Fall 2005 Study Guide for the final exam 2250-1 and 2250-2

The 2250-1 and 2250-2 final exams consist of twelve to fifteen problems.
You are expected to complete two or more per chapter for full credit.
The problems are divided by chapters. Only chapters 3, 4, 5, 6, 7, 10
appear on the exam.

The following problems will be used as models for the problems that will
appear on the final exam. Each problem will have one to five parts, to
facilitate division of credit for that problem.

Topics outside the subject matter of these problems will not be tested.
However, theoretical questions about the details of the problem may be
asked. Generally, proofs of textbook theorems are not part of the final
exam. There is no numerical or maple work on the final exam, nor are you
asked to know anything other than basic integral tables, differentiation
formulae. The basic Laplace table (4 items) is assumed plus the Laplace
rules through the first shifting theorem.

 Chapter 3: 3.1-16, 3.2-18, 3.3-18, 3.4-22, 3.5-21, 3.6-17, 3.6-32

 Chapter 4: 4.1-16, 4.2-28, 4.3-18, 4.4-20, 4.5-22

 Chapter 5: 5.1-33 to 5.1-42, 5.3-15, 5.3-28, 5.4-18, 5.5-4, 5.5-24,
            5.5-48, 5.6-12, 5.6-18

 Chapter 6: 6.1-23, 6.1-35, 6.2-25, 6.2-31

 Chapter 7: 7.1-18, 7.2-16, 7.3-18, 7.3-28

 Chapter 10: 10.1-29, 10.2-6, 10.2-12, 10.2-23, 10.3-8, 10.3-21,
             10.3-38, 10.4-13, 10.4-18, 10.5-9

Final exams for 2250 with solution keys for Fall 2004 and Spring 2005
appear on the web page

  http://www.math.utah.edu/~gustafso/index2250.html

These exams may be printed and used as a study guide. Other exams
(1,2,3) are also useful as a study guide, using the above list of
problems to filter out likely problem types.