Theorems:

Incidence geometry 
	3-D incidence axioms and theorems (posted)
	Ceva's theorem and its converse (4)
	Desargue's theorem and its dual (7)
	Semi-circle theorem (10)

Metric goemetry:
	Menelaus' theorem (4.2)
	Harmonic ratio theorem (4.2)
	Viewing distinace via a square (9)
	Diagonal semi-circle theorem (10)
	Rectangles versus squares (10)
	Eve's Theorem (11.2)
	Casey's theorem (11.3)

Constructions:

	Completion in 1-point perspective (2)
	Adding elements in 1-point perspective (5)
	Subdivision method for copying art - continguous (6)
	Subdivision method for copying art - noncontinguous (8)
	Drawing shadows via Desargue (7)
	Adding elements in 2-point perspective (8)
	Boxes and cubes in 2-point perspective (10)
	Other 3D figures in 2-point perspective (10)
	Vanishing point via cross-ratios (11)
	Casey's angle (11.3)

Historical errors and illusions:

	Pedoe (7)
	St. Jerome (9)
	Fake truck (9)
	Andrea Pozzo (extra)
	Roy Lichtenstein house in Washington Sculpture Garden (extra)

Other stuff:

	Trolly tracks + adding multi-road experiment (3)
	Extended space and its axioms + adding some projective geometry (5)
	Meshes and maps + "original metric" version of Ceva, Menelaus (8)
		-> What do mesh maps preserve?  Why do they preserve theorems?
	Not doing the material from Chapter 8 on rigid motions
	Geogebra testing stable constructions (9)
	Cross-ratio (11)
	Skipping Chapters 12 and 13, and skimming Chapter 8 without homework