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Measuring the Earth from a Single Mountain — Al-Biruni's Horizon-Dip Method
Astro

Créé par

Astro

2. juillet 2026IS
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Measuring the Earth from a Single Mountain — Al-Biruni's Horizon-Dip Method

Eratosthenes measured the Earth using two cities a known distance apart. Around 1020 AD the Persian scholar Al-Biruni did it from one mountain. He knew that from a height the horizon dips slightly below true level, and that the line of sight to the horizon just grazes the curved Earth. Measure the mountain's height and that tiny dip angle, and trigonometry gives the Earth's radius — no long survey across deserts required. His answer came within about one percent of the modern value. This blueprint reproduces his elegant single-site method.
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3

Consignes

1

Understand the idea

When you stand on high ground, the horizon sinks a little below true horizontal — the 'dip'. Your line of sight to the horizon is tangent to the curved Earth. The height you have climbed and the size of that dip together reveal how sharply the Earth curves, and so its radius.
2

Measure the mountain's height

First find the height (h) of an accessible mountain or sea-cliff. Sight its summit from two points a measured distance apart on the plain and use the angles, or apply the shadow and similar-triangle method, to compute its vertical height.

Outils nécessaires :

Dowel RodDowel Rod
Cotton Kitchen StringCotton Kitchen String
3

Carry an angle instrument to the top

Take a quadrant or a graduated board fitted with a plumb line to the summit. It must read small angles accurately, because the dip you are about to measure is only a fraction of a degree.

Outils nécessaires :

Red Alder BoardRed Alder Board
Cotton Kitchen StringCotton Kitchen String
4

Measure the dip of the horizon

From the summit, sight the distant sea or flat horizon and measure the angle (θ) by which it lies below true horizontal, read against the plumb line. A clear day and a low, unobstructed horizon are essential.

Outils nécessaires :

Chalk LineChalk Line
5

Apply the formula

With mountain height h and dip angle θ, the Earth's radius is R = h × cos(θ) ÷ (1 − cos(θ)). The nearer θ is measured, the better; because θ is tiny, the instrument's precision matters greatly.
6

See Al-Biruni's result

At the fort of Nandana, in present-day Pakistan, Al-Biruni measured a dip of about 34 arc-minutes and calculated the Earth's radius as roughly 6,335 km — within about one percent of the true 6,371 km, all from one mountain and one angle.
7

Convert radius to circumference

Multiply the radius by 2π to get the circumference: 2 × 3.1416 × 6,371 ≈ 40,030 km. This agrees closely with Eratosthenes' shadow method — two completely different routes to the same size of Earth.
8

Appreciate why it matters

Al-Biruni's method needs no long baseline surveyed across country — just one mountain and a fine angle scale. When two independent methods give the same answer, it is powerful evidence that the answer is real. That is how confident science is built.

Outils requis

4

Matériaux des Blueprints connectés

You can swap these in

Can't get one of the materials? Swap it for an equivalent — these work just as well.

CC0 Domaine public

Ce blueprint est publié sous CC0. Vous êtes libre de copier, modifier, distribuer et utiliser ce travail pour tout usage, sans demander la permission.

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