New model of non-Euclidean plane

Abstract

We present a new model of a non-Euclidean plane, in which angles in a triangle sum up to π. It is a subspace of the Cartesian plane over the field of hyperreal numbers R*. The model enables one to represent the negation of equivalent versions of the parallel axiom, such as the existence of the circumcircle of a triangle, and Wallis' or Lagendre's axioms, as well as the difference between non-Euclidean and hyperbolic planes. The model has unique educational advantages as expounding its crucial ideas requires only the basics of Cartesian geometry and non-Archimedean fields.