Lösung 3.3:3d
Aus Online Mathematik Brückenkurs 2
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<math>i</math> in front of <math>z^2</math>, | <math>i</math> in front of <math>z^2</math>, | ||
- | {{ | + | {{Abgesetzte Formel||<math>i\Bigl(z^2+\frac{2+3i}{i}z-\frac{1}{i}\Bigr)\,\textrm{.}</math>}} |
Then, simplify the complex fractions by multiplying top and bottom by <math>-i</math> (the denominator's complex conjugate), | Then, simplify the complex fractions by multiplying top and bottom by <math>-i</math> (the denominator's complex conjugate), | ||
- | {{ | + | {{Abgesetzte Formel||<math>\begin{align} |
i\Bigl(z^2+\frac{(2+3i)\cdot (-i)}{i\cdot (-i)}z-\frac{1\cdot (-i)}{i\cdot (-i)}\Bigr) | i\Bigl(z^2+\frac{(2+3i)\cdot (-i)}{i\cdot (-i)}z-\frac{1\cdot (-i)}{i\cdot (-i)}\Bigr) | ||
&= i\Bigl(z^2+\frac{-2i+3}{1}z-\frac{-i}{1}\Bigr)\\[5pt] | &= i\Bigl(z^2+\frac{-2i+3}{1}z-\frac{-i}{1}\Bigr)\\[5pt] | ||
Zeile 14: | Zeile 14: | ||
Now we are ready to complete the square of the second-degree expression inside the bracket, | Now we are ready to complete the square of the second-degree expression inside the bracket, | ||
- | {{ | + | {{Abgesetzte Formel||<math>\begin{align} |
i\bigl(z^2+(3-2i)z+i\bigr) | i\bigl(z^2+(3-2i)z+i\bigr) | ||
&= i\Bigl(\Bigl(z+\frac{3-2i}{2}\Bigr)^2 - \Bigl(\frac{3-2i}{2}\Bigr)^2+i\Bigr)\\[5pt] | &= i\Bigl(\Bigl(z+\frac{3-2i}{2}\Bigr)^2 - \Bigl(\frac{3-2i}{2}\Bigr)^2+i\Bigr)\\[5pt] |
Version vom 13:12, 10. Mär. 2009
Before we can complete the square of the expression, we need to take out the factor \displaystyle i in front of \displaystyle z^2,
\displaystyle i\Bigl(z^2+\frac{2+3i}{i}z-\frac{1}{i}\Bigr)\,\textrm{.} |
Then, simplify the complex fractions by multiplying top and bottom by \displaystyle -i (the denominator's complex conjugate),
\displaystyle \begin{align}
i\Bigl(z^2+\frac{(2+3i)\cdot (-i)}{i\cdot (-i)}z-\frac{1\cdot (-i)}{i\cdot (-i)}\Bigr) &= i\Bigl(z^2+\frac{-2i+3}{1}z-\frac{-i}{1}\Bigr)\\[5pt] &= i\bigl(z^2+(3-2i)z+i\bigr)\,\textrm{.} \end{align} |
Now we are ready to complete the square of the second-degree expression inside the bracket,
\displaystyle \begin{align}
i\bigl(z^2+(3-2i)z+i\bigr) &= i\Bigl(\Bigl(z+\frac{3-2i}{2}\Bigr)^2 - \Bigl(\frac{3-2i}{2}\Bigr)^2+i\Bigr)\\[5pt] &= i\bigl(\bigl(z+\tfrac{3}{2}-i\bigr)^2 - \bigl(\tfrac{3}{2}-i\bigr)^2+i\bigr)\\[5pt] &= i\bigl(\bigl(z+\tfrac{3}{2}-i\bigr)^2-\tfrac{9}{4}+3i-i^2+i\bigr)\\[5pt] &= i\bigl(\bigl(z+\tfrac{3}{2}-i\bigr)^2-\frac{5}{4}+4i\bigr)\\[5pt] &= i\bigl(z+\tfrac{3}{2}-i\bigr)^2-\tfrac{5}{4}i+4i^2\\[5pt] &= i\bigl(z+\tfrac{3}{2}-i\bigr)^2-4-\tfrac{5}{4}i\,\textrm{.} \end{align} |