Math 236: Calculus II
Fall 2007

Homework Page

In general, written and reading homework should be thoroughly attempted before the next class meeting.
Written homework is due at the beginning of class, two class meetings after it is assigned.

Date Assigned Date Due
Assignment
8/27 8/29
8/30


Read:  7.1, 7.2 of the text, and look at the unit circle web site, at least, from the links page of this site.
Do:  (a) Send me an e-mail. If you have one, attach a small jpeg image of yourself , for me to attach to my index card.
         (b)  Review the motivating questions from class
8/29
8/30
8/31
Read: 7.3-7.5
Do: 7.1: 1, 27, 29, 31
      7.3: 3,7         Recommended:  1, 5,
8/30
8/31
9/3
Read: review 7.4
Do:  7.4 1,3,5,9,15,17,23,31,33,35,39,41,43,51,53
       Underlined problems are required for both sections; the remainder are required for section 1 and recommended for section 2
8/31
9/3
9/5

Read: 7.6
Do: 7.2 1-37, 65-79, 101-111 section 1, odd problems; section 2 every other odd required, the rest are recommended
9/3
9/5
9/6
Read: 7.7
Do: 7.6 1-9, 17-35  
9/5


Read: chapter 7 review as necessary
Do: 
9/6
9/7
9/10
Read: chapter 7 review as necessary
Do: 7.6: 45, 47, 49, 51, 53
9/7
9/10
9/12
(9/14 after sick day)
Read: chapter 7 review as necessary
Do: Exercise A
9/10
9/12
9/14
Inaugural Math & Stat Colloquium: Sudoku: Problems, Variations and Research, at 3:45 in Roop 103
Read:  review 7.7 as necessary
Do: 7.7: 1, 3, 5, 15
       Exercise B
9/12


no class--sick day
9/13


Problem Day
no new assignment
9/14
9/17
9/19
Read: 8.1, 8.2
Do:  7.7: 13-21 odd, 23, 25, 31
9/17

Read:  8.2, 8.3
Do:   8.1: 3,5,7,9,11
         Exercise C
9/19

Monday 9/24
Read:  review chapter 7 notes and the exercises. Here is a practice exam.
 Do: 8.2 1-45 odd
9/20 9/24
no new assignment
9/21


Exam I in class
Read: 9.1, 9.2
9/24

Read: 9.2
Do: 9.1: 1-47 every other odd (so 1, 5, 9)
9/26
10/1
9/28
Read:  9.3
Do: 9.2: 1-47 odd
9/27
9/28

Read:  9.6
    No new problems
9/28
10/3
10/3
Read:  9.8
Do: 9.3: 3, 9, 16, 19, 33
     9.6: 9, 13, 43, 45, 51
10/1


REGISTER FOR SUMS:
Read:  9.8
Do: 9.6: 15, 19, 21, 25, 35, 49, 53, 55
10/3

 Do: ponder 9.8
10/4

Do: Find an example of your own to illustrate that when using partial fractions, it is necessary to have one term for each power of each factor of the denominator. To do this, you need a rational function, an attempt at decomposition with not enough terms, and a clear explanation of why the attempt must fail.
10/5
10/10
Do: 9.8: 1a,b, 3a,b,19 ab, 21a,b 35, 39 using Midpoint Rule (your answer will not match the back of the book, as the book assumes Simpson's rule.)
10/8
10/10
Spend an hour of uninterrupted time thinking about the derivaition of the error bound for trapezoid rule. Scout's honor.
10/10
10/11

Read:  10.1
Do: Write out a clean version of the derivation for trapezoid error bound.
10/11
10/12
10/15
Review 10.1
Do:  9.8: 1c, 3c, 7, 9, 13, 15, 21c,  28, 29, 31, 33
10/12
10/15
10/15
Read:  10.2
Do: review algebra of limits (in chapter 2)
10/13
(Saturday)


GO TO:  SUMS Conference
10/15
10/17
10/17
Read: 10.2
Do: - think of review questions you would like to discuss on Wednesday
       -here is a practice exam (strictly optional, not to hand in). The same caveats apply to this practice exam as to the  last one.
10/17
10/22
10/24
Review 10.2, algebra of limits
Do: 10.1: 1-55 (if you are comfortable with limits, you can do every other odd)
10/18
mid-semester grades due


Exam II in class
Read:  tba
Do: tba
10/19


Fall Holiday: no class
10/22
10/25
10/26

Read: 10.3
Do: 10.2: 33, 35, 37, 39, 40, 41,
                also, as many odd numbered problems from 1-31 as you need in order to be comfortable with the method.
10/24

Class rescheduled
10/25
10/26
11/1
Read:  review proofs of EMVT, L'H
Do: 10.3: 1-63 every other odd (1,5,9,...)
10/26
10/29
11/1
Read:  11.1
Do: 10.3:  3-63 every other odd (3, 7, 11...)
10/29


Read:  your notes
Do: continue with 10.3
10/31


Read:  your notes
Do: check that all the functions claimed to be bijections really are
11/1
11/2
11/5, but
11/2 is better
Read:  11.2 (though we may not discuss it until Monday)
Do: Decide on your own what the statement of an Algebra of Limits theorem for limits of sequences should look like. Then prove the constant and sum cases.
11/2


Read:  11.1, your notes
Do: Exercise E
11/5


Read:  your notes, until the proofs of the algebra of limits theorem from today make sense, and 11.2
Do: 11.1, 1-29, 31 for the peppy and the lazy
11/7


Read: your notes
Do: think about the prooofs from class
11/8


Read:  your notes
Do: 11.2 1-33 odd
11/9


Class does not meet
11/12
11/14
11/
Read:  11.3
Do: think about proofs
11/14


Read: 11.4
Do: 11.3 1-35 odd
Here is a practice exam
11/15

Read:  review
11/16


Exam III in class
Read:  tba
Do: tba
11/19


Read: your notes
11/26
11/28
11/29

Read:  11.5
Do: 11.3: 1, 3-15 every other odd, 17, 21-37 odd
      11.4: 9-33 odd, 34
11/28


Read:  11.6
Do: 11.5 1-33 every other odd
11/29


Read:  11.7
Do: 11.6 1-33 every other odd
11/30


Read:  11.7
Do: review
12/3


Read: 11.8, 11.12
Do: 11.7 1-35 every other odd
12/5


Read:  11.9, 11.10, 11.11
Do: review
12/6


Review 11.8-11.12

12/7


Review, directions for further study, course evaluations

Review sessions: Sunday 5-6 pm in Roop 103 and Tuesday 5-6 pm in Roop 103
         Final exams:
Section 1 final exam will be Wednesday, December 12 from 8-10 am in Burruss 33.
Section 2  final exam will be Monday, December 10, from 8-10 am in  Burruss 33.