0
Guten Tag,
egal was ich mache, es sieht so aus als könnte ich es nur mit Imaginäre Zahlen lösen:
![](data:image/png;base64,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)
Oder kennen Sie einen anderen Weg?
egal was ich mache, es sieht so aus als könnte ich es nur mit Imaginäre Zahlen lösen:
Oder kennen Sie einen anderen Weg?
Diese Frage melden
gefragt
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ceko
Student, Punkte: 630
Student, Punkte: 630