We can identify properties of a cube by looking at it, making a net of its shape, or making cuts in it to see what we find. How could we determine the properties of a 4-dimensional cube? What about an n-dimensional one? In this circle, we will explore properties of cubes beyond our visual comprehension. What might we find?

Note - Circle Prerequisites:

(1) Understands properties of 2D and 3D shapes (vertices, faces, lines)

(2) Has not explored this in depth with a hypercube