Eksponente (GR10) Los op Los op:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»27«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»1«/mn»«/mrow»«mrow»«msup»«mn»9«/mn»«mi»x«/mi»«/msup»«mo»+«/mo»«msup»«mn»3«/mn»«mi»x«/mi»«/msup»«mo»+«/mo»«mn»1«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mo»-«/mo»«mfrac»«mn»8«/mn»«mn»9«/mn»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 x=-2]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mo>-</mo><mn>2</mn></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>