Timeline for On cutting tetrahedrons into mutually congruent pieces
Current License: CC BY-SA 4.0
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| May 29 at 4:51 | comment | added | Nandakumar R | This certainly is a partial answer - at least, I don't see a way to cut a regular tet into n pieces where n is any power of 8. Remark: It is not clear to me if allowing non-convex pieces would help at all. thanks for the pointer to your question. | |
| May 27 at 0:18 | history | answered | RavenclawPrefect | CC BY-SA 4.0 |