Navigate back to the activity.
Estimated Time: 20 min
Students look at several vector fields and calculate their divergence to get a sense of what a non-zero divergence might look like.
This worksheet is designed to be an instructor-led activity. You would need to add appropriate instructions and questions to use this as an independent student activity. The activity can be used quite effectively with the instructor projecting the worksheet at the front of the room if students do not have access to a computer for each small group.
We precede this activity with a derivation of the rectangular expression for divergence from the definition that divergence is the flux per unit volume through an appropriately chosen closed surface. Our derivation follows the one in “Div, grad, curl and all that”, Schey, 2nd edition, Norton, 1973, p. 36. One can also use clicker questions or SWBQs about divergence to help get them started (see reflections).
The worksheet shows a number of different vector fields. Most vector fields are shown as a cross-section of the field and it is assumed the the vector field is independent of the third (unshown) dimension. Students are asked to use the definition of divergence as the flux per unit volume through an infinitesimal box to predict the sign and relative magnitude of the flux at various points in the vector field. The worksheet then calculates the divergence, so students can check their predictions.
No particular wrap-up is needed.
This activity pairs nicely with the Visualizing Curl activity.
This activity is part of a sequence of activities which address the Geometry of Vector Fields. The following activities are included in this sequence.