Calculus I - Math UN1101 - Section 001.
Fall 2022.
Columbia University.
Classroom: Room 203 Mathematics.
Mo, We 11:40am-12:55pm.
Name: Daniele Alessandrini.
Contact: daniele.alessandrini@gmail.com.
Office: 624 Mathematics.
Office hours: Mo 10:30am-11:30am in Room 622 Mathematics, We 2pm-3pm, in Room 329 Uris Hall.
The Help Room is a place for students to seek assistance with material that comes up in the course. The room is staffed by graduate students and undergraduate teaching assistants. The relevant Help Room for this course is at 502 Milstein Center, on the Barnard campus. You can go to the Help Room at any time when it is open, see here for the schedule.
The TAs grade the assignments and can answer questions from students. You can ask them questions by email, and they serve in the Help Room at 502 Milstein Center on the Barnard Campus, where you can meet them to ask your questions. You can find their email addresses on Courseworks at the Syllabus page.
| Name | Help Room Schedule |
|---|---|
| Patrick Lei | Mon 9am-10am, Tue 6pm-8pm |
| Hreedi Dev | Wed 3pm-4pm, Thu 12pm-1pm |
| Martha Njuguna | Tue 12pm-1pm, Thu 6pm-7pm |
| Hanzhang Zhao | Tue 1pm-2pm, Wed 4pm-5pm, Thu 1pm-2pm |
The Syllabus for this course.
Calculus: Early Transcendentals, 9th edition, by James Stewart (CENAGE Learning). The book is available at the Columbia bookstore. If you have the 8th edition or an earlier edition that is probably fine too.
In this course we will describe some basic ideas and techniques that lie at the foundation of all pure and applied mathematics. We will discuss about functions and their limits, dervatives and integrals. We will focus on their meaning, significance, applications and methods of computation. We will use the first six chapters of the course textbook (Calculus, Early Transcendentals, by Stewart).
| Date | No | Topic | Textbook Reference |
|---|---|---|---|
| 22/09/07 | 01 | Introduction; Prerequisites: Fractions and radicals, Equations. | n/a |
| 22/09/12 | 02 | Prerequisites: Equations, Inequalities. | n/a |
| 22/09/14 | 03 | Prerequisites: Simultaneous inequalities. Functions, Graphs. | Sec. 1.1. |
| 22/09/19 | 04 | Graphs, Range. Increasing, decreasing and 1-1 functions. | Sec. 1.1. |
| 22/09/21 | 05 | Inverse functions. | Section 1.1, 1.5. |
| 22/09/26 | 06 | Exponential and logarithms. Equations and inequalities with powers, roots, exponentials and logarithms. | Section 1.2, 1.4, 1.5. |
| 22/09/28 | 07 | Trigonometric functions and equations. | Appendix D. |
| 22/10/03 | First Midterm. | n/a | |
| 22/10/05 | 08 | Introduction to Limits. | Section 2.2, 2.6. |
| 22/10/10 | 09 | Limit laws. | Section 2.3, 2.6. |
| 22/10/12 | 10 | Limit laws. | Section 2.3, 2.6. |
| 22/10/17 | 11 | Limits. Intermediate value theorem. | Section 2.5. |
| 22/10/19 | 12 | Graphing continuous functions. Introduction to Derivatives. | Section 2.5, 2.6, 2.8. |
| 22/10/24 | 13 | Derivatives, Derivatives of rational functions, Graphing functions. | Section 3.1, 3.2, 3.3, 4.3. |
| 22/10/26 | 14 | Rates of change. Non-differentiable functions. Chain rule. | Section 2.7, 3.4. |
| 22/10/31 | 15 | Graphing Functions. Derivative of the inverse function. | Section 4.5, 3.6. |
| 22/11/02 | 16 | L'Hospital Rule | Section 4.4. |
| 22/11/07 | Holiday | n/a | |
| 22/11/09 | 17 | Absolute and local maxima and minima. | Section 4.1 |
| 22/11/14 | Second Midterm. | n/a | |
| 22/11/16 | 18 | Second derivative, concavity. | Section 4.3. |
| 22/11/21 | 19 | Second derivative test. Integrals. The fundamental theorem of calculus. | Section 5.3. |
| 22/11/23 | Holiday. | n/a | |
| 22/11/28 | 20 | Integrals. Substitution Rule. | Section 5.3, 5.5. |
| 22/11/30 | 21 | Substitution and Integration by parts. | Section 5.5, 7.1. |
| 22/12/05 | 22 | Integration by parts. Area between curves. | Section 7.1, 6.1. |
| 22/12/07 | 23 | Computation of volumes. | Section 6.2. |
| 22/12/12 | 24 | Review lecture. |
There are no formal pre-requisites; anyway, an understanding of pre-calculus will be assumed. This includes high school mathematics.
If your pre-calculus is weak, the textbook has some review material in Appendix A and B. Moreover, the section "Principles of problem solving", at the end of Chapter 1 can also be helpful.
You can also consider the book Precalculus, Mathematics for calculus, by Stewart, Redlin, Watson. This book is not required, and not important for most students. It is useful only if you have gaps in your background knowledge.
Also, you can consider the website Khan Academy, it has plenty of useful instruction material freely available.
The homework will be published online in form of homework sheets every Wednesday night. You have 6 days time to submit the written solutions.
Written assignments will be due in the night between Tuesday and Wednesday, more precisely on Wednesday early morning at 5:00am. Submission is online, via Courseworks, at the Gradescope page.
We will accept late homework, but we deduct 10% of the points for every day of lateness.
| Date | Number | Topic | Submit by | Grader | Answers |
|---|---|---|---|---|---|
| 22/09/07 | 01 | Prerequisites | 22/09/13 | Martha | Answers 1 |
| 22/09/14 | 02 | Inequalities and Functions | 22/09/20 | Hanzhang | Answers 2 |
| 22/09/21 | 03 | Inverse Function | 22/09/27 | Hreedi | Answers 3 |
| 22/09/26 | 04 | Exponential functions | 22/10/04 | Martha | Answers 4 |
| 22/10/05 | 05 | Trigonometric equations and Limits | 22/10/11 | Hanzhang | Answers 5 |
| 22/10/12 | 06 | Limit Laws | 22/10/18 | Patrick | Answers 6 |
| 22/10/19 | 07 | Limits and continuous functions | 22/10/25 | Hreedi | Answers 7 |
| 22/10/26 | 08 | Derivatives | 22/11/01 | Patrick | Answers 8 |
| 22/11/02 | 09 | Graphing functions | 22/11/08 | Martha | Answers 9 |
| 22/11/09 | 10 | Maxima and Minima | 22/11/15 | Hreedi | Answers 10 |
| 22/11/16 | 11 | Concavity | 22/11/22 | Hanzhang | Answers 11 |
| 22/11/23 | 12 | Integrals | 22/11/29 | Patrick | |
| 22/11/30 | 13 | Integration techniques | 22/12/06 | Patrick and Hanzhang | Answers 13 |
| 22/12/07 | 14 | Integrals and applications | not graded | n/a | Answers 14 |
| 22/12/12 | Mock Exam | not graded | n/a | Answers Mock Exam |
There will be midterm exams on Monday October 3rd and on Monday November 14th, during the usual class times.
Final exam: Projected schedule for the final exam: Monday December 19th, 9am– Noon. The date will be confirmed by the university in November.
You must plan to take the midterm and final exams at the scheduled time, so please make your plans accordingly. Besides students with disabilities having prior arrangements with DS or CARDS, the only exceptions will be for those with an incapacitating illness, a serious family emergency, or situations of comparable gravity. In this case you will need to ask your advising dean to send me a note. If your advising dean approves your reason for skipping a midterm, I will use the grade of your final exam as grade for your midterm. For the final exam, we will organize a make-up exam in January, at the beginning of the Spring semester. Incompletes can be granted only by your advising dean and only in the circumstances mentioned above.
Anyone guilty of academic dishonesty, such as cheating on an exam or helping someone else to cheat, will fail the course and faces further academic discipline.
Homework 10%, midterms 25%, final 40%.