9000034308 | math4u.vsb.cz

Podoblasť:

Mocniny a odmocniny komplexných čísel

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Project ID:

9000034308

Source Problem:

Accepted:

1

Clonable:

1

Easy:

0

Dve riešenia rovnice

x^{3} + 1 + i = 0

sú

\begin{aligned} x_{1} & = \sqrt[6]{2} (\cos \frac{5}{12} π + i \sin \frac{5}{12} π), \\ x_{2} & = \sqrt[6]{2} (\cos \frac{13}{12} π + i \sin \frac{13}{12} π) . \end{aligned}

Nájdite tretie riešenie.

x_{3} = \sqrt[6]{2} (\cos \frac{21}{12} π + i \sin \frac{21}{12} π)

x_{3} = \sqrt[6]{2} (\cos \frac{9}{12} π + i \sin \frac{9}{12} π)

x_{3} = \sqrt[6]{2} (\cos \frac{17}{12} π + i \sin \frac{17}{12} π)

x_{3} = \sqrt[6]{2} (\cos \frac{19}{12} π + i \sin \frac{19}{12} π)