Calculate area of piecewise closed curve

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Stephen
Stephen on 27 May 2019
Commented: Star Strider on 27 May 2019
Hello,
I am trying to find the area enclosed by 4 piecewise smooth curves. As can be seen from the figure,
  • BLACK curve is a segment of a circle, C
  • ORANGE curve is a segment of an ellipse, E1
  • GREEN curve is a line, L
  • and RED curve is a segment of another ellipse E2
I know all the parameteric equations for the curves and the parameters of each vertices with respect to the curve equations. For example, the vertice at (-17.14,-18.2) has the parameter of 2.3262, in the range of [0, 2*pi], with respect to C.
123.PNG
To find the area enclosed by these curves, I tried to use brute foce way, that is, to integrate each curve segment equations. It works fine for the curves segment where X - Y values are bijective. Otherwise, the integration of somepart of the curve will cancel out some other part of the curve. An example is the BLACK curve.
To my understand, Green's theorem can solve this. But how do I setup the curves to use Green's theorem? And also, Is there other ways to find the area enclosed by these curves conveniently?
Thanks

Answers (1)

Star Strider
Star Strider on 27 May 2019
Experiment with the polyarea function.
  2 Comments
Stephen
Stephen on 27 May 2019
Do you mean that I first use polygons (the curve between two vertices is a line) to approximate the figure, then I use polyarea to find the area?
Star Strider
Star Strider on 27 May 2019
Not exactly. Your closed curve is a polygon (at least as far as polyarea is concerned), so if your connected lines can be expressed as one closed curve, polyarea should work.

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