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Centroid of 2D Plane Body
  Centroids of Areas
   Area by Integration
    Area by Single Integration

Centroid of 2D Plane Body

The centroid of an plate is determined by the first moment of a two dimensional plane body with the method of the first moment of area.

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And the centroid of a wire is determined by the first moment of a two dimensional plane body with the method of the first moment of line.

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Centroids of Areas

Area by Integration

Although double integration is usually required to determine the planar area. However a planar area can also be determined by performing a single integration. If the inner integration of the unit elemental area is a thin elemental area.

Area by Single Integration

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For example, the signed area of the planar region R is bounded by curves in rectangular form , Imply

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An unit elemental area ΔA in rectangular form can be defined as Δx times Δy. Imply

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In general, the unit element area of a region can be extended to either a thin vertical rectangular strip or  a thin horizontal rectangular strip. And the element area ΔA becomes

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By using a thin rectangular strip as the element area or applying the method of strip slicing, the signed area of the planar region can be determined by a single integration through  sweeping the signed elemental area strip along either rectangular coordinate axis. Imply

By sweeping the horizontal strip along y axis vertically

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By sweeping the vertical strip along x axis horizontally

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And for curves in polar form

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For example, the signed area of the planar region R is bounded by curves in polar form, Imply

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An unit elemental area ΔA in polar form can be approximated by Δr times rΔθ. Imply

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In general, the unit element area of a region can be extended to either a thin slice of circular sector or a thin circular arc strip. And the element area ΔA becomes.

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By using a thin circular arc strip as the element area and sweeping radically, or using a thin slice of circular sector as the element area and sweeping circularly, the signed area of the planar region can be determined by a single integration through  sweeping the signed elemental area starting from along either polar variables. Imply

By sweeping the thin circular sector slice along variable angle θ circularly

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By sweeping the thin circular arc strip along variable radius r radically ,

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ID: 120600003 Last Updated: 6/2/2012 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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