Glossary of Videos
 I hear, I forget. I see, I remember. I do, I understand.
—Chinese Proverb

As with the quote above, it is not enough to just watch these videos.

Chapter One - Axiomatic Systems and Finite Geometry

bullet 1.1.2 Example of an Axiomatic System.
bullet 1.2 Fano's Theorem 1.
bullet 1.2 Fano's Theorem 2.
bullet 1.3 Finite Projective Plane Models.
bullet 1.3 Finite Projective Theorem 2.
bullet 1.3 Finite Projective Theorem 3.

Chapter Two - Euclidean and Non-Euclidean Geometry

bullet 2.1.3 Euclidean Distance is a Distance Function
bullet 2.2  Line Uniqueness (SMSG Postulate 1).
bullet 2.2  Existence of Points (SMSG Postulate 5(a)).
bullet 2.3  Ruler Models in Geometers Sketchpad
bullet 2.3  Euclidean Plane satisfies the Ruler Postulate (SMSG Postulate 3).
bullet 2.3  Ruler Placement Postulate. (SMSG Postulate 4) (Outline of proof that it is not independent.)
bullet 2.4.1 Plane Separation Postulate and Pasch's Postulate. (SMSG Postulate 9)
bullet 2.4.2 Measurement of Angles in the Euclidean Plane and the Poincare Half-plane.
bullet 2.6.1 Exterior Angle Theorem.
bullet 2.6.1 Alternate Interior Angles and Parallel Lines.
bullet 2.6.1 Triangle Inequality
bullet 2.6.2 Saccheri Quadrilateral
bullet 2.7.1 Euclid's Fifth Postulate implies Playfair's Axiom
bullet 2.7.1 Playfair's Axiom implies Euclid's Fifth Postulate
bullet 2.7.2 Construct a perpendicular line in the Poincare Half-Plane using Geometer's Sketchpad

Chapter Three - Transformational Geometry

bullet 3.2.2 Analytic Model for the Euclidean Plane.
bullet 3.2.3 Affine Transformation of the Euclidean Plane.
bullet 3.3.1 Isometry - Invariant Properties.
bullet 3.3.1 Isometry - Group Under Composition.
bullet 3.3.1 Isometry Determined from Three Points.
bullet 3.3.2 Image of a Line Under an Affine Transformation.
bullet 3.3.3 Matrix Form of an Affine Isometry.
bullet 3.3.3 Angle Between Lines for an Affine Isometry.
bullet 3.4.1 Translation is an Isometry.
bullet 3.4.1 Translations - Invariant Properties.
bullet 3.4.1 Rotation is an Isometry
bullet 3.4.2 Matrix Form of an Affine Translation.
bullet 3.4.2 Matrix Form of an Affine Rotation
bullet  3.5.1 Reflection is an Isometry
bullet  3.5.2 Matrix Form of an Affine Reflection
bullet  3.5.2 Isometry a Composition of Reflections

Chapter Four - Plane Projective Geometry

bullet 4.3 Duality - Axioms 1–3.
bullet 4.3 Duality - Axiom 4.
bullet 4.3 Duality - Axiom 5
bullet 4.5.1 Harmonic Sets - Existence.
bullet 4.5.1 Geometer's Sketchpad Construction of a Harmonic Set of Points
bullet 4.5.1 Harmonic Sets - Uniqueness.
bullet 4.5.1 Harmonic Sets - H(AB,CD) iff H(CD, AB).
bullet 4.6.2 Existence of a Projectivity Between Distinct Pencils.
bullet 4.6.2 Geometer's Sketchpad Construction of a Projectivity Between Pencils of Points   
bullet 4.6.2 Fundamental Theorem of Projective Geometry.
bullet 4.6.3 Harmonic Sets and Projectivity
bullet 4.6.4 Alternate Construction of a Projectivity (Theorem of Pappus.)
bullet 4.7.1 Points of a Point Conic.
bullet 4.7.1 Five Points Determine a Point Conic
bullet 4.7.2 Point Conics and Diagonal Points of a Hexagon.
bullet 4.7.2 Five Point Determine a Unique Point Conic.
bullet 4.7.3 Tangent Lines to Point Conics.
bullet 4.7.3 Tangent Lines and A Degenerate Form of Pascal's Theorem.
 

Table of Contents

  Timothy Peil  Mathematics Dept.  MSU Moorhead

© Copyright 2006, 2013 - Timothy Peil