(1-i/1+i)^500

2 min read Jun 16, 2024
(1-i/1+i)^500

Exploring the Power of Complex Numbers: (1-i/1+i)^500

This article delves into the fascinating world of complex numbers, specifically focusing on the expression (1-i/1+i)^500. We'll explore how to simplify this expression and arrive at a surprising result.

Simplifying the Expression

First, let's simplify the fraction (1-i)/(1+i) using the concept of complex conjugates:

  • Multiplying by the complex conjugate:

    (1-i)/(1+i) * (1-i)/(1-i) = (1 - 2i + i^2) / (1 - i^2)

  • Simplifying using i^2 = -1:

    (1 - 2i -1) / (1 + 1) = -2i / 2 = -i

Now, our expression becomes (-i)^500.

Understanding the Cyclic Nature of Powers of 'i'

The key to solving this lies in the cyclical nature of powers of the imaginary unit 'i':

  • i^1 = i
  • i^2 = -1
  • i^3 = -i
  • i^4 = 1

Notice that the cycle repeats every four powers.

Finding the Solution

Since 500 is divisible by 4, we can write:

(-i)^500 = ((-i)^4)^125 = 1^125 = 1

Therefore, (1-i/1+i)^500 simplifies to 1. This demonstrates that seemingly complex expressions can be reduced to surprisingly simple results with the understanding of basic mathematical principles.

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