When the mountain top of Mt. Komorebi became a big tourist location more & more people wanted to move to the snowy town. In an effort to acomidate this growing population this apartment building was built. Now, decades later, the building has seen better days but still has some great character.
Senbamachi 1A & 2A
1 bedroom, 1 bathroom
Traits: Gremlins & Moldy
2 starter apartments for any single sim hoping to take on the city.
Senbamachi 2B
1 bedroom, 1 bathroom,
Traits: Fast Internet & Private Dwelling
An apartment for a single sim who hates the great outdoors but loves a good movie.
Liberty Star, Ekaterina Lukasheva || 6 units (7.50 x 7.50, square) || Instructions
Business Card Polyhedra, Valerie Vann (?) || 4, 10 units (3.75 x 6.50, 1:√3) || see readmore
I learned the business card polyhedra from someone else and was actually unaware of who even designed this model; googling yielded a bit of information here. There is a crease pattern in the link, but a few issues with ownership of the model are worth bearing in mind with regards to this model.
Masquerade, Ekaterina Lukasheva || 2-8, 10, 30 units (7.50 x 7.50, square)
Instructions in Ekaterina Lukasheva’s Modular Origami Kaleidoscope
I’ve made the complete set of deltahedra before from an analogous unit which is assembled in the same configuration, but obviously this one has the added patterns.
Assembling in this manner has two key differences from the usual spiked-face configurations we see in many kusudamas:
Each unit represents a pair of faces, instead of an edge
You can, and often have to, mix the handedness of the units.
The combinations of handedness for the deltahedra here are as follows:
2 units = 1+1 = Tetrahedron
3 units = 3+0 = Triangular Bipyramid
4 units = 4+0 = Octahedron
5 units = 5+0 = Pentagonal Bipyramid
6 units = 4+2 = Snub Disphenoid
7 units = 4+3 = Triaugmented Triangular Prism
8 units = 4+4 = Gyroelongated Square Bipyramid
9 units cannot form a convex polyhedron; see the wiki page on deltahedra.
10 units = 5+5 = Icosahedron
Some tips if you want to try on your own, whether with this unit or @neutrinoprism’s unit:
2 units has only one option
3 units can also be 1+2, which might be easier to assemble. However, especially because of the patterns on this unit, 1+2 is definitely less pleasing.
4, 5, 8, and 10 units likely have other configurations, but they’re already both aesthetically pleasing and easy to assemble.
6 units can also be 3+3 or 5+1. 4+2 is the most symmetrical, but 5+1 definitely has aesthetic value.
7 units must have 2+2, and then the remaining 3 can be any handedness; the 2 that are the same form one square pyramid, the 2+2 are a belt of 8 triangles, and the last, opposite the first pyramid, can be the same or different as the first 2.