Hemisphere Calculator

Calculate volume, curved surface area, and total surface area of any hemisphere.

⬛ Hemisphere Calculator
Radius (r)
units

What is a Hemisphere?

A hemisphere is exactly half of a sphere, created by cutting a sphere through its centre along a great circle. The resulting solid has two surfaces: the curved dome (half the sphere’s surface) and the flat circular base (the cross-section disc). Together, these define the total surface area, while the enclosed three-dimensional space gives the volume.

The word “hemisphere” comes from the Greek words for half (hemi) and sphere (sphaira). In geography, the Earth is commonly divided into the Northern and Southern Hemispheres along the equator, and the Eastern and Western Hemispheres along the prime meridian. In mathematics and engineering, however, a hemisphere refers specifically to the geometric half-sphere shape described by the formulas below.

The volume of a hemisphere is (2/3) pi r cubed, exactly half the volume of the full sphere (4/3) pi r cubed. The curved surface area is 2 pi r squared, which is also exactly half the sphere’s surface area of 4 pi r squared. The total surface area adds the flat circular base (pi r squared) to give 3 pi r squared. These clean relationships make the hemisphere one of the more elegant three-dimensional shapes to work with mathematically.

In the physical world, hemispheres appear as bowls, domes, igloo structures, the caps of cylindrical tanks, satellite dish reflectors, and the cross-sectional ends of pressurised vessels. The hemisphere is optimal for certain engineering applications because the dome shape efficiently distributes compressive loads, which is why many ancient and modern large-span structures use hemispherical or near-hemispherical roofs.

A remarkable result from Cavalieri’s principle connects the hemisphere to simpler shapes: a hemisphere of radius r has the same volume as a cylinder of radius r and height r with a cone of the same dimensions removed from it. This elegant relationship - (pi r cubed) minus ((1/3) pi r cubed) = (2/3) pi r cubed - was one of Archimedes’ celebrated discoveries.

Formula and Derivation

Given radius r:

Volume = (2/3) × π × r³
r = Radius of the hemisphere
π = Pi ≈ 3.14159265
Exactly half the sphere volume of (4/3)πr³
Curved Surface Area = 2 × π × r²
The dome surface only, excluding the flat circular base
Total Surface Area = 3 × π × r²
Curved dome (2πr²) + flat circular base (πr²) = 3πr²

Given volume V:

r = ³√(3V / 2π)
Rearrange V = (2/3)πr³ to solve for r
Then apply curved SA and total SA formulas

How to Use This Calculator

  1. Choose your input - select “Enter Radius” if you know the radius, or “Enter Volume” if you know the volume and want to work backwards to find the radius and surface areas.
  2. Type the value - for radius, use a length unit (cm, m, inches, feet). For volume, use cubic units matching the length unit (cm cubed, m cubed, etc.).
  3. Click Calculate - the calculator shows all four measurements: radius, volume, curved surface area, and total surface area.
  4. Understand curved vs total SA - the formula note explains the difference: curved SA is the dome only, while total SA adds the flat base circle.
  5. Try worked examples - click any “Try this example” link below to pre-fill the calculator with real values and see the full calculation.

Example Calculations

Example 1 - Radius of 5 units (bowl)

A hemispherical bowl has a radius of 5 cm. Find its volume (capacity) and surface areas.

1
r = 5 cm
2
Volume = (2/3) × π × 5³ = (2/3) × 3.14159 × 125 = 261.799 cm³
3
Curved SA = 2 × π × 25 = 157.080 cm² (inside of bowl)
4
Total SA = 3 × π × 25 = 235.619 cm² (including base)
Volume = 261.799 cm³  |  Curved SA = 157.080 cm²  |  Total SA = 235.619 cm²
Try this example →

Example 2 - Radius of 10 units (dome structure)

An architectural dome has a radius of 10 m. Find the volume of enclosed space and the roof area.

1
r = 10 m
2
Volume = (2/3) × π × 1000 = 2094.395 m³
3
Curved SA (roof area) = 2 × π × 100 = 628.318 m²
4
Total SA = 3 × π × 100 = 942.478 m²
Volume = 2094.395 m³  |  Roof Area = 628.318 m²  |  Total SA = 942.478 m²
Try this example →

Example 3 - Volume of 2094 cubic units

A tank holds 2094 litres (cubic decimetres). The tank is hemispherical. Find the radius and surface areas.

1
V = 2094 cu units. r = cbrt(3 × 2094 / (2 × π)) = cbrt(6282 / 6.2832) = cbrt(1000) = 10 units
2
Curved SA = 2 × π × 100 = 628.318 sq units
3
Total SA = 3 × π × 100 = 942.478 sq units
4
Radius = 10 units confirmed
Radius = 10 units  |  Curved SA = 628.318  |  Total SA = 942.478
Try this example →

Example 4 - Radius of 3 units

A small plastic hemisphere (like a bowl lid) has radius 3 cm. Find its dimensions.

1
r = 3 cm
2
Volume = (2/3) × π × 27 = 56.549 cm³
3
Curved SA = 2 × π × 9 = 56.549 cm²
4
Total SA = 3 × π × 9 = 84.823 cm²
Volume = 56.549 cm³  |  Curved SA = 56.549 cm²  |  Total SA = 84.823 cm²
Try this example →

Frequently Asked Questions

What is the volume of a hemisphere?+
The volume of a hemisphere is V = (2/3) times pi times r cubed, where r is the radius. It is exactly half the volume of a sphere. For radius 5, V = (2/3) times 3.14159 times 125 = 261.799 cubic units. A sphere with the same radius has volume (4/3) pi r cubed = 523.599 cubic units.
What is the curved surface area of a hemisphere?+
The curved surface area (CSA) of a hemisphere is 2 times pi times r squared. It is exactly half the surface area of a full sphere (which is 4 pi r squared). For r = 5: CSA = 2 times 3.14159 times 25 = 157.08 sq units.
What is the total surface area of a hemisphere?+
The total surface area (TSA) = curved surface area + base area = 2pi r squared + pi r squared = 3pi r squared. The base is a circle with area pi r squared. For r = 5: TSA = 3 times 3.14159 times 25 = 235.619 sq units.
How do I find the radius from the volume of a hemisphere?+
Rearrange V = (2/3) pi r cubed: r = cube root of (3V / 2pi). For V = 2094: r = cbrt(3 times 2094 / (2 times 3.14159)) = cbrt(6282 / 6.28318) = cbrt(1000) = 10 units.
What is the difference between curved surface area and total surface area of a hemisphere?+
The curved surface area (CSA) includes only the dome part: 2pi r squared. The total surface area (TSA) includes both the dome and the flat circular base: TSA = CSA + pi r squared = 3pi r squared. When painting a dome only, use CSA. When calculating material for a bowl including the bottom, use TSA.
How does a hemisphere compare to a sphere in volume?+
A hemisphere has exactly half the volume of the full sphere with the same radius. Sphere volume = (4/3) pi r cubed. Hemisphere volume = (2/3) pi r cubed = half of sphere. Similarly, the curved surface area of a hemisphere (2pi r squared) is half the sphere's surface area (4pi r squared).
What are real-world examples of hemispheres?+
Bowls, domes (like the Pantheon in Rome or sports stadium roofs), igloos, satellite dishes (approximately), half of a football, dome tents, and planetary hemispheres are all real-world hemisphere examples. Understanding hemisphere volume is important in architecture, food packaging (how much a bowl holds), and engineering.
What is the formula for hemisphere total surface area?+
TSA = 3 times pi times r squared = 3pi r squared. This equals the curved dome area (2pi r squared) plus the flat base circle area (pi r squared). For r = 10: TSA = 3 times 3.14159 times 100 = 942.478 sq units.
How is the hemisphere related to a cylinder and cone?+
There is a remarkable relationship (Cavalieri's principle): a hemisphere of radius r has the same volume as a cylinder of radius r and height r, minus a cone of radius r and height r. Cylinder volume = pi r cubed. Cone volume = (1/3) pi r cubed. Difference = (2/3) pi r cubed = hemisphere volume.
What is a hemisphere with radius 10?+
Radius r = 10: Volume = (2/3) times pi times 1000 = 2094.395 cubic units. Curved SA = 2 times pi times 100 = 628.318 sq units. Total SA = 3 times pi times 100 = 942.478 sq units.

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Tags: Hemisphere Volume of Hemisphere Surface Area Hemisphere Half Sphere Curved Surface Area Total Surface Area 3D Geometry

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๐Ÿ“Œ Quick Tips

๐Ÿ’กThe volume of a hemisphere is exactly half the volume of the full sphere with the same radius: V = (2/3) pi r cubed.
๐Ÿ’กThe total surface area of a hemisphere includes the curved dome (2pi r squared) plus the flat circular base (pi r squared), giving 3pi r squared in total.
๐Ÿ’กTo find the radius from volume: r = cube root of (3V divided by 2pi). Example: V = 2094, r = cbrt(3 times 2094 / 2pi) = cbrt(1000) = 10.