Volume is the measure of the capacity that an object holds. For example, if a cup can hold 100 ml of water up to the brim, its volume is said to be 100 ml. Volume can also be defined as the amount of space occupied by a 3-dimensional object. The volume of a solid like a cube or a cuboid is measured by counting the number of unit cubes it contains. The best way to visualize volume is to think of it in terms of the space enclosed/occupied by any 3-dimensional object or solid shape. This can be seen through a simple exercise at home:
- Take a rectangular sheet of paper of length 'l' cm and width 'h' cm.
- Join the opposite sides of the sheet of paper without folding the sheet.
- You have made a 3-D object that encloses space inside it, from a 2-D sheet.
| 1. | Volume Definition |
| 2. | Volume of 3d Shapes |
| 3. | List of Volume Formulas |
| 4. | How to Calculate the Volume? |
| 5. | Units of Volume |
| 6. | Volume Calculator |
| 7. | FAQs on Volume |
Volume Definition
Volume is defined as a capacity occupied by a three-dimensional solid shape. In any shape, it is hard tovisualize but can be compared between shapes.For example, the volume of a compass box is greater than the volume of an eraser placed inside it. For calculating the area of any two-dimensional shape, we divide the portion into equal square units. Similarly, while calculating the volume of solid shapes we will divide it into equal cubical units. Let us learn how to calculate the volume of different solid shapes in our next section.
Volume of 3D-Shapes
Every object in our surroundings has a nature of occupying space. These real-life objects can be easily compared with the basic 3-D shapes. Let us have a look at the volume of these solid shapes in detail.
Volume of a Cuboid
Suppose we have some rectangular sheets with length 'l' and width 'b'. If we stack them one on top of the other up to height 'h', we get a cuboid of dimensions l, b, h. This can be seen in the following figure which shows the length, width (breadth), and height of the cuboid thus formed.
To calculate the amount of space enclosed by this cuboid, we use the formula: Volume of a Cuboid = l × b × h
Volume of a Cube
A cube is a special case of a cuboid where all three sides are equal in measure. If we represent this equal value as ‘a’, then the volume of this cube can then be calculated with the formula: Volume of a Cube = a × a × a = a³. Observe the following figure to see the equal sides of a cube and the space it occupies.
Volume of a Cylinder
Just as we built up a cuboid using rectangles, we can build a cylinder using circles of the same size.
A cylinder is a tube-like structure with two parallel circular bases which are joined by a curved surface at a fixed distance from the center. The distance between these two bases is the height of the cylinder. If we consider 'r' as the radius of the circular base (and top) and 'h' as the height of the cylinder, then the volume of the cylinder can be expressed as Volume of a Cylinder = π r² h
Volume of a Pyramid
Pyramids have a polygon as their base and triangular faces that meet at the apex. The volume of a pyramid is calculated with the help of the formula: Volume of a Pyramid = 1/3 × Base length × Base width × height of the pyramid. This formula can also be written as 1/3 × Base area of the polygon × height of the pyramid.
Volume of Cone
The difference between a cone and a pyramid is that the base of a cone is circular whereas the base of a pyramid is a polygon. The volume of a cone is calculated with the formula: 1/3 ×πr2h.
Volume of Sphere
The volume of a sphere is the space occupied by it.
The volume of a sphere whose radius r is 4/3 πr³.
Now that we are familiar with the formulas of various geometric shapes, let’s take a look at the different units of volume.
List of Volume Formulas
Given below is a detailed tabular list of volume formulas in a nutshell describing volume formulas for all the possible 3-D (solid) shapes.
| Shape | Volume |
| Cube | a3 |
| Cuboid | l × b × h |
| Cone | (1/3)πr2h |
| Cylinder | πr2h |
| Sphere | (4/3)πr3 |
| Hemisphere | (2/3)πr3 |
| Prism | B × h |
| Pyramid | (1/3) (Bh) |
How To Calculate the Volume?
Here are the steps to calculatevolume of any solid shape:
- Identify all the given parameters that are useful and are required to substitute in the respective volume formula. Such as the radius to be 'r' and height to be 'h', the slant height, diameter, etc.
- Make sure all the parameters are of the same units.
- Substitute the values in the volume formula of the respective shapes.
- Write the units as cubic units.
Let us understand the steps with help of an example.
Example: Find the volume of a right circular cylinder of radius 25 m and height 1 meter. Use π = 3.142.
Solution:
The radius of the cylinder is, r = 25 m.
Its height is h = 1 meter.
Its volume of cylinder is, V = πr2h = (3.142)(25)2(1) = 1963.75m3.
The volume of a cylinder is 1963.75 cubic meters.
Units of Volume
The S.I. unit of volume is cubic meter (m3) since volume is a quantity of the three-dimensional space occupied by a shape or surface. However, the most commonly used unit for volume is liter. Apart from this, large and small volumes are measured in other units like milliliter (ml), pints, gallons, and others. The following table shows a few units related to volume and its metric equivalents.
| Unit of Side | Unit of Volume | Metric Equivalent |
|---|---|---|
| Inch | Cubic Inches (in3) | 1 cu.in = 16.387064 ml |
| Foot | Cubic Feet (ft3) | 1 cu.ft = 28.316846592 l |
| cm | Cubic centimeter (cm3) | 1 cubic centimeter = 1 ml |
| Yard | Cubic Yard (yd3) | 1 cu.yd = 764.554857984 L 1 cu.yd = 0.764554857984 m3 |
While the US standard unit is a cubic yard or cubic inch, the more widely used units are gallons, pints, or fluid ounces. The following table shows a few of these units and their equivalent metric conversions.
| Unit | Equivalent conversion |
|---|---|
| 1 Pint (pt) | 2 cups |
| 1 Quart (qt) | 2 pt |
| 1 Gallon (gal) | 3.78 liters |
| 1 liter | 1000 cubic centimeter |
Volume Calculator
The volume calculator helps to calculate the volume of any given shape quickly and easily. Volume is a branch of mathematics that deals with measuring the capacity of different solid shapes. Try Cuemath volume calculator now. It is an online tool available for easy and fast calculations.
☛Also check:
- Volume of a Cylinder Calculator
- Volume of a Sphere Calculator
- Volume of Cube Calculator
- Volume Of Cuboid Calculator
☛Related Articles
Check out the articles related to the volume of different solid shapes.
- Volume of Cone
- Volume of Cylinder
- Volume of a Cuboid
- Volume of Pyramid
FAQs on Volume
What is the Meaning of Volume?
Volume is the measure of the capacity that an object holds. Let say, if a cup can hold 1000 ml of juice, its volume is said to be 1000 ml. In this case, volume can also be defined as the amount of juice occupied by a cup. Volume is always calculated by dividing the capacity of shapes into equal cubical units.
☛Download now for more practice.
- Volume Worksheets
- Volume of Cubes Worksheets
- Volume of A Cone Worksheets
- Volume of a Cylinder Worksheets
What is the Formula of the Volume of a Partial Cone?
The volume of a partial cone can be calculated with the help of the formula: V = 1/3 × πh(R² + Rr + r²), where 'R' is the radius of the base of the cone and 'r' is the radius of the top surface.
☛ Read basics here:
- Volume of Right Circular Cone
- Volume of a Partial Cone
- Volume of A Cone in Terms of Pi
How Do you Find the Volume of Pyramids?
The volume of a pyramid is calculated with the help of the formula: V = 1/3 × Base Area × Height.
☛ Also Check:
- Volume of a Rectangular Pyramid
- Volume of Triangular Pyramid
- Volume of a Right Square Pyramid
How Do We Find the Volume of a Cone?
The volume of a cone is 1/3rd of the volume of a cylinder with the same height and same base. The formula used to find the volume of a cone is 1/3 × π r² h; where 'r' is the radius and 'h' is the height of the cone.
How Do We Find the Volume of a Cylinder?
The volume of a cylinder is calculated with the help of the formula: V = Area of the base of a cylinder × Height, and is also represented as volume of a cylinder = π r² h; where 'r' is the radius of the cylinder and 'h' is the height.
What is the Difference Between Volume and Area?
The volume of a shape or solid is the space occupied by it, which also includes its height or depth. It is measured in cubic units. The area is the space occupied by the surface of a flat shape. It is measured in square units.
☛ Check the list of important formulas in math:
- Area Formulas
- Surface Area Formulas
- Geometry Formulas
- Measurement Formulas
What is the Volume of a ball?
Since a ball is a sphere, its volume will be calculated using the formula for the volume of a sphere. The formula for the volume of a sphere is 4/3 πr³, where 'r' is the radius of the sphere.
What Is the Formula of the Volume of a Cylinder?
The formula for the volume of a cylinder = πr²h; where 'r' is the radius of the base of the cylinder and 'h' is the height.
How to Find the Volume of Prism?
We can find the volume of the prism by writing the given dimensions of the prism. Then substituting the values in volume formula V = B × H where "V", "B", and "H" are the volume, base area, and height of the prism. Once the value of the volume of the prism is obtained, write the unit of volume of the prism in the end (in terms of cubic units).
☛Check:
- Volume of Prism
- Volume of Prisms Worksheets
How do you Find the Volume of a Tank?
The volume of a tank depends on its shape. Depending on the size we can use the formulas given below:
- Volume of a cuboid = l × b × h; where 'l' is length of the cuboid, 'b' is breadth (width) of the cuboid and 'h' is height of the cuboid.
- Volume of a cube = a3 , where 'a' is edge of the cube.
- Volume of a cylinder = π r2 h; where 'r' is radius of the base of the cylinder and 'h' is the height of the cylinder.
- Volume of a cone = 1/3 π r² h, here, 'r' is radius of the circular base of the cone and 'h' is the height of the cone.
- Volume of a sphere = 4/3 πr³, where 'r' is the radius of the sphere.
