(-5i)^2

less than a minute read Jun 16, 2024
(-5i)^2

Simplifying (-5i)²

In mathematics, understanding how to simplify expressions involving imaginary numbers is crucial. Let's delve into the simplification of (-5i)².

Understanding Imaginary Numbers

Imaginary numbers, denoted by the symbol i, are defined as the square root of -1. This means:

i² = -1

This property is essential for simplifying expressions involving imaginary numbers.

Simplifying (-5i)²

To simplify (-5i)², we can apply the rules of exponents and the definition of :

  1. Expand the square: (-5i)² = (-5i) * (-5i)
  2. Multiply the terms: (-5i) * (-5i) = 25i²
  3. Substitute i² with -1: 25i² = 25 * (-1)
  4. Simplify: 25 * (-1) = -25

Therefore, (-5i)² simplifies to -25.

Key Takeaways

  • The square of an imaginary number is always a real number.
  • Simplifying expressions involving imaginary numbers often involves using the property i² = -1.

By understanding these concepts, you can confidently work with imaginary numbers and simplify expressions involving them.

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