Trigonometry
Course Syllabus
2004-2005, Semester 2
MAT
112 A |
9:00
- 9:50 |
M,
W, F |
Meyer Hall, 301 |
MAT
110 B |
2:30
- 3:20 |
Th |
Meyer Hall, 301 |
Instructor: Dr.
Ronald Buelow
Instructor Availability | Course
Description | Course Objectives
Course Methodology &
Materials | Required Text | Evaluation
of Student Work
Approximate Grade Ranges |
Approximate
Course Schedule | Attendance Policy
Guidelines for Success | My
Promise to You
Instructor
Availability 
| I very much want to help students that really want
and need it. I want to emphasize my willingness to stay longer after
class. I also may schedule special study sessions that are optional.
If you want my help, I will do everything in my power to give you the help
that you need. None of this help will do any good if you do not do the
work. The responsibility is yours. |
Course
Description
Trigonometric functions, inverse trigonometric
functions, trigonometric identities and conditional equations, solving
triangles, polar coordinates, complex numbers, analytic geometry, and examples
of mathematical precision and beauty in God's Creation. Prerequisite:
MA111 or equivalent.
Course
Objectives
| 1 |
The student will develop
an appreciation of the beauty and order of mathematics as one of God's
generous gifts to man |
| 2 |
The student will develop
an understanding of the basic principles of trigonometry as a problem solving
tool. |
| 3 |
The student will develop
the skill and comprehension necessary for mastery of the calculus and other
succeeding mathematics courses. |
Course
Methodology and Materials
About the first 20-25 minutes of each class
period will be used to evaluate assignments and answer student questions
on the previous work or the corrected assignment. The remainder of the
time will be used for lecture, discussion, demonstration and classwork.
Homework exercises will be assigned almost every class period. Homework
will be formally evaluated once or twice in the semester. It is absolutely
essential that students keep current and do all homework exercises. In
this way they will understand where their difficulties lie and be able
to ask questions in class or during office hours, or over the telephone,
and thus build on their knowledge in ensuing class periods.
Learning mathematics is a cumulative experience. New knowledge depends
on understanding previous material. For this course it is imperative that
you do you work every day and seek extra help in office hours or on the
phone when necessary. If you are unprepared even once, you may never catch
up.
Required
Text
 |
The required text is:
Trigonometry (5th Edition)
Authors: Charles B. McKeague, Mark D. Turner
Publisher: Harcourt Brace & Company, 2004
ISBN: 0534403921
available in the college bookstore |
Evaluation
of Student Work
Grading will be done by category and percentage
as follows:
| Chapter Tests |
35%
|
| Assignments |
10%
|
| Quizzes |
30%
|
| Semester Exam |
25%
|
Approximate
grade ranges
|
93 -100%
|
A
|
73 - 76%
|
C
|
|
90 - 92%
|
A-
|
70 - 72%
|
C-
|
|
87 - 89%
|
B+
|
67 - 69%
|
D+
|
|
83 - 86%
|
B
|
63 - 66%
|
D
|
|
80 - 82%
|
B-
|
60 - 62%
|
D-
|
|
77 - 79%
|
C+
|
0 - 59%
|
F
|
Approximate
Course Schedule
|
#
|
Topic(s) |
Length |
Lesson |
Date(s) |
Assignment(s) |
|
1
|
Geometry Foundation |
1 session |
|
Jan 10 |
|
|
2
|
Standard Angles and Measurement |
2 sessions |
1.2
|
Jan 17
Jan 19 |
1,5,9,... |
|
3
|
Basic Trig Functions, Special Angles |
1 session |
1.3
|
Jan 21 |
1,5,9,... |
|
4
|
Unit Circle, Behavior Charts |
3 sessions |
|
Jan 24
Jan 26
Jan 28 |
|
|
5
|
Calculator, Table Interpolation |
1 session |
2.2
|
Jan 31 |
1,5,9,... |
|
6
|
Reciprocal Functions, & Behavior Charts |
2 sessions |
|
Feb 2
Feb 4 |
|
|
7
|
Extended Trig Chart |
1 session |
|
Feb 7 |
|
|
8
|
Solving Right Triangles |
1 session |
2.3
|
Feb 9 |
Odds |
|
9
|
Pythagorean Identities, Reciprocal Identities, Ratio
Identities |
3 sessions |
1.4
|
Feb 11
Feb 14
Feb 16 |
Odds |
| 10 |
All functions in terms of 1 function |
1 session |
1.5
|
Feb 18
Feb 21 |
Odds |
|
TEST 1 |
|
|
Feb 23 |
|
| 11 |
Reference Angles, Radians & Degrees |
2 sessions |
|
Feb 25
Feb 27 |
Odds |
| 12 |
Graphing and Inverse Functions |
6 sessions |
|
|
|
| 13 |
Identities and Proofs |
5 sessions |
|
|
|
| 14 |
Equations |
4 sessions |
|
|
|
| 15 |
Triangles |
5 sessions |
|
|
|
Attendance
Policy
1. Attendance is expected
at every meeting of the class.
2. Students should notify
the instructor of excuses for class absence, before
the class for that day by phone or email.
3. for
all classroom learning experience, all announcements made in class, and
all assignments.
4. If
the student has not excused their absence any quizzes given, tests given,
or assignments collected that day will be counted as a 0% (zero) grade.
These grades cannot be made up.
5. In the event a student
is absent from a test for a valid reason, and has excused their absence,
the student is responsible for making prompt arrangements with the
instructor for a make-up test.
Guidelines for
Success
GUIDELINES FOR SUCCESS IN MATHEMATICS
Dear Students:
As we begin to work at being successful in Mathematics, I want to point
out several guidelines which should help us to do our best. Mathematics
does not require special abilities, rather it requires a solid effort and
the development of some good, consistent habits.
To be successful in Mathematics:
ASK!
Mathematics is a sequential subject, that is, each day's work builds
on the previous days' work. Please ask questions when you do not understand!
In class, please raise your hand, wait to be called on, and ask, ask, ask!
(In the meantime I will be doing my best to see how you are reacting to
what I am teaching, and asking you questions, which will also help me know
if items need to be rexplained) If you discover a problem after class,
but while you are still at school (for example: during a study period),
see Prof. Buelow during his office hours. You may also use the alternatives
listed below:
If you are at outside of class and a tough problem arises, you
should:
1) Look to your textbook for help. (the index and table of contents
can be very helpful in finding the place in the book, that your question
is covered.)
2) Look to your notebook for similar problems or explanations.
3) If you have access, go to the Course Web Page and
read through the notes and examples.
4) Ask a classmate or Math Tutor (hours and availability will
be posted)
5) Call Dr. Buelow (see numbers above)
6) See Dr. Buelow in the morning in his office (MH312).
NOTE: If you ask me for help at
the beginning of class, there is not enough time to help you. This will
not relieve you of your responsibility. Do your work the day before!
Be Faithful
in Daily Participation and Study
1) Attend every class. Even one absence can be very harmful.
2) Do homework assignments on time.
3) After homework is complete, study by reviewing notes, the text, and
web resources.
4) Become involved in class.
My Promise To You
I promise to:
| 1 |
Work Hard at Teaching Clearly, and Helping Students |
| 2 |
Be Available for Students to Get Help |
| 3 |
Hand Back Tests the Day After They are Taken. |
| 4 |
Keep you Informed of Your Current Grade |
