# MATH 229 Fall 2017

| Catalogue description | Prerequisite | Course Objectives | Text | Syllabus | Homework | Withdrawal | Grading | Webpages for certain sections | Sample Exams | Tutoring Center | Final Exam | Calculators | Handouts | Extra Practice | Resources on the web | Academic Conduct | DRC Statement | Some advice |

PREREQUISITE: Math 155 or Satisfactory performance on the Placement Exam

• To understand the fundamental concepts of the calculus and connect them with real world problems from other disciplines.
• To value mathematics and develop an ability to communicate mathematics, both in writing and orally.
• To develop mathematical reasoning and problem-solving abilities.
• To attain computational facility in differential and integral calculus.

To those of you who will be going on to Math 230 next semester: Do not sell your Math 229 textbook! You will need it in Math 230. Also, you will do well to refresh your differentiation and integration skills in the weeks before you begin Math 230. That course begins where Math 229 leaves off, and good differentiation and basic integration skills are essential to success in it.

Thomas and Finney, Calculus and Analytic Geometry.
Edwards and Penney, Calculus and Analytic Geometry.
Swokowski, Calculus with Analytic Geometry.
Leithold, The Calculus with Analytic Geometry.

SYLLABUS: Click here for the suggested lecture pace and a more detailed syllabus with dates.

The course will cover Chapters 1-4 and Section 14.3 of the text.

• Limits and Continuity. The Intermediate Value Theorem.
• Tangent and Velocity Problems
• Derivatives: Limit Definition. Differentiation formulas. Trig formulas. Chain Rule and implicit differentiation. Rates of Change.
• Applications of Derivatives: Related Rates. Linear Approximations. Local and Absolute Extrema. Mean Value Theorem. Curve Sketching. Optimization. Newton's Method.
• Integrals: Antiderivatives. The Substitution Rule. Areas and the Definite Integral. The Fundamental Theorem of Calculus.
• Computation of Partial Derivatives.

WITHDRAWAL: The last day for undergraduates to withdraw from a full-session course is Friday, October 20, 2017.

GRADING: Grades will be assigned on the basis of 650 points, as follows:

• 3 hour exams worth 100 points each
• Quizzes and/or homework, 150 points total
• Final exam, 200 points

WEBSITES FOR CERTAIN SECTIONS:

SAMPLE EXAMS: Typical Math 229 exams involve non-routine calculations. You may wish to look at some exams from previous semesters to see the level of analysis we expect students to be able to carry out.

Exam 1 (Spring 2011)
Exam 2 (Spring 2011)
Exam 3 (Spring 2011)
Final Exam (Spring 2011)
Final Exam (Fall 2011)
Final Exam (Fall 2015)
Please note that different instructors assign different exams, so that a certain raw score on one test might be comparable to a very different score on another.

Caution: These exams are from a different semester. The subject matter was comparable, but the text, the audience, the instructor, and the testing environment may have been different from what you will face. The testing points in the syllabus also vary from semester to semester. Please remember in addition that tests cannot be comprehensive; therefore, there are topics not on this test for which the students were - and you will be - responsible for studying in prepartion for the your own test.

CALCULUS TUTORING CENTER: The Calculus Tutoring Center is in DU 326. There is tutoring for 211, 229 and 230 (and 155 when needed). The primary focus is on 229 and 230. There are also tutoring videos and a schedule at this link.

FINAL EXAM: The Final Exam is scheduled for 12:00-1:50 PM, Thursday, December 14, 2017. The final exam will be a comprehensive, departmental examination. All sections of this course will take the same final exam at the same time. Please note that the exam will likely NOT be in your regular classroom. Room assignments from the university are usually made one to two weeks before the final exam week.

CALCULATORS: Students may consider having a graphing calculator with roughly the capabilities of the TI-83. You will find this useful for investigating the concepts of the class, so you can experiment with additional examples. You may also want to verify parts of your homework calculations. Calculators are NOT allowed during the final exam; all of the problems can be solved without their use.

STUDENT HANDOUTS: Please note that any information provided by your instructor supersedes this information.
Partial Derivatives
Suggested lecture pace
Suggested Homework
Supplementary Exercises

EXTRA PRACTICE:
Differentiation Problems
Solutions to Differentiation Problems
Anti Differentiation Problems
Solutions to Anti Differentiation Problems
Practice Substitution Problems
Solutions to Substitution Practice

RESOURCES ON THE WEB:
Understanding Mathematics: a study guide, from the University of Utah.
Calculus resource list from the Math Archives, from the University of Tennessee at Knoxville.
Symbolic calculators which will compute derivatives and integrals.

ACADEMIC CONDUCT: Academic honesty and mutual respect (student with student and instructor with student) are expected in this course. Mutual respect means being on time for class and not leaving early, being prepared to give full attention to class work, not reading newspapers or other material in class, not using cell phones or pagers during class time, and not looking at another student's work during exams. Academic misconduct, as defined by the Student Judicial Code, will not be treated lightly.

DRC STATEMENT: If you have specific physical, psychiatric, or learning disabilities and require accomodations, please let your instructor know early in the semester so that your learning needs may be appropriately met. You will need to provide documentation of your disability to the DRC (Disability Resource Center) Office located in the Health Services Building, 4th floor.

Study for Success. Perhaps the single most important factor in your success in this course is your study habits . This is a fast paced course, with little room for catching up if you fall behind. Successful students have good time management skills. Set aside at least three nights a week to study the topics and work the homework problems. Do not wait until exam time to try to learn new material.

Calculus is based on deep concepts that will be entirely new to you if this is your first calculus course. Even for those of you seeing it for a second time, calculus taught at the university level is presented at a level beyond the mechanical course often taught in high school. A deeper understanding of these new concepts will allow you to solve many difficult problems you have never seen before.

The homework problems are intended to be an aid in reaching this level of understanding, not an exhaustive list of the sorts of tricks you will be required to perform on exams.

In summary, to succeed in this course:

• read the book and the lecture notes;
• work the homework;
• always come to class.
While you're there, think, listen, and ask questions.

Last update: 22-Aug-2016