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Second Moment of An Area of Geometric Shape
  Moment of Inertia of Areas
   Second Moment of Area of Semi-circle
    Second Moment about x by Double Integration
    Second Moment about y' by Double  Integration
    Polar Moment about O from Rectangular Moments of Inertia
   Second Moment of Area of Quarter-circle
    Second Moment about x by Double Integration
    Second Moment about y' by Double  Integration
    Polar Moment about O from Rectangular Moments of Inertia
   Second Moment of Area of Ellipse
    Second Moment about x'  by Double Integration
    Second Moment about y'  by Double Integration
    Polar Moment about C from Rectangular Moments of Inertia

Second Moment of An Area of Geometric Shape

The second moment of an area of a geometric shape can be determined by integration or the parallel-axis theorem. Imply

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Moment of Inertia of Areas

Second Moment of Area of Semi-circle

Second Moment about x by Double Integration

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The second moment of an area of a semicircle about the axis x is

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Second Moment about y' by Double  Integration

The second moment of an area of a rectangle about the centroidal axis y' is

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Polar Moment about O from Rectangular Moments of Inertia

The polar moment of an area of a rectangle about the center O is

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Second Moment of Area of Quarter-circle

Second Moment about x by Double Integration

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The second moment of an area of a semicircle about the axis x is

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Second Moment about y' by Double  Integration

The second moment of an area of a rectangle about the centroidal axis y' is

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Polar Moment about O from Rectangular Moments of Inertia

The polar moment of an area of a rectangle about the center O is

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Second Moment of Area of Ellipse

Second Moment about x'  by Double Integration

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The second moment of an area of a ellipse about the centroidal axis x' is

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Second Moment about y'  by Double Integration

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Polar Moment about C from Rectangular Moments of Inertia

The polar moment of an area of a circle about the centroid C is

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ID: 121000008 Last Updated: 10/18/2012 Revision: 0 Ref:

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References

  1. I.C. Jong; B.G. rogers, 1991, Engineering Mechanics: Statics and Dynamics
  2. F.P. Beer; E.R. Johnston,Jr.; E.R. Eisenberg, 2004, Vector Mechanics for Engineers: Statics
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