| 1. | So the volume of the unit cube is 1 as expected.
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| 2. | Show a point moving inside a solid unit cube.
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| 3. | In other words, it is topologically indistinguishable from the unit cube of countably infinite dimension.
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| 4. | The Gaussian copula is a distribution over the unit cube [ 0, 1 ] ^ d.
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| 5. | Another way to express the same problem is to ask for the largest square that lies within a unit cube.
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| 6. | More generally, show how to find the largest rectangle of a given aspect ratio that lies within a unit cube.
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| 7. | Each unit cube contains a cubic unit of volume and each of the surfaces of the cubes are a square unit of area.
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| 8. | Then there is a point in the-dimensional unit cube in which all functions are " simultaneously " equal to.
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| 9. | :I gather you want to write an arbitrary point in the interior of the unit cube as a convex combination of the eight vertices.
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| 10. | In algebraic terms, doubling a unit cube requires the construction of a line segment of length, where; in other words, } }.
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