★★☆[br]Sam ist beim Herleiten der 2. Binomischen Formel ein Fehler unterlaufen.[br][img]data:image/png;base64,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[/img][br]Erkläre Sam, wo der Fehler passiert ist.
[br]Sam hat das falsche Rechenzeichen vor b² verwendet.[br][br]Bei der Multiplikation der Binome müssen auch die Rechenzeichen in den Binomen beachtet werden. Daher muss gerechnet werden:[br](a - b)² = (a - b) ⋅ (a - b)[br] = a⋅a + a⋅(-b) +(-b)⋅a + (-b)⋅(-b)[br] = a² - ab - ab + b²[br] = a² - 2ab + b²[br][br]Es gilt also (-b)⋅(-b) = + b²