(6 + 7i)2

2 min read Jun 16, 2024
(6 + 7i)2

Expanding (6 + 7i)<sup>2</sup>

In this article, we will explore the process of expanding the complex number (6 + 7i)<sup>2</sup>.

Understanding Complex Numbers

A complex number is a number that can be expressed in the form a + bi, where a and b are real numbers, and i is the imaginary unit, defined as the square root of -1.

Expanding the Expression

To expand (6 + 7i)<sup>2</sup>, we can use the distributive property or the FOIL method:

(6 + 7i)<sup>2</sup> = (6 + 7i)(6 + 7i)

Using FOIL:

  • First: 6 * 6 = 36
  • Outer: 6 * 7i = 42i
  • Inner: 7i * 6 = 42i
  • Last: 7i * 7i = 49i<sup>2</sup>

Combining the terms:

36 + 42i + 42i + 49i<sup>2</sup>

Since i<sup>2</sup> = -1, we can simplify:

36 + 42i + 42i - 49 = -13 + 84i

Therefore, (6 + 7i)<sup>2</sup> expands to -13 + 84i.

Conclusion

We have successfully expanded the complex number (6 + 7i)<sup>2</sup> to -13 + 84i. This demonstrates the process of squaring a complex number and the importance of understanding the properties of the imaginary unit i.

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