Eksponente (GR10) Los op vir x Los op vir x:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mrow»«mn»4«/mn»«mo»-«/mo»«mi»x«/mi»«/mrow»«/msup»«mo»=«/mo»«mn»0«/mn»«/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><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>