Solution 3.4:3
From Förberedande kurs i matematik 2
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| - | {{ | + | A polynomial equation which has real coefficients always has complex conjugate roots. We can therefore say directly that the equation, in addition to the roots <math>z=2i</math> and <math>z=-1+i</math>, has roots <math>z=\overline{2i}=-2i</math> and <math>z=\overline{-1+i}=-1-i</math>. Because the equation is of degree 4, it does not have more than 4 roots. |
| - | < | + | |
| - | {{ | + | The answer is thus |
| + | |||
| + | {{Displayed math||<math>z = \left\{\begin{align} | ||
| + | &\phantom{+}2i\,,\\[5pt] | ||
| + | &-2i\,,\\[5pt] | ||
| + | &-1+i\,,\\[5pt] | ||
| + | &-1-i\,\textrm{.} | ||
| + | \end{align} \right.</math>}} | ||
Current revision
A polynomial equation which has real coefficients always has complex conjugate roots. We can therefore say directly that the equation, in addition to the roots \displaystyle z=2i and \displaystyle z=-1+i, has roots \displaystyle z=\overline{2i}=-2i and \displaystyle z=\overline{-1+i}=-1-i. Because the equation is of degree 4, it does not have more than 4 roots.
The answer is thus
| \displaystyle z = \left\{\begin{align}
&\phantom{+}2i\,,\\[5pt] &-2i\,,\\[5pt] &-1+i\,,\\[5pt] &-1-i\,\textrm{.} \end{align} \right. |
