login
Hints
(Greetings from The On-Line Encyclopedia of Bongard Problems!)
Search: keyword:allsorted
Displaying 61-70 of 87 results found. ( prev | next )     page 1 2 3 4 5 6 7 8 9
     Sort: id      Format: long      Filter: (all | no meta | meta)      Mode: (words | no words)
BP1098 Concave shapes whose cavities are similar to the shape vs. concave shape whose cavities are not similar to the shape.
?
?
?
?
(edit; present; nest [left/right]; search; history)
COMMENTS

"I am agnostic on whether to let this world include examples such as EX8932, where pixelation is used, or examples such as suggested by EX8928 similar to the "Topologist's Comb" (link in references) which are not locally path-connected. These two examples were provided by Aaron David Fairbanks." - Jago Collins 28th January 2021

REFERENCE

https://en.wikipedia.org/wiki/Similarity_(geometry)

https://en.wikipedia.org/wiki/Self-similarity

https://en.wikipedia.org/wiki/Comb_space

CROSSREFS

Adjacent-numbered pages:
BP1093 BP1094 BP1095 BP1096 BP1097  *  BP1099 BP1100 BP1101 BP1102 BP1103

EXAMPLE

A circle with a circle cut out of it does not fit left, because with the circle cut out of it, our shape is no longer a circle.

KEYWORD

stub, precise, allsorted, left-narrow, perfect, infinitedetail

CONCEPT self-reference (info | search)

AUTHOR

Jago Collins

BP1099 Considering only the ways they are connected, anything that can be said about a given node can be said about every other node vs. not so.
(edit; present; nest [left/right]; search; history)
REFERENCE

https://en.wikipedia.org/wiki/Vertex-transitive_graph

CROSSREFS

Adjacent-numbered pages:
BP1094 BP1095 BP1096 BP1097 BP1098  *  BP1100 BP1101 BP1102 BP1103 BP1104

KEYWORD

precise, allsorted, notso, math, preciseworld

CONCEPT graph (info | search),
distinguishing_crossing_curves (info | search)

WORLD

graph [smaller | same | bigger]
zoom in left

AUTHOR

Leo Crabbe

BP1100 There is a path between any two nodes vs. not so.
(edit; present; nest [left/right]; search; history)
REFERENCE

https://en.wikipedia.org/wiki/Graph_theory

https://en.wikipedia.org/wiki/Connectivity_(graph_theory)

CROSSREFS

Adjacent-numbered pages:
BP1095 BP1096 BP1097 BP1098 BP1099  *  BP1101 BP1102 BP1103 BP1104 BP1105

KEYWORD

precise, allsorted, world, preciseworld

CONCEPT graph (info | search),
distinguishing_crossing_curves (info | search),
connected_component (info | search)

WORLD

graph [smaller | same | bigger]
zoom in left (connected_graph) | zoom in right (disconnected_graph)

AUTHOR

Leo Crabbe

BP1101 Each node is connected to the same number of nodes by straight lines vs. not so.
(edit; present; nest [left/right]; search; history)
REFERENCE

https://en.wikipedia.org/wiki/Regular_graph

CROSSREFS

Any left example of BP1099 will be a left example for this BP.

Adjacent-numbered pages:
BP1096 BP1097 BP1098 BP1099 BP1100  *  BP1102 BP1103 BP1104 BP1105 BP1106

KEYWORD

precise, allsorted, preciseworld

CONCEPT graph (info | search),
distinguishing_crossing_curves (info | search)

WORLD

graph [smaller | same | bigger]
zoom in left

AUTHOR

Leo Crabbe

BP1102 Nodes share the same edge connections as the vertices of a cube vs. not so.
(edit; present; nest [left/right]; search; history)
REFERENCE

https://mathworld.wolfram.com/CubicalGraph.html

CROSSREFS

Adjacent-numbered pages:
BP1097 BP1098 BP1099 BP1100 BP1101  *  BP1103 BP1104 BP1105 BP1106 BP1107

KEYWORD

precise, allsorted, arbitrary, help, preciseworld

CONCEPT graph (info | search),
cube (info | search),
distinguishing_crossing_curves (info | search),
topological_transformation (info | search)

WORLD

connected_graph [smaller | same | bigger]

AUTHOR

Leo Crabbe

BP1109 Considering only the ways they are connected, anything that can be said about a given edge can be said about every other edge vs. not so.
(edit; present; nest [left/right]; search; history)
REFERENCE

https://mathworld.wolfram.com/Edge-TransitiveGraph.html

CROSSREFS

Adjacent-numbered pages:
BP1104 BP1105 BP1106 BP1107 BP1108  *  BP1110 BP1111 BP1112 BP1113 BP1114

KEYWORD

precise, allsorted, notso, math, left-narrow, preciseworld

CONCEPT graph (info | search),
distinguishing_crossing_curves (info | search)

WORLD

graph [smaller | same | bigger]

AUTHOR

Leo Crabbe

BP1123 Can be cut into tiles forming a checkerboard pattern vs. not so.
?
(edit; present; nest [left/right]; search; history)
COMMENTS

All examples in this Problem are grids consisting of two objects.

CROSSREFS

Adjacent-numbered pages:
BP1118 BP1119 BP1120 BP1121 BP1122  *  BP1124 BP1125 BP1126 BP1127 BP1128

EXAMPLE

EX9124 shows a 9 square by 9 square grid. Take each tile to be 3 squares by 3 squares; there is a 3 tile by 3 tile checkerboard pattern. (One of these tiles is itself a checkerboard pattern; the other is all black squares.)

KEYWORD

hard, nice, precise, allsorted, hardsort, grid, miniworlds

AUTHOR

Jago Collins

BP1131 One shape can be totally obscured by the other vs. neither shape can be obscured.
(edit; present; nest [left/right]; search; history)
COMMENTS

Rotation of shapes is not required for any left-hand panels, but it should not change any example's sorting if it is considered.

CROSSREFS

Adjacent-numbered pages:
BP1126 BP1127 BP1128 BP1129 BP1130  *  BP1132 BP1133 BP1134 BP1135 BP1136

KEYWORD

nice, precise, allsorted, pixelperfect, unorderedpair

CONCEPT overlap (info | search)

WORLD

2_shapes [smaller | same | bigger]

AUTHOR

Leo Crabbe

BP1132 Circle that passes through points is contained within bounding box vs. not so.
(edit; present; nest [left/right]; search; history)
CROSSREFS

Adjacent-numbered pages:
BP1127 BP1128 BP1129 BP1130 BP1131  *  BP1133 BP1134 BP1135 BP1136 BP1137

KEYWORD

precise, allsorted, boundingbox, hardsort, preciseworld, absoluteposition

CONCEPT circle (info | search),
imagined_entity (info | search)

WORLD

three_points [smaller | same | bigger]

AUTHOR

Leo Crabbe

BP1138 Each attribute is shared by every group or none vs. some attribute is shared by exactly two groups
(edit; present; nest [left/right]; search; history)
COMMENTS

Attributes are shading, shape, and number.

There are always three groups.

This problem is related to the card game Set.

CROSSREFS

Adjacent-numbered pages:
BP1133 BP1134 BP1135 BP1136 BP1137  *  BP1139 BP1140 BP1141 BP1142 BP1143

KEYWORD

nice, precise, allsorted, notso, preciseworld

CONCEPT all (info | search),
number (info | search),
same (info | search),
two (info | search),
three (info | search)

AUTHOR

William B Holland

( prev | next )     page 1 2 3 4 5 6 7 8 9

Welcome | Solve | Browse | Lookup | Recent | Links | Register | Contact
Contribute | Keywords | Concepts | Worlds | Ambiguities | Transformations | Invalid Problems | Style Guide | Goals | Glossary