Configurações de pontos no plano: o teorema de Silvester-Gallai

Abstract

The present work consists of research in the area of Plane Geometry with an Analytical view, having as main objects of study the primitive elements of Euclidean Plane Geometry, which are the points and the lines. This paper will discuss the demonstrations of two theorems and some curiosities about them. Initially, we will discuss the Sylvester-Gallai theorem, and soon after, we will present a second theorem, which is an application of the first result. To demonstrate each of these results, we use the method of Demonstration by Counterposition and the demonstration by Finite Induction. The present research can be placed in the qualitative research approach, with research procedures of a bibliographical nature. The data analyzed and used as a research base are contained in books and scientific articles, which served as theoretical support for the demonstration of the two central results in a clearer and more didactic way.