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The DOR
A new fundamental geometric shape with
a relationship to Phi
Here's a challenge to "all the real mathematicians in the back row,"
as my college professor often said:
- Picture the classic solids of geometry, each sitting
inside a cube that encloses it on all sides. What is the
ratio of surface area of this tangent cube to the surface area of the solid,
and which solid results in a ratio that is within 1% of phi?
- Which solid has a silhouette projection from the x, y and z axes of
a cube, a sphere and a convex parallelogram?
Give up? Enter the DOR (the Direct Opposite Reverse), at
TheDOR.net, a
geometric solid discovered by David P. Sterner that is the answer to
both of these questions. Sterner sees the DOR as the missing
geometric link, a new shape in geometry's basic set of solids (cubes,
cones and cylinders, etc.) that haven't had a new member since the
time of Euclid before 200 B.C.
The patented refractor lens of the DOR creates images that
when printed directly to photographic paper create two opposite
images, the normal inverse image created by any convex lens but also
a positive image of the original subject matter in its true
orientation.
The images photographed through the DOR also have an appearance of
depth:
You can construct your own 3D model of the DOR using the template
below, which is available in a DOR
template PDF download.
When constructed, the model has these views:
| Circle / Sphere view |
Square / Cube view |
Third / Convex view |
3D view of all three |
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Now picture the various geometric solids sitting inside a tangent
cube, that is a cube to which all sides of the solid are touching.
The area of the solid to the area of its tangent cube is below, and
only the DOR is close to phi, 0.618. Can anyone create a solid
as simple in construction but with a tangent cube that is as close
to phi, or closer yet? If so, contact
David Sterner with your
discovery.
|
Solid |
Solid Image |
Surface Area Formula of Solid |
Ratio of Surface Area of Solid to its
Tangent Cube |
| DOR |
 |
|
0.6086903 |
| Cone |
 |
pr²
+ p( r x s )
where
s = √( r²
+ h² ) |
0.4236003... |
| Dodecahedron |
 |
3a²
Ö(25+10Ö5) where
a = length of an edge, with a width of two times phi and edge of 2/phi. |
0.50202854 |
| Pyramid |
 |
(½ x P x s ) + A where
A = area of the base shape
P = perimeter of base shape
s = height of face triangles |
0.5393446... |
| Sphere |
 |
4pr² |
0.5235987... |
| Cylinder |
 |
2pr² + 2prh |
0.7853981... |
| Prism |
 |
2A + Pd where
A = area of the base shape
P = perimeter of base shape
d = height of prism |
1.0000000 |
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Investors:
Apply
Phi and
Fibonacci
principles
to the
stock market |
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