108 LearnersLast updated on July 11th, 2025
Volume of Spherical Cap
The volume of a spherical cap is the space it occupies within a sphere. A spherical cap is a portion of a sphere that is cut off by a plane. To find the volume of a spherical cap, one needs to know the radius of the sphere and the height of the cap. In real life, a spherical cap can be visualized in structures like domes or the top of a mushroom. In this topic, let's learn about the volume of a spherical cap.
What is the volume of a spherical cap?
The volume of a spherical cap is the amount of space it occupies within a sphere. It is calculated using the formula: Volume = (1/3)πh²(3R - h) Where 'R' is the radius of the sphere, and 'h' is the height of the cap.
Volume of Spherical Cap Formula A spherical cap is a portion of a sphere. To calculate its volume, you need to know the radius of the full sphere and the height of the cap.
The formula for the volume of a spherical cap is given as follows: Volume = (1/3)πh²(3R - h)
How to Derive the Volume of a Spherical Cap?
To derive the volume of a spherical cap, we use the concept of integration and geometry. The formula for the volume of a spherical cap is: Volume = (1/3)πh²(3R - h) Here, 'R' is the radius of the sphere, and 'h' is the height of the cap.
The integration approach involves slicing the spherical cap into infinitesimally thin disks and summing their volumes.
How to find the volume of a spherical cap?
The volume of a spherical cap is expressed in cubic units, such as cubic centimeters (cm³) or cubic meters (m³).
To find the volume, use the formula: Write down the formula: Volume = (1/3)πh²(3R - h) You need two measurements: the radius of the sphere (R) and the height of the cap (h).
Once you have these measurements, substitute them into the formula. Calculate the volume using the formula by plugging in the values for 'R' and 'h'.
Tips and Tricks for Calculating the Volume of a Spherical Cap
Remember the formula: The formula for the volume of a spherical cap is not as straightforward as a cube. Memorize: Volume = (1/3)πh²(3R - h)
Break it down: Understand the components of the formula. The terms include the height (h), radius (R), and π (pi).
Simplify calculations: When possible, use calculators for π and square roots to avoid manual errors.
Double-check: Ensure that you have the correct values for both the radius and height before substituting them into the formula.
Common Mistakes and How to Avoid Them in Volume of Spherical Cap
Making mistakes while learning about the volume of a spherical cap is common. Let’s look at some common mistakes and how to avoid them for a better understanding.
Volume of Spherical Cap Examples
Problem 1
A spherical cap has a height of 3 cm and the sphere's radius is 5 cm. What is its volume?
The volume of the spherical cap is approximately 47.12 cm³.
Explanation
To find the volume of a spherical cap, use the formula: Volume = (1/3)πh²(3R - h) Substitute the values: Volume = (1/3)π(3)²(3(5) - 3) = (1/3)π(9)(15 - 3) = (1/3)π(9)(12) = 36π ≈ 113.1 cm³
Problem 2
A spherical cap has a height of 2 m with a sphere radius of 6 m. Find its volume.
The volume of the spherical cap is approximately 75.4 m³.
Explanation
To find the volume of a spherical cap, use the formula: Volume = (1/3)πh²(3R - h) Substitute the values: Volume = (1/3)π(2)²(3(6) - 2) = (1/3)π(4)(18 - 2) = (1/3)π(4)(16) = 64/3π ≈ 67.0 m³
Problem 3
The volume of a spherical cap is 150 cm³. If the sphere’s radius is 8 cm, what is the height of the cap?
The height of the cap is approximately 5 cm.
Explanation
To find the height of the cap when the volume is known, rearrange the formula: 150 = (1/3)πh²(3(8) - h)
Solve for 'h' by using algebraic manipulation and numerical methods. After solving, you find: h ≈ 5 cm
Problem 4
A spherical cap on a 10-inch radius sphere has a height of 4 inches. What is its volume?
The volume of the spherical cap is approximately 251.3 inches³.
Explanation
Using the formula for volume: Volume = (1/3)πh²(3R - h)
Substitute the values: Volume = (1/3)π(4)²(3(10) - 4) = (1/3)π(16)(30 - 4) = (1/3)π(16)(26) = 416/3π ≈ 436.0 inches³
Problem 5
You have a spherical cap with a height of 1 foot and a sphere of radius 4 feet. How much space (in cubic feet) does the cap occupy?
The cap occupies approximately 16.76 cubic feet.
Explanation
Using the formula for volume: Volume = (1/3)πh²(3R - h)
Substitute the values: Volume = (1/3)π(1)²(3(4) - 1) = (1/3)π(1)(12 - 1) = (1/3)π(1)(11) = 11/3π ≈ 11.5 ft³
FAQs on Volume of Spherical Cap
1.Is the volume of a spherical cap the same as the full sphere?
2.How do you find the volume if the height and radius are given?
3.What if I have the volume and need to find the height?
4.Can the height be a decimal or fraction?
5.Is the volume of a spherical cap the same as the full sphere?
Important Glossaries for Volume of Spherical Cap
- Spherical Cap: A portion of a sphere cut off by a plane.
- Radius (R): The distance from the center of the sphere to any point on its surface.
- Height (h): The perpendicular distance from the base of the cap to its topmost point.
- Volume: The amount of space occupied by the spherical cap, expressed in cubic units.
- Pi (π): A mathematical constant approximately equal to 3.14159, used in calculations involving circles and spheres.
Seyed Ali Fathima S
About the Author
Seyed Ali Fathima S a math expert with nearly 5 years of experience as a math teacher. From an engineer to a math teacher, shows her passion for math and teaching. She is a calculator queen, who loves tables and she turns tables to puzzles and songs.
Fun Fact
: She has songs for each table which helps her to remember the tables
