Abstract
AbstractBesides homework assignments, optional quizzes are a commonly used means for formative assessment in tertiary mathematics education. Instructors, for example, implement these to help students detect gaps in their understanding, or to foster a continuous and active engagement with the content. The extent to which these goals are reached, however, strongly depends on how students actually use such quizzes, which is currently an underexplored topic. We investigated this issue in an undergraduate abstract algebra course with a study using a mixed-methods design. Unlike previous research suggesting that students use optional quizzes in tertiary mathematics courses mainly for rehearsal or for a final self-check of their own performance, our study indicates that students also use such quizzes in many other ways, for example for planning their further learning, or for deepening their understanding of the content of the course. Furthermore, our study shows differences regarding students’ quiz usage during the semester and when preparing for the final exam. Finally, the data propose factors that influence the way students use optional quizzes, for example time constraints due to other obligations during the semester, the perceived difficulty of the questions, or the opportunity to discuss these with peers. This leads to several suggestions regarding the implementation of optional quizzes into tertiary mathematics courses.
Funder
Humboldt-Universität zu Berlin
Publisher
Springer Science and Business Media LLC
Subject
Education,Mathematics (miscellaneous)
Reference42 articles.
1. Angus, S. D., & Watson, J. (2009). Does regular online testing enhance student learning in the numerical sciences? Robust evidence from a large data set. British Journal of Educational Technology, 40(2), 255–272
2. Bangert-Drowns, R. L., Kulik, J. A., & Kulik, C. L. C. (1991). Effects of Frequent Classroom Testing. The Journal of Educational Research, 85(2), 89–99
3. Bjorklund, D. F., & Harnishfeger, K. K. (1990). Children’s strategies: Their definition and origins. In D. F. Bjorklund (Ed.), Children’s strategies: Contemporary views of cognitive development (pp. 309–323). Hillsdale, NJ: Lawrence Erlbaum Associates, Inc
4. Broughton, S., Hernandez-Martinez, P., & Robinson, C. L. (2012). Using focus groups to investigate the presence of formative feedback in CAA. Research in Mathematics Education, 14(1), 87–88
5. Broughton, S., Robinson, C. L., & Hernandez-Martinez, P. (2013). Lecturers’ perspectives on the use of a mathematics-based computer-aided assessment system. Teaching Mathematics and its Applications: An International Journal of the IMA, 32(2), 88–94
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