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Project ID:
2010013206
Source Problem:
Accepted:
0
Clonable:
1
Easy:
0
Určte komplexné korene danej kvadratickej rovnice.
\[ 3\mathrm{i}x^2 + 2 = 0 \]
\( x_1=\frac{\sqrt3}3+\frac{\sqrt3}3\mathrm{i},\ \ x_2=-\frac{\sqrt3}3-\frac{\sqrt3}3\mathrm{i} \)
\( x_1=-\frac{\sqrt3}3+\frac{\sqrt3}3\mathrm{i},\ \ x_2=\frac{\sqrt3}3-\frac{\sqrt3}3\mathrm{i} \)
\( x_1=-\frac{\sqrt3}6+\frac{\sqrt3}6\mathrm{i},\ \ x_2=-\frac{\sqrt3}6-\frac{\sqrt3}6\mathrm{i} \)
\( x_1=\frac{\sqrt3}6+\frac{\sqrt3}6\mathrm{i},\ \ x_2=-\frac{\sqrt3}6-\frac{\sqrt3}6\mathrm{i} \)