0
Sagen wir, wir haben
23a - 8b - 3a = x
jetzt würde ich gerne folgendes rechtfertigen
23a - 3a - 8b = x
aber das Kommutativgesetzt greift nicht bei Subtraktion
(trotz dessen was online behauptet wird)
![](data:image/png;base64,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)
wie würde ich das rechtfertigen können?
23a - 8b - 3a = x
jetzt würde ich gerne folgendes rechtfertigen
23a - 3a - 8b = x
aber das Kommutativgesetzt greift nicht bei Subtraktion
(trotz dessen was online behauptet wird)
wie würde ich das rechtfertigen können?
Diese Frage melden
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inaktiver Nutzer
Leider scheint diese Frage Unstimmigkeiten zu enthalten und muss korrigiert werden.