Final answer:
In Mathematics, analyzing a net that folds into a cube involves understanding how adjacent faces on the net become connecting edges in three-dimensional space, and points on the ends of these edges meet when the net is transformed into a cube.
Step-by-step explanation:
The question pertains to a concept in Mathematics where a net is folded into a cube. To understand which two points meet with point x when the net is folded, one would analyze the arrangement of the net's faces and how they relate to one another in three-dimensional space. When a net is properly folded into a cube, points that are edges of adjacent faces in the net become connecting edges in the cube, and points at the ends of those edges come together.
For instance, if point x is on one edge of a face, the point that comes together with x when the net is folded into a cube will be the point at the opposite end of an adjacent face's edge that is directly connected to x on the net. Understanding the properties of nets and their relation to three-dimensional shapes helps students visualize the transformation from two-dimensional to three-dimensional geometry.