The SAT Math Prep Course is designed to highlight the various mathematic concepts of which students are responsible to demonstrate proficiency while taking the SAT. The course provides a focused review by offering shorter, more concise videos for review. The SAT Math Course is broken up into the four main categories: (1) Numbers and Operations, (2) Algebra and Functions, (3) Geometry and Measurements, and (4) Data Analysis, Statistics, and Probability.

- Integers
- Consecutive Integers
- Properties of Adding and Multiplying Even and Odd Integers
- Number Line Properties
- Squares and Square Roots
- Cubes and Cube Roots
- Squares of Fractions
- Adding and Subtracting Fractions
- Multiplying and Dividing Fractions
- Reducing Fractions
- Find the Least Common Denominator
- Mixed Numbers and Improper Fractions
- Complex Fractions
- Fractions and Equivalent Decimals
- Changing Decimals into Fractions
- Reciprocals
- Place Values of Numbers
- Scientific Notation
- Factors of a Number
- Multiples of a Number
- Prime Numbers
- Prime Factors and Prime Factorization
- Ratios
- Proportions and Solving Proportions
- Percents and Percent Increase/Decrease
- Arithmetic Sequences
- Geometric Sequences
- Sets (Union, Intersection, Elements)
- Fundamental Counting Principle
- Permutations
- Combinations
- Venn Diagrams

- Combining Like Terms
- Order of Operations
- Factoring Difference of Two Squares
- Factoring out Greatest Common Factor
- Factoring Quadratic Expressions (a=1)
- Factoring Quadratic Expressions (a?1)
- Exponents Defines
- Properties of Exponents
- Rational Exponents
- Evaluation of Rational Exponents
- Solving Equations that are Unsolvable
- Solving Equations for One Variable
- Solving Radical Equations
- Solving Absolute Value Equations
- The Language of Math
- Solving Inequalities
- Solving System of Linear Equations by Substitution
- Solving System of Linear Equations by Eliminations
- Solving Quadratic Equations by Factoring
- Solving Exponential Equations
- Solving Rational Equations
- Direct and Inverse Variation
- Solving Percent Increase and Percent Decrease
- Function Notation and Evaluating Functions
- Domain and Range of a Function
- Problems Using Symbols
- Linear Functions, their Equations, and their Graphs
- Slope of a Line
- Slope of Parallel and Perpendicular Lines
- Quadratic Functions, their Equations, and their Graphs
- Function Translation
- Function Reflections

- Geometric Notation Overview
- Definition of a Point and a Line
- Definition of a Line Segment
- Midpoint of a Segment
- Adding Segments
- Vertical Angles
- Supplementary and Complementary Angles
- Parallel Lines and Angles
- Right Angles and Perpendicular Lines
- Triangle Overview
- Equilateral and Equiangular Triangles
- Isosceles Triangles
- Right Triangles and the Pythagorean Theorem
- 30-60-90 Special Right Triangles
- 45-45-90 Special Right Triangles
- 3-4-5 Right Triangles
- Right Triangles and Pythagorean Triples
- Congruent Triangles
- Similar Triangles
- Triangle Inequality Theorem
- Triangle Side-Angle Correspondence
- Properties of Parallelograms
- Properties of Rectangles
- Area and Perimeter of Rectangles and Squares
- Area of Triangles
- Area of Parallelograms
- Regular Polygons
- Interior Angles of Polygons
- Exterior Angles of Polygons
- Diameter and Radius of Circles
- Arcs and Central Angles of Circles
- Central and Inscribed Angles of Circles
- Tangent Line to Circles
- Circumference of a Circle
- Area of a Circle
- Cubes and Rectangular Solids
- Prisms and Cylinders
- Cones and Pyramids
- Spheres
- Surface Area and Solid Figures
- The Midpoint Formula
- The Distance Formula
- Geometric Translations
- Geometric Rotations
- Geometric Reflections
- Symmetry of a Geometric Figure
- Inscribed and Circumscribed Figures
- Coordinate Plane Overview