(4+2i)(4-2i)

2 min read Jun 16, 2024
(4+2i)(4-2i)

Multiplying Complex Numbers: (4 + 2i)(4 - 2i)

This article explores the multiplication of the complex numbers (4 + 2i) and (4 - 2i). We'll cover the process, the result, and the significance of this type of multiplication.

Understanding Complex Numbers

Complex numbers are numbers that can be expressed in the form a + bi, where 'a' and 'b' are real numbers, and 'i' is the imaginary unit. The imaginary unit is defined as the square root of -1 (i² = -1).

The Multiplication Process

To multiply complex numbers, we use the distributive property (also known as FOIL - First, Outer, Inner, Last) just like we do with binomials:

(4 + 2i)(4 - 2i) = 4(4) + 4(-2i) + 2i(4) + 2i(-2i)

Simplifying the terms:

= 16 - 8i + 8i - 4i²

The Result and Significance

Since i² = -1, we can substitute:

= 16 - 8i + 8i - 4(-1)

= 16 + 4

= 20

The product of (4 + 2i) and (4 - 2i) is 20.

This result is significant because it demonstrates a key property of complex numbers: the product of a complex number and its conjugate always results in a real number. The conjugate of a complex number is formed by changing the sign of the imaginary part. In this case, the conjugate of (4 + 2i) is (4 - 2i).

This property is essential in various mathematical applications, particularly in simplifying complex expressions and solving equations involving complex numbers.

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