Eksponente (GR10) Vereenvoudig Vereenvoudig  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»3«/mn»«mi»n«/mi»«/msup»«mo»§#215;«/mo»«msup»«mn»9«/mn»«mrow»«mi»n«/mi»«mo»-«/mo»«mn»3«/mn»«/mrow»«/msup»«/mrow»«msup»«mn»27«/mn»«mrow»«mi»n«/mi»«mo»-«/mo»«mn»1«/mn»«/mrow»«/msup»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 127]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>27</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>