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The Number e — Grow Money and Meet the Constant of Change
Mark

Erstellt von

Mark

2. Juli 2026FI
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The Number e — Grow Money and Meet the Constant of Change

A hands-on maths project: 'grow' a pile of counters as interest is added more and more often, and watch the total settle on the mysterious number e = 2.71828, the constant behind all continuous growth. A Python cell reaches e two ways, and a compendium connects it to populations, cooling and calculus.
Anfänger
30 minutes

Anweisungen

1

A very special number

Alongside pi there is a second great constant, e = 2.71828..., first glimpsed by Jacob Bernoulli in 1683 studying compound interest. It is the number of continuous growth. You will grow it with counters.
2

Grow one coin

Start with 1 counter -- one coin earning 100% interest in a year. Paid ONCE at the year's end it becomes 2 (double). Now pay it as 50% TWICE: after the first half-year you have 1.5, and 50% of that added gives 2.25 -- more! Lay out the counters and work it through.

Materialien für diesen Schritt:

Glass BeadsGlass Beads1 Stück
PaperPaper1 Blatt

Benötigte Werkzeuge:

CalculatorCalculator
3

Pay more and more often

Pay the interest monthly (12 small additions) and you reach about 2.61; daily gives 2.714; every second, almost 2.71828. The total does NOT run away to infinity -- it settles onto e = 2.71828. That settling point is what 'continuous growth' means. Record each result and watch it close in.
4

Reach e two ways

Loading Jupyter Notebook...

Benötigte Werkzeuge:

Desktop ComputerDesktop Computer
CalculatorCalculator
5

Compendium: the number behind change

What your growing pile teaches. (1) Splitting growth into ever-smaller steps does not give ever-more money; it converges on e. (2) A far faster route to e is the endless sum 1 + 1/1! + 1/2! + 1/3! + ..., which nails it in a handful of terms. (3) e appears wherever things grow or fade smoothly: populations, radioactive decay, a cooling cup of coffee, charging batteries, continuously compounded money. (4) Its function e-to-the-x is the one curve that is its own rate of change, which makes it the natural language of calculus -- and in Euler's identity it binds e, pi, i, 1 and 0 in a single line often called the most beautiful in mathematics.

Materialien

2

Benötigte Werkzeuge

2

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