Project Details
Visualizations while Solving Modelling Problems 2
Subject Area
General and Domain-Specific Teaching and Learning
Term
since 2015
Project identifier
Deutsche Forschungsgemeinschaft (DFG) - Project number 279177618
Empirical findings on the effectiveness of drawing instructions to promote students’ modelling competencies in the field of geometry are mixed and indicate that drawing-specific strategy knowledge (strategic knowledge about drawing, SKD) plays an important role. Results from the first phase of funding ("ViMo 1") have confirmed that declarative SKD (i.e., knowledge about the characteristics of a good drawing) is a necessary but not sufficient precondition for producing drawings with a high level of accuracy and for finding a solution to a modeling problem. The overarching goal of the follow-up project "ViMo 2" is therefore to investigate what role procedural SKD (i.e., knowledge of how to construct and use a drawing in the modeling process) plays in the effective use of drawings and in modeling performance by students in the field of geometry. In addition to procedural SKD, we are also taking into account declarative SKD as well as cognitive, metacognitive, and motivational factors. Within the framework of the follow-up project, theoretical, empirical, and practice-relevant findings can be expected in the following areas: First, the project will provide findings on the potential of strategy training for promoting mathematical modelling competencies in the field of geometry. Second, the project will contribute to research on self-generated drawings. Compared with the first phase of funding, the recording and analysis of eye movements promises additional insights into the mechanisms behind instruction in drawing at the level of strategy execution. The use of EMME (Eye Movement Modeling Examples) also promises insights into the potential of this innovative form of instruction for mathematics and science learning. Third, the project will contribute to learning strategy research. We expect to confirm and expand relationships postulated in Borkowski et al.’s (2000) theoretical model by distinguishing between declarative and procedural parts of SKD. Forth, regarding practical implications, the learning environment that we are developing in the project can be used in mathematics instruction.
DFG Programme
Research Grants
Co-Investigators
Professor Dr. Werner Blum; Professorin Dr. Maike Schindler