0
Hallo zusammen,
wir behandeln derzeit komplexe Zahlen und ich bin über folgende Gleichung gestolpert:
![](data:image/png;base64,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)
Mithilfe der Lösungsformel komme ich dann auf folgendes Zwischenergebnis:
z1/2 =![](data:image/png;base64,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)
Da komme ich dann nicht mehr weiter...kann mir evtl jmd. helfen?
Vielen Dank :)
wir behandeln derzeit komplexe Zahlen und ich bin über folgende Gleichung gestolpert:
Mithilfe der Lösungsformel komme ich dann auf folgendes Zwischenergebnis:
z1/2 =
Da komme ich dann nicht mehr weiter...kann mir evtl jmd. helfen?
Vielen Dank :)
Diese Frage melden
gefragt
userf12c01
Punkte: 12
Punkte: 12
Du könntest die 2 kürzen oder die Wurzel umschreiben - aber die Frage wäre: wofür brauchst du das?
Gibt es eine Aufgabenstellung? Oder lautete sie nur "Stolpere über folgende Gleichung..." ? ;-) ─ joergwausw 04.02.2023 um 11:55