%2F(-9%2B4i).jpeg "(-3+5i)/(-9+4i)")
Dividing Complex Numbers: A Step-by-Step Guide
Dividing complex numbers can seem intimidating, but it's actually a straightforward process using a clever trick. Let's break down how to divide (-3 + 5i) / (-9 + 4i).
1. Multiply by the Conjugate
The key to dividing complex numbers is multiplying both the numerator and denominator by the conjugate of the denominator. The conjugate of a complex number is formed by simply changing the sign of the imaginary part.
In this case, the conjugate of (-9 + 4i) is (-9 - 4i).
2. Simplify the Expression
Now, we multiply:
( -3 + 5i) / (-9 + 4i) * (-9 - 4i) / (-9 - 4i)
This might look complex, but remember: we're essentially multiplying by 1, so we don't change the value of the expression.
Numerator:
-
We expand using the FOIL method (First, Outer, Inner, Last):
- (-3)(-9) + (-3)(-4i) + (5i)(-9) + (5i)(-4i)
- 27 + 12i - 45i - 20i²
-
Since i² = -1, we substitute to simplify:
- 27 + 12i - 45i + 20 = 47 - 33i
Denominator:
-
Again, expand using FOIL:
- (-9)(-9) + (-9)(-4i) + (4i)(-9) + (4i)(-4i)
- 81 + 36i - 36i - 16i²
-
Substitute i² = -1:
- 81 + 16 = 97
3. Final Result
We now have:
(47 - 33i) / 97
Finally, express the result in standard complex number form (a + bi):
(47/97) - (33/97)i
Conclusion
By multiplying by the conjugate of the denominator and simplifying, we successfully divided the complex numbers and arrived at our final answer: (47/97) - (33/97)i.