Eksponente (GR10) Vereenvoudig... Vereenvoudig:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»12«/mn»«mi»y«/mi»«/msup»«mo»-«/mo»«msup»«mn»96«/mn»«mi»y«/mi»«/msup»«/mrow»«mrow»«msup»«mn»3«/mn»«mi»y«/mi»«/msup»«mo»+«/mo»«msup»«mn»6«/mn»«mi»y«/mi»«/msup»«/mrow»«/mfrac»«/math»
]]>

]]> 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 2.0000000 0.3333333 0 0 4y-25y3]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><msup><mn>4</mn><mi>y</mi></msup><mo>-</mo><msup><mn>2</mn><mrow><mn>5</mn><mi>y</mi></mrow></msup></mrow><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>