Display Title

Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3

Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3

Math example of complex numbers

Topic

Complex Numbers

Description

The image shows an example of multiplying two complex numbers (1 + 2i)(-3 + 4i). The solution is presented step-by-step, treating the product as a binomial multiplication. The final result is -11 - 2i..

Example 3: Multiply (1 + 2i)(-3 + 4i). The solution shows the binomial product with detailed steps: (1 * -3) + (1 * 4i) + (2i * -3) + (2i * 4i), simplifying to -11 - 2i.

This topic explores complex numbers, specifically multiplication and division involving imaginary components. The examples in this collection are designed to provide a step-by-step approach, showing how each part of the complex expressions is multiplied or divided to arrive at a simplified result. By breaking down the operations, these examples help demystify complex arithmetic and reinforce the rules of operations for complex numbers.

Seeing multiple worked-out examples allows students to understand the structure of complex arithmetic, enabling them to apply the same process to similar problems. This repetition builds confidence and ensures students recognize patterns and solutions that can be generalized across different types of complex number operations.

Teacher’s Script: Let's look at this example together. Notice how each step builds on the previous one. Take a close look at how we handle both the real and imaginary parts separately before combining them for the final answer. By understanding each part of the solution, you'll be ready to solve similar problems on your own.

For a complete collection of math examples related to Complex Numbers click on this link: Math Examples: Multiplying and Dividing Complex Numbers Collection.

Common Core Standards CCSS.MATH.CONTENT.HSN.CN.A.1, CCSS.MATH.CONTENT.HSN.CN.A.2, CCSS.MATH.CONTENT.HSN.CN.A.3
Grade Range 9 - 12
Curriculum Nodes Algebra
    • Expressions, Equations, and Inequalities
        • Numerical and Algebraic Expressions
Copyright Year 2020
Keywords complex numbers, multiplying and dividing complex numbers