3D Shapes (Definition, Properties, Types, Examples of 3D Shapes) (2024)

In geometry, 3D shapes are solid shapes or figures that have three dimensions. Generally, length, width and height are the dimensions of 3D shapes (three-dimensional shapes). The common names of these shapes are cube, cuboid, cone, cylinder and sphere. 3D shapes are defined by their respective properties such as edges, faces, vertices, curved surfaces, lateral surfaces and volume.

We come across a number of objects of different shapes and sizes in our day-to-day life. There are golf balls, doormats, ice-cream cones, co*ke cans, and so on. In this article, we will discuss the various 3D shapes, surface area and volumes, and the process of making 3D shapes using nets with the help of 2D Shapes.

Table of Contents:

3D Shape Definition
Type of 3D Shapes
- Polyhedrons
- Curved Solids
Faces, Vertices and Edges
Properties of 3D Shapes
Surface Area and Volume
Formulas
3D Shapes using Nets
- Cuboid
- Cube
- Cone
- Cylinder
- Pyramid
Video Lesson
Solved Examples
Practice Questions
FAQs

What are 3D Shapes?

In Geometry, 3D shapes are known as three-dimensional shapes or solids. 3D shapes have three different measures such as length, width, and height as its dimensions. The only difference between 2D shape and 3D shapes is that 2D shapes do not have a thickness or depth.

Usually, 3D shapes are obtained from the rotation of the 2D shapes. The faces of the solid shapes are the 2D shapes. Some examples of the 3D shapes are a cube, cuboid, cone, cylinder, sphere, prism and so on.

Types of 3D Shapes

The 3D shapes consist of both curved shaped solid and the straight-sided polygon called the polyhedron. The polyhedrons are also called the polyhedra, which are based on the 2D shapes with straight sides. Now, let us discuss the details about the polyhedrons and curved solids.

Polyhedrons

Polyhedrons are 3D shapes. As discussed earlier, polyhedra are straight-sided solids, which has the following properties:

Polyhedrons should have straight edges.
It should have flat sides are called the faces
It must have the corners, called vertices

Like polygons in two-dimensional shapes, polyhedrons are also classified into regular and irregular polyhedrons and convex and concave polyhedrons.

The most common examples of polyhedra are:

Cube: It has 6 square faces, 8 vertices and 12 edges
Cuboid: It has 6 rectangular faces, 8 vertices and 12 edges
Pyramid: It has a polygon base, straight edges, flat faces and one vertex
Prism: It has identical polygon ends and flat parallelogram sides

Some other examples of regular polyhedrons are tetrahedrons, octahedrons, dodecahedrons, icosahedrons, and so on. These regular polyhedrons are also known as platonic solids, whose faces are identical to each face.

For example, the most commonly used example of a polyhedron is a cube, which has 6 faces, 8 vertices, and 12 edges.

Curved Solids

The 3D shapes that have curved surfaces are called curved solids. The examples of curved solids are:

Sphere: It is a round shape, having all the points on the surface equidistant from center
Cone: It has a circular base and a single vertex
Cylinder: It has parallel circular bases, connected through curved surface

Faces Edges and Vertices

Faces, edges and vertices are three important measures of 3D shapes, that defines their properties.

Faces – A face is a curve or flat surface on the 3D shapes
Edges – An edge is a line segment between the faces
Vertices – A vertex is a point where the two edges meet

Properties of 3D shapes

As we already discussed above the properties of 3D shapes are based on their faces, edges and vertices. Thus, we can have a brief of all the properties here in the table.

Cube	6 square faces 8 vertices 12 edges
Cuboid	6 rectangular faces 8 vertices 12 edges
Cone	2 faces (circular base and curved surface) 1 vertex 1 edge
Cylinder	3 faces 2 edges 0 vertices
Sphere	1 curved surface 0 edges 0 vertices
Tetrahedron	4 faces 6 edges 4 vertices
Triangular prism	5 faces 9 edges 6 vertices
Square-based pyramid	5 faces 8 edges 5 vertices

Surface Area and Volume of 3D shapes

The two different measures used for measuring the 3D shapes are:

Surface Area
Volume

Surface Area is defined as the total area of the surface of the two-dimensional object. The surface area is measured in terms of square units, and it is denoted as “SA”. The surface area can be classified into three different types. They are:

Curved Surface Area (CSA) – Area of all the curved regions
Lateral Surface Area (LSA) – Area of all the curved regions and all the flat surfaces excluding base areas
Total Surface Area (TSA) – Area of all the surfaces including the base of a 3D object

Volume is defined as the total space occupied by the three-dimensional shape or solid. It is measured in terms of cubic units and it is denoted by “V”.

3D Shapes Formulas

The formulas of 3D shapes related to surface areas and volumes are:

Name of the Shapes	Formulas
Cube	TSA = 6a² (square units) LSA = 4a² (square units) Volume = a³ (cubic units)
Cuboid	TSA = 2 (lw + wh + lh) (square units) LSA = 2h(l + w) (square units) Volume = a³ (cubic units)
Cone	TSA = πr(l + r) (square units) CSA = πrl (square units) Volume = (1/3)πr²h (cubic units)
Cylinder	TSA = 2πr(h+r) (square units) Volume = πr²h (cubic units)
Sphere	SA = 4πr² square units Volume = (4/3)πr³cubic units

3D Shapes Nets

A net is a flattened out three-dimensional solid. It is the basic skeleton outline in two dimensions, which can be folded and glued together to obtain the 3D structure. Nets are used for making 3D shapes. Let us have a look at nets for different solids and its surface area and volume formula.

Cuboid

A cuboid is also known as a rectangular prism. The faces of the cuboid are rectangular. All the angle measures are 90 degrees.

Take a matchbox. Cut along the edges and flatten out the box. This is the net for the cuboid. Now if you fold it back and glue it together similarly as you opened it, you get the cuboid.

Cube

A cube is defined as a three-dimensional square with 6 equal sides. All the faces of the cube have equal dimension.

Take a cheese cube box and cut it out along the edges to make the net for a cube.

Cone

A cone is a solid object that has a circular base and has a single vertex. It is a geometrical shape that tapers smoothly from the circular flat base to a point called the apex.

Take a birthday cap which is conical. When you cut a slit along its slant surface, you get a net for cone.

Cylinder

A cylinder is a solid geometrical figure, that has two parallel circular bases connected by a curved surface.

When you cut along the curved surface of any cylindrical jar, you get a net for the cylinder. The net consists of two circles for the base and the top and a rectangle for the curved surface.

Pyramid

A pyramid, also known as a polyhedron. A pyramid can be any polygon, such as a square, triangle and so on. It has three or more triangular faces that connect at a common point is called the apex.

The net for a pyramid with a square base consists of a square with triangles along its four edges.

Video Lesson

To Know About Nets Of Solid Shapes, Watch The Below Video:

Solved Examples

Q.1: What is the surface area of a cube, if the edge length is 4 cm?

Practice Questions

Find the volume of cube if the edge length is 10 cm.
What is the surface area of sphere whose radius is 3cm?
If the radius of base of cone is 2.5 cm and height of cone is 5 cm, then find the volume of cone.
The dimensions of cuboid are 20mm x 15mm x 10mm. Find the surface area of cuboid.

Frequently Asked Questions on 3D Shapes

What is meant by 3D shape in Maths?

In Maths, three-dimensional shapes (3D shapes) are also called the solids, which have three-dimensions namely length, width and height. 3D shapes can include both polyhedrons and curved solids.

What is the difference between 2D and 3D shapes?

Two-dimensional shapes are called flat shapes, which have only two dimensions called length and width, whereas 3D shapes are called solids, which has three-dimensions namely length, width, and height.

Mention the properties of the 3D shape.

The three important properties of 3d shapes are faces, edges, and vertices. The face is called the flat surface of the solid, the edge is called the line segment where two faces meet, and the vertex is the point where two edges meet.

What is the 3D shape of a square?

The three-dimensional form of the square is called a cube, which has 6 faces, 8 vertices, and 12 edges.

Write down the examples of 3D shapes?

Some of the examples of 3D shapes are cube, cuboid, cone, cylinder, sphere, pyramid, prism, and so on.

From the above discussion, students would be able to recognize the importance of shapes and forms to a great extent. Learn different types of shapes and their examples online at BYJU’S – The Learning App.

FAQs

3D Shapes (Definition, Properties, Types, Examples of 3D Shapes)? ›

In geometry, 3D shapes are solid shapes or figures that have three dimensions. Generally, length, width and height are the dimensions of 3D shapes (three-dimensional shapes). The common names of these shapes are cube, cuboid, cone, cylinder and sphere.

Discover More Details ›

What are 3D shapes and examples? ›

3-dimensional shapes have thickness or depth compared to 2D shapes, which are flat. The common types of 3D shapes include a cube, sphere, cone, pyramid, rectangular prism, and cylinder. A polygon is any two-dimensional shape with straight lines.

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What are the properties of a 3D shape? ›

3D shapes have faces (sides), edges and vertices (corners).

Faces - A face is a flat or curved surface on a 3D shape. For example a cube has six faces, a cylinder has three and a sphere has just one.
Edges - An edge is where two faces meet. ...
Vertices - A vertex is a corner where edges meet.

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What is the definition of a 3 dimensional shape? ›

In geometry, three-dimensional shapes or 3D shapes are solids that have three dimensions such as length, width and height. Whereas 2d shapes have only two dimensions, i.e. length and width. Examples of three-dimensional objects can be seen in our daily life such as cone-shaped ice cream, cubical box, a ball, etc.

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What are 4 examples of 3D? ›

A cube, rectangular prism, sphere, cone, and cylinder are the basic three dimensional figures we see around us.

How do you explain 3D to a child? ›

3D shapes are shapes with three dimensions, such as length, width, and height. An example of a 3D shape is a prism or a sphere.

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How to define shapes? ›

A shape is a graphical representation of an object's form or its external boundary, outline, or external surface. It is distinct from other object properties, such as color, texture, or material type. In geometry, shape excludes information about the object's location, scale, orientation and reflection.

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What does 3D mean? ›

3D, or three dimensional, refers to the three spatial dimensions of width, height and depth. The physical world and everything that is observed in it are three dimensional.

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What are the properties of shapes? ›

Properties of 2D shapes include details such as its angles and the number of its sides. For example, here are the properties of a square: A square is the only regular quadrilateral (it has 4 sides of equal length). All its 4 angles are the same (90°).

Learn More Now ›

How to teach 3D shapes to grade 3? ›

Help your child become familiar with simple 3D shapes by pointing out household objects and asking them what shape they see. This can be a really helpful way to teach your third grade children to begin to recognise 3D shapes and can help them improve in-class. For example: What shape do they see in a cup?

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What is an example of a 2D and 3D shape? ›

A few examples of the 2D shapes are rectangle, square, circle, triangle, or any other polygon. A few examples of the 3D shapes are cuboid, cube, sphere, cone, prism, cylinder, pyramid, etc.

Tell Me More ›

What is a 2D shape? ›

2D shapes are shapes with two dimensions, such as width and height. An example of a 2D shape is a rectangle or a circle. 2D shapes are flat and cannot be physically held, because they have no depth; a 2D shape is completely flat.

Why are 3D shapes important in our daily life? ›

3D shapes are essential for forming our surroundings and comprehending the world we live in, from building and engineering to art and design. In this article, we will discuss the various 3D objects that surround us in real life in their forms of applications.

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What are the properties of 3D shapes? ›

3D shapes are defined by their respective properties such as edges, faces, vertices, curved surfaces, lateral surfaces and volume. We come across a number of objects of different shapes and sizes in our day-to-day life.

Find Out More ›

Are humans 3D or 4D? ›

Humans can exist only in 3-Spatial Dimension(Those who are saying 4 Dimensions are counting Fourth Dimension as time due to Theory Of Relativity). String Theory states that there are 10 Spatial Dimensions, each axis perpendicular to the other, and we live in 3 of those 10 Spatial Dimensions.

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How to describe 3D shapes? ›

3D shapes have different properties:

Faces - A face is a flat surface on a 3D shape. For example a cube has 6 faces.
Edges - An edge is where two faces meet. For example a cube has 12 edges.
Vertices - A vertex is a corner where edges meet (the plural is vertices). For example a cube has 8 vertices.