This has already been discovered, but it is not proprietary information.  It
is the foundation for parabolas, ellipses, hyperbolas, hyperbolics, or
anything having to do with sections of a cone.

Don't be perplexed by the long equations.  It is only algebra.

http://mypeoplepc.com/members/jon8338/math/id51.html

INTERSECTION OF A PLANE WITH A CONE, SPECIAL

You will treat there the pair of intersecting straight lines - yes: that is a conic
section too! This observation may involve proprietary information.

(Or maybe just to do some "insane ammount of calculations test"... maybe to
determine speed or accuracy of equipment ;))

Anyway... why go through all the trouble of making it impossible to "save
the page" to file ?

(IE8 complains can't save page to file).

For me this is easily solved by copieing and pasting the text inside
frontpage :)

Just requires a little bit more of time ;)

(Maybe it's just a bug in your page ? ;))

Anyway it seems you are on windows using outlook express to post this
message...

The webpage's source code header is:

    <HEAD>
        <META content="text/html; charset=iso-8859-1"
http-equiv="Content-Type">
        <META content="0" http-equiv="Expires">
        <META content="1.0" name="TRELLIX_BUILDER_VER"><META
name="TRELLIX_OPEN_SITE_COMMAND"
content="http://twe.peoplepc.com:8080/servlet/SiteBuilderServlet?fUrl=/trellix..."></META><base
href="http://mypeoplepc.com/members/jon8338/math/index.html"><script
language="Javascript">
  document.isTrellix = 1;
  </script>
        <title>Intersection of a Plane with a Cone, General</title>
    </HEAD>

Apperently the webpage was made with a-to-me-unknown-tool called: "TRELLIX
BUILDER".

Maybe it adds some nasty bugs... or maybe it's just a buggy product =D

Hmm further investigation reveals... it's a website builder/webhosting
thingy:

http://www.trellix.com/

Anyway it seems like that.. good luck with it ! ;) :)

(alt.sci.math removed, not available?)
(alt.math.recreationa, to bring it down to 5)

Consider intersections of a paraboloid of revolution with planes that are not parallel to
its axis AoR of revolution.

The parallel projection of any such intersection along AoR onto the tangent plane at the
vertex of the paraboloid is a circle. In this way each circle in that plane is the
projection of an intersection of the paraboloid with a plane.

The proof by analytic geometry is a piece of cake; the proof by Euclidean solid geometry
is not too easy and IMO much more delightful.