activities:guides:vcnet

Ability to do flux integrals
Definition of divergence
Statement of Divergence Theorem
This lab can be used prior to covering the Divergence Theorem in class with either a minimal introduction or a restatement of the last question based on the assumption that the given vector field doesn't “lose” anything going through the net.

Reiterate that the Divergence Theorem only applies to closed surfaces.
Emphasize that the Divergence Theorem is one of several astonishing theorems relating what happens inside to what happens outside.
Have several students show how they computed $d\SS$, since most likely different choices were made for $d\rr_i$ and hence the limits.

By now the groups should be working well. Sit back and watch!
The main thing to watch out for is whether students choose the correct signs, both for the normal vectors and the limits of integration. Reiterate that one should always write $d\rr=dx\,\ii+dy\,\jj+dz\,\kk$; there should never be minus signs in this equation. The signs will come out right provided one integrates in the direction of the vectors chosen.
Most students will realize quickly that there is no flux through the triangular sides.
Some students will try to do the surface integrals! Point out that this isn't possible — and that the instructions say not to.
Student may be surprised at first when they calculate $\grad\cdot\FF=0$, especially since they (correctly) won't think that the surface integrals will add to zero. Use this to motivate the “missing top”.
Some students incorrectly think that $d|z|=|dz|$.

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The surface integrals can in fact be done — provided one adds them up prior to evaluating the integrals.
This lab provides a good opportunity for students to visualize the flux: It's easy to see that the flux of the horizontal component of this vector field must be zero geometrically. (It's even easier to see that the vertical flux must be zero.)

During the wrapup (or the following lecture), draw a picture such as the one above of one of the rectangular faces, showing all 4 possible choices for $d\rr_1$ and $d\rr_2$ (and which is which!), and discuss the integration limits in each case.
An alternative approach to this problem is to determine $\dS$ geometrically, compute $\FF\cdot\nn$ explicitly, and then do the integral using “standard” (increasing) limits. There is nothing wrong with this approach, but we would discourage the use of the $d\rr$ notation here for fear of making sign errors.
One could show students the remarkable trick for integrating $e^{-x^2}$ from $0$ to $\infty$, by squaring and evaluating in polar coordinates.