What is a torus best described as?

• A. A sphere-like shape with edges
• B. A doughnut-shaped object created by revolving a small circle around a bigger circle
• C. A flat shape with triangular faces
• D. A shape with no curved surfaces

Answer: (B)

A torus is accurately described as a doughnut-shaped object created by revolving a smaller circle around a larger circle. This geometric shape features a central hole and has a surface that is curved in both directions—much like a typical doughnut. The creation of a torus through this revolution emphasizes its unique properties such as having a continuous surface and a distinct outer and inner radius, which clearly differentiates it from shapes like spheres or flat geometric forms.

In contrast, other options describe shapes that do not encapsulate the characteristics of a torus. For instance, describing it as a sphere-like shape with edges fails to capture the defining hole and surface curvature. Similarly, a flat shape with triangular faces suggests a polyhedral form, which is fundamentally different from the rounded and continuous surface of a torus. Lastly, a shape with no curved surfaces contradicts the essential feature of the torus, which embraces curvature as a core aspect of its structure.