Representación de fracciones Representacion de fracciones 06 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 13]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>3</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>