BackCollege Algebra: Fundamental Concepts, Equations, Functions, and Graphs
Study Guide - Smart Notes
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Section P.1: Algebraic Expressions
Evaluating Algebraic Expressions
Algebraic expressions use letters to represent numbers, called variables. Expressions may include addition, subtraction, multiplication, division, exponents, and roots.
Exponential notation: If n is a counting number, (n times).
Evaluating expressions: Substitute the given value for the variable and follow the order of operations.
Order of Operations
Parentheses
Exponents
Multiplication/Division (left to right)
Addition/Subtraction (left to right)
Example: Evaluate for and .
Example: Evaluate for .
Example: Evaluate for .
Example: Evaluate for .
Section P.1: Ordering Real Numbers
Using Inequality Symbols
Real numbers are graphed on a number line. Numbers increase from left to right. Use inequality symbols (<, >) to express order.
Example:
Example:
Example:
Absolute Value
The absolute value of a real number , denoted , is its distance from 0 on the number line. Always nonnegative.
Algebraic definition:
Example:
Example:
Section P.1: Absolute Value Notation
Rewriting Absolute Value Expressions
Rewrite expressions without absolute value bars using the definition above.
Example:
Example:
Example: for ,
Section 1.1: Graphs
Rectangular Coordinate System
The coordinate system consists of horizontal (x-axis) and vertical (y-axis) lines. The intersection is the origin . Points are plotted as .
The plane is divided into four quadrants.
Example: Plot , , , , , .
Intercepts
x-intercept: Point where graph crosses x-axis ().
y-intercept: Point where graph crosses y-axis ().
Section 1.1: Graphing Absolute Value
Basic Absolute Value Function
The function is piecewise defined:
if
if
The graph is a "V" shape.
x | y=2|x| | y=|x|-3 |
|---|---|---|
-3 | 6 | 0 |
-2 | 4 | -1 |
-1 | 2 | -2 |
0 | 0 | -3 |
1 | 2 | -2 |
2 | 4 | -1 |
3 | 6 | 0 |
Section P.4: Operations with Polynomials
Addition and Subtraction
Polynomials are added/subtracted by combining like terms.
Example:
Multiplication
Use distributive property and properties of exponents.
Example:
Example:
FOIL Method for Binomials
Multiply by distributing each term:
First:
Outside:
Inside:
Last:
Section 1.2: Solving Linear Equations
Linear Equations in One Variable
A linear equation can be written as .
Simplify by distributing/combining like terms.
Collect variable terms on one side.
Add/subtract terms from both sides.
Multiply/divide both sides by the same number.
Example:
Section 1.7: Interval Notation and Linear Inequalities
Interval Notation
Represents solution sets on the real number line.
Interval Notation | Set-Builder Notation | Graph |
|---|---|---|
(a, b) | {x | a < x < b} | Open endpoints |
[a, b] | {x | a ≤ x ≤ b} | Closed endpoints |
(a, b] | {x | a < x ≤ b} | Left open, right closed |
[a, b) | {x | a ≤ x < b} | Left closed, right open |
(a, ∞) | {x | x > a} | Open endpoint, arrow right |
[a, ∞) | {x | x ≥ a} | Closed endpoint, arrow right |
(-∞, b) | {x | x < b} | Arrow left, open endpoint |
(-∞, b] | {x | x ≤ b} | Arrow left, closed endpoint |
Solving Linear Inequalities
Isolate the variable using properties of inequalities.
Additive property: Add/subtract same number to both sides.
Multiplication property: Multiply/divide both sides by positive number (direction unchanged); by negative number (reverse direction).
Example:
Section 2.1: Basics of Functions and Their Graphs
Domain and Range
The domain is the set of all possible input values; the range is the set of all possible output values.
Example: Find domain and range of relation: {(0,5), (1,-2), (4,2), (8,9)}
Functions
A function assigns each input exactly one output. Use the vertical line test to determine if a graph is a function.
Example: {(0,3), (1,2), (2,4), (5,6), (9,9)}
Function Notation
denotes the value of function at .
Example: ; find , ,
Section 2.2: More on Functions and Their Graphs
Intervals of Increase, Decrease, and Constancy
A function is increasing on interval if for in ; decreasing if ; constant if .
Example: Use graph to identify intervals.
Relative Maxima and Minima
A relative maximum is the highest point in a neighborhood; a relative minimum is the lowest.
Example: Find relative maxima/minima from graph.
Even and Odd Functions
Even function: ; symmetric about y-axis.
Odd function: ; symmetric about origin.
Piecewise Functions
Defined by different expressions over different intervals.
Example:
Difference Quotient
The difference quotient for is , .
Example: ; find
Section 2.3: Linear Functions and Slopes
Slope of a Line
The slope is .
Example: Find slope through and .
Point-Slope Form
Equation:
Example: Slope 4, passes through :
Slope-Intercept Form
Equation:
Example: Slope 8, passes through :
Horizontal and Vertical Lines
Horizontal line: ; slope is 0.
Vertical line: ; slope is undefined.
*Additional info: This guide covers the foundational topics in College Algebra, including algebraic expressions, real numbers, absolute value, polynomials, linear equations, inequalities, functions, graphs, and slopes. All examples and tables are reconstructed and expanded for clarity and completeness.*
