Representación de fracciones Representacion de fracciones 07 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 34]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>4</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>