(8 – 5i)2

2 min read Jun 16, 2024
(8 – 5i)2

Expanding (8 – 5i)<sup>2</sup>

This article will guide you through the process of expanding the expression (8 – 5i)<sup>2</sup>.

Understanding Complex Numbers

Before we dive into the expansion, let's recap what complex numbers are. A complex number is a number of the form a + bi, where:

  • a and b are real numbers.
  • i is the imaginary unit, defined as the square root of -1 (i<sup>2</sup> = -1).

Expanding the Expression

We can expand (8 – 5i)<sup>2</sup> using the following steps:

  1. Apply the square: (8 – 5i)<sup>2</sup> = (8 – 5i)(8 – 5i)
  2. Use the distributive property (FOIL method):
    • First: 8 * 8 = 64
    • Outer: 8 * (-5i) = -40i
    • Inner: (-5i) * 8 = -40i
    • Last: (-5i) * (-5i) = 25i<sup>2</sup>
  3. Combine like terms: 64 - 40i - 40i + 25i<sup>2</sup> = 64 - 80i + 25i<sup>2</sup>
  4. Substitute i<sup>2</sup> with -1: 64 - 80i + 25(-1) = 64 - 80i - 25
  5. Simplify: 39 - 80i

Final Result

Therefore, (8 – 5i)<sup>2</sup> expands to 39 - 80i.

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