dbl. int. - center of mass [Archive]

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tandoorichicken

Mar1-05, 10:00 PM

Any hints on how to approach this problem?

A lamina occupies the part of the disk x^2 + y^2 <= 1 in the first quadrant. Find the center of mass if the density at any point is proportional to the square of its distance from the origin

tandoorichicken

Mar1-05, 10:08 PM

And just for future reference, how do you do inequalities in latex?

stunner5000pt

Mar1-05, 10:44 PM

\leq {and} \geq the code reference file is found by clicking on the code and then clicking the link

Gamma

Mar1-05, 11:04 PM

I don't know what responses you got for your earlier thread. I could not find it. Any way, use the following to find the CM.

M r_{cm} = \int r_m dm

Since the density depends only on the radius, CM should be along the \theta = \pi/2 line.

Choose a small element at (r, \theta ) and proceed.