فنون
الجمال والعناية
حِرَف
الثقافة والتاريخ
ترفيه
البيئة
الطعام والمشروبات
المستقبل الأخضر
الهندسة العكسية
SCHOOL PROJECTS
العلوم
رياضة
التقنية
الأجهزة القابلة للارتداء
Heron's Square Roots — Fold a Rectangle Toward a Square
Mark

أنشأه

Mark

2. يوليو 2026FI
14
0
0
0
0

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.
مبتدئ
30 minutes

التعليمات

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.

المواد لهذه الخطوة:

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

الأدوات المطلوبة:

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.

الأدوات المطلوبة:

CalculatorCalculator
4

Watch it converge

Loading Jupyter Notebook...

الأدوات المطلوبة:

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.

المواد

1

الأدوات المطلوبة

4

You can swap these in

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

المخططات ذات الصلة

هذه المخططات تشارك المعرفة مع هذا — التقنيات والمواد والمبادئ

CC0 ملكية عامة

هذا المخطط مُصدر بموجب CC0. يحق لك نسخه وتعديله وتوزيعه واستخدامه لأي غرض، دون طلب إذن.

ادعم الصانع بشراء منتجات عبر مخططه حيث يكسب عمولة الصانع يحددها البائعون، أو أنشئ نسخة جديدة من هذا المخطط وضمّنه كرابط في مخططك لمشاركة الإيرادات.

النقاش

(0)

تسجيل الدخول للمشاركة في النقاش

جارٍ تحميل التعليقات...