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Heron's Square Roots — Fold a Rectangle Toward a Square
Mark

Créé par

Mark

2. juillet 2026FI
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Heron's Square Roots — Fold a Rectangle Toward a Square

A hands-on maths project: draw a rectangle of a chosen area, then repeatedly average its sides to reshape it toward a perfect square -- and its side is the square root. This is Heron's 2,000-year-old averaging method; a Python cell shows how fast it converges, and a compendium reveals it is secretly Newton's method.
Débutant
30 minutes

Consignes

1

The root of an awkward number

What is the square root of 10? It has no neat answer. Over 2,000 years ago Hero of Alexandria found a way to close in on it by averaging. The square root of a number is the side of a square with that area -- so you will chase a square.
2

Draw a rectangle of the right area

You want the square root of 10, so draw a rectangle with area 10 square units -- say 10 by 1, or 5 by 2. It is the wrong shape (a long thin rectangle), but it has the right area.

Matériaux pour cette étape :

Cardstock Assorted Pack (50 sheets)Cardstock Assorted Pack (50 sheets)1 pièce

Outils nécessaires :

Steel Ruler (30cm)Steel Ruler (30cm)
Graphite Pencil SetGraphite Pencil Set
3

Average the sides, again and again

Take the two side lengths and AVERAGE them to get a new width; the new height is the area divided by that width (so the area stays 10). Draw the new, less lopsided rectangle. Repeat two or three times: 5 and 2 average to 3.5 (height 2.857), then 3.18 (height 3.14), then 3.162... The rectangle squares up, and its side is the square root of 10, about 3.162.

Outils nécessaires :

CalculatorCalculator
4

Watch it converge

Loading Jupyter Notebook...

Outils nécessaires :

Desktop ComputerDesktop Computer
CalculatorCalculator
5

Compendium: an ancient method that never left

What your squaring-up shows. (1) If a guess is too big, the area divided by it is too small, and the true root lies between -- so their average is a better guess. (2) The accuracy roughly DOUBLES each step ('quadratic convergence'), so about five rounds reach full calculator precision. (3) Start with a sensible guess, near the root, and it races in immediately. (4) Heron's averaging is exactly what you get by applying Newton's method to 'x squared minus S' -- but Hero found it about 1,600 years before Newton, and it is still how calculators and computer chips extract square roots today.

Matériaux

1

Outils requis

4

You can swap these in

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

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