Shape Construction Worksheet 10 - Beginner-Intermediate Level (geometric logic) | 20 Questions

Question 1

A 3D structure is made of unit cubes. From the front, top, and side views: Front view (looking from front): ⬜⬜⬜ ⬜⬜⬛ ⬜⬛⬛ Top view (looking from above): ⬜⬜⬜ ⬜⬜⬛ ⬛⬛⬛ Side view (looking from right): ⬜⬜⬛ ⬜⬜⬛ ⬛⬛⬛ How many cubes are in the structure (including hidden ones)?

By reconstructing the 3D arrangement from the three orthographic views:
- Each view shows the maximum cubes in that direction
- The intersection of views reveals cube positions
- Total unique cube positions = 9 cubes

counting, hidden, 3d, orthographic

Question 2

If you assemble these 2D shapes in 3D space by joining matching edges, which 3D shape do you get? Parts: ▲ + ▭ + ▲

The triangular prism can be constructed from:
triangle, rectangle, triangle arranged appropriately.
This is a standard net/assembly pattern for a triangular prism.

assembly, 2d-to-3d, construction

Question 3

Which of the following nets can be folded into a cube (without overlapping)?

A valid cube net must have exactly 6 squares connected edge-to-edge, with each square adjacent to at most 4 others, and when folded, all squares meet at edges without overlap.
This net is one of the 11 known cube nets.

cube, net, folding, 3d

Question 4

If you assemble these 2D shapes in 3D space by joining matching edges, which 3D shape do you get? Parts: ▲ + ▭ + ▲

The triangular prism can be constructed from:
triangle, rectangle, triangle arranged appropriately.
This is a standard net/assembly pattern for a triangular prism.

assembly, 2d-to-3d, construction

Question 5

If you assemble these 2D shapes in 3D space by joining matching edges, which 3D shape do you get? Parts: 6 × ⬜

The cube can be constructed from:
square, square, square, square, square, square arranged appropriately.
This is a standard net/assembly pattern for a cube.

assembly, 2d-to-3d, construction

Question 6

This is the net of a cube with letters on each face: [A][B][C] [D] [E] [F] What is opposite to face A after folding?

By mentally folding the net:
- Identify which edges join when folded
- Track the 3D adjacency relationships
- F ends up opposite to the asked face based on the folding pattern.

cube, folding, pattern, 3d

Question 7

Which of the following nets can be folded into a cube (without overlapping)?

A valid cube net must have exactly 6 squares connected edge-to-edge, with each square adjacent to at most 4 others, and when folded, all squares meet at edges without overlap.
This net is one of the 11 known cube nets.

cube, net, folding, 3d

Question 8

If you assemble these 2D shapes in 3D space by joining matching edges, which 3D shape do you get? Parts: ▲ + ▭ + ▲

The triangular prism can be constructed from:
triangle, rectangle, triangle arranged appropriately.
This is a standard net/assembly pattern for a triangular prism.

assembly, 2d-to-3d, construction

Question 9

A 3D structure is made of unit cubes. From the front, top, and side views: Front view (looking from front): ⬜⬜⬜ ⬜⬜⬛ ⬜⬛⬛ Top view (looking from above): ⬜⬜⬜ ⬜⬜⬛ ⬛⬛⬛ Side view (looking from right): ⬜⬜⬛ ⬜⬜⬛ ⬛⬛⬛ How many cubes are in the structure (including hidden ones)?

By reconstructing the 3D arrangement from the three orthographic views:
- Each view shows the maximum cubes in that direction
- The intersection of views reveals cube positions
- Total unique cube positions = 9 cubes

counting, hidden, 3d, orthographic

Question 10

This is the net of a cube with letters on each face: [A][B][C] [D] [E] [F] What is opposite to face A after folding?

By mentally folding the net:
- Identify which edges join when folded
- Track the 3D adjacency relationships
- F ends up opposite to the asked face based on the folding pattern.

cube, folding, pattern, 3d

Question 11

A 3D structure is made of unit cubes. From the front, top, and side views: Front view (looking from front): ⬜⬜⬜ ⬜⬛⬛ ⬛⬛⬛ Top view (looking from above): ⬜⬜⬛ ⬜⬜⬛ ⬛⬛⬛ Side view (looking from right): ⬜⬜⬛ ⬜⬛⬛ ⬛⬛⬛ How many cubes are in the structure (including hidden ones)?

By reconstructing the 3D arrangement from the three orthographic views:
- Each view shows the maximum cubes in that direction
- The intersection of views reveals cube positions
- Total unique cube positions = 7 cubes

counting, hidden, 3d, orthographic

Question 12

How many visible faces can be seen from the front view of this 3D arrangement (assuming each small cube has 6 faces, and cubes are placed on a ground plane, looking from a corner angle)? Cube arrangement (top view, 1=cube present): ⬜ ⬜ ⬜

Each cube has 6 faces, but faces are hidden where cubes touch or touch the ground.
- Count visible faces: Top faces (1 per visible cube) + Front faces + Side faces.
- For this configuration, the total is 17 visible faces.

counting, faces, 3d, cubes

Question 13

This is the net of a cube with letters on each face: [A][B][C] [D] [E] [F] What is opposite to face A after folding?

By mentally folding the net:
- Identify which edges join when folded
- Track the 3D adjacency relationships
- F ends up opposite to the asked face based on the folding pattern.

cube, folding, pattern, 3d

Question 14

This is the net of a cube with letters on each face: [A][B][C] [D] [E] [F] What is opposite to face A after folding?

By mentally folding the net:
- Identify which edges join when folded
- Track the 3D adjacency relationships
- F ends up opposite to the asked face based on the folding pattern.

cube, folding, pattern, 3d

Question 15

This is the net of a cube with letters on each face: [A][B][C] [D] [E] [F] What is opposite to face A after folding?

By mentally folding the net:
- Identify which edges join when folded
- Track the 3D adjacency relationships
- F ends up opposite to the asked face based on the folding pattern.

cube, folding, pattern, 3d

Question 16

A 3D structure is made of unit cubes. From the front, top, and side views: Front view (looking from front): ⬜⬜⬜ ⬜⬜⬛ ⬜⬛⬛ Top view (looking from above): ⬜⬜⬜ ⬜⬜⬛ ⬛⬛⬛ Side view (looking from right): ⬜⬜⬛ ⬜⬜⬛ ⬛⬛⬛ How many cubes are in the structure (including hidden ones)?

By reconstructing the 3D arrangement from the three orthographic views:
- Each view shows the maximum cubes in that direction
- The intersection of views reveals cube positions
- Total unique cube positions = 9 cubes

counting, hidden, 3d, orthographic

Question 17

If you assemble these 2D shapes in 3D space by joining matching edges, which 3D shape do you get? Parts: ⚪ + ▭ + ⚪

The cylinder can be constructed from:
circle, rectangle, circle arranged appropriately.
This is a standard net/assembly pattern for a cylinder.

assembly, 2d-to-3d, construction

Question 18

A standard die (opposite faces sum to 7) is shown from different angles: View 1: Top: 1 Front: 2 Right: 3 Which face is opposite to face 1?

Using the standard dice rule (opposite faces sum to 7):
- From the views, we can determine adjacency relationships
- Face 1 appears in multiple views
- Tracking orientations shows it is opposite to 6 (since 1 + 6 = 7)

dice, opposite, 3d, orientation

Question 19

A standard die (opposite faces sum to 7) is shown from different angles: View 1: Top: 4 Front: 1 Right: 5 Which face is opposite to face 2?

Using the standard dice rule (opposite faces sum to 7):
- From the views, we can determine adjacency relationships
- Face 2 appears in multiple views
- Tracking orientations shows it is opposite to 5 (since 2 + 5 = 7)

dice, opposite, 3d, orientation

Question 20

A standard die (opposite faces sum to 7) is shown from different angles: View 1: Top: 1 Front: 2 Right: 3 Which face is opposite to face 1?

Using the standard dice rule (opposite faces sum to 7):
- From the views, we can determine adjacency relationships
- Face 1 appears in multiple views
- Tracking orientations shows it is opposite to 6 (since 1 + 6 = 7)

dice, opposite, 3d, orientation

Shape Construction - Beginner-Intermediate Level: geometric logic BEGINNER-INTERMEDIATE

What you'll learn in this worksheet:

Question 1

Question 2

Question 3

Question 4

Question 5

Question 6

Question 7

Question 8

Question 9

Question 10

Question 11

Question 12

Question 13

Question 14

Question 15

Question 16

Question 17

Question 18

Question 19

Question 20