Part of the beauty of mathematics is that seemingly isolated branches of the subject can often be used together to produce solutions to problems. High school students need to engage in activities that help them see how the various branches of mathematics work together in problem-solving situations. NCTM (2000) underscores the importance of such activities, stating, “When students can see the connections across different mathematical content areas, they develop a view of mathematics as an integrated whole” (NCTM 2000, p. 354).
Jennifer A. Bergner and Randall E. Groth
Randall E. Groth, Jennifer A. Bergner and Jathan W. Austin
Normative discourse about probability requires shared meanings for disciplinary vocabulary. Previous research indicates that students’ meanings for probability vocabulary often differ from those of mathematicians, creating a need to attend to developing students’ use of language. Current standards documents conflict in their recommendations about how this should occur. In the present study, we conducted microgenetic research to examine the vocabulary use of four students before, during, and after lessons from a cycle of design-based research attending to probability vocabulary. In characterizing students’ normative and nonnormative uses of language, we draw implications for the design of curriculum, standards, and further research. Specifically, we illustrate the importance of attending to incrementality, multidimensionality, polysemy, interrelatedness, and heterogeneity to foster students’ probability vocabulary development.
Randall E. Groth and Jennifer A. Bergner
Conversations with colleagues can be valuable in thinking through the logistics of implementing the NCTM's (2000) recommendations for teaching mathematics.
Randall E. Groth, Jennifer A. Bergner, Jathan W. Austin, Claudia R. Burgess and Veera Holdai
Undergraduate research is increasingly prevalent in many fields of study, but it is not yet widespread in mathematics education. We argue that expanding undergraduate research opportunities in mathematics education would be beneficial to the field. Such opportunities can be impactful as either extracurricular or course-embedded experiences. To help readers envision directions for undergraduate research experiences in mathematics education with prospective teachers, we describe a model built on a design-based research paradigm. The model engages pairs of prospective teachers in working with faculty mentors to design instructional sequences and test the extent to which they support children’s learning. Undergraduates learn about the nature of systematic mathematics education research and how careful analyses of classroom data can guide practice. Mentors gain opportunities to pursue their personal research interests while guiding undergraduate pairs. We explain how implementing the core cycle of the model, whether on a small or large scale, can help teachers make instructional decisions that are based on rich, qualitative classroom data.