COURSE/Section #:
COURSE TITLE:
MATH 1650.022
Pre-Calculus
INSTRUCTOR:
Math Lab web site: www.math.unt.edu/mathlab
Jason Snyder, PhD
The UNT Math Lab is located in GAB 440
5w1 & 5w2 2009
Monday - Thursday: 7:00 am – 7:00 pm
Friday: 1:00 pm – 5:00 pm
Saturday: 1:00 pm – 5:00 pm
(Closed Sundays and holidays)
TEXT:
CLASS MEETS:
MTWR 10:00 – 12:20 PM
Stewart, Redlin, and Watson
Precalculus 5th edition
FINAL EXAM DATE AND TIME:
OFFICE:
Friday, August 14
GAB 430
10:00 – 12:00 PM
EMAIL: jasonsnyder@my.unt.edu
OFFICE HOURS: MTWR 9:00 – 10:00 AM
CLASS WEBSITE:
ATTENDANCE AND MAKE-UP TEST POLICIES:
PHONE: N/A
Attendance for this course highly recommended but not required. It is very easy to get behind in a Summer Pre-Calculus course. The
student is expected to spend about 10 hours a week outside of class studying and doing homework. Make up tests will only be given
in the event of a university approved absence, family emergency, or a doctor’s note is given explaining the absence.
Academic Dishonesty: http://www.unt.edu/csrr
GRADING POLICY:
Daily Homework:
Exams(3):
Final:
15%
20% each
25%
Let X = .15(homework average)+.2(exam average)+.25(final exam). Your final grade will be given as follows:
If X  90, then you receive an A
If 80  X < 90, then you receive a B
If 70  X < 80, then you receive a C
If 60  X < 70, then you receive a D
If X < 60, then you receive an F
Final grades online access: http://www.unt.edu/grades
It is the responsibility of students with certified disabilities to provide the instructor with appropriate documentation from the Dean of
Students Office.
NOTES:
Students are responsible for meeting all university deadlines (registration, fee payment, prerequisite verification,
drop deadlines, etc). See the printed Schedule of Classes and/or University Catalog for policies and dates.
Electronic access for homework assistance is available at: www.math.unt.edu/mathlab/emathlab
Tentative Course Outline
Section
Title
Lines
§ 1.10
Modeling Variation
§ 1.11
What is a Function?
§ 2.1
Graphs of Functions
§ 2.2
Increasing and Decreasing Functions; Average Rate of Change
§ 2.3
Transformations of Functions
§ 2.4
Quadratic Functions; Maxima and Minima
§ 2.5
Modeling with Functions
§ 2.6
Combining Functions
§ 2.7
One-to-One Functions and Their Inverses
§ 2.8
Polynomial Functions and Their Graphs
§ 3.1
Dividing Polynomials
§ 3.2
Real Zeros of Polynomials
§ 3.3
Complex Numbers
§ 3.4
Complex Zeros and the Fundamental Theorem of Algebra
§ 3.5
Rational Functions
§ 3.6
Exam 1 Review
Exam 1
Exponential Functions
§ 4.1
Logarithmic Functions
§ 4.2
Laws of logarithms
§ 4.3
Exponential and Logarithmic Equations
§ 4.4
Modeling with Exponential and Logarithmic Functions
§ 4.5
The Unit Circle
§ 5.1
Trigonometric Functions of Real Numbers
§ 5.2
Trigonometric Graphs
§ 5.3
More Trigonometric Graphs
§ 5.4
Modeling Harmonic Motion
§ 5.5
Angle Measure
§ 6.1
Exam 2 Review
Exam 2
Trigonometry of Right Angles
§ 6.2
Mid-Semester Break
Mid-Semester Break
Mid-Semester Break
Mid-Semester Break
Trigonometric Functions of Angles
§ 6.3
The Law of Sines
§ 6.4
The Law of Cosines
§ 6.5
Trigonometric Identities
§ 7.1
Addition and Subtraction Formulas
§ 7.2
Double-Angle, Half-Angles, and Product-Sum Formulas
§ 7.3
Inverse Trigonometric Functions
§ 7.4
Trigonometric Equations
§ 7.5
Exam 3 Review
Exam 3
Polar Form of Complex Numbers; DeMoivre’s Theorem
§ 8.3
Date
06/08
06/08
06/09
06/09
06/10
06/11
06/15
06/15
06/16
06/16
06/17
06/18
06/22
06/22
06/23
06/24
06/24
06/25
06/25
06/29
06/29
06/30
07/01
07/02
07/02
07/06
07/06
07/07
07/08
07/08
07/09
07/09
07/13
07/14
07/15
07/16
07/20
07/21
07/21
07/22
07/23
07/27
07/28
07/29
07/29
07/30
07/03
Half
1
2
1
2
1&2
1&2
1
2
1
2
1&2
1&2
1
2
1&2
1
2
1
2
1
2
1&2
1&2
1
2
1
2
1&2
1
2
1
2
1&2
1
2
1&2
1&2
1&2
1&2
1
2
1&2
1&2
§ 11.1
§ 11.2
§ 11.3
§ 11.4
§ 11.5
§ 11.6
Sequences and Summation Notation
Arithmetic Sequences
Geometric Sequences
Mathematics of Finance
Mathematical Induction
The Binomial Theorem
Final Exam Review
Final Exam
08/04
08/05
08/06
08/10
08/11
08/12
08/13
08/14
1&2
1&2
1&2
1&2
1&2
1&2
1&2
1&2