Search: keyword:allsorted
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BP576 |
| Vertices may be partitioned into two sets such that no two vertices in the same set are connected versus not so. |
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BP788 |
| Graph contains a "loop" a.k.a. cycle (cyclic) versus graph is acyclic. |
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BP820 |
| Shape can be combined with a copy of itself to form a convex shape vs. not so. |
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BP856 |
| Compound shape would hit the dot if rotated vs. not so. |
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BP863 |
| Two shapes can tessellate the plane together vs. not so. |
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BP891 |
| Dots can be connected to create one triangle within another vs. not so. |
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BP897 |
| Wide angles connected to narrow angles vs. not so. |
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BP898 |
| Can fold into tetragonal disphenoid ("isosceles tetrahedron") vs. cannot. |
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COMMENTS
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Which two sides are the long sides and which side is the short side, or equivalently which angles are the wider angles and which angle is the narrower angle, is the only relevant information to consider for each triangle. Triangles are all assumed isosceles and congruent to one another.
All examples in this Problem feature four of these triangles connected by corners and/or edges. |
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CROSSREFS
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BP897 was conceived as a false solution for this.
Adjacent-numbered pages:
BP893 BP894 BP895 BP896 BP897  *  BP899 BP900 BP901 BP902 BP903
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KEYWORD
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hard, precise, allsorted, notso, math, preciseworld
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CONCEPT
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triangle (info | search)
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WORLD
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[smaller | same | bigger]
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AUTHOR
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Molly C Klenzak
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