Calculate volume, slant height, lateral surface area, total surface area, base area, lateral edge, and dihedral angle of a right square pyramid.
The right square pyramid is perhaps the most iconic geometric solid in human history. With a square base and four congruent triangular faces converging at an apex directly above the base center, it is the shape of the Great Pyramid of Giza, the Louvre entrance, and countless architectural features around the world.
Because all four lateral faces are identical isosceles triangles, the right square pyramid has just two independent dimensions — the base side length and the perpendicular height — yet from these two values a rich set of properties can be derived. Volume follows the classic one-third-base-times-height formula. Slant height, lateral edge, surface areas, and the dihedral angle between the triangular face and the base all involve straightforward applications of the Pythagorean theorem and trigonometry.
This calculator takes the base side and height and instantly computes seven measurements: volume, slant height, lateral surface area, total surface area, base area, lateral edge length, and the dihedral angle. You can instantly load presets for the Great Pyramid of Giza, the Louvre Pyramid, or textbook examples. A bar chart shows the lateral-to-base surface-area ratio, and a reference table lists famous pyramids with their computed properties.
Whether you are studying for a geometry exam, designing a roof, or estimating the volume of a gravel pile, this tool provides all the measurements you need in seconds.
A right square pyramid is one of the standard solids used in geometry courses, architecture studies, and fabrication drawings, but the derived measurements are easy to mix up when you calculate them manually. This calculator is helpful when you need more than just volume: slant height controls triangular face dimensions, lateral edge length affects cut lengths, and the dihedral angle helps translate the shape into roof pitch and panel geometry. It is a practical shortcut for classroom work, model making, monument studies, and quick concept estimates.
Volume = (1/3)a²h Slant Height l = √(h² + (a/2)²) Lateral SA = 2al Total SA = 2al + a² Lateral Edge = √(h² + a²/2) Dihedral Angle = arctan(2h/a)
Result: Volume = 400 cm³, Slant Height = 13 cm, Total SA = 360 cm²
With base side 10 cm and height 12 cm, the base area is 10² = 100 cm² and the volume is (1/3) × 100 × 12 = 400 cm³. The slant height is √(12² + 5²) = √169 = 13 cm. Lateral surface area is 2 × 10 × 13 = 260 cm², so total surface area is 260 + 100 = 360 cm². The lateral edge is √(12² + 10²/2) = √194 ≈ 13.93 cm, which shows why face height and corner edge length should not be confused.
In a right square pyramid, symmetry simplifies the shape, but it also tempts people to blur together different measurements. The perpendicular height runs straight up from the center of the base, the slant height runs along the middle of a triangular face, and the lateral edge runs from the apex to a corner. Those three lengths are related, but they are not interchangeable. Distinguishing them is the key to correct surface-area work and accurate construction drawings.
Square pyramids show up in monumental architecture, skylights, pavilion roofs, capstones, and decorative enclosures. The same formulas are useful whether you are studying the Great Pyramid, laying out a small roof cap, or building a display piece from cardboard or acrylic. Volume helps with internal capacity and mass estimates, while total surface area and dihedral angle help with face panels, cladding, and joinery decisions.
When solving a problem, start with the base side and perpendicular height, then decide whether the task is about storage, exposed surface, or face slope. If you are comparing two pyramids, remember that area scales with the square of the linear dimension while volume scales with the cube. This calculator makes those comparisons faster and reduces the common mistake of using the lateral edge where the slant height is actually required.
Slant height is the distance from the apex to the midpoint of a base edge, running along the center of a triangular face. Lateral edge is the distance from the apex to a corner of the base — it is always longer.
The dihedral angle is the angle between a lateral triangular face and the square base, measured along the line where they meet (a base edge). For a right square pyramid it equals arctan(2h/a).
Only if both base sides are equal. For different length and width, use the Right Rectangular Pyramid Calculator.
Volume is directly proportional to height (V = (1/3)a²h), so doubling h exactly doubles V. Use this as a practical reminder before finalizing the result.
Using a = 230.4 m and h = 146.5 m, V = (1/3)(230.4²)(146.5) ≈ 2,592,276 m³ — roughly 2.6 million cubic meters.
Use h = √(l² − (a/2)²), where l is the slant height and a is the base side. Keep this note short and outcome-focused for reuse.