I'm using Mathematica 8 and I am struggling with texturing. Although texturing of polyhedral objects has proved to be relatively simple, I hit a problem trying to texture a sphere. In the documentation, the only way to texture a sphere shown is using SphericalPlot3D
, which, IMHO, is a kludgey solution, especially since I'm trying to perform operations (e.g.: translation) on the sphere. In toto, my question is: is there any way to texture a sphere primitive?

Related: RegionPlot on the surface of the unit sphere? and How do you get custom 3D graphics to display properly in Mathematica?– abcdCommented Jan 2, 2012 at 4:23
3 Answers
You can't texture a Sphere
directly, but you could create a textured sphere using e.g. SphericalPlot3D
and extract the first part to get a primitive which you can manipulate with Translate
. For example
sphere = SphericalPlot3D[1, th, phi, Mesh > False, PlotPoints > 25,
PlotStyle > {Opacity[1], Texture[ExampleData[{"ColorTexture", "GiraffeFur"}]]},
TextureCoordinateFunction > ({#4, #5} &)][[1]];
Graphics3D[Translate[sphere, {{0, 0, 0}, {2, 2, 2}}]]
Something like this will be helpful :
sphere = SphericalPlot3D[1, {u, 0, Pi}, {v, 0, 2 Pi},
TextureCoordinateFunction > ({2 #5, 1  2 #4} &),
PlotStyle > { Lighting > "Neutral", Axes > False,
Boxed > False, Texture[texture]}, Mesh > None][[1]];
F[k_] := Graphics3D[ Rotate[ sphere, k, {2, 1, 6}, {0, 0, 0}], Boxed > False]
Now, we can animate a textured sphere rotating (around the vector {2, 1, 6}
anchored at the point {0,0,0}
) :
Animate[F[k], {k, 0, 2 Pi}]

1No, that's what I managed to do... I want to texture a Sphere primitive, as produced by the Sphere[] function.– taktoaCommented Jan 1, 2012 at 22:12

4Applying a texture to
Sphere[]
is not currently possible. Commented Jan 1, 2012 at 22:13
Just for completeness, you can also generate spheres with textures using ParametricPlot3D
.
map = ExampleData[{"TestImage", "Lena"}];
sphere = ParametricPlot3D[{Cos[u] Sin[v], Sin[u] Sin[v], Cos[v]}, {u,
0, 2 Pi}, {v, 0, Pi}, Mesh > None,
TextureCoordinateFunction > ({#4, 1  #5} &),
Lighting > "Neutral", Axes > False, Boxed > False,
PlotStyle > Texture[Show[map]]]
If I understand correctly, Heike's answer shows that the first part of the result is a GraphicsComplex, which is a graphics primitive.