Gegeben sei Funktion $ f $ mit dem Funktionsterm $ f(x) = x^2 - 2x + 1 $.
", "advice": "An lokalen Extrema ändert die Tangentensteigung (welche mit der ersten Ableitung bestimmt werden kann) ihr Vorzeichen.
\nDie erste Ableitung von $f(x)$ lautet in diesem Fall $f(x) = 2x + 2$.
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", "answer": "2x-2", "showPreview": true, "checkingType": "absdiff", "checkingAccuracy": 0.001, "failureRate": 1, "vsetRangePoints": 5, "vsetRange": [0, 1], "checkVariableNames": false, "singleLetterVariables": false, "allowUnknownFunctions": true, "implicitFunctionComposition": false, "valuegenerators": [{"name": "x", "value": ""}]}, {"type": "gapfill", "useCustomName": true, "customName": "b)", "marks": 0, "scripts": {}, "customMarkingAlgorithm": "", "extendBaseMarkingAlgorithm": true, "unitTests": [], "showCorrectAnswer": true, "showFeedbackIcon": true, "variableReplacements": [], "variableReplacementStrategy": "originalfirst", "nextParts": [], "suggestGoingBack": false, "adaptiveMarkingPenalty": 0, "exploreObjective": null, "prompt": "Für welchen Wert $x$ besitzt die Funktion $f$ ein (lokales) Extremum?
\nFür $x = $ [[0]]
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