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 2.0000000 0.3333333 0 0 39x+3]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>3</mn><mrow><mn>9</mn><mi>x</mi><mo>+</mo><mn>3</mn></mrow></msup></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>