Answer: (28/37) - (48/37)*i
Step-by-step explanation:
We want to solve the quotient:
[tex]\frac{6 - 7*i}{6 + i}[/tex]
To solve it, we need to multiply the whole quotient by the complex conjugate of the denominator.
Remember that for a complex number:
a + b*i
the complex conjugate is:
a - b*i
Then if the denominatoris:
6 + i
the complex conjugate is:
6 - i
Then to solve the quotient we have:
[tex]\frac{6 - 7*i}{6 + i} *\frac{6 - i}{6 - i} = \frac{(6 -7*i)*(6 - i)}{(6 + i)*(6 - i)} = \frac{6*6 -7*6*i - 6*i + (-7*i)*(-i)}{6*6 +6*i - 6*i -i^2}[/tex]
This is equal to:
[tex]\frac{6*6 -7*6*i - 6*i + (-7*i)*(-i)}{6*6 +6*i - 6*i -i^2} = \frac{36 - 42*i - 6*I - 7}{36 + 1} = \frac{29 - 48*i}{37}[/tex]
Then the initial quotient is equal to:
(28/37) - (48/37)*i
