0
Hallo,
ich verstehe den ersten Schritt nicht ganz. Ich denke es wird x(x-2) genommen. Kann man die Brüche dann zusammenfassen auch wenn die Nenner nicht ganz gleich sind, weil -4x gibt es im linken Bruch nicht? Danke schonmal.
![](data:image/png;base64,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)
ich verstehe den ersten Schritt nicht ganz. Ich denke es wird x(x-2) genommen. Kann man die Brüche dann zusammenfassen auch wenn die Nenner nicht ganz gleich sind, weil -4x gibt es im linken Bruch nicht? Danke schonmal.
Diese Frage melden
gefragt
sventhv
Punkte: 44
Punkte: 44