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Isn't the equation for a 2D oval/ellips something like
(x^2)/a + (y^2)/b = 0? A circle is x^2+y^2=0.
Couldn't we find the part of the torus discription
that deals with the major radius and add the division
parts?
Nieminen Juha wrote:
> Mark Wagner <mar### [at] gte net> wrote:
> : A true oval cannot be created by scaling a torus.
>
> Perhaps I'll think about how to do it with a poly-object. It looks like
> it will need a 6th degree polynomial (since the regular torus need a 4th
> degree one)...
>
> --
> main(i,_){for(_?--i,main(i+2,"FhhQHFIJD|FQTITFN]zRFHhhTBFHhhTBFysdB"[i]
> ):5;i&&_>1;printf("%s",_-70?_&1?"[]":" ":(_=0,"\n")),_/=2);} /*- Warp -*/
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