70 Unique 3D Shape Quiz Questions

70 Unique 3D Shape Quiz Questions

Anthony Robinson

March 24, 2025Understanding 3D shapes is more than just memorizing geometry. It’s about recognizing the world around you.
From the spheres of basketballs to the cubes of dice, 3D shapes are everywhere. As an educator, I’ve seen how learning these shapes enhances spatial awareness, critical thinking, and problem-solving.
A 3D shape quiz takes this learning to the next level. It transforms abstract concepts into engaging challenges that kids and adults alike can enjoy.
In this blog, I’ve created 3D shape quiz questions, designed to engage learners of all levels.
You’ll find example questions, tips for mastering properties like edges, faces, and vertices, and creative activities to deepen understanding.
Let’s dive into the world of 3D shapes with curiosity and confidence!

3D Shapes Quiz Questions

1. What 3D Shape Has Six Identical Square Faces?

a) Sphereb) Cubec) Coned) CylinderAnswer: b) Cube

2. Which 3D Shape Has Only One Curved Surface and One Flat Circular Face?

a) Cylinderb) Spherec) Coned) PyramidAnswer: c) Cone

3. What Is the Name of a 3D Shape That Has Two Parallel Circular Faces Connected by a Curved Surface?

a) Cylinderb) Conec) Prismd) SphereAnswer: a) Cylinder

4. Which 3D Shape Has a Pointed Top and a Polygonal Base?

a) Pyramidb) Spherec) Cylinderd) ConeAnswer: a) Pyramid

5. What Shape Is a Ball an Example Of?

a) Cubeb) Spherec) Coned) CylinderAnswer: b) Sphere

6. How Many Edges Does a Cube Have?

a) 8b) 10c) 12d) 14Answer: c) 12

7. Which 3D Shape Has No Vertices?

a) Cylinderb) Spherec) Coned) PyramidAnswer: b) Sphere

8. A Soda Can Is an Example of Which 3D Shape?

a) Coneb) Cylinderc) Cubed) SphereAnswer: b) Cylinder

9. How Many Faces Does a Pyramid With a Square Base Have?

a) 4b) 5c) 6d) 7Answer: b) 5

10. Which 3D Shape Has 12 Faces, All of Which Are Pentagons?

a) Dodecahedronb) Icosahedronc) Tetrahedrond) CubeAnswer: a) Dodecahedron

11. What Is the Name of a 3D Shape That Has Eight Triangular Faces?

a) Octahedronb) Hexahedronc) Icosahedrond) PyramidAnswer: a) Octahedron

12. Which Shape Has a Circular Base and Tapers to a Point at the Top?

a) Coneb) Spherec) Cylinderd) CubeAnswer: a) Cone

13. How Many Vertices Does a Rectangular Prism Have?

a) 6b) 8c) 10d) 12Answer: b) 8

14. Which 3D Shape Has a Polygonal Base and Triangular Faces That Meet at a Point?

a) Pyramidb) Cylinderc) Prismd) CubeAnswer: a) Pyramid

15. How Many Edges Does a Triangular Prism Have?

a) 6b) 9c) 12d) 15Answer: b) 9

16. What Is the Shape of the Faces of a Cube?

a) Rectanglesb) Squaresc) Trianglesd) CirclesAnswer: b) Squares

17. A Dice Is an Example of Which 3D Shape?

a) Sphereb) Cubec) Cylinderd) PyramidAnswer: b) Cube

18. How Many Faces Does a Cone Have?

a) 1b) 2c) 3d) 4Answer: b) 2

19. What Is the Name of a 3D Shape With Six Rectangular Faces?

a) Cubeb) Spherec) Rectangular Prismd) CylinderAnswer: c) Rectangular Prism

20. Which Shape Is Like a Stretched Sphere?

a) Coneb) Cylinderc) Ellipsoidd) CubeAnswer: c) Ellipsoid

21. Which 3D Shape Has a Hexagonal Base and Six Rectangular Faces?

a) Coneb) Hexagonal Prismc) Cylinderd) PyramidAnswer: b) Hexagonal Prism

22. How Many Vertices Does a Square Pyramid Have?

a) 4b) 5c) 6d) 7Answer: b) 5

23. Which 3D Shape Is Formed by Stacking a Triangle Infinitely Along a Line?

a) Prismb) Pyramidc) Tetrahedrond) ConeAnswer: a) Prism

24. What Is the Shape of the Earth Commonly Considered to Be?

a) Cubeb) Spherec) Ellipsoidd) CylinderAnswer: c) Ellipsoid

25. How Many Faces Does a Triangular-Based Pyramid Have?

a) 3b) 4c) 5d) 6Answer: b) 4

26. What 3D Shape Is a Box of Chocolates Usually Packaged In?

a) Rectangular Prismb) Cubec) Sphered) CylinderAnswer: a) Rectangular Prism

27. Which 3D Shape Has Eight Vertices and Six Rectangular Faces?

a) Cubeb) Rectangular Prismc) Tetrahedrond) Hexagonal PrismAnswer: b) Rectangular Prism

28. How Many Edges Does a Cone Have?

a) 0b) 1c) 2d) 3Answer: b) 1

29. What Is the Name of a 3D Shape With Four Triangular Faces of Equal Size?

a) Tetrahedronb) Octahedronc) Pyramidd) CubeAnswer: a) Tetrahedron

30. Which 3D Shape Can Roll Perfectly Without Stopping?

a) Cubeb) Spherec) Coned) PyramidAnswer: b) Sphere

31. Which Shape Has Six Identical Rectangular Faces?

a) Cubeb) Rectangular Prismc) Hexahedrond) TetrahedronAnswer: b) Rectangular Prism

32. How Many Faces Does an Octahedron Have?

a) 6b) 8c) 10d) 12Answer: b) 8

33. Which 3D Shape Is Used as a Model for Dice With 20 Sides?

a) Icosahedronb) Octahedronc) Dodecahedrond) TetrahedronAnswer: a) Icosahedron

34. What Is the Base of a Square Prism Called?

a) Rectangleb) Squarec) Circled) TriangleAnswer: b) Square

35. How Many Vertices Does an Icosahedron Have?

a) 12b) 20c) 30d) 60Answer: b) 20

36. Which Shape Describes the Structure of a Honeycomb Cell?

a) Cubeb) Spherec) Hexagonal Prismd) PyramidAnswer: c) Hexagonal Prism

37. What Is the 3D Shape of a Traffic Cone?

a) Pyramidb) Conec) Cylinderd) CubeAnswer: b) Cone

38. Which 3D Shape Has Two Triangular Bases and Three Rectangular Faces?

a) Pyramidb) Triangular Prismc) Cubed) TetrahedronAnswer: b) Triangular Prism

39. How Many Edges Does a Tetrahedron Have?

a) 4b) 6c) 8d) 12Answer: b) 6

40. Which Shape Is Used for a Football (Soccer Ball) Design?

a) Cubeb) Hexahedronc) Icosahedrond) SphereAnswer: c) Icosahedron

41. What 3D Shape Describes a Pencil Without Its Tip?

a) Rectangular Prismb) Hexagonal Prismc) Cylinderd) ConeAnswer: b) Hexagonal Prism

42. How Many Faces Does a Hexagonal Pyramid Have?

a) 6b) 7c) 8d) 10Answer: b) 7

43. What Is the 3D Shape of a Sugar Cube?

a) Sphereb) Cubec) Cylinderd) TetrahedronAnswer: b) Cube

44. Which 3D Shape Is a Prism With a Circular Base?

a) Coneb) Cylinderc) Sphered) PyramidAnswer: b) Cylinder

45. How Many Faces Does a Dodecahedron Have?

a) 10b) 12c) 20d) 30Answer: b) 12

46. What Is the Name of a 3D Shape With No Flat Surfaces?

a) Coneb) Spherec) Cylinderd) PyramidAnswer: b) Sphere

47. Which Shape Best Represents an Ice Cream Cone?

a) Cylinderb) Conec) Sphered) PyramidAnswer: b) Cone

48. How Many Vertices Does an Octagonal Prism Have?

a) 10b) 16c) 18d) 20Answer: b) 16

49. What 3D Shape Is Formed by Rotating a Rectangle Around One of Its Edges?

a) Coneb) Spherec) Cylinderd) PyramidAnswer: c) Cylinder

50. Which Shape Best Represents a Dice With Six Equal Sides?

a) Tetrahedronb) Cubec) Hexagonal Prismd) SphereAnswer: b) Cube

51. What 3D Shape Has Two Parallel Hexagonal Faces?

a) Hexagonal Pyramidb) Hexagonal Prismc) Cylinderd) CubeAnswer: b) Hexagonal Prism

52. How Many Edges Does a Rectangular Pyramid Have?

a) 5b) 6c) 8d) 9Answer: c) 8

53. Which Shape Is a Combination of a Sphere and a Cylinder?

a) Capsuleb) Conec) Ellipsoidd) PrismAnswer: a) Capsule

54. What 3D Shape Best Represents a Water Bottle?

a) Cylinderb) Cubec) Coned) SphereAnswer: a) Cylinder

55. How Many Vertices Does a Pentagonal Prism Have?

a) 6b) 8c) 10d) 12Answer: c) 10

56. Which Shape Is Used to Represent the Structure of DNA?

a) Cylinderb) Helixc) Prismd) SphereAnswer: b) Helix

57. What Is the 3D Shape of a Bowling Pin?

a) Coneb) Ellipsoidc) Tapered Cylinderd) SphereAnswer: c) Tapered Cylinder

58. How Many Faces Does a Sphere Have?

a) 0b) 1c) 2d) InfiniteAnswer: b) 1

59. Which 3D Shape Has a Square Base and Four Triangular Faces?

a) Pyramidb) Cubec) Prismd) ConeAnswer: a) Pyramid

60. How Many Edges Does an Octagonal Pyramid Have?

a) 12b) 16c) 20d) 24Answer: b) 16

61. What Is the 3D Shape of a Toblerone Box?

a) Rectangular Prismb) Triangular Prismc) Coned) CylinderAnswer: b) Triangular Prism

62. Which Shape Is Used to Represent a Globe?

a) Cubeb) Cylinderc) Sphered) ConeAnswer: c) Sphere

63. How Many Faces Does a Hexagonal Prism Have?

a) 6b) 8c) 10d) 12Answer: c) 8

64. What Is the Shape of a Typical Ice Cream Scoop?

a) Coneb) Spherec) Cylinderd) EllipsoidAnswer: b) Sphere

65. Which 3D Shape Represents a Pyramid With a Triangular Base?

a) Triangular Prismb) Tetrahedronc) Hexahedrond) SphereAnswer: b) Tetrahedron

66. How Many Vertices Does a Cube Have?

a) 6b) 8c) 12d) 14Answer: b) 8

67. What 3D Shape Is Formed by Rotating a Triangle Around Its Height?

a) Cylinderb) Pyramidc) Coned) SphereAnswer: c) Cone

68. Which Shape Best Represents a Party Hat?

a) Coneb) Cylinderc) Pyramidd) SphereAnswer: a) Cone

69. How Many Edges Does a Pentagonal Pyramid Have?

a) 5b) 10c) 15d) 20Answer: b) 10

70. What Is the 3D Shape of a Standard Soda Can?

a) Sphereb) Cubec) Cylinderd) EllipsoidAnswer: c) Cylinder

How to Prepare for A 3 D Shape Quiz?

Understanding the Basics of 3D Shapes

In my extensive work with three-dimensional geometry, I found that understanding polyhedra and curved solids requires a systematic approach. Let me break this down:
A cube exemplifies perfect symmetry with its six congruent square faces, while a rectangular prism shows how changing these dimensions affects volume relationships.
The sphere, which I find mathematically fascinating, has infinite lines of symmetry and represents perfect rotational symmetry in all directions.
When I teach pyramids, I emphasize their critical properties: a square pyramid has five vertices, eight edges, and five faces, while a triangular pyramid (tetrahedron) has four vertices, six edges, and four faces.
Cylinders demonstrate the extension of circular geometry into the third dimension, with parallel circular faces connected by a curved surface.
The cone, which I often use to explain limits and calculus concepts, shows how a point extends to a circular base through straight lines, creating a curved lateral surface.

Recognizing Faces, Edges, and Vertices

In my mathematical research, I’ve found that understanding polyhedral elements is crucial for grasping more complex topological concepts. Let me explain the precise definitions:
A face is any flat polygonal surface that forms part of the boundary of a polyhedron. Edges occur at the intersection of two faces, forming linear segments where surfaces meet at specific angles.
Vertices are points where three or more edges converge, creating corners with specific geometric properties.
I always emphasize Euler’s characteristic formula (V – E + F = 2) because it reveals a fundamental truth about all convex polyhedra.
For instance, when analyzing an octahedron, we find six vertices, 12 edges, and eight faces, perfectly satisfying this relationship.
I’ve observed that understanding these relationships helps in proving theorems about polyhedra and their dual relationships.

Memorizing Shape Formulas

Through my years teaching advanced geometry, I’ve developed specific techniques for understanding volume and surface area relationships.
The volume formula for a prism (V = Bh) demonstrates the fundamental principle of extending a base area through a height.
For complex shapes like truncated cones, I show how integral calculus derives the volume formula V = πh(R² + Rr + r²)/3, where R and r are the radii of the parallel faces.
Surface area calculations require understanding net diagrams and integration over curved surfaces. For a sphere, the surface area formula SA = 4πr² emerges from calculus through integration over the surface, while its volume V = 4/3πr³ comes from triple integration in spherical coordinates.
I particularly emphasize how the surface area of a cone (SA = πr² + πrs) combines the circular base area with the curved lateral surface, where s is the slant height calculated using the Pythagorean theorem: s = √(r² + h²).
I always teach my students that these formulas connect through underlying mathematical principles. For instance, Cavalieri’s principle explains why cylinders with the same base area and height have equal volumes, regardless of their inclination.
I demonstrate how the frustum of a cone’s volume can be derived using integration or the difference between two cones.
When teaching about spherical shells, I show how their volume formula V = 4πr²t (where t is the shell thickness) relates to both the surface area formula and the fundamental theorem of calculus.
In both pure and applied mathematics, mastering these concepts requires understanding their interconnections rather than memorizing isolated facts.
I encourage exploring cross-sections, visualizing three-dimensional transformations, and practicing with varied problems that challenge spatial reasoning abilities.

Example Questions for A 3D Shape Quiz

Good 3D shape quizzes combine visual recognition with practical understanding. Let’s see some sample questions you can include:

Identify the Shape of 3d Shape 

In my advanced geometry courses, I design questions that probe deeper than simple recognition. For instance, I ask students to analyze polyhedra like “Describe a shape that has 8 triangular faces and 6 vertices” (an octahedron).
I find it particularly effective to include questions about more complex shapes: “Which platonic solid has 20 faces and 12 vertices?” (a dodecahedron).
I often challenge students with questions about truncated shapes: “What shape results when you slice off the corners of a cube at equal distances from each vertex?”
(A truncated cube with eight triangular and six octagonal faces). These questions develop spatial reasoning far beyond simple shape recognition.

Name the Properties of 3d Shape 

When testing properties, I focus on relationships rather than mere counting. I ask questions like “How does the number of edges in a triangular prism relate to its number of vertices?”
This requires understanding that the edges will be three more than the vertices in this case. For curved surfaces, I probe understanding with questions like “Explain why a cone has infinitely many edges on its lateral surface but only one circular edge at its base.
” I particularly enjoy asking about cross-sections: “What shapes can you create when slicing a cube at different angles?”
This tests understanding of how three-dimensional objects behave under different intersecting planes.

Match the Shape to Real-Life Objects

In this section, I emphasize mathematical precision in real-world applications. Instead of simply asking about a soda can, I ask, “Why is a cylinder the most efficient shape for storing liquid in terms of material usage versus volume?”
This requires understanding the relationship between surface area and volume. I challenge students with questions like “Why do beehives use hexagonal prisms rather than circular cylinders?” which combines geometry with optimization principles.
I also include questions about composite shapes: “Describe the geometric shapes that make up a standard light bulb, including how they transition from one to another.” This tests understanding of how basic shapes combine to form complex objects.
From my experience teaching geometry at various levels, I’ve found that incorporating questions about symmetry, cross-sections, and optimization problems significantly enhances students’ spatial reasoning abilities.
For instance, I might ask, “If you slice a cone with a plane at different angles, what different conic sections can you create, and why?” This type of question connects 3D geometry with other mathematical concepts like ellipses and parabolas.
I always include questions about volume and surface area relationships: “Why does doubling the radius of a sphere increase its surface area by a factor of 4 but its volume by a factor of 8?”
Such questions test not just formula memorization but true mathematical understanding. In my assessments, I emphasize conceptual understanding through questions like “How does the volume of a cylinder change as you vary its height while keeping its surface area constant?”
These types of questions encourage students to think deeply about geometric relationships rather than simply memorizing properties. I’ve found that this approach leads to better long-term retention and stronger mathematical intuition.

Conclusion 

Learning about 3D shapes isn’t just about memorizing formulas or identifying objects. It’s about building a strong foundation in geometry and spatial reasoning.
Quizzes focused on 3D shapes make this process engaging and interactive, turning what might seem like a dry topic into a fun and enriching experience.
Over the years, I’ve seen how these quizzes can boost confidence, sharpen problem-solving skills, and even spark a genuine love for math.
I encourage you to give 3D shape quizzes a try, whether you’re a student, a teacher, or a parent. Use the example questions and tips shared here to make the experience even more exciting.
You’ll be amazed at how much easier concepts like edges, faces, and vertices become when approached as a game.
Do you have a favorite question or a creative quiz idea? Share it in the comments—I’d love to hear about your experiences. Let’s continue making math enjoyable and accessible for everyone!

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