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Octahedron creation
Posted 05.10.2015, 10:41 GMT-4 Geometry Version 4.4 2 Replies
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I need to create by the Comsol geometry builder, an octaedron having a face lying on a plane.
I created the octaedron merging two pyramids, but i'm not able to rotate it in such a way that a face lies on a desired plane.
Is there anyone who can help me?
Thanks in advance
I created the octaedron merging two pyramids, but i'm not able to rotate it in such a way that a face lies on a desired plane.
Is there anyone who can help me?
Thanks in advance
2 Replies Last Post 07.10.2015, 10:03 GMT-4
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Posted:
9 years ago
Hi
If I read Wiki right a octahedron inscribed in a circle of radius "R" has side edges of length "sqrt(2)*R" and can be made up of 8 tetrahedrals, all with a common vertex at the 0,0,0 coordinate.
So if you start to draw a triangle equilateral based on a circle of radius sqrt(2)*R, on two plane R/sqrt(2) below and above the origin, and then draw a sphere of radius R centered at 0,0,0 you should be able to finish, no ?
The dual of the octahedron being a cube (point centered at each face of a cube) of side 2*R this should also help to get it right.
The dihedral angle is acos(-1/3), check it out
--
Good luck
Ivar
If I read Wiki right a octahedron inscribed in a circle of radius "R" has side edges of length "sqrt(2)*R" and can be made up of 8 tetrahedrals, all with a common vertex at the 0,0,0 coordinate.
So if you start to draw a triangle equilateral based on a circle of radius sqrt(2)*R, on two plane R/sqrt(2) below and above the origin, and then draw a sphere of radius R centered at 0,0,0 you should be able to finish, no ?
The dual of the octahedron being a cube (point centered at each face of a cube) of side 2*R this should also help to get it right.
The dihedral angle is acos(-1/3), check it out
--
Good luck
Ivar
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Posted:
9 years ago
Thank you so much. I did it.
Davide
Davide