(x+3i)(x-3i)

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

Expanding and Simplifying (x + 3i)(x - 3i)

This expression involves complex numbers, where 'i' represents the imaginary unit (√-1). Let's break down how to expand and simplify it:

Expanding the Expression

We can expand the expression using the FOIL method (First, Outer, Inner, Last) or by recognizing it as a difference of squares:

FOIL Method:

  • First: x * x = x²
  • Outer: x * -3i = -3xi
  • Inner: 3i * x = 3xi
  • Last: 3i * -3i = -9i²

Combining the terms: x² - 3xi + 3xi - 9i²

Difference of Squares:

(x + 3i)(x - 3i) is in the form of (a + b)(a - b) which simplifies to a² - b²

Therefore, (x + 3i)(x - 3i) = x² - (3i)²

Simplifying the Expression

Now, we need to simplify the expression further by substituting i² with -1:

FOIL Method:

x² - 3xi + 3xi - 9i² = x² - 9(-1) = x² + 9

Difference of Squares:

x² - (3i)² = x² - 9(i²) = x² - 9(-1) = x² + 9

Conclusion

Therefore, expanding and simplifying (x + 3i)(x - 3i) results in x² + 9. This demonstrates that the product of a complex number and its conjugate (the complex number with the opposite sign for the imaginary part) always results in a real number.

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