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Boxes and Sketches - Nets of 3D Shapes

Grade 5CBSE

Review the key concepts, formulae, and examples before starting your quiz.

🔑Concepts

Understanding 3D Shapes and Sketches: 3D shapes, such as cubes and cuboids, have three dimensions: length, width, and height. A 'Deep Drawing' is a 2D sketch that represents these three dimensions on a flat surface to show what the object looks like in real life, providing a sense of depth and volume.

What is a Net?: A net is a 2D pattern or layout that can be folded to create a 3D solid. Imagine taking a cardboard box, cutting it along some edges, and flattening it out. The resulting flat shape is the net of that box.

Nets of a Cube: A cube consists of 66 identical square faces. A valid net for a cube must have exactly 66 squares arranged in a way that they do not overlap when folded. A common net for a cube looks like a 'cross' or a 'T' shape, with 44 squares in a vertical line and 22 squares attached to the sides.

Visualizing Folding: Not every arrangement of 66 squares makes a cube. For example, if you have 66 squares in a single straight line, they cannot fold into a cube because they lack the 'side' faces to close the shape. Visualizing the 'base' and then 'folding' the sides up in your mind is key to identifying valid nets.

Open Boxes: An 'open box' is a box without a top lid (like a tray or a drawer). The net of an open cube-shaped box will have only 55 square faces. If you see a net with only 55 faces, it can only form an open box, not a complete closed cube.

Nets of Cylinders and Cones: Different shapes have different net patterns. A cylinder's net consists of a rectangle (the curved surface) and two circles (the top and bottom bases). A cone's net consists of a circle for the base and a sector (which looks like a slice of pie) for the curved side.

Floor Maps vs. Deep Drawings: A floor map is a 2D top-down view (like a bird's eye view) that shows the layout of a space, marking positions of doors and windows. Unlike a deep drawing, a floor map does not show the height of the walls or the 3D structure of the building.

📐Formulae

Number of faces (F) in a Cube=6\text{Number of faces (F) in a Cube} = 6

Number of faces (F) in an Open Box=5\text{Number of faces (F) in an Open Box} = 5

Number of vertices (V) in a Cube/Cuboid=8\text{Number of vertices (V) in a Cube/Cuboid} = 8

Number of edges (E) in a Cube/Cuboid=12\text{Number of edges (E) in a Cube/Cuboid} = 12

Eulersˊ Formula for Polyhedrons: F+VE=2\text{Euler\'s Formula for Polyhedrons: } F + V - E = 2

💡Examples

Problem 1:

Sita wants to make a paper cube. She draws a net with 66 squares arranged in a straight vertical line. Will she be able to form a cube? Explain why.

Solution:

Step 1: Count the number of faces. The net has 66 faces, which is correct for a cube. Step 2: Visualize the folding process. In a straight line of 66 squares, the squares will simply wrap around each other. Step 3: Identify the missing parts. There are no squares on the 'left' or 'right' sides to act as the side faces of the cube. Therefore, the shape cannot be closed.

Explanation:

A valid cube net must allow for a base, four side walls, and a top lid. A single row of 66 squares fails to provide the side walls.

Problem 2:

A net for a cuboid-shaped shoe box has 66 rectangular faces. If the dimensions of the base are 10 cm×5 cm10\text{ cm} \times 5\text{ cm} and the height is 3 cm3\text{ cm}, list the dimensions of all the faces in the net.

Solution:

Step 1: Identify pairs of opposite faces. A cuboid has 33 pairs of identical faces. Step 2: Pair 1 (Bottom and Top) will have dimensions 10 cm×5 cm10\text{ cm} \times 5\text{ cm}. Step 3: Pair 2 (Front and Back) will have dimensions 10 cm×3 cm10\text{ cm} \times 3\text{ cm}. Step 4: Pair 3 (Left and Right sides) will have dimensions 5 cm×3 cm5\text{ cm} \times 3\text{ cm}.

Explanation:

In a cuboid net, opposite faces must be congruent (exactly the same size). There are 22 faces of 50 cm250\text{ cm}^2, 22 faces of 30 cm230\text{ cm}^2, and 22 faces of 15 cm215\text{ cm}^2.