Revision as of 20:09, 5 December 2021 edit Erutuon (talk \| contribs) Autopatrolled, Extended confirmed users 32,238 edits manual reversion of comment: post on talk page ← Previous edit		Revision as of 16:04, 28 December 2021 edit undo 94.110.1.204 (talk) Change sign of D in the derivation, assuming the new axis has x>0 (which is implied by text). Next edit →
Line 19: :<math>I_\mathrm{cm} = \int (x^2 + y^2) \, dm.</math> The moment of inertia relative to the axis {{math\|''z′''}}, which is aat ~~perpendicular~~a distance {{math\|''D''}} from the center of mass along the ''x''-axis ~~from the centre of mass~~, is :<math>I = \int \left[(x +- D)^2 + y^2\right] \, dm.</math> Expanding the brackets yields :<math>I = \int (x^2 + y^2) \, dm + D^2 \int dm +- 2D\int x\, dm.</math> The first term is {{math\|''I''<sub>cm</sub>}} and the second term becomes {{math\|''mD''<sup>2</sup>}}. The integral in the final term is a multiple of the x-coordinate of the [[center of mass]]{{snd}}which is zero since the center of mass lies at the origin. So, the equation becomes:

Parallel axis theorem: Difference between revisions