Answer: It's absolute value of 8+12i is 14.42.
Step-by-step explanation
Since we have given that
[tex]z=8+12i[/tex]
Since we have to use the complex conjugate,
As we know that,
[tex]z\bar{z}=\mid z\mid^2[/tex]
So,
[tex]z=8-12i\\\\\bar{z}=8-12i[/tex]
Now, we use it in the formula ,
[tex](8-12i)\times (8-12i)=64+144=208[/tex]
so,
[tex]\mid z\mid^2=208\\\\\mid z\mid=\sqrt{208}=14.42[/tex]
so, it's absolute value of 8+12i is 14.42.
