Search: -meta:BP1112
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| BP810 |
| Figures can be transformed into one another by smooth stretching (intersection points stay constant; paths connecting those points remain), while remaining within the 2d box vs. movement out of the plane required. |
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| BP851 |
| Figure with points (small white circles) can be smoothly deformed within the 2D plane without passing through itself so that all points touch to make the other figure vs. not so (movement out of the plane required). |
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| BP853 |
| Prime knot vs. composite knot. |
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| BP911 |
| Red shape vs. blue shape. |
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| BP966 |
| Even number of white regions vs. odd number of white regions. |
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| BP977 |
| Two of the same object are enclosed in the same space (there is a path between them) vs. not so. |
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| BP992 |
| Concave shapes with concave cavities vs. convex cavities |
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COMMENTS
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All examples in this Problem are solid concave black shapes. In this Problem, the "cavities" of a concave shape are defined to be the convex hull of the shape minus the shape itself. For example, if you take a bite out of the edge of a piece of paper, the piece of paper in your mouth is the cavity of the bitten piece of paper. The idea may be indefinitely extended, considering whether the cavities of the cavities are concave or convex, and so on. |
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CROSSREFS
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Adjacent-numbered pages:
BP987 BP988 BP989 BP990 BP991 * BP993 BP994 BP995 BP996 BP997
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KEYWORD
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nice, precise, perfect, traditional
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CONCEPT
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recursion_number (info | search),
recursion (info | search)
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WORLD
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concave_fill_shape [smaller | same | bigger]
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AUTHOR
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Jago Collins
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| BP1022 |
| Nesting vs. no nesting. |
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