Eksponente (GR10) Los op vir y... Los op vir y  :  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»64«/mn»«mrow»«mi»y«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»=«/mo»«msup»«mn»16«/mn»«mrow»«mn»2«/mn»«mi»y«/mi»«mo»+«/mo»«mn»5«/mn»«/mrow»«/msup»«/math»
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 2.0000000 0.3333333 0 0 y=-7]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y</mi><mo>=</mo><mo>-</mo><mn>7</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>