(2+3i)(4-2i)

2 min read Jun 16, 2024
(2+3i)(4-2i)

Multiplying Complex Numbers: (2 + 3i)(4 - 2i)

This article explores the multiplication of two complex numbers: (2 + 3i) and (4 - 2i).

Understanding Complex Numbers

Complex numbers are numbers that extend the real number system by including the imaginary unit, denoted by 'i', where i² = -1. A complex number is expressed in the form a + bi, where 'a' and 'b' are real numbers.

Multiplication Process

To multiply complex numbers, we use the distributive property, similar to multiplying binomials.

  1. Expand: (2 + 3i)(4 - 2i) = 2(4 - 2i) + 3i(4 - 2i)

  2. Distribute: = 8 - 4i + 12i - 6i²

  3. Simplify using i² = -1: = 8 - 4i + 12i + 6

  4. Combine real and imaginary terms: = (8 + 6) + (-4 + 12)i

  5. Final Result: = 14 + 8i

Therefore, the product of (2 + 3i) and (4 - 2i) is 14 + 8i.

Visual Representation

Complex numbers can be visualized as points in a complex plane, where the real part is represented on the horizontal axis and the imaginary part on the vertical axis. Multiplying complex numbers can be interpreted as a rotation and scaling of the complex plane.

Conclusion

This article demonstrated the process of multiplying complex numbers, illustrating the use of the distributive property and the fundamental property of i² = -1. The result, 14 + 8i, represents a complex number that combines a real component of 14 and an imaginary component of 8.

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