1 | Queries to the shortcomings of Euclidean geometry. |
2 | Examine non-Euclidean geometries. |
3 | Defines Affine plane, uses and gives examples of theorems about affine planes. |
4 | Defines a projective plane, teaches projective planes algebraic structures. |
5 | Examines different coordinate systems and the different geometric structures. |
6 | Queies Fano axiom and provides the planes that allows and not allows this axiom. |
7 | Comments the relationship between the Pappussel and Dezargsel planes and theorems. |
8 | Discuss the Projective plane transformations, isomorphisms, and otomorphisms. |
9 | Discusses the perspectives and projection on pojective planes. |