Abstract
Many students struggle with the use of mathematics in physics courses. Although typically well trained in rote mathematical calculation, they often lack the ability to apply their acquired skills to physical contexts. Such student difficulties are particularly apparent in undergraduate electrodynamics, which relies heavily on the use of vector calculus. To gain insight into student reasoning when solving problems involving divergence and curl, we conducted eight semistructured individual student interviews. During these interviews, students discussed the divergence and curl of electromagnetic fields using graphical representations, mathematical calculations, and the differential form of Maxwell’s equations. We observed that while many students attempt to clarify the problem by making a sketch of the electromagnetic field, they struggle to interpret graphical representations of vector fields in terms of divergence and curl. In addition, some students confuse the characteristics of field line diagrams and field vector plots. By interpreting our results within the conceptual blending framework, we show how a lack of conceptual understanding of the vector operators and difficulties with graphical representations can account for an improper understanding of Maxwell’s equations in differential form. Consequently, specific learning materials based on a multiple representation approach are required to clarify Maxwell’s equations.Received 8 June 2016DOI:https://doi.org/10.1103/PhysRevPhysEducRes.12.020134Published by the American Physical Society under the terms of the Creative Commons Attribution 3.0 License. Further distribution of this work must maintain attribution to the author(s) and the published article’s title, journal citation, and DOI.Published by the American Physical SocietyPhysics Subject Headings (PhySH)Research AreasConcepts & principlesInstructional materials developmentInstructional strategiesLearning theoryResearch methodologyScientific reasoning & problem solvingPhysics Education Research
Highlights
Undergraduate physics students are often expected to already be proficient with requisite mathematical tools
The overall aims of this study are threefold: (i) to acquire insight into student reasoning surrounding the use of vector operators in electromagnetism; (ii) to identify specific cues that help students develop an appreciation for the role of divergence and curl in Maxwell’s equations; and (iii) to analyze and interpret student interview responses within the cognitive framework of conceptual blending
In our previous work we identified four different skills and competencies students need to acquire concerning vector calculus in electrodynamics: structural understanding [19,45] of the vector operators; interpreting graphical representations of vector fields in terms of divergence and curl; calculating divergence and curl; and conceptual understanding of Maxwell’s equations in differential form [1]
Summary
Undergraduate physics students are often expected to already be proficient with requisite mathematical tools. The investigation of how physics students use mathematics has been a prominent topic in recent literature [12,13,14,15,16,17,18,19,20,21,22,23,24,25]. Our research project addresses student difficulties with vector calculus before, during, and after an intermediate undergraduate electrodynamics course.
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