To begin with, we recommend you first master the cross product. But, if you don't happen to find yourself pining to know the volume of a parallelepiped, you may wonder what's the use of the scalar triple product. The scalar triple product is obviously very useful if you have a lot of parallelepipeds lying around and want to know their volume. Parallelepiped using the scalar triple product. In case you like to see it with numbers, here's an example of calculating the volume of a If you keep the figure rotating by dragging it with the mouse, you'll see it much better. The three-dimensional perspective of this graph is hard to perceive when the graph is still. The scalar triple product of three vectors $\vc$ is shown by the red vector its magnitude is the area of the highlighted parallelogram, which is one face of the parallelepiped.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |