Geometry formulas you actually use

Why these eleven shapes?

A glance at any school exam paper or any engineering reference reveals the same small cast of geometric shapes appearing again and again. Rectangles and triangles dominate 2D problems; cuboids, cylinders, and spheres dominate 3D. Once you can compute area, perimeter, surface area, and volume for these eleven, you can handle the great majority of practical problems.

2D shapes

Rectangle. Area = length × width. Perimeter = 2(length + width). The diagonal is √(l² + w²) by Pythagoras.

Square. A rectangle with all sides equal. Area = side². Perimeter = 4 × side. Diagonal = side × √2.

Triangle. The basic formula is Area = ½ × base × height. For any triangle whose three sides you know, Heron’s formula computes the area without needing the height: A = √(s(s−a)(s−b)(s−c)) where s = (a + b + c)/2.

Circle. Area = πr². Circumference = 2πr. Diameter = 2r. The most efficient shape: it has the smallest perimeter for a given area.

Trapezoid. Area = ½ × (a + b) × h, where a and b are the two parallel sides and h is the perpendicular distance between them.

3D shapes

Cube. Volume = side³. Surface area = 6 × side². Space diagonal = side × √3.

Cuboid (rectangular box). Volume = length × width × height. Surface area = 2(lw + lh + wh). Space diagonal = √(l² + w² + h²).

Sphere. Volume = (4/3)πr³. Surface area = 4πr². The most efficient 3D shape: it minimises surface area for a given volume, which is why bubbles, planets, and water droplets gravitate toward it.

Cylinder. Volume = πr² × height. Surface area = 2πr(r + h), of which 2πrh is the side and 2πr² is the two end caps.

Cone. Volume = (1/3)πr² × height. The slant height is √(r² + h²). Surface area = πr(r + slant), one circular base plus the curved lateral surface.

Square pyramid. Volume = (1/3) × base² × height. The slant height is √((base/2)² + h²), and the surface area is base² + 2 × base × slant.

Why volume scales as length cubed

If you double every linear dimension of any shape, the perimeter doubles, the area quadruples, and the volume goes up by a factor of eight (2³). This sounds obvious but has dramatic real-world consequences. Bigger animals have proportionally more volume than surface area, so they retain heat better; this is why mice freeze quickly and elephants overheat in heatwaves. The same scaling explains why scaled-up insects from B-movies could not actually walk: their leg cross-section grows as length², but their weight grows as length³, so beyond a certain size their legs would snap.

Quick problem-solving sequence

1. Draw the shape and label every length you know.
2. Identify the formula you need (area, perimeter, surface area, or volume).
3. Plug numbers in carefully, paying attention to units.
4. Sanity-check the answer's units and order of magnitude.

If you would rather just type in dimensions, the geometry calculator handles all eleven shapes.