We articulate and explicate a mechanism for mathematics conceptual learning that can serve as a basis for the design of mathematics lessons. The mechanism, reflection on activity-effect relationships, addresses the learning paradox (Pascual-Leone, 1976), a paradox that derives from careful attention to the construct of assimilation (Piaget, 1970). The mechanism is an elaboration of Piaget\u27s (2001) reflective abstraction and is potentially useful for addressing some of the more intractable problems in teaching mathematics. Implications of the mechanism for lesson design are discussed and exemplified. (Contains 2 figures and 9 footnotes.
Over the last few years, the information processing model of cognition has become increasingly promi...
There is pedagogical evidence that in order to fully understand any abstract notion, several differe...
Positing that mathematical representations are covert conceptual composites, i.e., they implicitly e...
This paper describes an emerging approach to the design of task sequences and the theory that underg...
The purpose of this study was to deepen and elaborate the understanding of the processes of construc...
Abstraction has been a frequent discussion topic since the days of Aristotle and Plato. Constructivi...
The initial assumption of this article is that there is an overemphasis on abstraction-from-actions ...
There is a growing interest in the mathematics education community in the notion of abstraction and ...
This paper describes an emerging approach to the design of task sequences and the theory that underg...
Doctor en Ciencias de la Ingeniería, Mención Modelación MatemáticaThis thesis studies a human cognit...
Most educational researchers seem to agree that mathematics learning does not consist of the passive...
Beginning with an examination of the deep history of making things and thinking about making things ...
The process of learning to learn mathematics starts with an educational approach of allowing the stu...
a b s t r a c t Explaining new ideas to oneself can promote learning and transfer, but questions rem...
Positing that mathematical representations are covert conceptual composites, i.e., they implicitly e...
Over the last few years, the information processing model of cognition has become increasingly promi...
There is pedagogical evidence that in order to fully understand any abstract notion, several differe...
Positing that mathematical representations are covert conceptual composites, i.e., they implicitly e...
This paper describes an emerging approach to the design of task sequences and the theory that underg...
The purpose of this study was to deepen and elaborate the understanding of the processes of construc...
Abstraction has been a frequent discussion topic since the days of Aristotle and Plato. Constructivi...
The initial assumption of this article is that there is an overemphasis on abstraction-from-actions ...
There is a growing interest in the mathematics education community in the notion of abstraction and ...
This paper describes an emerging approach to the design of task sequences and the theory that underg...
Doctor en Ciencias de la Ingeniería, Mención Modelación MatemáticaThis thesis studies a human cognit...
Most educational researchers seem to agree that mathematics learning does not consist of the passive...
Beginning with an examination of the deep history of making things and thinking about making things ...
The process of learning to learn mathematics starts with an educational approach of allowing the stu...
a b s t r a c t Explaining new ideas to oneself can promote learning and transfer, but questions rem...
Positing that mathematical representations are covert conceptual composites, i.e., they implicitly e...
Over the last few years, the information processing model of cognition has become increasingly promi...
There is pedagogical evidence that in order to fully understand any abstract notion, several differe...
Positing that mathematical representations are covert conceptual composites, i.e., they implicitly e...