Search: keyword:math
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BP806 |
| Image of repeating wallpaper with only 3-fold rotational symmetries versus image of repeating wallpaper with some other symmetries. |
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BP809 |
| Figures can be transformed into one another by smooth stretching (before and after there are the same crossroad-points; there is a curve connecting points before if and only if there is a curve connecting those points after) vs. not so. |
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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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BP811 |
| Archimedean tiling (regular polygons, all vertices look the same) versus two-uniform tiling (regular polygons, two different kinds of vertex). |
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BP813 |
| Representations of natural mathematical objects vs. representations of arbitrary objects. |
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BP822 |
| Two drawn polyhedra are duals vs. not so. |
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BP823 |
| Conic section (plot of solution to conic equation) vs. not so. |
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BP825 |
| Ticks mark an infinite sequence of angles on circle such that each angle is the double of the subsequent angle in the sequence (angle measured from rightmost indicated point) vs. not so. |
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COMMENTS
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This is solvable; it was solved by Sridhar Ramesh.
A full turn is considered "the same angle" as no turns; likewise for adding and subtracting full turns from any angle. All sequences of angles shown start at the rightmost tick.
It doesn't matter whether the angle is measured clockwise or counterclockwise, as long as the choice is consistent. |
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CROSSREFS
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Adjacent-numbered pages:
BP820 BP821 BP822 BP823 BP824  *  BP826 BP827 BP828 BP829 BP830
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KEYWORD
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hard, convoluted, notso, math, solved
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CONCEPT
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sequence (info | search)
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AUTHOR
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Aaron David Fairbanks
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