How to Make a Polyhedron Origami
Balls and Polyhedra
Models of this type are also automatically listed in: abstract, geometric, mathematical object
More restrictive types: cubes and cuboids, modular balls and polyhedra, modular cubes and cuboids, other modular polyhedron, other polyhedra
Models representing all sorts of polyhedra, including roundish ones (spheres and other smooth shapes can mostly only be approximated in origami).
This page lists models of a single type. You might be interested in folding instructions instead.

Cube (BBU E7)
Another cube from BBU-s: 6 × E7, 6 × D4 6 × A1.

90-Edge Buckyball (PHiZZ Variant IV)
This was an experiment with yet another PHiZZ variation of mine, conducted a few years ago. I chose too soft paper (or too large sheets) for this model which...

Two-Unit Cube II
Another simple model in which a cube is built from just two units. See also: Two-Unit Cube I.

Two-Unit Cube I
This is a very simple modular origami design I recently came up with when revisiting my Oxi unit from a few years ago. The unit has folded edges on one side ...

Hydrangea Cube (Harmony paper)
Shuzo Fujimoto's Hydrangea can be used as a modular unit. The method was first published by Meenakshi Mukerji and then reinvented independently by myself. I ...

Lelum Cube
A modified version of Lelum Polelum Cube where one out of each pair of flaps is hidden.

Lelum Polelum Cube
A Cube from a unit I recently designed and later learned that was earlier designed independently by Saburo Kase. More details in the unit's description.

Mesos Logo (Cube-Hexagon Illusion)
This is the logo of Apache Mesos (cluster management software) rendered in origami. A colleague at work suggested I try designing this object in origami afte...

Purple 90-Edge Buckyball (PHiZZ Variant II)
90-edge buckyball made from a variation of Tom Hull's PHiZZ unit. I know that other people have also designed this simple variant of the unit independently f...

Lotus Cube
Lotus Cube, made from a variant of my BBU (Building Block Units). Even though it is possible to make a cube from just 6 lotus BBU units, such an assembly is ...

Coaster Cube
This cube is made from a slightly modified variant of my Woven Slit Module (WSM). 36 units are used (6×4 = 24 for the faces and 12 for the edges), made from ...

Flower Icosahedron (StEM)
This is an icosahedron (or dodecahedron, depending on how you look at it) made from a modified version of Sturdy Edge Module (StEM), a 90-degree unit variant...

Cube from Recursive Four-Sink Base
This cube is made from six units, each of which is a recursive four-sink base modified for use as a module.

Fractal Pinwheel Cube
This is an example of using my Fractal Pinwheel as a modular unit. Due to small size, there's only one level so the fractalness is not so clearly visible.

Cube (2:1 paper, slits outside)
In this assembly method, each of the cube's faces is made of two modules which are both attached to both perpendicular modules in the same way. Together with...

Adjustable Cube
This cube is a mechanical toy. Its size can be adjusted: the cube can grow or shrink by a factor of about two. It starts out as a cube with a pattern resembl...

Knobby Cube
Another combination of Building Block Units and tessellations, this time Fujimoto's Clover Folding, folded without the decorative margin. 18 modules: 6 × BB...

Hydrangea Cube
I came up with the idea of connecting Hydrangeas to form a modular origami design independently, then found out Meenakshi Mukerji had published it in her boo...

Square Weave Cube
This is a modular cube made of six Square Weave Tessellations. The connection method is mine, the authorship of the Square Weave Tessellation seems to be dis...

Clover Cube
This model is a combination of Building Block Units and Fujimoto's Clover Folding. The models amounts to 18 units, 12 of which are BBUs (6 × D10 variant, 6 ×...

Rectangular Cuboid
This model demonstrates how Building Block Units can be modified to form rectangular rather than square faces. Just like the cube, this model uses 12 modules...

Expanded Hexagonal Prism
This is a shape created by placing cubes on the outer square walls of a hexagonal prism. This way, the outer outline becomes a dodecagonal prism. Seen from t...

Cube (BBU E10)
Due to the E10 tile's small flaps, it can't be directly attached to the flaps of inner A1 tiles. An additional "sizing" layer of A2 tiles is needed for prope...

Cube (BBU D9)
Cube from 12 modules: 6 × D9, 6 × A1.

14-Spoked Wheel
Mathematically speaking, this wheel is a tetradecagonal prism. This construction, which uses a mix of units made from 1:√2 and 1:2√2 paper, isn't mathematica...

Large Cube
This cube uses PVM Edge Connector Units to create extra distance between the Vertex Modules.

Cube from Sunken Vertex Units
The result of using the sunken variant of PVM Vertex Unit is a cube with four vertices replaced by inverted pyramids.

Toshie's Jewel (StEM)
Normally, Toshie's jewel is made from Sonobe units, but this one is made from StEM units instead.

Octahedron with Inverted Spikes on all Faces
This model's structure is an octahedron whose each face was replaced with a pyramid of three equilateral right triangles, pointing inwards. Units are located...

Tetrahedron (StEM)
This model (first from the left) is compared here with some other simple polyhedra folded from the same kind of module. Note how the tetrahedron looks almost...

Tetrahedron (SEU Sonobe)
This model (first in bottom row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively). N...

Tetrahedron (SEU from 2:1 paper)
This model (first in top row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively). Note...

Octahedron (StEM, modules pointing outside)
This model (first from the right, top row) is compared here with some other simple polyhedra folded from the same kind of module. The two octahedra demonstra...

Octahedron (StEM, modules pointing inside)
This model (first from the right, bottom row) is compared here with some other simple polyhedra folded from the same kind of module. The two octahedra demons...

Octahedron (SEU Sonobe)
This model (last in bottom row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively). No...

Octahedron (SEU from 2:1 paper)
This model (last in top row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively). Note ...

Cube (StEM)
This model (second from the left) is compared here with some other simple polyhedra folded from the same kind of module.

Cube (SEU Sonobe)
This model (second in bottom row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively).

Cube (SEU from 2:1 paper)
This model (second in top row) is shown compared to other models folded from SEU units made from 2:1 and square paper (top and bottom row, respectively).

Ticket Cube
I folded this business card cube from Warsaw public transport tickets rather than from business cards. 12 modules: 6 for the body and 6 for the coating.

Truncated Octahedron
This was one of my early modifications of the 60° unit. Note that in this modification, the angle at the module's tip is NOT 60 degrees.

Flower Icosahedron (60°)
Compare with a dodecahedron constructed from units modified by me in a similar manner, and with a model with the same structure but using StEM units.

Flower Dodecahedron (60°)
Compare with an icosahedron constructed from units modified by me in a similar manner.

Icosahedron
You can compare this model, which uses straight, unmodified units, with two models made from the same units after slight modification: Flower Icosahedron and...

Umbrella Dodecahedron
The module, originally designed just for folding this dodecahedron, can be also used for other kinds of models. See, for example, this spiked icosahedron.

Poinsettia Ball
Model is placed near a real Poinsettia flower for comparison.

Decorated Dodecahedron (Penultimate unit)
This model is made from 90 modules (modified variant for triangular faces). Each face of the dodecahedron is made from a 5-triangle group, where the triangul...

Decorated Icosidodecahedron
One of the larger models I have designed, this icosidodecahedron has pentagonal faces made up of small triangular pyramids and triangular faces replaced with...

Truncated Cube (PHiZZ)
Generally, PHiZZ units are always connected in such way that three modules meet at each vertex. However, one can connect just two modules at some points, thu...

Modified Buckyball (120 edges)
This is my experiment in modular origami made from two different types of units: 60 PHiZZ and 60 Penultimate units. These two kinds of modules are quite simi...

Jitterbug Icosidodecahedron
You can squeeze this model and transform it into an icosahedron, closing the empty space between units. This is called the jitterbug transformation.

Large Icosahedron
This icosahedron has nine triangular pyramids pointing inwards on each face. The same shape can also be described as a truncated icosahedron whose each face ...

Steinhaus Puzzle
This puzzle, described in Hugo Steinhaus' book Kalejdoskop matematyczny (Mathematical Snapshots, literally Mathematical Kaleidoscope) consists of six pieces,...
How to Make a Polyhedron Origami
Source: https://origami.kosmulski.org/types/balls-polyhedra
0 Response to "How to Make a Polyhedron Origami"
Post a Comment