Representación de fracciones Representacion de fracciones 04 Que fracción representa:

 

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1.0000000 0.3333333 0 0 12]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</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>