1 / 24

Center of Mass

Center of Mass. of a Solid of Revolution. See-Saws. We all remember the fun see-saw of our youth. But what happens if. Balancing Unequal Masses. Moral Both the masses and their positions affect whether or not the “see saw” balances. Balancing Unequal Masses. M 1. M 2. d 1. d 2. Need:

orien
Download Presentation

Center of Mass

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Center of Mass of a Solid of Revolution

  2. See-Saws We all remember the fun see-saw of our youth. But what happens if . . .

  3. Balancing Unequal Masses Moral Both the masses and their positions affect whether or not the “see saw” balances.

  4. Balancing Unequal Masses M1 M2 d1 d2 Need: M1d1 = M2d2

  5. The great Greek mathematician Archimedes said, “give me a place to stand and I will move the Earth,” meaning that if he had a lever long enough he could lift the Earth by his own effort. Changing our Point of View

  6. It would have to be a pretty long see-saw in order to balance the school bus and the race car, though! In other words. . . We can think of leaving the masses in place and moving the fulcrum.

  7. In other words. . . M1 M2 d1 d2 (We still) need: M1d1 = M2d2

  8. 1 0 -2 -1 2 What happens if there are many things trying to balance on the see-saw? Where do we place the fulcrum? Mathematical Setting First we fix an origin and a coordinate system. . .

  9. M4 M1 M3 M2 d3 d4 0 d1 d2 Mathematical Setting And place the objects in the coordinate system. . . Except that now d1, d2, d3, d4, . . . denote the placement of the objects in the coordinate system, rather than relative to the fulcrum. (Because we don’t, as yet, know where the fulcrum will be!)

  10. Mathematical Setting And place the objects in the coordinate system. . . M4 M1 M3 M2 d3 d4 0 d1 d2 We want to place the fulcrum at some coordinate that will balance the system. is called the center of mass of the system.

  11. M4 M1 M3 M2 d3 d4 0 d1 d2 Mathematical Setting And place the objects in the coordinate system. . . In order to balance 2 objects, we needed: M1d1 = M2d2 OR M1d1 - M2d2 =0 For a system with n objects we need:

  12. Finding the Center of Mass of the System Now we solve for .

  13. The Center of Mass of the System In the expression The numerator is called the first moment of the system The denominator is the total mass of the system

  14. The Center of Mass of a Solid of Revolution. For the goblet project, you will need to calculate the position of the center of mass of your goblet (which is a solid of revolution!)

  15. The Center of Mass of a Solid of Revolution. Some preliminary remarks: • First, I will ask you to believe the following (I think) plausible fact: • Due to the circular symmetry of a solid of revolution, the center of mass will have to lie on the central axis.

  16. The Center of Mass of a Solid of Revolution. Some preliminary remarks: • Next, in order to approximate the location of this center of mass, we “slice” the solid into thin slices, just as we did in approximating volume.

  17. The Center of Mass of a Solid of Revolution We can treat this as a discrete, one-dimensional center of mass problem!

  18. Approximating the Center of Mass of a Solid of Revolution • What is the mass of each “bead”? • Assume that the solid is made of a single material so its density is a uniform throughout. • Then the mass of a bead will simply be  times its volume.

  19. Approximating the Center of Mass of a Solid of Revolution

  20. R h Approximating the Center of Mass of a Solid of Revolution f

  21. Approximating the Center of Mass of a Solid of Revolution Summarizing: The mass of the ith bead is The position of the ith bead is

  22. The Center of Mass of a Solid of Revolution Both the numerator and denominator are Riemann sums, and as we subdivide the solid more and more finely, they approach integrals. . . . And the fraction approaches the center of mass of the solid!

  23. The Center of Mass of a Solid of Revolution In the limit as the number of “slices” goes to infinity, we get the coordinate of the center of mass of the solid . . where a and b are the endpoints of the region over which the solid is “sliced.”

  24. If the cross sections are “washers”. . . The derivation is more or less the same, except that when we compute the area of the little cylinder, we get as we did when we computed the volume of a solid of revolution. So the coordinate of the center of mass will be: where a and b are the endpoints of the region over which the solid is “sliced.”

More Related