Eksponente (GR10) Los op vir t Los op vir t:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»5«/mn»«mi»t«/mi»«/msup»«mo»+«/mo»«mn»3«/mn»«mo»§#215;«/mo»«msup»«mn»5«/mn»«mrow»«mi»t«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»=«/mo»«mn»400«/mn»«/math»
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 2.0000000 0.3333333 0 0 t=2]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</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>