[en] Let V be a finite dimensional vector space over the real or complex numbers. An arrangement in V is a finite collection of affine hyperplanes of V. Given a real arrangement A in a real vector space V. Then its complexification, AC, is a complex arrangement in the complex vector space VC, and will be called a complexified real arrangement. In this paper, we shall prove a presentation for the fundamental group of the complement of a complexified real arrangement. (author). 7 refs