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The Sand Reckoner — Count the Grains and Tame Huge Numbers
Mark

作成者

Mark

2. 7月 2026FI
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The Sand Reckoner — Count the Grains and Tame Huge Numbers

A hands-on maths project: weigh a pinch of sand, count the grains in a tiny sample, then scale up with powers of ten to estimate the grains in a cup, a bathtub -- even the universe, just as Archimedes did around 250 BC. A Python cell does the giant arithmetic and a compendium shows how exponents were born.
初心者
30 minutes

手順

1

Counting the uncountable

Around 250 BC Archimedes set himself a game: to count how many grains of sand would fill the whole universe, and to name that number. He had to invent a new way of writing numbers to do it. You will start the same way -- with real sand.
2

Weigh and count a sample

Weigh out a very small, known amount of dry sand -- say one gram -- on a kitchen scale. Counting every grain is impossible, so count the grains in a TINY measured pinch (a few dozen) and scale up, or estimate. Work out roughly how many grains are in one gram.

このステップの材料:

Clean Dry SandClean Dry Sand1 kg
Clean Glass Jars with LidsClean Glass Jars with Lids1

必要な工具:

Digital Kitchen ScaleDigital Kitchen Scale
3

Scale up with powers of ten

Now multiply up. If one gram holds a few thousand grains, a cupful (a couple of hundred grams) holds a few hundred thousand, a bag holds millions, a bathtub holds hundreds of millions. Write each answer as a 1 followed by zeros -- and notice you are just counting the zeros. That count is the 'power of ten', or exponent.

必要な工具:

CalculatorCalculator
4

Let the computer scale to the universe

Loading Jupyter Notebook...

必要な工具:

Desktop ComputerDesktop Computer
CalculatorCalculator
5

Compendium: no largest number

What the sand teaches. (1) Writing a huge number as 10-to-a-power (scientific notation) turns dozens of zeros into a single small exponent -- exactly how scientists write the sizes of atoms and galaxies today. (2) To MULTIPLY two powers of ten you just ADD their exponents (10^63 times 10^24 is 10^87) -- an idea that, centuries later, became logarithms. (3) Archimedes' real point was philosophical: numbers never run out. However vast a pile of sand, you can always name a bigger number. A game about grains quietly invented one of the most useful ideas in mathematics.

材料

2

必要な工具

3

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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