Surface Area Calculator
Calculate Surface Area for 9 Common 3D Shapes with Complete Formulas and Step-by-Step Solutions
Quick Navigation
Sphere Surface Area
Enter radius to calculate the total surface area of a sphere.
SA = 4πr²Where r = radius
π ≈ 3.14159
A sphere is a perfectly round 3D object. All surface area formula requires only the radius.
Cone Surface Area
Enter base radius and height to calculate cone surface area (with or without base).
Lateral SA = πr√(r² + h²)With Base = πr√(r² + h²) + πr²Where r = radius, h = height
Lateral surface area excludes the base. Check "Include base" for total surface area.
Cube Surface Area
Enter edge length to calculate the total surface area of a cube.
SA = 6a²Where a = edge length
A cube has 6 equal square faces
Simplest 3D shape formula. All edges equal length, all faces are identical squares.
Cylinder Surface Area
Enter base radius and height to calculate cylinder surface area.
Base SA = 2πr²Lateral SA = 2πrhTotal SA = 2πr² + 2πrh = 2πr(r + h)Where r = radius, h = height
Includes both circular bases and curved lateral surface.
Rectangular Tank Surface Area
Enter length, width, and height to calculate surface area of rectangular tank.
SA = 2lw + 2lh + 2whor SA = 2(lw + lh + wh)Where l = length, w = width, h = height
Sum of areas of all 6 rectangular faces.
Capsule Surface Area
Enter radius and height to calculate capsule surface area.
SA = 4πr² + 2πrhWhere r = radius, h = height
(Sphere + cylinder lateral)
Capsule is sphere on both ends with cylindrical center.
Spherical Cap Surface Area
Enter two of three values to calculate spherical cap surface area.
SA = 2πRhWhere R = sphere radius
h = cap height
Alternative: SA = π(r² + h²)
Curved portion of sphere cut by a plane.
Conical Frustum Surface Area
Enter top radius, bottom radius, and height for frustum surface area.
SA = π(r² + R²) + π(r + R)sWhere r = top radius
R = bottom radius
s = slant height = √[h² + (R-r)²]
Cone with top cut off. Includes two circular bases and lateral surface.
Square Pyramid Surface Area
Enter base edge length and height to calculate pyramid surface area.
Base SA = a²Lateral SA = 2a√(h² + (a/2)²)Total SA = a² + 2a√(h² + (a/2)²)Where a = base edge, h = height
Square base with 4 triangular faces meeting at apex.
Understanding Surface Area
Surface area measures the total area of all external surfaces of a 3D object. Expressed in square units (m², ft², cm²), surface area differs fundamentally from volume. Where volume measures interior space, surface area measures only the outer covering—what you would paint, wrap, or coat.
Surface area calculations are essential across industries. In manufacturing, surface area determines how much material is needed for coating or finishing. In engineering, surface area affects heat transfer and structural properties. In packaging, surface area determines box dimensions and material costs. In environmental science, surface area affects reaction rates and heat absorption.
Each shape requires different formulas because their surfaces have different geometries. A cube's surface consists of flat squares; a sphere has no flat surfaces at all. Understanding these differences enables accurate calculations for any 3D object.
Key Features & Capabilities
How to Use This Calculator
General Steps
- Select Your Shape: Click the tab for your shape (sphere, cone, cube, etc.)
- Measure Dimensions: Gather all required measurements (radius, height, length, width)
- Enter Values: Input measurements into the form fields
- Click Calculate: Press Calculate button
- Review Results: See surface area with complete calculation breakdown
Important Notes
- All Positive: All dimensions must be positive numbers
- Consistency: Use same unit system throughout (all meters, all feet, etc.)
- Optional Bases: Some shapes (cone) let you include/exclude bases
- Two of Three: Spherical cap requires any two of: base radius, sphere radius, height
- Measurements Matter: Accurate dimensions ensure accurate surface area
Complete Formulas Reference
SA = 4πr²
Lateral = πr√(r² + h²)Total = πr√(r² + h²) + πr²
SA = 6a²
SA = 2πr(r + h)
SA = 2(lw + lh + wh)
SA = 4πr² + 2πrh
SA = 2πRh
SA = π(r² + R²) + π(r + R)swhere s = √[h² + (R-r)²]
SA = a² + 2a√(h² + (a/2)²)
Shape Guide
Understanding surface area components for each shape:
Real-World Applications
Manufacturing & Fabrication
Surface area determines material requirements for coating, painting, or finishing. Manufacturers calculate surface area to estimate how much paint, protective coating, or fabric is needed for production.
Packaging & Shipping
Box and container design depends on surface area calculations. Surface area determines cardboard material needed, shipping weight, and packaging costs. Cylindrical tanks and spherical containers require precise surface area calculations.
Heat Transfer & HVAC
Surface area affects how quickly objects heat or cool. HVAC systems calculate ductwork surface area. Heat exchangers depend on large surface areas. Insulation effectiveness relates to surface area exposed to environment.
Construction & Architecture
Building designs require surface area calculations for exterior walls, roofing, flooring. Domes and curved structures use surface area formulas. Material estimates for construction projects depend on accurate surface area measurements.
Materials Science & Chemistry
Particle surface area affects reaction rates and absorption. Larger surface area means faster chemical reactions. Catalysts depend on maximizing surface area exposure. Filtration systems use surface area to capacity calculations.
Worked Examples
Example 1: Sphere (Chocolate Truffles)
Problem: Sphere-shaped chocolate truffle with radius 0.325 inches. Find surface area for coating.
SA = 4πr² = 4 × π × 0.325²
SA = 4 × π × 0.1056
SA ≈ 1.327 in²
Coating needed: approximately 1.33 square inches per truffle
Example 2: Cylinder (Fish Tank)
Problem: Cylindrical fish tank: radius 3.5 feet, height 5.5 feet. Find surface area to be painted.
SA = 2πr(r + h) = 2π(3.5)(3.5 + 5.5)
SA = 2π(3.5)(9)
SA = 2π(31.5)
SA ≈ 197.92 ft²
Paint needed for approximately 198 square feet
Example 3: Rectangular Tank (Box)
Problem: Rectangular box: length 3 feet, width 4 feet, height 5 feet. Find wrapping paper needed.
SA = 2(lw + lh + wh)
SA = 2((3×4) + (3×5) + (4×5))
SA = 2(12 + 15 + 20)
SA = 2(47) = 94 ft²
Wrapping paper needed: 94 square feet
Example 4: Cube (Rubik's Cube)
Problem: Rubik's Cube with 4-inch edge length. Find total surface area.
SA = 6a² = 6 × 4²
SA = 6 × 16
SA = 96 in²
Total surface area of cube: 96 square inches
Example 5: Cone (Party Hat)
Problem: Conical party hat: base radius 1 foot, height 5 feet. Find material needed (lateral surface only).
Slant height = √(1² + 5²) = √26 ≈ 5.099
Lateral SA = πr√(r² + h²) = π(1)(5.099)
Lateral SA ≈ 16.02 ft²
Material needed: approximately 16 square feet
Frequently Asked Questions
Calculate Surface Area Instantly
Whether you're designing packaging, estimating materials, planning construction, or solving geometry problems, this comprehensive surface area calculator handles 9 shapes with instant accuracy and complete step-by-step analysis. Fast, reliable, completely free.