Disdyakis dodecahedron

Basic Geometry

The 3 edge lengths are:

• e₁ : $ \frac{\sqrt{2 \sqrt{2} + 20}}{\sqrt{- \sqrt{2} + 10}} $ ≈ 1.631
• e₂ : $ \frac{3 \sqrt{2 \sqrt{2} + 4}}{2 \sqrt{- \sqrt{2} + 10}} $ ≈ 1.338
• e₃ : $ 1 $ ≈ 1.000

The 3 angles are:

• α₁ : $ \arccos{\left (\frac{\sqrt{- \sqrt{2} + 10} \left(- \frac{9 \left(2 \sqrt{2} + 4\right)}{4 \left(- \sqrt{2} + 10\right)} + 1 + \frac{2 \sqrt{2} + 20}{- \sqrt{2} + 10}\right)}{2 \sqrt{2 \sqrt{2} + 20}} \right )} $ ≈ 55.0247°
• α₂ : $ \arccos{\left (\frac{\left(- \sqrt{2} + 10\right) \left(-1 + \frac{9 \left(2 \sqrt{2} + 4\right)}{4 \left(- \sqrt{2} + 10\right)} + \frac{2 \sqrt{2} + 20}{- \sqrt{2} + 10}\right)}{3 \sqrt{2 \sqrt{2} + 4} \sqrt{2 \sqrt{2} + 20}} \right )} $ ≈ 37.7733°
• α₃ : $ \arccos{\left (\frac{\sqrt{- \sqrt{2} + 10} \left(- \frac{2 \sqrt{2} + 20}{- \sqrt{2} + 10} + 1 + \frac{9 \left(2 \sqrt{2} + 4\right)}{4 \left(- \sqrt{2} + 10\right)}\right)}{3 \sqrt{2 \sqrt{2} + 4}} \right )} $ ≈ 87.2020°

Further Properties

Dihedral angles:

• Minimal concave angle: 180.0000°
• Minimal convex angle: 90.0000°

Reversed edges: None

3D View

Show model in 3D viewer.

Similar Shapes

Disdyakis dodecahedron

normal

Disdyakis dodecahedron

filled

Disdyakis dodecahedron

filled-corners

Model Files

• 0.2mm: disdyakis-dodecahedron-corners.stl
• 0.25mm: disdyakis-dodecahedron-corners.stl
• 0.4mm: disdyakis-dodecahedron-corners.stl

To download all files in one big package, see the download page.