What is Euler's Identity?

e^iπ + 1 = 0

Five fundamental constants. One equation. Nothing else needed.

The five constants

e

Euler's number≈ 2.71828…

Base of natural logarithms. Governs growth and decay.

i

Imaginary unit= √(−1)

Satisfies i² = −1. Foundation of complex numbers.

π

Pi≈ 3.14159…

Ratio of a circle's circumference to its diameter.

1

One

The multiplicative identity. Any number × 1 = itself.

0

Zero

The additive identity. Any number + 0 = itself.

Euler's identity follows from Euler's formula: e^ix = cos(x) + i·sin(x). Setting x = π gives e^iπ = cos(π) + i·sin(π) = −1, so e^iπ + 1 = 0.

Step by step

Euler's formulaeⁱˣ = cos(x) + i·sin(x)

Set x = πeⁱπ = cos(π) + i·sin(π)

Evaluateeⁱπ = −1 + 0i

Simplifyeⁱπ = −1

Add 1eⁱπ + 1 = 0 ✓

The unit circle view

e^iθ traces the unit circle. Rotating by π lands at −1. Add 1, get 0.

Why mathematicians love it

It connects arithmetic (0 and 1), algebra (i), geometry (π), and analysis (e) four different branches of mathematics: in a single equation of stunning simplicity. Richard Feynman called it "the most remarkable formula in mathematics."

History

Leonhard Euler (1707-1783) published the formula e^ix = cos(x) + i·sin(x) in his Introductio in analysin infinitorum (1748). The identity is the special case at x = π. Euler introduced or popularised the notation e, i, f(x), Σ, and π.

Learn about e →Learn about π →

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Question

Which five mathematical constants appear in Euler's identity?

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