The goal of this article is to investigate Davydov's concept of the concept against the backdrop of its philosophical system, namely, dialectical materialism. In the first part, after briefly sketching the context of Davydov's work, I consider some ontological and epistemological ideas on which Davydov bases his concept of the concept. I pay…

In a recent article published in this journal, Williams ("Educational Studies in Mathematics, 92," 59-72, 2016) offers a critique of neo-Vygotskian perspectives exemplified in recent work on the "funds of knowledge" and on "cultural-historical activity theoretic" perspectives. The critique has great value in that it…

In this article, I deal with the question of emancipation in education. In the first part of the article, I argue that contemporary concepts of emancipation are explicitly or implicitly related to the idea of the sovereign subject articulated by Kant and other philosophers of the Enlightenment. I contend that our modern enlightened concepts of…

In this article, we present a sociocultural alternative to contemporary constructivist conceptions of classroom interaction. Drawing on the work of Vygotsky and Leont'ev, we introduce an approach that offers a new perspective through which to understand the "specifically human" forms of knowing that emerge when people engage in joint activity. To…

The goal of this article is to present a sketch of what, following the German social theorist Arnold Gehlen, may be termed "sensuous cognition." The starting point of this alternative approach to classical mental-oriented views of cognition is a multimodal "material" conception of thinking. The very texture of thinking, it is suggested, cannot be…

In this response we address some of the significant issues that Tony Brown raised in his analysis and critique of the Special Issue of "Educational Studies in Mathematics" on "Semiotic perspectives in mathematics education" (Saenz-Ludlow & Presmeg, Educational Studies in Mathematics 61(1-2), 2006). Among these issues are conceptualizations of…

Before the advent of symbolism, i.e. before the end of the 16th Century, algebraic calculations were made using natural language. Through a kind of metaphorical process, a few terms from everyday life (e.g. thing, root) acquired a technical mathematical status and constituted the specialized language of algebra. The introduction of letters and…

Meaning is one of the recent terms which have gained great currency in mathematics education. It is generally used as a correlate of individuals' intentions and considered a central element in contemporary accounts of knowledge formation. One important question that arises in this context is the following: if, in one way or another, knowledge…

Examines the relationship between mathematical knowledge and social practices of the Renaissance. Suggests that all efforts to understand the conceptual reality and the production of knowledge cannot restrict themselves to language and the discursive activity, but that they also need to include the social practices that underlie them. (Author/KHR)

Investigates ways in which students use signs and endow them with meaning in their very first encounter with the algebraic generalization of patterns. Provides accounts of students' emergent algebraic thinking. Uses ethnographic qualitative methodology supported by historic epistemological research. Focuses on a discussion held by a small group of…