Re: Volume of a 3d figure
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Re: Volume of a 3d figure
OK, now I think we're starting to understand each other. I asked if
your reply had anything to do with the origional message. Just what I
thought. It didn't. It was random noise. Wouldn't it have been much
easier to say so STL?
On 17 Jan 1999 20:06:57 GMT, stl137@aol.com (STL137) wrote:
><<Really?
>Can you explain how "PiF(x)^2" IS a 3d solid?
>Will integrating this, well, it's not even a function, work for any 3d
>solid? From your post, it appears that you claim that integrating
>that whatevet it is, is how you find the volume under a surface. Can
>you elaborate?
>And where do you say how to do it on an 89?
>If you call your post, a coherent reply that told him how to find the
>volume of a 3D solid, may I ask you what color the sky is in your
>world?>>
>Integrating that gives you the volume of revolution for a function F(x). The
>way to do in integral is in the 89 manual. For a volume of any 3D solid,
that's
>a whole lot nastier, and requires triple integral signs (from what I see in
>books). I have NO idea how to do those. Volumes of revolution, though, those
>are easy.
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