SOLUTION: Perform the indicated operation and express your answer in the form a + bi. sqrt{(4 + 3i)(3i

SOLUTION: Perform the indicated operation and express your answer in the form a + bi. sqrt{(4 + 3i)(3i - 4)}

Question 1208826: Perform the indicated operation and express your answer in the form a + bi.

sqrt{(4 + 3i)(3i - 4)}
Answer by ikleyn(52803) (Show Source): You can put this solution on YOUR website!
.
Perform the indicated operation and express your answer in the form a + bi.
sqrt{(4 + 3i)(3i - 4)}
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

(4 + 3i)*(3i - 4) = 4*3i - 4*4 +(3i)*(3i) - 3i*4 = 12i - 16 + 9i^2 - 12i = -16 + 9*(-1) = -16 - 9 = -25.


 = +/- 5i.


ANSWER.   = +/- 5i.


Thus    has two values:  one value is  5i  and  another value is  -5i.


In complete form a + bi,  first number is 0 + 5i;  the second number is 0 - 5i.


Do not be surprised: in complex domain, square root of non-zero number always has two values,
and these two values are opposite (have opposite signs).


The same as in the real domain for positive numbers.

Solved.

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