|---|---|
| 18 May 2009 |
Final Examination (Chapters 3–4) Recommended study problems suggested at right Bring your Chapter 3.9/3.10/3.11/4.x homework to the final to turn in (up to 20 points credit) Exam starts at 10:00 a.m. |
(For students with minimal study time) Page 262 (Exercises): 83; 87; 89abc; 92–94 ALL; 97; 99; 101; 102a; 103a Page 348 (Exercises): 1–13 ODD; 18; 19–33 ODD; 45; 47; 53–59 ODD; 65–73 ODD; 79a; 79c |
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(For students with additional study time) The above plus Page 262 (Exercises): 2–54 EVEN; 68; 84; 88; 90; 96; 98; 102ac; 104 Page 261 (Concept check): 2; 5 Page 261 (True-false quiz): 12 Page 348 (Exercises): 2–14 EVEN; 20–34 EVEN; 46–58 EVEN; 66–74 EVEN; Page 347 (Concept check): 1–7 ALL Page 347 (True-false quiz): 1–20 ALL Additional problems taken from the unassigned homework exercises |
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| 13 May 2009 | 3.10 | Linear Approximations and Differentials | 1; 3; 5 (graph is optional); 11–27 ODD; 33–39 ODD | — |
| 3.11 | Hyperbolic Functions | 1–21 ODD; 31–47 ODD; 51–55 ODD | 48; 52; 57 | |
| 11 May 2009 | 4.3 | How Derivatives Affect the Shape of a Graph | 1–23 ODD; 31; 33–53 EOO; 69; 77 | — |
| 4.4 | Indeterminate Forms and L'Hospital's Rule | 5–63 EOO | — | |
| 4.5 | Summary of Curve Sketching | 1–51 EOO; 61–65 ODD | 53; 56 | |
| 4.6 | Graphing with Calculus and Calculators | (No assignment) | 2; 4; 6; 8 | |
| 4.7 | Optimization Problems | 1–33 EOO; 41; 49; 57 | 63 | |
| 3.9 | Related Rates | 1–13 ODD; 17–41 EOO | — | |
| 4 May 2009 | 4.1 | Maximum and Minimum Values | 29–43 ODD; 47–61 ODD | — |
| 4.2 | Mean Value Theorem | 1–7 ODD; 11–25 ODD | — | |
| 29 Apr 2009 |
Chapter 4.9–5.5 Test (Last chapter test before the final exam) Recommended study problems suggested at right |
(For students with minimal study time) Page 350 (Exercises): 65–74 ALL; Page 409 (Exercises): 1–37 ODD; 43; 45; 47; 57; 59; 67 (use the Substitution Rule and set u = f(x)) |
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| (For students with additional study time) The above plus Page 347 (Concept check): 10 Page 347 (True-false quiz): 18; 19 Page 409 (Exercises): 8–38 EVEN; 44; 46; 48; Page 408 (Concept check): 4b; 5; Page 409 (True-false quiz): 1–15 ALL; and Even-numbered problems from the ranges of the Section 4.9 and Chapter 3 homework assignments |
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| 27 Apr 2009 | 5.3 | The Fundamental Theorem of Calculus | 7–41 ODD | — |
| 5.4 | Indefinite Integrals and the Net Change Theorem | 1–17 ODD; 21–43 ODD; 57a; 59 (in part (b), replace "distance" with "displacement", which means your answer won't agree with the back of the book); 61 | — | |
| 5.5 | The Substitution Rule | 1–45 ODD; 51–69 ODD | — | |
| 20 Apr 2009 | 5.1 | Areas and Distances | 1; 5; 11; 15; 17; 19 | — |
| 5.2 | The Definite Integral | 1; 5; 17; 19; 27; 33 | — | |
| 13 Apr 2009 | 4.9 | Antiderivatives | 1–17 EOO; 25–45 EOO; 57; 59; 61 | — |
| 3–12 Apr 2009 | No class (spring break) | |||
| 2 Apr 2009 |
Chapter 3.1–3.6 Test Recommended study problems suggested at right |
(For students with minimal study time) Page 262 (Exercises): 1–41 ODD; 49; 51; 53; 57–61 ALL; 63ab; 65; 67 |
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| (For students with additional study time) The above plus Page 262 (Exercises): 2–46 EVEN; 52; 54; 68 Page 261 (Concept check): 2a through 2n Page 261 (True-false quiz): 1–11 ALL Even-numbered problems from the ranges of the homework assignments from sections 3.1–3.6 |
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| 30 Mar 2009 | 3.4 | The Chain Rule | 1–53 ODD; 81 (graph is optional) | 70; 90 |
| 3.5 | Implicit Differentiation | 1–19 ODD; 25; 27; 29; 33; 35; 39; 41; 45–53 ODD; 57–61 ODD | — | |
| 3.6 | Derivatives of Logarithmic Functions | 1–51 ODD (graphs on 35 are optional) | — | |
| 23 Mar 2009 | 3.1 | Derivatives of Polynomials and Exponential Functions | 9–35 ODD; 39–42 ALL (just find the derivative; don't worry about the graphs); 45; 49; 51; 55; 71 | 64; 70; 77 (must show steps to earn credit) |
| 3.2 | The Product and Quotient Rules | 3–33 ODD | — | |
| 3.3 | Derivatives of Trigonometric Functions | 1–23 ODD; 25a; 27a; 29; 35; 39–47 ODD | — | |
| 13 Mar 2009 |
Chapter 2 Test Recommended study problems suggested at right |
(For students with minimal study time) Page 167 (Exercises): 1–19 ODD; 21–24 ALL; 25; 27; 29–38 ALL; 39ab; 40–44 ALL; 45ab; 46abc; 47; 48; 52 |
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| (For students with additional study time) The above plus Page 167 (Exercises): 4–20 EVEN; 26; 28 Page 165 (Concept check): 2; 4; 6–15 ALL Page 166 (True-false quiz): 1–20 ALL Even-numbered problems from the ranges of the Chapter 2 homework assignments |
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| 9 Mar 2009 | 2.7 | Derivatives and Rates of Change | 5–21 EOO; 25–35 ODD | — |
| 2.8 | The Derivative as a Function | 1–11 ODD; 19–29 ODD; 41; 43; 57 | Write down how Hotel Infinity accommodated all the passengers from Infinity Bus Lines; specifically, how the room assignments were rearranged | |
| 2 Mar 2009 | 2.6 | Limits at Infinity; Horizontal Asymptotes | 13–33 EOO; 39–43 ODD; 49; 51 | — |
| 23 Feb 2009 | 2.5 | Continuity | 3; 9–27 ODD; 31–39 ODD; 45–51 ODD | — |
| 17 Feb 2009 | 2.4 | The Precise Definition of a Limit | 15–31 ODD; 42; 43 | — |
| 9 Feb 2009 | 2.2 | The Limit of a Function | 5; 7; 9; 17–31 ODD; 37 | 40 |
| 2.3 | Calculating Limits Using the Limit Laws | 1–29 ODD; 35; 39; 43; 49 | 52 | |
| 2 Feb 2009 | 2.1 | The Tangent and Velocity Problems | 1; 5; 9a | — |
| 30 Jan 2009 |
Chapter 1 Test Recommended study problems suggested at right |
(For students with minimal study time) Page 74 (Exercises): 1–3; 5–17; 19; 22–26 |
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(For students with additional study time) Page 73 (Concept check): 1; 3; 4; 6; 9–12 ALL Page 73 (True-false quiz): 1–13 ALL The above plus even-numbered problems from the ranges of the Chapter 1 homework assignments |
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| 26 Jan 2009 | — | Syllabus Worksheet (obtain a copy) | ||
| 1.5 | Exponential Functions | 5; 7; 9; 25 | — | |
| 1.6 | Inverse Functions and Logarithms | 5; 7; 9; 11; 21; 23; 25 Optional extra practice 33–39; 59–64 if you are "rusty" on log or trig functions |
— | |
| 20 Jan 2009 | 1.1 | Four Ways to Represent a Function | 1; 5; 6; 7; 8; 13; 17; 19–43 ODD; 45–61 EOO; 65; 67; 69 | — |
| 1.2 | Mathematical Models | 1; 3; 5; 9; 11; 13; 17; 19; 20 | — | |
| 1.3 | New Functions from Old Functions | 1–7 ODD; 9–21 EOO; 29–45 EOO; 51; 57; 63 | — | |
| 1.4 | Graphing Calculators and Computers | (No assignment) | — | |
| 19 Jan 2009 | No class (holiday) | |||
Future Assignments
- These are tentative; the instructor may make changes to this list from time to time.
- Students must not rely on printed versions of this list; instead, they should check the live online version periodically for possible updates.
- Students who work ahead and complete one or more assignments in advance are taking a risk that the assignment(s) may change before the due date, in which case the advice in the preceding sentence is particularly applicable.
- Students are responsible for completing the assignments as finalized in the Current Assignments section above, and should not expect to earn extra credit for completing tentatively assigned exercises that are later modified or removed from this list.
- (Due dates to be determined)
Course Handouts and Study Aids
The documents listed below are available for viewing or download. The list below provides links to download free software to read the file formats of the various documents.
- PDF (Adobe® Acrobat Reader™) is the best format to use if you want to print on paper (for example, to replace a lost copy).
- HTML files are not, for the most part, printer-friendly; this is the best format for on-screen reading, and if you can read these words, you already have the software!
- DOC files are in the native Microsoft® Word format; if you do not have Word, use this Word Viewer from the Microsoft web site (this software can display Word files, but cannot modify them).
- PPT files are PowerPoint® presentations; if you do not have PowerPoint, use this PowerPoint Viewer, again from the Microsoft web site.
Course Handouts
- Course Information: (HTML) | (PDF)
- Course Requirements and Grading, Side 1: (HTML) | (PDF)
- Course Requirements and Grading, Side 2: (HTML) | (PDF)
- Tips for Success: (HTML) | (PDF)
- Standards of Student Conduct and Classroom Rules (HTML) | (PDF)
- Syllabus Worksheet: (DOC) | (PDF)
- Instructor's Schedule (PDF; not really a handout; this is a copy of the printed schedule that appears on the instructor's office door)
Study Aids
- Multiplication Tables: (DOC) | (PDF)
- Divisibility Rules: (DOC) | (PDF)
- Sieve of Eratosthenes (PDF) with directions (finds prime numbers) (HTML)
- Powers of Ten Tutorial (off-site; requires Java™ Runtime Environment [free download] to be installed and enabled on your computer): (HTML)
- Translating English Phrases Into Algebraic Expressions: (DOC) | (PDF)
- Multilingual Vocabulary for Mathematics (possibly helpful for students whose first language is not English): (HTML)
- Basic Algebra Review: (DOC) | (PDF)
- Basic Geometry Review: (PPT) | (PDF)
- Rectangular Graph Paper (PDF): 5 squares to the inch | 2.5 squares to the inch
- Transformations of Functions (may require downloading and installation of free software to view all portions; see the page itself for details): (HTML)
- Essential Trigonometric Identities for Physics & Calculus: (DOC) | (PDF)
- Polar Graph Paper (PDF): 15-degree markings | 10-degree markings
Will You Succeed or Fail in Mathematics?
This checklist is adapted from a handout prepared by math and philosophy instructor Steve Thomassin. It will allow you to compare your approach to a mathematics course to the approaches taken by successful … and unsuccessful … students.
| Attribute Type | Predictor of Success | Predictor of Failure |
|---|---|---|
| Attitude | Focus on things that are under your control. | Blame things that are out of your control (the text, the instructor, or "the system") for your difficulties. |
| Be optimistic. Believe that you can do it. | Be pessimistic. Convince yourself that you will fail. | |
| Be positive. Find ways to make math interesting and fun. | Be negative. Find ways to make math dull and painful. | |
| Be open. See the uses, power, patterns, and magic of mathematics. | Be closed. Blind yourself to math's uses and its practical and esthetic value. | |
| Be practical. Make yourself aware of the doors that passing each math class opens to you. | Be impractical. Ignore the doors that open when you pass a math class. | |
| Class Work | Attend every class. Aim for perfect attendance, even if you already know it all. | Be absent often. Dig a hole so deep that you cannot climb out except by dropping the course. |
| Be focused. Concentrate on the math topic at hand. | Be mentally elsewhere. Daydream. Talk. Distract and annoy neighboring students. | |
| Take good notes. Solve problems along with the instructor. | Avoid participating in the discussion. Just watch the instructor. | |
| Be inquisitive. Ask questions so that the instructor knows what you would like to learn more about. | Be uninterested. Make the instructor guess what it is that you might be confused about. | |
| Homework | Be regular. Always do at least some homework before the next class, and finish by the due date. | Be sporadic. Do homework only when it easily fits your schedule. |
| Invest time. Spend double to triple the amount of in-class time. | Invest little time. Spend less time doing homework than you spend in class. | |
| Review notes; read text; do all assigned problems (maybe even more), and check the answers. | Ignore notes and text explanations; try a few problems, and don't bother checking to see if they are right. | |
| Getting Help | When needed, take advantage of all opportunities: study groups, tutors, instructor office hours. | Even when lost, never seek assistance. |
