Část:
Project ID:
9000034303
Source Problem:
Accepted:
1
Clonable:
1
Easy:
0
Množinou všech komplexních řešení rovnice
\(x^{3} + \mathrm{i} = 0\) je:
\(\{\mathrm{i};\ \frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i};\ -\frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i}\}\)
\(\{ - 1;\ -\frac{\sqrt{3}}
{2} + \frac{1}
{2}\mathrm{i};\ -\frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i}\}\)
\(\{ - 1;\ \frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i};\ -\frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i}\}\)
\(\{\mathrm{i};\ -\frac{\sqrt{3}}
{2} + \frac{1}
{2}\mathrm{i};\ -\frac{\sqrt{3}}
{2} -\frac{1}
{2}\mathrm{i}\}\)