Calculate volume of Cube, Cylinder, Sphere, Cone, Pyramid, and more instantly
Volume
V = a³
Surface Area
Equivalent Water
Our comprehensive Volume Calculator helps students, engineers, architects, and professionals calculate the volume of various three-dimensional shapes with precision. Whether you're solving geometry problems, designing containers, planning construction projects, or working with 3D models, this tool provides instant volume calculations for multiple geometric shapes with step-by-step solutions.
Calculate cube volume, cylinder capacity, sphere volume, cone volume, pyramid volume, and 10+ other 3D shapes with our specialized calculator that supports multiple unit systems and provides educational explanations for each calculation.
Calculate volume for cubes, spheres, cylinders, cones, pyramids, prisms, torus, ellipsoids, and complex composite shapes with specialized formulas.
Automatic conversion between metric and imperial units with practical volume measurements (liters, gallons, cubic feet, barrels) for real-world applications.
Step-by-step solutions showing formulas, derivations, and mathematical principles behind each volume calculation, perfect for students and teachers.
Essential for engineering design, architecture, manufacturing, packaging, fluid dynamics, and construction with industry-standard accuracy.
Used by students, engineers, architects, designers, and professionals worldwide. Master 3D volume calculations with mathematical precision and practical applications!
Essential formulas: Cube: V = a³, Sphere: V = 4/3πr³, Cylinder: V = πr²h, Cone: V = 1/3πr²h, Pyramid: V = 1/3Bh (where B is base area). Our calculator applies these formulas automatically with your dimensions.
Common conversions: 1 cubic meter = 1000 liters, 1 liter = 0.264 gallons, 1 cubic foot = 28.317 liters, 1 gallon = 3.785 liters. Our calculator handles all these conversions automatically based on your input units.
Volume refers to the amount of 3D space an object occupies, while capacity refers to the amount of substance a container can hold. They use the same units but capacity is typically used for containers and volume for solid objects.
For standard geometric shapes, our calculations are mathematically exact. For irregular shapes, we use advanced approximation methods with accuracy up to 6 decimal places. For highly irregular objects, consider using water displacement methods for practical measurements.