Center of Mass: Difference between revisions

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First, we will need to establish an origin. For simplicity, we will establish the left end, the position of the 10 kg point mass, as the origin. Relative to the origin, the position of the 10 kg mass is 0 m and the position of the 5 kg mass is 10 m. Placing these values into our formula for 1-dimensional center of mass, we get:
First, we will need to establish an origin. For simplicity, we will establish the left end, the position of the 10 kg point mass, as the origin. Relative to the origin, the position of the 10 kg mass is 0 m and the position of the 5 kg mass is 10 m. Placing these values into our formula for 1-dimensional center of mass, we get:
[[File:1D_COM_SOLN.png]]
[[File:1D_COM_SOLN.png]]
Therefore, the answer
Therefore, the center of mass is 10/3 m from the left end of the rod. It is important to state your distances relative to your stated origin.


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===Middling===

Revision as of 22:10, 1 December 2015

Claimed by Alex Huynh (ahuynh9)

The Main Idea

The center of mass of an object is the point in space where if a force was applied, the object moves according to Newton's laws without rotation. At the center of mass, the distribution of mass is balanced, and the average of the weighted position coordinates of the distributed mass defines its coordinates. Mechanical calculations are often simplified with respect to the center of mass of objects.

When a force is applied not to the center of mass:


A Mathematical Model

The position of the center of mass of an object can be found by summating the product of each point mass and its relative linear position and dividing by the sum by the total mass.

This equation can then be extended to three dimensions.

When calculating the center of mass for a continuous distribution of mass, the expression becomes an infinite sum that can be expressed in the form of an integral.


Examples

Be sure to show all steps in your solution and include diagrams whenever possible

Simple

A 10 kg point mass and a 5 kg point mass are connected by a 10 m massless rod. Find the center of mass. This is example of a 1-dimensional center of mass problem.

Solution

First, we will need to establish an origin. For simplicity, we will establish the left end, the position of the 10 kg point mass, as the origin. Relative to the origin, the position of the 10 kg mass is 0 m and the position of the 5 kg mass is 10 m. Placing these values into our formula for 1-dimensional center of mass, we get: Therefore, the center of mass is 10/3 m from the left end of the rod. It is important to state your distances relative to your stated origin.

Middling

Difficult

Connectedness

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History

The concept of center of mass was first introduced by Archimedes while he worked to simplify assumptions about gravity that amounted to a uniform field, thus arriving at the mathematical properties of the center of mass. In an experiment, Archimedes observed that the torque exerted on a lever by weights resting at various points along the lever is the same as what it would be if all of the weights were moved to a single point—their center of mass. He developed mathematical techniques for finding the centers of mass of objects of uniform density of various well-defined shapes.

See also

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Further reading

PhysicsLab [1]

HyperPhysics [2]

Wikipedia [3]

External links

PhysicsLab [4]

HyperPhysics [5]

Wikipedia [6]

References

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