This paper presents a mathematical framework to assess the consensus found among different evaluators who use ordinal scales in group decision-making and evaluationprocesses. This framework is developed on the basis of the absolute order-of-magnitudequalitative model through the use of qualitative entropy. As such, we study the algebraic structure induced in the set of qualitative descriptions given by evaluators. Our results demonstrate a weak, partial and semi lattice structure that in some conditions takes the form of a distributive lattice. We then define the entropy of a qualitatively-described system.This enables us, on the one hand, to measure the amount of information provided by eachevaluator and, on the other hand, to consider a degree of consensus among the evaluation committee. This new approach is capable of managing situations where the assessment given by experts involves different levels of precision. In addition, when there is no consensus regarding the group decision, an automatic process assesses the effort required to achievesaid consensus.