BackMTH161 Precalculus Course Schedule: Key Topics and Study Guide
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Course Overview
This study guide summarizes the main topics and sections covered in the MTH161 Precalculus course, as outlined in the provided course schedule. The course is structured to build foundational algebraic skills, explore functions and their properties, and introduce advanced topics such as matrices, polynomial and rational functions, and exponential and logarithmic functions. Each week focuses on specific sections, with associated assignments and assessments.
Prerequisites: Fundamental Concepts of Algebra
Linear and Rational Equations
Linear and rational equations form the basis for solving algebraic problems and modeling real-world scenarios.
Linear Equations: Equations of the form , where a and b are constants.
Rational Equations: Equations involving rational expressions, such as .
Solving Techniques: Isolate the variable, clear denominators, and check for extraneous solutions.
Example: Solve .
Models and Applications
Mathematical models use equations to represent real-world phenomena.
Application: Setting up equations from word problems.
Example: If a car travels at 60 mph for t hours, the distance is .
Complex Numbers
Complex numbers extend the real numbers to include solutions to equations like .
Definition: , where and are real numbers and is the imaginary unit ().
Operations: Addition, subtraction, multiplication, and division of complex numbers.
Example: .
Quadratic Equations
Quadratic equations are second-degree equations of the form .
Solution Methods: Factoring, completing the square, quadratic formula.
Quadratic Formula:
Example: Solve .
Other Types of Equations
Includes equations such as radical, absolute value, and higher-degree polynomial equations.
Radical Equations: Equations involving roots, e.g., .
Absolute Value Equations: .
Linear and Absolute Value Inequalities
Inequalities express relationships where quantities are not necessarily equal.
Linear Inequalities: or .
Absolute Value Inequalities: or .
Solution Sets: Often expressed in interval notation.
Functions and Graphs
More on Functions and Their Graphs
Functions describe relationships between variables. Their graphs provide visual representations.
Definition: A function assigns each input exactly one output .
Domain and Range: The set of possible inputs and outputs.
Graphing: Plotting points in the coordinate plane.
Transformations of Functions
Transformations shift, reflect, stretch, or compress the graph of a function.
Vertical Shifts: moves the graph up/down.
Horizontal Shifts: moves the graph right/left.
Reflections: reflects over the x-axis.
Example: is a parabola shifted right 2 and up 3.
Composite Functions
Composite functions combine two functions into one: .
Notation: means apply first, then .
Example: If and , then .
Inverse Functions
The inverse of a function "undoes" the action of the function.
Definition: for all in the domain of .
Finding Inverses: Swap and and solve for $y$.
Example: has inverse .
Polynomial and Rational Functions
Quadratic Functions
Quadratic functions have the form .
Vertex Form:
Graph: Parabola opening up if , down if .
Polynomial Functions and Their Graphs
Polynomial functions are sums of terms with non-negative integer exponents.
General Form:
End Behavior: Determined by the leading term .
Dividing Polynomials
Polynomials can be divided using long division or synthetic division.
Long Division: Similar to numerical long division.
Synthetic Division: Shortcut for dividing by linear factors.
Zeros of Polynomial Functions
Zeros are the values of for which .
Finding Zeros: Factor or use the Rational Root Theorem.
Multiplicity: The number of times a zero is repeated.
Rational Functions and Their Graphs
Rational functions are ratios of polynomials.
Form:
Asymptotes: Vertical (where ), horizontal, or oblique.
Polynomial and Rational Inequalities
Solving inequalities involving polynomials or rational expressions.
Test Intervals: Use sign charts to determine solution sets.
Example: Solve .
Partial Fractions
Expressing rational functions as sums of simpler fractions.
Decomposition: , etc.
Application: Useful for integration and solving equations.
Exponential and Logarithmic Functions
Exponential Functions
Exponential functions have the form , where and .
Growth and Decay: Models population, radioactive decay, etc.
Example: doubles for each increase in by 1.
Logarithmic Functions
Logarithms are the inverses of exponential functions.
Definition: means .
Natural Logarithm: .
Properties of Logarithms
Logarithms have several key properties that simplify calculations.
Product Rule:
Quotient Rule:
Power Rule:
Exponential and Logarithmic Equations
Solving equations involving exponentials and logarithms often requires applying properties and inverses.
Example: Solve by rewriting as .
Example: Solve by exponentiating: .
Matrices and Determinants
Matrix Solutions to Linear Systems
Matrices provide a systematic way to solve systems of linear equations.
Matrix Form: , where is the coefficient matrix, is the variable matrix, and is the constants matrix.
Solution Methods: Gaussian elimination, inverse matrices.
Example: Solve using matrices.
Assessment and Assignments
Weekly Assignments: Reading quizzes and homework for each section, due Sundays at 11:59pm EST.
Unit Tests: Scheduled after major topic blocks (Units 1-4).
Final Exam: Comprehensive, scheduled for the last week.
Note: No extensions on assignments; schedule is subject to change.
Summary Table: Major Topics by Week
Week | Main Topics |
|---|---|
1 | Linear & Rational Equations, Models & Applications, Complex Numbers |
2 | Quadratic Equations, Other Types of Equations, Linear & Absolute Value Inequalities |
3 | Matrix Solutions to Linear Systems, Functions & Graphs |
4 | Transformations, Composite & Inverse Functions |
5 | Quadratic & Polynomial Functions |
6 | Dividing Polynomials, Zeros, Rational Functions |
7 | Polynomial & Rational Inequalities, Partial Fractions |
8 | Exponential & Logarithmic Functions |
9 | Properties of Logarithms, Exponential & Logarithmic Equations |
10 | Final Exam Review & Final Exam |
Additional info: This guide is based on the course schedule and section titles. For detailed examples and practice problems, refer to the course textbook and assigned homework.