Lösung 3.3:3d
Aus Online Mathematik Brückenkurs 2
Before we can complete the square of the expression, we need to take out the factor
z2+i2+3iz−i1
Then, simplify the complex fractions by multiplying top and bottom by
\displaystyle \begin{align}
& i\left( z^{2}+\frac{\left( 2+3i \right)\centerdot \left( -i \right)}{i\centerdot \left( -i \right)}z-\frac{1\centerdot \left( -i \right)}{i\centerdot \left( -i \right)} \right) \\
& =i\left( z^{2}+\frac{-2i+3}{1}z-\frac{-i}{1} \right) \\
& =i\left( z^{2}+\left( 3-2i \right)z+i \right). \\
\end{align}
Now we are ready to complete the square of the second-degree expression inside the bracket:
\displaystyle \begin{align}
& i\left( z^{2}+\left( 3-2i \right)z+i \right)=i\left( \left( z+\frac{3-2i}{2} \right)^{2}-\left( \frac{3-2i}{2} \right)^{2}+i \right) \\
& =i\left( \left( z+\frac{3}{2}-i \right)^{2}-\left( \frac{3}{2}-i \right)^{2}+i \right) \\
& =i\left( \left( z+\frac{3}{2}-i \right)^{2}-\frac{9}{4}+3i+1+i \right) \\
& =i\left( \left( z+\frac{3}{2}-i \right)^{2}-\frac{5}{4}+4i \right) \\
& =\left( z+\frac{3}{2}-i \right)^{2}-\frac{5}{4}i+4i^{2} \\
& =\left( z+\frac{3}{2}-i \right)^{2}-4-\frac{5}{4}i. \\
\end{align}
