File:De Bruijn theorem 6x6x6 no colours.svg
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[edit]DescriptionDe Bruijn theorem 6x6x6 no colours.svg |
English: Nicolaas De Bruijn's visual proof that a 6x6x6 box cannot be fully filled with 1x2x4 cuboids, drawn by CMG Lee. When the unit cubes are shaded as in the left figure, each cuboid occupies exactly 2 white and 2 black cubes. The coloured outlines show all possible configurations. However, there are more white than black cubes, as in the right figure. |
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Source | Own work | |
Author | Cmglee | |
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Date/Time | Thumbnail | Dimensions | User | Comment | |
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current | 21:22, 17 November 2019 | 512 × 410 (6 KB) | Cmglee (talk | contribs) | {{Information |description ={{en|1=Nicolaas De Bruijn's visual proof that a 6x6x6 box cannot be fully filled with 1x2x4 cuboids, drawn by CMG Lee. When the unit cubes are shaded as in the left figure, each cuboid occupies exactly 2 white and 2 black cubes. The coloured outlines show all possible configurations. However, there are more white than black cubes, as in the right figure.}} |date = |source ={{own}} |author =User:Cmglee |other versions={{source thumb|De_... |
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Short title | De Bruijn theorem 6x6x6 |
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Image title | Nicolaas De Bruijn's visual proof that a 6x6x6 box cannot be fully filled with 1x2x4 cuboids, drawn by CMG Lee. When the unit cubes are shaded as in the left figure, each cuboid occupies exactly 2 white and 2 black cubes. The coloured outlines show all possible configurations. However, there are more white than black cubes, as in the right figure. |
Width | 100% |
Height | 100% |