Eksponente (GR10) Vereenvoudig Vereenvoudig «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mn»0«/mn»«mo»,«/mo»«mn»008«/mn»«/mrow»«/mfenced»«mfrac»«mn»1«/mn»«mn»3«/mn»«/mfrac»«/msup»«/math»
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 2.0000000 0.3333333 0 0 15]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>5</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>