SENI
KECANTIKAN & KESEJAHTERAAN
KRAFTANGAN
BUDAYA & SEJARAH
HIBURAN
ALAM SEKITAR
MAKANAN & MINUMAN
MASA DEPAN HIJAU
KEJURUTERAAN TERBALIK
SAINS
SUKAN
TEKNOLOGI
WEARABLES
The Number e — Grow Money and Meet the Constant of Change
Mark

Dicipta oleh

Mark

2. Julai 2026FI
10
0
0
0
0

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.
Pemula
30 minutes

Arahan

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.

Bahan untuk langkah ini:

Glass BeadsGlass Beads1 keping
PaperPaper1 helaian

Alatan diperlukan:

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...

Alatan diperlukan:

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.

Bahan

2

Alatan Diperlukan

2

CC0 Domain Awam

Blueprint ini dikeluarkan di bawah CC0. Anda bebas menyalin, mengubah, mengedar, dan menggunakan karya ini untuk sebarang tujuan, tanpa meminta kebenaran.

Sokong Pembuat dengan membeli produk melalui Blueprint mereka di mana mereka memperoleh Komisen Pembuat ditetapkan oleh Penjual, atau cipta iterasi baru Blueprint ini dan sertakan ia sebagai sambungan dalam Blueprint anda sendiri untuk berkongsi hasil.

Perbincangan

(0)

Log masuk untuk menyertai perbincangan

Memuatkan komen...