# 3D geometry plot in Mathematica

In planar geometry plot question, I asked how to draw planar geometric constructs. Now I want to extend it to 3D. Not only those geometry packages are not doing well, I am also facing quite a few obstacles in Mathematica.

1. `Locator` is not usable in 3d, as far as i know.

2. `Manipulate` does not seem to work in 3d too.

Let me give a concrete example. I have a right circular cone with a height `h` and an aperture `2 theta`. Its circular base is on the horizontal plane. Given a cone element, draw a circle with a diameter `d` in the tangent plane to this cone passing the cone element. Then draw the horizontal diameter of this circle. Thank you for your help.

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Item 1 is correct: Mathematica has no support for a 3d Locator. Manipulate handles three dimensional plots just fine (subject to the speed of plotting, etc.), so I do not know what you might be claiming in item 2. –  Daniel Lichtblau Mar 15 '11 at 22:19
Just a question, how would you want a 3d locator to work on a 2d screen? You can use other controls to move something in 3d, but not a locator. I suggest you browse the Demonstrations Project (eg this one and this one) to see what's out there. –  Simon Mar 15 '11 at 22:54
Ohhh Loooord / won't you buy me / a 3D screeen .... –  belisarius Mar 15 '11 at 23:35
btw I'm sure you could hook something like this up to Mma using `Controller*` –  Simon Mar 16 '11 at 0:33
@Simon Mathematica has built-in support for SpaceNavigator, a 3D input device. (I haven't ever used one, but there's a reference in the docs here) –  Brett Champion Mar 16 '11 at 4:09

This is really not that hard. First we define a 3D circle, given by a position of its center, and two vectors which span the plane it is in:

``````Circle3D[{x_, y_, z_}, {v1 : {_, _, _}, v2 : {_, _, _}}, r_] :=
Line[Table[{x, y, z} + {r Cos[2 Pi t], r Sin[2 Pi t]}.{v1, v2}, {t,
0, 1, 1/120}]]
``````

Then given a point `{x,y,z}` on a cone with tip at `{0,0,h}` tangents are `{x,y,z-h}` and `{-y,x,0}`. The rest is just drawing:

``````ConeQuestion[h_, theta_, pt : {x_, y_, z_},
d_] /; (x^2 + y^2) Cos[theta]^2 == Sin[theta]^2 (z - h)^2 :=
Module[{tangents},
tangents = {Normalize[{0, 0, h} - pt], Normalize[{-y, x, 0}]};
{{Opacity[0.8, Yellow], Cone[{{0, 0, 0}, {0, 0, h}}, h*Tan[theta]]},
{Thick, Dashed, Circle3D[pt, tangents, d]},
{Red, Sphere[pt, 1/10]},
{Orange,
Line[{pt - d Normalize[{-y, x, 0}],
pt + d Normalize[{-y, x, 0}]}]}}
]
``````

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this is great. Thanks a lot. –  Qiang Li Apr 15 '11 at 19:39
About time someone answered this. +1 ! –  Mr.Wizard Apr 15 '11 at 19:48
can you help to make the circle shaded? –  Qiang Li Apr 17 '11 at 5:17
@Qiang Replace `Circle3D` with the following `Circle3D[{x_, y_, z_}, {v1 : {_, _, _}, v2 : {_, _, _}}, r_] := {EdgeForm[Black], FaceForm[Opacity[0.5, Gray]], Polygon[ Table[{x, y, z} + {r Cos[2 Pi t], r Sin[2 Pi t]}.{v1, v2}, {t, 0, 1, 1/120}]]}`. –  Sasha Apr 17 '11 at 5:28
great. thanks a lot. –  Qiang Li Apr 18 '11 at 21:46