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Students are asked to find the differential expressions for the following:
This activity works well as a Compare and Contrast activity, with different groups solving different cases and then reporting their results to the class as a whole.
Begin this activity with a review of cylindrical and spherical coordinates which will likely be a review for most students. This activity is identical to Surface and Volume Elements in Cylindrical and Spherical Coordinates except uses a scalar approach to find line, surface, and volume elements. Therefore, this activity does not require knowledge of the $d\vec{r}$ vector, cross products, and dot products which can make this activity more accessible to students earlier in a course on electricity and magnetism. In the activity, students are asked to find the line element, $ds$, along each side of an “infinitesimal box” in cylindrical and spherical coordinates. Using $ds$, they are then asked to construct the area ($dA$) and volume ($dV$) elements in each coordinate system. This prepares students to integrate in curvilinear coordinates.
This activity can be done simultaneously with Pineapples and Pumpkins where students or the instructor cut volume elements out of pineapples and/or pumpkins.
Students should have obtained the following common surface and volume elements:
$dA= dx\,dy$ for a plane with $z={\rm const}$ in rectangular coordinates.
$dA =r\,dr\,d\phi$ for a plane with $z={\rm const}$ in polar coordinates.
$dA=r\,dr\,d\phi$ for the top of a cylinder with $z={\rm const}$.
$dA=r\,dr\,d\phi$ for the bottom of a cylinder with $z={\rm const}$.
$dA=r\,d\phi\, dz$ for the side of a cylinder with $r={\rm const}$.
$dA=r^2\sin\theta\,d\theta\,d\phi$ for the surface of a sphere with $r={\rm const}$.
$d\tau = dx\,dy\,dz$ a small block rectangular coordinates.
$d\tau = r\,dr\,d\theta$ for a “pineapple chuck” in cylindrical coordinates.
$d\tau = r^2\,sin{\theta}\,dr\,d\theta\,d\phi$ for a “pumpkin piece” in spherical coordinates.
This is the initial activity within a sequence of activities addressing Scalar Integration in Curvilinear Coordinates. The following activities are included within this sequence: