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Volume of a Cube Calculator

Calculate the volume, surface area, face diagonal, and space diagonal of a cube from its side length. See also Volume of Rectangular Prism Calculator and Volume of Cylinder Calculator.

How to Calculate the Volume of a Cube

To find the volume of a cube, measure the length of any edge — all edges of a cube are equal. Cube that length (multiply it by itself three times) to get the volume. The surface area is six times the square of the side length, since a cube has six identical square faces. This calculator also computes the face diagonal and space diagonal.

Cube Volume Formula

V = s³

SA = 6 × s²

Face Diagonal = s × √2

Space Diagonal = s × √3

Example

Find the volume of a cube with side length 5:

V = s³

V = 5³

V = 125 cubic units

SA = 6 × 5² = 6 × 25 = 150 square units

Cube Volume Reference Table

SideVolumeSurface AreaSpace Diagonal
1161.7321
28243.4641
327545.1962
464966.9282
51251508.6603
621621610.3923
734329412.1244
851238413.8564
972948615.5885
10100060017.3205
12172886420.7846
153375135025.9808
208000240034.6410
2515625375043.3013
501250001500086.6025

Solved Examples

Example 1: Ice Cube Melting

An ice cube has a side length of 3 cm. What volume of water does it produce when it melts? (Ice and water have nearly the same volume for this approximation.)

V = s³ = 3³

V = 27 cm³ = 27 mL of water

Example 2: Rubik's Cube Volume

A standard Rubik's Cube has a side length of 5.7 cm. Find its total volume.

V = s³ = 5.7³

V = 5.7 × 5.7 × 5.7

V ≈ 185.19 cm³

Example 3: Dice Volume

A standard die (singular of dice) has sides of 1.6 cm. What is its volume?

V = s³ = 1.6³

V = 4.096 cm³

Example 4: Cubic Storage Container

A cubic storage box has an internal side length of 0.5 m. How many liters can it hold?

V = 0.5³ = 0.125 m³

1 m³ = 1000 L

V = 0.125 × 1000 = 125 liters

Practice Questions

Q1: Find the volume of a cube with side length 8 cm.

Answer: V = 8³ = 512 cm³

Q2: A cube has a volume of 343 cm³. What is its side length?

Answer: s = ∛343 = 7 cm

Q3: If the side of a cube is tripled, how does the volume change?

Answer: V₂ = (3s)³ = 27s³ = 27V₁. The volume increases by a factor of 27.

Q4: What is the surface area of a cube with volume 64 cm³?

Answer: s = ∛64 = 4 cm; SA = 6 × 4² = 6 × 16 = 96 cm²

Q5: A cube has a space diagonal of 10√3 cm. Find its volume.

Answer: Space diagonal = s√3; s√3 = 10√3; s = 10 cm; V = 10³ = 1000 cm³

Q6: How many 2 cm cubes fit inside a 10 cm cube?

Answer: Along each edge: 10/2 = 5 cubes; Total = 5 × 5 × 5 = 125 small cubes

Common Mistakes

Confusing s² with s³: Surface area uses s² (squared), but volume uses s³ (cubed). A cube with side 5 has SA = 150 but V = 125.

Multiplying by 6 for volume: The factor 6 is for surface area (6 faces), not volume. Volume is simply s × s × s.

Using edge length as diagonal: The space diagonal (s√3) and face diagonal (s√2) are longer than the side. Don't substitute them for s in the volume formula.

Incorrect cube root: When finding side from volume, use cube root (∛), not square root (√). ∛27 = 3, not √27 ≈ 5.2.

Key Takeaways

  • Cube volume is simply V = s³ — the side length multiplied by itself three times.
  • A cube is the simplest volume calculation — only one measurement needed.
  • To find the side from volume, take the cube root: s = ∛V.
  • Surface area = 6s² (six identical square faces).
  • The space diagonal of a cube = s√3; the face diagonal = s√2.
  • Doubling the side increases volume by 8×, and tripling by 27×.

Frequently Asked Questions

What is the volume of a cube?

The volume of a cube is the total three-dimensional space enclosed within its six square faces. Since all edges are equal, the volume is simply the side length cubed: V = s³.

What is the difference between a cube and a rectangular prism?

A cube is a special case of a rectangular prism where all three dimensions (length, width, height) are equal. A rectangular prism can have different values for each dimension.

What is the space diagonal of a cube?

The space diagonal connects two opposite corners of the cube, passing through its interior. It equals s√3, where s is the side length. For a cube with side 5, the space diagonal is 5√3 ≈ 8.6603.

How do I find the side length from the volume?

Take the cube root of the volume: s = ∛V. For example, if V = 125, then s = ∛125 = 5.

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