What is I Power 3 equal to?

Unpacking the Mystery of i³: Why i Cubed Equals -i

The imaginary unit, i, is a cornerstone of complex numbers, a mathematical realm extending beyond the familiar real numbers. While real numbers can be visualized on a single number line, complex numbers require a two-dimensional plane (often called the complex plane). Understanding the behavior of i, especially its powers, is crucial to navigating this expanded numerical landscape. This article focuses on a specific, yet foundational, aspect: what is i³ equal to?

The answer, simply stated, is -i. But the beauty lies in why this is the case. The entire system rests on the defining characteristic of i: i² = -1. This seemingly simple equation opens up a whole new world of mathematical possibilities.

Let’s break down the calculation:

i³ can be rewritten as i² i. Since we know that i² = -1*, we can substitute this value into the expression:

i³ = i² i = (-1) i = -i

Therefore, the cube of the imaginary unit, i³, simplifies to -i. This result highlights the cyclical nature of powers of i. Let’s examine the first few powers:

• i¹ = i
• i² = -1
• i³ = -i
• i⁴ = 1
• i⁵ = i
• i⁶ = -1
• i⁷ = -i
• i⁸ = 1

…and so on. The pattern repeats every four powers: i, -1, -i, 1. This cyclical pattern is a key feature that differentiates the arithmetic of complex numbers from that of real numbers.

The simplicity of this calculation belies its significance. The fact that i³ = -i is not merely a mathematical quirk; it’s a fundamental building block for numerous operations within complex number arithmetic. From solving polynomial equations to representing rotations in two dimensions, understanding the behavior of i and its powers is essential for mastering this vital area of mathematics. Therefore, remembering that i³ = -i, along with the fundamental i² = -1, provides a solid foundation for further exploration of the fascinating world of complex numbers.