Difference between revisions of "Hypercube"

Latest revision as of 16:35, 20 August 2024

As used in geometry, a hypercube is an extrapolation of the cube or square to n dimensions. When n is not specified, it's generally assumed to be 4. For example, a 4th dimensional hypercube is called a tesseract. Therefore, an n-dimensional hypercube is also known as an n-cube. It is best drawn and represented in non-Euclidean geometry.

Tesseract

A tesseract is the 4th dimensional hypercube. It is made by combining two cubes. The net of a tesseract is composed of 8 cubes. It has the Schlaefli symbol ${4,3,3}$ . One simple coordinate system for its vertices are $(\pm1, \pm1, \pm1, \pm1)$ . The alternated tesseract is a 4D cross-polytope, which coincidentally, is also it's dual.

Extra Notes

The alternated hypercube is known as a demicube. The dual of the hypercube is known as the cross-polytope. For dimensions n≥3, the only n-dimensional regular honeycomb is made of the hypercube.

Links

To see an $\mathfrak{e}$ xample of a 4D cube, click here: [1]

@@ Line 9: / Line 9: @@
 ==Links==
-* [[cube]]
+* [[cube (geometry) | cube]]
-* [[square]]
+* [[square (geometry) | square]]
 * [[dimension]]
+* [[cross-polytope]]
 To see an <math>\mathfrak{e}</math>xample of a 4D cube, click here: [https://latex.artofproblemsolving.com/3/d/5/3d5fc91ddaa1838f367ade6a2baa0649edd32317.png]
 [[Category: Geometry]]

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Difference between revisions of "Hypercube"

Latest revision as of 16:35, 20 August 2024

Tesseract

Extra Notes

Links