Eksponente (GR10) Vereenvoudig Vereenvoudig: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»5«/mn»«mrow»«mn»2«/mn»«mi»y«/mi»«mo»-«/mo»«mn»3«/mn»«/mrow»«/msup»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mrow»«mn»4«/mn»«mi»y«/mi»«mo»+«/mo»«mn»4«/mn»«/mrow»«/msup»«/mrow»«msup»«mn»10«/mn»«mrow»«mo»-«/mo»«mn»5«/mn»«mi»y«/mi»«mo»+«/mo»«mn»5«/mn»«/mrow»«/msup»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 57y-8×29y-1]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>5</mn><mrow><mn>7</mn><mi>y</mi><mo>-</mo><mn>8</mn></mrow></msup><mo>&#xD7;</mo><msup><mn>2</mn><mrow><mn>9</mn><mi>y</mi><mo>-</mo><mn>1</mn></mrow></msup></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>