Toroidal blend of 8 dodecahedra

The  is a Stewart toroid that consists of 80 pentagons. It can be obtained by outer-blending eight dodecahedra together in a rhombus-shaped loop. The four dodecahedra at the vertices of the virtual rhombus are all oriented in the same way.

Relations
The shape of this toroid is different from that of the toroidal blend of 8 octahedra: that one's virtual rhombus has a diagonal ratio of $\sqrt{5}$, while this one's has edge length ratio (1+$\sqrt{5}$)/2.

The toroid can be made out of copies of any other Archimedean solid that shares the faceplanes of the dodecahedron. The four non-corner units can also be replaced with pentagonal antiprisms or certain Johnson solids including the parabidiminished rhombicosidodecahedron.

Thirty copies of this toroid can be blended together, each blending pair coinciding at three dodecahedra with collinear centers, to form a toroidal blend of 92 dodecahedra with dodecahedral symmetry and an appearance like the skeleton of a rhombic triacontahedron.