Math 10B - Calculus II
Summer session I 2023
Lectures
MW 9:00 am-11:50 am PDT via Zoom
SI sections
Tuesday 1:30 - 2:50 pm in TLC 1504
Thursday 1:00 - 2:20 pm on Zoom
Discussions (Zoom)
- (B01) TuTh 10-10:50 am Shihao Zhang
- (B02) TuTh 11-11:50 am Shihao Zhang
- (B03) TuTh 9-9:50 am Nicholas Zhao
- (B04) TuTh 10-10:50 am Nicholas Zhao
Course Materials and Technology
The primary platform for this course would be Edfinity. Homework assignments will be handled through Edfinity. You could access it via the Assignments on Canvas.
Edfinity charges $25 for this course.
Course Description
Integral calculus of functions of one variable, with applications. Antideriva-
tives, definite integrals, the Fundamental Theorem of Calculus, methods of integration, areas and
volumes, separable differential equations.
Instructor and TAs
Instructor: Zeyu Liu.
zeliu "at" ucsd.edu
Office hours: MW 12:00-1:30pm. Zoom link on Canvas
TA (B01, B02): Shihao Zhang.
shz051 "at" ucsd.edu
Office hours: TBD.
TA (B03, B04): Nicholas Zhao.
nizhao "at" ucsd.edu
Office hours: TBD.
SI leader: Angeline Gill.
argill "at" ucsd.edu
Office hours: TBD.
Grading Scale
There will be two methods of calculating your final scores:
Version 1: 30% Homework (the lowest score will be dropped), 30% in class Midterm exams (Jul 12 and Jul 26 (11-11:50 am)), 40% Final Exam (August 4, 8-11:50 am).
Version 2: Homework (30%), best midterm (20%), final exam (50%).
At the end of the course, we will calculate both versions of your grade and give you the higher score. Letter grades will be decided and assigned accordingly using the following grading scheme, and will be based on the following cutoffs.
A+ |
A |
A- |
B+ |
B |
B- |
C+ |
C |
C- |
D |
97 |
93 |
90 |
87 |
83 |
80 |
77 |
73 |
70 |
60 |
Exam policies
Practice exams will be provided.
A one-page cheating sheet (Only one side, not both sides) is allowed for the exam. Calculators are allowed. Online tutors are NOT allowed (i.e. Chegg, etc.) during the exam. Cheating will not be tolerated. See the link below for information on how to promote academic integrity and the consequences of cheating.
https://students.ucsd.edu/academics/academic-integrity/.
As all of the exams are remote, the PDF for the exam will be uploaded both on Canvas and Gradescope a few minutes before it starts, you need to download it and then work on it. You could either write you solutions directly on iPad or write on the paper. Finally you need to upload your solutions to the Gradescope before the due time (If you write on the paper, just take a photo of it and then upload it).
All of your exams will be graded through Gradescope. You will be able to request regrades directly from your TAs through Gradescope during a specific period. Be sure to make your request within the period; no regrade requests will be accepted after the deadline. Note: Your grader will consider your regrade request only if you have explained clearly, thoroughly, and politely why you think an error in grading was made.
Course policies
Notes will be updated on Canvas.
In principle no late homework will not be accepted.
In principle no make-up exams will be given in this course.
It is your responsibility to ensure that you do not have a schedule conflict involving the exams. You should not enroll in this class if you cannot sit for the exams at their scheduled time.
If you have any math questions, please feel free to ask me anytime. You can post your question on Piazza, or talk to me before lectures, in office hours, or reach me by email. (Since I receive lots of emails every day, please first consider to post your question on Piazza, so that our TAs and I can help you in a timely manner. If you want to talk to me, feel free to drop by my office hours.)
Homework policies
The lowest score will be dropped.
There will be 6 HW in total.
HW1 will be due at 11:59 pm on Jul 8th, Saturday.
HW2 will be due at 11:59 pm on Jul 11st, Tuesday.
HW3 will be due at 11:59 pm on Jul 18th, Tuesday.
HW4 will be due at 11:59 pm on Jul 22th, Saturday.
HW5 will be due at 11:59 pm on Jul 25th, Tuesday.
HW6 will be due at 11:59 pm on Aug 1st, Tuesday.
You should complete your homework on your own. You can discuss about the problems but you cannot copy others' work or let others copy your work. Any sign of violation of academic integrity will be reported to the AI office.
Topics Calendar
Remote:
Lecture 1: 1.1-1.2 Antiderivatives, Approximating Areas, The Definite Integral
Lecture 2: 1.2-1.4 The Definite Integral, Fundamental Theorem of Calculus, Integration Formulas and Net Change
Lecture 3: 1.5-1.7 Substitution, Integrals Involving Exponential and Logarithmic Functions, Integrals Resulting in Inverse Trigonometric Functions
Lecture 4: 2.1 Areas Between Curves
Lecture 5: 2.2 & 3.1 Determining Volumes by Slicing, Integration by Parts
Lecture 6: 3.2 & 3.4 Trigonometric Integrals, Partial Fractions
Lecture 7: 3.7 & 2.8 Improper Integrals, Exponential Growth and Decay
Lecture 8: 4.1-4.2 Basics of Differential Equations, Direction Fields
Lecture 9: 4.3 & 5.1 -5.2, Separable Equations, Sequences, Infinite Series
Lecture 10: Review + Practice Final + Answer questions