What is the formula for the volume of a pyramid?

The volume of a pyramid is V = (1/3) × B × h, where B is the area of the base and h is the perpendicular height.

Can I calculate a rectangular pyramid surface area?

Yes. This calculator supports both square and rectangular bases and returns volume, lateral surface area, and total surface area.

What is slant height?

Slant height is the height of each triangular face, measured along the face. The tool computes it from the base and vertical height.

Pyramid Calculator

Calculate volume, lateral surface area, total surface area, base area and slant height of a right pyramid. Supports square and rectangular bases. Suitable for math homework, DIY construction and 3D modeling.

Square & rectangular Formula-based Step-friendly

Base type

Unit

Decimals

Base side (a)

Vertical height (h)

Height is measured perpendicular from base to apex.

Pyramid formulas used

This tool uses the general pyramid volume formula and specific surface-area formulas for square and rectangular bases.

1. Volume of a pyramid

\( V = \frac{1}{3} B h \)

where \( B \) is the base area and \( h \) is the vertical height.

2. Square pyramid

Base area: \( B = a^2 \)

Slant height: \( \ell = \sqrt{ \left(\frac{a}{2}\right)^2 + h^2 } \)

Lateral area: \( A_L = 2 a \ell \)

Total area: \( A_T = a^2 + 2 a \ell \)

3. Rectangular pyramid

Base area: \( B = a b \)

Slant height along side a: \( \ell_a = \sqrt{ \left(\frac{b}{2}\right)^2 + h^2 } \)

Slant height along side b: \( \ell_b = \sqrt{ \left(\frac{a}{2}\right)^2 + h^2 } \)

Lateral area: \( A_L = a \ell_a + b \ell_b \)

Total area: \( A_T = ab + a \ell_a + b \ell_b \)

Example

Example: Square pyramid with base side 6 m and height 9 m.

Base area \( B = 6^2 = 36 \text{ m}^2 \)
Volume \( V = \frac{1}{3} \times 36 \times 9 = 108 \text{ m}^3 \)
Slant height \( \ell = \sqrt{(6/2)^2 + 9^2} = \sqrt{9 + 81} = \sqrt{90} \approx 9.487 \text{ m} \)
Lateral area \( A_L = 2 \times 6 \times 9.487 \approx 113.84 \text{ m}^2 \)
Total area \( A_T = 36 + 113.84 \approx 149.84 \text{ m}^2 \)

The calculator runs these steps automatically.

Pyramid Calculator – FAQ

Audit: Complete

Formula (LaTeX) + variables + units

This section shows the formulas used by the calculator engine, plus variable definitions and units.

Formula (extracted LaTeX)

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Formula (extracted text)

1. Volume of a pyramid \( V = \frac{1}{3} B h \) where \( B \) is the base area and \( h \) is the vertical height.

Formula (extracted text)

2. Square pyramid Base area: \( B = a^2 \) Slant height: \( \ell = \sqrt{ \left(\frac{a}{2}\right)^2 + h^2 } \) Lateral area: \( A_L = 2 a \ell \) Total area: \( A_T = a^2 + 2 a \ell \)

Formula (extracted text)

3. Rectangular pyramid Base area: \( B = a b \) Slant height along side a: \( \ell_a = \sqrt{ \left(\frac{b}{2}\right)^2 + h^2 } \) Slant height along side b: \( \ell_b = \sqrt{ \left(\frac{a}{2}\right)^2 + h^2 } \) Lateral area: \( A_L = a \ell_a + b \ell_b \) Total area: \( A_T = ab + a \ell_a + b \ell_b \)

Variables and units

No variables provided in audit spec.

Sources (authoritative):

NIST — Weights and measures — nist.gov · Accessed 2026-01-19
https://www.nist.gov/pml/weights-and-measures
FTC — Consumer advice — consumer.ftc.gov · Accessed 2026-01-19
https://consumer.ftc.gov/

Changelog

Version: 0.1.0-draft
Last code update: 2026-01-19

0.1.0-draft · 2026-01-19

Initial audit spec draft generated from HTML extraction (review required).
Verify formulas match the calculator engine and convert any text-only formulas to LaTeX.
Confirm sources are authoritative and relevant to the calculator methodology.

Verified by Ugo Candido on 2026-01-19
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