Introduction to 3c 16 3 Part 9
If you are looking for information about 3c 16 3 Part 9, you have come to the right place. A brief discussion of the vocabulary: conservative vector fields and potential functions and their relationship to the conservation of ...
3c 16 3 Part 9 Comprehensive Overview
We start an example in which we calculate flux 2 ways: using the divergence theorem to do a triple integral and using the ... We finish deriving the formula for surface area of a parametrized surface. We continue with Gauss's law, finishing the proof, pending a more rigorous explanation (in the next video) of why it works to have ...
We finish the informal argument started in the previous video, explaining why the two definitions of divergence are, in fact, ...
Summary & Highlights for 3c 16 3 Part 9
- Stokes' theorem and conservative vector fields.
- We state the Divergence Theorem and see how it can simplify problems when a boundary surface comes in lots of pieces.
- We finish the problem started in the last video.
- We finish our explanation of Gauss's law, showing why it's ok to treat the boundary of our region as a 2-
- An example of the Divergence Theorem applied on a sphere.
We hope this detailed breakdown of 3c 16 3 Part 9 was helpful.