Proporciones, reglas de tres y fórmulas de interés Porcentajes 2 Calcula los porcentajes de votos de los diferentes partidos del gráfico y escribe los resultados con un decimal usando el punto para la coma.

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1.0000000 0.3333333 0 0 Partido 1=#aPartido 2=#bPartido 3=#cPartido 4=#dPartido 5=#e]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>13</mn><mo>.</mo><mn>3</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>13</mn><mo>.</mo><mn>3</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mn>20</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>20</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mn>33</mn><mo>.</mo><mn>3</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>P</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>o</mi><mo>&#160;</mo><mn>1</mn><mo>=</mo><mo>#</mo><mi>a</mi><mspace linebreak="newline"/><mi>P</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>o</mi><mo>&#160;</mo><mn>2</mn><mo>=</mo><mo>#</mo><mi>b</mi><mspace linebreak="newline"/><mi>P</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>o</mi><mo>&#160;</mo><mn>3</mn><mo>=</mo><mo>#</mo><mi>c</mi><mspace linebreak="newline"/><mi>P</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>o</mi><mo>&#160;</mo><mn>4</mn><mo>=</mo><mo>#</mo><mi mathvariant="normal">d</mi><mspace linebreak="newline"/><mi>P</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>o</mi><mo>&#160;</mo><mn>5</mn><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi></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">popupEditor</data><data name="inputCompound">true</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>