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Řešení kvadratické rovnice v komplexních číslech
Řeš v \mathbb{C} rovnici:
\large x^2-3x+3 = 0
\large K = \left \{\Large \frac{3}{2}\large - \Large \frac{\sqrt {2}}{2}\large \text{i};\Large \frac{3}{2}\large + \Large \frac{\sqrt {2}}{2}\large \text{i} \right \}
\large K = \left \{\Large \frac{3}{2}\large - \Large \frac{\sqrt {5}}{2}\large \text{i};\Large \frac{3}{2}\large + \Large \frac{\sqrt {5}}{2}\large \text{i} \right \}
\large K = \left \{\Large \frac{3}{2}\large - \Large \frac{\sqrt {3}}{3}\large \text{i};\Large \frac{3}{2}\large + \Large \frac{\sqrt {3}}{3}\large \text{i} \right \}
\large K = \left \{\Large \frac{3}{2}\large - \Large \frac{\sqrt {3}}{2}\large \text{i};\Large \frac{3}{2}\large + \Large \frac{\sqrt {3}}{2}\large \text{i} \right \}