BackPrecalculus MATH-2412 Syllabus and Course Structure Study Guide
Study Guide - Smart Notes
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Course Overview
Introduction to Precalculus
This course, MATH-2412, is designed to prepare students for calculus by covering essential algebraic and trigonometric concepts. The curriculum includes polynomial, rational, exponential, logarithmic, and trigonometric functions, as well as analytic geometry topics such as conic sections and polar coordinates. The course emphasizes both theoretical understanding and practical application of these mathematical concepts.
Course Title: Pre-Calculus Math (MATH-2412)
Credits: 4
Prerequisite: MATH 1316 - Plane Trigonometry
Textbook: Precalculus, Sullivan, 12th ed, ISBN 9780138279257
Recommended Calculator: TI-84 family (non-CAS)
Learning Outcomes
State-Defined Learning Outcomes
Students will demonstrate and apply knowledge of the properties of functions, recognize and apply algebraic and transcendental functions, and solve related equations. The course also covers graphing techniques, computation of trigonometric function values, proof of trigonometric identities, and solving triangles.
Properties of Functions: Understanding domain, range, and behavior of functions.
Algebraic and Transcendental Functions: Application and solution of equations involving these functions.
Graphing Techniques: Mastery of plotting and interpreting function graphs.
Trigonometric Functions: Calculation for key angles in degrees and radians.
Trigonometric Identities: Proof and application in problem-solving.
Solving Triangles: Both right and oblique triangles using trigonometric laws.
Texas Core Objectives
Critical Thinking Skills: Analysis, evaluation, and synthesis of mathematical information.
Communication Skills: Effective expression of mathematical ideas in written, oral, and visual forms.
Empirical and Quantitative Skills: Manipulation and analysis of numerical data.
Teamwork: Collaboration and consideration of diverse perspectives.
Personal Responsibility: Ethical decision-making and understanding consequences.
Social Responsibility: Engagement in civic and global communities.
Course Topics and Schedule
Weekly Topic Breakdown
The course is structured to cover the following major topics, each corresponding to chapters in a standard precalculus textbook:
Week 1: Functions and Their Graphs (Ch. 2)
Week 2: Transformations, Polynomial Functions (Ch. 2, 4)
Week 3: Rational Functions, Partial Fraction Decomposition, Inequalities (Ch. 4, 11)
Week 4: Composite Functions, Inverse Functions, Exponential and Logarithmic Functions (Ch. 5)
Week 5: Properties of Logarithms, Exponential and Logarithmic Equations (Ch. 5)
Week 6: Review and Exam 1
Week 7-8: Trigonometric Functions, Inverse Trig Functions, Trig Equations and Identities (Ch. 6, 7)
Week 9: Applications of Trigonometric Functions, Law of Sines and Cosines (Ch. 8)
Week 11-12: Polar Coordinates, Polar Equations, Vectors, Dot Product (Ch. 9)
Week 13-14: Conic Sections: Circles, Parabola, Ellipse, Hyperbola (Ch. 10)
Week 15: Sequences, Series, Binomial Theorem (Ch. 12)
Week 16: Final Exam Review and Final Exam
Sample Course Schedule Table
Week | Topics |
|---|---|
1 | Functions, Graphs, Properties, Piece-wise Functions |
2 | Transformations, Polynomial Functions, Real Zeros |
3 | Rational Functions, Partial Fractions, Inequalities |
4 | Composite, Inverse, Exponential, Logarithmic Functions |
5 | Logarithms, Exponential Equations |
6 | Review, Exam 1 |
7-8 | Trigonometric Functions, Identities, Equations |
9 | Applications, Law of Sines/Cosines |
11-12 | Polar Coordinates, Vectors |
13-14 | Conic Sections |
15 | Sequences, Series, Binomial Theorem |
16 | Final Exam |
Grading Structure
Assessment Components
Graded work in the course is divided into several categories, each contributing to the final grade. The breakdown is as follows:
Type | Weight | Notes |
|---|---|---|
Assignments in MyLab Math | 20% | Homework for each section; best score kept; late penalty applies |
Participation + Quiz | 15% | Weekly quizzes, in-class activities; lowest 4 dropped |
Midterm Exam 1 | 20% | Based on review; no formula sheets; extra credit for homework completion |
Midterm Exam 2 | 20% | Same as above |
Final Exam | 25% | Cumulative; can replace lowest midterm score |
Grade Scale
Grade | Range |
|---|---|
A | 90% - 100% |
B | 80% - 89.9% |
C | 70% - 79.9% |
D | 60% - 69.9% |
F | 0% - 59.9% |
Key Course Policies
Attendance and Participation
Regular attendance and active participation are required for success.
Expect to spend 12-16 hours per week on coursework.
Late work is generally not accepted for in-class activities, quizzes, or exams.
Homework and Exams
Homework can be completed after the due date (with penalty) until the exam covering that material.
Makeup exams are only allowed for extreme circumstances with documentation.
Extra credit is available for timely completion of homework.
Final Exam score may replace the lowest midterm score if higher.
Lowest 4 homework and quiz scores are dropped.
Academic Integrity
All quizzes and exams must be completed without outside assistance.
Academic dishonesty results in severe penalties, including possible course failure.
Support and Resources
Student Support Services
Success Coach: Personalized support for academic and career goals.
Free Tutoring: Available both in-person and online.
Student Care Network: Assistance with health, finances, and basic needs.
Technical Support: Help with eCampus and other college technology.
Summary of Precalculus Topics
Major Chapters Covered
Ch. 1: Graphs
Ch. 2: Functions and Their Graphs
Ch. 3: Linear and Quadratic Functions
Ch. 4: Polynomial and Rational Functions
Ch. 5: Exponential and Logarithmic Functions
Ch. 6: Trigonometric Functions
Ch. 7: Analytic Trigonometry
Ch. 8: Applications of Trigonometric Functions
Ch. 9: Polar Coordinates; Vectors
Ch. 10: Analytic Geometry
Ch. 11: Systems of Equations and Inequalities
Ch. 12: Sequences; Induction; Binomial Theorem
Ch. 13: Counting and Probability
Ch. 14: Preview of Calculus: Limits, Derivatives, Integrals
Example: Polynomial Functions
Definition: A polynomial function is an expression of the form , where and is a non-negative integer.
Degree: The highest power of in the polynomial.
Real Zeros: Values of where .
Example:
Example: Trigonometric Functions
Definition: Trigonometric functions relate angles to ratios of sides in a right triangle. The primary functions are sine, cosine, and tangent.
Sine:
Cosine:
Tangent:
Unit Circle: Used to compute values for key angles in both degrees and radians.
Example: Exponential and Logarithmic Functions
Exponential Function: , where and .
Logarithmic Function: , the inverse of the exponential function.
Properties: and
Example:
Example: Sequences and Series
Arithmetic Sequence:
Geometric Sequence:
Binomial Theorem:
Additional info:
All major precalculus topics are covered as per the course schedule and textbook.
Students are expected to use MyLab Math for homework and eCampus for course materials.
Support services are available for academic, technical, and personal needs.
