CALCULUS AND ANALYTIC GEOMETRY IV

(15-MATH-264-001)   

Winter, 2010

 

 

Class Room and Class Times: Room 835 Old Chemistry on Monday, Tuesday, Wednesday, Thursday, and Friday at 10:00-10:50 a.m. --- from Monday, January 4  through Friday, March 12 and the Final Examination of Friday, March 19  at 8:00 to 10:00 a.m.  The exception is January 18 (Martin-Luther-King Day). 

 

Teacher:   Roger Chalkley

Office:   Room 822A, Old Chemistry Building  

Phone:   (513) 556-4074       

Office Hours:  11:00-11:59 a.m. on Tuesdays and Thursdays

                         12:00-12:30 p.m. on Mondays, Wednesdays, and Fridays                        

 

Textbook:   James Stewart, Calculus Concepts and Contexts, 3^rd ed., Thomson Brooks/Cole Publishing Company, 2005.

 

Syllabus:   The syllabus is on the next page and contains a short list of suggested homework problems. 

 

Testing and Grading Policy:  There will be three 50-minute examinations and a 2-hour final examination. 

Each 50-minute exam will be graded on a basis of 100 points and will count as 1/5 of your final grade. 

The final examination will be graded on a basis of 100 points and will count as 2/5 of your final grade. 

There will be no substitute examinations.  If you miss a single 50-minute exam, the final will count as 60% of your grade in place of 40%                                 

 

Test 1: Friday, January 22  at 10:00-10:50 a.m. ; Test 2:   Friday, February 12 at 10:00-10:50 a.m.;    Test 3:   Friday, February 26 at 10:00-10:50 a.m.

Final Exam:    Friday, March 19 at 8:00-10:00 a.m.  (in Room 835 of Old Chemistry)

 

The use of pocket calculators, cell phones, and other such aids is prohibited during examinations.    

 

Withdrawals:  Tuesday, March 2  is the last day to withdraw from the class.      

 

 

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The Mathematics Learning Center (MLC), located in Sander Hall room 110 (old dinning hall), is a free, walk-in, mathematics tutoring center for all University of Cincinnati students. The tutoring hours are:  Monday -Thursday 9am -8pm ; Friday 9am-4pm.

Students can get help at the MLC for all basic mathematics courses through Differential Equations including Statistics and Business Mathematics courses.

                                     http://math.uc.edu/mathlearningcenter/index.html

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Syllabus for Calculus IV (with reference to 3^rd edition of text by James Stewart)

 

Section                Title                                             Suggested Homework Problems

 

  11.1       Functions of Several Variables           5, 7, 10, 12, 13, 15, 31-36

  11.2       Limits and Continuity                         5-17 odd, 25-31 odd

  11.3       Partial Derivatives                              13-37 odd, 45-59 odd

     11.4       Tangent Planes and Linear Approx.    1, 3, 9, 11, 19, 21, 25, 39, 40 

11.5      The Chain Rule                                    1, 3, 5, 7, 13, 15, 17, 19, 23, 41

  11.6       Directional Derivatives and etc.          1, 2, 5-15 odd, 19, 21, 35, 37, 43, 45

11.7      Maximum and Minimum Values         1, 2, 3, 4, 5-15 odd, 25, 27, 29, 33, 35, 39

  11.8      Lagrange Multipliers                            3-17 odd, 39

 

12.1      Double Integrals over Rectangles        3, 9, 11, 13

12.2      Iterated Integrals                                  1-17 odd, 21, 25, 27

12.3      Double Integrals over etc.                    1-21 odd, 33-43 odd

12.4      Double Integrals in Polar etc.               1-15 odd, 19, 25, 27

12.5      Applications of Double Integrals          3, 5, 9, 12, 13

12.6      Surface Area                                         1, 3, 5, 7, 9, 11

12.7      Triple Integrals                                     1-19 odd

  12.8       Triple Integrals in etc.                          1, 3, 5, 7, 9, 17, 19, 21

  12.9       Change of Variables in etc.                  1-13 odd, 19, 21

 

13.1      Vector Fields                                        11-18, 21, 23, 25

13.2      Line Integrals                                        1-13 odd, 17, 19, 35

  13.3      The Fundamental Theorem for etc.       3-21 odd, 29, 31

  13.4      Green’s Theorem                                   1, 3, 7-17 odd

  13.5      Curl and Divergence                              1-19 odd, 20

  13.6      Surface Integrals                                    5, 9, 13, 19, 21, 23

  13.7      Stokes’ Theorem                                    1-9 odd, 13, 15

  13.8      The Divergence Theorem                      1-13 odd 

 

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The University of Cincinnati desires that each person preparing a course syllabus also include the following information.

 

General Education:  This course was designed following the guidelines of the University of Cincinnati General Education Program. It satisfies, or partially satisfies the Quantitative Reasoning distribution requirement.

Academic Integrity:  The University Rules, including the Code of Conduct, and other documented policies of the department, college, and university related to academic integrity, will be enforced. Any violation of these regulations, including acts of plagiarism or cheating, will be dealt with on an individual basis according to the severity of the misconduct.

Special Needs Policy:  Students with special needs should meet with the instructor as soon as possible to arrange for reasonable provisions to ensure an equitable opportunity to meet all of the requirements of this course. At the discretion of the instructor, some accommodations may require prior approval by Disability Services.