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Perfect Numbers — Find the Numbers That Equal Their Own Parts
Mark

Imeundwa na

Mark

2. Julai 2026FI
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Perfect Numbers — Find the Numbers That Equal Their Own Parts

A hands-on maths project: take 6 counters, find every way to divide them into equal groups, and discover that the group-sizes add back up to 6 -- a 'perfect' number. A Python cell checks 6 and 28, and a compendium reaches a 2,300-year-old unsolved mystery.
Mwanzo
30 minutes

Maagizo

1

A number equal to its parts

Some numbers have a magical property: add up all the smaller numbers that divide them, and you get the number back. The Greeks called these 'perfect'. You will find one with a handful of counters.
2

Lay out six counters

Take 6 counters (beads, buttons or coins). Find every way to divide them into equal groups: one group of 6, or 2 groups of 3, or 3 groups of 2, or 6 groups of 1. The group-SIZES that work (the divisors smaller than 6) are 1, 2 and 3.

Vifaa kwa hatua hii:

Glass BeadsGlass Beads1 kipande
3

Add up the parts

Add those divisors: 1 + 2 + 3 = 6. The parts add back up to the number itself -- 6 is perfect! Now try 28 with 28 counters: its divisors are 1, 2, 4, 7 and 14, and they add to 28. Try 10 or 12 and you will find they do NOT work, which is why perfect numbers are so rare.
4

Check with the computer

Loading Jupyter Notebook...

Zana zinazohitajika:

Desktop ComputerDesktop Computer
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Compendium: an unsolved mystery

What your counters lead to. (1) The perfect numbers are strikingly rare: 6, 28, 496, 8128, then none until 33,550,336. (2) Around 300 BC Euclid found a recipe: whenever 2-to-the-power-p minus 1 is prime, you can build a perfect number from it -- which links them to the famous 'Mersenne primes' that a worldwide computer project still hunts today. (3) Every perfect number ever found is EVEN. (4) After 2,300 years, two questions Euclid could have asked remain unanswered: are there infinitely many, and does an ODD perfect number exist? Nobody has ever found one -- or proved one cannot exist. You have just handled the front edge of an open problem in mathematics.

Vifaa

1

Zana Zinazohitajika

1

You can swap these in

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

CC0 Umma Wote

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Saidia Mtengenezaji kwa kununua bidhaa kupitia Mchoro wao ambapo wanapata Kamisheni ya Mtengenezaji iliyowekwa na Wachuuzi, au unda marudio mapya ya Mchoro huu na uiunganishe kama kiungo katika Mchoro wako kuchangia mapato.

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