'Cube' is related to 'Square' (3D solid whose face is a square) in the same way as 'Square' is related to which 1D boundary element?
Correct Answer: Line
Introduction / Context:Geometric analogies often hinge on dimensional relationships. A cube is a three-dimensional solid whose faces are two-dimensional squares. We must continue the dimensional descent to find the object that stands to a square as a square stands to a cube.
Given Data / Assumptions:
- Cube (3D) → face is Square (2D).
- Square (2D) has boundary elements that are Line segments (1D).
- We keep the pattern 'figure → its (one-dimension-lower) boundary/face'.
Concept / Approach:The mapping follows a reduction of dimension by one: 3D to 2D (faces), then 2D to 1D (edges). A square’s edges are straight line segments. Thus the consistent counterpart is 'Line' rather than a specific polygon (triangle) or a higher-dimensional entity (plane), or an even lower-dimensional vertex (point).
Step-by-Step Solution:1) Identify relation: shape → characteristic boundary element one dimension lower.2) Cube → Square (face of the cube).3) Square → Line (edge of the square).4) Select 'Line' to preserve parallelism.
Verification / Alternative check:A square has four sides; each side is a line segment (1D). The face of a cube is a square (2D). The analogy therefore keeps dimensional decrement consistent: 3D→2D, then 2D→1D.
Why Other Options Are Wrong:
- Plane: 2D infinite surface; not a boundary element of a square.
- Triangle: Different polygon; breaks the boundary relation.
- Point: Vertex (0D) is too far a reduction; the next direct boundary step is 1D.
- None of these: Incorrect because 'Line' is correct.
Common Pitfalls:Jumping from faces to vertices (point) rather than edges, or choosing an unrelated polygon. Maintain the exact dimensional step-down.
Final Answer:Line