Pull up nets, cube, tetrahedron, octahedron, dodecahedron and icosahedron
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- Опубліковано 29 вер 2024
- I was reading a paper about pull up nets and it suggested that not all of the nets of a cube necessarily can be made to pull up.
Challenge accepted, I have made all eleven of the cube nets and depending on your definition of 'pull up' all of them can be made to pull up. I accept that not all of them do so elegantly but they do pull up into a cube. Given that there are many ways to loop thread through them improvements may be possible if there were a way to determine the most effective route.
Tacked on to the end are the only two unique nets of the tetrahedron, one of the eleven nets of the octahedron and one each of the thousands of nets of the dodecahedron and the icosahedron. I may get round to the other ten nets of the octahedron but not the thousands of the dodeca and icosahedrons.
These are card with sticky tape hinges and the eagle eyed will have seen that sometimes they flex the wrong way and yes the card came from pizza boxes, I eat a lot of pizza and always save the cardboard for making maquettes.
