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Powers of i

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Intermediate Algebra

Definition

The powers of the imaginary unit, i, are a fundamental concept in the complex number system. The imaginary unit, i, is defined as the square root of -1, and its powers exhibit a cyclical pattern that is crucial in understanding complex number operations and applications.

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5 Must Know Facts For Your Next Test

  1. The powers of $i$ exhibit a cyclic pattern, repeating every four powers: $i^0 = 1, i^1 = i, i^2 = -1, i^3 = -i, i^4 = 1$.
  2. The powers of $i$ can be used to simplify and manipulate complex number expressions, as well as to understand the behavior of complex number operations.
  3. The powers of $i$ are closely related to the trigonometric functions, as they can be used to represent rotations in the complex plane.
  4. Understanding the powers of $i$ is essential for working with complex number arithmetic, such as multiplication, division, and exponentiation.
  5. The cyclical nature of the powers of $i$ can be used to find the $n$th power of $i$, where $n$ is any integer, by using the formula: $i^n = i^{(n \mod 4)}$.

Review Questions

  • Explain the cyclical pattern of the powers of $i$ and how it can be used to simplify complex number expressions.
    • The powers of $i$ exhibit a cyclical pattern, repeating every four powers: $i^0 = 1, i^1 = i, i^2 = -1, i^3 = -i, i^4 = 1$. This pattern can be used to simplify complex number expressions by reducing the powers of $i$ to one of these four values. For example, to simplify $i^{17}$, we can use the formula $i^n = i^{(n \mod 4)}$, which gives us $i^{17} = i^{(17 \mod 4)} = i^1 = i$.
  • Describe the relationship between the powers of $i$ and the trigonometric functions.
    • The powers of $i$ are closely related to the trigonometric functions, as they can be used to represent rotations in the complex plane. Specifically, $i^1 = i$ represents a rotation of 90 degrees counterclockwise, $i^2 = -1$ represents a rotation of 180 degrees, $i^3 = -i$ represents a rotation of 270 degrees, and $i^4 = 1$ represents a rotation of 360 degrees. This relationship between the powers of $i$ and rotations in the complex plane is fundamental to understanding the behavior of complex number operations and their applications in various fields, such as engineering and physics.
  • Analyze how the understanding of the powers of $i$ is essential for working with complex number arithmetic, such as multiplication, division, and exponentiation.
    • Understanding the powers of $i$ is crucial for performing complex number arithmetic, as the properties of the powers of $i$ can be used to simplify and manipulate complex number expressions. For example, in complex number multiplication, the powers of $i$ can be used to multiply the imaginary parts of the numbers, as in $(a + bi)(c + di) = (ac - bd) + (ad + bc)i$. Similarly, in complex number division, the powers of $i$ can be used to rationalize the denominator, as in $\frac{a + bi}{c + di} = \frac{(a + bi)(c - di)}{c^2 + d^2}$. Furthermore, the cyclical nature of the powers of $i$ can be used to find the $n$th power of a complex number, which is essential for complex number exponentiation. Overall, a deep understanding of the powers of $i$ is fundamental to mastering complex number arithmetic and its applications.

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