Martin Flashman's courses- Math 110 Summer, '00

Martin Flashman's Courses
Math 110 Calculus II Summer, '00
MTWR 10:00-11:20 SH 128
Final exam- 8-9-00 10:00-12:00

Course Description
Course Assignments: Text Problem lists

Course Problem of the Week (sometimes with hints, etc.)
Calculus @UTK Courses at the Univ. of Tenn. that use the Stewart text book (Calculus: Concepts and Contexts) They provide some useful supplementary materials for Math 109,110,210.
Visual Calculus (Univ. of Tenn.) calculus (first year) tutorials, etc.
For an entertaining 20 minute review of the major concepts of Calculus I, you might try Thinkwell's Calculus [Contact me for more information.]
Web-based study guides from Oregon State University
Instructions for Winplot prepared by Gerald Hile (Hawaii).
Calculus web sites for surfing.

Back to Martin Flashman's Home Page :) Last updated: 7/27/00 Summer, 2000 Problem Assignments(Tentative as of 5-6-00) M.FLASHMAN
MATH 110 : CALCULUS II Stewart's Calculus 4th ed'n. (*= interesting but optional)

Assignments and recommended problems I Background Reality Check
6/1 -->IV.D 1-11 odd 23. 24
6/1--> 4.10. 43, 45, 47, 48, 51, 52
6/5 -->10.2 (i) 2-6, 9, 11, *15
        6/5-->   (ii) 21, 23
6/5-> IV.E 5-9 odd (a,b), 20 21,24
6/5 Read pp 416-422 exponential functions, I.F.2 , 428-430(review of logs)
6/6-->I.F.2   3, 4
6/6-> Read VI.A, do7.2 (i) 29, 33, 34, 37, 47-51, 57, 61, 63, 53
6/7->               (ii)      Problems lost: 60, 62, 70, 71-77 odd, 79, 80, 85, 86
6/6-> 7.3 Review of logs 3-17 odd, 31, 33, 35, 41, 47, 59-61, *78
6/7--> Read VI.B.
6/8 -> 7.4 (i) 3-9 odd, 25, 28, 8, 22
6/8 ->     (ii) 15, 13, 35, 52
6/12-> Log diff'n (iii) 45-47, 53, 58, *64
6/8 -> Integration (iv) 65 - 71 odd
6/8 -->   VI.B: 13,14
6/8--> Read VI.C
6/13 --> p468 :19, 23, 33, 37, 51
6/13 Read about the inverse tangent function on p472-3. Do:7.5 , 2a,3a,5b, 16

          Assignments and recommended problems II 6/14--> VI.D 1-4; 9-13; 21 *(22,23)
6/14--> 7.5 (i) 25-27,34,38, *58
       (ii) 59, 62, 64, 67, 69, 70, 74*, 75*
             (iii) 22, 23, 24, 29, 20, 47, 48, 63, 68
6/15--> Read VII.C
6/15--> 8.1 ( integration by parts) (i) 1-11 odd; 33, 51, 54
6/19-->      (ii) 15, 21, 23, 25, 29, 30, 41, 42, 45, 46
6/19--> 10.3 (separation of variables) 1,3,4,7, 9, 10, 15
6/20 --> 10.4. (growth/decay models) (i) 1-7 odd ; (ii) 9-11;
6/21->                    (iii) 13,14, 17
6/21->       10.5 (logistic models) 1, 5, *(11,12 POW?)
6/21->       8.7 (numerical integration) (i) 1,4, 7a, 11(a,b), 27 ( n= 4, 8), 33a
6/27->          (simpson's method) (ii) 7b, 11c, 31, 32, 35, 36, *44, 29
                  More help on Simpson's rule, etc can be found in V.D

Assignments and recommended problems III

6/21->      Begin to Read VII.F(rational functions)
6/22 -> 8.4 (i) 13,14, 29
6/28->      (ii) 15, 16, 17, 20, 21, 25
6/29->         (iii) 31, 35, 36, 62
6/22-> 8.8 (improper integrals) (i) 3, 5,7,8,9, 13,21, 41
6/28->               (ii) 27-30, 33,34, 37,38
7/5->              (iii) 49, 51, 55, *60, 61, 57, 71
7/5 ->Read IXA : Problems due 7/6: 1-3
7/10->       IXA: 4, 6, 8, 9, 10
7/10-> Read IX B
7/11->     IX B: Problems due 7/11 (i)1,2,4, 5, 7, 11, 13,14, *23
7/12->IX.C:   (i) 1-5
7/12->IX.C    (ii) 6-8
7/17-> IX.C   (iii) 11,13,15-17
7/13-> IX.D: 1,3,5,8,10, 14, 15

7/17->read 12.1 pp 727-729, examples 5-8 (sequences converge)also X.A
7/17->    12.1: 3-23 odd
7/18 -> read 12.2 pp 738 -741 (series- geometric series)
7/19-> 12.2 (i) (series- geometric series): 3, 11-15, 35-37, *51
7/20->   read 12.2 pp 742-745 (ii) 21-31 odd, 41- 45, 49, 50
7/24-> 12.3: (i) 1, 3-7
7/24->           (ii) 9-15 odd
Optional: Read X.B1_4

7/19-> 8.2 (trig integrals) (i) 1-5, 7-15 odd
7/20-> (ii) 21-25 odd, 33, 34, 45, 44, 57, *(59-61)

8.3 (trig subs)
7/25->      (i) pp 517-519 middle: 2,4,7,11
7/27->        (ii) pp 519-520: 3,6, 19, 9
7/31->       (iii) pp 521-522: 1,5, 21, 23, 27, 29
Ch 8 review problems: 1-11 odd, 33, 35

Assignments and recommended problems IV

7/27-> Read 7.7 p 487 note 3 : (i) 5-11 odd
7/31->        Read examples 1-5: (ii) 21, 27, 29, 15, 23, 18, 33
8/1 -> read examples 6-8   (iii) 39-43 odd; 47-51 odd, 67, 71
8/2 ->      (iv) 55, 57; 63; 69, *96, *97

8/3-> 11.6 : read pp 709-10 (i) 1-7 odd; 27, 29
8/3->       read pp 711-12(ii) 11-14; 31,33
8/7->         (iii) 19-22; 37,39; 47, *50
    9.1 : 1,3; 19, 21
    9.2?: 5, 7, 9
    9.5 : 1, 3, *7

7/31-> 12.4: (comparison test) (i) 3-7
-> (ii) 9-17 odd
7/31-> 12.6: Use the ratio test to test for convergence. 2, 17,23,20, 29, 31, *34
8/1-> read 12.6 through example 5.
8/1->12.6: 3-9 odd, 19,20, *(31,32), 33, 35
8/1-> Optional: Read X.B5
8/2 -> 12.5: 3-11 odd; 21, 23, 27, *35
8/7-> 12.7: 1-11 odd
8/2-> Optional: Read XI.A
8/3-> 12.8: 3-11 odd
8/7->12.9: 3-9 odd, 25, 29
8/7->12.10: 31,35,56, 41, 45, 57, 58

Week	Mon.	Tues.	Wed.	Thurs.
1	5/29 Mem. Day NO CLASS	5/30 Introduction & Review	5/31 Differential equations and Direction Fields IV.D [Demos from Bradley-Smith 1. 2 ]	6/1 Euler's Method IV.E
2	6/5 7.2 The natural exponential function. I.F.2; e and y = exp(x) Models for (Population) Growth and Decay: y' = k y; y(0)=1. k = 1.VI.A	6/6 More on the exponential function.VI.A	6/7. The natural logarithm function.I.F.2 y = ln (x) and ln(2) Models for learning. y' = k / x; y(1)=0. k =1;	6/8 VI.B logarithmic differentiation. 7.3 & 7.4, 7.2*
3	6/12 Connections: 7.4* VI.C ln(exp(x)) = x exp(ln(y)) = y The Big Picture	6/13Arctan.VI.D	6/14 Begin Integration by parts. 8.1 and VII.C.	6/15 More integration by parts. Separation of variables. 10.3 .
4	6/19Growth/Decay Models. 10.4 . The Logistic Model 10.5	6/20 Finish the Logistic. Numerical Integration.(Linear) Begin Integration of rational functions VII.F	6/21 Integration of rational functions I. Improper Integrals I	6/22 [Not on EXAM I]More Numerical Integration. (quadratic) V.D
5	6/26 Exam I Covers [5/30,6/21]	6/27 Rational functions II. Improper Integrals II.	6/28 Rational functions III. VII.F	6/29 Improper Integrals III Taylor Theory I. IXA
6	7/3 NO CLASS	7/4 Indep. Day NO CLASS	7/5 Discussed Math'l Induction. Taylor Theory I. IXA	7/6 Taylor theory II.Applications: Definite integrals and DE's
7	7/10 Taylor theory III.IXB.	7/11 Taylor theory IV. IX.C	7/12 IX.D Finish Taylor theory.	7/13 Begin Sequences and series.
8	7/17 Geometric sequences. Sequence properties.Use of absolute values. Incr&bdd above implies converent. Begin geometric series.	7/18 Trig Integrals I [sin&cos] Geometric and Taylor Series. Series Conv. I	7/19 Trig Integrals II [sec&tan] Series Conv. II divergence test	7/20 (positive series & Integral test) Series Conv. III
9	7/24 Trig substitution I (sin)	7/25 Exam II Covers [6/22, 7/20]	7/26 L'Hopital's rule I Trig substitution II (tan ) Other Inverse Functions (Arcsin)	7/27 Positive comparison & ratio test Series Conv. IV L'Hopital's rule II Trig substitution III ( sec)
10	7/31 Series Conv. V Absolute conv and general ratio test, L'Hopital III Power Series I (Using the ratio test - convergence)XI.A	8/1 Series Conv.VI cond'l conv and alternating series L'Hopital IV	8/2 Power Series II (Interval of convergence)XI.A Conics I Intro to loci-analytic geometry issues (parabolae, ellipses)	8/3 Power Series III (DE'sand Calculus) Conics II hyperbolae
11	8/7Review&Summary of Series Calculus	8/8 Review of quizzes 19&20. Arc Length VIII.B	8/9 Final Examination

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Summer, 2000                 COURSE INFORMATION               M.FLASHMAN
MATH 110 : CALCULUS II                      MTWR 10:00-11:20 P.M. SH 128
OFFICE: Library 48                                        PHONE:826-4950
Hours (Tent.): *******           AND BY APPOINTMENT or by CHANCE!
E-MAIL:flashman@axe.humboldt.edu WWW:      http://flashman.neocities.org/
***PREREQUISITE: Math 109 or permission.

TEXTS: Required: Calculus 4th Edition by James Stewart.(Brooks/Cole, 1999)

Excerpts from Sensible Calculus

Catalog Description: Logarithmic and exponential functions, inverse trigonometric functions, techniques of integration, infinite sequences and series, conic sections, polar coordinates.
SCOPE:This course will deal with a continuation of the theory and application of what is often described as "integral calculus" as well as the calculus of infinite series. These are contained primarily in Chapters 7 through 11 of Stewart. Supplementary notes and text will be provided as appropriate.
TESTS AND ASSIGNMENTS: There will be several tests in this course. There will be several reality check quizzes and cooperative problem assignments, and two midterm exams.

Homework assignments are made regularly and should be passed in on the due date.

Homework is graded Acceptable/Unacceptable with problems to be redone. Redone work should be returned for grading promptly.

***Exams will be announced at least one week in advance.***

THE FINAL EXAMINATION WILL ON AUGUST 9th.
The final exam will be comprehensive, covering the entire semester.
MAKE-UP TESTS WILL NOT BE GIVEN EXCEPT FOR VERY SPECIAL CIRCUMSTANCES!
It is the student's responsibility to request a makeup promptly.

*** DAILY ATTENDANCE SHOULD BE A HABIT! ***

Partnership Activities: Every two weeks your partnership will be asked to submit a summary of what we have covered in class. (No more than two sides of a paper.) These may be organized in any way you find useful but should not be a copy of your class notes. I will read and correct these before returning them. Partners will receive corrected photocopies.

Your summaries will be allowed as references at the final examination only.

Each week partnerships will submit a response to the "problem/activity of the week." These problems will be special problems distributed in class (and on this web page) or selected starred problems from the assignment lists.

All cooperative problem work will be graded 5 for well done; 4 for OK; 3 for acceptable; or 1 for unacceptable; and will be used together with participation in writing summaries in determining the 80 points allocated for cooperative assignments.

GRADES: Final grades will be determined taking into consideration the quality of work done in the course as evidenced primarily from the accumulation of points from tests, various individual and cooperative assignments.

2 Midterm exams	200 points
Homework	70 points
Reality Quizzes	100 points
Cooperative work	80 points
Final exam	200 points
TOTAL	650 points

The total points available for the semester is 650. Notice that only 400 of these points are from examinations, so regular participation is essential to forming a good foundation for your grades as well as your learning.

MORE THAN 3 ABSENCES MAY LOWER THE FINAL GRADE FOR POOR ATTENDANCE.

See the course schedule for the dates related to the following

See the summer course list for a full list of relevant days.

Technology: The computer or a graphing calculator can be used for many problems. We may use X(PLORE) or Winplot. A version of X(PLORE) is available at the bookstore for MAC based PC's along with the PC version we will use.Windows and DOS versions of X(PLORE) are also available online...X(PLORE) for Windows.Winplot is freeware and may be downloaded from Rick Parris's website or directly from this link for Winplot . Students wishing help with any graphing calculator should plan to bring their calculator manual with them to class.
Graphing Calculators: Graphing calculators are welcome and highly recommended. We may use the HP48G for some in-class work though most graphing calculators will be able to do much of this work. HP48G's will be available for students to borrow for the term through me by arrangement with the Math department. Supplementary materials will be distributed if needed. If you would like to purchase one or have one already, let me know. I will try to help you with your own technology during the optional "5th hour"s, or by appointment (not in class). Students wishing help with any graphing calculator should plan to bring their calculator manual with them to class.
Optional "5th hour"s: Many students find the second semester of calculus difficult because of weakness in their Calculus I and pre-calculus background skills and concept. A grade of C in Math 109 might indicate this kind of weakness. Difficulties that might have been ignored or passed over in previous courses can be a major reason for why things don't make sense now. I will organize and support additional time with small (or larger) groups of students for whom some additional work on these background areas may improve their understanding of coursework. Later in the semester optional hours will be available to discuss routine problems from homework and reality check quizzes as well as using technology. These sessions should be especially useful for students having difficulty with the work and wishing to improve through a steady approach to mastering skills and concepts.

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