Volume Calculator
Last Verified: 2026-07-12Calculate the volume of spheres, cylinders, cones, capsules, and boxes with live dimensions and worked formulas.
How is this calculated?
Assumptions & Sources
- All shapes are mathematically perfect geometric solids.
- Inputs and outputs use consistent, uniform dimensional units.
- Calculus: Early Transcendentals, Cengage Learning — Integration derivations for spheres, cones, pyramids, and spherical caps.
- Thomas' Calculus, Pearson — Standard definitions of volume, cylinder, and hollow washer methods.
- NIST Digital Library of Mathematical Functions (dlmf.nist.gov).
About the Volume Calculator
Volume is the measure of the three-dimensional space occupied by a solid object, liquid, or gas. Expressed in cubic units (such as cubic meters, cubic centimeters, or cubic inches) or capacity metrics (such as liters or gallons), volume is crucial in chemistry, manufacturing, fluid dynamics, and packaging logistics. Mathematically, volume calculations depend on the geometric structure of the solid: regular prisms and cylinders are calculated by multiplying their two-dimensional base area by their height; pyramids and cones represent exactly one-third of the volume of their corresponding flat-topped shapes; and spheres represent two-thirds of the volume of a cylinder that encloses them. Accurate volume calculation enables precise density, weight, and capacity modeling across engineering and daily life.
Mathematical Formula & Logic
Step-by-Step Example
Calculate the volume of a cylinder with a base radius of 4 cm and a height of 10 cm: 1. Identify the variables: - Radius (r) = 4 cm - Height (h) = 10 cm 2. Apply the cylinder volume formula: Volume = π × r² × h Volume = π × 4² × 10 3. Simplify the expression: Volume = π × 16 × 10 Volume = 160 × π ≈ 502.6548 4. The volume of the cylinder is approximately 502.65 cubic centimeters (502.65 cm³).
Reference Data & Values
| solid | parameters | volume formula | example calculation |
|---|---|---|---|
| Cube | Side (s) | s³ | s=4 cm → Volume = 64 cm³ |
| Rectangular Prism | l, w, h | l × w × h | l=6, w=4, h=5 → Volume = 120 |
| Cylinder | r, h | πr²h | r=4, h=10 → Volume ≈ 502.65 |
| Sphere | Radius (r) | (4/3)πr³ | r=3 → Volume ≈ 113.10 |
| Cone | r, h | (1/3)πr²h | r=3, h=6 → Volume ≈ 56.55 |