Representación de fracciones Representacion de fracciones 05 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>