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Guten Tag, ich habe versucht zur Sprache A die Äquivalenzklassen aufzuschreiben. Allerdings habe ich gehört das meine Klasse zu [acb] falsch ist, da sie nicht die gesamte Menge widerspiegelt. Ich verstehe es nicht ganz genau, wäre über hilfe sehr dankbar.
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)
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henry dutter
Schüler, Punkte: 142
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mikn
11.07.2023 um 10:08
ok
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henry dutter
11.07.2023 um 10:22