Announcements
There will be a recitation session on Sunday, March 10, at 2 PM in Bradley 104
Attention! The following problems together with those suggested as a review for the midterms are suggested
as a review before the final:
Review problems for chapter 7: 11, 12, 13, 15, 18, 19, 20, 27
Attention! The following problems are suggested
as a review before Midterm 2:
Review problems for chapter 5: 1, 2, 15, 21, 22, 27
The Midterm Exam will be Monday, February
18 from 6 pm to 8 pm in Bradley 101
Attention! The following problems are suggested
as a review before Midterm 1:
Review problems for chapter 1: 4, 18, 29 a), 38
The Midterm Exam will be Monday, January
28 from 6 pm to 8 pm in Bradley 101
It is not the standard practice exam so do not
try to solve all of them in two hours. The midterm will not have more than
8 problems, so if you
want to create a practice midterm take 8 problems
and try to solve them. Please refresh the ideas of the proofs of the Theorems
that we have proved in class since you will be asked to prove something similar
to these Theorems on the exam.
Review problems for chapter 8: 1, 5, 7, 10, 11, 15,
18, 19
(Last Homework) Section 8.6: 1, 2, 3, 4
It is not the standard practice exam so do not
try to solve all of them in two hours. The midterm will not have more than
8 problems, so if you
want to create a practice midterm take 8 problems
and try to solve them. Please refresh the ideas of the proofs of the Theorems
that we have proved in class since you will be asked to prove something similar
to these Theorems on the exam.
Review problems for chapter 6: 1, 3(integrand = x^2-y^2), 4 b), c), 5, 17,
21, 31
Review problems for chapter 7: 1 a), 3 a), 7, 9
It is not the standard practice exam so do not
try to solve all of them in two hours. The midterm will not have more than
8 problems, so if you
want to create a practice midterm take 8 problems
and try to solve them. Please refresh the ideas of the proofs of the Theorems
that we have proved in class,
since you will be asked to prove something similar
to these Theorems on the exam.
Review problems for chapter 2: 5, 11, 17, 27,
37
Review problems for chapter 3: 4, 15, 22, 25
Review problems for chapter 4: 4, 9, 10, 12,
28