Your search keyword '"Vergnaud P"' showing total 6 results

1. How to Improve Pupils' Literacy? A Cost-Effectiveness Analysis of a French Educational Project

Author

Massoni, Sebastien and Vergnaud, Jean-Christophe

Abstract

The "Action Lecture" program is an innovative teaching method run in some nursery and primary schools in Paris and designed to improve pupils' literacy. We report the results of an evaluation of this program. We describe the experimental protocol that was built to estimate the program's impact on several types of indicators. Data were processed following a Differences-in-Differences (DID) method. Then we use the estimation of the impact on academic achievement to conduct a cost-effectiveness analysis and take a reduction of the class size program as a benchmark. The results are positive for the "Action Lecture" program. (Contains 10 tables.)

Published

2012

2. The Theory of Conceptual Fields

Author

Vergnaud, Gerard

Abstract

The theory of conceptual fields is a developmental theory. It has two aims: (1) to describe and analyse the progressive complexity, on a long- and medium-term basis, of the mathematical competences that students develop inside and outside school, and (2) to establish better connections between the operational form of knowledge, which consists in action in the physical and social world, and the predicative form of knowledge, which consists in the linguistic and symbolic expressions of this knowledge. As it deals with the progressive complexity of knowledge, the conceptual field framework is also useful to help teachers organize didactic situations and interventions, depending on both the epistemology of mathematics and a better understanding of the conceptualizing process of students.

Published

2009

3. Proceedings of the Annual Conference of the International Group for the Psychology of Mathematics Education (13th, Paris, France, July 9-13, 1989), Volume 3.

Author

International Group for the Psychology of Mathematics Education., Vergnaud, Gerard, Rogalski, Janine, and Artique, Michele

Abstract

This proceedings of the annual conference of the International Group for the Psychology of Mathematics Education (PME) includes the following research papers: "A Model of Understanding Two-Digit Numeration and Computation" (H. Murray & A. Olivier); "The Computer Produces a Special Graphic Situation of Learning the Change of Coordinate System" (S. Nadot); "Epistemological Analysis of Early Multiplication" (N. Nantais & N. Herscovics); "Are the Van Hiele Levels Applicable to Transformation Geometry?" (L. Nasser); "Intuitive and Formal Learning of Ratio Concepts" (P. Nesher & M. Sukenik); "Early Conceptions of Subtraction" (D. Neuman); "Computational, Estimation Performance and Strategies Used by Select Fifth and Eighth Grade Japanese Students" (N. Nohda, J. Ishida, K. Shimizu, S. Yoshikawa, R.E. Reys, & B.J. Reys); "Associations Among High School Students' Interactions with Logo and Mathematical Thinking" (J. Olive); "Graphic Constructions with Computer to Learn 3D Reference Systems" (I. Osta); "Applied Problem Solving in Intuitive Geometry" (J.P. Pace); "L'incidence de l'Environment sur la Perception et la Representation d'Objets Geometriques" (R. Pallascio, L. Talbot, R. Allaire, & P. Mongeau); "Angles et Pixels - Quelle Synergie a 9 Ans?" (C. Parmentier); "Interaction by Open Discussion and 'Scientific Debate' in a Class of 12-Years Old Pupils" (T. Patronis); "Formal and Informal Sources of Mental Models for Negative Numbers" (I. Peled, S. Mukhopadhyay, & L.B. Resnick); "Inverse Procedures: The Influence of a Didactic Proposal on Pupils' Strategies" (A. Pesci);"Through the Recursive Eye: Mathematical Understanding as a Dynamic Phenomenon" (S. Pirie & T. Kieren); "Cognitive Aspects of the Learning of Mathematics in a Multicultural School" (N. Presmeg & A. Frank); "Qualitative and Quantitative Predictions as Determinants of System Control" (M. Reiss); "Transfer between Function Representations: A Computational Model" (B. Schwarz & T. Dreyfus); "Transition from Operational to Structural Conception: The Notion of Function Revisited" (A. Sfard); "Supercalculators and Research on Learning" (R. Shumway); "How and When Attitudes Towards Mathematics and Infinity Become Constituted into Obstacles in Students?" (A. Sierpinska & M. Viwegier); "Learning Y-Intercept: Assembling the Pieces of an 'Atomic' Concept" (J. Smith, A. Arcavi, & A.H. Schoenfeld);"Computers, Video, Both or Neither: Which is Better for Teaching Geometry?" (N. Snir, Z. Mevarech, & N. Movshovitz-Hadar); "Vocational Mathematics Teachers' Cognition of Mathematical and Vocational Knowledge" (R. Strasser & R. Bromme); "Training Elementary Teachers in Problem Solving Strategies: Impact on Their Students' Performance" (J.K. Stonewater); "Developing Algebraic Understanding: The Potential of a Computer Based Environment" (R. Sutherland); "Verbal Evidence for Versatile Understanding of Variables in a Computer Environment" (M. Thomas & D. Tall); "Conceptual Adjustments in Progressing From Real to Complex Numbers" (D. Tirosh & N. Almog); "Does the Semantic Structure of Word Problems Affect Second Graders' Eye-Movements?" (L. Vershaffel, E. de Corte, & A. Pauwels); "The Lesson - A Preconceptional Stage" (S. Vinner); "An Analysis of the Emotional Acts of Young Children While Learning Mathematics" (E. Yackel, P. Cobb, & T. Wood); "The Use of Graphs as Visual Interactive Feedback While Carrying Out Algebraic Transformations" (M. Yerushalmy); "Images of Geometrical Transformations: From Euclid to the Turtle and Back" (R. Zazkis & U. Leron); and "A Knowledge-Base of Student Reasoning about Characteristics of Functions" (N. Zehavi & B. Schwarz). Includes a listing of author addresses. (MKR)

Published

1989

4. Proceedings of the Annual Conference of the International Group for the Psychology of Mathematics Education (13th, Paris, France, July 9-13, 1989), Volume 2.

Author

International Group for the Psychology of Mathematics Education., Vergnaud, Gerard, Rogalski, Janine, and Artique, Michele

Abstract

This proceedings of the annual conference of the International Group for the Psychology of Mathematics Education (PME) includes the following research papers: "Logo et Symetrie Centrale" (E. Gallou-Dumiel); "About Continuous Operator Subconstruct in Rational Numbers" (J. Gimenez); "Constructivist Epistemology and Discovery Learning in Mathematics" (G.A. Goldin); "Comparative Analysis of Two Arithmetic Situations" (M.G. Grossi); "Understanding and Discussing Linear Functions in Situations: A Developmental Study" (J.L. Gurtner); "Low Mathematics Achievers' Test Anxiety" (R. Hadass); "Proofs That Prove and Proofs That Explain" (G. Hanna); "Fishbein's Theory: A Further Consideration" (G. Harel, M. Behr, T. Post, & R. Lesh); "They're Useful: Children's View of Concrete Materials" (K. Hart & A. Sinkinson); "Children's Individuality in Solving Fraction Problems" (K. Hasemann); "Aspects of Declarative Knowledge on Control Structures" (K. Haussmann & M. Reiss); "A Conceptual Analysis of the Notion of Length and Its Measure" (B. Heraud); "The Kindergartners' Understanding of Cardinal Number: An International Study" (N. Herscovics & J.C. Bergeron); "Learning about Isosceles Triangles" (J. Hillel); "Construction of Functions, Contradiction and Proof" (F. Hitt); "A Logo-Based Microworld for Ratio and Proportion" (C. Hoyles, R. Noss, & R. Sutherland); "The Facilitating Role of Table Forms in Solving Algebra Speed Problems: Real or Imaginary?" (R. Hoz & G. Harel); "The Learning of Plane Isometries from the Viewpoint of the Van Hiele Model" (A. Jaime & A. Gutierrez);"Representation and Contextualization" (C. Janvier); "To Inculcate versus to Elicit Knowledge" (B. Jaworski); "Van Hiele Levels and the Solo Taxonomy" (M. Jurdak); "A Perspective on Algebraic Thinking" (C. Kieran); "A Structural Conceptual Model for Investigating Some Cognitive Aspects of Problem-Solving" (N. Krumholtz); "The Effect of Setting and Numerical Content on the Difficulty of Ratio Tasks" (D. Kuchemann); "Satisfaction and Regret about the Choice of Math" (H. Kuyper & W. Otten); "Intrinsic versus Euclidean Geometry: Is the Distinction Important to Children Learning with the Turtle?" (C. Kynigos); "Mathophobia: A Classroom Intervention at the College Level" (R. Lacasse & L. Gattuso); "Le Micro-Ordinateur, outil de Revelation et d'Analyse de Procedures dans de Courtes Demonstrations de Geometrie" (A. Larher & R. Gras); "Gender Differences in Mathematics Learning Revisited" (G.C. Leder); "La Resolution de Problemes dans l'Enseignement des Mathematiques: Compte Rendu d'une Experience aupres d'Enseignants du Primaire" (G. Lemoyne & F. Conne); "Strategies Used by 'Adders' in Proportional Reasoning" (F.L. Lin); "Canonical Representations of Fractions as Cognitive Obstacles in Elementary Teachers" (L. Linchevsky & S. Vinner); "Using Concept Maps to Explore Students' Understanding in Geometry" (H. Mansfield & J. Happs); "Mental Images: Some Problems Related to the Development of Solids" (M.A. Mariotti); "The Role of the Figure in Students' Concepts of Geometric Proof" (W.G. Martin & G. Harel); "The Inner Teacher, The Didactic Tension, and Shifts of Attention" (J.H. Mason & P.J. Davis); "Lecture et Construction de Diagrammes en Batons dans le Premier Cycle de l'Enseignement Secondaire Francais" (S. Maury, M. Janvier, & J. Baille); "Cooperative Group Learning of Geometric Proof Construction: A Classroom Assessment" (L. MacRae & B. Harrison); "Comparing Experts' and Novices' Affective Reactions to Mathematical Problem Solving: An Exploratory Study" (D. McLeod, W. Metzger, & C. Craviotto); and "The Development of Children's Concepts of Angle" (M.C. Mitchelmore). (MKR)

Published

1989

5. Didactics as a Content-Oriented Approach to Research on the Learning of Physics, Mathematics and Natural Language.

Author

Vergnaud, Gerard

Abstract

In response to theories of learning that attempt to get rid of contents, two arguments are provided which suggest that it is theoretically disputable that knowledge develops along the same kind of process for biology and history, physics and mathematics, or the geometry of the triangle, and the geometry of space. The first is that empirical studies show that the biggest difficulties met by students depend heavily on the contents of situations to be mastered. The second is that the search for general theories misses a very important epistemological point, namely, that concepts and competencies are solutions to specific problems. Two conceptual fields (additive and multiplicative structures) and the nature of a content-oriented approach concerning natural language are discussed and illustrated, which leads to a comprehensive definition of the nature of a concept. It is a triplet of three sets: the set of situations that make the concept meaningful; the set of invariants (theorems-in-action) that characterize the variety of competencies of students (these invariants are properties of the concept); and the set of symbolic representations that can be used to represent these properties and the situations. The importance of these three sets, the nature of the conceptual field, and the importance of a careful and profound analysis of the contents of knowledge are addressed. (JN)

Published

1984

6. The Acquisition of Arithmetical Concepts.

Author

Vergnaud, Gerard

Abstract

An attempt is made to establish a link between ordinary arithmetical situations and relevant mathematical concepts by the analyzing of complexity of concepts. (MP)

Published

1979