Geometry
- Concept 1: Vertical, Adjacent, Supplementary & Complementary Angles
- Concept 2: Segments in Triangles: Altitude, Median, Angle Bisector
- Concept 3: Angles in Triangles; Sum of the Measures of the Angles of a Triangle
- Concept 4: Isosceles and Equilateral Triangles
- Concept 5: Problems involving Parallel Lines
- Concept 6: Exterior Angles of a Triangle
- Concept 7: CONSTRUCTION: Parallel Lines
- Concept 8: Midsegment of a Triangle
- Concept 1: Connectives in logic; and, or, not, if...then, if and only if (Optional CC topic)
- Concept 2: Conditional Statements: Inverse, Converse, Contrapositive (optional CC topic)
- Concept 3: Making Conclusions in Geometry
- Concept 4: Reflexive, Symmetric, Transitive, & Substitution Postulates
- Concept 5: Addition, Subtraction, Multiplication & Division Postulates
- Concept 6: Using Postulates and Definitions in Proofs
- Concept 7: Using Angle Theorems in Proofs
- Concept 1: Proving Triangles Congruent: SSS, SAS, AAS, ASA
- Concept 2: Congruent Triangles; Identifying the Method of Congruence
- Concept 3: HY-Leg Method
- Concept 4: Corresponding Parts of Congruent Triangles (CPCTC)
- Concept 5: Overlapping Triangles
- Concept 6: The Isosceles and Equilateral Triangles
- Concept 7: Proofs with Parallel and Perpendicular Lines
- Concept 8: Constructing a Triangle Congruent to a Given Triangle
- Concept 1: Midsegment of a Triangle; Segment Parallel to 3rd Side of a Triangle
- Concept 2: Segments in Triangles: Medians, Altitudes, Angle Bisectors, Perpendicular Bisectors
- Concept 3: Concurrency in the Triangle: Centroid, Orthocenter, Incenter, Circumcenter
- Concept 4: CONSTRUCTIONS: Centroid, Orthocenter, Incenter, Circumcenter
- Concept 5: Interior & Exterior Angles of a Polygon
- Concept 6: Angles of Rotation in Polygons
- Concept 7: CONSTRUCTIONS: Square, Hexagon, Equilateral Triangle
- Concept 1: Ratio and Proportion; Mean Proportional
- Concept 2: Proportions in Similar Triangles and Polygons ; Line Parallel to 3rd Side of Triangle
- Concept 3: Dilations in the Coordinate Plane; Compositions involving Dilations
- Concept 4: Dilations; Scale Factor
- Concept 5: Similarity Transformations: Mapping a given Triangle to its Image
- Concept 6: Dilations with Different Centers: CONSTRUCTION: Dilations & Finding Center of Dilation
- Concept 7: Finding the Equation of a Dilated Line
- Concept 8: Area Relationships in Similar Polygons
- Concept 9: Dividing a Segment into a Given Ratio; CONSTRUCTION: Dividing a Segment into Equal Pieces
- Concept 10: Proving Triangles Similar; Valid Methods of Determining if two Triangles are Similar
- Concept 11: Proving Proportions and Products in Similar Triangles
- Concept 12: Isometries and Orientation
- Concept 13: Naming the transformation displayed
- Concept 1: Simplifying Radicals
- Concept 2: Adding and Subtracting Radicals
- Concept 3: Multiplying and Dividing Radicals
- Concept 4: Proportions in the Right Triangle; Altitude to the Hypotenuse
- Concept 5: The Pythagorean Theorem
- Concept 6: Special Right Triangles: 30-60-90 and 45-45-90
- Concept 7: Right Triangle Trigonometry: Soh Cah Toa
- Concept 7a: Finding Exact Values of Trig. Functions
- Concept 8: Problem-Solving with Trigonometry
- Concept 9: Cofunctions
- Concept 10: Trigonometry with Similar Triangles
- Concept 11: Reciprocal Trigonometric Functions (optional cc topic)
- Concept 12: Law of Sines (optional cc topic)
- Concept 13: Law of Cosines (optional cc topic)
- Concept 14: Area of a Triangle (optional cc topic)
- Concept 1: Finding Areas of Triangles
- Concept 2: Areas of Quadrilaterals
- Concept 3: Area and Circumference of Circles
- Concept 4: Radian Measure; Area of Sector; Length of an Arc
- Concept 5: Finding Areas of Composite Figures; Finding Shaded Areas
- Concept 6: Using the Apothem to find Areas of Polygons (Optional Topic)
- Concept 7: Surface and Lateral Area
- Concept 8: Volumes of Prisms
- Concept 9: Volume of Cylinders and Spheres
- Concept 10: Volume of Cones and Pyramids; Volumes of Composite Solids
- Concept 11: Cross Sections; Solids of Rotation; Cavalieri's Principle
- Concept 12: Density, Volume and Weights of Solids
- Concept 1: The Slope Formula: Finding the Slope of a Line given Two Points
- Concept 2: Equation of a Line; y = mx + b; Slope and Y-Intercept
- Concept 3: Determining if a Point is on a Line
- Concept 4: Finding the Equation of a Line given Points on the Line
- Concept 5: The Midpoint of a Line Segment
- Concept 6: Graphing a Line
- Concept 7: Parallel and Perpendicular Lines
- Concept 8: Finding the Equation of a Perpendicular Bisector
- Concept 9: Proofs in coordinate geometry
- Concept 10: Proofs with Variable Coordinates
- Concept 11: Areas in coordinate geometry
- Concept 12: Systems of Equations
- Concept 1: Equation of a Circle; Finding the Center and Radius
- Concept 2: Measures of Arcs and Angles: Central Angles
- Concept 3: Measure of Inscribed Angles; Polygons Inscribed in the Circle
- Concept 4: Measures of Angles formed by Tangents, Chords and Secants; "Big" Circle Problems
- Concept 5: Tangents Drawn to a Circle
- Concept 6: Lengths of Segments associated with Circles: Chords,Tangents and Secants
- Concept 7: Circle Proofs
- Construction 1: Construct a line segment congruent to a given line segment.
- Construction 2: Construct the perpendicular bisector of a given line segment. (Also constructing a Midpoint.)
- Construction 3: Construct the angle bisector of a given angle.
- Construction 4: Construct a line perpendicular to a given line through a point on the given line.
- Construction 5: Construct a line perpendicular to a given line through a point not on the given line.
- Construction 6: Construct an equilateral triangle when given one side.
- Construction 7a: Construct a median to a side of a triangle.
- Construction 7b: Construct the altitude to the side of a triangle
- Construction 8: Construct the CENTROID of a triangle.
- Construction 9: Construct the INCENTER of a triangle
- Construction 10: Construct the CIRCUMCENTER of a triangle
- Construction 11: Construct the ORTHOCENTER of a triangle
- Construction 12: Construct a SQUARE inscribed in a circle
- Construction 13: Construct a REGULAR HEXAGON inscribed in a circle.
- Construction 14: Copy an angle
- Construction 15: Construct a line parallel to a given line through a given point