On the sum of the angles between three vectors

Abstract

For any three nonzero vectors a,b,c in R2, we obtain a necessary and sufficient condition for the sum of the three pairwise angles between these vectors to equal 2π. As an easy consequence of this, a proof of Euclid's theorem that the sum of the interior angles of any triangle is π is provided. So, the main result of this note can be considered a generalization of Euclid's theorem. To a large extent, the consideration is reduced almost immediately to a choice for the sum of three related angles among the three integer multiples 0,2π,4π of π. The rest of the consideration concerns only various betweenness relations.