# How can i calculate the volume of a fitting surface in matlab?

I have three properties of a surface (Easting, Northing and depth) in each E & N.

I want to fit a surface to these points and then calculate the volume of this fitted surface in each dx, dy and dz and then compare it with some other data.

Can you help me do that ?

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The volume of a surface implies that it is bounded on all sides. Can one assume that the "depth" is one surface, and `depth = 0` is the other surface? Does `depth` ever change sign? Do we assume that the "edges" of the volume (limits of x and y) are "straight drops" - going from Z=depth to Z=0? Finally, are the values of z tabulated on a regular grid of x and y, or is the grid irregular? Sorry to ask so many questions - it's necessary to be able to write a working solution. –  Floris Mar 10 '13 at 19:38
So, Let me explain you. i have a region that has some coordinates( i presented them: Easting=x, Northing=y and depth=z). this information is about a hydrocarbon reservoir so it is clear that sign of all z is - and we dont have a sharp difference in near x and y coordinates.so we can fit a good surface to them. for better imagination you can presence an anticline that lies in earth.Now i want to make some grids that can assign them some properties so i imagine that this anticline is in a cube. –  user2154441 Mar 10 '13 at 20:46
i have to denote the top and bottom of this anticline, conversely i have some information about the coordinate of top and bottom of the anticline, so i try to fit a surface that can be consider as a top of the anticline and then calculate the volume of this surface in each boundary grids to decide that is it reservoir or not –  user2154441 Mar 10 '13 at 20:47
All of this information should go into the question. Just sayin'. –  Eitan T Mar 10 '13 at 22:06
whats your mean? icant get you –  user2154441 Mar 10 '13 at 22:25
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You can fit to a surface using `griddata` or `TriScatteredInterp`. Finding the volume: if your shape isn't too complex you can calculate its convex hull volume using `convhulln`, and subtract the volumes of all the convex hulls of its concavities. If that's not the case, you can span your concave object into a set of disjoint convex objects and sum all of their volumes.